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._|\| |/|_. Copyright (c) Maplesoft, a division of Waterloo Maple Inc. 2008
\ MAPLE / All rights reserved. Maple is a trademark of
<____ ____> Waterloo Maple Inc.
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> #BEGIN OUTFILE1
> # Begin Function number 3
> check_sign := proc( x0 ,xf)
> local ret;
> if (xf > x0) then # if number 1
> ret := 1.0;
> else
> ret := -1.0;
> fi;# end if 1;
> ret;;
> end;
check_sign := proc(x0, xf)
local ret;
if x0 < xf then ret := 1.0 else ret := -1.0 end if; ret
end proc
> # End Function number 3
> # Begin Function number 4
> est_size_answer := proc()
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_log10normmin,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_hmax,
> glob_hmin,
> glob_hmin_init,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_log10_abserr,
> glob_log10_relerr,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_log10abserr,
> glob_log10relerr,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3_g,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local min_size;
> min_size := glob_large_float;
> if (omniabs(array_y[1]) < min_size) then # if number 1
> min_size := omniabs(array_y[1]);
> omniout_float(ALWAYS,"min_size",32,min_size,32,"");
> fi;# end if 1;
> if (min_size < 1.0) then # if number 1
> min_size := 1.0;
> omniout_float(ALWAYS,"min_size",32,min_size,32,"");
> fi;# end if 1;
> min_size;
> end;
est_size_answer := proc()
local min_size;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_log10normmin, glob_total_exp_sec,
glob_optimal_expect_sec, glob_html_log, glob_good_digits, glob_max_opt_iter,
glob_dump, glob_djd_debug, glob_display_flag, glob_djd_debug2,
glob_sec_in_minute, glob_min_in_hour, glob_hours_in_day, glob_days_in_year,
glob_sec_in_hour, glob_sec_in_day, glob_sec_in_year, glob_almost_1,
glob_clock_sec, glob_clock_start_sec, glob_not_yet_finished,
glob_initial_pass, glob_not_yet_start_msg, glob_reached_optimal_h,
glob_optimal_done, glob_disp_incr, glob_h, glob_hmax, glob_hmin,
glob_hmin_init, glob_large_float, glob_last_good_h, glob_look_poles,
glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic,
glob_log10_abserr, glob_log10_relerr, glob_abserr, glob_relerr,
glob_max_hours, glob_max_iter, glob_max_rel_trunc_err, glob_max_trunc_err,
glob_no_eqs, glob_optimal_clock_start_sec, glob_optimal_start,
glob_small_float, glob_smallish_float, glob_unchanged_h_cnt, glob_warned,
glob_warned2, glob_max_sec, glob_orig_start_sec, glob_start,
glob_curr_iter_when_opt, glob_current_iter, glob_iter, glob_normmax,
glob_log10abserr, glob_log10relerr, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1, array_tmp2, array_tmp3_g, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
min_size := glob_large_float;
if omniabs(array_y[1]) < min_size then
min_size := omniabs(array_y[1]);
omniout_float(ALWAYS, "min_size", 32, min_size, 32, "")
end if;
if min_size < 1.0 then
min_size := 1.0;
omniout_float(ALWAYS, "min_size", 32, min_size, 32, "")
end if;
min_size
end proc
> # End Function number 4
> # Begin Function number 5
> test_suggested_h := proc()
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_log10normmin,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_hmax,
> glob_hmin,
> glob_hmin_init,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_log10_abserr,
> glob_log10_relerr,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_log10abserr,
> glob_log10relerr,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3_g,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local max_value3,hn_div_ho,hn_div_ho_2,hn_div_ho_3,value3,no_terms;
> max_value3 := 0.0;
> no_terms := glob_max_terms;
> hn_div_ho := 0.5;
> hn_div_ho_2 := 0.25;
> hn_div_ho_3 := 0.125;
> omniout_float(ALWAYS,"hn_div_ho",32,hn_div_ho,32,"");
> omniout_float(ALWAYS,"hn_div_ho_2",32,hn_div_ho_2,32,"");
> omniout_float(ALWAYS,"hn_div_ho_3",32,hn_div_ho_3,32,"");
> value3 := omniabs(array_y[no_terms-3] + array_y[no_terms - 2] * hn_div_ho + array_y[no_terms - 1] * hn_div_ho_2 + array_y[no_terms] * hn_div_ho_3);
> if (value3 > max_value3) then # if number 1
> max_value3 := value3;
> omniout_float(ALWAYS,"value3",32,value3,32,"");
> fi;# end if 1;
> omniout_float(ALWAYS,"max_value3",32,max_value3,32,"");
> max_value3;
> end;
test_suggested_h := proc()
local max_value3, hn_div_ho, hn_div_ho_2, hn_div_ho_3, value3, no_terms;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_log10normmin, glob_total_exp_sec,
glob_optimal_expect_sec, glob_html_log, glob_good_digits, glob_max_opt_iter,
glob_dump, glob_djd_debug, glob_display_flag, glob_djd_debug2,
glob_sec_in_minute, glob_min_in_hour, glob_hours_in_day, glob_days_in_year,
glob_sec_in_hour, glob_sec_in_day, glob_sec_in_year, glob_almost_1,
glob_clock_sec, glob_clock_start_sec, glob_not_yet_finished,
glob_initial_pass, glob_not_yet_start_msg, glob_reached_optimal_h,
glob_optimal_done, glob_disp_incr, glob_h, glob_hmax, glob_hmin,
glob_hmin_init, glob_large_float, glob_last_good_h, glob_look_poles,
glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic,
glob_log10_abserr, glob_log10_relerr, glob_abserr, glob_relerr,
glob_max_hours, glob_max_iter, glob_max_rel_trunc_err, glob_max_trunc_err,
glob_no_eqs, glob_optimal_clock_start_sec, glob_optimal_start,
glob_small_float, glob_smallish_float, glob_unchanged_h_cnt, glob_warned,
glob_warned2, glob_max_sec, glob_orig_start_sec, glob_start,
glob_curr_iter_when_opt, glob_current_iter, glob_iter, glob_normmax,
glob_log10abserr, glob_log10relerr, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1, array_tmp2, array_tmp3_g, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
max_value3 := 0.;
no_terms := glob_max_terms;
hn_div_ho := 0.5;
hn_div_ho_2 := 0.25;
hn_div_ho_3 := 0.125;
omniout_float(ALWAYS, "hn_div_ho", 32, hn_div_ho, 32, "");
omniout_float(ALWAYS, "hn_div_ho_2", 32, hn_div_ho_2, 32, "");
omniout_float(ALWAYS, "hn_div_ho_3", 32, hn_div_ho_3, 32, "");
value3 := omniabs(array_y[no_terms - 3]
+ array_y[no_terms - 2]*hn_div_ho
+ array_y[no_terms - 1]*hn_div_ho_2
+ array_y[no_terms]*hn_div_ho_3);
if max_value3 < value3 then
max_value3 := value3;
omniout_float(ALWAYS, "value3", 32, value3, 32, "")
end if;
omniout_float(ALWAYS, "max_value3", 32, max_value3, 32, "");
max_value3
end proc
> # End Function number 5
> # Begin Function number 6
> reached_interval := proc()
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_log10normmin,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_hmax,
> glob_hmin,
> glob_hmin_init,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_log10_abserr,
> glob_log10_relerr,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_log10abserr,
> glob_log10relerr,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3_g,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local ret;
> if (glob_check_sign * (array_x[1]) >= glob_check_sign * glob_next_display) then # if number 1
> ret := true;
> else
> ret := false;
> fi;# end if 1;
> return(ret);
> end;
reached_interval := proc()
local ret;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_log10normmin, glob_total_exp_sec,
glob_optimal_expect_sec, glob_html_log, glob_good_digits, glob_max_opt_iter,
glob_dump, glob_djd_debug, glob_display_flag, glob_djd_debug2,
glob_sec_in_minute, glob_min_in_hour, glob_hours_in_day, glob_days_in_year,
glob_sec_in_hour, glob_sec_in_day, glob_sec_in_year, glob_almost_1,
glob_clock_sec, glob_clock_start_sec, glob_not_yet_finished,
glob_initial_pass, glob_not_yet_start_msg, glob_reached_optimal_h,
glob_optimal_done, glob_disp_incr, glob_h, glob_hmax, glob_hmin,
glob_hmin_init, glob_large_float, glob_last_good_h, glob_look_poles,
glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic,
glob_log10_abserr, glob_log10_relerr, glob_abserr, glob_relerr,
glob_max_hours, glob_max_iter, glob_max_rel_trunc_err, glob_max_trunc_err,
glob_no_eqs, glob_optimal_clock_start_sec, glob_optimal_start,
glob_small_float, glob_smallish_float, glob_unchanged_h_cnt, glob_warned,
glob_warned2, glob_max_sec, glob_orig_start_sec, glob_start,
glob_curr_iter_when_opt, glob_current_iter, glob_iter, glob_normmax,
glob_log10abserr, glob_log10relerr, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1, array_tmp2, array_tmp3_g, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
if glob_check_sign*glob_next_display <= glob_check_sign*array_x[1] then
ret := true
else ret := false
end if;
return ret
end proc
> # End Function number 6
> # Begin Function number 7
> display_alot := proc(iter)
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_log10normmin,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_hmax,
> glob_hmin,
> glob_hmin_init,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_log10_abserr,
> glob_log10_relerr,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_log10abserr,
> glob_log10relerr,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3_g,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local abserr, analytic_val_y, ind_var, numeric_val, relerr, term_no;
> #TOP DISPLAY ALOT
> if (reached_interval()) then # if number 1
> if (iter >= 0) then # if number 2
> ind_var := array_x[1];
> omniout_float(ALWAYS,"x[1] ",33,ind_var,20," ");
> analytic_val_y := exact_soln_y(ind_var);
> omniout_float(ALWAYS,"y[1] (analytic) ",33,analytic_val_y,20," ");
> term_no := 1;
> numeric_val := array_y[term_no];
> abserr := omniabs(numeric_val - analytic_val_y);
> omniout_float(ALWAYS,"y[1] (numeric) ",33,numeric_val,20," ");
> if (omniabs(analytic_val_y) <> 0.0) then # if number 3
> relerr := abserr*100.0/omniabs(analytic_val_y);
> if (relerr > 0.0000000000000000000000000000000001) then # if number 4
> glob_good_digits := -trunc(log10(relerr)) + 2;
> else
> glob_good_digits := Digits;
> fi;# end if 4;
> else
> relerr := -1.0 ;
> glob_good_digits := -1;
> fi;# end if 3;
> if (glob_iter = 1) then # if number 3
> array_1st_rel_error[1] := relerr;
> else
> array_last_rel_error[1] := relerr;
> fi;# end if 3;
> omniout_float(ALWAYS,"absolute error ",4,abserr,20," ");
> omniout_float(ALWAYS,"relative error ",4,relerr,20,"%");
> omniout_int(INFO,"Correct digits ",32,glob_good_digits,4," ")
> ;
> omniout_float(ALWAYS,"h ",4,glob_h,20," ");
> fi;# end if 2;
> #BOTTOM DISPLAY ALOT
> fi;# end if 1;
> end;
display_alot := proc(iter)
local abserr, analytic_val_y, ind_var, numeric_val, relerr, term_no;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_log10normmin, glob_total_exp_sec,
glob_optimal_expect_sec, glob_html_log, glob_good_digits, glob_max_opt_iter,
glob_dump, glob_djd_debug, glob_display_flag, glob_djd_debug2,
glob_sec_in_minute, glob_min_in_hour, glob_hours_in_day, glob_days_in_year,
glob_sec_in_hour, glob_sec_in_day, glob_sec_in_year, glob_almost_1,
glob_clock_sec, glob_clock_start_sec, glob_not_yet_finished,
glob_initial_pass, glob_not_yet_start_msg, glob_reached_optimal_h,
glob_optimal_done, glob_disp_incr, glob_h, glob_hmax, glob_hmin,
glob_hmin_init, glob_large_float, glob_last_good_h, glob_look_poles,
glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic,
glob_log10_abserr, glob_log10_relerr, glob_abserr, glob_relerr,
glob_max_hours, glob_max_iter, glob_max_rel_trunc_err, glob_max_trunc_err,
glob_no_eqs, glob_optimal_clock_start_sec, glob_optimal_start,
glob_small_float, glob_smallish_float, glob_unchanged_h_cnt, glob_warned,
glob_warned2, glob_max_sec, glob_orig_start_sec, glob_start,
glob_curr_iter_when_opt, glob_current_iter, glob_iter, glob_normmax,
glob_log10abserr, glob_log10relerr, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1, array_tmp2, array_tmp3_g, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
if reached_interval() then
if 0 <= iter then
ind_var := array_x[1];
omniout_float(ALWAYS, "x[1] ", 33,
ind_var, 20, " ");
analytic_val_y := exact_soln_y(ind_var);
omniout_float(ALWAYS, "y[1] (analytic) ", 33,
analytic_val_y, 20, " ");
term_no := 1;
numeric_val := array_y[term_no];
abserr := omniabs(numeric_val - analytic_val_y);
omniout_float(ALWAYS, "y[1] (numeric) ", 33,
numeric_val, 20, " ");
if omniabs(analytic_val_y) <> 0. then
relerr := abserr*100.0/omniabs(analytic_val_y);
if 0.1*10^(-33) < relerr then
glob_good_digits := -trunc(log10(relerr)) + 2
else glob_good_digits := Digits
end if
else relerr := -1.0; glob_good_digits := -1
end if;
if glob_iter = 1 then array_1st_rel_error[1] := relerr
else array_last_rel_error[1] := relerr
end if;
omniout_float(ALWAYS, "absolute error ", 4,
abserr, 20, " ");
omniout_float(ALWAYS, "relative error ", 4,
relerr, 20, "%");
omniout_int(INFO, "Correct digits ", 32,
glob_good_digits, 4, " ");
omniout_float(ALWAYS, "h ", 4,
glob_h, 20, " ")
end if
end if
end proc
> # End Function number 7
> # Begin Function number 8
> adjust_for_pole := proc(h_param)
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_log10normmin,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_hmax,
> glob_hmin,
> glob_hmin_init,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_log10_abserr,
> glob_log10_relerr,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_log10abserr,
> glob_log10relerr,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3_g,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local hnew, sz2, tmp;
> #TOP ADJUST FOR POLE
> hnew := h_param;
> glob_normmax := glob_small_float;
> if (omniabs(array_y_higher[1,1]) > glob_small_float) then # if number 1
> tmp := omniabs(array_y_higher[1,1]);
> if (tmp < glob_normmax) then # if number 2
> glob_normmax := tmp;
> fi;# end if 2
> fi;# end if 1;
> if (glob_look_poles and (omniabs(array_pole[1]) > glob_small_float) and (array_pole[1] <> glob_large_float)) then # if number 1
> sz2 := array_pole[1]/10.0;
> if (sz2 < hnew) then # if number 2
> omniout_float(INFO,"glob_h adjusted to ",20,h_param,12,"due to singularity.");
> omniout_str(INFO,"Reached Optimal");
> return(hnew);
> fi;# end if 2
> fi;# end if 1;
> if ( not glob_reached_optimal_h) then # if number 1
> glob_reached_optimal_h := true;
> glob_curr_iter_when_opt := glob_current_iter;
> glob_optimal_clock_start_sec := elapsed_time_seconds();
> glob_optimal_start := array_x[1];
> fi;# end if 1;
> hnew := sz2;
> ;#END block
> return(hnew);
> #BOTTOM ADJUST FOR POLE
> end;
adjust_for_pole := proc(h_param)
local hnew, sz2, tmp;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_log10normmin, glob_total_exp_sec,
glob_optimal_expect_sec, glob_html_log, glob_good_digits, glob_max_opt_iter,
glob_dump, glob_djd_debug, glob_display_flag, glob_djd_debug2,
glob_sec_in_minute, glob_min_in_hour, glob_hours_in_day, glob_days_in_year,
glob_sec_in_hour, glob_sec_in_day, glob_sec_in_year, glob_almost_1,
glob_clock_sec, glob_clock_start_sec, glob_not_yet_finished,
glob_initial_pass, glob_not_yet_start_msg, glob_reached_optimal_h,
glob_optimal_done, glob_disp_incr, glob_h, glob_hmax, glob_hmin,
glob_hmin_init, glob_large_float, glob_last_good_h, glob_look_poles,
glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic,
glob_log10_abserr, glob_log10_relerr, glob_abserr, glob_relerr,
glob_max_hours, glob_max_iter, glob_max_rel_trunc_err, glob_max_trunc_err,
glob_no_eqs, glob_optimal_clock_start_sec, glob_optimal_start,
glob_small_float, glob_smallish_float, glob_unchanged_h_cnt, glob_warned,
glob_warned2, glob_max_sec, glob_orig_start_sec, glob_start,
glob_curr_iter_when_opt, glob_current_iter, glob_iter, glob_normmax,
glob_log10abserr, glob_log10relerr, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1, array_tmp2, array_tmp3_g, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
hnew := h_param;
glob_normmax := glob_small_float;
if glob_small_float < omniabs(array_y_higher[1, 1]) then
tmp := omniabs(array_y_higher[1, 1]);
if tmp < glob_normmax then glob_normmax := tmp end if
end if;
if glob_look_poles and glob_small_float < omniabs(array_pole[1]) and
array_pole[1] <> glob_large_float then
sz2 := array_pole[1]/10.0;
if sz2 < hnew then
omniout_float(INFO, "glob_h adjusted to ", 20, h_param, 12,
"due to singularity.");
omniout_str(INFO, "Reached Optimal");
return hnew
end if
end if;
if not glob_reached_optimal_h then
glob_reached_optimal_h := true;
glob_curr_iter_when_opt := glob_current_iter;
glob_optimal_clock_start_sec := elapsed_time_seconds();
glob_optimal_start := array_x[1]
end if;
hnew := sz2;
return hnew
end proc
> # End Function number 8
> # Begin Function number 9
> prog_report := proc(x_start,x_end)
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_log10normmin,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_hmax,
> glob_hmin,
> glob_hmin_init,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_log10_abserr,
> glob_log10_relerr,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_log10abserr,
> glob_log10relerr,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3_g,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local clock_sec, opt_clock_sec, clock_sec1, expect_sec, left_sec, percent_done, total_clock_sec;
> #TOP PROGRESS REPORT
> clock_sec1 := elapsed_time_seconds();
> total_clock_sec := convfloat(clock_sec1) - convfloat(glob_orig_start_sec);
> glob_clock_sec := convfloat(clock_sec1) - convfloat(glob_clock_start_sec);
> left_sec := convfloat(glob_max_sec) + convfloat(glob_orig_start_sec) - convfloat(clock_sec1);
> expect_sec := comp_expect_sec(convfloat(x_end),convfloat(x_start),convfloat(array_x[1]) + convfloat(glob_h) ,convfloat( clock_sec1) - convfloat(glob_orig_start_sec));
> opt_clock_sec := convfloat( clock_sec1) - convfloat(glob_optimal_clock_start_sec);
> glob_optimal_expect_sec := comp_expect_sec(convfloat(x_end),convfloat(x_start),convfloat(array_x[1]) +convfloat( glob_h) ,convfloat( opt_clock_sec));
> glob_total_exp_sec := glob_optimal_expect_sec + total_clock_sec;
> percent_done := comp_percent(convfloat(x_end),convfloat(x_start),convfloat(array_x[1]) + convfloat(glob_h));
> glob_percent_done := percent_done;
> omniout_str_noeol(INFO,"Total Elapsed Time ");
> omniout_timestr(convfloat(total_clock_sec));
> omniout_str_noeol(INFO,"Elapsed Time(since restart) ");
> omniout_timestr(convfloat(glob_clock_sec));
> if (convfloat(percent_done) < convfloat(100.0)) then # if number 1
> omniout_str_noeol(INFO,"Expected Time Remaining ");
> omniout_timestr(convfloat(expect_sec));
> omniout_str_noeol(INFO,"Optimized Time Remaining ");
> omniout_timestr(convfloat(glob_optimal_expect_sec));
> omniout_str_noeol(INFO,"Expected Total Time ");
> omniout_timestr(convfloat(glob_total_exp_sec));
> fi;# end if 1;
> omniout_str_noeol(INFO,"Time to Timeout ");
> omniout_timestr(convfloat(left_sec));
> omniout_float(INFO, "Percent Done ",33,percent_done,4,"%");
> #BOTTOM PROGRESS REPORT
> end;
prog_report := proc(x_start, x_end)
local clock_sec, opt_clock_sec, clock_sec1, expect_sec, left_sec,
percent_done, total_clock_sec;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_log10normmin, glob_total_exp_sec,
glob_optimal_expect_sec, glob_html_log, glob_good_digits, glob_max_opt_iter,
glob_dump, glob_djd_debug, glob_display_flag, glob_djd_debug2,
glob_sec_in_minute, glob_min_in_hour, glob_hours_in_day, glob_days_in_year,
glob_sec_in_hour, glob_sec_in_day, glob_sec_in_year, glob_almost_1,
glob_clock_sec, glob_clock_start_sec, glob_not_yet_finished,
glob_initial_pass, glob_not_yet_start_msg, glob_reached_optimal_h,
glob_optimal_done, glob_disp_incr, glob_h, glob_hmax, glob_hmin,
glob_hmin_init, glob_large_float, glob_last_good_h, glob_look_poles,
glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic,
glob_log10_abserr, glob_log10_relerr, glob_abserr, glob_relerr,
glob_max_hours, glob_max_iter, glob_max_rel_trunc_err, glob_max_trunc_err,
glob_no_eqs, glob_optimal_clock_start_sec, glob_optimal_start,
glob_small_float, glob_smallish_float, glob_unchanged_h_cnt, glob_warned,
glob_warned2, glob_max_sec, glob_orig_start_sec, glob_start,
glob_curr_iter_when_opt, glob_current_iter, glob_iter, glob_normmax,
glob_log10abserr, glob_log10relerr, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1, array_tmp2, array_tmp3_g, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
clock_sec1 := elapsed_time_seconds();
total_clock_sec :=
convfloat(clock_sec1) - convfloat(glob_orig_start_sec);
glob_clock_sec :=
convfloat(clock_sec1) - convfloat(glob_clock_start_sec);
left_sec := convfloat(glob_max_sec) + convfloat(glob_orig_start_sec)
- convfloat(clock_sec1);
expect_sec := comp_expect_sec(convfloat(x_end), convfloat(x_start),
convfloat(array_x[1]) + convfloat(glob_h),
convfloat(clock_sec1) - convfloat(glob_orig_start_sec));
opt_clock_sec :=
convfloat(clock_sec1) - convfloat(glob_optimal_clock_start_sec);
glob_optimal_expect_sec := comp_expect_sec(convfloat(x_end),
convfloat(x_start), convfloat(array_x[1]) + convfloat(glob_h),
convfloat(opt_clock_sec));
glob_total_exp_sec := glob_optimal_expect_sec + total_clock_sec;
percent_done := comp_percent(convfloat(x_end), convfloat(x_start),
convfloat(array_x[1]) + convfloat(glob_h));
glob_percent_done := percent_done;
omniout_str_noeol(INFO, "Total Elapsed Time ");
omniout_timestr(convfloat(total_clock_sec));
omniout_str_noeol(INFO, "Elapsed Time(since restart) ");
omniout_timestr(convfloat(glob_clock_sec));
if convfloat(percent_done) < convfloat(100.0) then
omniout_str_noeol(INFO, "Expected Time Remaining ");
omniout_timestr(convfloat(expect_sec));
omniout_str_noeol(INFO, "Optimized Time Remaining ");
omniout_timestr(convfloat(glob_optimal_expect_sec));
omniout_str_noeol(INFO, "Expected Total Time ");
omniout_timestr(convfloat(glob_total_exp_sec))
end if;
omniout_str_noeol(INFO, "Time to Timeout ");
omniout_timestr(convfloat(left_sec));
omniout_float(INFO, "Percent Done ", 33,
percent_done, 4, "%")
end proc
> # End Function number 9
> # Begin Function number 10
> check_for_pole := proc()
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_log10normmin,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_hmax,
> glob_hmin,
> glob_hmin_init,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_log10_abserr,
> glob_log10_relerr,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_log10abserr,
> glob_log10relerr,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3_g,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local cnt, dr1, dr2, ds1, ds2, hdrc, m, n, nr1, nr2, ord_no, rad_c, rcs, rm0, rm1, rm2, rm3, rm4, found, h_new, ratio, term;
> #TOP CHECK FOR POLE
> #IN RADII REAL EQ = 1
> #Computes radius of convergence and r_order of pole from 3 adjacent Taylor series terms. EQUATUON NUMBER 1
> #Applies to pole of arbitrary r_order on the real axis,
> #Due to Prof. George Corliss.
> n := glob_max_terms;
> m := n - 1 - 1;
> while ((m >= 10) and ((omniabs(array_y_higher[1,m]) < glob_small_float) or (omniabs(array_y_higher[1,m-1]) < glob_small_float) or (omniabs(array_y_higher[1,m-2]) < glob_small_float ))) do # do number 2
> m := m - 1;
> od;# end do number 2;
> if (m > 10) then # if number 1
> rm0 := array_y_higher[1,m]/array_y_higher[1,m-1];
> rm1 := array_y_higher[1,m-1]/array_y_higher[1,m-2];
> hdrc := convfloat(m-1)*rm0-convfloat(m-2)*rm1;
> if (omniabs(hdrc) > glob_small_float) then # if number 2
> rcs := glob_h/hdrc;
> ord_no := convfloat(m-1)*rm0/hdrc - convfloat(m) + 2.0;
> array_real_pole[1,1] := rcs;
> array_real_pole[1,2] := ord_no;
> else
> array_real_pole[1,1] := glob_large_float;
> array_real_pole[1,2] := glob_large_float;
> fi;# end if 2
> else
> array_real_pole[1,1] := glob_large_float;
> array_real_pole[1,2] := glob_large_float;
> fi;# end if 1;
> #BOTTOM RADII REAL EQ = 1
> #TOP RADII COMPLEX EQ = 1
> #Computes radius of convergence for complex conjugate pair of poles.
> #from 6 adjacent Taylor series terms
> #Also computes r_order of poles.
> #Due to Manuel Prieto.
> #With a correction by Dennis J. Darland
> n := glob_max_terms - 1 - 1;
> cnt := 0;
> while ((cnt < 5) and (n >= 10)) do # do number 2
> if (omniabs(array_y_higher[1,n]) > glob_small_float) then # if number 1
> cnt := cnt + 1;
> else
> cnt := 0;
> fi;# end if 1;
> n := n - 1;
> od;# end do number 2;
> m := n + cnt;
> if (m <= 10) then # if number 1
> rad_c := glob_large_float;
> ord_no := glob_large_float;
> elif
> (((omniabs(array_y_higher[1,m]) >= (glob_large_float)) or (omniabs(array_y_higher[1,m-1]) >=(glob_large_float)) or (omniabs(array_y_higher[1,m-2]) >= (glob_large_float)) or (omniabs(array_y_higher[1,m-3]) >= (glob_large_float)) or (omniabs(array_y_higher[1,m-4]) >= (glob_large_float)) or (omniabs(array_y_higher[1,m-5]) >= (glob_large_float))) or ((omniabs(array_y_higher[1,m]) <= (glob_small_float)) or (omniabs(array_y_higher[1,m-1]) <=(glob_small_float)) or (omniabs(array_y_higher[1,m-2]) <= (glob_small_float)) or (omniabs(array_y_higher[1,m-3]) <= (glob_small_float)) or (omniabs(array_y_higher[1,m-4]) <= (glob_small_float)) or (omniabs(array_y_higher[1,m-5]) <= (glob_small_float)))) then # if number 2
> rad_c := glob_large_float;
> ord_no := glob_large_float;
> else
> rm0 := (array_y_higher[1,m])/(array_y_higher[1,m-1]);
> rm1 := (array_y_higher[1,m-1])/(array_y_higher[1,m-2]);
> rm2 := (array_y_higher[1,m-2])/(array_y_higher[1,m-3]);
> rm3 := (array_y_higher[1,m-3])/(array_y_higher[1,m-4]);
> rm4 := (array_y_higher[1,m-4])/(array_y_higher[1,m-5]);
> nr1 := convfloat(m-1)*rm0 - 2.0*convfloat(m-2)*rm1 + convfloat(m-3)*rm2;
> nr2 := convfloat(m-2)*rm1 - 2.0*convfloat(m-3)*rm2 + convfloat(m-4)*rm3;
> dr1 := (-1.0)/rm1 + 2.0/rm2 - 1.0/rm3;
> dr2 := (-1.0)/rm2 + 2.0/rm3 - 1.0/rm4;
> ds1 := 3.0/rm1 - 8.0/rm2 + 5.0/rm3;
> ds2 := 3.0/rm2 - 8.0/rm3 + 5.0/rm4;
> if ((omniabs(nr1 * dr2 - nr2 * dr1) <= glob_small_float) or (omniabs(dr1) <= glob_small_float)) then # if number 3
> rad_c := glob_large_float;
> ord_no := glob_large_float;
> else
> if (omniabs(nr1*dr2 - nr2 * dr1) > glob_small_float) then # if number 4
> rcs := ((ds1*dr2 - ds2*dr1 +dr1*dr2)/(nr1*dr2 - nr2 * dr1));
> #(Manuels) rcs := (ds1*dr2 - ds2*dr1)/(nr1*dr2 - nr2 * dr1)
> ord_no := (rcs*nr1 - ds1)/(2.0*dr1) -convfloat(m)/2.0;
> if (omniabs(rcs) > glob_small_float) then # if number 5
> if (rcs > 0.0) then # if number 6
> rad_c := sqrt(rcs) * omniabs(glob_h);
> else
> rad_c := glob_large_float;
> fi;# end if 6
> else
> rad_c := glob_large_float;
> ord_no := glob_large_float;
> fi;# end if 5
> else
> rad_c := glob_large_float;
> ord_no := glob_large_float;
> fi;# end if 4
> fi;# end if 3;
> array_complex_pole[1,1] := rad_c;
> array_complex_pole[1,2] := ord_no;
> fi;# end if 2;
> #BOTTOM RADII COMPLEX EQ = 1
> found := false;
> #TOP WHICH RADII EQ = 1
> if ( not found and ((array_real_pole[1,1] = glob_large_float) or (array_real_pole[1,2] = glob_large_float)) and ((array_complex_pole[1,1] <> glob_large_float) and (array_complex_pole[1,2] <> glob_large_float)) and ((array_complex_pole[1,1] > 0.0) and (array_complex_pole[1,2] > 0.0))) then # if number 2
> array_poles[1,1] := array_complex_pole[1,1];
> array_poles[1,2] := array_complex_pole[1,2];
> found := true;
> array_type_pole[1] := 2;
> if (glob_display_flag) then # if number 3
> if (reached_interval()) then # if number 4
> omniout_str(ALWAYS,"Complex estimate of poles used");
> fi;# end if 4;
> fi;# end if 3;
> fi;# end if 2;
> if ( not found and ((array_real_pole[1,1] <> glob_large_float) and (array_real_pole[1,2] <> glob_large_float) and (array_real_pole[1,1] > 0.0) and (array_real_pole[1,2] > 0.0) and ((array_complex_pole[1,1] = glob_large_float) or (array_complex_pole[1,2] = glob_large_float) or (array_complex_pole[1,1] <= 0.0 ) or (array_complex_pole[1,2] <= 0.0)))) then # if number 2
> array_poles[1,1] := array_real_pole[1,1];
> array_poles[1,2] := array_real_pole[1,2];
> found := true;
> array_type_pole[1] := 1;
> if (glob_display_flag) then # if number 3
> if (reached_interval()) then # if number 4
> omniout_str(ALWAYS,"Real estimate of pole used");
> fi;# end if 4;
> fi;# end if 3;
> fi;# end if 2;
> if ( not found and (((array_real_pole[1,1] = glob_large_float) or (array_real_pole[1,2] = glob_large_float)) and ((array_complex_pole[1,1] = glob_large_float) or (array_complex_pole[1,2] = glob_large_float)))) then # if number 2
> array_poles[1,1] := glob_large_float;
> array_poles[1,2] := glob_large_float;
> found := true;
> array_type_pole[1] := 3;
> if (reached_interval()) then # if number 3
> omniout_str(ALWAYS,"NO POLE");
> fi;# end if 3;
> fi;# end if 2;
> if ( not found and ((array_real_pole[1,1] < array_complex_pole[1,1]) and (array_real_pole[1,1] > 0.0) and (array_real_pole[1,2] > 0.0))) then # if number 2
> array_poles[1,1] := array_real_pole[1,1];
> array_poles[1,2] := array_real_pole[1,2];
> found := true;
> array_type_pole[1] := 1;
> if (glob_display_flag) then # if number 3
> if (reached_interval()) then # if number 4
> omniout_str(ALWAYS,"Real estimate of pole used");
> fi;# end if 4;
> fi;# end if 3;
> fi;# end if 2;
> if ( not found and ((array_complex_pole[1,1] <> glob_large_float) and (array_complex_pole[1,2] <> glob_large_float) and (array_complex_pole[1,1] > 0.0) and (array_complex_pole[1,2] > 0.0))) then # if number 2
> array_poles[1,1] := array_complex_pole[1,1];
> array_poles[1,2] := array_complex_pole[1,2];
> array_type_pole[1] := 2;
> found := true;
> if (glob_display_flag) then # if number 3
> if (reached_interval()) then # if number 4
> omniout_str(ALWAYS,"Complex estimate of poles used");
> fi;# end if 4;
> fi;# end if 3;
> fi;# end if 2;
> if ( not found ) then # if number 2
> array_poles[1,1] := glob_large_float;
> array_poles[1,2] := glob_large_float;
> array_type_pole[1] := 3;
> if (reached_interval()) then # if number 3
> omniout_str(ALWAYS,"NO POLE");
> fi;# end if 3;
> fi;# end if 2;
> #BOTTOM WHICH RADII EQ = 1
> array_pole[1] := glob_large_float;
> array_pole[2] := glob_large_float;
> #TOP WHICH RADIUS EQ = 1
> if (array_pole[1] > array_poles[1,1]) then # if number 2
> array_pole[1] := array_poles[1,1];
> array_pole[2] := array_poles[1,2];
> fi;# end if 2;
> #BOTTOM WHICH RADIUS EQ = 1
> #START ADJUST ALL SERIES
> if (array_pole[1] * glob_ratio_of_radius < omniabs(glob_h)) then # if number 2
> h_new := array_pole[1] * glob_ratio_of_radius;
> term := 1;
> ratio := 1.0;
> while (term <= glob_max_terms) do # do number 2
> array_y[term] := array_y[term]* ratio;
> array_y_higher[1,term] := array_y_higher[1,term]* ratio;
> array_x[term] := array_x[term]* ratio;
> ratio := ratio * h_new / omniabs(glob_h);
> term := term + 1;
> od;# end do number 2;
> glob_h := h_new;
> fi;# end if 2;
> #BOTTOM ADJUST ALL SERIES
> if (reached_interval()) then # if number 2
> display_pole();
> fi;# end if 2
> end;
check_for_pole := proc()
local cnt, dr1, dr2, ds1, ds2, hdrc, m, n, nr1, nr2, ord_no, rad_c, rcs,
rm0, rm1, rm2, rm3, rm4, found, h_new, ratio, term;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_log10normmin, glob_total_exp_sec,
glob_optimal_expect_sec, glob_html_log, glob_good_digits, glob_max_opt_iter,
glob_dump, glob_djd_debug, glob_display_flag, glob_djd_debug2,
glob_sec_in_minute, glob_min_in_hour, glob_hours_in_day, glob_days_in_year,
glob_sec_in_hour, glob_sec_in_day, glob_sec_in_year, glob_almost_1,
glob_clock_sec, glob_clock_start_sec, glob_not_yet_finished,
glob_initial_pass, glob_not_yet_start_msg, glob_reached_optimal_h,
glob_optimal_done, glob_disp_incr, glob_h, glob_hmax, glob_hmin,
glob_hmin_init, glob_large_float, glob_last_good_h, glob_look_poles,
glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic,
glob_log10_abserr, glob_log10_relerr, glob_abserr, glob_relerr,
glob_max_hours, glob_max_iter, glob_max_rel_trunc_err, glob_max_trunc_err,
glob_no_eqs, glob_optimal_clock_start_sec, glob_optimal_start,
glob_small_float, glob_smallish_float, glob_unchanged_h_cnt, glob_warned,
glob_warned2, glob_max_sec, glob_orig_start_sec, glob_start,
glob_curr_iter_when_opt, glob_current_iter, glob_iter, glob_normmax,
glob_log10abserr, glob_log10relerr, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1, array_tmp2, array_tmp3_g, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
n := glob_max_terms;
m := n - 2;
while 10 <= m and (omniabs(array_y_higher[1, m]) < glob_small_float or
omniabs(array_y_higher[1, m - 1]) < glob_small_float or
omniabs(array_y_higher[1, m - 2]) < glob_small_float) do m := m - 1
end do;
if 10 < m then
rm0 := array_y_higher[1, m]/array_y_higher[1, m - 1];
rm1 := array_y_higher[1, m - 1]/array_y_higher[1, m - 2];
hdrc := convfloat(m - 1)*rm0 - convfloat(m - 2)*rm1;
if glob_small_float < omniabs(hdrc) then
rcs := glob_h/hdrc;
ord_no := convfloat(m - 1)*rm0/hdrc - convfloat(m) + 2.0;
array_real_pole[1, 1] := rcs;
array_real_pole[1, 2] := ord_no
else
array_real_pole[1, 1] := glob_large_float;
array_real_pole[1, 2] := glob_large_float
end if
else
array_real_pole[1, 1] := glob_large_float;
array_real_pole[1, 2] := glob_large_float
end if;
n := glob_max_terms - 2;
cnt := 0;
while cnt < 5 and 10 <= n do
if glob_small_float < omniabs(array_y_higher[1, n]) then
cnt := cnt + 1
else cnt := 0
end if;
n := n - 1
end do;
m := n + cnt;
if m <= 10 then rad_c := glob_large_float; ord_no := glob_large_float
elif glob_large_float <= omniabs(array_y_higher[1, m]) or
glob_large_float <= omniabs(array_y_higher[1, m - 1]) or
glob_large_float <= omniabs(array_y_higher[1, m - 2]) or
glob_large_float <= omniabs(array_y_higher[1, m - 3]) or
glob_large_float <= omniabs(array_y_higher[1, m - 4]) or
glob_large_float <= omniabs(array_y_higher[1, m - 5]) or
omniabs(array_y_higher[1, m]) <= glob_small_float or
omniabs(array_y_higher[1, m - 1]) <= glob_small_float or
omniabs(array_y_higher[1, m - 2]) <= glob_small_float or
omniabs(array_y_higher[1, m - 3]) <= glob_small_float or
omniabs(array_y_higher[1, m - 4]) <= glob_small_float or
omniabs(array_y_higher[1, m - 5]) <= glob_small_float then
rad_c := glob_large_float; ord_no := glob_large_float
else
rm0 := array_y_higher[1, m]/array_y_higher[1, m - 1];
rm1 := array_y_higher[1, m - 1]/array_y_higher[1, m - 2];
rm2 := array_y_higher[1, m - 2]/array_y_higher[1, m - 3];
rm3 := array_y_higher[1, m - 3]/array_y_higher[1, m - 4];
rm4 := array_y_higher[1, m - 4]/array_y_higher[1, m - 5];
nr1 := convfloat(m - 1)*rm0 - 2.0*convfloat(m - 2)*rm1
+ convfloat(m - 3)*rm2;
nr2 := convfloat(m - 2)*rm1 - 2.0*convfloat(m - 3)*rm2
+ convfloat(m - 4)*rm3;
dr1 := (-1)*(1.0)/rm1 + 2.0/rm2 - 1.0/rm3;
dr2 := (-1)*(1.0)/rm2 + 2.0/rm3 - 1.0/rm4;
ds1 := 3.0/rm1 - 8.0/rm2 + 5.0/rm3;
ds2 := 3.0/rm2 - 8.0/rm3 + 5.0/rm4;
if omniabs(nr1*dr2 - nr2*dr1) <= glob_small_float or
omniabs(dr1) <= glob_small_float then
rad_c := glob_large_float; ord_no := glob_large_float
else
if glob_small_float < omniabs(nr1*dr2 - nr2*dr1) then
rcs := (ds1*dr2 - ds2*dr1 + dr1*dr2)/(nr1*dr2 - nr2*dr1);
ord_no := (rcs*nr1 - ds1)/(2.0*dr1) - convfloat(m)/2.0;
if glob_small_float < omniabs(rcs) then
if 0. < rcs then rad_c := sqrt(rcs)*omniabs(glob_h)
else rad_c := glob_large_float
end if
else rad_c := glob_large_float; ord_no := glob_large_float
end if
else rad_c := glob_large_float; ord_no := glob_large_float
end if
end if;
array_complex_pole[1, 1] := rad_c;
array_complex_pole[1, 2] := ord_no
end if;
found := false;
if not found and (array_real_pole[1, 1] = glob_large_float or
array_real_pole[1, 2] = glob_large_float) and
array_complex_pole[1, 1] <> glob_large_float and
array_complex_pole[1, 2] <> glob_large_float and
0. < array_complex_pole[1, 1] and 0. < array_complex_pole[1, 2] then
array_poles[1, 1] := array_complex_pole[1, 1];
array_poles[1, 2] := array_complex_pole[1, 2];
found := true;
array_type_pole[1] := 2;
if glob_display_flag then
if reached_interval() then
omniout_str(ALWAYS, "Complex estimate of poles used")
end if
end if
end if;
if not found and array_real_pole[1, 1] <> glob_large_float and
array_real_pole[1, 2] <> glob_large_float and
0. < array_real_pole[1, 1] and 0. < array_real_pole[1, 2] and (
array_complex_pole[1, 1] = glob_large_float or
array_complex_pole[1, 2] = glob_large_float or
array_complex_pole[1, 1] <= 0. or array_complex_pole[1, 2] <= 0.) then
array_poles[1, 1] := array_real_pole[1, 1];
array_poles[1, 2] := array_real_pole[1, 2];
found := true;
array_type_pole[1] := 1;
if glob_display_flag then
if reached_interval() then
omniout_str(ALWAYS, "Real estimate of pole used")
end if
end if
end if;
if not found and (array_real_pole[1, 1] = glob_large_float or
array_real_pole[1, 2] = glob_large_float) and (
array_complex_pole[1, 1] = glob_large_float or
array_complex_pole[1, 2] = glob_large_float) then
array_poles[1, 1] := glob_large_float;
array_poles[1, 2] := glob_large_float;
found := true;
array_type_pole[1] := 3;
if reached_interval() then omniout_str(ALWAYS, "NO POLE") end if
end if;
if not found and array_real_pole[1, 1] < array_complex_pole[1, 1] and
0. < array_real_pole[1, 1] and 0. < array_real_pole[1, 2] then
array_poles[1, 1] := array_real_pole[1, 1];
array_poles[1, 2] := array_real_pole[1, 2];
found := true;
array_type_pole[1] := 1;
if glob_display_flag then
if reached_interval() then
omniout_str(ALWAYS, "Real estimate of pole used")
end if
end if
end if;
if not found and array_complex_pole[1, 1] <> glob_large_float and
array_complex_pole[1, 2] <> glob_large_float and
0. < array_complex_pole[1, 1] and 0. < array_complex_pole[1, 2] then
array_poles[1, 1] := array_complex_pole[1, 1];
array_poles[1, 2] := array_complex_pole[1, 2];
array_type_pole[1] := 2;
found := true;
if glob_display_flag then
if reached_interval() then
omniout_str(ALWAYS, "Complex estimate of poles used")
end if
end if
end if;
if not found then
array_poles[1, 1] := glob_large_float;
array_poles[1, 2] := glob_large_float;
array_type_pole[1] := 3;
if reached_interval() then omniout_str(ALWAYS, "NO POLE") end if
end if;
array_pole[1] := glob_large_float;
array_pole[2] := glob_large_float;
if array_poles[1, 1] < array_pole[1] then
array_pole[1] := array_poles[1, 1];
array_pole[2] := array_poles[1, 2]
end if;
if array_pole[1]*glob_ratio_of_radius < omniabs(glob_h) then
h_new := array_pole[1]*glob_ratio_of_radius;
term := 1;
ratio := 1.0;
while term <= glob_max_terms do
array_y[term] := array_y[term]*ratio;
array_y_higher[1, term] := array_y_higher[1, term]*ratio;
array_x[term] := array_x[term]*ratio;
ratio := ratio*h_new/omniabs(glob_h);
term := term + 1
end do;
glob_h := h_new
end if;
if reached_interval() then display_pole() end if
end proc
> # End Function number 10
> # Begin Function number 11
> get_norms := proc()
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_log10normmin,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_hmax,
> glob_hmin,
> glob_hmin_init,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_log10_abserr,
> glob_log10_relerr,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_log10abserr,
> glob_log10relerr,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3_g,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local iii;
> if ( not glob_initial_pass) then # if number 2
> iii := 1;
> while (iii <= glob_max_terms) do # do number 2
> array_norms[iii] := 0.0;
> iii := iii + 1;
> od;# end do number 2;
> #TOP GET NORMS
> iii := 1;
> while (iii <= glob_max_terms) do # do number 2
> if (omniabs(array_y[iii]) > array_norms[iii]) then # if number 3
> array_norms[iii] := omniabs(array_y[iii]);
> fi;# end if 3;
> iii := iii + 1;
> od;# end do number 2
> #BOTTOM GET NORMS
> ;
> fi;# end if 2;
> end;
get_norms := proc()
local iii;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_log10normmin, glob_total_exp_sec,
glob_optimal_expect_sec, glob_html_log, glob_good_digits, glob_max_opt_iter,
glob_dump, glob_djd_debug, glob_display_flag, glob_djd_debug2,
glob_sec_in_minute, glob_min_in_hour, glob_hours_in_day, glob_days_in_year,
glob_sec_in_hour, glob_sec_in_day, glob_sec_in_year, glob_almost_1,
glob_clock_sec, glob_clock_start_sec, glob_not_yet_finished,
glob_initial_pass, glob_not_yet_start_msg, glob_reached_optimal_h,
glob_optimal_done, glob_disp_incr, glob_h, glob_hmax, glob_hmin,
glob_hmin_init, glob_large_float, glob_last_good_h, glob_look_poles,
glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic,
glob_log10_abserr, glob_log10_relerr, glob_abserr, glob_relerr,
glob_max_hours, glob_max_iter, glob_max_rel_trunc_err, glob_max_trunc_err,
glob_no_eqs, glob_optimal_clock_start_sec, glob_optimal_start,
glob_small_float, glob_smallish_float, glob_unchanged_h_cnt, glob_warned,
glob_warned2, glob_max_sec, glob_orig_start_sec, glob_start,
glob_curr_iter_when_opt, glob_current_iter, glob_iter, glob_normmax,
glob_log10abserr, glob_log10relerr, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1, array_tmp2, array_tmp3_g, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
if not glob_initial_pass then
iii := 1;
while iii <= glob_max_terms do
array_norms[iii] := 0.; iii := iii + 1
end do;
iii := 1;
while iii <= glob_max_terms do
if array_norms[iii] < omniabs(array_y[iii]) then
array_norms[iii] := omniabs(array_y[iii])
end if;
iii := iii + 1
end do
end if
end proc
> # End Function number 11
> # Begin Function number 12
> atomall := proc()
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_log10normmin,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_hmax,
> glob_hmin,
> glob_hmin_init,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_log10_abserr,
> glob_log10_relerr,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_log10abserr,
> glob_log10relerr,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3_g,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> local kkk, order_d, adj2, adj3 , temporary, term;
> #TOP ATOMALL
> #END OUTFILE1
> #BEGIN ATOMHDR1
> #emit pre mult CONST - LINEAR $eq_no = 1 i = 1
> array_tmp1[1] := array_const_0D2[1] * array_x[1];
> #emit pre add LINEAR - CONST $eq_no = 1 i = 1
> array_tmp2[1] := array_tmp1[1] + array_const_0D3[1];
> #emit pre sin 1 $eq_no = 1
> array_tmp3[1] := sin(array_x[1]);
> array_tmp3_g[1] := cos(array_x[1]);
> omniout_str(ALWAYS,"WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.");
> #emit pre expt LINEAR - FULL $eq_no = 1 i = 1
> array_tmp4[1] := expt(array_tmp2[1] , array_tmp3[1] ) ;
> array_tmp4_a1[1] := ln(array_tmp2[1] ) ;
> array_tmp4_a1[2] := array_tmp2[2] / array_tmp2[1];
> #emit pre add CONST FULL $eq_no = 1 i = 1
> array_tmp5[1] := array_const_0D0[1] + array_tmp4[1];
> #emit pre assign xxx $eq_no = 1 i = 1 $min_hdrs = 5
> if ( not array_y_set_initial[1,2]) then # if number 1
> if (1 <= glob_max_terms) then # if number 2
> temporary := array_tmp5[1] * expt(glob_h , (1)) * factorial_3(0,1);
> array_y[2] := temporary;
> array_y_higher[1,2] := temporary;
> temporary := temporary / glob_h * (1.0);
> array_y_higher[2,1] := temporary;
> fi;# end if 2;
> fi;# end if 1;
> kkk := 2;
> #END ATOMHDR1
> #BEGIN ATOMHDR2
> #emit pre mult CONST - LINEAR $eq_no = 1 i = 2
> array_tmp1[2] := array_const_0D2[1] * array_x[2];
> #emit pre add LINEAR - CONST $eq_no = 1 i = 2
> array_tmp2[2] := array_tmp1[2];
> #emit pre sin ID_LINEAR iii = 2 $eq_no = 1
> array_tmp3[2] := array_tmp3_g[1] * array_x[2] / 1;
> array_tmp3_g[2] := -array_tmp3[1] * array_x[2] / 1;
> #emit pre expt LINEAR - FULL $eq_no = 1 i = 2
> array_tmp4_a2[1] := (array_tmp4_a1[1] * array_tmp3[2] + array_tmp4_a1[2] * array_tmp3[1]) / glob_h;
> array_tmp4[2] := array_tmp4[1] * array_tmp4_a2[1] * glob_h;
> #emit pre add CONST FULL $eq_no = 1 i = 2
> array_tmp5[2] := array_tmp4[2];
> #emit pre assign xxx $eq_no = 1 i = 2 $min_hdrs = 5
> if ( not array_y_set_initial[1,3]) then # if number 1
> if (2 <= glob_max_terms) then # if number 2
> temporary := array_tmp5[2] * expt(glob_h , (1)) * factorial_3(1,2);
> array_y[3] := temporary;
> array_y_higher[1,3] := temporary;
> temporary := temporary / glob_h * (2.0);
> array_y_higher[2,2] := temporary;
> fi;# end if 2;
> fi;# end if 1;
> kkk := 3;
> #END ATOMHDR2
> #BEGIN ATOMHDR3
> #emit pre sin ID_LINEAR iii = 3 $eq_no = 1
> array_tmp3[3] := array_tmp3_g[2] * array_x[2] / 2;
> array_tmp3_g[3] := -array_tmp3[2] * array_x[2] / 2;
> #emit pre expt LINEAR - FULL $eq_no = 1 i = 3
> array_tmp4_a1[3] := -array_tmp4_a1[2] * array_tmp2[2] * 1 / array_tmp2[1] / 2;
> array_tmp4_a2[2] := ats(3,array_tmp3,array_tmp4_a1,1)*2 / glob_h;
> array_tmp4[3] := ats(2,array_tmp4,array_tmp4_a2,1)*glob_h/2;
> #emit pre add CONST FULL $eq_no = 1 i = 3
> array_tmp5[3] := array_tmp4[3];
> #emit pre assign xxx $eq_no = 1 i = 3 $min_hdrs = 5
> if ( not array_y_set_initial[1,4]) then # if number 1
> if (3 <= glob_max_terms) then # if number 2
> temporary := array_tmp5[3] * expt(glob_h , (1)) * factorial_3(2,3);
> array_y[4] := temporary;
> array_y_higher[1,4] := temporary;
> temporary := temporary / glob_h * (3.0);
> array_y_higher[2,3] := temporary;
> fi;# end if 2;
> fi;# end if 1;
> kkk := 4;
> #END ATOMHDR3
> #BEGIN ATOMHDR4
> #emit pre sin ID_LINEAR iii = 4 $eq_no = 1
> array_tmp3[4] := array_tmp3_g[3] * array_x[2] / 3;
> array_tmp3_g[4] := -array_tmp3[3] * array_x[2] / 3;
> #emit pre expt LINEAR - FULL $eq_no = 1 i = 4
> array_tmp4_a1[4] := -array_tmp4_a1[3] * array_tmp2[2] * 2 / array_tmp2[1] / 3;
> array_tmp4_a2[3] := ats(4,array_tmp3,array_tmp4_a1,1)*3 / glob_h;
> array_tmp4[4] := ats(3,array_tmp4,array_tmp4_a2,1)*glob_h/3;
> #emit pre add CONST FULL $eq_no = 1 i = 4
> array_tmp5[4] := array_tmp4[4];
> #emit pre assign xxx $eq_no = 1 i = 4 $min_hdrs = 5
> if ( not array_y_set_initial[1,5]) then # if number 1
> if (4 <= glob_max_terms) then # if number 2
> temporary := array_tmp5[4] * expt(glob_h , (1)) * factorial_3(3,4);
> array_y[5] := temporary;
> array_y_higher[1,5] := temporary;
> temporary := temporary / glob_h * (4.0);
> array_y_higher[2,4] := temporary;
> fi;# end if 2;
> fi;# end if 1;
> kkk := 5;
> #END ATOMHDR4
> #BEGIN ATOMHDR5
> #emit pre sin ID_LINEAR iii = 5 $eq_no = 1
> array_tmp3[5] := array_tmp3_g[4] * array_x[2] / 4;
> array_tmp3_g[5] := -array_tmp3[4] * array_x[2] / 4;
> #emit pre expt LINEAR - FULL $eq_no = 1 i = 5
> array_tmp4_a1[5] := -array_tmp4_a1[4] * array_tmp2[2] * 3 / array_tmp2[1] / 4;
> array_tmp4_a2[4] := ats(5,array_tmp3,array_tmp4_a1,1)*4 / glob_h;
> array_tmp4[5] := ats(4,array_tmp4,array_tmp4_a2,1)*glob_h/4;
> #emit pre add CONST FULL $eq_no = 1 i = 5
> array_tmp5[5] := array_tmp4[5];
> #emit pre assign xxx $eq_no = 1 i = 5 $min_hdrs = 5
> if ( not array_y_set_initial[1,6]) then # if number 1
> if (5 <= glob_max_terms) then # if number 2
> temporary := array_tmp5[5] * expt(glob_h , (1)) * factorial_3(4,5);
> array_y[6] := temporary;
> array_y_higher[1,6] := temporary;
> temporary := temporary / glob_h * (5.0);
> array_y_higher[2,5] := temporary;
> fi;# end if 2;
> fi;# end if 1;
> kkk := 6;
> #END ATOMHDR5
> #BEGIN OUTFILE3
> #Top Atomall While Loop-- outfile3
> while (kkk <= glob_max_terms) do # do number 1
> #END OUTFILE3
> #BEGIN OUTFILE4
> #emit sin LINEAR $eq_no = 1
> array_tmp3[kkk] := array_tmp3_g[kkk - 1] * array_x[2] / (kkk - 1);
> array_tmp3_g[kkk] := -array_tmp3[kkk - 1] * array_x[2] / (kkk - 1);
> #emit expt LINEAR FULL $eq_no = 1 i = 1
> array_tmp4_a1[kkk] := -array_tmp4_a1[kkk-1] * array_tmp2[2] * (kkk-2) / array_tmp2[1] / (kkk - 1);
> array_tmp4_a2[kkk-1] := ats(kkk,array_tmp3,array_tmp4_a1,1) * (kkk-1) / glob_h;
> array_tmp4[kkk] := ats(kkk-1,array_tmp4,array_tmp4_a2,1) * glob_h/(kkk-1);
> #emit NOT FULL - FULL add $eq_no = 1
> array_tmp5[kkk] := array_tmp4[kkk];
> #emit assign $eq_no = 1
> order_d := 1;
> if (kkk + order_d + 1 <= glob_max_terms) then # if number 1
> if ( not array_y_set_initial[1,kkk + order_d]) then # if number 2
> temporary := array_tmp5[kkk] * expt(glob_h , (order_d)) * factorial_3((kkk - 1),(kkk + order_d - 1));
> array_y[kkk + order_d] := temporary;
> array_y_higher[1,kkk + order_d] := temporary;
> term := kkk + order_d - 1;
> adj2 := kkk + order_d - 1;
> adj3 := 2;
> while (term >= 1) do # do number 2
> if (adj3 <= order_d + 1) then # if number 3
> if (adj2 > 0) then # if number 4
> temporary := temporary / glob_h * convfp(adj2);
> else
> temporary := temporary;
> fi;# end if 4;
> array_y_higher[adj3,term] := temporary;
> fi;# end if 3;
> term := term - 1;
> adj2 := adj2 - 1;
> adj3 := adj3 + 1;
> od;# end do number 2
> fi;# end if 2
> fi;# end if 1;
> kkk := kkk + 1;
> od;# end do number 1;
> #BOTTOM ATOMALL
> #END OUTFILE4
> #BEGIN OUTFILE5
> #BOTTOM ATOMALL ???
> end;
atomall := proc()
local kkk, order_d, adj2, adj3, temporary, term;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_log10normmin, glob_total_exp_sec,
glob_optimal_expect_sec, glob_html_log, glob_good_digits, glob_max_opt_iter,
glob_dump, glob_djd_debug, glob_display_flag, glob_djd_debug2,
glob_sec_in_minute, glob_min_in_hour, glob_hours_in_day, glob_days_in_year,
glob_sec_in_hour, glob_sec_in_day, glob_sec_in_year, glob_almost_1,
glob_clock_sec, glob_clock_start_sec, glob_not_yet_finished,
glob_initial_pass, glob_not_yet_start_msg, glob_reached_optimal_h,
glob_optimal_done, glob_disp_incr, glob_h, glob_hmax, glob_hmin,
glob_hmin_init, glob_large_float, glob_last_good_h, glob_look_poles,
glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic,
glob_log10_abserr, glob_log10_relerr, glob_abserr, glob_relerr,
glob_max_hours, glob_max_iter, glob_max_rel_trunc_err, glob_max_trunc_err,
glob_no_eqs, glob_optimal_clock_start_sec, glob_optimal_start,
glob_small_float, glob_smallish_float, glob_unchanged_h_cnt, glob_warned,
glob_warned2, glob_max_sec, glob_orig_start_sec, glob_start,
glob_curr_iter_when_opt, glob_current_iter, glob_iter, glob_normmax,
glob_log10abserr, glob_log10relerr, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1, array_tmp2, array_tmp3_g, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
array_tmp1[1] := array_const_0D2[1]*array_x[1];
array_tmp2[1] := array_tmp1[1] + array_const_0D3[1];
array_tmp3[1] := sin(array_x[1]);
array_tmp3_g[1] := cos(array_x[1]);
omniout_str(ALWAYS, "WARNING: expt of linear to full series power see\
ms to have NO accuracy - needs more work.");
array_tmp4[1] := expt(array_tmp2[1], array_tmp3[1]);
array_tmp4_a1[1] := ln(array_tmp2[1]);
array_tmp4_a1[2] := array_tmp2[2]/array_tmp2[1];
array_tmp5[1] := array_const_0D0[1] + array_tmp4[1];
if not array_y_set_initial[1, 2] then
if 1 <= glob_max_terms then
temporary := array_tmp5[1]*expt(glob_h, 1)*factorial_3(0, 1);
array_y[2] := temporary;
array_y_higher[1, 2] := temporary;
temporary := temporary*1.0/glob_h;
array_y_higher[2, 1] := temporary
end if
end if;
kkk := 2;
array_tmp1[2] := array_const_0D2[1]*array_x[2];
array_tmp2[2] := array_tmp1[2];
array_tmp3[2] := array_tmp3_g[1]*array_x[2];
array_tmp3_g[2] := -array_tmp3[1]*array_x[2];
array_tmp4_a2[1] := (
array_tmp4_a1[1]*array_tmp3[2] + array_tmp4_a1[2]*array_tmp3[1])/
glob_h;
array_tmp4[2] := array_tmp4[1]*array_tmp4_a2[1]*glob_h;
array_tmp5[2] := array_tmp4[2];
if not array_y_set_initial[1, 3] then
if 2 <= glob_max_terms then
temporary := array_tmp5[2]*expt(glob_h, 1)*factorial_3(1, 2);
array_y[3] := temporary;
array_y_higher[1, 3] := temporary;
temporary := temporary*2.0/glob_h;
array_y_higher[2, 2] := temporary
end if
end if;
kkk := 3;
array_tmp3[3] := 1/2*array_tmp3_g[2]*array_x[2];
array_tmp3_g[3] := -1/2*array_tmp3[2]*array_x[2];
array_tmp4_a1[3] := -1/2*array_tmp4_a1[2]*array_tmp2[2]/array_tmp2[1];
array_tmp4_a2[2] := 2*ats(3, array_tmp3, array_tmp4_a1, 1)/glob_h;
array_tmp4[3] := 1/2*ats(2, array_tmp4, array_tmp4_a2, 1)*glob_h;
array_tmp5[3] := array_tmp4[3];
if not array_y_set_initial[1, 4] then
if 3 <= glob_max_terms then
temporary := array_tmp5[3]*expt(glob_h, 1)*factorial_3(2, 3);
array_y[4] := temporary;
array_y_higher[1, 4] := temporary;
temporary := temporary*3.0/glob_h;
array_y_higher[2, 3] := temporary
end if
end if;
kkk := 4;
array_tmp3[4] := 1/3*array_tmp3_g[3]*array_x[2];
array_tmp3_g[4] := -1/3*array_tmp3[3]*array_x[2];
array_tmp4_a1[4] := -2/3*array_tmp4_a1[3]*array_tmp2[2]/array_tmp2[1];
array_tmp4_a2[3] := 3*ats(4, array_tmp3, array_tmp4_a1, 1)/glob_h;
array_tmp4[4] := 1/3*ats(3, array_tmp4, array_tmp4_a2, 1)*glob_h;
array_tmp5[4] := array_tmp4[4];
if not array_y_set_initial[1, 5] then
if 4 <= glob_max_terms then
temporary := array_tmp5[4]*expt(glob_h, 1)*factorial_3(3, 4);
array_y[5] := temporary;
array_y_higher[1, 5] := temporary;
temporary := temporary*4.0/glob_h;
array_y_higher[2, 4] := temporary
end if
end if;
kkk := 5;
array_tmp3[5] := 1/4*array_tmp3_g[4]*array_x[2];
array_tmp3_g[5] := -1/4*array_tmp3[4]*array_x[2];
array_tmp4_a1[5] := -3/4*array_tmp4_a1[4]*array_tmp2[2]/array_tmp2[1];
array_tmp4_a2[4] := 4*ats(5, array_tmp3, array_tmp4_a1, 1)/glob_h;
array_tmp4[5] := 1/4*ats(4, array_tmp4, array_tmp4_a2, 1)*glob_h;
array_tmp5[5] := array_tmp4[5];
if not array_y_set_initial[1, 6] then
if 5 <= glob_max_terms then
temporary := array_tmp5[5]*expt(glob_h, 1)*factorial_3(4, 5);
array_y[6] := temporary;
array_y_higher[1, 6] := temporary;
temporary := temporary*5.0/glob_h;
array_y_higher[2, 5] := temporary
end if
end if;
kkk := 6;
while kkk <= glob_max_terms do
array_tmp3[kkk] := array_tmp3_g[kkk - 1]*array_x[2]/(kkk - 1);
array_tmp3_g[kkk] := -array_tmp3[kkk - 1]*array_x[2]/(kkk - 1);
array_tmp4_a1[kkk] := -array_tmp4_a1[kkk - 1]*array_tmp2[2]*
(kkk - 2)/(array_tmp2[1]*(kkk - 1));
array_tmp4_a2[kkk - 1] :=
ats(kkk, array_tmp3, array_tmp4_a1, 1)*(kkk - 1)/glob_h;
array_tmp4[kkk] :=
ats(kkk - 1, array_tmp4, array_tmp4_a2, 1)*glob_h/(kkk - 1);
array_tmp5[kkk] := array_tmp4[kkk];
order_d := 1;
if kkk + order_d + 1 <= glob_max_terms then
if not array_y_set_initial[1, kkk + order_d] then
temporary := array_tmp5[kkk]*expt(glob_h, order_d)*
factorial_3(kkk - 1, kkk + order_d - 1);
array_y[kkk + order_d] := temporary;
array_y_higher[1, kkk + order_d] := temporary;
term := kkk + order_d - 1;
adj2 := kkk + order_d - 1;
adj3 := 2;
while 1 <= term do
if adj3 <= order_d + 1 then
if 0 < adj2 then
temporary := temporary*convfp(adj2)/glob_h
else temporary := temporary
end if;
array_y_higher[adj3, term] := temporary
end if;
term := term - 1;
adj2 := adj2 - 1;
adj3 := adj3 + 1
end do
end if
end if;
kkk := kkk + 1
end do
end proc
> # End Function number 12
> #BEGIN ATS LIBRARY BLOCK
> # Begin Function number 2
> omniout_str := proc(iolevel,str)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then # if number 1
> printf("%s\n",str);
> fi;# end if 1;
> end;
omniout_str := proc(iolevel, str)
global glob_iolevel;
if iolevel <= glob_iolevel then printf("%s\n", str) end if
end proc
> # End Function number 2
> # Begin Function number 3
> omniout_str_noeol := proc(iolevel,str)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then # if number 1
> printf("%s",str);
> fi;# end if 1;
> end;
omniout_str_noeol := proc(iolevel, str)
global glob_iolevel;
if iolevel <= glob_iolevel then printf("%s", str) end if
end proc
> # End Function number 3
> # Begin Function number 4
> omniout_labstr := proc(iolevel,label,str)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then # if number 1
> print(label,str);
> fi;# end if 1;
> end;
omniout_labstr := proc(iolevel, label, str)
global glob_iolevel;
if iolevel <= glob_iolevel then print(label, str) end if
end proc
> # End Function number 4
> # Begin Function number 5
> omniout_float := proc(iolevel,prelabel,prelen,value,vallen,postlabel)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then # if number 1
> if vallen = 4 then
> printf("%-30s = %-42.4g %s \n",prelabel,value, postlabel);
> else
> printf("%-30s = %-42.32g %s \n",prelabel,value, postlabel);
> fi;# end if 1;
> fi;# end if 0;
> end;
omniout_float := proc(iolevel, prelabel, prelen, value, vallen, postlabel)
global glob_iolevel;
if iolevel <= glob_iolevel then
if vallen = 4 then
printf("%-30s = %-42.4g %s \n", prelabel, value, postlabel)
else printf("%-30s = %-42.32g %s \n", prelabel, value, postlabel)
end if
end if
end proc
> # End Function number 5
> # Begin Function number 6
> omniout_int := proc(iolevel,prelabel,prelen,value,vallen,postlabel)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then # if number 0
> if vallen = 5 then # if number 1
> printf("%-30s = %-32d %s\n",prelabel,value, postlabel);
> else
> printf("%-30s = %-32d %s \n",prelabel,value, postlabel);
> fi;# end if 1;
> fi;# end if 0;
> end;
omniout_int := proc(iolevel, prelabel, prelen, value, vallen, postlabel)
global glob_iolevel;
if iolevel <= glob_iolevel then
if vallen = 5 then
printf("%-30s = %-32d %s\n", prelabel, value, postlabel)
else printf("%-30s = %-32d %s \n", prelabel, value, postlabel)
end if
end if
end proc
> # End Function number 6
> # Begin Function number 7
> omniout_float_arr := proc(iolevel,prelabel,elemnt,prelen,value,vallen,postlabel)
> global glob_iolevel;
> if (glob_iolevel >= iolevel) then # if number 0
> print(prelabel,"[",elemnt,"]",value, postlabel);
> fi;# end if 0;
> end;
omniout_float_arr := proc(
iolevel, prelabel, elemnt, prelen, value, vallen, postlabel)
global glob_iolevel;
if iolevel <= glob_iolevel then
print(prelabel, "[", elemnt, "]", value, postlabel)
end if
end proc
> # End Function number 7
> # Begin Function number 8
> dump_series := proc(iolevel,dump_label,series_name,arr_series,numb)
> global glob_iolevel;
> local i;
> if (glob_iolevel >= iolevel) then # if number 0
> i := 1;
> while (i <= numb) do # do number 1
> print(dump_label,series_name
> ,i,arr_series[i]);
> i := i + 1;
> od;# end do number 1
> fi;# end if 0
> end;
dump_series := proc(iolevel, dump_label, series_name, arr_series, numb)
local i;
global glob_iolevel;
if iolevel <= glob_iolevel then
i := 1;
while i <= numb do
print(dump_label, series_name, i, arr_series[i]); i := i + 1
end do
end if
end proc
> # End Function number 8
> # Begin Function number 9
> dump_series_2 := proc(iolevel,dump_label,series_name2,arr_series2,numb,subnum,arr_x)
> global glob_iolevel;
> local i,sub,ts_term;
> if (glob_iolevel >= iolevel) then # if number 0
> sub := 1;
> while (sub <= subnum) do # do number 1
> i := 1;
> while (i <= numb) do # do number 2
> print(dump_label,series_name2,sub,i,arr_series2[sub,i]);
> od;# end do number 2;
> sub := sub + 1;
> od;# end do number 1;
> fi;# end if 0;
> end;
dump_series_2 := proc(
iolevel, dump_label, series_name2, arr_series2, numb, subnum, arr_x)
local i, sub, ts_term;
global glob_iolevel;
if iolevel <= glob_iolevel then
sub := 1;
while sub <= subnum do
i := 1;
while i <= numb do print(dump_label, series_name2, sub, i,
arr_series2[sub, i])
end do;
sub := sub + 1
end do
end if
end proc
> # End Function number 9
> # Begin Function number 10
> cs_info := proc(iolevel,str)
> global glob_iolevel,glob_correct_start_flag,glob_h,glob_reached_optimal_h;
> if (glob_iolevel >= iolevel) then # if number 0
> print("cs_info " , str , " glob_correct_start_flag = " , glob_correct_start_flag , "glob_h := " , glob_h , "glob_reached_optimal_h := " , glob_reached_optimal_h)
> fi;# end if 0;
> end;
cs_info := proc(iolevel, str)
global
glob_iolevel, glob_correct_start_flag, glob_h, glob_reached_optimal_h;
if iolevel <= glob_iolevel then print("cs_info ", str,
" glob_correct_start_flag = ", glob_correct_start_flag,
"glob_h := ", glob_h, "glob_reached_optimal_h := ",
glob_reached_optimal_h)
end if
end proc
> # End Function number 10
> # Begin Function number 11
> logitem_time := proc(fd,secs_in)
> global glob_sec_in_day, glob_sec_in_hour, glob_sec_in_minute, glob_sec_in_year;
> local days_int, hours_int,minutes_int, sec_int, sec_temp, years_int;
> fprintf(fd,"| ");
> if (secs_in >= 0) then # if number 0
> years_int := trunc(secs_in / glob_sec_in_year);
> sec_temp := (trunc(secs_in) mod trunc(glob_sec_in_year));
> days_int := trunc(sec_temp / glob_sec_in_day) ;
> sec_temp := (sec_temp mod trunc(glob_sec_in_day)) ;
> hours_int := trunc(sec_temp / glob_sec_in_hour);
> sec_temp := (sec_temp mod trunc(glob_sec_in_hour));
> minutes_int := trunc(sec_temp / glob_sec_in_minute);
> sec_int := (sec_temp mod trunc(glob_sec_in_minute));
> if (years_int > 0) then # if number 1
> fprintf(fd,"%d Years %d Days %d Hours %d Minutes %d Seconds",years_int,days_int,hours_int,minutes_int,sec_int);
> elif
> (days_int > 0) then # if number 2
> fprintf(fd,"%d Days %d Hours %d Minutes %d Seconds",days_int,hours_int,minutes_int,sec_int);
> elif
> (hours_int > 0) then # if number 3
> fprintf(fd,"%d Hours %d Minutes %d Seconds",hours_int,minutes_int,sec_int);
> elif
> (minutes_int > 0) then # if number 4
> fprintf(fd,"%d Minutes %d Seconds",minutes_int,sec_int);
> else
> fprintf(fd,"%d Seconds",sec_int);
> fi;# end if 4
> else
> fprintf(fd," Unknown");
> fi;# end if 3
> fprintf(fd," | \n");
> end;
logitem_time := proc(fd, secs_in)
local days_int, hours_int, minutes_int, sec_int, sec_temp, years_int;
global
glob_sec_in_day, glob_sec_in_hour, glob_sec_in_minute, glob_sec_in_year;
fprintf(fd, "");
if 0 <= secs_in then
years_int := trunc(secs_in/glob_sec_in_year);
sec_temp := trunc(secs_in) mod trunc(glob_sec_in_year);
days_int := trunc(sec_temp/glob_sec_in_day);
sec_temp := sec_temp mod trunc(glob_sec_in_day);
hours_int := trunc(sec_temp/glob_sec_in_hour);
sec_temp := sec_temp mod trunc(glob_sec_in_hour);
minutes_int := trunc(sec_temp/glob_sec_in_minute);
sec_int := sec_temp mod trunc(glob_sec_in_minute);
if 0 < years_int then fprintf(fd,
"%d Years %d Days %d Hours %d Minutes %d Seconds", years_int,
days_int, hours_int, minutes_int, sec_int)
elif 0 < days_int then fprintf(fd,
"%d Days %d Hours %d Minutes %d Seconds", days_int, hours_int,
minutes_int, sec_int)
elif 0 < hours_int then fprintf(fd,
"%d Hours %d Minutes %d Seconds", hours_int, minutes_int,
sec_int)
elif 0 < minutes_int then
fprintf(fd, "%d Minutes %d Seconds", minutes_int, sec_int)
else fprintf(fd, "%d Seconds", sec_int)
end if
else fprintf(fd, " Unknown")
end if;
fprintf(fd, " | \n")
end proc
> # End Function number 11
> # Begin Function number 12
> omniout_timestr := proc(secs_in)
> global glob_sec_in_day, glob_sec_in_hour, glob_sec_in_minute, glob_sec_in_year;
> local days_int, hours_int,minutes_int, sec_int, sec_temp, years_int;
> if (secs_in >= 0) then # if number 3
> years_int := trunc(secs_in / glob_sec_in_year);
> sec_temp := (trunc(secs_in) mod trunc(glob_sec_in_year));
> days_int := trunc(sec_temp / glob_sec_in_day) ;
> sec_temp := (sec_temp mod trunc(glob_sec_in_day)) ;
> hours_int := trunc(sec_temp / glob_sec_in_hour);
> sec_temp := (sec_temp mod trunc(glob_sec_in_hour));
> minutes_int := trunc(sec_temp / glob_sec_in_minute);
> sec_int := (sec_temp mod trunc(glob_sec_in_minute));
> if (years_int > 0) then # if number 4
> printf(" = %d Years %d Days %d Hours %d Minutes %d Seconds\n",years_int,days_int,hours_int,minutes_int,sec_int);
> elif
> (days_int > 0) then # if number 5
> printf(" = %d Days %d Hours %d Minutes %d Seconds\n",days_int,hours_int,minutes_int,sec_int);
> elif
> (hours_int > 0) then # if number 6
> printf(" = %d Hours %d Minutes %d Seconds\n",hours_int,minutes_int,sec_int);
> elif
> (minutes_int > 0) then # if number 7
> printf(" = %d Minutes %d Seconds\n",minutes_int,sec_int);
> else
> printf(" = %d Seconds\n",sec_int);
> fi;# end if 7
> else
> printf(" Unknown\n");
> fi;# end if 6
> end;
omniout_timestr := proc(secs_in)
local days_int, hours_int, minutes_int, sec_int, sec_temp, years_int;
global
glob_sec_in_day, glob_sec_in_hour, glob_sec_in_minute, glob_sec_in_year;
if 0 <= secs_in then
years_int := trunc(secs_in/glob_sec_in_year);
sec_temp := trunc(secs_in) mod trunc(glob_sec_in_year);
days_int := trunc(sec_temp/glob_sec_in_day);
sec_temp := sec_temp mod trunc(glob_sec_in_day);
hours_int := trunc(sec_temp/glob_sec_in_hour);
sec_temp := sec_temp mod trunc(glob_sec_in_hour);
minutes_int := trunc(sec_temp/glob_sec_in_minute);
sec_int := sec_temp mod trunc(glob_sec_in_minute);
if 0 < years_int then printf(
" = %d Years %d Days %d Hours %d Minutes %d Seconds\n",
years_int, days_int, hours_int, minutes_int, sec_int)
elif 0 < days_int then printf(
" = %d Days %d Hours %d Minutes %d Seconds\n", days_int,
hours_int, minutes_int, sec_int)
elif 0 < hours_int then printf(
" = %d Hours %d Minutes %d Seconds\n", hours_int, minutes_int,
sec_int)
elif 0 < minutes_int then
printf(" = %d Minutes %d Seconds\n", minutes_int, sec_int)
else printf(" = %d Seconds\n", sec_int)
end if
else printf(" Unknown\n")
end if
end proc
> # End Function number 12
> # Begin Function number 13
> ats := proc(mmm_ats,arr_a,arr_b,jjj_ats)
> local iii_ats, lll_ats,ma_ats, ret_ats;
> ret_ats := 0.0;
> if (jjj_ats <= mmm_ats) then # if number 6
> ma_ats := mmm_ats + 1;
> iii_ats := jjj_ats;
> while (iii_ats <= mmm_ats) do # do number 1
> lll_ats := ma_ats - iii_ats;
> ret_ats := ret_ats + arr_a[iii_ats]*arr_b[lll_ats];
> iii_ats := iii_ats + 1;
> od;# end do number 1
> fi;# end if 6;
> ret_ats;
> end;
ats := proc(mmm_ats, arr_a, arr_b, jjj_ats)
local iii_ats, lll_ats, ma_ats, ret_ats;
ret_ats := 0.;
if jjj_ats <= mmm_ats then
ma_ats := mmm_ats + 1;
iii_ats := jjj_ats;
while iii_ats <= mmm_ats do
lll_ats := ma_ats - iii_ats;
ret_ats := ret_ats + arr_a[iii_ats]*arr_b[lll_ats];
iii_ats := iii_ats + 1
end do
end if;
ret_ats
end proc
> # End Function number 13
> # Begin Function number 14
> att := proc(mmm_att,arr_aa,arr_bb,jjj_att)
> global glob_max_terms;
> local al_att, iii_att,lll_att, ma_att, ret_att;
> ret_att := 0.0;
> if (jjj_att <= mmm_att) then # if number 6
> ma_att := mmm_att + 2;
> iii_att := jjj_att;
> while (iii_att <= mmm_att) do # do number 1
> lll_att := ma_att - iii_att;
> al_att := (lll_att - 1);
> if (lll_att <= glob_max_terms) then # if number 7
> ret_att := ret_att + arr_aa[iii_att]*arr_bb[lll_att]* convfp(al_att);
> fi;# end if 7;
> iii_att := iii_att + 1;
> od;# end do number 1;
> ret_att := ret_att / convfp(mmm_att) ;
> fi;# end if 6;
> ret_att;
> end;
att := proc(mmm_att, arr_aa, arr_bb, jjj_att)
local al_att, iii_att, lll_att, ma_att, ret_att;
global glob_max_terms;
ret_att := 0.;
if jjj_att <= mmm_att then
ma_att := mmm_att + 2;
iii_att := jjj_att;
while iii_att <= mmm_att do
lll_att := ma_att - iii_att;
al_att := lll_att - 1;
if lll_att <= glob_max_terms then ret_att :=
ret_att + arr_aa[iii_att]*arr_bb[lll_att]*convfp(al_att)
end if;
iii_att := iii_att + 1
end do;
ret_att := ret_att/convfp(mmm_att)
end if;
ret_att
end proc
> # End Function number 14
> # Begin Function number 15
> display_pole := proc()
> global ALWAYS,glob_display_flag, glob_large_float, array_pole;
> if ((array_pole[1] <> glob_large_float) and (array_pole[1] > 0.0) and (array_pole[2] <> glob_large_float) and (array_pole[2]> 0.0) and glob_display_flag) then # if number 6
> omniout_float(ALWAYS,"Radius of convergence ",4, array_pole[1],4," ");
> omniout_float(ALWAYS,"Order of pole ",4, array_pole[2],4," ");
> fi;# end if 6
> end;
display_pole := proc()
global ALWAYS, glob_display_flag, glob_large_float, array_pole;
if array_pole[1] <> glob_large_float and 0. < array_pole[1] and
array_pole[2] <> glob_large_float and 0. < array_pole[2] and
glob_display_flag then
omniout_float(ALWAYS, "Radius of convergence ", 4,
array_pole[1], 4, " ");
omniout_float(ALWAYS, "Order of pole ", 4,
array_pole[2], 4, " ")
end if
end proc
> # End Function number 15
> # Begin Function number 16
> logditto := proc(file)
> fprintf(file,"");
> fprintf(file,"ditto");
> fprintf(file," | ");
> end;
logditto := proc(file)
fprintf(file, ""); fprintf(file, "ditto"); fprintf(file, " | ")
end proc
> # End Function number 16
> # Begin Function number 17
> logitem_integer := proc(file,n)
> fprintf(file,"");
> fprintf(file,"%d",n);
> fprintf(file," | ");
> end;
logitem_integer := proc(file, n)
fprintf(file, ""); fprintf(file, "%d", n); fprintf(file, " | ")
end proc
> # End Function number 17
> # Begin Function number 18
> logitem_str := proc(file,str)
> fprintf(file,"");
> fprintf(file,str);
> fprintf(file," | ");
> end;
logitem_str := proc(file, str)
fprintf(file, ""); fprintf(file, str); fprintf(file, " | ")
end proc
> # End Function number 18
> # Begin Function number 19
> logitem_good_digits := proc(file,rel_error)
> global glob_small_float;
> local good_digits;
> fprintf(file,"");
> if (rel_error <> -1.0) then # if number 6
> if (rel_error > + 0.0000000000000000000000000000000001) then # if number 7
> good_digits := 1-trunc(log10(rel_error));
> fprintf(file,"%d",good_digits);
> else
> good_digits := Digits;
> fprintf(file,"%d",good_digits);
> fi;# end if 7;
> else
> fprintf(file,"Unknown");
> fi;# end if 6;
> fprintf(file," | ");
> end;
logitem_good_digits := proc(file, rel_error)
local good_digits;
global glob_small_float;
fprintf(file, "");
if rel_error <> -1.0 then
if 0.1*10^(-33) < rel_error then
good_digits := 1 - trunc(log10(rel_error));
fprintf(file, "%d", good_digits)
else good_digits := Digits; fprintf(file, "%d", good_digits)
end if
else fprintf(file, "Unknown")
end if;
fprintf(file, " | ")
end proc
> # End Function number 19
> # Begin Function number 20
> log_revs := proc(file,revs)
> fprintf(file,revs);
> end;
log_revs := proc(file, revs) fprintf(file, revs) end proc
> # End Function number 20
> # Begin Function number 21
> logitem_float := proc(file,x)
> fprintf(file,"");
> fprintf(file,"%g",x);
> fprintf(file," | ");
> end;
logitem_float := proc(file, x)
fprintf(file, ""); fprintf(file, "%g", x); fprintf(file, " | ")
end proc
> # End Function number 21
> # Begin Function number 22
> logitem_pole := proc(file,pole)
> fprintf(file,"");
> if (pole = 0) then # if number 6
> fprintf(file,"NA");
> elif
> (pole = 1) then # if number 7
> fprintf(file,"Real");
> elif
> (pole = 2) then # if number 8
> fprintf(file,"Complex");
> else
> fprintf(file,"No Pole");
> fi;# end if 8
> fprintf(file," | ");
> end;
logitem_pole := proc(file, pole)
fprintf(file, "");
if pole = 0 then fprintf(file, "NA")
elif pole = 1 then fprintf(file, "Real")
elif pole = 2 then fprintf(file, "Complex")
else fprintf(file, "No Pole")
end if;
fprintf(file, " | ")
end proc
> # End Function number 22
> # Begin Function number 23
> logstart := proc(file)
> fprintf(file,"");
> end;
logstart := proc(file) fprintf(file, "
") end proc
> # End Function number 23
> # Begin Function number 24
> logend := proc(file)
> fprintf(file,"
\n");
> end;
logend := proc(file) fprintf(file, "\n") end proc
> # End Function number 24
> # Begin Function number 25
> chk_data := proc()
> global glob_max_iter,ALWAYS, glob_max_terms;
> local errflag;
> errflag := false;
> if ((glob_max_terms < 15) or (glob_max_terms > 512)) then # if number 8
> omniout_str(ALWAYS,"Illegal max_terms = -- Using 30");
> glob_max_terms := 30;
> fi;# end if 8;
> if (glob_max_iter < 2) then # if number 8
> omniout_str(ALWAYS,"Illegal max_iter");
> errflag := true;
> fi;# end if 8;
> if (errflag) then # if number 8
> quit;
> fi;# end if 8
> end;
chk_data := proc()
local errflag;
global glob_max_iter, ALWAYS, glob_max_terms;
errflag := false;
if glob_max_terms < 15 or 512 < glob_max_terms then
omniout_str(ALWAYS, "Illegal max_terms = -- Using 30");
glob_max_terms := 30
end if;
if glob_max_iter < 2 then
omniout_str(ALWAYS, "Illegal max_iter"); errflag := true
end if;
if errflag then quit end if
end proc
> # End Function number 25
> # Begin Function number 26
> comp_expect_sec := proc(t_end2,t_start2,t2,clock_sec2)
> global glob_small_float;
> local ms2, rrr, sec_left, sub1, sub2;
> ;
> ms2 := clock_sec2;
> sub1 := (t_end2-t_start2);
> sub2 := (t2-t_start2);
> if (sub1 = 0.0) then # if number 8
> sec_left := 0.0;
> else
> if (sub2 > 0.0) then # if number 9
> rrr := (sub1/sub2);
> sec_left := rrr * ms2 - ms2;
> else
> sec_left := 0.0;
> fi;# end if 9
> fi;# end if 8;
> sec_left;
> end;
comp_expect_sec := proc(t_end2, t_start2, t2, clock_sec2)
local ms2, rrr, sec_left, sub1, sub2;
global glob_small_float;
ms2 := clock_sec2;
sub1 := t_end2 - t_start2;
sub2 := t2 - t_start2;
if sub1 = 0. then sec_left := 0.
else
if 0. < sub2 then rrr := sub1/sub2; sec_left := rrr*ms2 - ms2
else sec_left := 0.
end if
end if;
sec_left
end proc
> # End Function number 26
> # Begin Function number 27
> comp_percent := proc(t_end2,t_start2, t2)
> global glob_small_float;
> local rrr, sub1, sub2;
> sub1 := (t_end2-t_start2);
> sub2 := (t2-t_start2);
> if (sub2 > glob_small_float) then # if number 8
> rrr := (100.0*sub2)/sub1;
> else
> rrr := 0.0;
> fi;# end if 8;
> rrr;
> end;
comp_percent := proc(t_end2, t_start2, t2)
local rrr, sub1, sub2;
global glob_small_float;
sub1 := t_end2 - t_start2;
sub2 := t2 - t_start2;
if glob_small_float < sub2 then rrr := 100.0*sub2/sub1
else rrr := 0.
end if;
rrr
end proc
> # End Function number 27
> # Begin Function number 28
> factorial_2 := proc(nnn)
> nnn!;
> end;
factorial_2 := proc(nnn) nnn! end proc
> # End Function number 28
> # Begin Function number 29
> factorial_1 := proc(nnn)
> global glob_max_terms,array_fact_1;
> local ret;
> if (nnn <= glob_max_terms) then # if number 8
> if (array_fact_1[nnn] = 0) then # if number 9
> ret := factorial_2(nnn);
> array_fact_1[nnn] := ret;
> else
> ret := array_fact_1[nnn];
> fi;# end if 9;
> else
> ret := factorial_2(nnn);
> fi;# end if 8;
> ret;
> end;
factorial_1 := proc(nnn)
local ret;
global glob_max_terms, array_fact_1;
if nnn <= glob_max_terms then
if array_fact_1[nnn] = 0 then
ret := factorial_2(nnn); array_fact_1[nnn] := ret
else ret := array_fact_1[nnn]
end if
else ret := factorial_2(nnn)
end if;
ret
end proc
> # End Function number 29
> # Begin Function number 30
> factorial_3 := proc(mmm,nnn)
> global glob_max_terms,array_fact_2;
> local ret;
> if ((nnn <= glob_max_terms) and (mmm <= glob_max_terms)) then # if number 8
> if (array_fact_2[mmm,nnn] = 0) then # if number 9
> ret := factorial_1(mmm)/factorial_1(nnn);
> array_fact_2[mmm,nnn] := ret;
> else
> ret := array_fact_2[mmm,nnn];
> fi;# end if 9;
> else
> ret := factorial_2(mmm)/factorial_2(nnn);
> fi;# end if 8;
> ret;
> end;
factorial_3 := proc(mmm, nnn)
local ret;
global glob_max_terms, array_fact_2;
if nnn <= glob_max_terms and mmm <= glob_max_terms then
if array_fact_2[mmm, nnn] = 0 then
ret := factorial_1(mmm)/factorial_1(nnn);
array_fact_2[mmm, nnn] := ret
else ret := array_fact_2[mmm, nnn]
end if
else ret := factorial_2(mmm)/factorial_2(nnn)
end if;
ret
end proc
> # End Function number 30
> # Begin Function number 31
> convfp := proc(mmm)
> (mmm);
> end;
convfp := proc(mmm) mmm end proc
> # End Function number 31
> # Begin Function number 32
> convfloat := proc(mmm)
> (mmm);
> end;
convfloat := proc(mmm) mmm end proc
> # End Function number 32
> # Begin Function number 33
> elapsed_time_seconds := proc()
> time();
> end;
elapsed_time_seconds := proc() time() end proc
> # End Function number 33
> # Begin Function number 34
> omniabs := proc(x)
> abs(x);
> end;
omniabs := proc(x) abs(x) end proc
> # End Function number 34
> # Begin Function number 35
> expt := proc(x,y)
> (x^y);
> end;
expt := proc(x, y) x^y end proc
> # End Function number 35
> # Begin Function number 36
> estimated_needed_step_error := proc(x_start,x_end,estimated_h,estimated_answer)
> local desired_abs_gbl_error,range,estimated_steps,step_error;
> global glob_desired_digits_correct,ALWAYS;
> omniout_float(ALWAYS,"glob_desired_digits_correct",32,glob_desired_digits_correct,32,"");
> desired_abs_gbl_error := expt(10.0,- glob_desired_digits_correct) * omniabs(estimated_answer);
> omniout_float(ALWAYS,"desired_abs_gbl_error",32,desired_abs_gbl_error,32,"");
> range := (x_end - x_start);
> omniout_float(ALWAYS,"range",32,range,32,"");
> estimated_steps := range / estimated_h;
> omniout_float(ALWAYS,"estimated_steps",32,estimated_steps,32,"");
> step_error := omniabs(desired_abs_gbl_error / estimated_steps);
> omniout_float(ALWAYS,"step_error",32,step_error,32,"");
> (step_error);;
> end;
estimated_needed_step_error := proc(
x_start, x_end, estimated_h, estimated_answer)
local desired_abs_gbl_error, range, estimated_steps, step_error;
global glob_desired_digits_correct, ALWAYS;
omniout_float(ALWAYS, "glob_desired_digits_correct", 32,
glob_desired_digits_correct, 32, "");
desired_abs_gbl_error :=
expt(10.0, -glob_desired_digits_correct)*omniabs(estimated_answer);
omniout_float(ALWAYS, "desired_abs_gbl_error", 32,
desired_abs_gbl_error, 32, "");
range := x_end - x_start;
omniout_float(ALWAYS, "range", 32, range, 32, "");
estimated_steps := range/estimated_h;
omniout_float(ALWAYS, "estimated_steps", 32, estimated_steps, 32, "");
step_error := omniabs(desired_abs_gbl_error/estimated_steps);
omniout_float(ALWAYS, "step_error", 32, step_error, 32, "");
step_error
end proc
> # End Function number 36
> #END ATS LIBRARY BLOCK
> #BEGIN USER DEF BLOCK
> #BEGIN USER DEF BLOCK
> exact_soln_y := proc(x)
> return(0.0);
> end;
exact_soln_y := proc(x) return 0. end proc
> #END USER DEF BLOCK
> #END USER DEF BLOCK
> #END OUTFILE5
> # Begin Function number 2
> main := proc()
> #BEGIN OUTFIEMAIN
> local d1,d2,d3,d4,est_err_2,niii,done_once,
> term,ord,order_diff,term_no,html_log_file,iiif,jjjf,
> rows,r_order,sub_iter,calc_term,iii,temp_sum,current_iter,
> x_start,x_end
> ,it, log10norm, max_terms, opt_iter, tmp,subiter, est_needed_step_err,value3,min_value,est_answer,best_h,found_h,repeat_it;
> global
> glob_max_terms,
> glob_iolevel,
> ALWAYS,
> INFO,
> DEBUGL,
> DEBUGMASSIVE,
> #Top Generate Globals Decl
> MAX_UNCHANGED,
> glob_check_sign,
> glob_desired_digits_correct,
> glob_max_value3,
> glob_ratio_of_radius,
> glob_percent_done,
> glob_subiter_method,
> glob_log10normmin,
> glob_total_exp_sec,
> glob_optimal_expect_sec,
> glob_html_log,
> glob_good_digits,
> glob_max_opt_iter,
> glob_dump,
> glob_djd_debug,
> glob_display_flag,
> glob_djd_debug2,
> glob_sec_in_minute,
> glob_min_in_hour,
> glob_hours_in_day,
> glob_days_in_year,
> glob_sec_in_hour,
> glob_sec_in_day,
> glob_sec_in_year,
> glob_almost_1,
> glob_clock_sec,
> glob_clock_start_sec,
> glob_not_yet_finished,
> glob_initial_pass,
> glob_not_yet_start_msg,
> glob_reached_optimal_h,
> glob_optimal_done,
> glob_disp_incr,
> glob_h,
> glob_hmax,
> glob_hmin,
> glob_hmin_init,
> glob_large_float,
> glob_last_good_h,
> glob_look_poles,
> glob_neg_h,
> glob_display_interval,
> glob_next_display,
> glob_dump_analytic,
> glob_log10_abserr,
> glob_log10_relerr,
> glob_abserr,
> glob_relerr,
> glob_max_hours,
> glob_max_iter,
> glob_max_rel_trunc_err,
> glob_max_trunc_err,
> glob_no_eqs,
> glob_optimal_clock_start_sec,
> glob_optimal_start,
> glob_small_float,
> glob_smallish_float,
> glob_unchanged_h_cnt,
> glob_warned,
> glob_warned2,
> glob_max_sec,
> glob_orig_start_sec,
> glob_start,
> glob_curr_iter_when_opt,
> glob_current_iter,
> glob_iter,
> glob_normmax,
> glob_log10abserr,
> glob_log10relerr,
> glob_max_minutes,
> #Bottom Generate Globals Decl
> #BEGIN CONST
> array_const_1,
> array_const_0D0,
> array_const_0D2,
> array_const_0D3,
> #END CONST
> array_y_init,
> array_norms,
> array_fact_1,
> array_pole,
> array_1st_rel_error,
> array_last_rel_error,
> array_type_pole,
> array_y,
> array_x,
> array_tmp0,
> array_tmp1,
> array_tmp2,
> array_tmp3_g,
> array_tmp3,
> array_tmp4_c1,
> array_tmp4_a1,
> array_tmp4_a2,
> array_tmp4,
> array_tmp5,
> array_m1,
> array_y_higher,
> array_y_higher_work,
> array_y_higher_work2,
> array_y_set_initial,
> array_poles,
> array_real_pole,
> array_complex_pole,
> array_fact_2,
> glob_last;
> glob_last;
> ALWAYS := 1;
> INFO := 2;
> DEBUGL := 3;
> DEBUGMASSIVE := 4;
> glob_iolevel := INFO;
> glob_max_terms := 30;
> glob_iolevel := 5;
> ALWAYS := 1;
> INFO := 2;
> DEBUGL := 3;
> DEBUGMASSIVE := 4;
> MAX_UNCHANGED := 10;
> glob_check_sign := 1.0;
> glob_desired_digits_correct := 8.0;
> glob_max_value3 := 0.0;
> glob_ratio_of_radius := 0.01;
> glob_percent_done := 0.0;
> glob_subiter_method := 3;
> glob_log10normmin := 0.1;
> glob_total_exp_sec := 0.1;
> glob_optimal_expect_sec := 0.1;
> glob_html_log := true;
> glob_good_digits := 0;
> glob_max_opt_iter := 10;
> glob_dump := false;
> glob_djd_debug := true;
> glob_display_flag := true;
> glob_djd_debug2 := true;
> glob_sec_in_minute := 60;
> glob_min_in_hour := 60;
> glob_hours_in_day := 24;
> glob_days_in_year := 365;
> glob_sec_in_hour := 3600;
> glob_sec_in_day := 86400;
> glob_sec_in_year := 31536000;
> glob_almost_1 := 0.9990;
> glob_clock_sec := 0.0;
> glob_clock_start_sec := 0.0;
> glob_not_yet_finished := true;
> glob_initial_pass := true;
> glob_not_yet_start_msg := true;
> glob_reached_optimal_h := false;
> glob_optimal_done := false;
> glob_disp_incr := 0.1;
> glob_h := 0.1;
> glob_hmax := 1.0;
> glob_hmin := 0.00000000001;
> glob_hmin_init := 0.001;
> glob_large_float := 9.0e100;
> glob_last_good_h := 0.1;
> glob_look_poles := false;
> glob_neg_h := false;
> glob_display_interval := 0.0;
> glob_next_display := 0.0;
> glob_dump_analytic := false;
> glob_log10_abserr := 0.1e-10;
> glob_log10_relerr := 0.1e-10;
> glob_abserr := 0.1e-10;
> glob_relerr := 0.1e-10;
> glob_max_hours := 0.0;
> glob_max_iter := 1000;
> glob_max_rel_trunc_err := 0.1e-10;
> glob_max_trunc_err := 0.1e-10;
> glob_no_eqs := 0;
> glob_optimal_clock_start_sec := 0.0;
> glob_optimal_start := 0.0;
> glob_small_float := 0.1e-50;
> glob_smallish_float := 0.1e-100;
> glob_unchanged_h_cnt := 0;
> glob_warned := false;
> glob_warned2 := false;
> glob_max_sec := 10000.0;
> glob_orig_start_sec := 0.0;
> glob_start := 0;
> glob_curr_iter_when_opt := 0;
> glob_current_iter := 0;
> glob_iter := 0;
> glob_normmax := 0.0;
> glob_log10abserr := 0.0;
> glob_log10relerr := 0.0;
> glob_max_minutes := 0.0;
> #Write Set Defaults
> glob_orig_start_sec := elapsed_time_seconds();
> MAX_UNCHANGED := 10;
> glob_curr_iter_when_opt := 0;
> glob_display_flag := true;
> glob_no_eqs := 1;
> glob_iter := -1;
> opt_iter := -1;
> glob_max_iter := 50000;
> glob_max_hours := 0.0;
> glob_max_minutes := 15.0;
> omniout_str(ALWAYS,"##############ECHO OF PROBLEM#################");
> omniout_str(ALWAYS,"##############temp/expt_lin_sinpostode.ode#################");
> omniout_str(ALWAYS,"diff ( y , x , 1 ) = expt((0.2 * x + 0.3) , sin(x));");
> omniout_str(ALWAYS,"!");
> omniout_str(ALWAYS,"#BEGIN FIRST INPUT BLOCK");
> omniout_str(ALWAYS,"Digits:=32;");
> omniout_str(ALWAYS,"max_terms:=30;");
> omniout_str(ALWAYS,"!");
> omniout_str(ALWAYS,"#END FIRST INPUT BLOCK");
> omniout_str(ALWAYS,"#BEGIN SECOND INPUT BLOCK");
> omniout_str(ALWAYS,"x_start := 0.1;");
> omniout_str(ALWAYS,"x_end := 5.0 ;");
> omniout_str(ALWAYS,"array_y_init[0 + 1] := exact_soln_y(x_start);");
> omniout_str(ALWAYS,"glob_h := 0.05;");
> omniout_str(ALWAYS,"glob_look_poles := true;");
> omniout_str(ALWAYS,"glob_max_iter := 1000000;");
> omniout_str(ALWAYS,"#END SECOND INPUT BLOCK");
> omniout_str(ALWAYS,"#BEGIN OVERRIDE BLOCK");
> omniout_str(ALWAYS,"glob_desired_digits_correct:=10;");
> omniout_str(ALWAYS,"glob_display_interval:=0.001;");
> omniout_str(ALWAYS,"glob_look_poles:=true;");
> omniout_str(ALWAYS,"glob_max_iter:=10000000;");
> omniout_str(ALWAYS,"glob_max_minutes:=3;");
> omniout_str(ALWAYS,"glob_subiter_method:=3;");
> omniout_str(ALWAYS,"#END OVERRIDE BLOCK");
> omniout_str(ALWAYS,"!");
> omniout_str(ALWAYS,"#BEGIN USER DEF BLOCK");
> omniout_str(ALWAYS,"exact_soln_y := proc(x)");
> omniout_str(ALWAYS,"return(0.0);");
> omniout_str(ALWAYS,"end;");
> omniout_str(ALWAYS,"#END USER DEF BLOCK");
> omniout_str(ALWAYS,"#######END OF ECHO OF PROBLEM#################");
> glob_unchanged_h_cnt := 0;
> glob_warned := false;
> glob_warned2 := false;
> glob_small_float := 1.0e-200;
> glob_smallish_float := 1.0e-64;
> glob_large_float := 1.0e100;
> glob_almost_1 := 0.99;
> glob_log10_abserr := -8.0;
> glob_log10_relerr := -8.0;
> glob_hmax := 0.01;
> #BEGIN FIRST INPUT BLOCK
> #BEGIN FIRST INPUT BLOCK
> Digits:=32;
> max_terms:=30;
> #END FIRST INPUT BLOCK
> #START OF INITS AFTER INPUT BLOCK
> glob_max_terms := max_terms;
> glob_html_log := true;
> #END OF INITS AFTER INPUT BLOCK
> array_y_init:= Array(0..(max_terms + 1),[]);
> array_norms:= Array(0..(max_terms + 1),[]);
> array_fact_1:= Array(0..(max_terms + 1),[]);
> array_pole:= Array(0..(max_terms + 1),[]);
> array_1st_rel_error:= Array(0..(max_terms + 1),[]);
> array_last_rel_error:= Array(0..(max_terms + 1),[]);
> array_type_pole:= Array(0..(max_terms + 1),[]);
> array_y:= Array(0..(max_terms + 1),[]);
> array_x:= Array(0..(max_terms + 1),[]);
> array_tmp0:= Array(0..(max_terms + 1),[]);
> array_tmp1:= Array(0..(max_terms + 1),[]);
> array_tmp2:= Array(0..(max_terms + 1),[]);
> array_tmp3_g:= Array(0..(max_terms + 1),[]);
> array_tmp3:= Array(0..(max_terms + 1),[]);
> array_tmp4_c1:= Array(0..(max_terms + 1),[]);
> array_tmp4_a1:= Array(0..(max_terms + 1),[]);
> array_tmp4_a2:= Array(0..(max_terms + 1),[]);
> array_tmp4:= Array(0..(max_terms + 1),[]);
> array_tmp5:= Array(0..(max_terms + 1),[]);
> array_m1:= Array(0..(max_terms + 1),[]);
> array_y_higher := Array(0..(2+ 1) ,(0..max_terms+ 1),[]);
> array_y_higher_work := Array(0..(2+ 1) ,(0..max_terms+ 1),[]);
> array_y_higher_work2 := Array(0..(2+ 1) ,(0..max_terms+ 1),[]);
> array_y_set_initial := Array(0..(2+ 1) ,(0..max_terms+ 1),[]);
> array_poles := Array(0..(1+ 1) ,(0..3+ 1),[]);
> array_real_pole := Array(0..(1+ 1) ,(0..3+ 1),[]);
> array_complex_pole := Array(0..(1+ 1) ,(0..3+ 1),[]);
> array_fact_2 := Array(0..(max_terms+ 1) ,(0..max_terms+ 1),[]);
> term := 1;
> while (term <= max_terms) do # do number 2
> array_y_init[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_norms[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_fact_1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_pole[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_1st_rel_error[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_last_rel_error[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_type_pole[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_y[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_x[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp0[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp2[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp3_g[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp3[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp4_c1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp4_a1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp4_a2[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp4[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_tmp5[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> term := 1;
> while (term <= max_terms) do # do number 2
> array_m1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> ord := 1;
> while (ord <=2) do # do number 2
> term := 1;
> while (term <= max_terms) do # do number 3
> array_y_higher[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3;
> ord := ord + 1;
> od;# end do number 2;
> ord := 1;
> while (ord <=2) do # do number 2
> term := 1;
> while (term <= max_terms) do # do number 3
> array_y_higher_work[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3;
> ord := ord + 1;
> od;# end do number 2;
> ord := 1;
> while (ord <=2) do # do number 2
> term := 1;
> while (term <= max_terms) do # do number 3
> array_y_higher_work2[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3;
> ord := ord + 1;
> od;# end do number 2;
> ord := 1;
> while (ord <=2) do # do number 2
> term := 1;
> while (term <= max_terms) do # do number 3
> array_y_set_initial[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3;
> ord := ord + 1;
> od;# end do number 2;
> ord := 1;
> while (ord <=1) do # do number 2
> term := 1;
> while (term <= 3) do # do number 3
> array_poles[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3;
> ord := ord + 1;
> od;# end do number 2;
> ord := 1;
> while (ord <=1) do # do number 2
> term := 1;
> while (term <= 3) do # do number 3
> array_real_pole[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3;
> ord := ord + 1;
> od;# end do number 2;
> ord := 1;
> while (ord <=1) do # do number 2
> term := 1;
> while (term <= 3) do # do number 3
> array_complex_pole[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3;
> ord := ord + 1;
> od;# end do number 2;
> ord := 1;
> while (ord <=max_terms) do # do number 2
> term := 1;
> while (term <= max_terms) do # do number 3
> array_fact_2[ord,term] := 0.0;
> term := term + 1;
> od;# end do number 3;
> ord := ord + 1;
> od;# end do number 2;
> #BEGIN ARRAYS DEFINED AND INITIALIZATED
> array_y := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_y[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_x := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_x[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp0 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp0[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp1 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp2 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp2[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp3_g := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp3_g[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp3 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp3[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp4_c1 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp4_c1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp4_a1 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp4_a1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp4_a2 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp4_a2[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp4 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp4[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_tmp5 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_tmp5[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_m1 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_m1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_const_1 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_const_1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_const_1[1] := 1;
> array_const_0D0 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_const_0D0[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_const_0D0[1] := 0.0;
> array_const_0D2 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_const_0D2[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_const_0D2[1] := 0.2;
> array_const_0D3 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms + 1) do # do number 2
> array_const_0D3[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_const_0D3[1] := 0.3;
> array_m1 := Array(1..(max_terms+1 + 1),[]);
> term := 1;
> while (term <= max_terms) do # do number 2
> array_m1[term] := 0.0;
> term := term + 1;
> od;# end do number 2;
> array_m1[1] := -1.0;
> #END ARRAYS DEFINED AND INITIALIZATED
> #Initing Factorial Tables
> iiif := 0;
> while (iiif <= glob_max_terms) do # do number 2
> jjjf := 0;
> while (jjjf <= glob_max_terms) do # do number 3
> array_fact_1[iiif] := 0;
> array_fact_2[iiif,jjjf] := 0;
> jjjf := jjjf + 1;
> od;# end do number 3;
> iiif := iiif + 1;
> od;# end do number 2;
> #Done Initing Factorial Tables
> #TOP SECOND INPUT BLOCK
> #BEGIN SECOND INPUT BLOCK
> #END FIRST INPUT BLOCK
> #BEGIN SECOND INPUT BLOCK
> x_start := 0.1;
> x_end := 5.0 ;
> array_y_init[0 + 1] := exact_soln_y(x_start);
> glob_h := 0.05;
> glob_look_poles := true;
> glob_max_iter := 1000000;
> #END SECOND INPUT BLOCK
> #BEGIN OVERRIDE BLOCK
> glob_desired_digits_correct:=10;
> glob_display_interval:=0.001;
> glob_look_poles:=true;
> glob_max_iter:=10000000;
> glob_max_minutes:=3;
> glob_subiter_method:=3;
> #END OVERRIDE BLOCK
> #END SECOND INPUT BLOCK
> #BEGIN INITS AFTER SECOND INPUT BLOCK
> glob_last_good_h := glob_h;
> glob_max_terms := max_terms;
> glob_max_sec := convfloat(60.0) * convfloat(glob_max_minutes) + convfloat(3600.0) * convfloat(glob_max_hours);
> glob_abserr := expt(10.0 , (glob_log10_abserr));
> glob_relerr := expt(10.0 , (glob_log10_relerr));
> if (glob_h > 0.0) then # if number 1
> glob_neg_h := false;
> glob_display_interval := omniabs(glob_display_interval);
> else
> glob_neg_h := true;
> glob_display_interval := -omniabs(glob_display_interval);
> fi;# end if 1;
> chk_data();
> #AFTER INITS AFTER SECOND INPUT BLOCK
> array_y_set_initial[1,1] := true;
> array_y_set_initial[1,2] := false;
> array_y_set_initial[1,3] := false;
> array_y_set_initial[1,4] := false;
> array_y_set_initial[1,5] := false;
> array_y_set_initial[1,6] := false;
> array_y_set_initial[1,7] := false;
> array_y_set_initial[1,8] := false;
> array_y_set_initial[1,9] := false;
> array_y_set_initial[1,10] := false;
> array_y_set_initial[1,11] := false;
> array_y_set_initial[1,12] := false;
> array_y_set_initial[1,13] := false;
> array_y_set_initial[1,14] := false;
> array_y_set_initial[1,15] := false;
> array_y_set_initial[1,16] := false;
> array_y_set_initial[1,17] := false;
> array_y_set_initial[1,18] := false;
> array_y_set_initial[1,19] := false;
> array_y_set_initial[1,20] := false;
> array_y_set_initial[1,21] := false;
> array_y_set_initial[1,22] := false;
> array_y_set_initial[1,23] := false;
> array_y_set_initial[1,24] := false;
> array_y_set_initial[1,25] := false;
> array_y_set_initial[1,26] := false;
> array_y_set_initial[1,27] := false;
> array_y_set_initial[1,28] := false;
> array_y_set_initial[1,29] := false;
> array_y_set_initial[1,30] := false;
> #BEGIN OPTIMIZE CODE
> omniout_str(ALWAYS,"START of Optimize");
> #Start Series -- INITIALIZE FOR OPTIMIZE
> glob_check_sign := check_sign(x_start,x_end);
> glob_h := check_sign(x_start,x_end);
> if (glob_display_interval < glob_h) then # if number 2
> glob_h := glob_display_interval;
> fi;# end if 2;
> found_h := -1.0;
> best_h := 0.0;
> min_value := glob_large_float;
> est_answer := est_size_answer();
> opt_iter := 1;
> while ((opt_iter <= 20) and (found_h < 0.0)) do # do number 2
> omniout_int(ALWAYS,"opt_iter",32,opt_iter,4,"");
> array_x[1] := x_start;
> array_x[2] := glob_h;
> glob_next_display := x_start;
> order_diff := 1;
> #Start Series array_y
> term_no := 1;
> while (term_no <= order_diff) do # do number 3
> array_y[term_no] := array_y_init[term_no] * expt(glob_h , (term_no - 1)) / factorial_1(term_no - 1);
> term_no := term_no + 1;
> od;# end do number 3;
> rows := order_diff;
> r_order := 1;
> while (r_order <= rows) do # do number 3
> term_no := 1;
> while (term_no <= (rows - r_order + 1)) do # do number 4
> it := term_no + r_order - 1;
> array_y_higher[r_order,term_no] := array_y_init[it]* expt(glob_h , (term_no - 1)) / ((factorial_1(term_no - 1)));
> term_no := term_no + 1;
> od;# end do number 4;
> r_order := r_order + 1;
> od;# end do number 3
> ;
> atomall();
> est_needed_step_err := estimated_needed_step_error(x_start,x_end,glob_h,est_answer);
> omniout_float(ALWAYS,"est_needed_step_err",32,est_needed_step_err,16,"");
> value3 := test_suggested_h();
> omniout_float(ALWAYS,"value3",32,value3,32,"");
> if ((value3 < est_needed_step_err) and (found_h < 0.0)) then # if number 2
> best_h := glob_h;
> found_h := 1.0;
> fi;# end if 2;
> omniout_float(ALWAYS,"best_h",32,best_h,32,"");
> opt_iter := opt_iter + 1;
> glob_h := glob_h * 0.5;
> od;# end do number 2;
> if (found_h > 0.0) then # if number 2
> glob_h := best_h ;
> else
> omniout_str(ALWAYS,"No increment to obtain desired accuracy found");
> fi;# end if 2;
> #END OPTIMIZE CODE
> if (glob_html_log) then # if number 2
> html_log_file := fopen("html/entry.html",WRITE,TEXT);
> fi;# end if 2;
> #BEGIN SOLUTION CODE
> if (found_h > 0.0) then # if number 2
> omniout_str(ALWAYS,"START of Soultion");
> #Start Series -- INITIALIZE FOR SOLUTION
> array_x[1] := x_start;
> array_x[2] := glob_h;
> glob_next_display := x_start;
> order_diff := 1;
> #Start Series array_y
> term_no := 1;
> while (term_no <= order_diff) do # do number 2
> array_y[term_no] := array_y_init[term_no] * expt(glob_h , (term_no - 1)) / factorial_1(term_no - 1);
> term_no := term_no + 1;
> od;# end do number 2;
> rows := order_diff;
> r_order := 1;
> while (r_order <= rows) do # do number 2
> term_no := 1;
> while (term_no <= (rows - r_order + 1)) do # do number 3
> it := term_no + r_order - 1;
> array_y_higher[r_order,term_no] := array_y_init[it]* expt(glob_h , (term_no - 1)) / ((factorial_1(term_no - 1)));
> term_no := term_no + 1;
> od;# end do number 3;
> r_order := r_order + 1;
> od;# end do number 2
> ;
> current_iter := 1;
> glob_clock_start_sec := elapsed_time_seconds();
> glob_log10normmin := -glob_large_float ;
> if (omniabs(array_y_higher[1,1]) > glob_small_float) then # if number 3
> tmp := omniabs(array_y_higher[1,1]);
> log10norm := (log10(tmp));
> if (log10norm < glob_log10normmin) then # if number 4
> glob_log10normmin := log10norm;
> fi;# end if 4
> fi;# end if 3;
> display_alot(current_iter)
> ;
> glob_clock_sec := elapsed_time_seconds();
> glob_current_iter := 0;
> glob_iter := 0;
> omniout_str(DEBUGL," ");
> glob_reached_optimal_h := true;
> glob_optimal_clock_start_sec := elapsed_time_seconds();
> while ((glob_current_iter < glob_max_iter) and ((glob_check_sign * array_x[1]) < (glob_check_sign * x_end )) and ((convfloat(glob_clock_sec) - convfloat(glob_orig_start_sec)) < convfloat(glob_max_sec))) do # do number 2
> #left paren 0001C
> if (reached_interval()) then # if number 3
> omniout_str(INFO," ");
> omniout_str(INFO,"TOP MAIN SOLVE Loop");
> fi;# end if 3;
> glob_iter := glob_iter + 1;
> glob_clock_sec := elapsed_time_seconds();
> glob_current_iter := glob_current_iter + 1;
> atomall();
> display_alot(current_iter);
> if (glob_look_poles) then # if number 3
> #left paren 0004C
> check_for_pole();
> fi;# end if 3;#was right paren 0004C
> if (reached_interval()) then # if number 3
> glob_next_display := glob_next_display + glob_display_interval;
> fi;# end if 3;
> array_x[1] := array_x[1] + glob_h;
> array_x[2] := glob_h;
> #Jump Series array_y;
> order_diff := 2;
> #START PART 1 SUM AND ADJUST
> #START SUM AND ADJUST EQ =1
> #sum_and_adjust array_y
> #BEFORE ADJUST SUBSERIES EQ =1
> ord := 2;
> calc_term := 1;
> #adjust_subseriesarray_y
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_y_higher_work[2,iii] := array_y_higher[2,iii] / expt(glob_h , (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3;
> #AFTER ADJUST SUBSERIES EQ =1
> #BEFORE SUM SUBSERIES EQ =1
> temp_sum := 0.0;
> ord := 2;
> calc_term := 1;
> #sum_subseriesarray_y
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_y_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3;
> array_y_higher_work2[ord,calc_term] := temp_sum * expt(glob_h , (calc_term - 1)) / (factorial_1(calc_term - 1));
> #AFTER SUM SUBSERIES EQ =1
> #BEFORE ADJUST SUBSERIES EQ =1
> ord := 1;
> calc_term := 2;
> #adjust_subseriesarray_y
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_y_higher_work[1,iii] := array_y_higher[1,iii] / expt(glob_h , (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3;
> #AFTER ADJUST SUBSERIES EQ =1
> #BEFORE SUM SUBSERIES EQ =1
> temp_sum := 0.0;
> ord := 1;
> calc_term := 2;
> #sum_subseriesarray_y
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_y_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3;
> array_y_higher_work2[ord,calc_term] := temp_sum * expt(glob_h , (calc_term - 1)) / (factorial_1(calc_term - 1));
> #AFTER SUM SUBSERIES EQ =1
> #BEFORE ADJUST SUBSERIES EQ =1
> ord := 1;
> calc_term := 1;
> #adjust_subseriesarray_y
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> array_y_higher_work[1,iii] := array_y_higher[1,iii] / expt(glob_h , (calc_term - 1)) / factorial_3(iii - calc_term , iii - 1);
> iii := iii - 1;
> od;# end do number 3;
> #AFTER ADJUST SUBSERIES EQ =1
> #BEFORE SUM SUBSERIES EQ =1
> temp_sum := 0.0;
> ord := 1;
> calc_term := 1;
> #sum_subseriesarray_y
> iii := glob_max_terms;
> while (iii >= calc_term) do # do number 3
> temp_sum := temp_sum + array_y_higher_work[ord,iii];
> iii := iii - 1;
> od;# end do number 3;
> array_y_higher_work2[ord,calc_term] := temp_sum * expt(glob_h , (calc_term - 1)) / (factorial_1(calc_term - 1));
> #AFTER SUM SUBSERIES EQ =1
> #END SUM AND ADJUST EQ =1
> #END PART 1
> #START PART 2 MOVE TERMS to REGULAR Array
> term_no := glob_max_terms;
> while (term_no >= 1) do # do number 3
> array_y[term_no] := array_y_higher_work2[1,term_no];
> ord := 1;
> while (ord <= order_diff) do # do number 4
> array_y_higher[ord,term_no] := array_y_higher_work2[ord,term_no];
> ord := ord + 1;
> od;# end do number 4;
> term_no := term_no - 1;
> od;# end do number 3;
> #END PART 2 HEVE MOVED TERMS to REGULAR Array
> ;
> od;# end do number 2;#right paren 0001C
> omniout_str(ALWAYS,"Finished!");
> if (glob_iter >= glob_max_iter) then # if number 3
> omniout_str(ALWAYS,"Maximum Iterations Reached before Solution Completed!");
> fi;# end if 3;
> if (elapsed_time_seconds() - convfloat(glob_orig_start_sec) >= convfloat(glob_max_sec )) then # if number 3
> omniout_str(ALWAYS,"Maximum Time Reached before Solution Completed!");
> fi;# end if 3;
> glob_clock_sec := elapsed_time_seconds();
> omniout_str(INFO,"diff ( y , x , 1 ) = expt((0.2 * x + 0.3) , sin(x));");
> omniout_int(INFO,"Iterations ",32,glob_iter,4," ")
> ;
> prog_report(x_start,x_end);
> if (glob_html_log) then # if number 3
> logstart(html_log_file);
> logitem_str(html_log_file,"2013-01-12T22:59:31-06:00")
> ;
> logitem_str(html_log_file,"Maple")
> ;
> logitem_str(html_log_file,"expt_lin_sin")
> ;
> logitem_str(html_log_file,"diff ( y , x , 1 ) = expt((0.2 * x + 0.3) , sin(x));")
> ;
> logitem_float(html_log_file,x_start)
> ;
> logitem_float(html_log_file,x_end)
> ;
> logitem_float(html_log_file,array_x[1])
> ;
> logitem_float(html_log_file,glob_h)
> ;
> logitem_integer(html_log_file,Digits)
> ;
> ;
> logitem_good_digits(html_log_file,array_last_rel_error[1])
> ;
> logitem_integer(html_log_file,glob_max_terms)
> ;
> logitem_float(html_log_file,array_1st_rel_error[1])
> ;
> logitem_float(html_log_file,array_last_rel_error[1])
> ;
> logitem_integer(html_log_file,glob_iter)
> ;
> logitem_pole(html_log_file,array_type_pole[1])
> ;
> if (array_type_pole[1] = 1 or array_type_pole[1] = 2) then # if number 4
> logitem_float(html_log_file,array_pole[1])
> ;
> logitem_float(html_log_file,array_pole[2])
> ;
> 0;
> else
> logitem_str(html_log_file,"NA")
> ;
> logitem_str(html_log_file,"NA")
> ;
> 0;
> fi;# end if 4;
> logitem_time(html_log_file,convfloat(glob_clock_sec))
> ;
> if (glob_percent_done < 100.0) then # if number 4
> logitem_time(html_log_file,convfloat(glob_total_exp_sec))
> ;
> 0;
> else
> logitem_str(html_log_file,"Done")
> ;
> 0;
> fi;# end if 4;
> log_revs(html_log_file," 156 | ")
> ;
> logitem_str(html_log_file,"expt_lin_sin diffeq.mxt")
> ;
> logitem_str(html_log_file,"expt_lin_sin maple results")
> ;
> logitem_str(html_log_file,"Languages compared - single equations")
> ;
> logend(html_log_file)
> ;
> ;
> fi;# end if 3;
> if (glob_html_log) then # if number 3
> fclose(html_log_file);
> fi;# end if 3
> ;
> ;;
> fi;# end if 2
> #END OUTFILEMAIN
> end;
main := proc()
local d1, d2, d3, d4, est_err_2, niii, done_once, term, ord, order_diff,
term_no, html_log_file, iiif, jjjf, rows, r_order, sub_iter, calc_term, iii,
temp_sum, current_iter, x_start, x_end, it, log10norm, max_terms, opt_iter,
tmp, subiter, est_needed_step_err, value3, min_value, est_answer, best_h,
found_h, repeat_it;
global glob_max_terms, glob_iolevel, ALWAYS, INFO, DEBUGL, DEBUGMASSIVE,
MAX_UNCHANGED, glob_check_sign, glob_desired_digits_correct,
glob_max_value3, glob_ratio_of_radius, glob_percent_done,
glob_subiter_method, glob_log10normmin, glob_total_exp_sec,
glob_optimal_expect_sec, glob_html_log, glob_good_digits, glob_max_opt_iter,
glob_dump, glob_djd_debug, glob_display_flag, glob_djd_debug2,
glob_sec_in_minute, glob_min_in_hour, glob_hours_in_day, glob_days_in_year,
glob_sec_in_hour, glob_sec_in_day, glob_sec_in_year, glob_almost_1,
glob_clock_sec, glob_clock_start_sec, glob_not_yet_finished,
glob_initial_pass, glob_not_yet_start_msg, glob_reached_optimal_h,
glob_optimal_done, glob_disp_incr, glob_h, glob_hmax, glob_hmin,
glob_hmin_init, glob_large_float, glob_last_good_h, glob_look_poles,
glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic,
glob_log10_abserr, glob_log10_relerr, glob_abserr, glob_relerr,
glob_max_hours, glob_max_iter, glob_max_rel_trunc_err, glob_max_trunc_err,
glob_no_eqs, glob_optimal_clock_start_sec, glob_optimal_start,
glob_small_float, glob_smallish_float, glob_unchanged_h_cnt, glob_warned,
glob_warned2, glob_max_sec, glob_orig_start_sec, glob_start,
glob_curr_iter_when_opt, glob_current_iter, glob_iter, glob_normmax,
glob_log10abserr, glob_log10relerr, glob_max_minutes, array_const_1,
array_const_0D0, array_const_0D2, array_const_0D3, array_y_init,
array_norms, array_fact_1, array_pole, array_1st_rel_error,
array_last_rel_error, array_type_pole, array_y, array_x, array_tmp0,
array_tmp1, array_tmp2, array_tmp3_g, array_tmp3, array_tmp4_c1,
array_tmp4_a1, array_tmp4_a2, array_tmp4, array_tmp5, array_m1,
array_y_higher, array_y_higher_work, array_y_higher_work2,
array_y_set_initial, array_poles, array_real_pole, array_complex_pole,
array_fact_2, glob_last;
glob_last;
ALWAYS := 1;
INFO := 2;
DEBUGL := 3;
DEBUGMASSIVE := 4;
glob_iolevel := INFO;
glob_max_terms := 30;
glob_iolevel := 5;
ALWAYS := 1;
INFO := 2;
DEBUGL := 3;
DEBUGMASSIVE := 4;
MAX_UNCHANGED := 10;
glob_check_sign := 1.0;
glob_desired_digits_correct := 8.0;
glob_max_value3 := 0.;
glob_ratio_of_radius := 0.01;
glob_percent_done := 0.;
glob_subiter_method := 3;
glob_log10normmin := 0.1;
glob_total_exp_sec := 0.1;
glob_optimal_expect_sec := 0.1;
glob_html_log := true;
glob_good_digits := 0;
glob_max_opt_iter := 10;
glob_dump := false;
glob_djd_debug := true;
glob_display_flag := true;
glob_djd_debug2 := true;
glob_sec_in_minute := 60;
glob_min_in_hour := 60;
glob_hours_in_day := 24;
glob_days_in_year := 365;
glob_sec_in_hour := 3600;
glob_sec_in_day := 86400;
glob_sec_in_year := 31536000;
glob_almost_1 := 0.9990;
glob_clock_sec := 0.;
glob_clock_start_sec := 0.;
glob_not_yet_finished := true;
glob_initial_pass := true;
glob_not_yet_start_msg := true;
glob_reached_optimal_h := false;
glob_optimal_done := false;
glob_disp_incr := 0.1;
glob_h := 0.1;
glob_hmax := 1.0;
glob_hmin := 0.1*10^(-10);
glob_hmin_init := 0.001;
glob_large_float := 0.90*10^101;
glob_last_good_h := 0.1;
glob_look_poles := false;
glob_neg_h := false;
glob_display_interval := 0.;
glob_next_display := 0.;
glob_dump_analytic := false;
glob_log10_abserr := 0.1*10^(-10);
glob_log10_relerr := 0.1*10^(-10);
glob_abserr := 0.1*10^(-10);
glob_relerr := 0.1*10^(-10);
glob_max_hours := 0.;
glob_max_iter := 1000;
glob_max_rel_trunc_err := 0.1*10^(-10);
glob_max_trunc_err := 0.1*10^(-10);
glob_no_eqs := 0;
glob_optimal_clock_start_sec := 0.;
glob_optimal_start := 0.;
glob_small_float := 0.1*10^(-50);
glob_smallish_float := 0.1*10^(-100);
glob_unchanged_h_cnt := 0;
glob_warned := false;
glob_warned2 := false;
glob_max_sec := 10000.0;
glob_orig_start_sec := 0.;
glob_start := 0;
glob_curr_iter_when_opt := 0;
glob_current_iter := 0;
glob_iter := 0;
glob_normmax := 0.;
glob_log10abserr := 0.;
glob_log10relerr := 0.;
glob_max_minutes := 0.;
glob_orig_start_sec := elapsed_time_seconds();
MAX_UNCHANGED := 10;
glob_curr_iter_when_opt := 0;
glob_display_flag := true;
glob_no_eqs := 1;
glob_iter := -1;
opt_iter := -1;
glob_max_iter := 50000;
glob_max_hours := 0.;
glob_max_minutes := 15.0;
omniout_str(ALWAYS, "##############ECHO OF PROBLEM#################");
omniout_str(ALWAYS,
"##############temp/expt_lin_sinpostode.ode#################");
omniout_str(ALWAYS,
"diff ( y , x , 1 ) = expt((0.2 * x + 0.3) , sin(x));");
omniout_str(ALWAYS, "!");
omniout_str(ALWAYS, "#BEGIN FIRST INPUT BLOCK");
omniout_str(ALWAYS, "Digits:=32;");
omniout_str(ALWAYS, "max_terms:=30;");
omniout_str(ALWAYS, "!");
omniout_str(ALWAYS, "#END FIRST INPUT BLOCK");
omniout_str(ALWAYS, "#BEGIN SECOND INPUT BLOCK");
omniout_str(ALWAYS, "x_start := 0.1;");
omniout_str(ALWAYS, "x_end := 5.0 ;");
omniout_str(ALWAYS, "array_y_init[0 + 1] := exact_soln_y(x_start);");
omniout_str(ALWAYS, "glob_h := 0.05;");
omniout_str(ALWAYS, "glob_look_poles := true;");
omniout_str(ALWAYS, "glob_max_iter := 1000000;");
omniout_str(ALWAYS, "#END SECOND INPUT BLOCK");
omniout_str(ALWAYS, "#BEGIN OVERRIDE BLOCK");
omniout_str(ALWAYS, "glob_desired_digits_correct:=10;");
omniout_str(ALWAYS, "glob_display_interval:=0.001;");
omniout_str(ALWAYS, "glob_look_poles:=true;");
omniout_str(ALWAYS, "glob_max_iter:=10000000;");
omniout_str(ALWAYS, "glob_max_minutes:=3;");
omniout_str(ALWAYS, "glob_subiter_method:=3;");
omniout_str(ALWAYS, "#END OVERRIDE BLOCK");
omniout_str(ALWAYS, "!");
omniout_str(ALWAYS, "#BEGIN USER DEF BLOCK");
omniout_str(ALWAYS, "exact_soln_y := proc(x)");
omniout_str(ALWAYS, "return(0.0);");
omniout_str(ALWAYS, "end;");
omniout_str(ALWAYS, "#END USER DEF BLOCK");
omniout_str(ALWAYS, "#######END OF ECHO OF PROBLEM#################");
glob_unchanged_h_cnt := 0;
glob_warned := false;
glob_warned2 := false;
glob_small_float := 0.10*10^(-199);
glob_smallish_float := 0.10*10^(-63);
glob_large_float := 0.10*10^101;
glob_almost_1 := 0.99;
glob_log10_abserr := -8.0;
glob_log10_relerr := -8.0;
glob_hmax := 0.01;
Digits := 32;
max_terms := 30;
glob_max_terms := max_terms;
glob_html_log := true;
array_y_init := Array(0 .. max_terms + 1, []);
array_norms := Array(0 .. max_terms + 1, []);
array_fact_1 := Array(0 .. max_terms + 1, []);
array_pole := Array(0 .. max_terms + 1, []);
array_1st_rel_error := Array(0 .. max_terms + 1, []);
array_last_rel_error := Array(0 .. max_terms + 1, []);
array_type_pole := Array(0 .. max_terms + 1, []);
array_y := Array(0 .. max_terms + 1, []);
array_x := Array(0 .. max_terms + 1, []);
array_tmp0 := Array(0 .. max_terms + 1, []);
array_tmp1 := Array(0 .. max_terms + 1, []);
array_tmp2 := Array(0 .. max_terms + 1, []);
array_tmp3_g := Array(0 .. max_terms + 1, []);
array_tmp3 := Array(0 .. max_terms + 1, []);
array_tmp4_c1 := Array(0 .. max_terms + 1, []);
array_tmp4_a1 := Array(0 .. max_terms + 1, []);
array_tmp4_a2 := Array(0 .. max_terms + 1, []);
array_tmp4 := Array(0 .. max_terms + 1, []);
array_tmp5 := Array(0 .. max_terms + 1, []);
array_m1 := Array(0 .. max_terms + 1, []);
array_y_higher := Array(0 .. 3, 0 .. max_terms + 1, []);
array_y_higher_work := Array(0 .. 3, 0 .. max_terms + 1, []);
array_y_higher_work2 := Array(0 .. 3, 0 .. max_terms + 1, []);
array_y_set_initial := Array(0 .. 3, 0 .. max_terms + 1, []);
array_poles := Array(0 .. 2, 0 .. 4, []);
array_real_pole := Array(0 .. 2, 0 .. 4, []);
array_complex_pole := Array(0 .. 2, 0 .. 4, []);
array_fact_2 := Array(0 .. max_terms + 1, 0 .. max_terms + 1, []);
term := 1;
while term <= max_terms do array_y_init[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_norms[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_fact_1[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_pole[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do
array_1st_rel_error[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do
array_last_rel_error[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do
array_type_pole[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_y[term] := 0.; term := term + 1 end do
;
term := 1;
while term <= max_terms do array_x[term] := 0.; term := term + 1 end do
;
term := 1;
while term <= max_terms do array_tmp0[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp1[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp2[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp3_g[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp3[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp4_c1[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp4_a1[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp4_a2[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp4[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_tmp5[term] := 0.; term := term + 1
end do;
term := 1;
while term <= max_terms do array_m1[term] := 0.; term := term + 1
end do;
ord := 1;
while ord <= 2 do
term := 1;
while term <= max_terms do
array_y_higher[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 2 do
term := 1;
while term <= max_terms do
array_y_higher_work[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 2 do
term := 1;
while term <= max_terms do
array_y_higher_work2[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 2 do
term := 1;
while term <= max_terms do
array_y_set_initial[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 1 do
term := 1;
while term <= 3 do array_poles[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 1 do
term := 1;
while term <= 3 do
array_real_pole[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= 1 do
term := 1;
while term <= 3 do
array_complex_pole[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
ord := 1;
while ord <= max_terms do
term := 1;
while term <= max_terms do
array_fact_2[ord, term] := 0.; term := term + 1
end do;
ord := ord + 1
end do;
array_y := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_y[term] := 0.; term := term + 1
end do;
array_x := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_x[term] := 0.; term := term + 1
end do;
array_tmp0 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp0[term] := 0.; term := term + 1
end do;
array_tmp1 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp1[term] := 0.; term := term + 1
end do;
array_tmp2 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp2[term] := 0.; term := term + 1
end do;
array_tmp3_g := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_tmp3_g[term] := 0.; term := term + 1
end do;
array_tmp3 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp3[term] := 0.; term := term + 1
end do;
array_tmp4_c1 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_tmp4_c1[term] := 0.; term := term + 1
end do;
array_tmp4_a1 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_tmp4_a1[term] := 0.; term := term + 1
end do;
array_tmp4_a2 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_tmp4_a2[term] := 0.; term := term + 1
end do;
array_tmp4 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp4[term] := 0.; term := term + 1
end do;
array_tmp5 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_tmp5[term] := 0.; term := term + 1
end do;
array_m1 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do array_m1[term] := 0.; term := term + 1
end do;
array_const_1 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_const_1[term] := 0.; term := term + 1
end do;
array_const_1[1] := 1;
array_const_0D0 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_const_0D0[term] := 0.; term := term + 1
end do;
array_const_0D0[1] := 0.;
array_const_0D2 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_const_0D2[term] := 0.; term := term + 1
end do;
array_const_0D2[1] := 0.2;
array_const_0D3 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms + 1 do
array_const_0D3[term] := 0.; term := term + 1
end do;
array_const_0D3[1] := 0.3;
array_m1 := Array(1 .. max_terms + 2, []);
term := 1;
while term <= max_terms do array_m1[term] := 0.; term := term + 1
end do;
array_m1[1] := -1.0;
iiif := 0;
while iiif <= glob_max_terms do
jjjf := 0;
while jjjf <= glob_max_terms do
array_fact_1[iiif] := 0;
array_fact_2[iiif, jjjf] := 0;
jjjf := jjjf + 1
end do;
iiif := iiif + 1
end do;
x_start := 0.1;
x_end := 5.0;
array_y_init[1] := exact_soln_y(x_start);
glob_h := 0.05;
glob_look_poles := true;
glob_max_iter := 1000000;
glob_desired_digits_correct := 10;
glob_display_interval := 0.001;
glob_look_poles := true;
glob_max_iter := 10000000;
glob_max_minutes := 3;
glob_subiter_method := 3;
glob_last_good_h := glob_h;
glob_max_terms := max_terms;
glob_max_sec := convfloat(60.0)*convfloat(glob_max_minutes)
+ convfloat(3600.0)*convfloat(glob_max_hours);
glob_abserr := expt(10.0, glob_log10_abserr);
glob_relerr := expt(10.0, glob_log10_relerr);
if 0. < glob_h then
glob_neg_h := false;
glob_display_interval := omniabs(glob_display_interval)
else
glob_neg_h := true;
glob_display_interval := -omniabs(glob_display_interval)
end if;
chk_data();
array_y_set_initial[1, 1] := true;
array_y_set_initial[1, 2] := false;
array_y_set_initial[1, 3] := false;
array_y_set_initial[1, 4] := false;
array_y_set_initial[1, 5] := false;
array_y_set_initial[1, 6] := false;
array_y_set_initial[1, 7] := false;
array_y_set_initial[1, 8] := false;
array_y_set_initial[1, 9] := false;
array_y_set_initial[1, 10] := false;
array_y_set_initial[1, 11] := false;
array_y_set_initial[1, 12] := false;
array_y_set_initial[1, 13] := false;
array_y_set_initial[1, 14] := false;
array_y_set_initial[1, 15] := false;
array_y_set_initial[1, 16] := false;
array_y_set_initial[1, 17] := false;
array_y_set_initial[1, 18] := false;
array_y_set_initial[1, 19] := false;
array_y_set_initial[1, 20] := false;
array_y_set_initial[1, 21] := false;
array_y_set_initial[1, 22] := false;
array_y_set_initial[1, 23] := false;
array_y_set_initial[1, 24] := false;
array_y_set_initial[1, 25] := false;
array_y_set_initial[1, 26] := false;
array_y_set_initial[1, 27] := false;
array_y_set_initial[1, 28] := false;
array_y_set_initial[1, 29] := false;
array_y_set_initial[1, 30] := false;
omniout_str(ALWAYS, "START of Optimize");
glob_check_sign := check_sign(x_start, x_end);
glob_h := check_sign(x_start, x_end);
if glob_display_interval < glob_h then glob_h := glob_display_interval
end if;
found_h := -1.0;
best_h := 0.;
min_value := glob_large_float;
est_answer := est_size_answer();
opt_iter := 1;
while opt_iter <= 20 and found_h < 0. do
omniout_int(ALWAYS, "opt_iter", 32, opt_iter, 4, "");
array_x[1] := x_start;
array_x[2] := glob_h;
glob_next_display := x_start;
order_diff := 1;
term_no := 1;
while term_no <= order_diff do
array_y[term_no] := array_y_init[term_no]*
expt(glob_h, term_no - 1)/factorial_1(term_no - 1);
term_no := term_no + 1
end do;
rows := order_diff;
r_order := 1;
while r_order <= rows do
term_no := 1;
while term_no <= rows - r_order + 1 do
it := term_no + r_order - 1;
array_y_higher[r_order, term_no] := array_y_init[it]*
expt(glob_h, term_no - 1)/factorial_1(term_no - 1);
term_no := term_no + 1
end do;
r_order := r_order + 1
end do;
atomall();
est_needed_step_err :=
estimated_needed_step_error(x_start, x_end, glob_h, est_answer)
;
omniout_float(ALWAYS, "est_needed_step_err", 32,
est_needed_step_err, 16, "");
value3 := test_suggested_h();
omniout_float(ALWAYS, "value3", 32, value3, 32, "");
if value3 < est_needed_step_err and found_h < 0. then
best_h := glob_h; found_h := 1.0
end if;
omniout_float(ALWAYS, "best_h", 32, best_h, 32, "");
opt_iter := opt_iter + 1;
glob_h := glob_h*0.5
end do;
if 0. < found_h then glob_h := best_h
else omniout_str(ALWAYS,
"No increment to obtain desired accuracy found")
end if;
if glob_html_log then
html_log_file := fopen("html/entry.html", WRITE, TEXT)
end if;
if 0. < found_h then
omniout_str(ALWAYS, "START of Soultion");
array_x[1] := x_start;
array_x[2] := glob_h;
glob_next_display := x_start;
order_diff := 1;
term_no := 1;
while term_no <= order_diff do
array_y[term_no] := array_y_init[term_no]*
expt(glob_h, term_no - 1)/factorial_1(term_no - 1);
term_no := term_no + 1
end do;
rows := order_diff;
r_order := 1;
while r_order <= rows do
term_no := 1;
while term_no <= rows - r_order + 1 do
it := term_no + r_order - 1;
array_y_higher[r_order, term_no] := array_y_init[it]*
expt(glob_h, term_no - 1)/factorial_1(term_no - 1);
term_no := term_no + 1
end do;
r_order := r_order + 1
end do;
current_iter := 1;
glob_clock_start_sec := elapsed_time_seconds();
glob_log10normmin := -glob_large_float;
if glob_small_float < omniabs(array_y_higher[1, 1]) then
tmp := omniabs(array_y_higher[1, 1]);
log10norm := log10(tmp);
if log10norm < glob_log10normmin then
glob_log10normmin := log10norm
end if
end if;
display_alot(current_iter);
glob_clock_sec := elapsed_time_seconds();
glob_current_iter := 0;
glob_iter := 0;
omniout_str(DEBUGL, " ");
glob_reached_optimal_h := true;
glob_optimal_clock_start_sec := elapsed_time_seconds();
while glob_current_iter < glob_max_iter and
glob_check_sign*array_x[1] < glob_check_sign*x_end and
convfloat(glob_clock_sec) - convfloat(glob_orig_start_sec) <
convfloat(glob_max_sec) do
if reached_interval() then
omniout_str(INFO, " ");
omniout_str(INFO, "TOP MAIN SOLVE Loop")
end if;
glob_iter := glob_iter + 1;
glob_clock_sec := elapsed_time_seconds();
glob_current_iter := glob_current_iter + 1;
atomall();
display_alot(current_iter);
if glob_look_poles then check_for_pole() end if;
if reached_interval() then glob_next_display :=
glob_next_display + glob_display_interval
end if;
array_x[1] := array_x[1] + glob_h;
array_x[2] := glob_h;
order_diff := 2;
ord := 2;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
array_y_higher_work[2, iii] := array_y_higher[2, iii]/(
expt(glob_h, calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 2;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_y_higher_work[ord, iii];
iii := iii - 1
end do;
array_y_higher_work2[ord, calc_term] := temp_sum*
expt(glob_h, calc_term - 1)/factorial_1(calc_term - 1);
ord := 1;
calc_term := 2;
iii := glob_max_terms;
while calc_term <= iii do
array_y_higher_work[1, iii] := array_y_higher[1, iii]/(
expt(glob_h, calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 1;
calc_term := 2;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_y_higher_work[ord, iii];
iii := iii - 1
end do;
array_y_higher_work2[ord, calc_term] := temp_sum*
expt(glob_h, calc_term - 1)/factorial_1(calc_term - 1);
ord := 1;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
array_y_higher_work[1, iii] := array_y_higher[1, iii]/(
expt(glob_h, calc_term - 1)*
factorial_3(iii - calc_term, iii - 1));
iii := iii - 1
end do;
temp_sum := 0.;
ord := 1;
calc_term := 1;
iii := glob_max_terms;
while calc_term <= iii do
temp_sum := temp_sum + array_y_higher_work[ord, iii];
iii := iii - 1
end do;
array_y_higher_work2[ord, calc_term] := temp_sum*
expt(glob_h, calc_term - 1)/factorial_1(calc_term - 1);
term_no := glob_max_terms;
while 1 <= term_no do
array_y[term_no] := array_y_higher_work2[1, term_no];
ord := 1;
while ord <= order_diff do
array_y_higher[ord, term_no] :=
array_y_higher_work2[ord, term_no];
ord := ord + 1
end do;
term_no := term_no - 1
end do
end do;
omniout_str(ALWAYS, "Finished!");
if glob_max_iter <= glob_iter then omniout_str(ALWAYS,
"Maximum Iterations Reached before Solution Completed!")
end if;
if convfloat(glob_max_sec) <=
elapsed_time_seconds() - convfloat(glob_orig_start_sec) then
omniout_str(ALWAYS,
"Maximum Time Reached before Solution Completed!")
end if;
glob_clock_sec := elapsed_time_seconds();
omniout_str(INFO,
"diff ( y , x , 1 ) = expt((0.2 * x + 0.3) , sin(x));");
omniout_int(INFO, "Iterations ", 32,
glob_iter, 4, " ");
prog_report(x_start, x_end);
if glob_html_log then
logstart(html_log_file);
logitem_str(html_log_file, "2013-01-12T22:59:31-06:00");
logitem_str(html_log_file, "Maple");
logitem_str(html_log_file,
"expt_lin_sin");
logitem_str(html_log_file,
"diff ( y , x , 1 ) = expt((0.2 * x + 0.3) , sin(x));");
logitem_float(html_log_file, x_start);
logitem_float(html_log_file, x_end);
logitem_float(html_log_file, array_x[1]);
logitem_float(html_log_file, glob_h);
logitem_integer(html_log_file, Digits);
logitem_good_digits(html_log_file, array_last_rel_error[1]);
logitem_integer(html_log_file, glob_max_terms);
logitem_float(html_log_file, array_1st_rel_error[1]);
logitem_float(html_log_file, array_last_rel_error[1]);
logitem_integer(html_log_file, glob_iter);
logitem_pole(html_log_file, array_type_pole[1]);
if array_type_pole[1] = 1 or array_type_pole[1] = 2 then
logitem_float(html_log_file, array_pole[1]);
logitem_float(html_log_file, array_pole[2]);
0
else
logitem_str(html_log_file, "NA");
logitem_str(html_log_file, "NA");
0
end if;
logitem_time(html_log_file, convfloat(glob_clock_sec));
if glob_percent_done < 100.0 then
logitem_time(html_log_file, convfloat(glob_total_exp_sec));
0
else logitem_str(html_log_file, "Done"); 0
end if;
log_revs(html_log_file, " 156 | ");
logitem_str(html_log_file, "expt_lin_sin diffeq.mxt");
logitem_str(html_log_file, "expt_lin_sin maple results");
logitem_str(html_log_file,
"Languages compared - single equations");
logend(html_log_file)
end if;
if glob_html_log then fclose(html_log_file) end if
end if
end proc
> # End Function number 12
> main();
##############ECHO OF PROBLEM#################
##############temp/expt_lin_sinpostode.ode#################
diff ( y , x , 1 ) = expt((0.2 * x + 0.3) , sin(x));
!
#BEGIN FIRST INPUT BLOCK
Digits:=32;
max_terms:=30;
!
#END FIRST INPUT BLOCK
#BEGIN SECOND INPUT BLOCK
x_start := 0.1;
x_end := 5.0 ;
array_y_init[0 + 1] := exact_soln_y(x_start);
glob_h := 0.05;
glob_look_poles := true;
glob_max_iter := 1000000;
#END SECOND INPUT BLOCK
#BEGIN OVERRIDE BLOCK
glob_desired_digits_correct:=10;
glob_display_interval:=0.001;
glob_look_poles:=true;
glob_max_iter:=10000000;
glob_max_minutes:=3;
glob_subiter_method:=3;
#END OVERRIDE BLOCK
!
#BEGIN USER DEF BLOCK
exact_soln_y := proc(x)
return(0.0);
end;
#END USER DEF BLOCK
#######END OF ECHO OF PROBLEM#################
START of Optimize
min_size = 0
min_size = 1
opt_iter = 1
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
glob_desired_digits_correct = 10
desired_abs_gbl_error = 1.0000000000000000000000000000000e-10
range = 4.9
estimated_steps = 4900
step_error = 2.0408163265306122448979591836735e-14
est_needed_step_err = 2.0408163265306122448979591836735e-14
hn_div_ho = 0.5
hn_div_ho_2 = 0.25
hn_div_ho_3 = 0.125
value3 = 1.0007164638981097736967295798678e-89
max_value3 = 1.0007164638981097736967295798678e-89
value3 = 1.0007164638981097736967295798678e-89
best_h = 0.001
START of Soultion
x[1] = 0.1
y[1] (analytic) = 0
y[1] (numeric) = 0
absolute error = 0
relative error = -1 %
Correct digits = -1
h = 0.001
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.1
y[1] (analytic) = 0
y[1] (numeric) = 0
absolute error = 0
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.778
Order of pole = 0.3739
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.101
y[1] (analytic) = 0
y[1] (numeric) = 0.0008920001100646848441928044727463
absolute error = 0.0008920001100646848441928044727463
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.772
Order of pole = 0.3766
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.102
y[1] (analytic) = 0
y[1] (numeric) = 0.0017830462657923429278723136798337
absolute error = 0.0017830462657923429278723136798337
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.767
Order of pole = 0.3793
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=3.8MB, alloc=2.8MB, time=0.33
x[1] = 0.103
y[1] (analytic) = 0
y[1] (numeric) = 0.0026731406607650569605049492280353
absolute error = 0.0026731406607650569605049492280353
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.761
Order of pole = 0.3821
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.104
y[1] (analytic) = 0
y[1] (numeric) = 0.0035622854835611580082791362422316
absolute error = 0.0035622854835611580082791362422316
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.755
Order of pole = 0.3849
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.105
y[1] (analytic) = 0
y[1] (numeric) = 0.0044504829177692444954208799124062
absolute error = 0.0044504829177692444954208799124062
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.75
Order of pole = 0.3878
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.106
y[1] (analytic) = 0
y[1] (numeric) = 0.0053377351420021581414949392909791
absolute error = 0.0053377351420021581414949392909791
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.744
Order of pole = 0.3907
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.107
y[1] (analytic) = 0
y[1] (numeric) = 0.0062240443299109169849332580344132
absolute error = 0.0062240443299109169849332580344132
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.738
Order of pole = 0.3937
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.108
y[1] (analytic) = 0
y[1] (numeric) = 0.0071094126501986056424260864236375
absolute error = 0.0071094126501986056424260864236375
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.732
Order of pole = 0.3967
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.109
y[1] (analytic) = 0
y[1] (numeric) = 0.0079938422666342229532078455623673
absolute error = 0.0079938422666342229532078455623673
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.726
Order of pole = 0.3998
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.11
y[1] (analytic) = 0
y[1] (numeric) = 0.0088773353380664871566692276300873
absolute error = 0.0088773353380664871566692276300873
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.721
Order of pole = 0.4029
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=7.6MB, alloc=3.9MB, time=0.70
x[1] = 0.111
y[1] (analytic) = 0
y[1] (numeric) = 0.009759894018437598751129280042722
absolute error = 0.009759894018437598751129280042722
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.715
Order of pole = 0.4061
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.112
y[1] (analytic) = 0
y[1] (numeric) = 0.010641520456796961181006271029877
absolute error = 0.010641520456796961181006271029877
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.709
Order of pole = 0.4093
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.113
y[1] (analytic) = 0
y[1] (numeric) = 0.011522216797314859499033964248921
absolute error = 0.011522216797314859499033964248921
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.703
Order of pole = 0.4126
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.114
y[1] (analytic) = 0
y[1] (numeric) = 0.012401985179296097149580525493285
absolute error = 0.012401985179296097149580525493285
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.697
Order of pole = 0.4159
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.115
y[1] (analytic) = 0
y[1] (numeric) = 0.013280827737193591018540630279007
absolute error = 0.013280827737193591018540630279007
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.69
Order of pole = 0.4193
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.116
y[1] (analytic) = 0
y[1] (numeric) = 0.014158746600621924894687422166529
absolute error = 0.014158746600621924894687422166529
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.684
Order of pole = 0.4227
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.117
y[1] (analytic) = 0
y[1] (numeric) = 0.015035743894370861486789773243165
absolute error = 0.015035743894370861486789773243165
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.678
Order of pole = 0.4262
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.118
y[1] (analytic) = 0
y[1] (numeric) = 0.01591182173841881314022180549638
absolute error = 0.01591182173841881314022180549638
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.672
Order of pole = 0.4297
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=11.4MB, alloc=4.1MB, time=1.07
x[1] = 0.119
y[1] (analytic) = 0
y[1] (numeric) = 0.01678698224794627139621583018087
absolute error = 0.01678698224794627139621583018087
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.666
Order of pole = 0.4333
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.12
y[1] (analytic) = 0
y[1] (numeric) = 0.017661227533349195536336737145863
absolute error = 0.017661227533349195536336737145863
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.659
Order of pole = 0.437
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.121
y[1] (analytic) = 0
y[1] (numeric) = 0.018534559700252360254185402955149
absolute error = 0.018534559700252360254185402955149
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.653
Order of pole = 0.4407
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.122
y[1] (analytic) = 0
y[1] (numeric) = 0.019406980849522662595770871102562
absolute error = 0.019406980849522662595770871102562
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.646
Order of pole = 0.4445
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.123
y[1] (analytic) = 0
y[1] (numeric) = 0.020278493077282388309425875389964
absolute error = 0.020278493077282388309425875389964
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.64
Order of pole = 0.4484
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.124
y[1] (analytic) = 0
y[1] (numeric) = 0.021149098474922437745577714371212
absolute error = 0.021149098474922437745577714371212
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.633
Order of pole = 0.4523
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.125
y[1] (analytic) = 0
y[1] (numeric) = 0.022018799129115511446126526539514
absolute error = 0.022018799129115511446126526539514
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.627
Order of pole = 0.4563
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.126
y[1] (analytic) = 0
y[1] (numeric) = 0.022887597121829255562625648599277
absolute error = 0.022887597121829255562625648599277
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.62
Order of pole = 0.4603
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=15.2MB, alloc=4.1MB, time=1.46
x[1] = 0.127
y[1] (analytic) = 0
y[1] (numeric) = 0.023755494530339367241903948755332
absolute error = 0.023755494530339367241903948755332
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.613
Order of pole = 0.4644
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.128
y[1] (analytic) = 0
y[1] (numeric) = 0.024622493427242660117217799596431
absolute error = 0.024622493427242660117217799596431
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.607
Order of pole = 0.4686
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.129
y[1] (analytic) = 0
y[1] (numeric) = 0.025488595880470090042470677055153
absolute error = 0.025488595880470090042470677055153
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.6
Order of pole = 0.4728
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.13
y[1] (analytic) = 0
y[1] (numeric) = 0.026353803953299741206491229386431
absolute error = 0.026353803953299741206491229386431
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.593
Order of pole = 0.4771
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.131
y[1] (analytic) = 0
y[1] (numeric) = 0.027218119704369772763816039499213
absolute error = 0.027218119704369772763816039499213
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.586
Order of pole = 0.4815
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.132
y[1] (analytic) = 0
y[1] (numeric) = 0.028081545187691326117881191761066
absolute error = 0.028081545187691326117881191761066
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.579
Order of pole = 0.486
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.133
y[1] (analytic) = 0
y[1] (numeric) = 0.028944082452661392991987137117313
absolute error = 0.028944082452661392991987137117313
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.572
Order of pole = 0.4905
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.134
y[1] (analytic) = 0
y[1] (numeric) = 0.029805733544075644422864214650227
absolute error = 0.029805733544075644422864214650227
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.565
Order of pole = 0.4951
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.135
y[1] (analytic) = 0
y[1] (numeric) = 0.030666500502141220811131520257264
absolute error = 0.030666500502141220811131520257264
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.557
Order of pole = 0.4998
memory used=19.0MB, alloc=4.1MB, time=1.86
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.136
y[1] (analytic) = 0
y[1] (numeric) = 0.031526385362489483162409600738614
absolute error = 0.031526385362489483162409600738614
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.55
Order of pole = 0.5045
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.137
y[1] (analytic) = 0
y[1] (numeric) = 0.032385390156188725652317681122472
absolute error = 0.032385390156188725652317681122472
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.543
Order of pole = 0.5094
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.138
y[1] (analytic) = 0
y[1] (numeric) = 0.033243516909756849648058791470253
absolute error = 0.033243516909756849648058791470253
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.535
Order of pole = 0.5143
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.139
y[1] (analytic) = 0
y[1] (numeric) = 0.034100767645173999318771233721828
absolute error = 0.034100767645173999318771233721828
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.527
Order of pole = 0.5193
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.14
y[1] (analytic) = 0
y[1] (numeric) = 0.034957144379895158966302306470028
absolute error = 0.034957144379895158966302306470028
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.52
Order of pole = 0.5243
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.141
y[1] (analytic) = 0
y[1] (numeric) = 0.035812649126862712207540073079709
absolute error = 0.035812649126862712207540073079709
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.512
Order of pole = 0.5295
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.142
y[1] (analytic) = 0
y[1] (numeric) = 0.036667283894518963138921203553101
absolute error = 0.036667283894518963138921203553101
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.504
Order of pole = 0.5348
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.143
y[1] (analytic) = 0
y[1] (numeric) = 0.037521050686818619613217530330707
absolute error = 0.037521050686818619613217530330707
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.496
Order of pole = 0.5401
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=22.8MB, alloc=4.2MB, time=2.25
x[1] = 0.144
y[1] (analytic) = 0
y[1] (numeric) = 0.038373951503241238758190920223264
absolute error = 0.038373951503241238758190920223264
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.488
Order of pole = 0.5455
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.145
y[1] (analytic) = 0
y[1] (numeric) = 0.039225988338803634866195366389032
absolute error = 0.039225988338803634866195366389032
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.48
Order of pole = 0.551
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.146
y[1] (analytic) = 0
y[1] (numeric) = 0.04007716318407224978329683327158
absolute error = 0.04007716318407224978329683327158
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.472
Order of pole = 0.5566
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.147
y[1] (analytic) = 0
y[1] (numeric) = 0.040927478025175485925975331341066
absolute error = 0.040927478025175485925975331341066
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.463
Order of pole = 0.5623
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.148
y[1] (analytic) = 0
y[1] (numeric) = 0.041776934843816002052969945056445
absolute error = 0.041776934843816002052969945056445
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.455
Order of pole = 0.5681
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.149
y[1] (analytic) = 0
y[1] (numeric) = 0.0426255356172829719193260744808
absolute error = 0.0426255356172829719193260744808
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.446
Order of pole = 0.574
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.15
y[1] (analytic) = 0
y[1] (numeric) = 0.043473282318464305939204966304772
absolute error = 0.043473282318464305939204966304772
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.438
Order of pole = 0.58
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.151
y[1] (analytic) = 0
y[1] (numeric) = 0.044320176915858835983518691604548
absolute error = 0.044320176915858835983518691604548
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.429
Order of pole = 0.586
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=26.7MB, alloc=4.2MB, time=2.64
x[1] = 0.152
y[1] (analytic) = 0
y[1] (numeric) = 0.045166221373588463437959063494768
absolute error = 0.045166221373588463437959063494768
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.42
Order of pole = 0.5922
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.153
y[1] (analytic) = 0
y[1] (numeric) = 0.046011417651410270646496566018709
absolute error = 0.046011417651410270646496566018709
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.411
Order of pole = 0.5985
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.154
y[1] (analytic) = 0
y[1] (numeric) = 0.046855767704728595864935174305965
absolute error = 0.046855767704728595864935174305965
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.402
Order of pole = 0.6049
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.155
y[1] (analytic) = 0
y[1] (numeric) = 0.047699273484607071848620973450369
absolute error = 0.047699273484607071848620973450369
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.393
Order of pole = 0.6114
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.156
y[1] (analytic) = 0
y[1] (numeric) = 0.048541936937780628197916718017892
absolute error = 0.048541936937780628197916718017892
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.383
Order of pole = 0.6181
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.157
y[1] (analytic) = 0
y[1] (numeric) = 0.04938376000666745758457090395578
absolute error = 0.04938376000666745758457090395578
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.374
Order of pole = 0.6248
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.158
y[1] (analytic) = 0
y[1] (numeric) = 0.050224744629380945981628538380197
absolute error = 0.050224744629380945981628538380197
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.364
Order of pole = 0.6316
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.159
y[1] (analytic) = 0
y[1] (numeric) = 0.051064892739741567019051578779541
absolute error = 0.051064892739741567019051578779541
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.354
Order of pole = 0.6386
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.16
y[1] (analytic) = 0
y[1] (numeric) = 0.051904206267288740586739960162659
absolute error = 0.051904206267288740586739960162659
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.344
Order of pole = 0.6457
memory used=30.5MB, alloc=4.3MB, time=3.04
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.161
y[1] (analytic) = 0
y[1] (numeric) = 0.052742687137292655806169225252273
absolute error = 0.052742687137292655806169225252273
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.334
Order of pole = 0.6529
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.162
y[1] (analytic) = 0
y[1] (numeric) = 0.053580337270766058491388007688802
absolute error = 0.053580337270766058491388007688802
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.323
Order of pole = 0.6602
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.163
y[1] (analytic) = 0
y[1] (numeric) = 0.054417158584476003219647980150908
absolute error = 0.054417158584476003219647980150908
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.313
Order of pole = 0.6677
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.164
y[1] (analytic) = 0
y[1] (numeric) = 0.055253152990955570131470357165981
absolute error = 0.055253152990955570131470357165981
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.302
Order of pole = 0.6753
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.165
y[1] (analytic) = 0
y[1] (numeric) = 0.056088322398515546579486625092652
absolute error = 0.056088322398515546579486625092652
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.291
Order of pole = 0.683
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.166
y[1] (analytic) = 0
y[1] (numeric) = 0.056922668711256073744926848290714
absolute error = 0.056922668711256073744926848290714
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.28
Order of pole = 0.6908
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.167
y[1] (analytic) = 0
y[1] (numeric) = 0.05775619382907825834016665989977
absolute error = 0.05775619382907825834016665989977
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.269
Order of pole = 0.6988
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.168
y[1] (analytic) = 0
y[1] (numeric) = 0.058588899647695749515283877040127
absolute error = 0.058588899647695749515283877040127
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.257
Order of pole = 0.707
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=34.3MB, alloc=4.3MB, time=3.43
x[1] = 0.169
y[1] (analytic) = 0
y[1] (numeric) = 0.059420788058646281086117572806399
absolute error = 0.059420788058646281086117572806399
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.245
Order of pole = 0.7152
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.17
y[1] (analytic) = 0
y[1] (numeric) = 0.060251860949303179200866380388984
absolute error = 0.060251860949303179200866380388984
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.233
Order of pole = 0.7237
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.171
y[1] (analytic) = 0
y[1] (numeric) = 0.061082120202886835561808787338113
absolute error = 0.061082120202886835561808787338113
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.221
Order of pole = 0.7322
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.172
y[1] (analytic) = 0
y[1] (numeric) = 0.061911567698476146318276189750206
absolute error = 0.061911567698476146318276189750206
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.209
Order of pole = 0.741
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.173
y[1] (analytic) = 0
y[1] (numeric) = 0.062740205311019916746559506440758
absolute error = 0.062740205311019916746559506440758
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.196
Order of pole = 0.7498
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.174
y[1] (analytic) = 0
y[1] (numeric) = 0.063568034911348231831982191468594
absolute error = 0.063568034911348231831982191468594
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.183
Order of pole = 0.7589
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.175
y[1] (analytic) = 0
y[1] (numeric) = 0.064395058366183792867926519252188
absolute error = 0.064395058366183792867926519252188
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.17
Order of pole = 0.7681
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.176
y[1] (analytic) = 0
y[1] (numeric) = 0.065221277538153220186156039590895
absolute error = 0.065221277538153220186156039590895
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.156
Order of pole = 0.7775
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=38.1MB, alloc=4.3MB, time=3.83
x[1] = 0.177
y[1] (analytic) = 0
y[1] (numeric) = 0.066046694285798322132335099854992
absolute error = 0.066046694285798322132335099854992
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.142
Order of pole = 0.787
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.178
y[1] (analytic) = 0
y[1] (numeric) = 0.066871310463587330400206298182147
absolute error = 0.066871310463587330400206298182147
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.128
Order of pole = 0.7967
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.179
y[1] (analytic) = 0
y[1] (numeric) = 0.06769512792192610183744865451887
absolute error = 0.06769512792192610183744865451887
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.114
Order of pole = 0.8066
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.18
y[1] (analytic) = 0
y[1] (numeric) = 0.068518148507169286835803155638426
absolute error = 0.068518148507169286835803155638426
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.099
Order of pole = 0.8167
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.181
y[1] (analytic) = 0
y[1] (numeric) = 0.069340374061631464417618135776531
absolute error = 0.069340374061631464417618135776531
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.084
Order of pole = 0.827
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.182
y[1] (analytic) = 0
y[1] (numeric) = 0.070161806423598244130534686237161
absolute error = 0.070161806423598244130534686237161
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.068
Order of pole = 0.8374
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.183
y[1] (analytic) = 0
y[1] (numeric) = 0.070982447427337334861601935276568
absolute error = 0.070982447427337334861601935276568
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.052
Order of pole = 0.8481
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.184
y[1] (analytic) = 0
y[1] (numeric) = 0.07180229890310958068168359387638
absolute error = 0.07180229890310958068168359387638
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.035
Order of pole = 0.859
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.185
y[1] (analytic) = 0
y[1] (numeric) = 0.072621362677179963830590613827142
absolute error = 0.072621362677179963830590613827142
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.018
Order of pole = 0.87
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=41.9MB, alloc=4.3MB, time=4.22
x[1] = 0.186
y[1] (analytic) = 0
y[1] (numeric) = 0.073439640571828574952950142080528
absolute error = 0.073439640571828574952950142080528
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 1.001
Order of pole = 0.8813
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.187
y[1] (analytic) = 0
y[1] (numeric) = 0.074257134405361550694398169867978
absolute error = 0.074257134405361550694398169867978
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.9829
Order of pole = 0.8928
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.188
y[1] (analytic) = 0
y[1] (numeric) = 0.075073845992121978767262356959256
absolute error = 0.075073845992121978767262356959256
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.9643
Order of pole = 0.9045
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.189
y[1] (analytic) = 0
y[1] (numeric) = 0.075889777142500770594482451036779
absolute error = 0.075889777142500770594482451036779
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.9452
Order of pole = 0.9164
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.19
y[1] (analytic) = 0
y[1] (numeric) = 0.076704929662947501640098509937415
absolute error = 0.076704929662947501640098509937415
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.9254
Order of pole = 0.9286
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.191
y[1] (analytic) = 0
y[1] (numeric) = 0.077519305355981219534221760965814
absolute error = 0.077519305355981219534221760965814
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.9049
Order of pole = 0.941
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.192
y[1] (analytic) = 0
y[1] (numeric) = 0.078332906020201220099989387170982
absolute error = 0.078332906020201220099989387170982
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.8836
Order of pole = 0.9537
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.193
y[1] (analytic) = 0
y[1] (numeric) = 0.079145733450297791389592806014901
absolute error = 0.079145733450297791389592806014901
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.8616
Order of pole = 0.9666
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=45.7MB, alloc=4.3MB, time=4.62
x[1] = 0.194
y[1] (analytic) = 0
y[1] (numeric) = 0.079957789437062925836059091917704
absolute error = 0.079957789437062925836059091917704
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.8386
Order of pole = 0.9797
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.195
y[1] (analytic) = 0
y[1] (numeric) = 0.080769075767401000627057081462096
absolute error = 0.080769075767401000627057081462096
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.8147
Order of pole = 0.9931
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.196
y[1] (analytic) = 0
y[1] (numeric) = 0.081579594224339426406593379358526
absolute error = 0.081579594224339426406593379358526
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.7897
Order of pole = 1.007
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.197
y[1] (analytic) = 0
y[1] (numeric) = 0.08238934658703926441005894544418
absolute error = 0.08238934658703926441005894544418
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.7636
Order of pole = 1.021
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.198
y[1] (analytic) = 0
y[1] (numeric) = 0.083198334630805812137684178898865
absolute error = 0.083198334630805812137684178898865
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.7361
Order of pole = 1.035
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.199
y[1] (analytic) = 0
y[1] (numeric) = 0.084006560127099157671059416448317
absolute error = 0.084006560127099157671059416448317
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.7072
Order of pole = 1.05
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.2
y[1] (analytic) = 0
y[1] (numeric) = 0.084814024843544702736978517582197
absolute error = 0.084814024843544702736978517582197
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.6765
Order of pole = 1.064
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.201
y[1] (analytic) = 0
y[1] (numeric) = 0.08562073054394365462246571278453
absolute error = 0.08562073054394365462246571278453
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.644
Order of pole = 1.08
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.202
y[1] (analytic) = 0
y[1] (numeric) = 0.0864266789882834870444501315552
absolute error = 0.0864266789882834870444501315552
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.6092
Order of pole = 1.095
memory used=49.5MB, alloc=4.3MB, time=5.02
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.203
y[1] (analytic) = 0
y[1] (numeric) = 0.087231871932748370077158396740915
absolute error = 0.087231871932748370077158396740915
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.5717
Order of pole = 1.111
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.204
y[1] (analytic) = 0
y[1] (numeric) = 0.088036311129729569239903361592826
absolute error = 0.088036311129729569239903361592826
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.531
Order of pole = 1.127
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.205
y[1] (analytic) = 0
y[1] (numeric) = 0.088839998327835813847556467277037
absolute error = 0.088839998327835813847556467277037
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.4862
Order of pole = 1.143
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.206
y[1] (analytic) = 0
y[1] (numeric) = 0.08964293527190363472560230258572
absolute error = 0.08964293527190363472560230258572
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.436
Order of pole = 1.16
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.207
y[1] (analytic) = 0
y[1] (numeric) = 0.090445123703007671391286745683141
absolute error = 0.090445123703007671391286745683141
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.3783
Order of pole = 1.177
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.208
y[1] (analytic) = 0
y[1] (numeric) = 0.091246565358470948801984551275528
absolute error = 0.091246565358470948801984551275528
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.3087
Order of pole = 1.195
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.209
y[1] (analytic) = 0
y[1] (numeric) = 0.092047261971875123771528407069164
absolute error = 0.092047261971875123771528407069164
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 0.2163
Order of pole = 1.213
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.21
y[1] (analytic) = 0
y[1] (numeric) = 0.092847215273070701154859312279756
absolute error = 0.092847215273070701154859312279756
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=53.4MB, alloc=4.3MB, time=5.41
x[1] = 0.211
y[1] (analytic) = 0
y[1] (numeric) = 0.093646426988187219900977619829587
absolute error = 0.093646426988187219900977619829587
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.212
y[1] (analytic) = 0
y[1] (numeric) = 0.094444898839643409073795224317798
absolute error = 0.094444898839643409073795224317798
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.213
y[1] (analytic) = 0
y[1] (numeric) = 0.09524263254615731394011216152248
absolute error = 0.09524263254615731394011216152248
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.214
y[1] (analytic) = 0
y[1] (numeric) = 0.096039629822756392223565303788526
absolute error = 0.096039629822756392223565303788526
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.215
y[1] (analytic) = 0
y[1] (numeric) = 0.096835892380787580623022880917892
absolute error = 0.096835892380787580623022880917892
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.216
y[1] (analytic) = 0
y[1] (numeric) = 0.097631421927927331693526219902072
absolute error = 0.097631421927927331693526219902072
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.217
y[1] (analytic) = 0
y[1] (numeric) = 0.098426220168191621187509370860723
absolute error = 0.098426220168191621187509370860723
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.218
y[1] (analytic) = 0
y[1] (numeric) = 0.099220288801945925953658162763032
absolute error = 0.099220288801945925953658162763032
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.219
y[1] (analytic) = 0
y[1] (numeric) = 0.10001362952591517249040270284384
absolute error = 0.10001362952591517249040270284384
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=57.2MB, alloc=4.3MB, time=5.80
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.22
y[1] (analytic) = 0
y[1] (numeric) = 0.10080624403319365625067139006555
absolute error = 0.10080624403319365625067139006555
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.221
y[1] (analytic) = 0
y[1] (numeric) = 0.10159813401325493179417014754624
absolute error = 0.10159813401325493179417014754624
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.222
y[1] (analytic) = 0
y[1] (numeric) = 0.10238930115196167388308778364715
absolute error = 0.10238930115196167388308778364715
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.223
y[1] (analytic) = 0
y[1] (numeric) = 0.10317974713157550961676715850696
absolute error = 0.10317974713157550961676715850696
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.224
y[1] (analytic) = 0
y[1] (numeric) = 0.10396947363076682170052215438957
absolute error = 0.10396947363076682170052215438957
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.225
y[1] (analytic) = 0
y[1] (numeric) = 0.10475848232462452294342231648551
absolute error = 0.10475848232462452294342231648551
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.226
y[1] (analytic) = 0
y[1] (numeric) = 0.10554677488466580207951043802721
absolute error = 0.10554677488466580207951043802721
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.227
y[1] (analytic) = 0
y[1] (numeric) = 0.10633435297884584100656330204348
absolute error = 0.10633435297884584100656330204348
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=61.0MB, alloc=4.3MB, time=6.21
x[1] = 0.228
y[1] (analytic) = 0
y[1] (numeric) = 0.1071212182715675035361522541302
absolute error = 0.1071212182715675035361522541302
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.229
y[1] (analytic) = 0
y[1] (numeric) = 0.10790737242369099574840825863796
absolute error = 0.10790737242369099574840825863796
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.23
y[1] (analytic) = 0
y[1] (numeric) = 0.10869281709254349804454557710288
absolute error = 0.10869281709254349804454557710288
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.231
y[1] (analytic) = 0
y[1] (numeric) = 0.1094775539319287689898491950462
absolute error = 0.1094775539319287689898491950462
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.232
y[1] (analytic) = 0
y[1] (numeric) = 0.11026158459213672103948360395681
absolute error = 0.11026158459213672103948360395681
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.233
y[1] (analytic) = 0
y[1] (numeric) = 0.11104491071995296823913451190774
absolute error = 0.11104491071995296823913451190774
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.234
y[1] (analytic) = 0
y[1] (numeric) = 0.11182753395866834599215050144239
absolute error = 0.11182753395866834599215050144239
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.235
y[1] (analytic) = 0
y[1] (numeric) = 0.11260945594808840298450856974265
absolute error = 0.11260945594808840298450856974265
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.236
y[1] (analytic) = 0
y[1] (numeric) = 0.11339067832454286535858586634352
absolute error = 0.11339067832454286535858586634352
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=64.8MB, alloc=4.3MB, time=6.61
x[1] = 0.237
y[1] (analytic) = 0
y[1] (numeric) = 0.1141712027208950732263797805137
absolute error = 0.1141712027208950732263797805137
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.238
y[1] (analytic) = 0
y[1] (numeric) = 0.11495103076655138961247981664713
absolute error = 0.11495103076655138961247981664713
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.239
y[1] (analytic) = 0
y[1] (numeric) = 0.11573016408747058191675742441512
absolute error = 0.11573016408747058191675742441512
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.24
y[1] (analytic) = 0
y[1] (numeric) = 0.11650860430617317598640411386276
absolute error = 0.11650860430617317598640411386276
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.241
y[1] (analytic) = 0
y[1] (numeric) = 0.11728635304175078288661377698683
absolute error = 0.11728635304175078288661377698683
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.242
y[1] (analytic) = 0
y[1] (numeric) = 0.11806341190987539845887214953629
absolute error = 0.11806341190987539845887214953629
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.243
y[1] (analytic) = 0
y[1] (numeric) = 0.11883978252280867575548477280185
absolute error = 0.11883978252280867575548477280185
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.244
y[1] (analytic) = 0
y[1] (numeric) = 0.11961546648941117043864464801793
absolute error = 0.11961546648941117043864464801793
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=68.6MB, alloc=4.3MB, time=7.02
x[1] = 0.245
y[1] (analytic) = 0
y[1] (numeric) = 0.12039046541515155923201200873981
absolute error = 0.12039046541515155923201200873981
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.246
y[1] (analytic) = 0
y[1] (numeric) = 0.12116478090211583151245126226975
absolute error = 0.12116478090211583151245126226975
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.247
y[1] (analytic) = 0
y[1] (numeric) = 0.12193841454901645412924416301733
absolute error = 0.12193841454901645412924416301733
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.248
y[1] (analytic) = 0
y[1] (numeric) = 0.1227113679512015095377736717588
absolute error = 0.1227113679512015095377736717588
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.249
y[1] (analytic) = 0
y[1] (numeric) = 0.12348364270066380733434971831358
absolute error = 0.12348364270066380733434971831358
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.25
y[1] (analytic) = 0
y[1] (numeric) = 0.12425524038604996927852621442817
absolute error = 0.12425524038604996927852621442817
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.251
y[1] (analytic) = 0
y[1] (numeric) = 0.12502616259266948788893815193058
absolute error = 0.12502616259266948788893815193058
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.252
y[1] (analytic) = 0
y[1] (numeric) = 0.12579641090250375869836846181288
absolute error = 0.12579641090250375869836846181288
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.253
y[1] (analytic) = 0
y[1] (numeric) = 0.12656598689421508625343649617324
absolute error = 0.12656598689421508625343649617324
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=72.4MB, alloc=4.3MB, time=7.39
x[1] = 0.254
y[1] (analytic) = 0
y[1] (numeric) = 0.12733489214315566394398352029744
absolute error = 0.12733489214315566394398352029744
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.255
y[1] (analytic) = 0
y[1] (numeric) = 0.12810312822137652774691546001591
absolute error = 0.12810312822137652774691546001591
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.256
y[1] (analytic) = 0
y[1] (numeric) = 0.12887069669763648396894933330514
absolute error = 0.12887069669763648396894933330514
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.257
y[1] (analytic) = 0
y[1] (numeric) = 0.12963759913741101107239729841832
absolute error = 0.12963759913741101107239729841832
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.258
y[1] (analytic) = 0
y[1] (numeric) = 0.13040383710290113566781106717115
absolute error = 0.13040383710290113566781106717115
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.259
y[1] (analytic) = 0
y[1] (numeric) = 0.13116941215304228275699955495503
absolute error = 0.13116941215304228275699955495503
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.26
y[1] (analytic) = 0
y[1] (numeric) = 0.13193432584351310030962406221452
absolute error = 0.13193432584351310030962406221452
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.261
y[1] (analytic) = 0
y[1] (numeric) = 0.13269857972674425825626799916103
absolute error = 0.13269857972674425825626799916103
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=76.2MB, alloc=4.4MB, time=7.76
x[1] = 0.262
y[1] (analytic) = 0
y[1] (numeric) = 0.13346217535192722198057217008537
absolute error = 0.13346217535192722198057217008537
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.263
y[1] (analytic) = 0
y[1] (numeric) = 0.13422511426502300039272191949999
absolute error = 0.13422511426502300039272191949999
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.264
y[1] (analytic) = 0
y[1] (numeric) = 0.13498739800877086866626900324387
absolute error = 0.13498739800877086866626900324387
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.265
y[1] (analytic) = 0
y[1] (numeric) = 0.13574902812269706571996887741033
absolute error = 0.13574902812269706571996887741033
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.266
y[1] (analytic) = 0
y[1] (numeric) = 0.13651000614312346652601319033709
absolute error = 0.13651000614312346652601319033709
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.267
y[1] (analytic) = 0
y[1] (numeric) = 0.13727033360317622932573761178864
absolute error = 0.13727033360317622932573761178864
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.268
y[1] (analytic) = 0
y[1] (numeric) = 0.13803001203279441783358673275866
absolute error = 0.13803001203279441783358673275866
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.269
y[1] (analytic) = 0
y[1] (numeric) = 0.13878904295873859850982061295342
absolute error = 0.13878904295873859850982061295342
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.27
y[1] (analytic) = 0
y[1] (numeric) = 0.13954742790459941298215163494833
absolute error = 0.13954742790459941298215163494833
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=80.1MB, alloc=4.4MB, time=8.13
x[1] = 0.271
y[1] (analytic) = 0
y[1] (numeric) = 0.14030516839080612569620563823531
absolute error = 0.14030516839080612569620563823531
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.272
y[1] (analytic) = 0
y[1] (numeric) = 0.14106226593463514687440784692824
absolute error = 0.14106226593463514687440784692824
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.273
y[1] (analytic) = 0
y[1] (numeric) = 0.14181872205021853086260186582961
absolute error = 0.14181872205021853086260186582961
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.274
y[1] (analytic) = 0
y[1] (numeric) = 0.14257453824855244994341899497984
absolute error = 0.14257453824855244994341899497984
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.275
y[1] (analytic) = 0
y[1] (numeric) = 0.14332971603750564369512529683993
absolute error = 0.14332971603750564369512529683993
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.276
y[1] (analytic) = 0
y[1] (numeric) = 0.1440842569218278439743852370588
absolute error = 0.1440842569218278439743852370588
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.277
y[1] (analytic) = 0
y[1] (numeric) = 0.14483816240315817560109330354288
absolute error = 0.14483816240315817560109330354288
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.278
y[1] (analytic) = 0
y[1] (numeric) = 0.14559143398003353282313878350216
absolute error = 0.14559143398003353282313878350216
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.279
y[1] (analytic) = 0
y[1] (numeric) = 0.14634407314789693163868383855201
absolute error = 0.14634407314789693163868383855201
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=83.9MB, alloc=4.4MB, time=8.51
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.28
y[1] (analytic) = 0
y[1] (numeric) = 0.14709608139910583805325115809245
absolute error = 0.14709608139910583805325115809245
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.281
y[1] (analytic) = 0
y[1] (numeric) = 0.14784746022294047234863478538726
absolute error = 0.14784746022294047234863478538726
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.282
y[1] (analytic) = 0
y[1] (numeric) = 0.14859821110561208944036619337669
absolute error = 0.14859821110561208944036619337669
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.283
y[1] (analytic) = 0
y[1] (numeric) = 0.14934833553027123540018733266232
absolute error = 0.14934833553027123540018733266232
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.284
y[1] (analytic) = 0
y[1] (numeric) = 0.15009783497701598021970317671603
absolute error = 0.15009783497701598021970317671603
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.285
y[1] (analytic) = 0
y[1] (numeric) = 0.15084671092290012689110824363132
absolute error = 0.15084671092290012689110824363132
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.286
y[1] (analytic) = 0
y[1] (numeric) = 0.15159496484194139688060467413075
absolute error = 0.15159496484194139688060467413075
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.287
y[1] (analytic) = 0
y[1] (numeric) = 0.15234259820512959206985368657379
absolute error = 0.15234259820512959206985368657379
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=87.7MB, alloc=4.4MB, time=8.89
x[1] = 0.288
y[1] (analytic) = 0
y[1] (numeric) = 0.15308961248043473324052760591131
absolute error = 0.15308961248043473324052760591131
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.289
y[1] (analytic) = 0
y[1] (numeric) = 0.15383600913281517517675616947288
absolute error = 0.15383600913281517517675616947288
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.29
y[1] (analytic) = 0
y[1] (numeric) = 0.15458178962422569845998844274673
absolute error = 0.15458178962422569845998844274673
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.291
y[1] (analytic) = 0
y[1] (numeric) = 0.15532695541362557803052042754623
absolute error = 0.15532695541362557803052042754623
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.292
y[1] (analytic) = 0
y[1] (numeric) = 0.15607150795698662858966830780562
absolute error = 0.15607150795698662858966830780562
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.293
y[1] (analytic) = 0
y[1] (numeric) = 0.15681544870730122691629824939699
absolute error = 0.15681544870730122691629824939699
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.294
y[1] (analytic) = 0
y[1] (numeric) = 0.15755877911459031117115574452319
absolute error = 0.15755877911459031117115574452319
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.295
y[1] (analytic) = 0
y[1] (numeric) = 0.15830150062591135726217066316079
absolute error = 0.15830150062591135726217066316079
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.296
y[1] (analytic) = 0
y[1] (numeric) = 0.15904361468536633234364843847432
absolute error = 0.15904361468536633234364843847432
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
memory used=91.5MB, alloc=4.4MB, time=9.29
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.297
y[1] (analytic) = 0
y[1] (numeric) = 0.15978512273410962552199316489861
absolute error = 0.15978512273410962552199316489861
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.298
y[1] (analytic) = 0
y[1] (numeric) = 0.16052602621035595584034482151772
absolute error = 0.16052602621035595584034482151772
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.299
y[1] (analytic) = 0
y[1] (numeric) = 0.16126632654938825761425034431427
absolute error = 0.16126632654938825761425034431427
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.3
y[1] (analytic) = 0
y[1] (numeric) = 0.16200602518356554319022685370609
absolute error = 0.16200602518356554319022685370609
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.301
y[1] (analytic) = 0
y[1] (numeric) = 0.16274512354233074319881499344117
absolute error = 0.16274512354233074319881499344117
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.302
y[1] (analytic) = 0
y[1] (numeric) = 0.16348362305221852437346104832694
absolute error = 0.16348362305221852437346104832694
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.303
y[1] (analytic) = 0
y[1] (numeric) = 0.16422152513686308500630827639414
absolute error = 0.16422152513686308500630827639414
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.304
y[1] (analytic) = 0
y[1] (numeric) = 0.16495883121700592811172071093414
absolute error = 0.16495883121700592811172071093414
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=95.3MB, alloc=4.4MB, time=9.69
x[1] = 0.305
y[1] (analytic) = 0
y[1] (numeric) = 0.16569554271050361236810655442422
absolute error = 0.16569554271050361236810655442422
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.306
y[1] (analytic) = 0
y[1] (numeric) = 0.16643166103233548090835319471759
absolute error = 0.16643166103233548090835319471759
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.307
y[1] (analytic) = 0
y[1] (numeric) = 0.16716718759461136802893181910002
absolute error = 0.16716718759461136802893181910002
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.308
y[1] (analytic) = 0
y[1] (numeric) = 0.16790212380657928388747657900674
absolute error = 0.16790212380657928388747657900674
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.309
y[1] (analytic) = 0
y[1] (numeric) = 0.16863647107463307725839126248075
absolute error = 0.16863647107463307725839126248075
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.31
y[1] (analytic) = 0
y[1] (numeric) = 0.16937023080232007641578545799346
absolute error = 0.16937023080232007641578545799346
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.311
y[1] (analytic) = 0
y[1] (numeric) = 0.17010340439034870821279223722315
absolute error = 0.17010340439034870821279223722315
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.312
y[1] (analytic) = 0
y[1] (numeric) = 0.17083599323659609542607044100402
absolute error = 0.17083599323659609542607044100402
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.313
y[1] (analytic) = 0
y[1] (numeric) = 0.1715679987361156324340467171538
absolute error = 0.1715679987361156324340467171538
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=99.1MB, alloc=4.4MB, time=10.08
x[1] = 0.314
y[1] (analytic) = 0
y[1] (numeric) = 0.17229942228114453929720552652021
absolute error = 0.17229942228114453929720552652021
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.315
y[1] (analytic) = 0
y[1] (numeric) = 0.17303026526111139430848939964273
absolute error = 0.17303026526111139430848939964273
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.316
y[1] (analytic) = 0
y[1] (numeric) = 0.17376052906264364508162678621651
absolute error = 0.17376052906264364508162678621651
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.317
y[1] (analytic) = 0
y[1] (numeric) = 0.17449021506957509824496088840683
absolute error = 0.17449021506957509824496088840683
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.318
y[1] (analytic) = 0
y[1] (numeric) = 0.17521932466295338780810990235694
absolute error = 0.17521932466295338780810990235694
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.319
y[1] (analytic) = 0
y[1] (numeric) = 0.17594785922104742226854710534549
absolute error = 0.17594785922104742226854710534549
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.32
y[1] (analytic) = 0
y[1] (numeric) = 0.1766758201193548105249482143944
absolute error = 0.1766758201193548105249482143944
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.321
y[1] (analytic) = 0
y[1] (numeric) = 0.17740320873060926666391340113911
absolute error = 0.17740320873060926666391340113911
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=103.0MB, alloc=4.4MB, time=10.48
x[1] = 0.322
y[1] (analytic) = 0
y[1] (numeric) = 0.17813002642478799368643227291228
absolute error = 0.17813002642478799368643227291228
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.323
y[1] (analytic) = 0
y[1] (numeric) = 0.1788562745691190462402220167436
absolute error = 0.1788562745691190462402220167436
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.324
y[1] (analytic) = 0
y[1] (numeric) = 0.17958195452808867242383174685199
absolute error = 0.17958195452808867242383174685199
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.325
y[1] (analytic) = 0
y[1] (numeric) = 0.18030706766344863472816989273563
absolute error = 0.18030706766344863472816989273563
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.326
y[1] (analytic) = 0
y[1] (numeric) = 0.18103161533422351018087620970712
absolute error = 0.18103161533422351018087620970712
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.327
y[1] (analytic) = 0
y[1] (numeric) = 0.18175559889671796975872568225691
absolute error = 0.18175559889671796975872568225691
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.328
y[1] (analytic) = 0
y[1] (numeric) = 0.18247901970452403713301821856284
absolute error = 0.18247901970452403713301821856284
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.329
y[1] (analytic) = 0
y[1] (numeric) = 0.18320187910852832681267559742539
absolute error = 0.18320187910852832681267559742539
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.33
y[1] (analytic) = 0
y[1] (numeric) = 0.18392417845691926174953562254894
absolute error = 0.18392417845691926174953562254894
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=106.8MB, alloc=4.4MB, time=10.89
x[1] = 0.331
y[1] (analytic) = 0
y[1] (numeric) = 0.18464591909519427047010285908397
absolute error = 0.18464591909519427047010285908397
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.332
y[1] (analytic) = 0
y[1] (numeric) = 0.18536710236616696379778566939153
absolute error = 0.18536710236616696379778566939153
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.333
y[1] (analytic) = 0
y[1] (numeric) = 0.18608772960997429122942052481081
absolute error = 0.18608772960997429122942052481081
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.334
y[1] (analytic) = 0
y[1] (numeric) = 0.18680780216408367702965674354692
absolute error = 0.18680780216408367702965674354692
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.335
y[1] (analytic) = 0
y[1] (numeric) = 0.18752732136330013610654788741564
absolute error = 0.18752732136330013610654788741564
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.336
y[1] (analytic) = 0
y[1] (numeric) = 0.18824628853977336973147003787395
absolute error = 0.18824628853977336973147003787395
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.337
y[1] (analytic) = 0
y[1] (numeric) = 0.18896470502300484116626206034126
absolute error = 0.18896470502300484116626206034126
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.338
y[1] (analytic) = 0
y[1] (numeric) = 0.18968257213985483126025875110996
absolute error = 0.18968257213985483126025875110996
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.339
y[1] (analytic) = 0
y[1] (numeric) = 0.19039989121454947407966443901151
absolute error = 0.19039989121454947407966443901151
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=110.6MB, alloc=4.4MB, time=11.29
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.34
y[1] (analytic) = 0
y[1] (numeric) = 0.19111666356868777263149218032326
absolute error = 0.19111666356868777263149218032326
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.341
y[1] (analytic) = 0
y[1] (numeric) = 0.19183289052124859474407213607184
absolute error = 0.19183289052124859474407213607184
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.342
y[1] (analytic) = 0
y[1] (numeric) = 0.19254857338859764916591205183253
absolute error = 0.19254857338859764916591205183253
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.343
y[1] (analytic) = 0
y[1] (numeric) = 0.1932637134844944419444729672839
absolute error = 0.1932637134844944419444729672839
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.344
y[1] (analytic) = 0
y[1] (numeric) = 0.19397831212009921314620436211774
absolute error = 0.19397831212009921314620436211774
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.345
y[1] (analytic) = 0
y[1] (numeric) = 0.19469237060397985397896489241238
absolute error = 0.19469237060397985397896489241238
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.346
y[1] (analytic) = 0
y[1] (numeric) = 0.19540589024211880437773768325939
absolute error = 0.19540589024211880437773768325939
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.347
y[1] (analytic) = 0
y[1] (numeric) = 0.19611887233791993111433281531886
absolute error = 0.19611887233791993111433281531886
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=114.4MB, alloc=4.4MB, time=11.69
x[1] = 0.348
y[1] (analytic) = 0
y[1] (numeric) = 0.19683131819221538649155417111544
absolute error = 0.19683131819221538649155417111544
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.349
y[1] (analytic) = 0
y[1] (numeric) = 0.19754322910327244768209318734694
absolute error = 0.19754322910327244768209318734694
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.35
y[1] (analytic) = 0
y[1] (numeric) = 0.1982546063668003367721982883503
absolute error = 0.1982546063668003367721982883503
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.351
y[1] (analytic) = 0
y[1] (numeric) = 0.19896545127595702156995584926787
absolute error = 0.19896545127595702156995584926787
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.352
y[1] (analytic) = 0
y[1] (numeric) = 0.19967576512135599723780645151218
absolute error = 0.19967576512135599723780645151218
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.353
y[1] (analytic) = 0
y[1] (numeric) = 0.20038554919107304880870894399243
absolute error = 0.20038554919107304880870894399243
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.354
y[1] (analytic) = 0
y[1] (numeric) = 0.20109480477065299464515440741338
absolute error = 0.20109480477065299464515440741338
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.355
y[1] (analytic) = 0
y[1] (numeric) = 0.20180353314311641090002253197992
absolute error = 0.20180353314311641090002253197992
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.356
y[1] (analytic) = 0
y[1] (numeric) = 0.20251173558896633703806415725173
absolute error = 0.20251173558896633703806415725173
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=118.2MB, alloc=4.4MB, time=12.08
x[1] = 0.357
y[1] (analytic) = 0
y[1] (numeric) = 0.2032194133861949624765857829241
absolute error = 0.2032194133861949624765857829241
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.358
y[1] (analytic) = 0
y[1] (numeric) = 0.20392656781029029440370473721665
absolute error = 0.20392656781029029440370473721665
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.359
y[1] (analytic) = 0
y[1] (numeric) = 0.20463320013424280683233738160268
absolute error = 0.20463320013424280683233738160268
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.36
y[1] (analytic) = 0
y[1] (numeric) = 0.20533931162855207094787723310063
absolute error = 0.20533931162855207094787723310063
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.361
y[1] (analytic) = 0
y[1] (numeric) = 0.20604490356123336680731519458649
absolute error = 0.20604490356123336680731519458649
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.362
y[1] (analytic) = 0
y[1] (numeric) = 0.20674997719782427644735019590248
absolute error = 0.20674997719782427644735019590248
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.363
y[1] (analytic) = 0
y[1] (numeric) = 0.20745453380139125845883546028297
absolute error = 0.20745453380139125845883546028297
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.364
y[1] (analytic) = 0
y[1] (numeric) = 0.20815857463253620408470331816141
absolute error = 0.20815857463253620408470331816141
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=122.0MB, alloc=4.4MB, time=12.50
x[1] = 0.365
y[1] (analytic) = 0
y[1] (numeric) = 0.20886210094940297489830999015092
absolute error = 0.20886210094940297489830999015092
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.366
y[1] (analytic) = 0
y[1] (numeric) = 0.20956511400768392211894104931162
absolute error = 0.20956511400768392211894104931162
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.367
y[1] (analytic) = 0
y[1] (numeric) = 0.21026761506062638762101834615598
absolute error = 0.21026761506062638762101834615598
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.368
y[1] (analytic) = 0
y[1] (numeric) = 0.21096960535903918669335003464286
absolute error = 0.21096960535903918669335003464286
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.369
y[1] (analytic) = 0
y[1] (numeric) = 0.21167108615129907260456697013468
absolute error = 0.21167108615129907260456697013468
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.37
y[1] (analytic) = 0
y[1] (numeric) = 0.21237205868335718303069115742049
absolute error = 0.21237205868335718303069115742049
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.371
y[1] (analytic) = 0
y[1] (numeric) = 0.21307252419874546840058510494077
absolute error = 0.21307252419874546840058510494077
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.372
y[1] (analytic) = 0
y[1] (numeric) = 0.21377248393858310221483488680419
absolute error = 0.21377248393858310221483488680419
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.373
y[1] (analytic) = 0
y[1] (numeric) = 0.2144719391415828733934244235988
absolute error = 0.2144719391415828733934244235988
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=125.8MB, alloc=4.4MB, time=12.91
x[1] = 0.374
y[1] (analytic) = 0
y[1] (numeric) = 0.21517089104405756070736396292301
absolute error = 0.21517089104405756070736396292301
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.375
y[1] (analytic) = 0
y[1] (numeric) = 0.21586934087992628934924196756725
absolute error = 0.21586934087992628934924196756725
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.376
y[1] (analytic) = 0
y[1] (numeric) = 0.21656728988072086969747659995453
absolute error = 0.21656728988072086969747659995453
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.377
y[1] (analytic) = 0
y[1] (numeric) = 0.21726473927559211832885072240399
absolute error = 0.21726473927559211832885072240399
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.378
y[1] (analytic) = 0
y[1] (numeric) = 0.21796169029131616133372281064102
absolute error = 0.21796169029131616133372281064102
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.379
y[1] (analytic) = 0
y[1] (numeric) = 0.2186581441523007199881153993818
absolute error = 0.2186581441523007199881153993818
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.38
y[1] (analytic) = 0
y[1] (numeric) = 0.21935410208059137883669264042965
absolute error = 0.21935410208059137883669264042965
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.381
y[1] (analytic) = 0
y[1] (numeric) = 0.22004956529587783624044925221089
absolute error = 0.22004956529587783624044925221089
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=129.7MB, alloc=4.4MB, time=13.30
x[1] = 0.382
y[1] (analytic) = 0
y[1] (numeric) = 0.22074453501550013744274457174396
absolute error = 0.22074453501550013744274457174396
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.383
y[1] (analytic) = 0
y[1] (numeric) = 0.22143901245445489020712758238716
absolute error = 0.22143901245445489020712758238716
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.384
y[1] (analytic) = 0
y[1] (numeric) = 0.22213299882540146308021168007655
absolute error = 0.22213299882540146308021168007655
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.385
y[1] (analytic) = 0
y[1] (numeric) = 0.22282649533866816633267155388998
absolute error = 0.22282649533866816633267155388998
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.386
y[1] (analytic) = 0
y[1] (numeric) = 0.22351950320225841563124889041828
absolute error = 0.22351950320225841563124889041828
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.387
y[1] (analytic) = 0
y[1] (numeric) = 0.22421202362185687849446866236819
absolute error = 0.22421202362185687849446866236819
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.388
y[1] (analytic) = 0
y[1] (numeric) = 0.22490405780083560358458352685832
absolute error = 0.22490405780083560358458352685832
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.389
y[1] (analytic) = 0
y[1] (numeric) = 0.2255956069402601328880803348111
absolute error = 0.2255956069402601328880803348111
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.39
y[1] (analytic) = 0
y[1] (numeric) = 0.22628667223889559683689993651735
absolute error = 0.22628667223889559683689993651735
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=133.5MB, alloc=4.4MB, time=13.71
x[1] = 0.391
y[1] (analytic) = 0
y[1] (numeric) = 0.22697725489321279242233935670035
absolute error = 0.22697725489321279242233935670035
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.392
y[1] (analytic) = 0
y[1] (numeric) = 0.2276673560973942443534240020929
absolute error = 0.2276673560973942443534240020929
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.393
y[1] (analytic) = 0
y[1] (numeric) = 0.22835697704334024931135685254036
absolute error = 0.22835697704334024931135685254036
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.394
y[1] (analytic) = 0
y[1] (numeric) = 0.22904611892067490335147156984728
absolute error = 0.22904611892067490335147156984728
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.395
y[1] (analytic) = 0
y[1] (numeric) = 0.22973478291675211250393713390314
absolute error = 0.22973478291675211250393713390314
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.396
y[1] (analytic) = 0
y[1] (numeric) = 0.23042297021666158662428297997823
absolute error = 0.23042297021666158662428297997823
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.397
y[1] (analytic) = 0
y[1] (numeric) = 0.23111068200323481654463566141341
absolute error = 0.23111068200323481654463566141341
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.398
y[1] (analytic) = 0
y[1] (numeric) = 0.2317979194570510345763807951928
absolute error = 0.2317979194570510345763807951928
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.399
y[1] (analytic) = 0
y[1] (numeric) = 0.23248468375644315841478746105777
absolute error = 0.23248468375644315841478746105777
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=137.3MB, alloc=4.4MB, time=14.10
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.4
y[1] (analytic) = 0
y[1] (numeric) = 0.23317097607750371849595631487994
absolute error = 0.23317097607750371849595631487994
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.401
y[1] (analytic) = 0
y[1] (numeric) = 0.23385679759409076885627744096262
absolute error = 0.23385679759409076885627744096262
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.402
y[1] (analytic) = 0
y[1] (numeric) = 0.23454214947783378154440940280085
absolute error = 0.23454214947783378154440940280085
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.403
y[1] (analytic) = 0
y[1] (numeric) = 0.23522703289813952463561705463288
absolute error = 0.23522703289813952463561705463288
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.404
y[1] (analytic) = 0
y[1] (numeric) = 0.23591144902219792389813244390775
absolute error = 0.23591144902219792389813244390775
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.405
y[1] (analytic) = 0
y[1] (numeric) = 0.23659539901498790816103056463703
absolute error = 0.23659539901498790816103056463703
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.406
y[1] (analytic) = 0
y[1] (numeric) = 0.23727888403928323843293981057157
absolute error = 0.23727888403928323843293981057157
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.407
y[1] (analytic) = 0
y[1] (numeric) = 0.2379619052556583208207357223383
absolute error = 0.2379619052556583208207357223383
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=141.1MB, alloc=4.4MB, time=14.50
x[1] = 0.408
y[1] (analytic) = 0
y[1] (numeric) = 0.238644463822494003297196021195
absolute error = 0.238644463822494003297196021195
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.409
y[1] (analytic) = 0
y[1] (numeric) = 0.23932656089598335636642497103433
absolute error = 0.23932656089598335636642497103433
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.41
y[1] (analytic) = 0
y[1] (numeric) = 0.2400081976301374376756858068286
absolute error = 0.2400081976301374376756858068286
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.411
y[1] (analytic) = 0
y[1] (numeric) = 0.24068937517679104062211130900471
absolute error = 0.24068937517679104062211130900471
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.412
y[1] (analytic) = 0
y[1] (numeric) = 0.24137009468560842700259458643984
absolute error = 0.24137009468560842700259458643984
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.413
y[1] (analytic) = 0
y[1] (numeric) = 0.24205035730408904375499475305266
absolute error = 0.24205035730408904375499475305266
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.414
y[1] (analytic) = 0
y[1] (numeric) = 0.24273016417757322383862544152555
absolute error = 0.24273016417757322383862544152555
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.415
y[1] (analytic) = 0
y[1] (numeric) = 0.24340951644924787130182798973961
absolute error = 0.24340951644924787130182798973961
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.416
y[1] (analytic) = 0
y[1] (numeric) = 0.24408841526015213058426565825756
absolute error = 0.24408841526015213058426565825756
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=144.9MB, alloc=4.4MB, time=14.92
x[1] = 0.417
y[1] (analytic) = 0
y[1] (numeric) = 0.24476686174918304010141038788703
absolute error = 0.24476686174918304010141038788703
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.418
y[1] (analytic) = 0
y[1] (numeric) = 0.245444857053101170158529382248
absolute error = 0.245444857053101170158529382248
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.419
y[1] (analytic) = 0
y[1] (numeric) = 0.24612240230653624524131519861774
absolute error = 0.24612240230653624524131519861774
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.42
y[1] (analytic) = 0
y[1] (numeric) = 0.24679949864199275073014004841253
absolute error = 0.24679949864199275073014004841253
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.421
y[1] (analytic) = 0
y[1] (numeric) = 0.24747614718985552408475264377906
absolute error = 0.24747614718985552408475264377906
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.422
y[1] (analytic) = 0
y[1] (numeric) = 0.24815234907839533054607417621554
absolute error = 0.24815234907839533054607417621554
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.423
y[1] (analytic) = 0
y[1] (numeric) = 0.24882810543377442340158887424169
absolute error = 0.24882810543377442340158887424169
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.424
y[1] (analytic) = 0
y[1] (numeric) = 0.24950341738005208886066405722042
absolute error = 0.24950341738005208886066405722042
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=148.7MB, alloc=4.4MB, time=15.32
x[1] = 0.425
y[1] (analytic) = 0
y[1] (numeric) = 0.25017828603919017558597467884811
absolute error = 0.25017828603919017558597467884811
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.426
y[1] (analytic) = 0
y[1] (numeric) = 0.25085271253105860892704803393382
absolute error = 0.25085271253105860892704803393382
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.427
y[1] (analytic) = 0
y[1] (numeric) = 0.25152669797344088990178558325309
absolute error = 0.25152669797344088990178558325309
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.428
y[1] (analytic) = 0
y[1] (numeric) = 0.25220024348203957897166073087462
absolute error = 0.25220024348203957897166073087462
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.429
y[1] (analytic) = 0
y[1] (numeric) = 0.25287335017048176465613386381694
absolute error = 0.25287335017048176465613386381694
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.43
y[1] (analytic) = 0
y[1] (numeric) = 0.25354601915032451703166903260863
absolute error = 0.25354601915032451703166903260863
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.431
y[1] (analytic) = 0
y[1] (numeric) = 0.25421825153106032616058031072466
absolute error = 0.25421825153106032616058031072466
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.432
y[1] (analytic) = 0
y[1] (numeric) = 0.25489004842012252549478011839045
absolute error = 0.25489004842012252549478011839045
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.433
y[1] (analytic) = 0
y[1] (numeric) = 0.25556141092289070029934662933441
absolute error = 0.25556141092289070029934662933441
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=152.5MB, alloc=4.4MB, time=15.73
x[1] = 0.434
y[1] (analytic) = 0
y[1] (numeric) = 0.25623234014269608114067279519275
absolute error = 0.25623234014269608114067279519275
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.435
y[1] (analytic) = 0
y[1] (numeric) = 0.25690283718082692248380551890236
absolute error = 0.25690283718082692248380551890236
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.436
y[1] (analytic) = 0
y[1] (numeric) = 0.25757290313653386644343008304734
absolute error = 0.25757290313653386644343008304734
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.437
y[1] (analytic) = 0
y[1] (numeric) = 0.25824253910703529173280208925326
absolute error = 0.25824253910703529173280208925326
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.438
y[1] (analytic) = 0
y[1] (numeric) = 0.25891174618752264785477688786337
absolute error = 0.25891174618752264785477688786337
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.439
y[1] (analytic) = 0
y[1] (numeric) = 0.25958052547116577457893477080929
absolute error = 0.25958052547116577457893477080929
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.44
y[1] (analytic) = 0
y[1] (numeric) = 0.26024887804911820674864906234248
absolute error = 0.26024887804911820674864906234248
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.441
y[1] (analytic) = 0
y[1] (numeric) = 0.26091680501052246446179366967302
absolute error = 0.26091680501052246446179366967302
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.442
y[1] (analytic) = 0
y[1] (numeric) = 0.26158430744251532866863664613086
absolute error = 0.26158430744251532866863664613086
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
memory used=156.4MB, alloc=4.4MB, time=16.13
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.443
y[1] (analytic) = 0
y[1] (numeric) = 0.26225138643023310223031687079702
absolute error = 0.26225138643023310223031687079702
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.444
y[1] (analytic) = 0
y[1] (numeric) = 0.26291804305681685648115205823418
absolute error = 0.26291804305681685648115205823418
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.445
y[1] (analytic) = 0
y[1] (numeric) = 0.26358427840341766333787797757714
absolute error = 0.26358427840341766333787797757714
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.446
y[1] (analytic) = 0
y[1] (numeric) = 0.26425009354920181299877097943355
absolute error = 0.26425009354920181299877097943355
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.447
y[1] (analytic) = 0
y[1] (numeric) = 0.26491548957135601727545869941725
absolute error = 0.26491548957135601727545869941725
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.448
y[1] (analytic) = 0
y[1] (numeric) = 0.26558046754509259860007712632414
absolute error = 0.26558046754509259860007712632414
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.449
y[1] (analytic) = 0
y[1] (numeric) = 0.26624502854365466475028608861008
absolute error = 0.26624502854365466475028608861008
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.45
y[1] (analytic) = 0
y[1] (numeric) = 0.26690917363832126933450962259914
absolute error = 0.26690917363832126933450962259914
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=160.2MB, alloc=4.4MB, time=16.53
x[1] = 0.451
y[1] (analytic) = 0
y[1] (numeric) = 0.26757290389841255807962263740803
absolute error = 0.26757290389841255807962263740803
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.452
y[1] (analytic) = 0
y[1] (numeric) = 0.268236220391294900963160782599
absolute error = 0.268236220391294900963160782599
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.453
y[1] (analytic) = 0
y[1] (numeric) = 0.26889912418238601023198645276163
absolute error = 0.26889912418238601023198645276163
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.454
y[1] (analytic) = 0
y[1] (numeric) = 0.26956161633516004434920042627665
absolute error = 0.26956161633516004434920042627665
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.455
y[1] (analytic) = 0
y[1] (numeric) = 0.27022369791115269791094573114747
absolute error = 0.27022369791115269791094573114747
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.456
y[1] (analytic) = 0
y[1] (numeric) = 0.27088536996996627757460795672344
absolute error = 0.27088536996996627757460795672344
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.457
y[1] (analytic) = 0
y[1] (numeric) = 0.27154663356927476403977438412032
absolute error = 0.27154663356927476403977438412032
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.458
y[1] (analytic) = 0
y[1] (numeric) = 0.27220748976482886012317298791669
absolute error = 0.27220748976482886012317298791669
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.459
y[1] (analytic) = 0
y[1] (numeric) = 0.27286793961046102496867156502902
absolute error = 0.27286793961046102496867156502902
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=164.0MB, alloc=4.4MB, time=16.93
x[1] = 0.46
y[1] (analytic) = 0
y[1] (numeric) = 0.27352798415809049443327697131427
absolute error = 0.27352798415809049443327697131427
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.461
y[1] (analytic) = 0
y[1] (numeric) = 0.27418762445772828768993469019807
absolute error = 0.27418762445772828768993469019807
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.462
y[1] (analytic) = 0
y[1] (numeric) = 0.27484686155748220008778971827129
absolute error = 0.27484686155748220008778971827129
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.463
y[1] (analytic) = 0
y[1] (numeric) = 0.27550569650356178231043102814153
absolute error = 0.27550569650356178231043102814153
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.464
y[1] (analytic) = 0
y[1] (numeric) = 0.2761641303402833058725036566829
absolute error = 0.2761641303402833058725036566829
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.465
y[1] (analytic) = 0
y[1] (numeric) = 0.27682216411007471499493476502157
absolute error = 0.27682216411007471499493476502157
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.466
y[1] (analytic) = 0
y[1] (numeric) = 0.27747979885348056489888282296229
absolute error = 0.27747979885348056489888282296229
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.467
y[1] (analytic) = 0
y[1] (numeric) = 0.27813703560916694655838238294737
absolute error = 0.27813703560916694655838238294737
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.468
y[1] (analytic) = 0
y[1] (numeric) = 0.27879387541392639795152072490202
absolute error = 0.27879387541392639795152072490202
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=167.8MB, alloc=4.4MB, time=17.34
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.469
y[1] (analytic) = 0
y[1] (numeric) = 0.27945031930268280184984697132468
absolute error = 0.27945031930268280184984697132468
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.47
y[1] (analytic) = 0
y[1] (numeric) = 0.28010636830849627018557908960613
absolute error = 0.28010636830849627018557908960613
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.471
y[1] (analytic) = 0
y[1] (numeric) = 0.28076202346256801503603951369412
absolute error = 0.28076202346256801503603951369412
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.472
y[1] (analytic) = 0
y[1] (numeric) = 0.28141728579424520626461592775935
absolute error = 0.28141728579424520626461592775935
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.473
y[1] (analytic) = 0
y[1] (numeric) = 0.28207215633102581585741005837246
absolute error = 0.28207215633102581585741005837246
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.474
y[1] (analytic) = 0
y[1] (numeric) = 0.28272663609856344899460411678819
absolute error = 0.28272663609856344899460411678819
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.475
y[1] (analytic) = 0
y[1] (numeric) = 0.28338072612067216189544181718177
absolute error = 0.28338072612067216189544181718177
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.476
y[1] (analytic) = 0
y[1] (numeric) = 0.28403442741933126647558866803172
absolute error = 0.28403442741933126647558866803172
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=171.6MB, alloc=4.4MB, time=17.73
x[1] = 0.477
y[1] (analytic) = 0
y[1] (numeric) = 0.28468774101469012185550449024217
absolute error = 0.28468774101469012185550449024217
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.478
y[1] (analytic) = 0
y[1] (numeric) = 0.28534066792507291275832985500514
absolute error = 0.28534066792507291275832985500514
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.479
y[1] (analytic) = 0
y[1] (numeric) = 0.28599320916698341483565735478741
absolute error = 0.28599320916698341483565735478741
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.48
y[1] (analytic) = 0
y[1] (numeric) = 0.2866453657551097469594283201671
absolute error = 0.2866453657551097469594283201671
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.481
y[1] (analytic) = 0
y[1] (numeric) = 0.28729713870232911051806577152914
absolute error = 0.28729713870232911051806577152914
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.482
y[1] (analytic) = 0
y[1] (numeric) = 0.28794852901971251575482504585605
absolute error = 0.28794852901971251575482504585605
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.483
y[1] (analytic) = 0
y[1] (numeric) = 0.28859953771652949518621466302736
absolute error = 0.28859953771652949518621466302736
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.484
y[1] (analytic) = 0
y[1] (numeric) = 0.2892501658002528041382115911863
absolute error = 0.2892501658002528041382115911863
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.485
y[1] (analytic) = 0
y[1] (numeric) = 0.28990041427656310843786713487275
absolute error = 0.28990041427656310843786713487275
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=175.4MB, alloc=4.4MB, time=18.13
x[1] = 0.486
y[1] (analytic) = 0
y[1] (numeric) = 0.29055028414935365929777220079337
absolute error = 0.29055028414935365929777220079337
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.487
y[1] (analytic) = 0
y[1] (numeric) = 0.29119977642073495543072369235012
absolute error = 0.29119977642073495543072369235012
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.488
y[1] (analytic) = 0
y[1] (numeric) = 0.29184889209103939243180724343242
absolute error = 0.29184889209103939243180724343242
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.489
y[1] (analytic) = 0
y[1] (numeric) = 0.29249763215882589946498542256074
absolute error = 0.29249763215882589946498542256074
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.49
y[1] (analytic) = 0
y[1] (numeric) = 0.29314599762088456329115491832566
absolute error = 0.29314599762088456329115491832566
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.491
y[1] (analytic) = 0
y[1] (numeric) = 0.29379398947224123967451105427921
absolute error = 0.29379398947224123967451105427921
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.492
y[1] (analytic) = 0
y[1] (numeric) = 0.29444160870616215220393327409825
absolute error = 0.29444160870616215220393327409825
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.493
y[1] (analytic) = 0
y[1] (numeric) = 0.29508885631415847856598098405462
absolute error = 0.29508885631415847856598098405462
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=179.2MB, alloc=4.4MB, time=18.54
x[1] = 0.494
y[1] (analytic) = 0
y[1] (numeric) = 0.295735733285990924305965337705
absolute error = 0.295735733285990924305965337705
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.495
y[1] (analytic) = 0
y[1] (numeric) = 0.29638224060967428411343919537548
absolute error = 0.29638224060967428411343919537548
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.496
y[1] (analytic) = 0
y[1] (numeric) = 0.29702837927148199066832458659115
absolute error = 0.29702837927148199066832458659115
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.497
y[1] (analytic) = 0
y[1] (numeric) = 0.29767415025595065108377454522775
absolute error = 0.29767415025595065108377454522775
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.498
y[1] (analytic) = 0
y[1] (numeric) = 0.29831955454588457098174417298839
absolute error = 0.29831955454588457098174417298839
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.499
y[1] (analytic) = 0
y[1] (numeric) = 0.2989645931223602662371242149894
absolute error = 0.2989645931223602662371242149894
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.5
y[1] (analytic) = 0
y[1] (numeric) = 0.29960926696473096242616929994113
absolute error = 0.29960926696473096242616929994113
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.501
y[1] (analytic) = 0
y[1] (numeric) = 0.30025357705063108201483230480519
absolute error = 0.30025357705063108201483230480519
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.502
y[1] (analytic) = 0
y[1] (numeric) = 0.30089752435598071932249604808299
absolute error = 0.30089752435598071932249604808299
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=183.1MB, alloc=4.4MB, time=18.95
x[1] = 0.503
y[1] (analytic) = 0
y[1] (numeric) = 0.30154110985499010329647369523164
absolute error = 0.30154110985499010329647369523164
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.504
y[1] (analytic) = 0
y[1] (numeric) = 0.30218433452016404813252987231357
absolute error = 0.30218433452016404813252987231357
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.505
y[1] (analytic) = 0
y[1] (numeric) = 0.30282719932230639177655552807335
absolute error = 0.30282719932230639177655552807335
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.506
y[1] (analytic) = 0
y[1] (numeric) = 0.30346970523052442234241105841721
absolute error = 0.30346970523052442234241105841721
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.507
y[1] (analytic) = 0
y[1] (numeric) = 0.30411185321223329248083410897263
absolute error = 0.30411185321223329248083410897263
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.508
y[1] (analytic) = 0
y[1] (numeric) = 0.30475364423316042173419079926227
absolute error = 0.30475364423316042173419079926227
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.509
y[1] (analytic) = 0
y[1] (numeric) = 0.30539507925734988691173186428035
absolute error = 0.30539507925734988691173186428035
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.51
y[1] (analytic) = 0
y[1] (numeric) = 0.30603615924716680051989838416184
absolute error = 0.30603615924716680051989838416184
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.511
y[1] (analytic) = 0
y[1] (numeric) = 0.30667688516330167728210536844494
absolute error = 0.30667688516330167728210536844494
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=186.9MB, alloc=4.4MB, time=19.35
x[1] = 0.512
y[1] (analytic) = 0
y[1] (numeric) = 0.30731725796477478878231547641291
absolute error = 0.30731725796477478878231547641291
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.513
y[1] (analytic) = 0
y[1] (numeric) = 0.30795727860894050626659958743844
absolute error = 0.30795727860894050626659958743844
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.514
y[1] (analytic) = 0
y[1] (numeric) = 0.30859694805149163163676578342639
absolute error = 0.30859694805149163163676578342639
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.515
y[1] (analytic) = 0
y[1] (numeric) = 0.30923626724646371667002356765177
absolute error = 0.30923626724646371667002356765177
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.516
y[1] (analytic) = 0
y[1] (numeric) = 0.30987523714623937049853581881912
absolute error = 0.30987523714623937049853581881912
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.517
y[1] (analytic) = 0
y[1] (numeric) = 0.310513858701552555382597064336
absolute error = 0.310513858701552555382597064336
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.518
y[1] (analytic) = 0
y[1] (numeric) = 0.31115213286149287081106315091365
absolute error = 0.31115213286149287081106315091365
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.519
y[1] (analytic) = 0
y[1] (numeric) = 0.31179006057350982596254429200627
absolute error = 0.31179006057350982596254429200627
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=190.7MB, alloc=4.4MB, time=19.76
x[1] = 0.52
y[1] (analytic) = 0
y[1] (numeric) = 0.31242764278341710056076077861011
absolute error = 0.31242764278341710056076077861011
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.521
y[1] (analytic) = 0
y[1] (numeric) = 0.31306488043539679415734835090422
absolute error = 0.31306488043539679415734835090422
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.522
y[1] (analytic) = 0
y[1] (numeric) = 0.31370177447200366387528834147521
absolute error = 0.31370177447200366387528834147521
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.523
y[1] (analytic) = 0
y[1] (numeric) = 0.31433832583416935064602621478483
absolute error = 0.31433832583416935064602621478483
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.524
y[1] (analytic) = 0
y[1] (numeric) = 0.31497453546120659397323104047522
absolute error = 0.31497453546120659397323104047522
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.525
y[1] (analytic) = 0
y[1] (numeric) = 0.31561040429081343525603774843428
absolute error = 0.31561040429081343525603774843428
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.526
y[1] (analytic) = 0
y[1] (numeric) = 0.31624593325907740970450371964204
absolute error = 0.31624593325907740970450371964204
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.527
y[1] (analytic) = 0
y[1] (numeric) = 0.31688112330047972687990136707531
absolute error = 0.31688112330047972687990136707531
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.528
y[1] (analytic) = 0
y[1] (numeric) = 0.31751597534789943989235885375677
absolute error = 0.31751597534789943989235885375677
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=194.5MB, alloc=4.4MB, time=20.17
x[1] = 0.529
y[1] (analytic) = 0
y[1] (numeric) = 0.31815049033261760328825197879836
absolute error = 0.31815049033261760328825197879836
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.53
y[1] (analytic) = 0
y[1] (numeric) = 0.31878466918432141965964153541729
absolute error = 0.31878466918432141965964153541729
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.531
y[1] (analytic) = 0
y[1] (numeric) = 0.31941851283110837500794210581316
absolute error = 0.31941851283110837500794210581316
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.532
y[1] (analytic) = 0
y[1] (numeric) = 0.32005202219949036289390030491165
absolute error = 0.32005202219949036289390030491165
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.533
y[1] (analytic) = 0
y[1] (numeric) = 0.32068519821439779740585291673613
absolute error = 0.32068519821439779740585291673613
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.534
y[1] (analytic) = 0
y[1] (numeric) = 0.32131804179918371497812818200251
absolute error = 0.32131804179918371497812818200251
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.535
y[1] (analytic) = 0
y[1] (numeric) = 0.32195055387562786509134669189238
absolute error = 0.32195055387562786509134669189238
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.536
y[1] (analytic) = 0
y[1] (numeric) = 0.32258273536394078988627191929832
absolute error = 0.32258273536394078988627191929832
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.537
y[1] (analytic) = 0
y[1] (numeric) = 0.3232145871827678927227543736155
absolute error = 0.3232145871827678927227543736155
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=198.3MB, alloc=4.4MB, time=20.57
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.538
y[1] (analytic) = 0
y[1] (numeric) = 0.32384611024919349571520769684315
absolute error = 0.32384611024919349571520769684315
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.539
y[1] (analytic) = 0
y[1] (numeric) = 0.32447730547874488627594972583507
absolute error = 0.32447730547874488627594972583507
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.54
y[1] (analytic) = 0
y[1] (numeric) = 0.32510817378539635269763662648227
absolute error = 0.32510817378539635269763662648227
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.541
y[1] (analytic) = 0
y[1] (numeric) = 0.32573871608157320880591365891351
absolute error = 0.32573871608157320880591365891351
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.542
y[1] (analytic) = 0
y[1] (numeric) = 0.3263689332781558077133019569587
absolute error = 0.3263689332781558077133019569587
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.543
y[1] (analytic) = 0
y[1] (numeric) = 0.32699882628448354470523689863915
absolute error = 0.32699882628448354470523689863915
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.544
y[1] (analytic) = 0
y[1] (numeric) = 0.32762839600835884928907020583965
absolute error = 0.32762839600835884928907020583965
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.545
y[1] (analytic) = 0
y[1] (numeric) = 0.32825764335605116643674483909836
absolute error = 0.32825764335605116643674483909836
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=202.1MB, alloc=4.4MB, time=20.97
x[1] = 0.546
y[1] (analytic) = 0
y[1] (numeric) = 0.32888656923230092705174904614619
absolute error = 0.32888656923230092705174904614619
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.547
y[1] (analytic) = 0
y[1] (numeric) = 0.32951517454032350769085357897075
absolute error = 0.32951517454032350769085357897075
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.548
y[1] (analytic) = 0
y[1] (numeric) = 0.33014346018181317957103411230921
absolute error = 0.33014346018181317957103411230921
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.549
y[1] (analytic) = 0
y[1] (numeric) = 0.33077142705694704689187927513561
absolute error = 0.33077142705694704689187927513561
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.55
y[1] (analytic) = 0
y[1] (numeric) = 0.33139907606438897450368344445398
absolute error = 0.33139907606438897450368344445398
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.551
y[1] (analytic) = 0
y[1] (numeric) = 0.33202640810129350495132254609819
absolute error = 0.33202640810129350495132254609819
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.552
y[1] (analytic) = 0
y[1] (numeric) = 0.33265342406330976492391055883885
absolute error = 0.33265342406330976492391055883885
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.553
y[1] (analytic) = 0
y[1] (numeric) = 0.33328012484458536114013422447944
absolute error = 0.33328012484458536114013422447944
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.554
y[1] (analytic) = 0
y[1] (numeric) = 0.33390651133777026569906362636792
absolute error = 0.33390651133777026569906362636792
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=206.0MB, alloc=4.4MB, time=21.37
x[1] = 0.555
y[1] (analytic) = 0
y[1] (numeric) = 0.33453258443402069092613681044175
absolute error = 0.33453258443402069092613681044175
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.556
y[1] (analytic) = 0
y[1] (numeric) = 0.33515834502300295374391748515648
absolute error = 0.33515834502300295374391748515648
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.557
y[1] (analytic) = 0
y[1] (numeric) = 0.33578379399289732959712604801992
absolute error = 0.33578379399289732959712604801992
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.558
y[1] (analytic) = 0
y[1] (numeric) = 0.33640893223040189596134574557099
absolute error = 0.33640893223040189596134574557099
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.559
y[1] (analytic) = 0
y[1] (numeric) = 0.33703376062073636546470767911645
absolute error = 0.33703376062073636546470767911645
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.56
y[1] (analytic) = 0
y[1] (numeric) = 0.33765828004764590865176061898896
absolute error = 0.33765828004764590865176061898896
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.561
y[1] (analytic) = 0
y[1] (numeric) = 0.33828249139340496641863418414071
absolute error = 0.33828249139340496641863418414071
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.562
y[1] (analytic) = 0
y[1] (numeric) = 0.33890639553882105214850688016983
absolute error = 0.33890639553882105214850688016983
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.563
y[1] (analytic) = 0
y[1] (numeric) = 0.3395299933632385435762937660295
absolute error = 0.3395299933632385435762937660295
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=209.8MB, alloc=4.4MB, time=21.77
x[1] = 0.564
y[1] (analytic) = 0
y[1] (numeric) = 0.3401532857445424644113721363361
absolute error = 0.3401532857445424644113721363361
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.565
y[1] (analytic) = 0
y[1] (numeric) = 0.34077627355916225574706756102332
absolute error = 0.34077627355916225574706756102332
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.566
y[1] (analytic) = 0
y[1] (numeric) = 0.34139895768207553728552691574007
absolute error = 0.34139895768207553728552691574007
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.567
y[1] (analytic) = 0
y[1] (numeric) = 0.34202133898681185840650966352431
absolute error = 0.34202133898681185840650966352431
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.568
y[1] (analytic) = 0
y[1] (numeric) = 0.3426434183454564391085336095713
absolute error = 0.3426434183454564391085336095713
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.569
y[1] (analytic) = 0
y[1] (numeric) = 0.34326519662865390085071664502855
absolute error = 0.34326519662865390085071664502855
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.57
y[1] (analytic) = 0
y[1] (numeric) = 0.3438866747056119873235616213716
absolute error = 0.3438866747056119873235616213716
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.571
y[1] (analytic) = 0
y[1] (numeric) = 0.34450785344410527517683745273263
absolute error = 0.34450785344410527517683745273263
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=213.6MB, alloc=4.4MB, time=22.17
x[1] = 0.572
y[1] (analytic) = 0
y[1] (numeric) = 0.34512873371047887473261582826064
absolute error = 0.34512873371047887473261582826064
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.573
y[1] (analytic) = 0
y[1] (numeric) = 0.34574931636965212071142952888687
absolute error = 0.34574931636965212071142952888687
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.574
y[1] (analytic) = 0
y[1] (numeric) = 0.34636960228512225299942528145817
absolute error = 0.34636960228512225299942528145817
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.575
y[1] (analytic) = 0
y[1] (numeric) = 0.34698959231896808748429134679465
absolute error = 0.34698959231896808748429134679465
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.576
y[1] (analytic) = 0
y[1] (numeric) = 0.34760928733185367698764762554411
absolute error = 0.34760928733185367698764762554411
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.577
y[1] (analytic) = 0
y[1] (numeric) = 0.34822868818303196232149397546724
absolute error = 0.34822868818303196232149397546724
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.578
y[1] (analytic) = 0
y[1] (numeric) = 0.3488477957303484134962206647236
absolute error = 0.3488477957303484134962206647236
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.579
y[1] (analytic) = 0
y[1] (numeric) = 0.34946661083024466110759343657352
absolute error = 0.34946661083024466110759343657352
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.58
y[1] (analytic) = 0
y[1] (numeric) = 0.35008513433776211793003453040649
absolute error = 0.35008513433776211793003453040649
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=217.4MB, alloc=4.4MB, time=22.58
x[1] = 0.581
y[1] (analytic) = 0
y[1] (numeric) = 0.35070336710654559074343019089817
absolute error = 0.35070336710654559074343019089817
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.582
y[1] (analytic) = 0
y[1] (numeric) = 0.35132130998884688242060470013874
absolute error = 0.35132130998884688242060470013874
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.583
y[1] (analytic) = 0
y[1] (numeric) = 0.35193896383552838430251078552219
absolute error = 0.35193896383552838430251078552219
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.584
y[1] (analytic) = 0
y[1] (numeric) = 0.35255632949606665888809638780361
absolute error = 0.35255632949606665888809638780361
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.585
y[1] (analytic) = 0
y[1] (numeric) = 0.35317340781855601286571821778827
absolute error = 0.35317340781855601286571821778827
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.586
y[1] (analytic) = 0
y[1] (numeric) = 0.35379019964971206051288328538796
absolute error = 0.35379019964971206051288328538796
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.587
y[1] (analytic) = 0
y[1] (numeric) = 0.35440670583487527749101065004633
absolute error = 0.35440670583487527749101065004633
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.588
y[1] (analytic) = 0
y[1] (numeric) = 0.35502292721801454506181701558293
absolute error = 0.35502292721801454506181701558293
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.589
y[1] (analytic) = 0
y[1] (numeric) = 0.35563886464173068475184147412614
absolute error = 0.35563886464173068475184147412614
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=221.2MB, alloc=4.4MB, time=22.98
x[1] = 0.59
y[1] (analytic) = 0
y[1] (numeric) = 0.35625451894725998349153669179627
absolute error = 0.35625451894725998349153669179627
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.591
y[1] (analytic) = 0
y[1] (numeric) = 0.35686989097447770925526612196346
absolute error = 0.35686989097447770925526612196346
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.592
y[1] (analytic) = 0
y[1] (numeric) = 0.35748498156190161722845942905003
absolute error = 0.35748498156190161722845942905003
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.593
y[1] (analytic) = 0
y[1] (numeric) = 0.35809979154669544652809120578615
absolute error = 0.35809979154669544652809120578615
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.594
y[1] (analytic) = 0
y[1] (numeric) = 0.35871432176467240750256126838078
absolute error = 0.35871432176467240750256126838078
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.595
y[1] (analytic) = 0
y[1] (numeric) = 0.35932857305029865963696831606119
absolute error = 0.35932857305029865963696831606119
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.596
y[1] (analytic) = 0
y[1] (numeric) = 0.35994254623669678008968254269341
absolute error = 0.35994254623669678008968254269341
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.597
y[1] (analytic) = 0
y[1] (numeric) = 0.36055624215564922288603688755807
absolute error = 0.36055624215564922288603688755807
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.598
memory used=225.0MB, alloc=4.4MB, time=23.39
y[1] (analytic) = 0
y[1] (numeric) = 0.3611696616376017687948710086619
absolute error = 0.3611696616376017687948710086619
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.599
y[1] (analytic) = 0
y[1] (numeric) = 0.3617828055116669659135767540598
absolute error = 0.3617828055116669659135767540598
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.6
y[1] (analytic) = 0
y[1] (numeric) = 0.3623956746056275609872088933974
absolute error = 0.3623956746056275609872088933974
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.601
y[1] (analytic) = 0
y[1] (numeric) = 0.36300826974593992148714015211512
absolute error = 0.36300826974593992148714015211512
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.602
y[1] (analytic) = 0
y[1] (numeric) = 0.36362059175773744847465516334375
absolute error = 0.36362059175773744847465516334375
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.603
y[1] (analytic) = 0
y[1] (numeric) = 0.36423264146483398027479381633456
absolute error = 0.36423264146483398027479381633456
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.604
y[1] (analytic) = 0
y[1] (numeric) = 0.36484441968972718698567063417606
absolute error = 0.36484441968972718698567063417606
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.605
y[1] (analytic) = 0
y[1] (numeric) = 0.36545592725360195584841325643125
absolute error = 0.36545592725360195584841325643125
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.606
y[1] (analytic) = 0
y[1] (numeric) = 0.36606716497633376750277983306579
absolute error = 0.36606716497633376750277983306579
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=228.8MB, alloc=4.4MB, time=23.79
x[1] = 0.607
y[1] (analytic) = 0
y[1] (numeric) = 0.36667813367649206315343215351542
absolute error = 0.36667813367649206315343215351542
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.608
y[1] (analytic) = 0
y[1] (numeric) = 0.36728883417134360267175863785297
absolute error = 0.36728883417134360267175863785297
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.609
y[1] (analytic) = 0
y[1] (numeric) = 0.36789926727685581365805890465773
absolute error = 0.36789926727685581365805890465773
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.61
y[1] (analytic) = 0
y[1] (numeric) = 0.36850943380770013148881950126544
absolute error = 0.36850943380770013148881950126544
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.611
y[1] (analytic) = 0
y[1] (numeric) = 0.36911933457725533037372853549211
absolute error = 0.36911933457725533037372853549211
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.612
y[1] (analytic) = 0
y[1] (numeric) = 0.36972897039761084544699538259203
absolute error = 0.36972897039761084544699538259203
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.613
y[1] (analytic) = 0
y[1] (numeric) = 0.37033834207957008591746035604591
absolute error = 0.37033834207957008591746035604591
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.614
y[1] (analytic) = 0
y[1] (numeric) = 0.37094745043265373930189822470097
absolute error = 0.37094745043265373930189822470097
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.615
y[1] (analytic) = 0
y[1] (numeric) = 0.37155629626510306676583873072821
absolute error = 0.37155629626510306676583873072821
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=232.7MB, alloc=4.4MB, time=24.20
x[1] = 0.616
y[1] (analytic) = 0
y[1] (numeric) = 0.3721648803838831895961468117536
absolute error = 0.3721648803838831895961468117536
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.617
y[1] (analytic) = 0
y[1] (numeric) = 0.37277320359468636682952505529671
absolute error = 0.37277320359468636682952505529671
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.618
y[1] (analytic) = 0
y[1] (numeric) = 0.37338126670193526406102101325295
absolute error = 0.37338126670193526406102101325295
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.619
y[1] (analytic) = 0
y[1] (numeric) = 0.37398907050878621345654237753026
absolute error = 0.37398907050878621345654237753026
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.62
y[1] (analytic) = 0
y[1] (numeric) = 0.37459661581713246499330366404811
absolute error = 0.37459661581713246499330366404811
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.621
y[1] (analytic) = 0
y[1] (numeric) = 0.37520390342760742895204897008214
absolute error = 0.37520390342760742895204897008214
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.622
y[1] (analytic) = 0
y[1] (numeric) = 0.37581093413958790968481655835057
absolute error = 0.37581093413958790968481655835057
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.623
y[1] (analytic) = 0
y[1] (numeric) = 0.37641770875119733068193247925489
absolute error = 0.37641770875119733068193247925489
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.624
y[1] (analytic) = 0
y[1] (numeric) = 0.37702422805930895096184216927518
absolute error = 0.37702422805930895096184216927518
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=236.5MB, alloc=4.4MB, time=24.60
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.625
y[1] (analytic) = 0
y[1] (numeric) = 0.37763049285954907280731095765511
absolute error = 0.37763049285954907280731095765511
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.626
y[1] (analytic) = 0
y[1] (numeric) = 0.37823650394630024087144667417101
absolute error = 0.37823650394630024087144667417101
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.627
y[1] (analytic) = 0
y[1] (numeric) = 0.37884226211270443267692007694695
absolute error = 0.37884226211270443267692007694695
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.628
y[1] (analytic) = 0
y[1] (numeric) = 0.37944776815066624053168160994148
absolute error = 0.37944776815066624053168160994148
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.629
y[1] (analytic) = 0
y[1] (numeric) = 0.38005302285085604488439605388355
absolute error = 0.38005302285085604488439605388355
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.63
y[1] (analytic) = 0
y[1] (numeric) = 0.3806580270027131791427399510725
absolute error = 0.3806580270027131791427399510725
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.631
y[1] (analytic) = 0
y[1] (numeric) = 0.38126278139444908597763026258093
absolute error = 0.38126278139444908597763026258093
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.632
y[1] (analytic) = 0
y[1] (numeric) = 0.38186728681305046513637655501561
absolute error = 0.38186728681305046513637655501561
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=240.3MB, alloc=4.4MB, time=25.00
x[1] = 0.633
y[1] (analytic) = 0
y[1] (numeric) = 0.38247154404428241278767311211099
absolute error = 0.38247154404428241278767311211099
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.634
y[1] (analytic) = 0
y[1] (numeric) = 0.38307555387269155242127172306677
absolute error = 0.38307555387269155242127172306677
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.635
y[1] (analytic) = 0
y[1] (numeric) = 0.38367931708160915732510051371454
absolute error = 0.38367931708160915732510051371454
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.636
y[1] (analytic) = 0
y[1] (numeric) = 0.38428283445315426466251905733258
absolute error = 0.38428283445315426466251905733258
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.637
y[1] (analytic) = 0
y[1] (numeric) = 0.38488610676823678117232512825014
absolute error = 0.38488610676823678117232512825014
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.638
y[1] (analytic) = 0
y[1] (numeric) = 0.38548913480656058051405384232517
absolute error = 0.38548913480656058051405384232517
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.639
y[1] (analytic) = 0
y[1] (numeric) = 0.38609191934662659228103556297946
absolute error = 0.38609191934662659228103556297946
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.64
y[1] (analytic) = 0
y[1] (numeric) = 0.3866944611657358827036048387729
absolute error = 0.3866944611657358827036048387729
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.641
y[1] (analytic) = 0
y[1] (numeric) = 0.38729676103999272706477877753965
absolute error = 0.38729676103999272706477877753965
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=244.1MB, alloc=4.4MB, time=25.41
x[1] = 0.642
y[1] (analytic) = 0
y[1] (numeric) = 0.38789881974430767385064965194292
absolute error = 0.38789881974430767385064965194292
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.643
y[1] (analytic) = 0
y[1] (numeric) = 0.38850063805240060065766317098475
absolute error = 0.38850063805240060065766317098475
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.644
y[1] (analytic) = 0
y[1] (numeric) = 0.38910221673680376187888074059186
absolute error = 0.38910221673680376187888074059186
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.645
y[1] (analytic) = 0
y[1] (numeric) = 0.38970355656886482819125117294903
absolute error = 0.38970355656886482819125117294903
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.646
y[1] (analytic) = 0
y[1] (numeric) = 0.3903046583187499178658446878349
absolute error = 0.3903046583187499178658446878349
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.647
y[1] (analytic) = 0
y[1] (numeric) = 0.39090552275544661992292967890143
absolute error = 0.39090552275544661992292967890143
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.648
y[1] (analytic) = 0
y[1] (numeric) = 0.39150615064676700915370059270234
absolute error = 0.39150615064676700915370059270234
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.649
y[1] (analytic) = 0
y[1] (numeric) = 0.39210654275935065303039338739636
absolute error = 0.39210654275935065303039338739636
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.65
y[1] (analytic) = 0
y[1] (numeric) = 0.39270669985866761052645340051078
absolute error = 0.39270669985866761052645340051078
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=247.9MB, alloc=4.4MB, time=25.81
x[1] = 0.651
y[1] (analytic) = 0
y[1] (numeric) = 0.39330662270902142286834906003656
absolute error = 0.39330662270902142286834906003656
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.652
y[1] (analytic) = 0
y[1] (numeric) = 0.393906312073552096240553719529
absolute error = 0.393906312073552096240553719529
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.653
y[1] (analytic) = 0
y[1] (numeric) = 0.3945057687142390764651469849029
absolute error = 0.3945057687142390764651469849029
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.654
y[1] (analytic) = 0
y[1] (numeric) = 0.39510499339190421567741622733688
absolute error = 0.39510499339190421567741622733688
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.655
y[1] (analytic) = 0
y[1] (numeric) = 0.39570398686621473101876854224147
absolute error = 0.39570398686621473101876854224147
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.656
y[1] (analytic) = 0
y[1] (numeric) = 0.39630274989568615536819321770644
absolute error = 0.39630274989568615536819321770644
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.657
y[1] (analytic) = 0
y[1] (numeric) = 0.39690128323768528013344481633567
absolute error = 0.39690128323768528013344481633567
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.658
y[1] (analytic) = 0
y[1] (numeric) = 0.39749958764843309012304725101766
absolute error = 0.39749958764843309012304725101766
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.659
y[1] (analytic) = 0
y[1] (numeric) = 0.39809766388300769052014974708512
absolute error = 0.39809766388300769052014974708512
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=251.7MB, alloc=4.4MB, time=26.26
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.66
y[1] (analytic) = 0
y[1] (numeric) = 0.39869551269534722597919632961082
absolute error = 0.39869551269534722597919632961082
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.661
y[1] (analytic) = 0
y[1] (numeric) = 0.39929313483825279186630145439584
absolute error = 0.39929313483825279186630145439584
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.662
y[1] (analytic) = 0
y[1] (numeric) = 0.39989053106339133766415561366045
absolute error = 0.39989053106339133766415561366045
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.663
y[1] (analytic) = 0
y[1] (numeric) = 0.40048770212129856256221619168205
absolute error = 0.40048770212129856256221619168205
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.664
y[1] (analytic) = 0
y[1] (numeric) = 0.40108464876138180325287052077656
absolute error = 0.40108464876138180325287052077656
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.665
y[1] (analytic) = 0
y[1] (numeric) = 0.40168137173192291395418999323161
absolute error = 0.40168137173192291395418999323161
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.666
y[1] (analytic) = 0
y[1] (numeric) = 0.40227787178008113867982621921758
absolute error = 0.40227787178008113867982621921758
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.667
y[1] (analytic) = 0
y[1] (numeric) = 0.40287414965189597577653258347518
absolute error = 0.40287414965189597577653258347518
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=255.5MB, alloc=4.4MB, time=26.64
x[1] = 0.668
y[1] (analytic) = 0
y[1] (numeric) = 0.4034702060922900347497271438598
absolute error = 0.4034702060922900347497271438598
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.669
y[1] (analytic) = 0
y[1] (numeric) = 0.40406604184507188539744563176958
absolute error = 0.40406604184507188539744563176958
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.67
y[1] (analytic) = 0
y[1] (numeric) = 0.40466165765293889927296635725723
absolute error = 0.40466165765293889927296635725723
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.671
y[1] (analytic) = 0
y[1] (numeric) = 0.40525705425748008349632208938965
absolute error = 0.40525705425748008349632208938965
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.672
y[1] (analytic) = 0
y[1] (numeric) = 0.40585223239917890693484747434198
absolute error = 0.40585223239917890693484747434198
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.673
y[1] (analytic) = 0
y[1] (numeric) = 0.40644719281741611877284426896603
absolute error = 0.40644719281741611877284426896603
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.674
y[1] (analytic) = 0
y[1] (numeric) = 0.40704193625047255949038060533283
absolute error = 0.40704193625047255949038060533283
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.675
y[1] (analytic) = 0
y[1] (numeric) = 0.40763646343553196427117466119336
absolute error = 0.40763646343553196427117466119336
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.676
y[1] (analytic) = 0
y[1] (numeric) = 0.40823077510868375885944749161452
absolute error = 0.40823077510868375885944749161452
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=259.4MB, alloc=4.4MB, time=27.00
x[1] = 0.677
y[1] (analytic) = 0
y[1] (numeric) = 0.40882487200492584788556437741405
absolute error = 0.40882487200492584788556437741405
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.678
y[1] (analytic) = 0
y[1] (numeric) = 0.40941875485816739568021886562914
absolute error = 0.40941875485816739568021886562914
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.679
y[1] (analytic) = 0
y[1] (numeric) = 0.41001242440123159959684871530191
absolute error = 0.41001242440123159959684871530191
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.68
y[1] (analytic) = 0
y[1] (numeric) = 0.41060588136585845586190821754813
absolute error = 0.41060588136585845586190821754813
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.681
y[1] (analytic) = 0
y[1] (numeric) = 0.41119912648270751797255683139348
absolute error = 0.41119912648270751797255683139348
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.682
y[1] (analytic) = 0
y[1] (numeric) = 0.41179216048136064766125976541904
absolute error = 0.41179216048136064766125976541904
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.683
y[1] (analytic) = 0
y[1] (numeric) = 0.41238498409032475844673203906142
absolute error = 0.41238498409032475844673203906142
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.684
y[1] (analytic) = 0
y[1] (numeric) = 0.41297759803703455179059367567444
absolute error = 0.41297759803703455179059367567444
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.685
y[1] (analytic) = 0
y[1] (numeric) = 0.4135700030478552458790400113931
absolute error = 0.4135700030478552458790400113931
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=263.2MB, alloc=4.4MB, time=27.40
x[1] = 0.686
y[1] (analytic) = 0
y[1] (numeric) = 0.41416219984808529704876764866388
absolute error = 0.41416219984808529704876764866388
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.687
y[1] (analytic) = 0
y[1] (numeric) = 0.41475418916195911387633334024086
absolute error = 0.41475418916195911387633334024086
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.688
y[1] (analytic) = 0
y[1] (numeric) = 0.41534597171264976395006005771815
absolute error = 0.41534597171264976395006005771815
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.689
y[1] (analytic) = 0
y[1] (numeric) = 0.41593754822227167334354167750479
absolute error = 0.41593754822227167334354167750479
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.69
y[1] (analytic) = 0
y[1] (numeric) = 0.41652891941188331880973510577973
absolute error = 0.41652891941188331880973510577973
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.691
y[1] (analytic) = 0
y[1] (numeric) = 0.41712008600148991271456626162681
absolute error = 0.41712008600148991271456626162681
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.692
y[1] (analytic) = 0
y[1] (numeric) = 0.41771104871004608072891414348085
absolute error = 0.41771104871004608072891414348085
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.693
y[1] (analytic) = 0
y[1] (numeric) = 0.41830180825545853229777521745817
absolute error = 0.41830180825545853229777521745817
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=267.0MB, alloc=4.4MB, time=27.81
x[1] = 0.694
y[1] (analytic) = 0
y[1] (numeric) = 0.41889236535458872390534858634224
absolute error = 0.41889236535458872390534858634224
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.695
y[1] (analytic) = 0
y[1] (numeric) = 0.41948272072325551515472082419665
absolute error = 0.41948272072325551515472082419665
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.696
y[1] (analytic) = 0
y[1] (numeric) = 0.42007287507623781768076799303425
absolute error = 0.42007287507623781768076799303425
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.697
y[1] (analytic) = 0
y[1] (numeric) = 0.4206628291272772369148311939381
absolute error = 0.4206628291272772369148311939381
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.698
y[1] (analytic) = 0
y[1] (numeric) = 0.42125258358908070671966104476471
absolute error = 0.42125258358908070671966104476471
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.699
y[1] (analytic) = 0
y[1] (numeric) = 0.42184213917332311691306571932452
absolute error = 0.42184213917332311691306571932452
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.7
y[1] (analytic) = 0
y[1] (numeric) = 0.42243149659064993369863662799261
absolute error = 0.42243149659064993369863662799261
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.701
y[1] (analytic) = 0
y[1] (numeric) = 0.42302065655067981302186546632261
absolute error = 0.42302065655067981302186546632261
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.702
y[1] (analytic) = 0
y[1] (numeric) = 0.42360961976200720686990620568909
absolute error = 0.42360961976200720686990620568909
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=270.8MB, alloc=4.4MB, time=28.21
x[1] = 0.703
y[1] (analytic) = 0
y[1] (numeric) = 0.4241983869322049625331756475428
absolute error = 0.4241983869322049625331756475428
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.704
y[1] (analytic) = 0
y[1] (numeric) = 0.42478695876782691484692640980583
absolute error = 0.42478695876782691484692640980583
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.705
y[1] (analytic) = 0
y[1] (numeric) = 0.42537533597441047143086665954123
absolute error = 0.42537533597441047143086665954123
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.706
y[1] (analytic) = 0
y[1] (numeric) = 0.42596351925647919094484154958637
absolute error = 0.42596351925647919094484154958637
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.707
y[1] (analytic) = 0
y[1] (numeric) = 0.42655150931754535437853215762895
absolute error = 0.42655150931754535437853215762895
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.708
y[1] (analytic) = 0
y[1] (numeric) = 0.42713930686011252939306876351842
absolute error = 0.42713930686011252939306876351842
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.709
y[1] (analytic) = 0
y[1] (numeric) = 0.42772691258567812773239653373631
absolute error = 0.42772691258567812773239653373631
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.71
y[1] (analytic) = 0
y[1] (numeric) = 0.42831432719473595572217311019318
absolute error = 0.42831432719473595572217311019318
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.711
y[1] (analytic) = 0
y[1] (numeric) = 0.42890155138677875787391922317585
absolute error = 0.42890155138677875787391922317585
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=274.6MB, alloc=4.4MB, time=28.62
x[1] = 0.712
y[1] (analytic) = 0
y[1] (numeric) = 0.42948858586030075361208526463883
absolute error = 0.42948858586030075361208526463883
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.713
y[1] (analytic) = 0
y[1] (numeric) = 0.43007543131280016714163876742336
absolute error = 0.43007543131280016714163876742336
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.714
y[1] (analytic) = 0
y[1] (numeric) = 0.43066208844078175047371993770436
absolute error = 0.43066208844078175047371993770436
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.715
y[1] (analytic) = 0
y[1] (numeric) = 0.43124855793975929962685478132062
absolute error = 0.43124855793975929962685478132062
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.716
y[1] (analytic) = 0
y[1] (numeric) = 0.4318348405042581640211579489518
absolute error = 0.4318348405042581640211579489518
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.717
y[1] (analytic) = 0
y[1] (numeric) = 0.43242093682781774908290019968299
absolute error = 0.43242093682781774908290019968299
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.718
y[1] (analytic) = 0
y[1] (numeric) = 0.43300684760299401207675834666503
absolute error = 0.43300684760299401207675834666503
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.719
y[1] (analytic) = 0
y[1] (numeric) = 0.43359257352136195118300870165875
absolute error = 0.43359257352136195118300870165875
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.72
y[1] (analytic) = 0
y[1] (numeric) = 0.43417811527351808783686837656995
absolute error = 0.43417811527351808783686837656995
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=278.4MB, alloc=4.4MB, time=29.02
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.721
y[1] (analytic) = 0
y[1] (numeric) = 0.43476347354908294234713232896814
absolute error = 0.43476347354908294234713232896814
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.722
y[1] (analytic) = 0
y[1] (numeric) = 0.43534864903670350281119775436766
absolute error = 0.43534864903670350281119775436766
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.723
y[1] (analytic) = 0
y[1] (numeric) = 0.43593364242405568734351133006932
absolute error = 0.43593364242405568734351133006932
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.724
y[1] (analytic) = 0
y[1] (numeric) = 0.43651845439784679963441890295188
absolute error = 0.43651845439784679963441890295188
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.725
y[1] (analytic) = 0
y[1] (numeric) = 0.43710308564381797785634148610576
absolute error = 0.43710308564381797785634148610576
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.726
y[1] (analytic) = 0
y[1] (numeric) = 0.43768753684674663693414588595985
absolute error = 0.43768753684674663693414588595985
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.727
y[1] (analytic) = 0
y[1] (numeric) = 0.4382718086904489041965229219121
absolute error = 0.4382718086904489041965229219121
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.728
y[1] (analytic) = 0
y[1] (numeric) = 0.43885590185778204842513102378484
absolute error = 0.43885590185778204842513102378484
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=282.2MB, alloc=4.4MB, time=29.41
x[1] = 0.729
y[1] (analytic) = 0
y[1] (numeric) = 0.4394398170306469023182079980381
absolute error = 0.4394398170306469023182079980381
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.73
y[1] (analytic) = 0
y[1] (numeric) = 0.44002355488999027838529894094345
absolute error = 0.44002355488999027838529894094345
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.731
y[1] (analytic) = 0
y[1] (numeric) = 0.44060711611580737828969364520408
absolute error = 0.44060711611580737828969364520408
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.732
y[1] (analytic) = 0
y[1] (numeric) = 0.44119050138714419565511239516453
absolute error = 0.44119050138714419565511239516453
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.733
y[1] (analytic) = 0
y[1] (numeric) = 0.44177371138209991235312477414805
absolute error = 0.44177371138209991235312477414805
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.734
y[1] (analytic) = 0
y[1] (numeric) = 0.44235674677782928828773201495749
absolute error = 0.44235674677782928828773201495749
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.735
y[1] (analytic) = 0
y[1] (numeric) = 0.44293960825054504469348951054438
absolute error = 0.44293960825054504469348951054438
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.736
y[1] (analytic) = 0
y[1] (numeric) = 0.4435222964755202409634923656625
absolute error = 0.4435222964755202409634923656625
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.737
y[1] (analytic) = 0
y[1] (numeric) = 0.4441048121270906450234933113497
absolute error = 0.4441048121270906450234933113497
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=286.1MB, alloc=4.4MB, time=29.78
x[1] = 0.738
y[1] (analytic) = 0
y[1] (numeric) = 0.44468715587865709726836892170261
absolute error = 0.44468715587865709726836892170261
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.739
y[1] (analytic) = 0
y[1] (numeric) = 0.44526932840268786807709686600149
absolute error = 0.44526932840268786807709686600149
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.74
y[1] (analytic) = 0
y[1] (numeric) = 0.44585133037072100892235389818925
absolute error = 0.44585133037072100892235389818925
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.741
y[1] (analytic) = 0
y[1] (numeric) = 0.44643316245336669709079142939423
absolute error = 0.44643316245336669709079142939423
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.742
y[1] (analytic) = 0
y[1] (numeric) = 0.44701482532030957402999284699768
absolute error = 0.44701482532030957402999284699768
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.743
y[1] (analytic) = 0
y[1] (numeric) = 0.4475963196403110773380642350741
absolute error = 0.4475963196403110773380642350741
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.744
y[1] (analytic) = 0
y[1] (numeric) = 0.44817764608121176641175781526811
absolute error = 0.44817764608121176641175781526811
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.745
y[1] (analytic) = 0
y[1] (numeric) = 0.44875880530993364176897526371061
absolute error = 0.44875880530993364176897526371061
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.746
y[1] (analytic) = 0
y[1] (numeric) = 0.44933979799248245806144606781731
absolute error = 0.44933979799248245806144606781731
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=289.9MB, alloc=4.4MB, time=30.16
x[1] = 0.747
y[1] (analytic) = 0
y[1] (numeric) = 0.44992062479395003079332426615439
absolute error = 0.44992062479395003079332426615439
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.748
y[1] (analytic) = 0
y[1] (numeric) = 0.45050128637851653676139526440263
absolute error = 0.45050128637851653676139526440263
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.749
y[1] (analytic) = 0
y[1] (numeric) = 0.45108178340945280823253294020753
absolute error = 0.45108178340945280823253294020753
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.75
y[1] (analytic) = 0
y[1] (numeric) = 0.45166211654912262087399593877756
absolute error = 0.45166211654912262087399593877756
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.751
y[1] (analytic) = 0
y[1] (numeric) = 0.45224228645898497545210091889553
absolute error = 0.45224228645898497545210091889553
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.752
y[1] (analytic) = 0
y[1] (numeric) = 0.45282229379959637331475953495318
absolute error = 0.45282229379959637331475953495318
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.753
y[1] (analytic) = 0
y[1] (numeric) = 0.4534021392306130856733151341213
absolute error = 0.4534021392306130856733151341213
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.754
y[1] (analytic) = 0
y[1] (numeric) = 0.45398182341079341669906450824578
absolute error = 0.45398182341079341669906450824578
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.755
y[1] (analytic) = 0
y[1] (numeric) = 0.4545613469979999604497995669342
absolute error = 0.4545613469979999604497995669342
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=293.7MB, alloc=4.4MB, time=30.53
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.756
y[1] (analytic) = 0
y[1] (numeric) = 0.4551407106492018516416534909914
absolute error = 0.4551407106492018516416534909914
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.757
y[1] (analytic) = 0
y[1] (numeric) = 0.45571991502047701028148578330142
absolute error = 0.45571991502047701028148578330142
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.758
y[1] (analytic) = 0
y[1] (numeric) = 0.45629896076701438017499065686526
absolute error = 0.45629896076701438017499065686526
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.759
y[1] (analytic) = 0
y[1] (numeric) = 0.45687784854311616132566338641994
absolute error = 0.45687784854311616132566338641994
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.76
y[1] (analytic) = 0
y[1] (numeric) = 0.45745657900220003623970960031709
absolute error = 0.45745657900220003623970960031709
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.761
y[1] (analytic) = 0
y[1] (numeric) = 0.45803515279680139015193300256424
absolute error = 0.45803515279680139015193300256424
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.762
y[1] (analytic) = 0
y[1] (numeric) = 0.45861357057857552518758769056736
absolute error = 0.45861357057857552518758769056736
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.763
y[1] (analytic) = 0
y[1] (numeric) = 0.45919183299829986847513207159856
absolute error = 0.45919183299829986847513207159856
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=297.5MB, alloc=4.4MB, time=30.91
x[1] = 0.764
y[1] (analytic) = 0
y[1] (numeric) = 0.45976994070587617422477237979169
absolute error = 0.45976994070587617422477237979169
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.765
y[1] (analytic) = 0
y[1] (numeric) = 0.46034789435033271978763495498541
absolute error = 0.46034789435033271978763495498541
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.766
y[1] (analytic) = 0
y[1] (numeric) = 0.46092569457982649571035776443582
absolute error = 0.46092569457982649571035776443582
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.767
y[1] (analytic) = 0
y[1] (numeric) = 0.46150334204164538979984312775857
absolute error = 0.46150334204164538979984312775857
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.768
y[1] (analytic) = 0
y[1] (numeric) = 0.46208083738221036521286524388615
absolute error = 0.46208083738221036521286524388615
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.769
y[1] (analytic) = 0
y[1] (numeric) = 0.46265818124707763258517791579359
absolute error = 0.46265818124707763258517791579359
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.77
y[1] (analytic) = 0
y[1] (numeric) = 0.46323537428094081621471982371266
absolute error = 0.46323537428094081621471982371266
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.771
y[1] (analytic) = 0
y[1] (numeric) = 0.4638124171276331143134668099797
absolute error = 0.4638124171276331143134668099797
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.772
y[1] (analytic) = 0
y[1] (numeric) = 0.46438931043012945334243290800675
absolute error = 0.46438931043012945334243290800675
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=301.3MB, alloc=4.4MB, time=31.29
x[1] = 0.773
y[1] (analytic) = 0
y[1] (numeric) = 0.46496605483054863644427427359402
absolute error = 0.46496605483054863644427427359402
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.774
y[1] (analytic) = 0
y[1] (numeric) = 0.46554265097015548598790275837958
absolute error = 0.46554265097015548598790275837958
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.775
y[1] (analytic) = 0
y[1] (numeric) = 0.4661190994893629802394686021181
absolute error = 0.4661190994893629802394686021181
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.776
y[1] (analytic) = 0
y[1] (numeric) = 0.46669540102773438417402461216504
absolute error = 0.46669540102773438417402461216504
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.777
y[1] (analytic) = 0
y[1] (numeric) = 0.46727155622398537444213724448902
absolute error = 0.46727155622398537444213724448902
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.778
y[1] (analytic) = 0
y[1] (numeric) = 0.46784756571598615850566320021827
absolute error = 0.46784756571598615850566320021827
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.779
y[1] (analytic) = 0
y[1] (numeric) = 0.46842343014076358795686350462424
absolute error = 0.46842343014076358795686350462424
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.78
y[1] (analytic) = 0
y[1] (numeric) = 0.468999150134503266034980541037
absolute error = 0.468999150134503266034980541037
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.781
y[1] (analytic) = 0
y[1] (numeric) = 0.46957472633255164935435716995392
absolute error = 0.46957472633255164935435716995392
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=305.1MB, alloc=4.4MB, time=31.66
x[1] = 0.782
y[1] (analytic) = 0
y[1] (numeric) = 0.47015015936941814385813087303046
absolute error = 0.47015015936941814385813087303046
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.783
y[1] (analytic) = 0
y[1] (numeric) = 0.47072544987877719501148982221482
absolute error = 0.47072544987877719501148982221482
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.784
y[1] (analytic) = 0
y[1] (numeric) = 0.47130059849347037224843188549662
absolute error = 0.47130059849347037224843188549662
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.785
y[1] (analytic) = 0
y[1] (numeric) = 0.47187560584550844768592184207288
absolute error = 0.47187560584550844768592184207288
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.786
y[1] (analytic) = 0
y[1] (numeric) = 0.47245047256607346911929649068661
absolute error = 0.47245047256607346911929649068661
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.787
y[1] (analytic) = 0
y[1] (numeric) = 0.47302519928552082731272189495813
absolute error = 0.47302519928552082731272189495813
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.788
y[1] (analytic) = 0
y[1] (numeric) = 0.47359978663338131759846171820512
absolute error = 0.47359978663338131759846171820512
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.789
y[1] (analytic) = 0
y[1] (numeric) = 0.47417423523836319579867045703254
absolute error = 0.47417423523836319579867045703254
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.79
y[1] (analytic) = 0
y[1] (numeric) = 0.47474854572835422848338038737055
absolute error = 0.47474854572835422848338038737055
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=309.0MB, alloc=4.4MB, time=32.04
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.791
y[1] (analytic) = 0
y[1] (numeric) = 0.4753227187304237375783061881501
absolute error = 0.4753227187304237375783061881501
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.792
y[1] (analytic) = 0
y[1] (numeric) = 0.4758967548708246393360465059382
absolute error = 0.4758967548708246393360465059382
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.793
y[1] (analytic) = 0
y[1] (numeric) = 0.47647065477499547768421716811558
absolute error = 0.47647065477499547768421716811558
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.794
y[1] (analytic) = 0
y[1] (numeric) = 0.47704441906756245196400634207865
absolute error = 0.47704441906756245196400634207865
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.795
y[1] (analytic) = 0
y[1] (numeric) = 0.47761804837234143907259767299715
absolute error = 0.47761804837234143907259767299715
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.796
y[1] (analytic) = 0
y[1] (numeric) = 0.47819154331234001002286331237271
absolute error = 0.47819154331234001002286331237271
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.797
y[1] (analytic) = 0
y[1] (numeric) = 0.47876490450975944093368477353849
absolute error = 0.47876490450975944093368477353849
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.798
y[1] (analytic) = 0
y[1] (numeric) = 0.47933813258599671846421571783329
absolute error = 0.47933813258599671846421571783329
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=312.8MB, alloc=4.4MB, time=32.43
x[1] = 0.799
y[1] (analytic) = 0
y[1] (numeric) = 0.47991122816164653970535708599619
absolute error = 0.47991122816164653970535708599619
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.8
y[1] (analytic) = 0
y[1] (numeric) = 0.48048419185650330654167144288214
absolute error = 0.48048419185650330654167144288214
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.801
y[1] (analytic) = 0
y[1] (numeric) = 0.48105702428956311449691999941856
absolute error = 0.48105702428956311449691999941856
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.802
y[1] (analytic) = 0
y[1] (numeric) = 0.48162972607902573607636251333537
absolute error = 0.48162972607902573607636251333537
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.803
y[1] (analytic) = 0
y[1] (numeric) = 0.48220229784229659861891714913362
absolute error = 0.48220229784229659861891714913362
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.804
y[1] (analytic) = 0
y[1] (numeric) = 0.48277474019598875667223439754165
absolute error = 0.48277474019598875667223439754165
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.805
y[1] (analytic) = 0
y[1] (numeric) = 0.48334705375592485890369631487495
absolute error = 0.48334705375592485890369631487495
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.806
y[1] (analytic) = 0
y[1] (numeric) = 0.48391923913713910956030964280111
absolute error = 0.48391923913713910956030964280111
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.807
y[1] (analytic) = 0
y[1] (numeric) = 0.4844912969538792244904188085503
absolute error = 0.4844912969538792244904188085503
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=316.6MB, alloc=4.4MB, time=32.82
x[1] = 0.808
y[1] (analytic) = 0
y[1] (numeric) = 0.48506322781960838174012238414376
absolute error = 0.48506322781960838174012238414376
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.809
y[1] (analytic) = 0
y[1] (numeric) = 0.48563503234700716673723430027755
absolute error = 0.48563503234700716673723430027755
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.81
y[1] (analytic) = 0
y[1] (numeric) = 0.48620671114797551207558896563846
absolute error = 0.48620671114797551207558896563846
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.811
y[1] (analytic) = 0
y[1] (numeric) = 0.48677826483363463191244743518866
absolute error = 0.48677826483363463191244743518866
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.812
y[1] (analytic) = 0
y[1] (numeric) = 0.48734969401432895099171990088012
absolute error = 0.48734969401432895099171990088012
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.813
y[1] (analytic) = 0
y[1] (numeric) = 0.48792099929962802830567804489851
absolute error = 0.48792099929962802830567804489851
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.814
y[1] (analytic) = 0
y[1] (numeric) = 0.48849218129832847540778919843836
absolute error = 0.48849218129832847540778919843836
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.815
y[1] (analytic) = 0
y[1] (numeric) = 0.48906324061845586938926278772885
absolute error = 0.48906324061845586938926278772885
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.816
y[1] (analytic) = 0
y[1] (numeric) = 0.48963417786726666053185822311665
absolute error = 0.48963417786726666053185822311665
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=320.4MB, alloc=4.4MB, time=33.20
x[1] = 0.817
y[1] (analytic) = 0
y[1] (numeric) = 0.49020499365125007464946219602457
absolute error = 0.49020499365125007464946219602457
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.818
y[1] (analytic) = 0
y[1] (numeric) = 0.49077568857613001013090229209943
absolute error = 0.49077568857613001013090229209943
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.819
y[1] (analytic) = 0
y[1] (numeric) = 0.49134626324686692969642290639988
absolute error = 0.49134626324686692969642290639988
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.82
y[1] (analytic) = 0
y[1] (numeric) = 0.49191671826765974688020865761553
absolute error = 0.49191671826765974688020865761553
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.821
y[1] (analytic) = 0
y[1] (numeric) = 0.4924870542419477072512998426163
absolute error = 0.4924870542419477072512998426163
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.822
y[1] (analytic) = 0
y[1] (numeric) = 0.49305727177241226438520394967036
absolute error = 0.49305727177241226438520394967036
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.823
y[1] (analytic) = 0
y[1] (numeric) = 0.49362737146097895059846685800716
absolute error = 0.49362737146097895059846685800716
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.824
y[1] (analytic) = 0
y[1] (numeric) = 0.49419735390881924245842709260814
absolute error = 0.49419735390881924245842709260814
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.825
y[1] (analytic) = 0
y[1] (numeric) = 0.49476721971635242108033637575149
absolute error = 0.49476721971635242108033637575149
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=324.2MB, alloc=4.4MB, time=33.59
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.826
y[1] (analytic) = 0
y[1] (numeric) = 0.49533696948324742722398972049224
absolute error = 0.49533696948324742722398972049224
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.827
y[1] (analytic) = 0
y[1] (numeric) = 0.49590660380842471120196844549835
absolute error = 0.49590660380842471120196844549835
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.828
y[1] (analytic) = 0
y[1] (numeric) = 0.49647612329005807761155975506393
absolute error = 0.49647612329005807761155975506393
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.829
y[1] (analytic) = 0
y[1] (numeric) = 0.49704552852557652490237692226006
absolute error = 0.49704552852557652490237692226006
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.83
y[1] (analytic) = 0
y[1] (numeric) = 0.49761482011166607979166463664097
absolute error = 0.49761482011166607979166463664097
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.831
y[1] (analytic) = 0
y[1] (numeric) = 0.49818399864427162653923473028103
absolute error = 0.49818399864427162653923473028103
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.832
y[1] (analytic) = 0
y[1] (numeric) = 0.49875306471859873109393827675815
absolute error = 0.49875306471859873109393827675815
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.833
y[1] (analytic) = 0
y[1] (numeric) = 0.49932201892911546012354096660777
absolute error = 0.49932201892911546012354096660777
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=328.0MB, alloc=4.4MB, time=33.99
x[1] = 0.834
y[1] (analytic) = 0
y[1] (numeric) = 0.49989086186955419493982969933437
absolute error = 0.49989086186955419493982969933437
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.835
y[1] (analytic) = 0
y[1] (numeric) = 0.50045959413291344033073949587398
absolute error = 0.50045959413291344033073949587398
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.836
y[1] (analytic) = 0
y[1] (numeric) = 0.50102821631145962831125112604052
absolute error = 0.50102821631145962831125112604052
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.837
y[1] (analytic) = 0
y[1] (numeric) = 0.50159672899672891680477126255386
absolute error = 0.50159672899672891680477126255386
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.838
y[1] (analytic) = 0
y[1] (numeric) = 0.5021651327795289832666685163315
absolute error = 0.5021651327795289832666685163315
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.839
y[1] (analytic) = 0
y[1] (numeric) = 0.50273342824994081326160037642422
absolute error = 0.50273342824994081326160037642422
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.84
y[1] (analytic) = 0
y[1] (numeric) = 0.50330161599732048400622787188605
absolute error = 0.50330161599732048400622787188605
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.841
y[1] (analytic) = 0
y[1] (numeric) = 0.50386969661030094288887669158941
absolute error = 0.50386969661030094288887669158941
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.842
y[1] (analytic) = 0
y[1] (numeric) = 0.50443767067679378097766554112771
absolute error = 0.50443767067679378097766554112771
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=331.8MB, alloc=4.4MB, time=34.38
x[1] = 0.843
y[1] (analytic) = 0
y[1] (numeric) = 0.50500553878399100152858468309226
absolute error = 0.50500553878399100152858468309226
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.844
y[1] (analytic) = 0
y[1] (numeric) = 0.50557330151836678350496989777206
absolute error = 0.50557330151836678350496989777206
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.845
y[1] (analytic) = 0
y[1] (numeric) = 0.50614095946567924011977951530943
absolute error = 0.50614095946567924011977951530943
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.846
y[1] (analytic) = 0
y[1] (numeric) = 0.50670851321097217241204470715887
absolute error = 0.50670851321097217241204470715887
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.847
y[1] (analytic) = 0
y[1] (numeric) = 0.50727596333857681786882588394966
absolute error = 0.50727596333857681786882588394966
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.848
y[1] (analytic) = 0
y[1] (numeric) = 0.50784331043211359410397082815557
absolute error = 0.50784331043211359410397082815557
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.849
y[1] (analytic) = 0
y[1] (numeric) = 0.50841055507449383760493309293937
absolute error = 0.50841055507449383760493309293937
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.85
y[1] (analytic) = 0
y[1] (numeric) = 0.50897769784792153755887222277991
absolute error = 0.50897769784792153755887222277991
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.851
y[1] (analytic) = 0
y[1] (numeric) = 0.50954473933389506476922049662059
absolute error = 0.50954473933389506476922049662059
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=335.7MB, alloc=4.4MB, time=34.78
x[1] = 0.852
y[1] (analytic) = 0
y[1] (numeric) = 0.51011168011320889567386415991742
absolute error = 0.51011168011320889567386415991742
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.853
y[1] (analytic) = 0
y[1] (numeric) = 0.51067852076595533147605049773126
absolute error = 0.51067852076595533147605049773126
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.854
y[1] (analytic) = 0
y[1] (numeric) = 0.51124526187152621239909560652244
absolute error = 0.51124526187152621239909560652244
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.855
y[1] (analytic) = 0
y[1] (numeric) = 0.51181190400861462707593134718908
absolute error = 0.51181190400861462707593134718908
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.856
y[1] (analytic) = 0
y[1] (numeric) = 0.51237844775521661708449370576656
absolute error = 0.51237844775521661708449370576656
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.857
y[1] (analytic) = 0
y[1] (numeric) = 0.51294489368863287663991865069949
absolute error = 0.51294489368863287663991865069949
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.858
y[1] (analytic) = 0
y[1] (numeric) = 0.5135112423854704474544755563368
absolute error = 0.5135112423854704474544755563368
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.859
y[1] (analytic) = 0
y[1] (numeric) = 0.51407749442164440877613236091262
absolute error = 0.51407749442164440877613236091262
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.86
y[1] (analytic) = 0
y[1] (numeric) = 0.5146436503723795626166108433912
absolute error = 0.5146436503723795626166108433912
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=339.5MB, alloc=4.4MB, time=35.17
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.861
y[1] (analytic) = 0
y[1] (numeric) = 0.51520971081221211417975473680389
absolute error = 0.51520971081221211417975473680389
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.862
y[1] (analytic) = 0
y[1] (numeric) = 0.5157756763149913475009978457241
absolute error = 0.5157756763149913475009978457241
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.863
y[1] (analytic) = 0
y[1] (numeric) = 0.51634154745388129630868390194604
absolute error = 0.51634154745388129630868390194604
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.864
y[1] (analytic) = 0
y[1] (numeric) = 0.51690732480136241011795457489129
absolute error = 0.51690732480136241011795457489129
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.865
y[1] (analytic) = 0
y[1] (numeric) = 0.51747300892923321556788685140186
absolute error = 0.51747300892923321556788685140186
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.866
y[1] (analytic) = 0
y[1] (numeric) = 0.51803860040861197301252591302797
absolute error = 0.51803860040861197301252591302797
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.867
y[1] (analytic) = 0
y[1] (numeric) = 0.51860409980993832837642466732467
absolute error = 0.51860409980993832837642466732467
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.868
y[1] (analytic) = 0
y[1] (numeric) = 0.5191695077029749602852662326754
absolute error = 0.5191695077029749602852662326754
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=343.3MB, alloc=4.4MB, time=35.57
x[1] = 0.869
y[1] (analytic) = 0
y[1] (numeric) = 0.51973482465680922248211093340683
absolute error = 0.51973482465680922248211093340683
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.87
y[1] (analytic) = 0
y[1] (numeric) = 0.52030005123985478153977473309271
absolute error = 0.52030005123985478153977473309271
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.871
y[1] (analytic) = 0
y[1] (numeric) = 0.52086518801985324987981151861218
absolute error = 0.52086518801985324987981151861218
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.872
y[1] (analytic) = 0
y[1] (numeric) = 0.5214302355638758141085372453779
absolute error = 0.5214302355638758141085372453779
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.873
y[1] (analytic) = 0
y[1] (numeric) = 0.52199519443832485868049966483173
absolute error = 0.52199519443832485868049966483173
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.874
y[1] (analytic) = 0
y[1] (numeric) = 0.52256006520893558489976317847111
absolute error = 0.52256006520893558489976317847111
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.875
y[1] (analytic) = 0
y[1] (numeric) = 0.52312484844077762526934429797115
absolute error = 0.52312484844077762526934429797115
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.876
y[1] (analytic) = 0
y[1] (numeric) = 0.52368954469825665319909923805943
absolute error = 0.52368954469825665319909923805943
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.877
y[1] (analytic) = 0
y[1] (numeric) = 0.52425415454511598808233132733849
absolute error = 0.52425415454511598808233132733849
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=347.1MB, alloc=4.4MB, time=35.98
x[1] = 0.878
y[1] (analytic) = 0
y[1] (numeric) = 0.52481867854443819575135219189217
absolute error = 0.52481867854443819575135219189217
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.879
y[1] (analytic) = 0
y[1] (numeric) = 0.52538311725864668432219704691446
absolute error = 0.52538311725864668432219704691446
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.88
y[1] (analytic) = 0
y[1] (numeric) = 0.52594747124950729543866092242401
absolute error = 0.52594747124950729543866092242401
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.881
y[1] (analytic) = 0
y[1] (numeric) = 0.52651174107812989092578925003463
absolute error = 0.52651174107812989092578925003463
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.882
y[1] (analytic) = 0
y[1] (numeric) = 0.52707592730496993486292294840554
absolute error = 0.52707592730496993486292294840554
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.883
y[1] (analytic) = 0
y[1] (numeric) = 0.52764003048983007108636496505839
absolute error = 0.52764003048983007108636496505839
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.884
y[1] (analytic) = 0
y[1] (numeric) = 0.52820405119186169613170216138769
absolute error = 0.52820405119186169613170216138769
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.885
y[1] (analytic) = 0
y[1] (numeric) = 0.52876798996956652762578346557349
absolute error = 0.52876798996956652762578346557349
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.886
y[1] (analytic) = 0
y[1] (numeric) = 0.52933184738079816813832236439926
absolute error = 0.52933184738079816813832236439926
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=350.9MB, alloc=4.4MB, time=36.39
x[1] = 0.887
y[1] (analytic) = 0
y[1] (numeric) = 0.52989562398276366450305905935338
absolute error = 0.52989562398276366450305905935338
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.888
y[1] (analytic) = 0
y[1] (numeric) = 0.53045932033202506261838497452094
absolute error = 0.53045932033202506261838497452094
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.889
y[1] (analytic) = 0
y[1] (numeric) = 0.5310229369845009577372997733264
absolute error = 0.5310229369845009577372997733264
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.89
y[1] (analytic) = 0
y[1] (numeric) = 0.5315864744954680402565386178411
absolute error = 0.5315864744954680402565386178411
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.891
y[1] (analytic) = 0
y[1] (numeric) = 0.53214993341956263701467508779826
absolute error = 0.53214993341956263701467508779826
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.892
y[1] (analytic) = 0
y[1] (numeric) = 0.53271331431078224810897296633863
absolute error = 0.53271331431078224810897296633863
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.893
y[1] (analytic) = 0
y[1] (numeric) = 0.5332766177224870792407279955206
absolute error = 0.5332766177224870792407279955206
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.894
y[1] (analytic) = 0
y[1] (numeric) = 0.5338398442074015695988087064491
absolute error = 0.5338398442074015695988087064491
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.895
y[1] (analytic) = 0
y[1] (numeric) = 0.5344029943176159152910735361887
absolute error = 0.5344029943176159152910735361887
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=354.7MB, alloc=4.4MB, time=36.80
x[1] = 0.896
y[1] (analytic) = 0
y[1] (numeric) = 0.53496606860458758833330965611033
absolute error = 0.53496606860458758833330965611033
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.897
y[1] (analytic) = 0
y[1] (numeric) = 0.53552906761914285120530725366168
absolute error = 0.53552906761914285120530725366168
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.898
y[1] (analytic) = 0
y[1] (numeric) = 0.53609199191147826698365143143341
absolute error = 0.53609199191147826698365143143341
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.899
y[1] (analytic) = 0
y[1] (numeric) = 0.53665484203116220506078241350321
absolute error = 0.53665484203116220506078241350321
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.9
y[1] (analytic) = 0
y[1] (numeric) = 0.53721761852713634245984337906498
absolute error = 0.53721761852713634245984337906498
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.901
y[1] (analytic) = 0
y[1] (numeric) = 0.53778032194771716075480397698002
absolute error = 0.53778032194771716075480397698002
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.902
y[1] (analytic) = 0
y[1] (numeric) = 0.5383429528405974386053164118113
absolute error = 0.5383429528405974386053164118113
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.903
y[1] (analytic) = 0
y[1] (numeric) = 0.53890551175284773991572993181219
absolute error = 0.53890551175284773991572993181219
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=358.5MB, alloc=4.4MB, time=37.21
x[1] = 0.904
y[1] (analytic) = 0
y[1] (numeric) = 0.53946799923091789762765859193012
absolute error = 0.53946799923091789762765859193012
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.905
y[1] (analytic) = 0
y[1] (numeric) = 0.54003041582063849315546630984821
absolute error = 0.54003041582063849315546630984821
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.906
y[1] (analytic) = 0
y[1] (numeric) = 0.54059276206722233147400248011872
absolute error = 0.54059276206722233147400248011872
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.907
y[1] (analytic) = 0
y[1] (numeric) = 0.54115503851526591186789076023837
absolute error = 0.54115503851526591186789076023837
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.908
y[1] (analytic) = 0
y[1] (numeric) = 0.54171724570875089435164309277514
absolute error = 0.54171724570875089435164309277514
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.909
y[1] (analytic) = 0
y[1] (numeric) = 0.54227938419104556176984057907829
absolute error = 0.54227938419104556176984057907829
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.91
y[1] (analytic) = 0
y[1] (numeric) = 0.54284145450490627758659247238852
absolute error = 0.54284145450490627758659247238852
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.911
y[1] (analytic) = 0
y[1] (numeric) = 0.54340345719247893937345431101534
absolute error = 0.54340345719247893937345431101534
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.912
y[1] (analytic) = 0
y[1] (numeric) = 0.54396539279530042800495606536716
absolute error = 0.54396539279530042800495606536716
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=362.4MB, alloc=4.4MB, time=37.62
x[1] = 0.913
y[1] (analytic) = 0
y[1] (numeric) = 0.54452726185430005257086112571001
absolute error = 0.54452726185430005257086112571001
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.914
y[1] (analytic) = 0
y[1] (numeric) = 0.54508906490980099101424701029945
absolute error = 0.54508906490980099101424701029945
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.915
y[1] (analytic) = 0
y[1] (numeric) = 0.54565080250152172650446882568363
absolute error = 0.54565080250152172650446882568363
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.916
y[1] (analytic) = 0
y[1] (numeric) = 0.54621247516857747955403676222155
absolute error = 0.54621247516857747955403676222155
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.917
y[1] (analytic) = 0
y[1] (numeric) = 0.54677408344948163588840925790895
absolute error = 0.54677408344948163588840925790895
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.918
y[1] (analytic) = 0
y[1] (numeric) = 0.54733562788214717007767391216527
absolute error = 0.54733562788214717007767391216527
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.919
y[1] (analytic) = 0
y[1] (numeric) = 0.54789710900388806493905877802045
absolute error = 0.54789710900388806493905877802045
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.92
y[1] (analytic) = 0
y[1] (numeric) = 0.54845852735142072671918730586315
absolute error = 0.54845852735142072671918730586315
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.921
y[1] (analytic) = 0
y[1] (numeric) = 0.54901988346086539606496095428623
absolute error = 0.54901988346086539606496095428623
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=366.2MB, alloc=4.4MB, time=38.02
x[1] = 0.922
y[1] (analytic) = 0
y[1] (numeric) = 0.54958117786774755479192432330667
absolute error = 0.54958117786774755479192432330667
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.923
y[1] (analytic) = 0
y[1] (numeric) = 0.55014241110699932845893860206173
absolute error = 0.55014241110699932845893860206173
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.924
y[1] (analytic) = 0
y[1] (numeric) = 0.55070358371296088475796015670917
absolute error = 0.55070358371296088475796015670917
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.925
y[1] (analytic) = 0
y[1] (numeric) = 0.55126469621938182772769221440581
absolute error = 0.55126469621938182772769221440581
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.926
y[1] (analytic) = 0
y[1] (numeric) = 0.55182574915942258779984882562521
absolute error = 0.55182574915942258779984882562521
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.927
y[1] (analytic) = 0
y[1] (numeric) = 0.55238674306565580768674160942385
absolute error = 0.55238674306565580768674160942385
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.928
y[1] (analytic) = 0
y[1] (numeric) = 0.55294767847006772411887120429782
absolute error = 0.55294767847006772411887120429782
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.929
y[1] (analytic) = 0
y[1] (numeric) = 0.55350855590405954544117686071286
absolute error = 0.55350855590405954544117686071286
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.93
y[1] (analytic) = 0
y[1] (numeric) = 0.55406937589844882507656921996398
absolute error = 0.55406937589844882507656921996398
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=370.0MB, alloc=4.4MB, time=38.43
x[1] = 0.931
y[1] (analytic) = 0
y[1] (numeric) = 0.55463013898347083086534302745321
absolute error = 0.55463013898347083086534302745321
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.932
y[1] (analytic) = 0
y[1] (numeric) = 0.55519084568877991028903832649253
absolute error = 0.55519084568877991028903832649253
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.933
y[1] (analytic) = 0
y[1] (numeric) = 0.55575149654345085158729057107147
absolute error = 0.55575149654345085158729057107147
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.934
y[1] (analytic) = 0
y[1] (numeric) = 0.55631209207598024077618208240546
absolute error = 0.55631209207598024077618208240546
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.935
y[1] (analytic) = 0
y[1] (numeric) = 0.55687263281428781457657935423184
absolute error = 0.55687263281428781457657935423184
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.936
y[1] (analytic) = 0
y[1] (numeric) = 0.5574331192857178092609128854774
absolute error = 0.5574331192857178092609128854774
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.937
y[1] (analytic) = 0
y[1] (numeric) = 0.55799355201704030542682848581743
absolute error = 0.55799355201704030542682848581743
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.938
y[1] (analytic) = 0
y[1] (numeric) = 0.55855393153445256870611135951528
absolute error = 0.55855393153445256870611135951528
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.939
y[1] (analytic) = 0
y[1] (numeric) = 0.55911425836358038641725672550873
absolute error = 0.55911425836358038641725672550873
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=373.8MB, alloc=4.4MB, time=38.84
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.94
y[1] (analytic) = 0
y[1] (numeric) = 0.55967453302947940017003327673116
absolute error = 0.55967453302947940017003327673116
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.941
y[1] (analytic) = 0
y[1] (numeric) = 0.56023475605663643443035841885897
absolute error = 0.56023475605663643443035841885897
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.942
y[1] (analytic) = 0
y[1] (numeric) = 0.56079492796897082105377695780043
absolute error = 0.56079492796897082105377695780043
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.943
y[1] (analytic) = 0
y[1] (numeric) = 0.56135504928983571979580772602468
absolute error = 0.56135504928983571979580772602468
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.944
y[1] (analytic) = 0
y[1] (numeric) = 0.56191512054201943480739555001376
absolute error = 0.56191512054201943480739555001376
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.945
y[1] (analytic) = 0
y[1] (numeric) = 0.56247514224774672712367896444678
absolute error = 0.56247514224774672712367896444678
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.946
y[1] (analytic) = 0
y[1] (numeric) = 0.5630351149286801231542571729369
absolute error = 0.5630351149286801231542571729369
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.947
y[1] (analytic) = 0
y[1] (numeric) = 0.5635950391059212191831129399823
absolute error = 0.5635950391059212191831129399823
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=377.6MB, alloc=4.4MB, time=39.24
x[1] = 0.948
y[1] (analytic) = 0
y[1] (numeric) = 0.56415491530001198188632137400698
absolute error = 0.56415491530001198188632137400698
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.949
y[1] (analytic) = 0
y[1] (numeric) = 0.56471474403093604487564792670212
absolute error = 0.56471474403093604487564792670212
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.95
y[1] (analytic) = 0
y[1] (numeric) = 0.5652745258181200012761123890809
absolute error = 0.5652745258181200012761123890809
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.951
y[1] (analytic) = 0
y[1] (numeric) = 0.56583426118043469234556920947746
absolute error = 0.56583426118043469234556920947746
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.952
y[1] (analytic) = 0
y[1] (numeric) = 0.56639395063619649214432809290362
absolute error = 0.56639395063619649214432809290362
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.953
y[1] (analytic) = 0
y[1] (numeric) = 0.56695359470316858826281256447464
absolute error = 0.56695359470316858826281256447464
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.954
y[1] (analytic) = 0
y[1] (numeric) = 0.56751319389856225861522799178029
absolute error = 0.56751319389856225861522799178029
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.955
y[1] (analytic) = 0
y[1] (numeric) = 0.56807274873903814430718446186113
absolute error = 0.56807274873903814430718446186113
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.956
y[1] (analytic) = 0
y[1] (numeric) = 0.56863225974070751858519389760634
absolute error = 0.56863225974070751858519389760634
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=381.4MB, alloc=4.4MB, time=39.65
x[1] = 0.957
y[1] (analytic) = 0
y[1] (numeric) = 0.56919172741913355187593487567314
absolute error = 0.56919172741913355187593487567314
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.958
y[1] (analytic) = 0
y[1] (numeric) = 0.56975115228933257292315277319417
absolute error = 0.56975115228933257292315277319417
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.959
y[1] (analytic) = 0
y[1] (numeric) = 0.57031053486577532603003712334487
absolute error = 0.57031053486577532603003712334487
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.96
y[1] (analytic) = 0
y[1] (numeric) = 0.57086987566238822441489240004592
absolute error = 0.57086987566238822441489240004592
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.961
y[1] (analytic) = 0
y[1] (numeric) = 0.57142917519255459968789287943382
absolute error = 0.57142917519255459968789287943382
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.962
y[1] (analytic) = 0
y[1] (numeric) = 0.57198843396911594745668674000688
absolute error = 0.57198843396911594745668674000688
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.963
y[1] (analytic) = 0
y[1] (numeric) = 0.57254765250437316906858916430331
absolute error = 0.57254765250437316906858916430331
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.964
y[1] (analytic) = 0
y[1] (numeric) = 0.57310683131008780949707889235596
absolute error = 0.57310683131008780949707889235596
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.965
y[1] (analytic) = 0
y[1] (numeric) = 0.57366597089748329138028745075595
absolute error = 0.57366597089748329138028745075595
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=385.3MB, alloc=4.4MB, time=40.06
x[1] = 0.966
y[1] (analytic) = 0
y[1] (numeric) = 0.5742250717772461452191451407097
absolute error = 0.5742250717772461452191451407097
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.967
y[1] (analytic) = 0
y[1] (numeric) = 0.57478413445952723574282281375486
absolute error = 0.57478413445952723574282281375486
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.968
y[1] (analytic) = 0
y[1] (numeric) = 0.57534315945394298444908349457591
absolute error = 0.57534315945394298444908349457591
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.969
y[1] (analytic) = 0
y[1] (numeric) = 0.57590214726957658832713302639723
absolute error = 0.57590214726957658832713302639723
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.97
y[1] (analytic) = 0
y[1] (numeric) = 0.57646109841497923477053411549678
absolute error = 0.57646109841497923477053411549678
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.971
y[1] (analytic) = 0
y[1] (numeric) = 0.57702001339817131268772343724678
absolute error = 0.57702001339817131268772343724678
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.972
y[1] (analytic) = 0
y[1] (numeric) = 0.57757889272664361981764683651808
absolute error = 0.57757889272664361981764683651808
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.973
y[1] (analytic) = 0
y[1] (numeric) = 0.57813773690735856625800311005285
absolute error = 0.57813773690735856625800311005285
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.974
y[1] (analytic) = 0
y[1] (numeric) = 0.5786965464467513742135623972877
absolute error = 0.5786965464467513742135623972877
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=389.1MB, alloc=4.4MB, time=40.47
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.975
y[1] (analytic) = 0
y[1] (numeric) = 0.57925532185073127397200082886832
absolute error = 0.57925532185073127397200082886832
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.976
y[1] (analytic) = 0
y[1] (numeric) = 0.57981406362468269611466878851133
absolute error = 0.57981406362468269611466878851133
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.977
y[1] (analytic) = 0
y[1] (numeric) = 0.58037277227346645996968593371317
absolute error = 0.58037277227346645996968593371317
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.978
y[1] (analytic) = 0
y[1] (numeric) = 0.58093144830142095831473199385524
absolute error = 0.58093144830142095831473199385524
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.979
y[1] (analytic) = 0
y[1] (numeric) = 0.58149009221236333833687832028516
absolute error = 0.58149009221236333833687832028516
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.98
y[1] (analytic) = 0
y[1] (numeric) = 0.58204870450959067885678120174375
absolute error = 0.58204870450959067885678120174375
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.981
y[1] (analytic) = 0
y[1] (numeric) = 0.58260728569588116382453407983356
absolute error = 0.58260728569588116382453407983356
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.982
y[1] (analytic) = 0
y[1] (numeric) = 0.58316583627349525209445200286757
absolute error = 0.58316583627349525209445200286757
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=392.9MB, alloc=4.4MB, time=40.88
x[1] = 0.983
y[1] (analytic) = 0
y[1] (numeric) = 0.58372435674417684348603794217517
absolute error = 0.58372435674417684348603794217517
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.984
y[1] (analytic) = 0
y[1] (numeric) = 0.58428284760915444113835696255872
absolute error = 0.58428284760915444113835696255872
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.985
y[1] (analytic) = 0
y[1] (numeric) = 0.58484130936914231016502068786869
absolute error = 0.58484130936914231016502068786869
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.986
y[1] (analytic) = 0
y[1] (numeric) = 0.58539974252434163261696103338264
absolute error = 0.58539974252434163261696103338264
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.987
y[1] (analytic) = 0
y[1] (numeric) = 0.58595814757444165876014878861574
absolute error = 0.58595814757444165876014878861574
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.988
y[1] (analytic) = 0
y[1] (numeric) = 0.5865165250186208546753893271437
absolute error = 0.5865165250186208546753893271437
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.989
y[1] (analytic) = 0
y[1] (numeric) = 0.587074875355548046187304493768
absolute error = 0.587074875355548046187304493768
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.99
y[1] (analytic) = 0
y[1] (numeric) = 0.58763319908338355912958657368462
absolute error = 0.58763319908338355912958657368462
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.991
y[1] (analytic) = 0
y[1] (numeric) = 0.58819149669978035595358718301889
absolute error = 0.58819149669978035595358718301889
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=396.7MB, alloc=4.4MB, time=41.28
x[1] = 0.992
y[1] (analytic) = 0
y[1] (numeric) = 0.58874976870188516868728093494837
absolute error = 0.58874976870188516868728093494837
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.993
y[1] (analytic) = 0
y[1] (numeric) = 0.58930801558633962825162083044221
absolute error = 0.58930801558633962825162083044221
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.994
y[1] (analytic) = 0
y[1] (numeric) = 0.58986623784928139014127949718945
absolute error = 0.58986623784928139014127949718945
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.995
y[1] (analytic) = 0
y[1] (numeric) = 0.59042443598634525647674765436087
absolute error = 0.59042443598634525647674765436087
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.996
y[1] (analytic) = 0
y[1] (numeric) = 0.59098261049266429443473851424109
absolute error = 0.59098261049266429443473851424109
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.997
y[1] (analytic) = 0
y[1] (numeric) = 0.59154076186287095106382424427285
absolute error = 0.59154076186287095106382424427285
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.998
y[1] (analytic) = 0
y[1] (numeric) = 0.59209889059109816449220810446637
absolute error = 0.59209889059109816449220810446637
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 0.999
y[1] (analytic) = 0
y[1] (numeric) = 0.59265699717098047153451344523902
absolute error = 0.59265699717098047153451344523902
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1
y[1] (analytic) = 0
y[1] (numeric) = 0.59321508209565511170444839935843
absolute error = 0.59321508209565511170444839935843
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=400.5MB, alloc=4.4MB, time=41.71
x[1] = 1.001
y[1] (analytic) = 0
y[1] (numeric) = 0.59377314585776312764018282856254
absolute error = 0.59377314585776312764018282856254
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.002
y[1] (analytic) = 0
y[1] (numeric) = 0.59433118894945046194925189041956
absolute error = 0.59433118894945046194925189041956
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.003
y[1] (analytic) = 0
y[1] (numeric) = 0.59488921186236905047977847386746
absolute error = 0.59488921186236905047977847386746
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.004
y[1] (analytic) = 0
y[1] (numeric) = 0.59544721508767791202478471243498
absolute error = 0.59544721508767791202478471243498
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.005
y[1] (analytic) = 0
y[1] (numeric) = 0.59600519911604423446634082219391
absolute error = 0.59600519911604423446634082219391
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.006
y[1] (analytic) = 0
y[1] (numeric) = 0.59656316443764445736627762682602
absolute error = 0.59656316443764445736627762682602
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.007
y[1] (analytic) = 0
y[1] (numeric) = 0.59712111154216535101016732460848
absolute error = 0.59712111154216535101016732460848
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.008
y[1] (analytic) = 0
y[1] (numeric) = 0.59767904091880509191125532143148
absolute error = 0.59767904091880509191125532143148
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=404.3MB, alloc=4.4MB, time=42.11
x[1] = 1.009
y[1] (analytic) = 0
y[1] (numeric) = 0.59823695305627433478100429996321
absolute error = 0.59823695305627433478100429996321
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.01
y[1] (analytic) = 0
y[1] (numeric) = 0.59879484844279728097289011757509
absolute error = 0.59879484844279728097289011757509
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.011
y[1] (analytic) = 0
y[1] (numeric) = 0.59935272756611274340606762443772
absolute error = 0.59935272756611274340606762443772
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.012
y[1] (analytic) = 0
y[1] (numeric) = 0.59991059091347520797550306810164
absolute error = 0.59991059091347520797550306810164
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.013
y[1] (analytic) = 0
y[1] (numeric) = 0.60046843897165589145514840169227
absolute error = 0.60046843897165589145514840169227
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.014
y[1] (analytic) = 0
y[1] (numeric) = 0.60102627222694379590071153938284
absolute error = 0.60102627222694379590071153938284
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.015
y[1] (analytic) = 0
y[1] (numeric) = 0.60158409116514675955855540487018
absolute error = 0.60158409116514675955855540487018
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.016
y[1] (analytic) = 0
y[1] (numeric) = 0.60214189627159250428723749597455
absolute error = 0.60214189627159250428723749597455
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.017
y[1] (analytic) = 0
y[1] (numeric) = 0.60269968803112967949818064102626
absolute error = 0.60269968803112967949818064102626
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=408.1MB, alloc=4.5MB, time=42.52
x[1] = 1.018
y[1] (analytic) = 0
y[1] (numeric) = 0.60325746692812890262194465019778
absolute error = 0.60325746692812890262194465019778
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.019
y[1] (analytic) = 0
y[1] (numeric) = 0.60381523344648379610654766720286
absolute error = 0.60381523344648379610654766720286
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.02
y[1] (analytic) = 0
y[1] (numeric) = 0.60437298806961202095426520362415
absolute error = 0.60437298806961202095426520362415
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.021
y[1] (analytic) = 0
y[1] (numeric) = 0.60493073128045630680331408936188
absolute error = 0.60493073128045630680331408936188
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.022
y[1] (analytic) = 0
y[1] (numeric) = 0.60548846356148547856080789813078
absolute error = 0.60548846356148547856080789813078
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.023
y[1] (analytic) = 0
y[1] (numeric) = 0.60604618539469547959334980638539
absolute error = 0.60604618539469547959334980638539
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.024
y[1] (analytic) = 0
y[1] (numeric) = 0.60660389726161039148160831733963
absolute error = 0.60660389726161039148160831733963
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.025
y[1] (analytic) = 0
y[1] (numeric) = 0.60716159964328345034520082868142
absolute error = 0.60716159964328345034520082868142
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.026
y[1] (analytic) = 0
y[1] (numeric) = 0.60771929302029805974418964298288
absolute error = 0.60771929302029805974418964298288
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=412.0MB, alloc=4.5MB, time=42.93
x[1] = 1.027
y[1] (analytic) = 0
y[1] (numeric) = 0.6082769778727688001634747134894
absolute error = 0.6082769778727688001634747134894
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.028
y[1] (analytic) = 0
y[1] (numeric) = 0.6088346546803424350863471847538
absolute error = 0.6088346546803424350863471847538
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.029
y[1] (analytic) = 0
y[1] (numeric) = 0.6093923239221989136634476272845
absolute error = 0.6093923239221989136634476272845
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.03
y[1] (analytic) = 0
y[1] (numeric) = 0.60994998607705236998335277781813
absolute error = 0.60994998607705236998335277781813
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.031
y[1] (analytic) = 0
y[1] (numeric) = 0.61050764162315211895099458182764
absolute error = 0.61050764162315211895099458182764
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.032
y[1] (analytic) = 0
y[1] (numeric) = 0.61106529103828364878009539225823
absolute error = 0.61106529103828364878009539225823
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.033
y[1] (analytic) = 0
y[1] (numeric) = 0.61162293479976961010578330806664
absolute error = 0.61162293479976961010578330806664
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.034
y[1] (analytic) = 0
y[1] (numeric) = 0.61218057338447080172353183774729
absolute error = 0.61218057338447080172353183774729
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=415.8MB, alloc=4.5MB, time=43.34
x[1] = 1.035
y[1] (analytic) = 0
y[1] (numeric) = 0.61273820726878715296054834648474
absolute error = 0.61273820726878715296054834648474
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.036
y[1] (analytic) = 0
y[1] (numeric) = 0.61329583692865870268571609070009
absolute error = 0.61329583692865870268571609070009
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.037
y[1] (analytic) = 0
y[1] (numeric) = 0.6138534628395665749641750603835
absolute error = 0.6138534628395665749641750603835
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.038
y[1] (analytic) = 0
y[1] (numeric) = 0.61441108547653395136260733755255
absolute error = 0.61441108547653395136260733755255
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.039
y[1] (analytic) = 0
y[1] (numeric) = 0.61496870531412703991127323827149
absolute error = 0.61496870531412703991127323827149
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.04
y[1] (analytic) = 0
y[1] (numeric) = 0.61552632282645604072882513573803
absolute error = 0.61552632282645604072882513573803
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.041
y[1] (analytic) = 0
y[1] (numeric) = 0.61608393848717610831590656281836
absolute error = 0.61608393848717610831590656281836
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.042
y[1] (analytic) = 0
y[1] (numeric) = 0.61664155276948831052352496391752
absolute error = 0.61664155276948831052352496391752
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.043
y[1] (analytic) = 0
y[1] (numeric) = 0.61719916614614058420216730803852
absolute error = 0.61719916614614058420216730803852
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=419.6MB, alloc=4.5MB, time=43.75
x[1] = 1.044
y[1] (analytic) = 0
y[1] (numeric) = 0.61775677908942868753760868714127
absolute error = 0.61775677908942868753760868714127
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.045
y[1] (analytic) = 0
y[1] (numeric) = 0.61831439207119714907934500629031
absolute error = 0.61831439207119714907934500629031
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.046
y[1] (analytic) = 0
y[1] (numeric) = 0.61887200556284021346756192441133
absolute error = 0.61887200556284021346756192441133
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.047
y[1] (analytic) = 0
y[1] (numeric) = 0.61942962003530278386453332659098
absolute error = 0.61942962003530278386453332659098
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.048
y[1] (analytic) = 0
y[1] (numeric) = 0.61998723595908136109632380058656
absolute error = 0.61998723595908136109632380058656
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.049
y[1] (analytic) = 0
y[1] (numeric) = 0.620544853804224979510650851394
absolute error = 0.620544853804224979510650851394
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.05
y[1] (analytic) = 0
y[1] (numeric) = 0.62110247404033613955674391818882
absolute error = 0.62110247404033613955674391818882
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.051
y[1] (analytic) = 0
y[1] (numeric) = 0.62166009713657173709301865754019
absolute error = 0.62166009713657173709301865754019
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.052
y[1] (analytic) = 0
y[1] (numeric) = 0.62221772356164398942836642533776
absolute error = 0.62221772356164398942836642533776
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
memory used=423.4MB, alloc=4.5MB, time=44.17
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.053
y[1] (analytic) = 0
y[1] (numeric) = 0.62277535378382135810284042720112
absolute error = 0.62277535378382135810284042720112
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.054
y[1] (analytic) = 0
y[1] (numeric) = 0.6233329882709294684135016130993
absolute error = 0.6233329882709294684135016130993
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.055
y[1] (analytic) = 0
y[1] (numeric) = 0.62389062749035202569116906632988
absolute error = 0.62389062749035202569116906632988
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.056
y[1] (analytic) = 0
y[1] (numeric) = 0.62444827190903172833380137973227
absolute error = 0.62444827190903172833380137973227
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.057
y[1] (analytic) = 0
y[1] (numeric) = 0.62500592199347117760221732287657
absolute error = 0.62500592199347117760221732287657
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.058
y[1] (analytic) = 0
y[1] (numeric) = 0.62556357820973378418384598281712
absolute error = 0.62556357820973378418384598281712
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.059
y[1] (analytic) = 0
y[1] (numeric) = 0.62612124102344467153017850766915
absolute error = 0.62612124102344467153017850766915
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.06
y[1] (analytic) = 0
y[1] (numeric) = 0.62667891089979157597357559659788
absolute error = 0.62667891089979157597357559659788
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=427.2MB, alloc=4.5MB, time=44.57
x[1] = 1.061
y[1] (analytic) = 0
y[1] (numeric) = 0.62723658830352574362906696164431
absolute error = 0.62723658830352574362906696164431
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.062
y[1] (analytic) = 0
y[1] (numeric) = 0.6277942736989628240867611359922
absolute error = 0.6277942736989628240867611359922
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.063
y[1] (analytic) = 0
y[1] (numeric) = 0.62835196754998376090046621964934
absolute error = 0.62835196754998376090046621964934
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.064
y[1] (analytic) = 0
y[1] (numeric) = 0.62890967032003567887810443691696
absolute error = 0.62890967032003567887810443691696
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.065
y[1] (analytic) = 0
y[1] (numeric) = 0.62946738247213276817948573029734
absolute error = 0.62946738247213276817948573029734
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.066
y[1] (analytic) = 0
y[1] (numeric) = 0.63002510446885716522698803248673
absolute error = 0.63002510446885716522698803248673
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.067
y[1] (analytic) = 0
y[1] (numeric) = 0.63058283677235983043467434166369
absolute error = 0.63058283677235983043467434166369
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.068
y[1] (analytic) = 0
y[1] (numeric) = 0.63114057984436142276135927525767
absolute error = 0.63114057984436142276135927525767
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.069
y[1] (analytic) = 0
y[1] (numeric) = 0.63169833414615317109312039361615
absolute error = 0.63169833414615317109312039361615
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=431.0MB, alloc=4.5MB, time=44.97
x[1] = 1.07
y[1] (analytic) = 0
y[1] (numeric) = 0.63225610013859774246073226732788
absolute error = 0.63225610013859774246073226732788
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.071
y[1] (analytic) = 0
y[1] (numeric) = 0.63281387828213010709748401025247
absolute error = 0.63281387828213010709748401025247
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.072
y[1] (analytic) = 0
y[1] (numeric) = 0.63337166903675840034282381440195
absolute error = 0.63337166903675840034282381440195
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.073
y[1] (analytic) = 0
y[1] (numeric) = 0.63392947286206478139725690256612
absolute error = 0.63392947286206478139725690256612
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.074
y[1] (analytic) = 0
y[1] (numeric) = 0.63448729021720628893390625982118
absolute error = 0.63448729021720628893390625982118
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.075
y[1] (analytic) = 0
y[1] (numeric) = 0.63504512156091569357212851566006
absolute error = 0.63504512156091569357212851566006
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.076
y[1] (analytic) = 0
y[1] (numeric) = 0.63560296735150234721856042428452
absolute error = 0.63560296735150234721856042428452
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.077
y[1] (analytic) = 0
y[1] (numeric) = 0.63616082804685302928095453145431
absolute error = 0.63616082804685302928095453145431
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.078
y[1] (analytic) = 0
y[1] (numeric) = 0.63671870410443278976014582205096
absolute error = 0.63671870410443278976014582205096
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=434.8MB, alloc=4.5MB, time=45.38
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.079
y[1] (analytic) = 0
y[1] (numeric) = 0.63727659598128578922547441303431
absolute error = 0.63727659598128578922547441303431
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.08
y[1] (analytic) = 0
y[1] (numeric) = 0.63783450413403613567897269160361
absolute error = 0.63783450413403613567897269160361
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.081
y[1] (analytic) = 0
y[1] (numeric) = 0.63839242901888871831360869797497
absolute error = 0.63839242901888871831360869797497
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.082
y[1] (analytic) = 0
y[1] (numeric) = 0.63895037109163003817086101610812
absolute error = 0.63895037109163003817086101610812
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.083
y[1] (analytic) = 0
y[1] (numeric) = 0.63950833080762903570288396381305
absolute error = 0.63950833080762903570288396381305
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.084
y[1] (analytic) = 0
y[1] (numeric) = 0.64006630862183791524450546579693
absolute error = 0.64006630862183791524450546579693
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.085
y[1] (analytic) = 0
y[1] (numeric) = 0.64062430498879296640028364923006
absolute error = 0.64062430498879296640028364923006
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.086
y[1] (analytic) = 0
y[1] (numeric) = 0.64118232036261538235183192117363
absolute error = 0.64118232036261538235183192117363
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=438.7MB, alloc=4.5MB, time=45.78
x[1] = 1.087
y[1] (analytic) = 0
y[1] (numeric) = 0.64174035519701207509060607057921
absolute error = 0.64174035519701207509060607057921
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.088
y[1] (analytic) = 0
y[1] (numeric) = 0.64229840994527648758133078439835
absolute error = 0.64229840994527648758133078439835
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.089
y[1] (analytic) = 0
y[1] (numeric) = 0.64285648506028940286122687748924
absolute error = 0.64285648506028940286122687748924
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.09
y[1] (analytic) = 0
y[1] (numeric) = 0.64341458099451975008018450933516
absolute error = 0.64341458099451975008018450933516
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.091
y[1] (analytic) = 0
y[1] (numeric) = 0.64397269820002540748701169695654
absolute error = 0.64397269820002540748701169695654
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.092
y[1] (analytic) = 0
y[1] (numeric) = 0.64453083712845400236687153266541
absolute error = 0.64453083712845400236687153266541
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.093
y[1] (analytic) = 0
y[1] (numeric) = 0.64508899823104370793500567733818
absolute error = 0.64508899823104370793500567733818
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.094
y[1] (analytic) = 0
y[1] (numeric) = 0.64564718195862403719182592453272
absolute error = 0.64564718195862403719182592453272
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.095
y[1] (analytic) = 0
y[1] (numeric) = 0.64620538876161663374443991790973
absolute error = 0.64620538876161663374443991790973
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=442.5MB, alloc=4.5MB, time=46.19
x[1] = 1.096
y[1] (analytic) = 0
y[1] (numeric) = 0.64676361909003605959966145389974
absolute error = 0.64676361909003605959966145389974
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.097
y[1] (analytic) = 0
y[1] (numeric) = 0.64732187339349057993354021324872
absolute error = 0.64732187339349057993354021324872
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.098
y[1] (analytic) = 0
y[1] (numeric) = 0.64788015212118294484243023884125
absolute error = 0.64788015212118294484243023884125
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.099
y[1] (analytic) = 0
y[1] (numeric) = 0.64843845572191116808060101290451
absolute error = 0.64843845572191116808060101290451
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.1
y[1] (analytic) = 0
y[1] (numeric) = 0.64899678464406930278937958420448
absolute error = 0.64899678464406930278937958420448
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.101
y[1] (analytic) = 0
y[1] (numeric) = 0.64955513933564821422279685502233
absolute error = 0.64955513933564821422279685502233
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.102
y[1] (analytic) = 0
y[1] (numeric) = 0.65011352024423634947469585841106
absolute error = 0.65011352024423634947469585841106
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.103
y[1] (analytic) = 0
y[1] (numeric) = 0.65067192781702050421224463834552
absolute error = 0.65067192781702050421224463834552
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=446.3MB, alloc=4.5MB, time=46.60
x[1] = 1.104
y[1] (analytic) = 0
y[1] (numeric) = 0.65123036250078658642078118876098
absolute error = 0.65123036250078658642078118876098
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.105
y[1] (analytic) = 0
y[1] (numeric) = 0.65178882474192037716490281199321
absolute error = 0.65178882474192037716490281199321
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.106
y[1] (analytic) = 0
y[1] (numeric) = 0.65234731498640828837069722265569
absolute error = 0.65234731498640828837069722265569
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.107
y[1] (analytic) = 0
y[1] (numeric) = 0.65290583367983811763399774938471
absolute error = 0.65290583367983811763399774938471
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.108
y[1] (analytic) = 0
y[1] (numeric) = 0.65346438126739980005953007402075
absolute error = 0.65346438126739980005953007402075
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.109
y[1] (analytic) = 0
y[1] (numeric) = 0.6540229581938861571358030955442
absolute error = 0.6540229581938861571358030955442
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.11
y[1] (analytic) = 0
y[1] (numeric) = 0.65458156490369364265058171431501
absolute error = 0.65458156490369364265058171431501
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.111
y[1] (analytic) = 0
y[1] (numeric) = 0.65514020184082308565176460075078
absolute error = 0.65514020184082308565176460075078
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.112
y[1] (analytic) = 0
y[1] (numeric) = 0.65569886944888043045847534138656
absolute error = 0.65569886944888043045847534138656
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=450.1MB, alloc=4.5MB, time=47.01
x[1] = 1.113
y[1] (analytic) = 0
y[1] (numeric) = 0.65625756817107747372716074416485
absolute error = 0.65625756817107747372716074416485
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.114
y[1] (analytic) = 0
y[1] (numeric) = 0.65681629845023259857747553367759
absolute error = 0.65681629845023259857747553367759
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.115
y[1] (analytic) = 0
y[1] (numeric) = 0.65737506072877150578271817579668
absolute error = 0.65737506072877150578271817579668
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.116
y[1] (analytic) = 0
y[1] (numeric) = 0.65793385544872794202956813955859
absolute error = 0.65793385544872794202956813955859
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.117
y[1] (analytic) = 0
y[1] (numeric) = 0.6584926830517444252518605321863
absolute error = 0.6584926830517444252518605321863
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.118
y[1] (analytic) = 0
y[1] (numeric) = 0.65905154397907296704311973061206
absolute error = 0.65905154397907296704311973061206
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.119
y[1] (analytic) = 0
y[1] (numeric) = 0.65961043867157579215255937968225
absolute error = 0.65961043867157579215255937968225
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.12
y[1] (analytic) = 0
y[1] (numeric) = 0.66016936756972605506924193325629
absolute error = 0.66016936756972605506924193325629
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.121
y[1] (analytic) = 0
y[1] (numeric) = 0.66072833111360855369907677953109
absolute error = 0.66072833111360855369907677953109
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=453.9MB, alloc=4.5MB, time=47.41
x[1] = 1.122
y[1] (analytic) = 0
y[1] (numeric) = 0.66128732974292044013932191600693
absolute error = 0.66128732974292044013932191600693
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.123
y[1] (analytic) = 0
y[1] (numeric) = 0.66184636389697192855524012243685
absolute error = 0.66184636389697192855524012243685
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.124
y[1] (analytic) = 0
y[1] (numeric) = 0.66240543401468700016354662174728
absolute error = 0.66240543401468700016354662174728
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.125
y[1] (analytic) = 0
y[1] (numeric) = 0.66296454053460410532727131915981
absolute error = 0.66296454053460410532727131915981
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.126
y[1] (analytic) = 0
y[1] (numeric) = 0.66352368389487686276664486846162
absolute error = 0.66352368389487686276664486846162
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.127
y[1] (analytic) = 0
y[1] (numeric) = 0.66408286453327475589060403144347
absolute error = 0.66408286453327475589060403144347
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.128
y[1] (analytic) = 0
y[1] (numeric) = 0.66464208288718382625349807182876
absolute error = 0.66464208288718382625349807182876
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.129
y[1] (analytic) = 0
y[1] (numeric) = 0.66520133939360736414156425843458
absolute error = 0.66520133939360736414156425843458
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=457.7MB, alloc=4.5MB, time=47.82
x[1] = 1.13
y[1] (analytic) = 0
y[1] (numeric) = 0.66576063448916659629372694371591
absolute error = 0.66576063448916659629372694371591
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.131
y[1] (analytic) = 0
y[1] (numeric) = 0.66631996861010137076126113312833
absolute error = 0.66631996861010137076126113312833
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.132
y[1] (analytic) = 0
y[1] (numeric) = 0.66687934219227083891084796778307
absolute error = 0.66687934219227083891084796778307
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.133
y[1] (analytic) = 0
y[1] (numeric) = 0.66743875567115413457553610754329
absolute error = 0.66743875567115413457553610754329
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.134
y[1] (analytic) = 0
y[1] (numeric) = 0.66799820948185105035810962390377
absolute error = 0.66799820948185105035810962390377
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.135
y[1] (analytic) = 0
y[1] (numeric) = 0.66855770405908271109134969159015
absolute error = 0.66855770405908271109134969159015
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.136
y[1] (analytic) = 0
y[1] (numeric) = 0.66911723983719224445966410469158
absolute error = 0.66911723983719224445966410469158
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.137
y[1] (analytic) = 0
y[1] (numeric) = 0.66967681725014544878654543718563
absolute error = 0.66967681725014544878654543718563
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.138
y[1] (analytic) = 0
y[1] (numeric) = 0.67023643673153145799230551880996
absolute error = 0.67023643673153145799230551880996
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=461.5MB, alloc=4.5MB, time=48.23
x[1] = 1.139
y[1] (analytic) = 0
y[1] (numeric) = 0.67079609871456340372652080526644
absolute error = 0.67079609871456340372652080526644
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.14
y[1] (analytic) = 0
y[1] (numeric) = 0.67135580363207907467961018659434
absolute error = 0.67135580363207907467961018659434
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.141
y[1] (analytic) = 0
y[1] (numeric) = 0.67191555191654157307795379910565
absolute error = 0.67191555191654157307795379910565
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.142
y[1] (analytic) = 0
y[1] (numeric) = 0.67247534400003996836694848442244
absolute error = 0.67247534400003996836694848442244
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.143
y[1] (analytic) = 0
y[1] (numeric) = 0.67303518031428994808638267378026
absolute error = 0.67303518031428994808638267378026
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.144
y[1] (analytic) = 0
y[1] (numeric) = 0.67359506129063446594250066674891
absolute error = 0.67359506129063446594250066674891
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.145
y[1] (analytic) = 0
y[1] (numeric) = 0.67415498736004438708111352075949
absolute error = 0.67415498736004438708111352075949
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.146
y[1] (analytic) = 0
y[1] (numeric) = 0.67471495895311913056610107120226
absolute error = 0.67471495895311913056610107120226
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.147
y[1] (analytic) = 0
y[1] (numeric) = 0.67527497650008730906763696126056
absolute error = 0.67527497650008730906763696126056
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=465.4MB, alloc=4.5MB, time=48.64
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.148
y[1] (analytic) = 0
y[1] (numeric) = 0.67583504043080736576445597596083
absolute error = 0.67583504043080736576445597596083
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.149
y[1] (analytic) = 0
y[1] (numeric) = 0.67639515117476820846447044603601
absolute error = 0.67639515117476820846447044603601
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.15
y[1] (analytic) = 0
y[1] (numeric) = 0.67695530916108984094803001400803
absolute error = 0.67695530916108984094803001400803
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.151
y[1] (analytic) = 0
y[1] (numeric) = 0.67751551481852399153810663728491
absolute error = 0.67751551481852399153810663728491
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.152
y[1] (analytic) = 0
y[1] (numeric) = 0.67807576857545473890167434092867
absolute error = 0.67807576857545473890167434092867
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.153
y[1] (analytic) = 0
y[1] (numeric) = 0.67863607085989913508654092597192
absolute error = 0.67863607085989913508654092597192
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.154
y[1] (analytic) = 0
y[1] (numeric) = 0.67919642209950782579787658763532
absolute error = 0.67919642209950782579787658763532
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.155
y[1] (analytic) = 0
y[1] (numeric) = 0.67975682272156566791867220141494
absolute error = 0.67975682272156566791867220141494
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=469.2MB, alloc=4.5MB, time=49.05
x[1] = 1.156
y[1] (analytic) = 0
y[1] (numeric) = 0.68031727315299234427834789366082
absolute error = 0.68031727315299234427834789366082
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.157
y[1] (analytic) = 0
y[1] (numeric) = 0.68087777382034297567372042684665
absolute error = 0.68087777382034297567372042684665
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.158
y[1] (analytic) = 0
y[1] (numeric) = 0.68143832514980873014652589812862
absolute error = 0.68143832514980873014652589812862
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.159
y[1] (analytic) = 0
y[1] (numeric) = 0.68199892756721742952168227290128
absolute error = 0.68199892756721742952168227290128
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.16
y[1] (analytic) = 0
y[1] (numeric) = 0.68255958149803415321046435277357
absolute error = 0.68255958149803415321046435277357
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.161
y[1] (analytic) = 0
y[1] (numeric) = 0.68312028736736183928275190960196
absolute error = 0.68312028736736183928275190960196
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.162
y[1] (analytic) = 0
y[1] (numeric) = 0.68368104559994188281249990382443
absolute error = 0.68368104559994188281249990382443
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.163
y[1] (analytic) = 0
y[1] (numeric) = 0.68424185662015473150056794623284
absolute error = 0.68424185662015473150056794623284
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.164
y[1] (analytic) = 0
y[1] (numeric) = 0.68480272085202047857903445739697
absolute error = 0.68480272085202047857903445739697
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=473.0MB, alloc=4.5MB, time=49.46
x[1] = 1.165
y[1] (analytic) = 0
y[1] (numeric) = 0.68536363871919945300110932810641
absolute error = 0.68536363871919945300110932810641
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.166
y[1] (analytic) = 0
y[1] (numeric) = 0.68592461064499280692074728732214
absolute error = 0.68592461064499280692074728732214
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.167
y[1] (analytic) = 0
y[1] (numeric) = 0.68648563705234310046605264112349
absolute error = 0.68648563705234310046605264112349
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.168
y[1] (analytic) = 0
y[1] (numeric) = 0.6870467183638348838105545568955
absolute error = 0.6870467183638348838105545568955
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.169
y[1] (analytic) = 0
y[1] (numeric) = 0.68760785500169527654642063142219
absolute error = 0.68760785500169527654642063142219
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.17
y[1] (analytic) = 0
y[1] (numeric) = 0.68816904738779454436366509953062
absolute error = 0.68816904738779454436366509953062
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.171
y[1] (analytic) = 0
y[1] (numeric) = 0.68873029594364667303939671136617
absolute error = 0.68873029594364667303939671136617
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.172
y[1] (analytic) = 0
y[1] (numeric) = 0.68929160109040993974114003116901
absolute error = 0.68929160109040993974114003116901
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.173
y[1] (analytic) = 0
y[1] (numeric) = 0.68985296324888748164825268846328
absolute error = 0.68985296324888748164825268846328
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=476.8MB, alloc=4.5MB, time=49.87
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.174
y[1] (analytic) = 0
y[1] (numeric) = 0.69041438283952786189544994376306
absolute error = 0.69041438283952786189544994376306
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.175
y[1] (analytic) = 0
y[1] (numeric) = 0.69097586028242563284243681514137
absolute error = 0.69097586028242563284243681514137
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.176
y[1] (analytic) = 0
y[1] (numeric) = 0.69153739599732189667363694919946
absolute error = 0.69153739599732189667363694919946
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.177
y[1] (analytic) = 0
y[1] (numeric) = 0.69209899040360486333199641001366
absolute error = 0.69209899040360486333199641001366
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.178
y[1] (analytic) = 0
y[1] (numeric) = 0.69266064392031040579082960242535
absolute error = 0.69266064392031040579082960242535
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.179
y[1] (analytic) = 0
y[1] (numeric) = 0.69322235696612261266766364147753
absolute error = 0.69322235696612261266766364147753
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.18
y[1] (analytic) = 0
y[1] (numeric) = 0.6937841299593743381840266277885
absolute error = 0.6937841299593743381840266277885
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.181
y[1] (analytic) = 0
y[1] (numeric) = 0.69434596331804774947511448909197
absolute error = 0.69434596331804774947511448909197
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=480.6MB, alloc=4.5MB, time=50.27
x[1] = 1.182
y[1] (analytic) = 0
y[1] (numeric) = 0.69490785745977487125326030096327
absolute error = 0.69490785745977487125326030096327
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.183
y[1] (analytic) = 0
y[1] (numeric) = 0.69546981280183812782911930479649
absolute error = 0.69546981280183812782911930479649
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.184
y[1] (analytic) = 0
y[1] (numeric) = 0.69603182976117088249447219829852
absolute error = 0.69603182976117088249447219829852
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.185
y[1] (analytic) = 0
y[1] (numeric) = 0.69659390875435797427053868302599
absolute error = 0.69659390875435797427053868302599
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.186
y[1] (analytic) = 0
y[1] (numeric) = 0.6971560501976362520256827147129
absolute error = 0.6971560501976362520256827147129
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.187
y[1] (analytic) = 0
y[1] (numeric) = 0.69771825450689510596638041522315
absolute error = 0.69771825450689510596638041522315
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.188
y[1] (analytic) = 0
y[1] (numeric) = 0.69828052209767699650531116981712
absolute error = 0.69828052209767699650531116981712
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.189
y[1] (analytic) = 0
y[1] (numeric) = 0.69884285338517798051042204994851
absolute error = 0.69884285338517798051042204994851
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.19
y[1] (analytic) = 0
y[1] (numeric) = 0.69940524878424823493880536991109
absolute error = 0.69940524878424823493880536991109
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=484.4MB, alloc=4.5MB, time=50.69
x[1] = 1.191
y[1] (analytic) = 0
y[1] (numeric) = 0.69996770870939257785921890523944
absolute error = 0.69996770870939257785921890523944
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.192
y[1] (analytic) = 0
y[1] (numeric) = 0.70053023357477098686706807173777
absolute error = 0.70053023357477098686706807173777
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.193
y[1] (analytic) = 0
y[1] (numeric) = 0.70109282379419911489565918627216
absolute error = 0.70109282379419911489565918627216
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.194
y[1] (analytic) = 0
y[1] (numeric) = 0.70165547978114880342752280391895
absolute error = 0.70165547978114880342752280391895
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.195
y[1] (analytic) = 0
y[1] (numeric) = 0.70221820194874859310959605062185
absolute error = 0.70221820194874859310959605062185
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.196
y[1] (analytic) = 0
y[1] (numeric) = 0.70278099070978423177604284607872
absolute error = 0.70278099070978423177604284607872
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.197
y[1] (analytic) = 0
y[1] (numeric) = 0.70334384647669917988248093806189
absolute error = 0.70334384647669917988248093806189
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.198
y[1] (analytic) = 0
y[1] (numeric) = 0.70390676966159511335537474668112
absolute error = 0.70390676966159511335537474668112
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.199
y[1] (analytic) = 0
y[1] (numeric) = 0.70446976067623242386034314513162
absolute error = 0.70446976067623242386034314513162
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=488.3MB, alloc=4.5MB, time=51.09
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.2
y[1] (analytic) = 0
y[1] (numeric) = 0.7050328199320307164931214821398
absolute error = 0.7050328199320307164931214821398
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.201
y[1] (analytic) = 0
y[1] (numeric) = 0.70559594784006930489690738053323
absolute error = 0.70559594784006930489690738053323
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.202
y[1] (analytic) = 0
y[1] (numeric) = 0.70615914481108770380981012602714
absolute error = 0.70615914481108770380981012602714
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.203
y[1] (analytic) = 0
y[1] (numeric) = 0.70672241125548611904611379034636
absolute error = 0.70672241125548611904611379034636
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.204
y[1] (analytic) = 0
y[1] (numeric) = 0.70728574758332593491505461309671
absolute error = 0.70728574758332593491505461309671
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.205
y[1] (analytic) = 0
y[1] (numeric) = 0.70784915420433019908080359727344
absolute error = 0.70784915420433019908080359727344
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.206
y[1] (analytic) = 0
y[1] (numeric) = 0.70841263152788410486733575385482
absolute error = 0.70841263152788410486733575385482
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.207
y[1] (analytic) = 0
y[1] (numeric) = 0.70897617996303547101185796148658
absolute error = 0.70897617996303547101185796148658
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=492.1MB, alloc=4.5MB, time=51.50
x[1] = 1.208
y[1] (analytic) = 0
y[1] (numeric) = 0.70953979991849521887045798772696
absolute error = 0.70953979991849521887045798772696
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.209
y[1] (analytic) = 0
y[1] (numeric) = 0.7101034918026378470796278486033
absolute error = 0.7101034918026378470796278486033
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.21
y[1] (analytic) = 0
y[1] (numeric) = 0.71066725602350190367730536323933
absolute error = 0.71066725602350190367730536323933
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.211
y[1] (analytic) = 0
y[1] (numeric) = 0.71123109298879045568706848995889
absolute error = 0.71123109298879045568706848995889
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.212
y[1] (analytic) = 0
y[1] (numeric) = 0.71179500310587155616910780946709
absolute error = 0.71179500310587155616910780946709
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.213
y[1] (analytic) = 0
y[1] (numeric) = 0.71235898678177870874159334936608
absolute error = 0.71235898678177870874159334936608
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.214
y[1] (analytic) = 0
y[1] (numeric) = 0.71292304442321132957604282229035
absolute error = 0.71292304442321132957604282229035
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.215
y[1] (analytic) = 0
y[1] (numeric) = 0.71348717643653520687028927725844
absolute error = 0.71348717643653520687028927725844
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.216
y[1] (analytic) = 0
y[1] (numeric) = 0.71405138322778295780263714034577
absolute error = 0.71405138322778295780263714034577
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=495.9MB, alloc=4.5MB, time=51.91
x[1] = 1.217
y[1] (analytic) = 0
y[1] (numeric) = 0.71461566520265448297078664639997
absolute error = 0.71461566520265448297078664639997
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.218
y[1] (analytic) = 0
y[1] (numeric) = 0.71518002276651741831909773815754
absolute error = 0.71518002276651741831909773815754
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.219
y[1] (analytic) = 0
y[1] (numeric) = 0.71574445632440758455775563269304
absolute error = 0.71574445632440758455775563269304
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.22
y[1] (analytic) = 0
y[1] (numeric) = 0.71630896628102943407739142755122
absolute error = 0.71630896628102943407739142755122
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.221
y[1] (analytic) = 0
y[1] (numeric) = 0.71687355304075649536270234009356
absolute error = 0.71687355304075649536270234009356
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.222
y[1] (analytic) = 0
y[1] (numeric) = 0.71743821700763181490860744344598
absolute error = 0.71743821700763181490860744344598
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.223
y[1] (analytic) = 0
y[1] (numeric) = 0.71800295858536839664246608087934
absolute error = 0.71800295858536839664246608087934
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.224
y[1] (analytic) = 0
y[1] (numeric) = 0.7185677781773496388558775074023
absolute error = 0.7185677781773496388558775074023
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.225
y[1] (analytic) = 0
y[1] (numeric) = 0.71913267618662976864957172271203
absolute error = 0.71913267618662976864957172271203
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=499.7MB, alloc=4.5MB, time=52.35
x[1] = 1.226
y[1] (analytic) = 0
y[1] (numeric) = 0.71969765301593427389489292334735
absolute error = 0.71969765301593427389489292334735
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.227
y[1] (analytic) = 0
y[1] (numeric) = 0.7202627090676603327153685138356
absolute error = 0.7202627090676603327153685138356
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.228
y[1] (analytic) = 0
y[1] (numeric) = 0.72082784474387724049184817673496
absolute error = 0.72082784474387724049184817673496
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.229
y[1] (analytic) = 0
y[1] (numeric) = 0.72139306044632683439468910966335
absolute error = 0.72139306044632683439468910966335
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.23
y[1] (analytic) = 0
y[1] (numeric) = 0.72195835657642391544645519358941
absolute error = 0.72195835657642391544645519358941
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.231
y[1] (analytic) = 0
y[1] (numeric) = 0.72252373353525666811858956075664
absolute error = 0.72252373353525666811858956075664
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.232
y[1] (analytic) = 0
y[1] (numeric) = 0.72308919172358707746551178253482
absolute error = 0.72308919172358707746551178253482
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.233
y[1] (analytic) = 0
y[1] (numeric) = 0.72365473154185134379958269716025
absolute error = 0.72365473154185134379958269716025
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=503.5MB, alloc=4.5MB, time=52.74
x[1] = 1.234
y[1] (analytic) = 0
y[1] (numeric) = 0.72422035339016029491037174465473
absolute error = 0.72422035339016029491037174465473
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.235
y[1] (analytic) = 0
y[1] (numeric) = 0.72478605766829979583165357112002
absolute error = 0.72478605766829979583165357112002
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.236
y[1] (analytic) = 0
y[1] (numeric) = 0.72535184477573115615955260700691
absolute error = 0.72535184477573115615955260700691
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.237
y[1] (analytic) = 0
y[1] (numeric) = 0.72591771511159153492524631377383
absolute error = 0.72591771511159153492524631377383
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.238
y[1] (analytic) = 0
y[1] (numeric) = 0.72648366907469434302562983049676
absolute error = 0.72648366907469434302562983049676
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.239
y[1] (analytic) = 0
y[1] (numeric) = 0.72704970706352964321533683638863
absolute error = 0.72704970706352964321533683638863
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.24
y[1] (analytic) = 0
y[1] (numeric) = 0.72761582947626454766350357675015
absolute error = 0.72761582947626454766350357675015
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.241
y[1] (analytic) = 0
y[1] (numeric) = 0.7281820367107436130786551785242
absolute error = 0.7281820367107436130786551785242
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.242
y[1] (analytic) = 0
y[1] (numeric) = 0.72874832916448923340508560728118
absolute error = 0.72874832916448923340508560728118
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=507.3MB, alloc=4.5MB, time=53.12
x[1] = 1.243
y[1] (analytic) = 0
y[1] (numeric) = 0.72931470723470203009409489004181
absolute error = 0.72931470723470203009409489004181
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.244
y[1] (analytic) = 0
y[1] (numeric) = 0.72988117131826123995343954776672
absolute error = 0.72988117131826123995343954776672
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.245
y[1] (analytic) = 0
y[1] (numeric) = 0.73044772181172510057834454752751
absolute error = 0.73044772181172510057834454752751
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.246
y[1] (analytic) = 0
y[1] (numeric) = 0.73101435911133123336741749724212
absolute error = 0.73101435911133123336741749724212
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.247
y[1] (analytic) = 0
y[1] (numeric) = 0.7315810836129970241267982653278
absolute error = 0.7315810836129970241267982653278
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.248
y[1] (analytic) = 0
y[1] (numeric) = 0.73214789571232000126586971361843
absolute error = 0.73214789571232000126586971361843
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.249
y[1] (analytic) = 0
y[1] (numeric) = 0.73271479580457821158784778432903
absolute error = 0.73271479580457821158784778432903
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.25
y[1] (analytic) = 0
y[1] (numeric) = 0.73328178428473059367856178065042
absolute error = 0.73328178428473059367856178065042
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.251
y[1] (analytic) = 0
y[1] (numeric) = 0.73384886154741734889672832564132
absolute error = 0.73384886154741734889672832564132
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=511.1MB, alloc=4.5MB, time=53.51
x[1] = 1.252
y[1] (analytic) = 0
y[1] (numeric) = 0.73441602798696030996901517537519
absolute error = 0.73441602798696030996901517537519
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.253
y[1] (analytic) = 0
y[1] (numeric) = 0.73498328399736330719318379971566
absolute error = 0.73498328399736330719318379971566
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.254
y[1] (analytic) = 0
y[1] (numeric) = 0.73555062997231253225259242755916
absolute error = 0.73555062997231253225259242755916
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.255
y[1] (analytic) = 0
y[1] (numeric) = 0.73611806630517689964533408281815
absolute error = 0.73611806630517689964533408281815
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.256
y[1] (analytic) = 0
y[1] (numeric) = 0.73668559338900840573127701274443
absolute error = 0.73668559338900840573127701274443
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.257
y[1] (analytic) = 0
y[1] (numeric) = 0.73725321161654248540026783133219
absolute error = 0.73725321161654248540026783133219
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.258
y[1] (analytic) = 0
y[1] (numeric) = 0.73782092138019836636475066741626
absolute error = 0.73782092138019836636475066741626
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.259
y[1] (analytic) = 0
y[1] (numeric) = 0.73838872307207942108004861961581
absolute error = 0.73838872307207942108004861961581
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=515.0MB, alloc=4.5MB, time=53.89
x[1] = 1.26
y[1] (analytic) = 0
y[1] (numeric) = 0.73895661708397351629554687838894
absolute error = 0.73895661708397351629554687838894
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.261
y[1] (analytic) = 0
y[1] (numeric) = 0.73952460380735336024000997908347
absolute error = 0.73952460380735336024000997908347
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.262
y[1] (analytic) = 0
y[1] (numeric) = 0.74009268363337684744425879891563
absolute error = 0.74009268363337684744425879891563
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.263
y[1] (analytic) = 0
y[1] (numeric) = 0.74066085695288740120442610520516
absolute error = 0.74066085695288740120442610520516
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.264
y[1] (analytic) = 0
y[1] (numeric) = 0.74122912415641431368900270186608
absolute error = 0.74122912415641431368900270186608
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.265
y[1] (analytic) = 0
y[1] (numeric) = 0.74179748563417308369287950601993
absolute error = 0.74179748563417308369287950601993
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.266
y[1] (analytic) = 0
y[1] (numeric) = 0.7423659417760657520415842165875
absolute error = 0.7423659417760657520415842165875
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.267
y[1] (analytic) = 0
y[1] (numeric) = 0.74293449297168123464890461174913
absolute error = 0.74293449297168123464890461174913
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.268
y[1] (analytic) = 0
y[1] (numeric) = 0.74350313961029565323108393216694
absolute error = 0.74350313961029565323108393216694
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=518.8MB, alloc=4.5MB, time=54.30
x[1] = 1.269
y[1] (analytic) = 0
y[1] (numeric) = 0.74407188208087266368076727175971
absolute error = 0.74407188208087266368076727175971
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.27
y[1] (analytic) = 0
y[1] (numeric) = 0.74464072077206378210387140753615
absolute error = 0.74464072077206378210387140753615
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.271
y[1] (analytic) = 0
y[1] (numeric) = 0.74520965607220870852254405445071
absolute error = 0.74520965607220870852254405445071
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.272
y[1] (analytic) = 0
y[1] (numeric) = 0.74577868836933564824737213037216
absolute error = 0.74577868836933564824737213037216
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.273
y[1] (analytic) = 0
y[1] (numeric) = 0.74634781805116163092199225997399
absolute error = 0.74634781805116163092199225997399
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.274
y[1] (analytic) = 0
y[1] (numeric) = 0.74691704550509282724325043459298
absolute error = 0.74691704550509282724325043459298
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.275
y[1] (analytic) = 0
y[1] (numeric) = 0.74748637111822486336005147778285
absolute error = 0.74748637111822486336005147778285
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.276
y[1] (analytic) = 0
y[1] (numeric) = 0.7480557952773431329540327433398
absolute error = 0.7480557952773431329540327433398
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.277
y[1] (analytic) = 0
y[1] (numeric) = 0.74862531836892310700519029392143
absolute error = 0.74862531836892310700519029392143
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=522.6MB, alloc=4.5MB, time=54.70
x[1] = 1.278
y[1] (analytic) = 0
y[1] (numeric) = 0.74919494077913064124557967394623
absolute error = 0.74919494077913064124557967394623
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.279
y[1] (analytic) = 0
y[1] (numeric) = 0.74976466289382228130420730017308
absolute error = 0.74976466289382228130420730017308
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.28
y[1] (analytic) = 0
y[1] (numeric) = 0.75033448509854556554622244714615
absolute error = 0.75033448509854556554622244714615
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.281
y[1] (analytic) = 0
y[1] (numeric) = 0.75090440777853932560951380247543
absolute error = 0.75090440777853932560951380247543
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.282
y[1] (analytic) = 0
y[1] (numeric) = 0.75147443131873398464180860863481
absolute error = 0.75147443131873398464180860863481
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.283
y[1] (analytic) = 0
y[1] (numeric) = 0.75204455610375185324136649352356
absolute error = 0.75204455610375185324136649352356
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.284
y[1] (analytic) = 0
y[1] (numeric) = 0.75261478251790742310435422138115
absolute error = 0.75261478251790742310435422138115
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.285
y[1] (analytic) = 0
y[1] (numeric) = 0.75318511094520765838198176869597
absolute error = 0.75318511094520765838198176869597
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=526.4MB, alloc=4.5MB, time=55.09
x[1] = 1.286
y[1] (analytic) = 0
y[1] (numeric) = 0.75375554176935228475047434643325
absolute error = 0.75375554176935228475047434643325
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.287
y[1] (analytic) = 0
y[1] (numeric) = 0.75432607537373407619694925015337
absolute error = 0.75432607537373407619694925015337
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.288
y[1] (analytic) = 0
y[1] (numeric) = 0.75489671214143913952426072332662
absolute error = 0.75489671214143913952426072332662
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.289
y[1] (analytic) = 0
y[1] (numeric) = 0.75546745245524719657787036630149
absolute error = 0.75546745245524719657787036630149
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.29
y[1] (analytic) = 0
y[1] (numeric) = 0.75603829669763186419779501387906
absolute error = 0.75603829669763186419779501387906
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.291
y[1] (analytic) = 0
y[1] (numeric) = 0.75660924525076093189867843821348
absolute error = 0.75660924525076093189867843821348
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.292
y[1] (analytic) = 0
y[1] (numeric) = 0.75718029849649663728102771072625
absolute error = 0.75718029849649663728102771072625
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.293
y[1] (analytic) = 0
y[1] (numeric) = 0.75775145681639593917664957681798
absolute error = 0.75775145681639593917664957681798
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.294
y[1] (analytic) = 0
y[1] (numeric) = 0.75832272059171078853131676031419
absolute error = 0.75832272059171078853131676031419
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=530.2MB, alloc=4.5MB, time=55.51
x[1] = 1.295
y[1] (analytic) = 0
y[1] (numeric) = 0.75889409020338839702768872071971
absolute error = 0.75889409020338839702768872071971
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.296
y[1] (analytic) = 0
y[1] (numeric) = 0.75946556603207150345150603540799
absolute error = 0.75946556603207150345150603540799
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.297
y[1] (analytic) = 0
y[1] (numeric) = 0.76003714845809863780407227076611
absolute error = 0.76003714845809863780407227076611
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.298
y[1] (analytic) = 0
y[1] (numeric) = 0.76060883786150438316403194098212
absolute error = 0.76060883786150438316403194098212
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.299
y[1] (analytic) = 0
y[1] (numeric) = 0.76118063462201963530144793052769
absolute error = 0.76118063462201963530144793052769
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.3
y[1] (analytic) = 0
y[1] (numeric) = 0.76175253911907186004717657638499
absolute error = 0.76175253911907186004717657638499
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.301
y[1] (analytic) = 0
y[1] (numeric) = 0.76232455173178534842053346862158
absolute error = 0.76232455173178534842053346862158
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.302
y[1] (analytic) = 0
y[1] (numeric) = 0.76289667283898146951823793296005
absolute error = 0.76289667283898146951823793296005
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.303
y[1] (analytic) = 0
y[1] (numeric) = 0.76346890281917892116761910645028
absolute error = 0.76346890281917892116761910645028
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=534.0MB, alloc=4.5MB, time=55.92
x[1] = 1.304
y[1] (analytic) = 0
y[1] (numeric) = 0.76404124205059397834706150716023
absolute error = 0.76404124205059397834706150716023
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.305
y[1] (analytic) = 0
y[1] (numeric) = 0.76461369091114073937666303088683
absolute error = 0.76461369091114073937666303088683
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.306
y[1] (analytic) = 0
y[1] (numeric) = 0.765186249778431369882073382181
absolute error = 0.765186249778431369882073382181
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.307
y[1] (analytic) = 0
y[1] (numeric) = 0.7657589190297763445344760634105
absolute error = 0.7657589190297763445344760634105
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.308
y[1] (analytic) = 0
y[1] (numeric) = 0.76633169904218468656967220408093
absolute error = 0.76633169904218468656967220408093
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.309
y[1] (analytic) = 0
y[1] (numeric) = 0.76690459019236420508921971312945
absolute error = 0.76690459019236420508921971312945
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.31
y[1] (analytic) = 0
y[1] (numeric) = 0.7674775928567217301465764793277
absolute error = 0.7674775928567217301465764793277
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.311
y[1] (analytic) = 0
y[1] (numeric) = 0.76805070741136334562119162921018
absolute error = 0.76805070741136334562119162921018
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.312
y[1] (analytic) = 0
y[1] (numeric) = 0.76862393423209461988348417801336
absolute error = 0.76862393423209461988348417801336
relative error = -1 %
Correct digits = -1
memory used=537.8MB, alloc=4.5MB, time=56.33
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.313
y[1] (analytic) = 0
y[1] (numeric) = 0.76919727369442083425364377689868
absolute error = 0.76919727369442083425364377689868
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.314
y[1] (analytic) = 0
y[1] (numeric) = 0.76977072617354720925718366917099
absolute error = 0.76977072617354720925718366917099
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.315
y[1] (analytic) = 0
y[1] (numeric) = 0.77034429204437912868017141922324
absolute error = 0.77034429204437912868017141922324
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.316
y[1] (analytic) = 0
y[1] (numeric) = 0.77091797168152236142705847046932
absolute error = 0.77091797168152236142705847046932
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.317
y[1] (analytic) = 0
y[1] (numeric) = 0.77149176545928328118402512250152
absolute error = 0.77149176545928328118402512250152
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.318
y[1] (analytic) = 0
y[1] (numeric) = 0.77206567375166908389075309305746
absolute error = 0.77206567375166908389075309305746
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.319
y[1] (analytic) = 0
y[1] (numeric) = 0.77263969693238800302353344703534
absolute error = 0.77263969693238800302353344703534
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.32
y[1] (analytic) = 0
y[1] (numeric) = 0.77321383537484952269261333268754
absolute error = 0.77321383537484952269261333268754
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=541.7MB, alloc=4.5MB, time=56.75
x[1] = 1.321
y[1] (analytic) = 0
y[1] (numeric) = 0.77378808945216458855668066418147
absolute error = 0.77378808945216458855668066418147
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.322
y[1] (analytic) = 0
y[1] (numeric) = 0.77436245953714581655738162987608
absolute error = 0.77436245953714581655738162987608
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.323
y[1] (analytic) = 0
y[1] (numeric) = 0.77493694600230769947676168685283
absolute error = 0.77493694600230769947676168685283
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.324
y[1] (analytic) = 0
y[1] (numeric) = 0.77551154921986681132051652439392
absolute error = 0.77551154921986681132051652439392
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.325
y[1] (analytic) = 0
y[1] (numeric) = 0.77608626956174200952993534214965
absolute error = 0.77608626956174200952993534214965
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.326
y[1] (analytic) = 0
y[1] (numeric) = 0.77666110739955463502541469261261
absolute error = 0.77666110739955463502541469261261
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.327
y[1] (analytic) = 0
y[1] (numeric) = 0.7772360631046287100844170821515
absolute error = 0.7772360631046287100844170821515
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.328
y[1] (analytic) = 0
y[1] (numeric) = 0.77781113704799113405674451018337
absolute error = 0.77781113704799113405674451018337
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.329
y[1] (analytic) = 0
y[1] (numeric) = 0.77838632960037187691999315201226
absolute error = 0.77838632960037187691999315201226
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=545.5MB, alloc=4.5MB, time=57.16
x[1] = 1.33
y[1] (analytic) = 0
y[1] (numeric) = 0.77896164113220417067805145736689
absolute error = 0.77896164113220417067805145736689
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.331
y[1] (analytic) = 0
y[1] (numeric) = 0.77953707201362469860550004366267
absolute error = 0.77953707201362469860550004366267
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.332
y[1] (analytic) = 0
y[1] (numeric) = 0.78011262261447378234076791042566
absolute error = 0.78011262261447378234076791042566
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.333
y[1] (analytic) = 0
y[1] (numeric) = 0.7806882933042955668308956890816
absolute error = 0.7806882933042955668308956890816
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.334
y[1] (analytic) = 0
y[1] (numeric) = 0.7812640844523382031307528703633
absolute error = 0.7812640844523382031307528703633
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.335
y[1] (analytic) = 0
y[1] (numeric) = 0.78183999642755402905955221985811
absolute error = 0.78183999642755402905955221985811
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.336
y[1] (analytic) = 0
y[1] (numeric) = 0.78241602959859974771750090063569
absolute error = 0.78241602959859974771750090063569
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.337
y[1] (analytic) = 0
y[1] (numeric) = 0.7829921843338366038654241703982
absolute error = 0.7829921843338366038654241703982
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=549.3MB, alloc=4.5MB, time=57.56
x[1] = 1.338
y[1] (analytic) = 0
y[1] (numeric) = 0.78356846100133055817019390911309
absolute error = 0.78356846100133055817019390911309
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.339
y[1] (analytic) = 0
y[1] (numeric) = 0.7841448599688524593187906615553
absolute error = 0.7841448599688524593187906615553
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.34
y[1] (analytic) = 0
y[1] (numeric) = 0.78472138160387821400382434753469
absolute error = 0.78472138160387821400382434753469
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.341
y[1] (analytic) = 0
y[1] (numeric) = 0.78529802627358895478333530074796
absolute error = 0.78529802627358895478333530074796
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.342
y[1] (analytic) = 0
y[1] (numeric) = 0.78587479434487120581769384510599
absolute error = 0.78587479434487120581769384510599
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.343
y[1] (analytic) = 0
y[1] (numeric) = 0.78645168618431704648641320498033
absolute error = 0.78645168618431704648641320498033
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.344
y[1] (analytic) = 0
y[1] (numeric) = 0.78702870215822427288768717301956
absolute error = 0.78702870215822427288768717301956
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.345
y[1] (analytic) = 0
y[1] (numeric) = 0.78760584263259655722346062594076
absolute error = 0.78760584263259655722346062594076
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.346
y[1] (analytic) = 0
y[1] (numeric) = 0.78818310797314360507283768493701
absolute error = 0.78818310797314360507283768493701
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=553.1MB, alloc=4.5MB, time=57.97
x[1] = 1.347
y[1] (analytic) = 0
y[1] (numeric) = 0.78876049854528131055662906299122
absolute error = 0.78876049854528131055662906299122
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.348
y[1] (analytic) = 0
y[1] (numeric) = 0.78933801471413190939583692638425
absolute error = 0.78933801471413190939583692638425
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.349
y[1] (analytic) = 0
y[1] (numeric) = 0.78991565684452412986687242196349
absolute error = 0.78991565684452412986687242196349
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.35
y[1] (analytic) = 0
y[1] (numeric) = 0.79049342530099334165629788523123
absolute error = 0.79049342530099334165629788523123
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.351
y[1] (analytic) = 0
y[1] (numeric) = 0.79107132044778170261788264695335
absolute error = 0.79107132044778170261788264695335
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.352
y[1] (analytic) = 0
y[1] (numeric) = 0.79164934264883830343475829771196
absolute error = 0.79164934264883830343475829771196
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.353
y[1] (analytic) = 0
y[1] (numeric) = 0.79222749226781931018945625056401
absolute error = 0.79222749226781931018945625056401
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.354
y[1] (analytic) = 0
y[1] (numeric) = 0.79280576966808810484460746165556
absolute error = 0.79280576966808810484460746165556
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.355
y[1] (analytic) = 0
y[1] (numeric) = 0.79338417521271542363708122721187
absolute error = 0.79338417521271542363708122721187
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=556.9MB, alloc=4.5MB, time=58.38
x[1] = 1.356
y[1] (analytic) = 0
y[1] (numeric) = 0.79396270926447949338833707271065
absolute error = 0.79396270926447949338833707271065
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.357
y[1] (analytic) = 0
y[1] (numeric) = 0.79454137218586616573376088618341
absolute error = 0.79454137218586616573376088618341
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.358
y[1] (analytic) = 0
y[1] (numeric) = 0.79512016433906904927375362241176
absolute error = 0.79512016433906904927375362241176
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.359
y[1] (analytic) = 0
y[1] (numeric) = 0.79569908608598963964933811822582
absolute error = 0.79569908608598963964933811822582
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.36
y[1] (analytic) = 0
y[1] (numeric) = 0.79627813778823744754504681110407
absolute error = 0.79627813778823744754504681110407
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.361
y[1] (analytic) = 0
y[1] (numeric) = 0.79685731980713012462185044375247
absolute error = 0.79685731980713012462185044375247
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.362
y[1] (analytic) = 0
y[1] (numeric) = 0.79743663250369358738288516623927
absolute error = 0.79743663250369358738288516623927
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.363
y[1] (analytic) = 0
y[1] (numeric) = 0.7980160762386621389747328145144
absolute error = 0.7980160762386621389747328145144
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=560.7MB, alloc=4.5MB, time=58.78
x[1] = 1.364
y[1] (analytic) = 0
y[1] (numeric) = 0.7985956513724785889270065496833
absolute error = 0.7985956513724785889270065496833
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.365
y[1] (analytic) = 0
y[1] (numeric) = 0.79917535826529437083299148616805
absolute error = 0.79917535826529437083299148616805
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.366
y[1] (analytic) = 0
y[1] (numeric) = 0.79975519727696965797408741880803
absolute error = 0.79975519727696965797408741880803
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.367
y[1] (analytic) = 0
y[1] (numeric) = 0.80033516876707347689079827896222
absolute error = 0.80033516876707347689079827896222
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.368
y[1] (analytic) = 0
y[1] (numeric) = 0.80091527309488381890301050770975
absolute error = 0.80091527309488381890301050770975
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.369
y[1] (analytic) = 0
y[1] (numeric) = 0.80149551061938774958230013023864
absolute error = 0.80149551061938774958230013023864
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.37
y[1] (analytic) = 0
y[1] (numeric) = 0.80207588169928151617900594939883
absolute error = 0.80207588169928151617900594939883
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.371
y[1] (analytic) = 0
y[1] (numeric) = 0.80265638669297065300680394810914
absolute error = 0.80265638669297065300680394810914
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.372
y[1] (analytic) = 0
y[1] (numeric) = 0.80323702595857008478751569978273
absolute error = 0.80323702595857008478751569978273
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=564.5MB, alloc=4.5MB, time=59.18
x[1] = 1.373
y[1] (analytic) = 0
y[1] (numeric) = 0.80381779985390422795888133310605
absolute error = 0.80381779985390422795888133310605
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.374
y[1] (analytic) = 0
y[1] (numeric) = 0.80439870873650708994802538230687
absolute error = 0.80439870873650708994802538230687
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.375
y[1] (analytic) = 0
y[1] (numeric) = 0.8049797529636223664133416764115
absolute error = 0.8049797529636223664133416764115
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.376
y[1] (analytic) = 0
y[1] (numeric) = 0.80556093289220353645752128085467
absolute error = 0.80556093289220353645752128085467
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.377
y[1] (analytic) = 0
y[1] (numeric) = 0.80614224887891395581444540210118
absolute error = 0.80614224887891395581444540210118
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.378
y[1] (analytic) = 0
y[1] (numeric) = 0.80672370128012694801266310060157
absolute error = 0.80672370128012694801266310060157
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.379
y[1] (analytic) = 0
y[1] (numeric) = 0.80730529045192589351817162936841
absolute error = 0.80730529045192589351817162936841
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.38
y[1] (analytic) = 0
y[1] (numeric) = 0.80788701675010431685921522465965
absolute error = 0.80788701675010431685921522465965
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.381
y[1] (analytic) = 0
y[1] (numeric) = 0.80846888053016597173581622162578
absolute error = 0.80846888053016597173581622162578
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=568.4MB, alloc=4.5MB, time=59.59
x[1] = 1.382
y[1] (analytic) = 0
y[1] (numeric) = 0.80905088214732492411675045125168
absolute error = 0.80905088214732492411675045125168
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.383
y[1] (analytic) = 0
y[1] (numeric) = 0.80963302195650563332667699543718
absolute error = 0.80963302195650563332667699543718
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.384
y[1] (analytic) = 0
y[1] (numeric) = 0.81021530031234303112613053454626
absolute error = 0.81021530031234303112613053454626
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.385
y[1] (analytic) = 0
y[1] (numeric) = 0.81079771756918259878708271614812
absolute error = 0.81079771756918259878708271614812
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.386
y[1] (analytic) = 0
y[1] (numeric) = 0.81138027408108044216677720490837
absolute error = 0.81138027408108044216677720490837
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.387
y[1] (analytic) = 0
y[1] (numeric) = 0.8119629702018033647825413415991
absolute error = 0.8119629702018033647825413415991
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.388
y[1] (analytic) = 0
y[1] (numeric) = 0.81254580628482893889027564391806
absolute error = 0.81254580628482893889027564391806
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.389
y[1] (analytic) = 0
y[1] (numeric) = 0.81312878268334557456932072317246
absolute error = 0.81312878268334557456932072317246
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=572.2MB, alloc=4.5MB, time=60.00
x[1] = 1.39
y[1] (analytic) = 0
y[1] (numeric) = 0.81371189975025258681639956882757
absolute error = 0.81371189975025258681639956882757
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.391
y[1] (analytic) = 0
y[1] (numeric) = 0.81429515783816026065133156737771
absolute error = 0.81429515783816026065133156737771
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.392
y[1] (analytic) = 0
y[1] (numeric) = 0.81487855729938991423721307290248
absolute error = 0.81487855729938991423721307290248
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.393
y[1] (analytic) = 0
y[1] (numeric) = 0.81546209848597396001775783395737
absolute error = 0.81546209848597396001775783395737
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.394
y[1] (analytic) = 0
y[1] (numeric) = 0.81604578174965596387448910505089
absolute error = 0.81604578174965596387448910505089
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.395
y[1] (analytic) = 0
y[1] (numeric) = 0.81662960744189070230647383081277
absolute error = 0.81662960744189070230647383081277
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.396
y[1] (analytic) = 0
y[1] (numeric) = 0.81721357591384421763528788699508
absolute error = 0.81721357591384421763528788699508
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.397
y[1] (analytic) = 0
y[1] (numeric) = 0.81779768751639387123789999460385
absolute error = 0.81779768751639387123789999460385
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.398
y[1] (analytic) = 0
y[1] (numeric) = 0.81838194260012839481016059166711
absolute error = 0.81838194260012839481016059166711
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=576.0MB, alloc=4.5MB, time=60.42
x[1] = 1.399
y[1] (analytic) = 0
y[1] (numeric) = 0.81896634151534793966358065134082
absolute error = 0.81896634151534793966358065134082
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.4
y[1] (analytic) = 0
y[1] (numeric) = 0.81955088461206412405808417517058
absolute error = 0.81955088461206412405808417517058
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.401
y[1] (analytic) = 0
y[1] (numeric) = 0.82013557224000007857341686629868
absolute error = 0.82013557224000007857341686629868
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.402
y[1] (analytic) = 0
y[1] (numeric) = 0.82072040474859048952189229916704
absolute error = 0.82072040474859048952189229916704
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.403
y[1] (analytic) = 0
y[1] (numeric) = 0.82130538248698164040515574975095
absolute error = 0.82130538248698164040515574975095
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.404
y[1] (analytic) = 0
y[1] (numeric) = 0.82189050580403145141764473350022
absolute error = 0.82189050580403145141764473350022
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.405
y[1] (analytic) = 0
y[1] (numeric) = 0.82247577504830951699942421689752
absolute error = 0.82247577504830951699942421689752
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.406
y[1] (analytic) = 0
y[1] (numeric) = 0.82306119056809714144107342280226
absolute error = 0.82306119056809714144107342280226
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.407
y[1] (analytic) = 0
y[1] (numeric) = 0.82364675271138737254330013946639
absolute error = 0.82364675271138737254330013946639
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=579.8MB, alloc=4.5MB, time=60.83
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.408
y[1] (analytic) = 0
y[1] (numeric) = 0.82423246182588503333395746821951
absolute error = 0.82423246182588503333395746821951
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.409
y[1] (analytic) = 0
y[1] (numeric) = 0.82481831825900675184513700525943
absolute error = 0.82481831825900675184513700525943
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.41
y[1] (analytic) = 0
y[1] (numeric) = 0.82540432235788098895301154868342
absolute error = 0.82540432235788098895301154868342
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.411
y[1] (analytic) = 0
y[1] (numeric) = 0.82599047446934806428309955279001
absolute error = 0.82599047446934806428309955279001
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.412
y[1] (analytic) = 0
y[1] (numeric) = 0.82657677493996018018362271770391
absolute error = 0.82657677493996018018362271770391
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.413
y[1] (analytic) = 0
y[1] (numeric) = 0.82716322411598144376962730346218
absolute error = 0.82716322411598144376962730346218
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.414
y[1] (analytic) = 0
y[1] (numeric) = 0.82774982234338788704053899378113
absolute error = 0.82774982234338788704053899378113
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.415
y[1] (analytic) = 0
y[1] (numeric) = 0.82833656996786748507382040573462
absolute error = 0.82833656996786748507382040573462
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=583.6MB, alloc=4.5MB, time=61.24
x[1] = 1.416
y[1] (analytic) = 0
y[1] (numeric) = 0.8289234673348201722973996474491
absolute error = 0.8289234673348201722973996474491
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.417
y[1] (analytic) = 0
y[1] (numeric) = 0.82951051478935785684353766659227
absolute error = 0.82951051478935785684353766659227
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.418
y[1] (analytic) = 0
y[1] (numeric) = 0.83009771267630443298680150783427
absolute error = 0.83009771267630443298680150783427
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.419
y[1] (analytic) = 0
y[1] (numeric) = 0.83068506134019579166881000752647
absolute error = 0.83068506134019579166881000752647
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.42
y[1] (analytic) = 0
y[1] (numeric) = 0.83127256112527982911241789850623
absolute error = 0.83127256112527982911241789850623
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.421
y[1] (analytic) = 0
y[1] (numeric) = 0.83186021237551645352800377713055
absolute error = 0.83186021237551645352800377713055
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.422
y[1] (analytic) = 0
y[1] (numeric) = 0.83244801543457758991452689829986
absolute error = 0.83244801543457758991452689829986
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.423
y[1] (analytic) = 0
y[1] (numeric) = 0.83303597064584718295801731228911
absolute error = 0.83303597064584718295801731228911
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.424
y[1] (analytic) = 0
y[1] (numeric) = 0.83362407835242119803016343959017
absolute error = 0.83362407835242119803016343959017
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=587.4MB, alloc=4.5MB, time=61.65
x[1] = 1.425
y[1] (analytic) = 0
y[1] (numeric) = 0.8342123388971076202896607966198
absolute error = 0.8342123388971076202896607966198
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.426
y[1] (analytic) = 0
y[1] (numeric) = 0.83480075262242645188898523599529
absolute error = 0.83480075262242645188898523599529
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.427
y[1] (analytic) = 0
y[1] (numeric) = 0.83538931987060970728925375005733
absolute error = 0.83538931987060970728925375005733
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.428
y[1] (analytic) = 0
y[1] (numeric) = 0.8359780409836014066858356053605
absolute error = 0.8359780409836014066858356053605
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.429
y[1] (analytic) = 0
y[1] (numeric) = 0.83656691630305756754737632888868
absolute error = 0.83656691630305756754737632888868
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.43
y[1] (analytic) = 0
y[1] (numeric) = 0.83715594617034619427089685371839
absolute error = 0.83715594617034619427089685371839
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.431
y[1] (analytic) = 0
y[1] (numeric) = 0.83774513092654726595562995268085
absolute error = 0.83774513092654726595562995268085
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.432
y[1] (analytic) = 0
y[1] (numeric) = 0.8383344709124527222982559431957
absolute error = 0.8383344709124527222982559431957
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.433
y[1] (analytic) = 0
y[1] (numeric) = 0.83892396646856644761219953479894
absolute error = 0.83892396646856644761219953479894
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=591.3MB, alloc=4.5MB, time=62.05
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.434
y[1] (analytic) = 0
y[1] (numeric) = 0.83951361793510425297364961289714
absolute error = 0.83951361793510425297364961289714
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.435
y[1] (analytic) = 0
y[1] (numeric) = 0.84010342565199385649696370788209
absolute error = 0.84010342565199385649696370788209
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.436
y[1] (analytic) = 0
y[1] (numeric) = 0.84069338995887486174211888786716
absolute error = 0.84069338995887486174211888786716
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.437
y[1] (analytic) = 0
y[1] (numeric) = 0.84128351119509873425687083589131
absolute error = 0.84128351119509873425687083589131
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.438
y[1] (analytic) = 0
y[1] (numeric) = 0.84187378969972877625628292841132
absolute error = 0.84187378969972877625628292841132
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.439
y[1] (analytic) = 0
y[1] (numeric) = 0.84246422581154009944228722119948
absolute error = 0.84246422581154009944228722119948
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.44
y[1] (analytic) = 0
y[1] (numeric) = 0.84305481986901959596593937131529
absolute error = 0.84305481986901959596593937131529
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.441
y[1] (analytic) = 0
y[1] (numeric) = 0.84364557221036590753502967955749
absolute error = 0.84364557221036590753502967955749
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=595.1MB, alloc=4.5MB, time=62.46
x[1] = 1.442
y[1] (analytic) = 0
y[1] (numeric) = 0.84423648317348939266971262665935
absolute error = 0.84423648317348939266971262665935
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.443
y[1] (analytic) = 0
y[1] (numeric) = 0.84482755309601209210881749839739
absolute error = 0.84482755309601209210881749839739
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.444
y[1] (analytic) = 0
y[1] (numeric) = 0.84541878231526769236950294967365
absolute error = 0.84541878231526769236950294967365
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.445
y[1] (analytic) = 0
y[1] (numeric) = 0.84601017116830148746291864543604
absolute error = 0.84601017116830148746291864543604
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.446
y[1] (analytic) = 0
y[1] (numeric) = 0.84660171999187033876853743695227
absolute error = 0.84660171999187033876853743695227
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.447
y[1] (analytic) = 0
y[1] (numeric) = 0.84719342912244263306982188538133
absolute error = 0.84719342912244263306982188538133
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.448
y[1] (analytic) = 0
y[1] (numeric) = 0.84778529889619823875388933072538
absolute error = 0.84778529889619823875388933072538
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.449
y[1] (analytic) = 0
y[1] (numeric) = 0.84837732964902846017784012302409
absolute error = 0.84837732964902846017784012302409
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.45
y[1] (analytic) = 0
y[1] (numeric) = 0.84896952171653599020441408400612
absolute error = 0.84896952171653599020441408400612
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=598.9MB, alloc=4.5MB, time=62.87
x[1] = 1.451
y[1] (analytic) = 0
y[1] (numeric) = 0.84956187543403486090964075126853
absolute error = 0.84956187543403486090964075126853
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.452
y[1] (analytic) = 0
y[1] (numeric) = 0.85015439113655039246514947334654
absolute error = 0.85015439113655039246514947334654
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.453
y[1] (analytic) = 0
y[1] (numeric) = 0.85074706915881914019780597269429
absolute error = 0.85074706915881914019780597269429
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.454
y[1] (analytic) = 0
y[1] (numeric) = 0.85133990983528883982934257455288
absolute error = 0.85133990983528883982934257455288
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.455
y[1] (analytic) = 0
y[1] (numeric) = 0.85193291350011835089864991286644
absolute error = 0.85193291350011835089864991286644
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.456
y[1] (analytic) = 0
y[1] (numeric) = 0.85252608048717759836939856975093
absolute error = 0.85252608048717759836939856975093
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.457
y[1] (analytic) = 0
y[1] (numeric) = 0.85311941113004751242565978245493
absolute error = 0.85311941113004751242565978245493
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.458
y[1] (analytic) = 0
y[1] (numeric) = 0.85371290576201996645819506120701
absolute error = 0.85371290576201996645819506120701
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=602.7MB, alloc=4.5MB, time=63.27
x[1] = 1.459
y[1] (analytic) = 0
y[1] (numeric) = 0.85430656471609771324408530275212
absolute error = 0.85430656471609771324408530275212
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.46
y[1] (analytic) = 0
y[1] (numeric) = 0.85490038832499431932237075766892
absolute error = 0.85490038832499431932237075766892
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.461
y[1] (analytic) = 0
y[1] (numeric) = 0.85549437692113409756837401466304
absolute error = 0.85549437692113409756837401466304
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.462
y[1] (analytic) = 0
y[1] (numeric) = 0.85608853083665203796937900187709
absolute error = 0.85608853083665203796937900187709
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.463
y[1] (analytic) = 0
y[1] (numeric) = 0.85668285040339373660433987377777
absolute error = 0.85668285040339373660433987377777
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.464
y[1] (analytic) = 0
y[1] (numeric) = 0.85727733595291532283029455230383
absolute error = 0.85727733595291532283029455230383
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.465
y[1] (analytic) = 0
y[1] (numeric) = 0.85787198781648338467815862261544
absolute error = 0.85787198781648338467815862261544
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.466
y[1] (analytic) = 0
y[1] (numeric) = 0.85846680632507489246057624690651
absolute error = 0.85846680632507489246057624690651
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.467
y[1] (analytic) = 0
y[1] (numeric) = 0.85906179180937712059450575425572
absolute error = 0.85906179180937712059450575425572
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=606.5MB, alloc=4.5MB, time=63.69
x[1] = 1.468
y[1] (analytic) = 0
y[1] (numeric) = 0.85965694459978756764121859033003
absolute error = 0.85965694459978756764121859033003
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.469
y[1] (analytic) = 0
y[1] (numeric) = 0.86025226502641387456639136784514
absolute error = 0.86025226502641387456639136784514
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.47
y[1] (analytic) = 0
y[1] (numeric) = 0.86084775341907374122297184696101
absolute error = 0.86084775341907374122297184696101
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.471
y[1] (analytic) = 0
y[1] (numeric) = 0.86144341010729484105950079417607
absolute error = 0.86144341010729484105950079417607
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.472
y[1] (analytic) = 0
y[1] (numeric) = 0.86203923542031473405657281871084
absolute error = 0.86203923542031473405657281871084
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.473
y[1] (analytic) = 0
y[1] (numeric) = 0.86263522968708077789412046676923
absolute error = 0.86263522968708077789412046676923
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.474
y[1] (analytic) = 0
y[1] (numeric) = 0.86323139323625003735220706636353
absolute error = 0.86323139323625003735220706636353
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.475
y[1] (analytic) = 0
y[1] (numeric) = 0.86382772639618919194801505851514
absolute error = 0.86382772639618919194801505851514
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.476
y[1] (analytic) = 0
y[1] (numeric) = 0.86442422949497444181171782452734
absolute error = 0.86442422949497444181171782452734
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=610.3MB, alloc=4.5MB, time=64.09
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.477
y[1] (analytic) = 0
y[1] (numeric) = 0.86502090286039141180392432359681
absolute error = 0.86502090286039141180392432359681
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.478
y[1] (analytic) = 0
y[1] (numeric) = 0.86561774681993505387738719021655
absolute error = 0.86561774681993505387738719021655
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.479
y[1] (analytic) = 0
y[1] (numeric) = 0.86621476170080954768566630655213
absolute error = 0.86621476170080954768566630655213
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.48
y[1] (analytic) = 0
y[1] (numeric) = 0.86681194782992819944144126117526
absolute error = 0.86681194782992819944144126117526
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.481
y[1] (analytic) = 0
y[1] (numeric) = 0.86740930553391333902716753214067
absolute error = 0.86740930553391333902716753214067
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.482
y[1] (analytic) = 0
y[1] (numeric) = 0.86800683513909621536077268932369
absolute error = 0.86800683513909621536077268932369
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.483
y[1] (analytic) = 0
y[1] (numeric) = 0.8686045369715168900190903981236
absolute error = 0.8686045369715168900190903981236
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.484
y[1] (analytic) = 0
y[1] (numeric) = 0.86920241135692412912173152401077
absolute error = 0.86920241135692412912173152401077
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=614.1MB, alloc=4.5MB, time=64.49
x[1] = 1.485
y[1] (analytic) = 0
y[1] (numeric) = 0.86980045862077529347809318488116
absolute error = 0.86980045862077529347809318488116
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.486
y[1] (analytic) = 0
y[1] (numeric) = 0.87039867908823622700020817570761
absolute error = 0.87039867908823622700020817570761
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.487
y[1] (analytic) = 0
y[1] (numeric) = 0.87099707308418114338413879747142
absolute error = 0.87099707308418114338413879747142
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.488
y[1] (analytic) = 0
y[1] (numeric) = 0.87159564093319251106262075974727
absolute error = 0.87159564093319251106262075974727
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.489
y[1] (analytic) = 0
y[1] (numeric) = 0.8721943829595609364316644935271
absolute error = 0.8721943829595609364316644935271
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.49
y[1] (analytic) = 0
y[1] (numeric) = 0.87279329948728504535382290783109
absolute error = 0.87279329948728504535382290783109
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.491
y[1] (analytic) = 0
y[1] (numeric) = 0.87339239084007136294083635029383
absolute error = 0.87339239084007136294083635029383
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.492
y[1] (analytic) = 0
y[1] (numeric) = 0.873991657341334191618367288158
absolute error = 0.873991657341334191618367288158
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.493
y[1] (analytic) = 0
y[1] (numeric) = 0.87459109931419548747553901188305
absolute error = 0.87459109931419548747553901188305
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=618.0MB, alloc=4.5MB, time=64.89
x[1] = 1.494
y[1] (analytic) = 0
y[1] (numeric) = 0.87519071708148473490199447880958
absolute error = 0.87519071708148473490199447880958
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.495
y[1] (analytic) = 0
y[1] (numeric) = 0.87579051096573881951519325893761
absolute error = 0.87579051096573881951519325893761
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.496
y[1] (analytic) = 0
y[1] (numeric) = 0.87639048128920189938066641880544
absolute error = 0.87639048128920189938066641880544
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.497
y[1] (analytic) = 0
y[1] (numeric) = 0.8769906283738252745279510826214
absolute error = 0.8769906283738252745279510826214
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.498
y[1] (analytic) = 0
y[1] (numeric) = 0.87759095254126725476492834213011
absolute error = 0.87759095254126725476492834213011
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.499
y[1] (analytic) = 0
y[1] (numeric) = 0.87819145411289302579329014811328
absolute error = 0.87819145411289302579329014811328
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.5
y[1] (analytic) = 0
y[1] (numeric) = 0.87879213340977451362786280685938
absolute error = 0.87879213340977451362786280685938
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.501
y[1] (analytic) = 0
y[1] (numeric) = 0.87939299075269024732251672431166
absolute error = 0.87939299075269024732251672431166
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=621.8MB, alloc=4.5MB, time=65.29
x[1] = 1.502
y[1] (analytic) = 0
y[1] (numeric) = 0.87999402646212522000539408884631
absolute error = 0.87999402646212522000539408884631
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.503
y[1] (analytic) = 0
y[1] (numeric) = 0.88059524085827074822618826066711
absolute error = 0.88059524085827074822618826066711
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.504
y[1] (analytic) = 0
y[1] (numeric) = 0.88119663426102432961821074155536
absolute error = 0.88119663426102432961821074155536
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.505
y[1] (analytic) = 0
y[1] (numeric) = 0.88179820698998949887798373310936
absolute error = 0.88179820698998949887798373310936
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.506
y[1] (analytic) = 0
y[1] (numeric) = 0.88239995936447568206509845457121
absolute error = 0.88239995936447568206509845457121
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.507
y[1] (analytic) = 0
y[1] (numeric) = 0.88300189170349804922508158279552
absolute error = 0.88300189170349804922508158279552
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.508
y[1] (analytic) = 0
y[1] (numeric) = 0.88360400432577736533801439678911
absolute error = 0.88360400432577736533801439678911
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.509
y[1] (analytic) = 0
y[1] (numeric) = 0.88420629754973983959565145746806
absolute error = 0.88420629754973983959565145746806
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.51
y[1] (analytic) = 0
y[1] (numeric) = 0.88480877169351697300978792976276
absolute error = 0.88480877169351697300978792976276
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=625.6MB, alloc=4.5MB, time=65.68
x[1] = 1.511
y[1] (analytic) = 0
y[1] (numeric) = 0.88541142707494540435462695887745
absolute error = 0.88541142707494540435462695887745
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.512
y[1] (analytic) = 0
y[1] (numeric) = 0.88601426401156675444590084530229
absolute error = 0.88601426401156675444590084530229
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.513
y[1] (analytic) = 0
y[1] (numeric) = 0.88661728282062746875950212400753
absolute error = 0.88661728282062746875950212400753
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.514
y[1] (analytic) = 0
y[1] (numeric) = 0.88722048381907865839238304204434
absolute error = 0.88722048381907865839238304204434
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.515
y[1] (analytic) = 0
y[1] (numeric) = 0.88782386732357593936848434545998
absolute error = 0.88782386732357593936848434545998
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.516
y[1] (analytic) = 0
y[1] (numeric) = 0.88842743365047927029245673092861
absolute error = 0.88842743365047927029245673092861
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.517
y[1] (analytic) = 0
y[1] (numeric) = 0.88903118311585278835394078972813
absolute error = 0.88903118311585278835394078972813
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.518
y[1] (analytic) = 0
y[1] (numeric) = 0.88963511603546464368517377158008
absolute error = 0.88963511603546464368517377158008
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.519
y[1] (analytic) = 0
y[1] (numeric) = 0.89023923272478683207469402333776
absolute error = 0.89023923272478683207469402333776
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
memory used=629.4MB, alloc=4.5MB, time=66.08
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.52
y[1] (analytic) = 0
y[1] (numeric) = 0.8908435334989950260399165124801
absolute error = 0.8908435334989950260399165124801
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.521
y[1] (analytic) = 0
y[1] (numeric) = 0.89144801867296840426135542776849
absolute error = 0.89144801867296840426135542776849
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.522
y[1] (analytic) = 0
y[1] (numeric) = 0.89205268856128947938127245917316
absolute error = 0.89205268856128947938127245917316
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.523
y[1] (analytic) = 0
y[1] (numeric) = 0.89265754347824392416953199619784
absolute error = 0.89265754347824392416953199619784
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.524
y[1] (analytic) = 0
y[1] (numeric) = 0.89326258373782039605944714794839
absolute error = 0.89326258373782039605944714794839
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.525
y[1] (analytic) = 0
y[1] (numeric) = 0.89386780965371036005640317962513
absolute error = 0.89386780965371036005640317962513
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.526
y[1] (analytic) = 0
y[1] (numeric) = 0.89447322153930791002204767849221
absolute error = 0.89447322153930791002204767849221
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.527
y[1] (analytic) = 0
y[1] (numeric) = 0.89507881970770958833683950771195
absolute error = 0.89507881970770958833683950771195
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=633.2MB, alloc=4.5MB, time=66.48
x[1] = 1.528
y[1] (analytic) = 0
y[1] (numeric) = 0.8956846044717142039437513786499
absolute error = 0.8956846044717142039437513786499
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.529
y[1] (analytic) = 0
y[1] (numeric) = 0.89629057614382264877592367127874
absolute error = 0.89629057614382264877592367127874
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.53
y[1] (analytic) = 0
y[1] (numeric) = 0.8968967350362377125710699580578
absolute error = 0.8968967350362377125710699580578
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.531
y[1] (analytic) = 0
y[1] (numeric) = 0.89750308146086389607543753906081
absolute error = 0.89750308146086389607543753906081
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.532
y[1] (analytic) = 0
y[1] (numeric) = 0.89810961572930722264012917508932
absolute error = 0.89810961572930722264012917508932
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.533
y[1] (analytic) = 0
y[1] (numeric) = 0.89871633815287504821259511096323
absolute error = 0.89871633815287504821259511096323
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.534
y[1] (analytic) = 0
y[1] (numeric) = 0.89932324904257586972610741304451
absolute error = 0.89932324904257586972610741304451
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.535
y[1] (analytic) = 0
y[1] (numeric) = 0.89993034870911913189003160324581
absolute error = 0.89993034870911913189003160324581
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.536
y[1] (analytic) = 0
y[1] (numeric) = 0.9005376374629150323837135562228
absolute error = 0.9005376374629150323837135562228
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=637.0MB, alloc=4.5MB, time=66.88
x[1] = 1.537
y[1] (analytic) = 0
y[1] (numeric) = 0.90114511561407432545680263706809
absolute error = 0.90114511561407432545680263706809
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.538
y[1] (analytic) = 0
y[1] (numeric) = 0.90175278347240812393883509353551
absolute error = 0.90175278347240812393883509353551
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.539
y[1] (analytic) = 0
y[1] (numeric) = 0.9023606413474276996609047795467
absolute error = 0.9023606413474276996609047795467
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.54
y[1] (analytic) = 0
y[1] (numeric) = 0.90296868954834428229225137538658
absolute error = 0.90296868954834428229225137538658
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.541
y[1] (analytic) = 0
y[1] (numeric) = 0.90357692838406885659459938450075
absolute error = 0.90357692838406885659459938450075
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.542
y[1] (analytic) = 0
y[1] (numeric) = 0.90418535816321195809708432708486
absolute error = 0.90418535816321195809708432708486
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.543
y[1] (analytic) = 0
y[1] (numeric) = 0.90479397919408346719460571662371
absolute error = 0.90479397919408346719460571662371
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.544
y[1] (analytic) = 0
y[1] (numeric) = 0.90540279178469240167244959711447
absolute error = 0.90540279178469240167244959711447
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.545
y[1] (analytic) = 0
y[1] (numeric) = 0.90601179624274670766002663581374
absolute error = 0.90601179624274670766002663581374
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=640.8MB, alloc=4.5MB, time=67.28
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.546
y[1] (analytic) = 0
y[1] (numeric) = 0.90662099287565304901657500890052
absolute error = 0.90662099287565304901657500890052
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.547
y[1] (analytic) = 0
y[1] (numeric) = 0.90723038199051659515168058536516
absolute error = 0.90723038199051659515168058536516
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.548
y[1] (analytic) = 0
y[1] (numeric) = 0.90783996389414080728347020763681
absolute error = 0.90783996389414080728347020763681
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.549
y[1] (analytic) = 0
y[1] (numeric) = 0.90844973889302722313733718586661
absolute error = 0.90844973889302722313733718586661
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.55
y[1] (analytic) = 0
y[1] (numeric) = 0.90905970729337524008806146630912
absolute error = 0.90905970729337524008806146630912
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.551
y[1] (analytic) = 0
y[1] (numeric) = 0.90966986940108189674819030280861
absolute error = 0.90966986940108189674819030280861
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.552
y[1] (analytic) = 0
y[1] (numeric) = 0.91028022552174165300554865391655
absolute error = 0.91028022552174165300554865391655
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.553
y[1] (analytic) = 0
y[1] (numeric) = 0.91089077596064616851275194656074
absolute error = 0.91089077596064616851275194656074
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=644.7MB, alloc=4.5MB, time=67.67
x[1] = 1.554
y[1] (analytic) = 0
y[1] (numeric) = 0.91150152102278407963159729037154
absolute error = 0.91150152102278407963159729037154
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.555
y[1] (analytic) = 0
y[1] (numeric) = 0.91211246101284077483521269466391
absolute error = 0.91211246101284077483521269466391
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.556
y[1] (analytic) = 0
y[1] (numeric) = 0.91272359623519816857084733259298
absolute error = 0.91272359623519816857084733259298
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.557
y[1] (analytic) = 0
y[1] (numeric) = 0.91333492699393447358618941406185
absolute error = 0.91333492699393447358618941406185
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.558
y[1] (analytic) = 0
y[1] (numeric) = 0.91394645359282397172210177048033
absolute error = 0.91394645359282397172210177048033
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.559
y[1] (analytic) = 0
y[1] (numeric) = 0.9145581763353367831746688203687
absolute error = 0.9145581763353367831746688203687
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.56
y[1] (analytic) = 0
y[1] (numeric) = 0.91517009552463863422945217498775
absolute error = 0.91517009552463863422945217498775
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.561
y[1] (analytic) = 0
y[1] (numeric) = 0.91578221146359062347085575757118
absolute error = 0.91578221146359062347085575757118
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.562
y[1] (analytic) = 0
y[1] (numeric) = 0.91639452445474898646950494825519
absolute error = 0.91639452445474898646950494825519
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=648.5MB, alloc=4.5MB, time=68.08
x[1] = 1.563
y[1] (analytic) = 0
y[1] (numeric) = 0.91700703480036485895054792935823
absolute error = 0.91700703480036485895054792935823
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.564
y[1] (analytic) = 0
y[1] (numeric) = 0.91761974280238403844579109217718
absolute error = 0.91761974280238403844579109217718
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.565
y[1] (analytic) = 0
y[1] (numeric) = 0.91823264876244674443258407684994
absolute error = 0.91823264876244674443258407684994
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.566
y[1] (analytic) = 0
y[1] (numeric) = 0.91884575298188737696237375100375
absolute error = 0.91884575298188737696237375100375
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.567
y[1] (analytic) = 0
y[1] (numeric) = 0.91945905576173427378185019077863
absolute error = 0.91945905576173427378185019077863
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.568
y[1] (analytic) = 0
y[1] (numeric) = 0.9200725574027094659496115093008
absolute error = 0.9200725574027094659496115093008
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.569
y[1] (analytic) = 0
y[1] (numeric) = 0.92068625820522843195127818269666
absolute error = 0.92068625820522843195127818269666
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.57
y[1] (analytic) = 0
y[1] (numeric) = 0.92130015846939985031599135219803
absolute error = 0.92130015846939985031599135219803
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=652.3MB, alloc=4.5MB, time=68.48
x[1] = 1.571
y[1] (analytic) = 0
y[1] (numeric) = 0.92191425849502535073723343270831
absolute error = 0.92191425849502535073723343270831
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.572
y[1] (analytic) = 0
y[1] (numeric) = 0.92252855858159926370091323329135
absolute error = 0.92252855858159926370091323329135
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.573
y[1] (analytic) = 0
y[1] (numeric) = 0.92314305902830836862366169332323
absolute error = 0.92314305902830836862366169332323
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.574
y[1] (analytic) = 0
y[1] (numeric) = 0.92375776013403164050428825942648
absolute error = 0.92375776013403164050428825942648
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.575
y[1] (analytic) = 0
y[1] (numeric) = 0.92437266219733999509135187269922
absolute error = 0.92437266219733999509135187269922
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.576
y[1] (analytic) = 0
y[1] (numeric) = 0.92498776551649603256980450307215
absolute error = 0.92498776551649603256980450307215
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.577
y[1] (analytic) = 0
y[1] (numeric) = 0.92560307038945377976966915778697
absolute error = 0.92560307038945377976966915778697
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.578
y[1] (analytic) = 0
y[1] (numeric) = 0.9262185771138584308997183039038
absolute error = 0.9262185771138584308997183039038
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.579
y[1] (analytic) = 0
y[1] (numeric) = 0.92683428598704608680912268032525
absolute error = 0.92683428598704608680912268032525
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=656.1MB, alloc=4.5MB, time=68.88
x[1] = 1.58
y[1] (analytic) = 0
y[1] (numeric) = 0.92745019730604349278004453298329
absolute error = 0.92745019730604349278004453298329
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.581
y[1] (analytic) = 0
y[1] (numeric) = 0.92806631136756777485415338748467
absolute error = 0.92806631136756777485415338748467
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.582
y[1] (analytic) = 0
y[1] (numeric) = 0.92868262846802617469604657656291
absolute error = 0.92868262846802617469604657656291
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.583
y[1] (analytic) = 0
y[1] (numeric) = 0.92929914890351578299656086505263
absolute error = 0.92929914890351578299656086505263
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.584
y[1] (analytic) = 0
y[1] (numeric) = 0.92991587296982327141896566269602
absolute error = 0.92991587296982327141896566269602
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.585
y[1] (analytic) = 0
y[1] (numeric) = 0.93053280096242462309103248482389
absolute error = 0.93053280096242462309103248482389
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.586
y[1] (analytic) = 0
y[1] (numeric) = 0.93114993317648486164597951273583
absolute error = 0.93114993317648486164597951273583
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.587
y[1] (analytic) = 0
y[1] (numeric) = 0.93176726990685777881529431934712
absolute error = 0.93176726990685777881529431934712
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.588
y[1] (analytic) = 0
y[1] (numeric) = 0.93238481144808566057644206128473
absolute error = 0.93238481144808566057644206128473
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=659.9MB, alloc=4.5MB, time=69.28
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.589
y[1] (analytic) = 0
y[1] (numeric) = 0.9330025580943990118584706960121
absolute error = 0.9330025580943990118584706960121
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.59
y[1] (analytic) = 0
y[1] (numeric) = 0.93362051013971627980852906165295
absolute error = 0.93362051013971627980852906165295
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.591
y[1] (analytic) = 0
y[1] (numeric) = 0.93423866787764357562231795787822
absolute error = 0.93423866787764357562231795787822
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.592
y[1] (analytic) = 0
y[1] (numeric) = 0.93485703160147439494149868842796
absolute error = 0.93485703160147439494149868842796
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.593
y[1] (analytic) = 0
y[1] (numeric) = 0.93547560160418933682108786947119
absolute error = 0.93547560160418933682108786947119
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.594
y[1] (analytic) = 0
y[1] (numeric) = 0.93609437817845582126987167297146
absolute error = 0.93609437817845582126987167297146
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.595
y[1] (analytic) = 0
y[1] (numeric) = 0.93671336161662780536687706043347
absolute error = 0.93671336161662780536687706043347
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.596
y[1] (analytic) = 0
y[1] (numeric) = 0.93733255221074549795694196976616
absolute error = 0.93733255221074549795694196976616
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=663.7MB, alloc=4.5MB, time=69.67
x[1] = 1.597
y[1] (analytic) = 0
y[1] (numeric) = 0.93795195025253507292843084641904
absolute error = 0.93795195025253507292843084641904
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.598
y[1] (analytic) = 0
y[1] (numeric) = 0.9385715560334083810761463593407
absolute error = 0.9385715560334083810761463593407
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.599
y[1] (analytic) = 0
y[1] (numeric) = 0.93919136984446266055249261257944
absolute error = 0.93919136984446266055249261257944
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.6
y[1] (analytic) = 0
y[1] (numeric) = 0.9398113919764802459099496544052
absolute error = 0.9398113919764802459099496544052
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.601
y[1] (analytic) = 0
y[1] (numeric) = 0.9404316227199282757379235975869
absolute error = 0.9404316227199282757379235975869
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.602
y[1] (analytic) = 0
y[1] (numeric) = 0.94105206236495839889704119681893
absolute error = 0.94105206236495839889704119681893
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.603
y[1] (analytic) = 0
y[1] (numeric) = 0.94167271120140647935396228216211
absolute error = 0.94167271120140647935396228216211
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.604
y[1] (analytic) = 0
y[1] (numeric) = 0.9422935695187922996197880206563
absolute error = 0.9422935695187922996197880206563
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.605
y[1] (analytic) = 0
y[1] (numeric) = 0.9429146376063192627951475718809
absolute error = 0.9429146376063192627951475718809
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=667.5MB, alloc=4.5MB, time=70.07
x[1] = 1.606
y[1] (analytic) = 0
y[1] (numeric) = 0.94353591575287409322505031709369
absolute error = 0.94353591575287409322505031709369
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.607
y[1] (analytic) = 0
y[1] (numeric) = 0.94415740424702653576659547557452
absolute error = 0.94415740424702653576659547557452
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.608
y[1] (analytic) = 0
y[1] (numeric) = 0.94477910337702905367263557584534
absolute error = 0.94477910337702905367263557584534
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.609
y[1] (analytic) = 0
y[1] (numeric) = 0.94540101343081652509449492343872
absolute error = 0.94540101343081652509449492343872
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.61
y[1] (analytic) = 0
y[1] (numeric) = 0.94602313469600593820684890074976
absolute error = 0.94602313469600593820684890074976
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.611
y[1] (analytic) = 0
y[1] (numeric) = 0.94664546745989608495787464813753
absolute error = 0.94664546745989608495787464813753
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.612
y[1] (analytic) = 0
y[1] (numeric) = 0.94726801200946725344778840874779
absolute error = 0.94726801200946725344778840874779
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.613
y[1] (analytic) = 0
y[1] (numeric) = 0.94789076863138091893888957241505
absolute error = 0.94789076863138091893888957241505
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.614
y[1] (analytic) = 0
y[1] (numeric) = 0.94851373761197943350023622637418
absolute error = 0.94851373761197943350023622637418
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=671.4MB, alloc=4.5MB, time=70.48
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.615
y[1] (analytic) = 0
y[1] (numeric) = 0.94913691923728571429008181227562
absolute error = 0.94913691923728571429008181227562
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.616
y[1] (analytic) = 0
y[1] (numeric) = 0.94976031379300293047920730005886
absolute error = 0.94976031379300293047920730005886
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.617
y[1] (analytic) = 0
y[1] (numeric) = 0.95038392156451418881828811950137
absolute error = 0.95038392156451418881828811950137
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.618
y[1] (analytic) = 0
y[1] (numeric) = 0.95100774283688221785243993962945
absolute error = 0.95100774283688221785243993962945
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.619
y[1] (analytic) = 0
y[1] (numeric) = 0.95163177789484905078609225455802
absolute error = 0.95163177789484905078609225455802
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.62
y[1] (analytic) = 0
y[1] (numeric) = 0.95225602702283570700134362162267
absolute error = 0.95225602702283570700134362162267
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.621
y[1] (analytic) = 0
y[1] (numeric) = 0.95288049050494187223295730378388
absolute error = 0.95288049050494187223295730378388
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.622
y[1] (analytic) = 0
y[1] (numeric) = 0.95350516862494557740316099312338
absolute error = 0.95350516862494557740316099312338
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=675.2MB, alloc=4.5MB, time=70.88
x[1] = 1.623
y[1] (analytic) = 0
y[1] (numeric) = 0.95413006166630287611941923572102
absolute error = 0.95413006166630287611941923572102
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.624
y[1] (analytic) = 0
y[1] (numeric) = 0.95475516991214752083835214019989
absolute error = 0.95475516991214752083835214019989
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.625
y[1] (analytic) = 0
y[1] (numeric) = 0.95538049364529063769897893266175
absolute error = 0.95538049364529063769897893266175
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.626
y[1] (analytic) = 0
y[1] (numeric) = 0.95600603314822040002846991950697
absolute error = 0.95600603314822040002846991950697
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.627
y[1] (analytic) = 0
y[1] (numeric) = 0.95663178870310170052359543664619
absolute error = 0.95663178870310170052359543664619
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.628
y[1] (analytic) = 0
y[1] (numeric) = 0.95725776059177582211106539876749
absolute error = 0.95725776059177582211106539876749
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.629
y[1] (analytic) = 0
y[1] (numeric) = 0.95788394909576010748995811552562
absolute error = 0.95788394909576010748995811552562
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.63
y[1] (analytic) = 0
y[1] (numeric) = 0.95851035449624762735944211267078
absolute error = 0.95851035449624762735944211267078
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.631
y[1] (analytic) = 0
y[1] (numeric) = 0.95913697707410684733499978513626
absolute error = 0.95913697707410684733499978513626
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=679.0MB, alloc=4.5MB, time=71.28
x[1] = 1.632
y[1] (analytic) = 0
y[1] (numeric) = 0.95976381710988129355636681585823
absolute error = 0.95976381710988129355636681585823
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.633
y[1] (analytic) = 0
y[1] (numeric) = 0.96039087488378921699040641850895
absolute error = 0.96039087488378921699040641850895
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.634
y[1] (analytic) = 0
y[1] (numeric) = 0.96101815067572325643214260428848
absolute error = 0.96101815067572325643214260428848
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.635
y[1] (analytic) = 0
y[1] (numeric) = 0.96164564476525010020718183234028
absolute error = 0.96164564476525010020718183234028
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.636
y[1] (analytic) = 0
y[1] (numeric) = 0.96227335743161014657875758013439
absolute error = 0.96227335743161014657875758013439
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.637
y[1] (analytic) = 0
y[1] (numeric) = 0.96290128895371716286263756419866
absolute error = 0.96290128895371716286263756419866
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.638
y[1] (analytic) = 0
y[1] (numeric) = 0.96352943961015794325313855277474
absolute error = 0.96352943961015794325313855277474
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.639
y[1] (analytic) = 0
y[1] (numeric) = 0.96415780967919196536349894023113
absolute error = 0.96415780967919196536349894023113
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.64
y[1] (analytic) = 0
y[1] (numeric) = 0.96478639943875104548386449828125
absolute error = 0.96478639943875104548386449828125
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=682.8MB, alloc=4.5MB, time=71.67
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.641
y[1] (analytic) = 0
y[1] (numeric) = 0.96541520916643899256014798112971
absolute error = 0.96541520916643899256014798112971
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.642
y[1] (analytic) = 0
y[1] (numeric) = 0.96604423913953126089702854050489
absolute error = 0.96604423913953126089702854050489
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.643
y[1] (analytic) = 0
y[1] (numeric) = 0.96667348963497460158836220202972
absolute error = 0.96667348963497460158836220202972
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.644
y[1] (analytic) = 0
y[1] (numeric) = 0.96730296092938671267827996643487
absolute error = 0.96730296092938671267827996643487
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.645
y[1] (analytic) = 0
y[1] (numeric) = 0.96793265329905588805625542762829
absolute error = 0.96793265329905588805625542762829
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.646
y[1] (analytic) = 0
y[1] (numeric) = 0.96856256701994066508942914450106
absolute error = 0.96856256701994066508942914450106
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.647
y[1] (analytic) = 0
y[1] (numeric) = 0.96919270236766947099548236447074
absolute error = 0.96919270236766947099548236447074
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.648
y[1] (analytic) = 0
y[1] (numeric) = 0.96982305961754026795935807403794
absolute error = 0.96982305961754026795935807403794
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=686.6MB, alloc=4.5MB, time=72.06
x[1] = 1.649
y[1] (analytic) = 0
y[1] (numeric) = 0.97045363904452019699713274495828
absolute error = 0.97045363904452019699713274495828
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.65
y[1] (analytic) = 0
y[1] (numeric) = 0.97108444092324522057034755390796
absolute error = 0.97108444092324522057034755390796
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.651
y[1] (analytic) = 0
y[1] (numeric) = 0.97171546552801976395411327864494
absolute error = 0.97171546552801976395411327864494
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.652
y[1] (analytic) = 0
y[1] (numeric) = 0.97234671313281635536230851453653
absolute error = 0.97234671313281635536230851453653
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.653
y[1] (analytic) = 0
y[1] (numeric) = 0.97297818401127526483319631183578
absolute error = 0.97297818401127526483319631183578
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.654
y[1] (analytic) = 0
y[1] (numeric) = 0.97360987843670414187878980614005
absolute error = 0.97360987843670414187878980614005
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.655
y[1] (analytic) = 0
y[1] (numeric) = 0.97424179668207765190130290195314
absolute error = 0.97424179668207765190130290195314
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.656
y[1] (analytic) = 0
y[1] (numeric) = 0.97487393902003711138002757209347
absolute error = 0.97487393902003711138002757209347
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.657
y[1] (analytic) = 0
y[1] (numeric) = 0.97550630572289012183198485374209
absolute error = 0.97550630572289012183198485374209
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=690.4MB, alloc=4.5MB, time=72.48
x[1] = 1.658
y[1] (analytic) = 0
y[1] (numeric) = 0.97613889706261020254970215510166
absolute error = 0.97613889706261020254970215510166
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.659
y[1] (analytic) = 0
y[1] (numeric) = 0.97677171331083642211947503483716
absolute error = 0.97677171331083642211947503483716
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.66
y[1] (analytic) = 0
y[1] (numeric) = 0.97740475473887302872347717958712
absolute error = 0.97740475473887302872347717958712
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.661
y[1] (analytic) = 0
y[1] (numeric) = 0.97803802161768907922908788276588
absolute error = 0.97803802161768907922908788276588
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.662
y[1] (analytic) = 0
y[1] (numeric) = 0.97867151421791806706881192051821
absolute error = 0.97867151421791806706881192051821
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.663
y[1] (analytic) = 0
y[1] (numeric) = 0.97930523280985754891417232793345
absolute error = 0.97930523280985754891417232793345
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.664
y[1] (analytic) = 0
y[1] (numeric) = 0.97993917766346877014696220037098
absolute error = 0.97993917766346877014696220037098
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.665
y[1] (analytic) = 0
y[1] (numeric) = 0.98057334904837628913124728088839
absolute error = 0.98057334904837628913124728088839
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.666
y[1] (analytic) = 0
y[1] (numeric) = 0.98120774723386760028951674519184
absolute error = 0.98120774723386760028951674519184
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=694.3MB, alloc=4.5MB, time=72.91
x[1] = 1.667
y[1] (analytic) = 0
y[1] (numeric) = 0.98184237248889275598638526013935
absolute error = 0.98184237248889275598638526013935
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.668
y[1] (analytic) = 0
y[1] (numeric) = 0.98247722508206398722325507051671
absolute error = 0.98247722508206398722325507051671
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.669
y[1] (analytic) = 0
y[1] (numeric) = 0.98311230528165532314735256146567
absolute error = 0.98311230528165532314735256146567
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.67
y[1] (analytic) = 0
y[1] (numeric) = 0.98374761335560220937855945046912
absolute error = 0.98374761335560220937855945046912
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.671
y[1] (analytic) = 0
y[1] (numeric) = 0.98438314957150112515746448308153
absolute error = 0.98438314957150112515746448308153
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.672
y[1] (analytic) = 0
y[1] (numeric) = 0.98501891419660919931806724052837
absolute error = 0.98501891419660919931806724052837
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.673
y[1] (analytic) = 0
y[1] (numeric) = 0.98565490749784382508857141477825
absolute error = 0.98565490749784382508857141477825
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.674
y[1] (analytic) = 0
y[1] (numeric) = 0.98629112974178227372371066760948
absolute error = 0.98629112974178227372371066760948
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.675
y[1] (analytic) = 0
y[1] (numeric) = 0.98692758119466130697205596444099
absolute error = 0.98692758119466130697205596444099
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=698.1MB, alloc=4.5MB, time=73.28
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.676
y[1] (analytic) = 0
y[1] (numeric) = 0.98756426212237678838175906116842
absolute error = 0.98756426212237678838175906116842
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.677
y[1] (analytic) = 0
y[1] (numeric) = 0.98820117279048329344819262283198
absolute error = 0.98820117279048329344819262283198
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.678
y[1] (analytic) = 0
y[1] (numeric) = 0.98883831346419371860695326653575
absolute error = 0.98883831346419371860695326653575
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.679
y[1] (analytic) = 0
y[1] (numeric) = 0.98947568440837888907569964752926
absolute error = 0.98947568440837888907569964752926
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.68
y[1] (analytic) = 0
y[1] (numeric) = 0.99011328588756716554830354664418
absolute error = 0.99011328588756716554830354664418
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.681
y[1] (analytic) = 0
y[1] (numeric) = 0.99075111816594404974479776924217
absolute error = 0.99075111816594404974479776924217
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.682
y[1] (analytic) = 0
y[1] (numeric) = 0.99138918150735178882061053036607
absolute error = 0.99138918150735178882061053036607
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.683
y[1] (analytic) = 0
y[1] (numeric) = 0.99202747617528897863858187778626
absolute error = 0.99202747617528897863858187778626
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=701.9MB, alloc=4.5MB, time=73.67
x[1] = 1.684
y[1] (analytic) = 0
y[1] (numeric) = 0.99266600243291016590726359398805
absolute error = 0.99266600243291016590726359398805
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.685
y[1] (analytic) = 0
y[1] (numeric) = 0.99330476054302544918900991974481
absolute error = 0.99330476054302544918900991974481
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.686
y[1] (analytic) = 0
y[1] (numeric) = 0.99394375076810007878137235565549
absolute error = 0.99394375076810007878137235565549
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.687
y[1] (analytic) = 0
y[1] (numeric) = 0.99458297337025405547531772378409
absolute error = 0.99458297337025405547531772378409
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.688
y[1] (analytic) = 0
y[1] (numeric) = 0.99522242861126172819379460921292
absolute error = 0.99522242861126172819379460921292
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.689
y[1] (analytic) = 0
y[1] (numeric) = 0.99586211675255139051417925079979
absolute error = 0.99586211675255139051417925079979
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.69
y[1] (analytic) = 0
y[1] (numeric) = 0.99650203805520487607813791160213
absolute error = 0.99650203805520487607813791160213
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.691
y[1] (analytic) = 0
y[1] (numeric) = 0.99714219277995715289244873218687
absolute error = 0.99714219277995715289244873218687
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.692
y[1] (analytic) = 0
y[1] (numeric) = 0.99778258118719591652433205427278
absolute error = 0.99778258118719591652433205427278
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=705.7MB, alloc=4.5MB, time=74.07
x[1] = 1.693
y[1] (analytic) = 0
y[1] (numeric) = 0.99842320353696118219484419774124
absolute error = 0.99842320353696118219484419774124
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.694
y[1] (analytic) = 0
y[1] (numeric) = 0.99906406008894487577389568088973
absolute error = 0.99906406008894487577389568088973
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.695
y[1] (analytic) = 0
y[1] (numeric) = 0.99970515110249042368046089177892
absolute error = 0.99970515110249042368046089177892
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.696
y[1] (analytic) = 0
y[1] (numeric) = 1.0003464768365923416915522475266
absolute error = 1.0003464768365923416915522475266
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.697
y[1] (analytic) = 0
y[1] (numeric) = 1.0009880375498958226635379183183
absolute error = 1.0009880375498958226635379183183
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.698
y[1] (analytic) = 0
y[1] (numeric) = 1.0016298335006963231693882436219
absolute error = 1.0016298335006963231693882436219
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.699
y[1] (analytic) = 0
y[1] (numeric) = 1.0022718649469391490554420295015
absolute error = 1.0022718649469391490554420295015
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.7
y[1] (analytic) = 0
y[1] (numeric) = 1.0029141321462190399212899879092
absolute error = 1.0029141321462190399212899879092
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.701
y[1] (analytic) = 0
y[1] (numeric) = 1.0035566353557797525263786612804
absolute error = 1.0035566353557797525263786612804
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=709.5MB, alloc=4.5MB, time=74.47
x[1] = 1.702
y[1] (analytic) = 0
y[1] (numeric) = 1.0041993748325136431269442685554
absolute error = 1.0041993748325136431269442685554
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.703
y[1] (analytic) = 0
y[1] (numeric) = 1.0048423508329612487468920117863
absolute error = 1.0048423508329612487468920117863
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.704
y[1] (analytic) = 0
y[1] (numeric) = 1.005485563613310867386242495644
absolute error = 1.005485563613310867386242495644
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.705
y[1] (analytic) = 0
y[1] (numeric) = 1.0061290134293981371707730353102
absolute error = 1.0061290134293981371707730353102
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.706
y[1] (analytic) = 0
y[1] (numeric) = 1.0067727005367056144464877613008
absolute error = 1.0067727005367056144464877613008
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.707
y[1] (analytic) = 0
y[1] (numeric) = 1.0074166251903623508225565726142
absolute error = 1.0074166251903623508225565726142
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.708
y[1] (analytic) = 0
y[1] (numeric) = 1.0080607876451434691663691421083
absolute error = 1.0080607876451434691663691421083
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.709
y[1] (analytic) = 0
y[1] (numeric) = 1.0087051881554697385543563400773
absolute error = 1.0087051881554697385543563400773
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.71
y[1] (analytic) = 0
y[1] (numeric) = 1.0093498269754071481822376134994
absolute error = 1.0093498269754071481822376134994
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=713.3MB, alloc=4.5MB, time=74.89
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.711
y[1] (analytic) = 0
y[1] (numeric) = 1.0099947043586664802383590392545
absolute error = 1.0099947043586664802383590392545
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.712
y[1] (analytic) = 0
y[1] (numeric) = 1.010639820558602881743792959642
absolute error = 1.010639820558602881743792959642
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.713
y[1] (analytic) = 0
y[1] (numeric) = 1.0112851758282154353628763076551
absolute error = 1.0112851758282154353628763076551
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.714
y[1] (analytic) = 0
y[1] (numeric) = 1.011930770420146729187870937569
absolute error = 1.011930770420146729187870937569
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.715
y[1] (analytic) = 0
y[1] (numeric) = 1.0125766045866824255014354933624
absolute error = 1.0125766045866824255014354933624
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.716
y[1] (analytic) = 0
y[1] (numeric) = 1.0132226785797508285206045731991
absolute error = 1.0132226785797508285206045731991
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.717
y[1] (analytic) = 0
y[1] (numeric) = 1.0138689926509224511259771825307
absolute error = 1.0138689926509224511259771825307
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.718
y[1] (analytic) = 0
y[1] (numeric) = 1.0145155470514095805798227112289
absolute error = 1.0145155470514095805798227112289
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=717.1MB, alloc=4.5MB, time=75.29
x[1] = 1.719
y[1] (analytic) = 0
y[1] (numeric) = 1.0151623420320658432368189213971
absolute error = 1.0151623420320658432368189213971
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.72
y[1] (analytic) = 0
y[1] (numeric) = 1.0158093778433857682511426920329
absolute error = 1.0158093778433857682511426920329
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.721
y[1] (analytic) = 0
y[1] (numeric) = 1.0164566547355043502836405343922
absolute error = 1.0164566547355043502836405343922
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.722
y[1] (analytic) = 0
y[1] (numeric) = 1.017104172958196611212812167634
absolute error = 1.017104172958196611212812167634
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.723
y[1] (analytic) = 0
y[1] (numeric) = 1.0177519327608771608533467279742
absolute error = 1.0177519327608771608533467279742
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.724
y[1] (analytic) = 0
y[1] (numeric) = 1.0183999343925997566859574760392
absolute error = 1.0183999343925997566859574760392
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.725
y[1] (analytic) = 0
y[1] (numeric) = 1.0190481781020568626022671662611
absolute error = 1.0190481781020568626022671662611
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.726
y[1] (analytic) = 0
y[1] (numeric) = 1.0196966641375792066685025488808
absolute error = 1.0196966641375792066685025488808
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.727
y[1] (analytic) = 0
y[1] (numeric) = 1.0203453927471353379117627893032
absolute error = 1.0203453927471353379117627893032
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=721.0MB, alloc=4.5MB, time=75.69
x[1] = 1.728
y[1] (analytic) = 0
y[1] (numeric) = 1.0209943641783311821326329110655
absolute error = 1.0209943641783311821326329110655
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.729
y[1] (analytic) = 0
y[1] (numeric) = 1.0216435786784095967479196974097
absolute error = 1.0216435786784095967479196974097
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.73
y[1] (analytic) = 0
y[1] (numeric) = 1.0222930364942499246672938222821
absolute error = 1.0222930364942499246672938222821
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.731
y[1] (analytic) = 0
y[1] (numeric) = 1.0229427378723675472076283243918
absolute error = 1.0229427378723675472076283243918
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.732
y[1] (analytic) = 0
y[1] (numeric) = 1.0235926830589134360488298876312
absolute error = 1.0235926830589134360488298876312
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.733
y[1] (analytic) = 0
y[1] (numeric) = 1.0242428722996737042349657475694
absolute error = 1.0242428722996737042349657475694
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.734
y[1] (analytic) = 0
y[1] (numeric) = 1.0248933058400691562244954067636
absolute error = 1.0248933058400691562244954067636
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.735
y[1] (analytic) = 0
y[1] (numeric) = 1.0255439839251548369934227111627
absolute error = 1.0255439839251548369934227111627
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.736
y[1] (analytic) = 0
y[1] (numeric) = 1.0261949067996195801951902157931
absolute error = 1.0261949067996195801951902157931
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=724.8MB, alloc=4.5MB, time=76.08
x[1] = 1.737
y[1] (analytic) = 0
y[1] (numeric) = 1.026846074707785555381144150087
absolute error = 1.026846074707785555381144150087
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.738
y[1] (analytic) = 0
y[1] (numeric) = 1.0274974878936078142854046815294
absolute error = 1.0274974878936078142854046815294
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.739
y[1] (analytic) = 0
y[1] (numeric) = 1.028149146600673836177982570632
absolute error = 1.028149146600673836177982570632
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.74
y[1] (analytic) = 0
y[1] (numeric) = 1.0288010510722030722899897104734
absolute error = 1.0288010510722030722899897104734
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.741
y[1] (analytic) = 0
y[1] (numeric) = 1.0294532015510464893147974500536
absolute error = 1.0294532015510464893147974500536
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.742
y[1] (analytic) = 0
y[1] (numeric) = 1.0301055982796861119890030123767
absolute error = 1.0301055982796861119890030123767
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.743
y[1] (analytic) = 0
y[1] (numeric) = 1.0307582415002345647570707353743
absolute error = 1.0307582415002345647570707353743
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.744
y[1] (analytic) = 0
y[1] (numeric) = 1.0314111314544346125235212863955
absolute error = 1.0314111314544346125235212863955
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.745
y[1] (analytic) = 0
y[1] (numeric) = 1.032064268383658700496548428893
absolute error = 1.032064268383658700496548428893
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=728.6MB, alloc=4.5MB, time=76.45
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.746
y[1] (analytic) = 0
y[1] (numeric) = 1.0327176525289084931269493530088
absolute error = 1.0327176525289084931269493530088
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.747
y[1] (analytic) = 0
y[1] (numeric) = 1.0333712841308144121462610198812
absolute error = 1.0333712841308144121462610198812
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.748
y[1] (analytic) = 0
y[1] (numeric) = 1.0340251634296351737080014125421
absolute error = 1.0340251634296351737080014125421
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.749
y[1] (analytic) = 0
y[1] (numeric) = 1.0346792906652573246359210341179
absolute error = 1.0346792906652573246359210341179
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.75
y[1] (analytic) = 0
y[1] (numeric) = 1.0353336660771947777831764465748
absolute error = 1.0353336660771947777831764465748
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.751
y[1] (analytic) = 0
y[1] (numeric) = 1.0359882899045883465063441003294
absolute error = 1.0359882899045883465063441003294
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.752
y[1] (analytic) = 0
y[1] (numeric) = 1.0366431623862052782581991665628
absolute error = 1.0366431623862052782581991665628
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.753
y[1] (analytic) = 0
y[1] (numeric) = 1.0372982837604387873031905498988
absolute error = 1.0372982837604387873031905498988
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=732.4MB, alloc=4.5MB, time=76.83
x[1] = 1.754
y[1] (analytic) = 0
y[1] (numeric) = 1.0379536542653075865595497291182
absolute error = 1.0379536542653075865595497291182
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.755
y[1] (analytic) = 0
y[1] (numeric) = 1.0386092741384554185719775476549
absolute error = 1.0386092741384554185719775476549
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.756
y[1] (analytic) = 0
y[1] (numeric) = 1.0392651436171505856188595536299
absolute error = 1.0392651436171505856188595536299
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.757
y[1] (analytic) = 0
y[1] (numeric) = 1.0399212629382854789579669710055
absolute error = 1.0399212629382854789579669710055
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.758
y[1] (analytic) = 0
y[1] (numeric) = 1.0405776323383761072146068689579
absolute error = 1.0405776323383761072146068689579
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.759
y[1] (analytic) = 0
y[1] (numeric) = 1.0412342520535616239161915856479
absolute error = 1.0412342520535616239161915856479
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.76
y[1] (analytic) = 0
y[1] (numeric) = 1.0418911223196038541772039550907
absolute error = 1.0418911223196038541772039550907
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.761
y[1] (analytic) = 0
y[1] (numeric) = 1.0425482433718868205385413816657
absolute error = 1.0425482433718868205385413816657
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.762
y[1] (analytic) = 0
y[1] (numeric) = 1.043205615445416267965228305836
absolute error = 1.043205615445416267965228305836
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=736.2MB, alloc=4.5MB, time=77.21
x[1] = 1.763
y[1] (analytic) = 0
y[1] (numeric) = 1.0438632387748191880064931067416
absolute error = 1.0438632387748191880064931067416
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.764
y[1] (analytic) = 0
y[1] (numeric) = 1.0445211135943433421222119923677
absolute error = 1.0445211135943433421222119923677
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.765
y[1] (analytic) = 0
y[1] (numeric) = 1.0451792401378567841797289358398
absolute error = 1.0451792401378567841797289358398
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.766
y[1] (analytic) = 0
y[1] (numeric) = 1.0458376186388473821250672269363
absolute error = 1.0458376186388473821250672269363
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.767
y[1] (analytic) = 0
y[1] (numeric) = 1.0464962493304223388325547210133
absolute error = 1.0464962493304223388325547210133
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.768
y[1] (analytic) = 0
y[1] (numeric) = 1.0471551324453077121368913830775
absolute error = 1.0471551324453077121368913830775
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.769
y[1] (analytic) = 0
y[1] (numeric) = 1.047814268215847934051694242592
absolute error = 1.047814268215847934051694242592
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.77
y[1] (analytic) = 0
y[1] (numeric) = 1.0484736568740053291785613946386
absolute error = 1.0484736568740053291785613946386
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.771
y[1] (analytic) = 0
y[1] (numeric) = 1.0491332986513596323107032051516
absolute error = 1.0491332986513596323107032051516
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=740.0MB, alloc=4.5MB, time=77.59
x[1] = 1.772
y[1] (analytic) = 0
y[1] (numeric) = 1.0497931937791075052351954019639
absolute error = 1.0497931937791075052351954019639
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.773
y[1] (analytic) = 0
y[1] (numeric) = 1.0504533424880620527379152592348
absolute error = 1.0504533424880620527379152592348
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.774
y[1] (analytic) = 0
y[1] (numeric) = 1.0511137450086523378152286103351
absolute error = 1.0511137450086523378152286103351
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.775
y[1] (analytic) = 0
y[1] (numeric) = 1.0517744015709228960965019533198
absolute error = 1.0517744015709228960965019533198
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.776
y[1] (analytic) = 0
y[1] (numeric) = 1.052435312404533249481520443597
absolute error = 1.052435312404533249481520443597
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.777
y[1] (analytic) = 0
y[1] (numeric) = 1.0530964777387574189968991001743
absolute error = 1.0530964777387574189968991001743
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.778
y[1] (analytic) = 0
y[1] (numeric) = 1.0537578978024834368755810848014
absolute error = 1.0537578978024834368755810848014
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.779
y[1] (analytic) = 0
y[1] (numeric) = 1.0544195728242128578635234473074
absolute error = 1.0544195728242128578635234473074
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.78
y[1] (analytic) = 0
y[1] (numeric) = 1.0550815030320602697576772653172
absolute error = 1.0550815030320602697576772653172
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=743.8MB, alloc=4.5MB, time=77.97
x[1] = 1.781
y[1] (analytic) = 0
y[1] (numeric) = 1.0557436886537528031793756422041
absolute error = 1.0557436886537528031793756422041
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.782
y[1] (analytic) = 0
y[1] (numeric) = 1.0564061299166296405872495634589
absolute error = 1.0564061299166296405872495634589
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.783
y[1] (analytic) = 0
y[1] (numeric) = 1.0570688270476415245337981485051
absolute error = 1.0570688270476415245337981485051
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.784
y[1] (analytic) = 0
y[1] (numeric) = 1.0577317802733502651697463722362
absolute error = 1.0577317802733502651697463722362
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.785
y[1] (analytic) = 0
y[1] (numeric) = 1.0583949898199282470003298680637
absolute error = 1.0583949898199282470003298680637
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.786
y[1] (analytic) = 0
y[1] (numeric) = 1.0590584559131579348976529619159
absolute error = 1.0590584559131579348976529619159
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.787
y[1] (analytic) = 0
y[1] (numeric) = 1.0597221787784313793732726242878
absolute error = 1.0597221787784313793732726242878
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.788
y[1] (analytic) = 0
y[1] (numeric) = 1.0603861586407497211151675649815
absolute error = 1.0603861586407497211151675649815
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.789
y[1] (analytic) = 0
y[1] (numeric) = 1.0610503957247226947932582324671
absolute error = 1.0610503957247226947932582324671
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=747.7MB, alloc=4.5MB, time=78.35
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.79
y[1] (analytic) = 0
y[1] (numeric) = 1.0617148902545681321376500167025
absolute error = 1.0617148902545681321376500167025
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.791
y[1] (analytic) = 0
y[1] (numeric) = 1.0623796424541114642937784906496
absolute error = 1.0623796424541114642937784906496
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.792
y[1] (analytic) = 0
y[1] (numeric) = 1.0630446525467852234586420614862
absolute error = 1.0630446525467852234586420614862
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.793
y[1] (analytic) = 0
y[1] (numeric) = 1.0637099207556285438023139374997
absolute error = 1.0637099207556285438023139374997
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.794
y[1] (analytic) = 0
y[1] (numeric) = 1.0643754473032866616789318507385
absolute error = 1.0643754473032866616789318507385
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.795
y[1] (analytic) = 0
y[1] (numeric) = 1.0650412324120104151313705085548
absolute error = 1.0650412324120104151313705085548
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.796
y[1] (analytic) = 0
y[1] (numeric) = 1.0657072763036557426938082790674
absolute error = 1.0657072763036557426938082790674
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.797
y[1] (analytic) = 0
y[1] (numeric) = 1.0663735791996831814964061461762
absolute error = 1.0663735791996831814964061461762
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=751.5MB, alloc=4.6MB, time=78.73
x[1] = 1.798
y[1] (analytic) = 0
y[1] (numeric) = 1.0670401413211573646763234989385
absolute error = 1.0670401413211573646763234989385
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.799
y[1] (analytic) = 0
y[1] (numeric) = 1.0677069628887465180993018477424
absolute error = 1.0677069628887465180993018477424
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.8
y[1] (analytic) = 0
y[1] (numeric) = 1.0683740441227219563960540856492
absolute error = 1.0683740441227219563960540856492
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.801
y[1] (analytic) = 0
y[1] (numeric) = 1.069041385242957578317703437397
absolute error = 1.069041385242957578317703437397
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.802
y[1] (analytic) = 0
y[1] (numeric) = 1.0697089864689293614145227607289
absolute error = 1.0697089864689293614145227607289
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.803
y[1] (analytic) = 0
y[1] (numeric) = 1.0703768480197148560422313847979
absolute error = 1.0703768480197148560422313847979
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.804
y[1] (analytic) = 0
y[1] (numeric) = 1.0710449701139926787001131882786
absolute error = 1.0710449701139926787001131882786
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.805
y[1] (analytic) = 0
y[1] (numeric) = 1.071713352970042004705226135345
absolute error = 1.071713352970042004705226135345
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.806
y[1] (analytic) = 0
y[1] (numeric) = 1.0723819968057420602069800007311
absolute error = 1.0723819968057420602069800007311
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=755.3MB, alloc=4.6MB, time=79.12
x[1] = 1.807
y[1] (analytic) = 0
y[1] (numeric) = 1.0730509018385716135463655255332
absolute error = 1.0730509018385716135463655255332
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.808
y[1] (analytic) = 0
y[1] (numeric) = 1.0737200682856084659641247531167
absolute error = 1.0737200682856084659641247531167
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.809
y[1] (analytic) = 0
y[1] (numeric) = 1.0743894963635289416621587993188
absolute error = 1.0743894963635289416621587993188
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.81
y[1] (analytic) = 0
y[1] (numeric) = 1.0750591862886073772224758129585
absolute error = 1.0750591862886073772224758129585
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.811
y[1] (analytic) = 0
y[1] (numeric) = 1.0757291382767156103879883813461
absolute error = 1.0757291382767156103879883813461
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.812
y[1] (analytic) = 0
y[1] (numeric) = 1.076399352543322468209476130892
absolute error = 1.076399352543322468209476130892
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.813
y[1] (analytic) = 0
y[1] (numeric) = 1.0770698293034932545630357649151
absolute error = 1.0770698293034932545630357649151
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.814
y[1] (analytic) = 0
y[1] (numeric) = 1.0777405687718892370423472692128
absolute error = 1.0777405687718892370423472692128
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.815
y[1] (analytic) = 0
y[1] (numeric) = 1.0784115711627671332300915007416
absolute error = 1.0784115711627671332300915007416
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=759.1MB, alloc=4.6MB, time=79.51
x[1] = 1.816
y[1] (analytic) = 0
y[1] (numeric) = 1.0790828366899785963528608557404
absolute error = 1.0790828366899785963528608557404
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.817
y[1] (analytic) = 0
y[1] (numeric) = 1.0797543655669697003239111906675
absolute error = 1.0797543655669697003239111906675
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.818
y[1] (analytic) = 0
y[1] (numeric) = 1.0804261580067804241781096422906
absolute error = 1.0804261580067804241781096422906
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.819
y[1] (analytic) = 0
y[1] (numeric) = 1.0810982142220441359034394620271
absolute error = 1.0810982142220441359034394620271
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.82
y[1] (analytic) = 0
y[1] (numeric) = 1.0817705344249870756734294440493
absolute error = 1.0817705344249870756734294440493
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.821
y[1] (analytic) = 0
y[1] (numeric) = 1.0824431188274278384848819866068
absolute error = 1.0824431188274278384848819866068
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.822
y[1] (analytic) = 0
y[1] (numeric) = 1.0831159676407768562052802813513
absolute error = 1.0831159676407768562052802813513
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.823
y[1] (analytic) = 0
y[1] (numeric) = 1.08378908107603587903426157603
absolute error = 1.08378908107603587903426157603
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.824
y[1] (analytic) = 0
y[1] (numeric) = 1.0844624593437974563835499016196
absolute error = 1.0844624593437974563835499016196
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=762.9MB, alloc=4.6MB, time=79.91
x[1] = 1.825
y[1] (analytic) = 0
y[1] (numeric) = 1.0851361026542444171797480956627
absolute error = 1.0851361026542444171797480956627
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.826
y[1] (analytic) = 0
y[1] (numeric) = 1.0858100112171493495943953891094
absolute error = 1.0858100112171493495943953891094
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.827
y[1] (analytic) = 0
y[1] (numeric) = 1.0864841852418740802057032542222
absolute error = 1.0864841852418740802057032542222
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.828
y[1] (analytic) = 0
y[1] (numeric) = 1.0871586249373691525963886359414
absolute error = 1.0871586249373691525963886359414
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.829
y[1] (analytic) = 0
y[1] (numeric) = 1.0878333305121733053920301083897
absolute error = 1.0878333305121733053920301083897
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.83
y[1] (analytic) = 0
y[1] (numeric) = 1.0885083021744129497443789117879
absolute error = 1.0885083021744129497443789117879
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.831
y[1] (analytic) = 0
y[1] (numeric) = 1.089183540131801646264063232823
absolute error = 1.089183540131801646264063232823
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.832
y[1] (analytic) = 0
y[1] (numeric) = 1.0898590445916395814071304933159
absolute error = 1.0898590445916395814071304933159
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.833
y[1] (analytic) = 0
y[1] (numeric) = 1.0905348157608130433198788077483
absolute error = 1.0905348157608130433198788077483
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
memory used=766.7MB, alloc=4.6MB, time=80.30
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.834
y[1] (analytic) = 0
y[1] (numeric) = 1.0912108538457938971464351596874
absolute error = 1.0912108538457938971464351596874
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.835
y[1] (analytic) = 0
y[1] (numeric) = 1.0918871590526390598035442302585
absolute error = 1.0918871590526390598035442302585
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.836
y[1] (analytic) = 0
y[1] (numeric) = 1.0925637315869899742270381884235
absolute error = 1.0925637315869899742270381884235
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.837
y[1] (analytic) = 0
y[1] (numeric) = 1.0932405716540720830944641227912
absolute error = 1.0932405716540720830944641227912
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.838
y[1] (analytic) = 0
y[1] (numeric) = 1.0939176794586943020283521578773
absolute error = 1.0939176794586943020283521578773
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.839
y[1] (analytic) = 0
y[1] (numeric) = 1.0945950552052484922846136540125
absolute error = 1.0945950552052484922846136540125
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.84
y[1] (analytic) = 0
y[1] (numeric) = 1.095272699097708932930565239327
absolute error = 1.095272699097708932930565239327
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.841
y[1] (analytic) = 0
y[1] (numeric) = 1.0959506113396317925170807642865
absolute error = 1.0959506113396317925170807642865
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=770.5MB, alloc=4.6MB, time=80.69
x[1] = 1.842
y[1] (analytic) = 0
y[1] (numeric) = 1.0966287921341546002493796039802
absolute error = 1.0966287921341546002493796039802
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.843
y[1] (analytic) = 0
y[1] (numeric) = 1.0973072416839957166609660606247
absolute error = 1.0973072416839957166609660606247
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.844
y[1] (analytic) = 0
y[1] (numeric) = 1.0979859601914538037952409384223
absolute error = 1.0979859601914538037952409384223
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.845
y[1] (analytic) = 0
y[1] (numeric) = 1.0986649478584072948993126748478
absolute error = 1.0986649478584072948993126748478
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.846
y[1] (analytic) = 0
y[1] (numeric) = 1.0993442048863138636345417165104
absolute error = 1.0993442048863138636345417165104
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.847
y[1] (analytic) = 0
y[1] (numeric) = 1.1000237314762098928083581237999
absolute error = 1.1000237314762098928083581237999
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.848
y[1] (analytic) = 0
y[1] (numeric) = 1.1007035278287099426318986764482
absolute error = 1.1007035278287099426318986764482
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.849
y[1] (analytic) = 0
y[1] (numeric) = 1.1013835941440062185080160317774
absolute error = 1.1013835941440062185080160317774
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.85
y[1] (analytic) = 0
y[1] (numeric) = 1.1020639306218680383542187586277
absolute error = 1.1020639306218680383542187586277
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=774.4MB, alloc=4.6MB, time=81.07
x[1] = 1.851
y[1] (analytic) = 0
y[1] (numeric) = 1.1027445374616412994651073326275
absolute error = 1.1027445374616412994651073326275
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.852
y[1] (analytic) = 0
y[1] (numeric) = 1.1034254148622479449188774324421
absolute error = 1.1034254148622479449188774324421
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.853
y[1] (analytic) = 0
y[1] (numeric) = 1.1041065630221854295324681217819
absolute error = 1.1041065630221854295324681217819
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.854
y[1] (analytic) = 0
y[1] (numeric) = 1.1047879821395261853699387381287
absolute error = 1.1047879821395261853699387381287
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.855
y[1] (analytic) = 0
y[1] (numeric) = 1.1054696724119170868086645362089
absolute error = 1.1054696724119170868086645362089
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.856
y[1] (analytic) = 0
y[1] (numeric) = 1.1061516340365789151679473520702
absolute error = 1.1061516340365789151679473520702
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.857
y[1] (analytic) = 0
y[1] (numeric) = 1.1068338672103058229046437620657
absolute error = 1.1068338672103058229046437620657
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.858
y[1] (analytic) = 0
y[1] (numeric) = 1.107516372129464797380419409973
absolute error = 1.107516372129464797380419409973
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.859
y[1] (analytic) = 0
y[1] (numeric) = 1.1081991489899951242052443647487
absolute error = 1.1081991489899951242052443647487
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=778.2MB, alloc=4.6MB, time=81.48
x[1] = 1.86
y[1] (analytic) = 0
y[1] (numeric) = 1.1088821979874078501617505508887
absolute error = 1.1088821979874078501617505508887
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.861
y[1] (analytic) = 0
y[1] (numeric) = 1.1095655193167852457150784629069
absolute error = 1.1095655193167852457150784629069
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.862
y[1] (analytic) = 0
y[1] (numeric) = 1.1102491131727802671128465349095
absolute error = 1.1102491131727802671128465349095
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.863
y[1] (analytic) = 0
y[1] (numeric) = 1.1109329797496160180798826855013
absolute error = 1.1109329797496160180798826855013
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.864
y[1] (analytic) = 0
y[1] (numeric) = 1.1116171192410852111123636971659
absolute error = 1.1116171192410852111123636971659
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.865
y[1] (analytic) = 0
y[1] (numeric) = 1.1123015318405496283760142176819
absolute error = 1.1123015318405496283760142176819
relative error = -1 %
Correct digits = -1
h = 0.001
NO POLE
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.866
y[1] (analytic) = 0
y[1] (numeric) = 1.1129862177409395822130232889328
absolute error = 1.1129862177409395822130232889328
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.169
Order of pole = 0.07223
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.867
y[1] (analytic) = 0
y[1] (numeric) = 1.1136711771347533752623424154943
absolute error = 1.1136711771347533752623424154943
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.191
Order of pole = 0.2387
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.868
y[1] (analytic) = 0
y[1] (numeric) = 1.1143564102140567601980352815108
absolute error = 1.1143564102140567601980352815108
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.214
Order of pole = 0.4071
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=782.0MB, alloc=4.6MB, time=81.86
x[1] = 1.869
y[1] (analytic) = 0
y[1] (numeric) = 1.1150419171704823990903553094547
absolute error = 1.1150419171704823990903553094547
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.236
Order of pole = 0.5775
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.87
y[1] (analytic) = 0
y[1] (numeric) = 1.1157276981952293223942333282636
absolute error = 1.1157276981952293223942333282636
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.258
Order of pole = 0.7499
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.871
y[1] (analytic) = 0
y[1] (numeric) = 1.1164137534790623875698636809345
absolute error = 1.1164137534790623875698636809345
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.281
Order of pole = 0.9243
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.872
y[1] (analytic) = 0
y[1] (numeric) = 1.1171000832123117373400831527742
absolute error = 1.1171000832123117373400831527742
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.303
Order of pole = 1.101
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.873
y[1] (analytic) = 0
y[1] (numeric) = 1.1177866875848722575892431410332
absolute error = 1.1177866875848722575892431410332
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.326
Order of pole = 1.279
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.874
y[1] (analytic) = 0
y[1] (numeric) = 1.1184735667862030349082815144353
absolute error = 1.1184735667862030349082815144353
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.348
Order of pole = 1.459
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.875
y[1] (analytic) = 0
y[1] (numeric) = 1.1191607210053268137907066270288
absolute error = 1.1191607210053268137907066270288
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.371
Order of pole = 1.642
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.876
y[1] (analytic) = 0
y[1] (numeric) = 1.1198481504308294534842119546812
absolute error = 1.1198481504308294534842119546812
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.394
Order of pole = 1.826
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.877
y[1] (analytic) = 0
y[1] (numeric) = 1.1205358552508593845026458142797
absolute error = 1.1205358552508593845026458142797
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.417
Order of pole = 2.012
TOP MAIN SOLVE Loop
memory used=785.8MB, alloc=4.6MB, time=82.24
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.878
y[1] (analytic) = 0
y[1] (numeric) = 1.1212238356531270648030666051495
absolute error = 1.1212238356531270648030666051495
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.44
Order of pole = 2.2
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.879
y[1] (analytic) = 0
y[1] (numeric) = 1.1219120918249044356326199792154
absolute error = 1.1219120918249044356326199792154
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.463
Order of pole = 2.39
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.88
y[1] (analytic) = 0
y[1] (numeric) = 1.1226006239530243770499803008746
absolute error = 1.1226006239530243770499803008746
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.487
Order of pole = 2.582
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.881
y[1] (analytic) = 0
y[1] (numeric) = 1.1232894322238801631261046992781
absolute error = 1.1232894322238801631261046992781
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.51
Order of pole = 2.775
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.882
y[1] (analytic) = 0
y[1] (numeric) = 1.1239785168234249168290539445984
absolute error = 1.1239785168234249168290539445984
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.533
Order of pole = 2.971
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.883
y[1] (analytic) = 0
y[1] (numeric) = 1.1246678779371710645976402957473
absolute error = 1.1246678779371710645976402957473
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.556
Order of pole = 3.168
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.884
y[1] (analytic) = 0
y[1] (numeric) = 1.1253575157501897906086683697649
absolute error = 1.1253575157501897906086683697649
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.58
Order of pole = 3.367
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.885
y[1] (analytic) = 0
y[1] (numeric) = 1.1260474304471104907425409725898
absolute error = 1.1260474304471104907425409725898
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.603
Order of pole = 3.568
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=789.6MB, alloc=4.6MB, time=82.62
x[1] = 1.886
y[1] (analytic) = 0
y[1] (numeric) = 1.1267376222121202262520077069962
absolute error = 1.1267376222121202262520077069962
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.627
Order of pole = 3.771
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.887
y[1] (analytic) = 0
y[1] (numeric) = 1.1274280912289631771388400360128
absolute error = 1.1274280912289631771388400360128
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.65
Order of pole = 3.975
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.888
y[1] (analytic) = 0
y[1] (numeric) = 1.1281188376809400952432223289778
absolute error = 1.1281188376809400952432223289778
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.674
Order of pole = 4.181
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.889
y[1] (analytic) = 0
y[1] (numeric) = 1.128809861750907757050654252394
absolute error = 1.128809861750907757050654252394
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.698
Order of pole = 4.389
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.89
y[1] (analytic) = 0
y[1] (numeric) = 1.1295011636212784162211656887915
absolute error = 1.1295011636212784162211656887915
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.721
Order of pole = 4.598
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.891
y[1] (analytic) = 0
y[1] (numeric) = 1.130192743474019255845651173738
absolute error = 1.130192743474019255845651173738
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.745
Order of pole = 4.809
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.892
y[1] (analytic) = 0
y[1] (numeric) = 1.1308846014906518404341366338236
absolute error = 1.1308846014906518404341366338236
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.769
Order of pole = 5.021
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.893
y[1] (analytic) = 0
y[1] (numeric) = 1.1315767378522515676407969867451
absolute error = 1.1315767378522515676407969867451
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.792
Order of pole = 5.235
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.894
y[1] (analytic) = 0
y[1] (numeric) = 1.1322691527394471197305489283841
absolute error = 1.1322691527394471197305489283841
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.816
Order of pole = 5.45
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=793.4MB, alloc=4.6MB, time=82.99
x[1] = 1.895
y[1] (analytic) = 0
y[1] (numeric) = 1.1329618463324199147920489808779
absolute error = 1.1329618463324199147920489808779
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.84
Order of pole = 5.666
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.896
y[1] (analytic) = 0
y[1] (numeric) = 1.1336548188109035577019326099754
absolute error = 1.1336548188109035577019326099754
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.863
Order of pole = 5.884
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.897
y[1] (analytic) = 0
y[1] (numeric) = 1.1343480703541832908451359393204
absolute error = 1.1343480703541832908451359393204
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.887
Order of pole = 6.103
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.898
y[1] (analytic) = 0
y[1] (numeric) = 1.135041601141095444596147293564
absolute error = 1.135041601141095444596147293564
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.911
Order of pole = 6.323
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.899
y[1] (analytic) = 0
y[1] (numeric) = 1.1357354113500268875660414912419
absolute error = 1.1357354113500268875660414912419
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.934
Order of pole = 6.545
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.9
y[1] (analytic) = 0
y[1] (numeric) = 1.136429501158914476620155482019
absolute error = 1.136429501158914476620155482019
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.958
Order of pole = 6.767
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.901
y[1] (analytic) = 0
y[1] (numeric) = 1.1371238707452445066712695810622
absolute error = 1.1371238707452445066712695810622
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.981
Order of pole = 6.99
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.902
y[1] (analytic) = 0
y[1] (numeric) = 1.1378185202860521602531641958157
absolute error = 1.1378185202860521602531641958157
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.005
Order of pole = 7.215
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.903
y[1] (analytic) = 0
y[1] (numeric) = 1.1385134499579209568794275671771
absolute error = 1.1385134499579209568794275671771
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.028
Order of pole = 7.44
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=797.3MB, alloc=4.6MB, time=83.38
x[1] = 1.904
y[1] (analytic) = 0
y[1] (numeric) = 1.1392086599369822021923956578706
absolute error = 1.1392086599369822021923956578706
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.052
Order of pole = 7.666
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.905
y[1] (analytic) = 0
y[1] (numeric) = 1.1399041503989144369071109155449
absolute error = 1.1399041503989144369071109155449
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.075
Order of pole = 7.892
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.906
y[1] (analytic) = 0
y[1] (numeric) = 1.1405999215189428855551922166475
absolute error = 1.1405999215189428855551922166475
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.098
Order of pole = 8.119
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.907
y[1] (analytic) = 0
y[1] (numeric) = 1.1412959734718389050335138593027
absolute error = 1.1412959734718389050335138593027
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.121
Order of pole = 8.347
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.908
y[1] (analytic) = 0
y[1] (numeric) = 1.141992306431919432962597019111
absolute error = 1.141992306431919432962597019111
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.144
Order of pole = 8.575
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.909
y[1] (analytic) = 0
y[1] (numeric) = 1.1426889205730464358596226108506
absolute error = 1.1426889205730464358596226108506
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.167
Order of pole = 8.804
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.91
y[1] (analytic) = 0
y[1] (numeric) = 1.143385816068626357130980011355
absolute error = 1.143385816068626357130980011355
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.19
Order of pole = 9.033
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.911
y[1] (analytic) = 0
y[1] (numeric) = 1.1440829930916095648892715942321
absolute error = 1.1440829930916095648892715942321
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.213
Order of pole = 9.262
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.912
y[1] (analytic) = 0
y[1] (numeric) = 1.1447804518144897995996985054292
absolute error = 1.1447804518144897995996985054292
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.236
Order of pole = 9.491
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=801.1MB, alloc=4.6MB, time=83.76
x[1] = 1.913
y[1] (analytic) = 0
y[1] (numeric) = 1.1454781924093036215607585698029
absolute error = 1.1454781924093036215607585698029
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.258
Order of pole = 9.72
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.914
y[1] (analytic) = 0
y[1] (numeric) = 1.1461762150476298582241926626813
absolute error = 1.1461762150476298582241926626813
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.28
Order of pole = 9.949
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.915
y[1] (analytic) = 0
y[1] (numeric) = 1.1468745199005890513591213067645
absolute error = 1.1468745199005890513591213067645
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.303
Order of pole = 10.18
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.916
y[1] (analytic) = 0
y[1] (numeric) = 1.1475731071388429040653186634648
absolute error = 1.1475731071388429040653186634648
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.325
Order of pole = 10.41
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.917
y[1] (analytic) = 0
y[1] (numeric) = 1.1482719769325937276405764787922
absolute error = 1.1482719769325937276405764787922
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.347
Order of pole = 10.64
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.918
y[1] (analytic) = 0
y[1] (numeric) = 1.1489711294515838883071159170132
absolute error = 1.1489711294515838883071159170132
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.368
Order of pole = 10.86
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.919
y[1] (analytic) = 0
y[1] (numeric) = 1.1496705648650952538020105704016
absolute error = 1.1496705648650952538020105704016
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.39
Order of pole = 11.09
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.92
y[1] (analytic) = 0
y[1] (numeric) = 1.1503702833419486398365892703299
absolute error = 1.1503702833419486398365892703299
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.411
Order of pole = 11.32
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.921
y[1] (analytic) = 0
y[1] (numeric) = 1.1510702850505032564297926435667
absolute error = 1.1510702850505032564297926435667
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.433
Order of pole = 11.54
memory used=804.9MB, alloc=4.6MB, time=84.13
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.922
y[1] (analytic) = 0
y[1] (numeric) = 1.1517705701586561541204626578231
absolute error = 1.1517705701586561541204626578231
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.454
Order of pole = 11.77
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.923
y[1] (analytic) = 0
y[1] (numeric) = 1.1524711388338416700635496821779
absolute error = 1.1524711388338416700635496821779
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.475
Order of pole = 11.99
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.924
y[1] (analytic) = 0
y[1] (numeric) = 1.153171991243030874015226850875
absolute error = 1.153171991243030874015226850875
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.495
Order of pole = 12.21
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.925
y[1] (analytic) = 0
y[1] (numeric) = 1.1538731275527310142119067629824
absolute error = 1.1538731275527310142119067629824
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.516
Order of pole = 12.43
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.926
y[1] (analytic) = 0
y[1] (numeric) = 1.154574547928984963148160775397
absolute error = 1.154574547928984963148160775397
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.536
Order of pole = 12.65
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.927
y[1] (analytic) = 0
y[1] (numeric) = 1.1552762525373706632585463525244
absolute error = 1.1552762525373706632585463525244
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.556
Order of pole = 12.87
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.928
y[1] (analytic) = 0
y[1] (numeric) = 1.1559782415430005725083531225276
absolute error = 1.1559782415430005725083531225276
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.576
Order of pole = 13.09
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.929
y[1] (analytic) = 0
y[1] (numeric) = 1.1566805151105211098982834571777
absolute error = 1.1566805151105211098982834571777
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.595
Order of pole = 13.3
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=808.7MB, alloc=4.6MB, time=84.51
x[1] = 1.93
y[1] (analytic) = 0
y[1] (numeric) = 1.1573830734041121008880885399148
absolute error = 1.1573830734041121008880885399148
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.614
Order of pole = 13.52
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.931
y[1] (analytic) = 0
y[1] (numeric) = 1.1580859165874862227441860145998
absolute error = 1.1580859165874862227441860145998
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.633
Order of pole = 13.73
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.932
y[1] (analytic) = 0
y[1] (numeric) = 1.1587890448238884498162904154696
absolute error = 1.1587890448238884498162904154696
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.652
Order of pole = 13.94
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.933
y[1] (analytic) = 0
y[1] (numeric) = 1.1594924582760954987480926668542
absolute error = 1.1594924582760954987480926668542
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.67
Order of pole = 14.15
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.934
y[1] (analytic) = 0
y[1] (numeric) = 1.1601961571064152736270300091434
absolute error = 1.1601961571064152736270300091434
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.688
Order of pole = 14.35
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.935
y[1] (analytic) = 0
y[1] (numeric) = 1.1609001414766863110781927551554
absolute error = 1.1609001414766863110781927551554
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.706
Order of pole = 14.55
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.936
y[1] (analytic) = 0
y[1] (numeric) = 1.1616044115482772253074193083277
absolute error = 1.1616044115482772253074193083277
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.724
Order of pole = 14.75
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.937
y[1] (analytic) = 0
y[1] (numeric) = 1.1623089674820861530986358808768
absolute error = 1.1623089674820861530986358808768
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.741
Order of pole = 14.95
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.938
y[1] (analytic) = 0
y[1] (numeric) = 1.1630138094385401987705023361241
absolute error = 1.1630138094385401987705023361241
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.758
Order of pole = 15.15
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=812.5MB, alloc=4.6MB, time=84.89
x[1] = 1.939
y[1] (analytic) = 0
y[1] (numeric) = 1.1637189375775948790974305444153
absolute error = 1.1637189375775948790974305444153
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.775
Order of pole = 15.34
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.94
y[1] (analytic) = 0
y[1] (numeric) = 1.1644243520587335682000465863376
absolute error = 1.1644243520587335682000465863376
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.791
Order of pole = 15.53
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.941
y[1] (analytic) = 0
y[1] (numeric) = 1.1651300530409669424101730601186
absolute error = 1.1651300530409669424101730601186
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.807
Order of pole = 15.72
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.942
y[1] (analytic) = 0
y[1] (numeric) = 1.1658360406828324251154126520366
absolute error = 1.1658360406828324251154126520366
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.823
Order of pole = 15.9
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.943
y[1] (analytic) = 0
y[1] (numeric) = 1.1665423151423936315884190092443
absolute error = 1.1665423151423936315884190092443
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.839
Order of pole = 16.08
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.944
y[1] (analytic) = 0
y[1] (numeric) = 1.1672488765772398138059458134695
absolute error = 1.1672488765772398138059458134695
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.854
Order of pole = 16.26
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.945
y[1] (analytic) = 0
y[1] (numeric) = 1.1679557251444853052627697914647
absolute error = 1.1679557251444853052627697914647
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.868
Order of pole = 16.43
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.946
y[1] (analytic) = 0
y[1] (numeric) = 1.1686628610007689657855882137004
absolute error = 1.1686628610007689657855882137004
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.883
Order of pole = 16.6
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.947
y[1] (analytic) = 0
y[1] (numeric) = 1.1693702843022536263519962264875
absolute error = 1.1693702843022536263519962264875
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.897
Order of pole = 16.77
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=816.3MB, alloc=4.6MB, time=85.29
x[1] = 1.948
y[1] (analytic) = 0
y[1] (numeric) = 1.1700779952046255339196541343415
absolute error = 1.1700779952046255339196541343415
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.911
Order of pole = 16.93
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.949
y[1] (analytic) = 0
y[1] (numeric) = 1.1707859938630937962707594988227
absolute error = 1.1707859938630937962707594988227
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.924
Order of pole = 17.09
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.95
y[1] (analytic) = 0
y[1] (numeric) = 1.1714942804323898268769436471642
absolute error = 1.1714942804323898268769436471642
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.937
Order of pole = 17.25
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.951
y[1] (analytic) = 0
y[1] (numeric) = 1.1722028550667667897897168885968
absolute error = 1.1722028550667667897897168885968
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.95
Order of pole = 17.4
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.952
y[1] (analytic) = 0
y[1] (numeric) = 1.1729117179199990445615914182563
absolute error = 1.1729117179199990445615914182563
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.962
Order of pole = 17.55
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.953
y[1] (analytic) = 0
y[1] (numeric) = 1.1736208691453815912030155477788
absolute error = 1.1736208691453815912030155477788
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.974
Order of pole = 17.7
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.954
y[1] (analytic) = 0
y[1] (numeric) = 1.1743303088957295151802575380116
absolute error = 1.1743303088957295151802575380116
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.986
Order of pole = 17.84
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.955
y[1] (analytic) = 0
y[1] (numeric) = 1.1750400373233774324593819225586
absolute error = 1.1750400373233774324593819225586
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.997
Order of pole = 17.98
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.956
y[1] (analytic) = 0
y[1] (numeric) = 1.1757500545801789346014658009958
absolute error = 1.1757500545801789346014658009958
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.008
Order of pole = 18.11
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=820.1MB, alloc=4.6MB, time=85.68
x[1] = 1.957
y[1] (analytic) = 0
y[1] (numeric) = 1.1764603608175060339142071474023
absolute error = 1.1764603608175060339142071474023
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.018
Order of pole = 18.24
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.958
y[1] (analytic) = 0
y[1] (numeric) = 1.1771709561862486086650817232128
absolute error = 1.1771709561862486086650817232128
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.028
Order of pole = 18.36
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.959
y[1] (analytic) = 0
y[1] (numeric) = 1.1778818408368138483612097031758
absolute error = 1.1778818408368138483612097031758
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.038
Order of pole = 18.49
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.96
y[1] (analytic) = 0
y[1] (numeric) = 1.1785930149191256991010976192562
absolute error = 1.1785930149191256991010976192562
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.048
Order of pole = 18.6
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.961
y[1] (analytic) = 0
y[1] (numeric) = 1.1793044785826243090034256995171
absolute error = 1.1793044785826243090034256995171
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.057
Order of pole = 18.72
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.962
y[1] (analytic) = 0
y[1] (numeric) = 1.1800162319762654737180551272139
absolute error = 1.1800162319762654737180551272139
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.065
Order of pole = 18.82
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.963
y[1] (analytic) = 0
y[1] (numeric) = 1.1807282752485200820244341694006
absolute error = 1.1807282752485200820244341694006
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.074
Order of pole = 18.93
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.964
y[1] (analytic) = 0
y[1] (numeric) = 1.181440608547373561522586524141
absolute error = 1.181440608547373561522586524141
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.082
Order of pole = 19.03
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.965
y[1] (analytic) = 0
y[1] (numeric) = 1.1821532320203253244218696108051
absolute error = 1.1821532320203253244218696108051
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.089
Order of pole = 19.13
memory used=824.0MB, alloc=4.6MB, time=86.07
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.966
y[1] (analytic) = 0
y[1] (numeric) = 1.1828661458143882134326948787725
absolute error = 1.1828661458143882134326948787725
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.097
Order of pole = 19.22
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.967
y[1] (analytic) = 0
y[1] (numeric) = 1.1835793500760879477664065360255
absolute error = 1.1835793500760879477664065360255
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.104
Order of pole = 19.31
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.968
y[1] (analytic) = 0
y[1] (numeric) = 1.1842928449514625692485194004572
absolute error = 1.1842928449514625692485194004572
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.11
Order of pole = 19.39
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.969
y[1] (analytic) = 0
y[1] (numeric) = 1.1850066305860618885505208531082
absolute error = 1.1850066305860618885505208531082
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.116
Order of pole = 19.47
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.97
y[1] (analytic) = 0
y[1] (numeric) = 1.1857207071249469315454461238418
absolute error = 1.1857207071249469315454461238418
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.122
Order of pole = 19.54
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.971
y[1] (analytic) = 0
y[1] (numeric) = 1.1864350747126893857924403660404
absolute error = 1.1864350747126893857924403660404
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.128
Order of pole = 19.62
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.972
y[1] (analytic) = 0
y[1] (numeric) = 1.1871497334933710471555251776099
absolute error = 1.1871497334933710471555251776099
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.133
Order of pole = 19.68
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.973
y[1] (analytic) = 0
y[1] (numeric) = 1.1878646836105832665617914007883
absolute error = 1.1878646836105832665617914007883
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.138
Order of pole = 19.75
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=827.8MB, alloc=4.6MB, time=86.46
x[1] = 1.974
y[1] (analytic) = 0
y[1] (numeric) = 1.1885799252074263969042441828286
absolute error = 1.1885799252074263969042441828286
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.142
Order of pole = 19.8
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.975
y[1] (analytic) = 0
y[1] (numeric) = 1.1892954584265092400945304034252
absolute error = 1.1892954584265092400945304034252
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.146
Order of pole = 19.86
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.976
y[1] (analytic) = 0
y[1] (numeric) = 1.1900112834099484942707826726508
absolute error = 1.1900112834099484942707826726508
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.15
Order of pole = 19.91
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.977
y[1] (analytic) = 0
y[1] (numeric) = 1.1907274002993682011658181750241
absolute error = 1.1907274002993682011658181750241
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.154
Order of pole = 19.96
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.978
y[1] (analytic) = 0
y[1] (numeric) = 1.1914438092358991936409346810032
absolute error = 1.1914438092358991936409346810032
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.157
Order of pole = 20
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.979
y[1] (analytic) = 0
y[1] (numeric) = 1.1921605103601785433905500665661
absolute error = 1.1921605103601785433905500665661
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.16
Order of pole = 20.04
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.98
y[1] (analytic) = 0
y[1] (numeric) = 1.1928775038123490088229356744526
absolute error = 1.1928775038123490088229356744526
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.162
Order of pole = 20.07
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.981
y[1] (analytic) = 0
y[1] (numeric) = 1.1935947897320584831222978169787
absolute error = 1.1935947897320584831222978169787
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.164
Order of pole = 20.1
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.982
y[1] (analytic) = 0
y[1] (numeric) = 1.1943123682584594424974656599491
absolute error = 1.1943123682584594424974656599491
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.166
Order of pole = 20.13
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=831.6MB, alloc=4.6MB, time=86.84
x[1] = 1.983
y[1] (analytic) = 0
y[1] (numeric) = 1.1950302395302083946224476399579
absolute error = 1.1950302395302083946224476399579
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.168
Order of pole = 20.16
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.984
y[1] (analytic) = 0
y[1] (numeric) = 1.1957484036854653272741224531464
absolute error = 1.1957484036854653272741224531464
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.169
Order of pole = 20.18
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.985
y[1] (analytic) = 0
y[1] (numeric) = 1.1964668608618931571723345121434
absolute error = 1.1964668608618931571723345121434
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.17
Order of pole = 20.19
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.986
y[1] (analytic) = 0
y[1] (numeric) = 1.1971856111966571790276675993164
absolute error = 1.1971856111966571790276675993164
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.171
Order of pole = 20.2
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.987
y[1] (analytic) = 0
y[1] (numeric) = 1.1979046548264245148021742484739
absolute error = 1.1979046548264245148021742484739
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.172
Order of pole = 20.21
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.988
y[1] (analytic) = 0
y[1] (numeric) = 1.1986239918873635631883421636507
absolute error = 1.1986239918873635631883421636507
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.172
Order of pole = 20.22
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.989
y[1] (analytic) = 0
y[1] (numeric) = 1.1993436225151434493115827324415
absolute error = 1.1993436225151434493115827324415
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.172
Order of pole = 20.22
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.99
y[1] (analytic) = 0
y[1] (numeric) = 1.2000635468449334746615304123902
absolute error = 1.2000635468449334746615304123902
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.171
Order of pole = 20.22
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.991
y[1] (analytic) = 0
y[1] (numeric) = 1.2007837650114025672574454620647
absolute error = 1.2007837650114025672574454620647
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.171
Order of pole = 20.22
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=835.4MB, alloc=4.6MB, time=87.24
x[1] = 1.992
y[1] (analytic) = 0
y[1] (numeric) = 1.201504277148718732053016153507
absolute error = 1.201504277148718732053016153507
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.17
Order of pole = 20.21
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.993
y[1] (analytic) = 0
y[1] (numeric) = 1.202225083390548501585860239624
absolute error = 1.202225083390548501585860239624
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.169
Order of pole = 20.2
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.994
y[1] (analytic) = 0
y[1] (numeric) = 1.2029461838700563868770290586335
absolute error = 1.2029461838700563868770290586335
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.167
Order of pole = 20.19
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.995
y[1] (analytic) = 0
y[1] (numeric) = 1.2036675787199043285858212377748
absolute error = 1.2036675787199043285858212377748
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.166
Order of pole = 20.17
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.996
y[1] (analytic) = 0
y[1] (numeric) = 1.2043892680722511484252165099998
absolute error = 1.2043892680722511484252165099998
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.164
Order of pole = 20.15
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.997
y[1] (analytic) = 0
y[1] (numeric) = 1.205111252058752000843243680147
absolute error = 1.205111252058752000843243680147
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.162
Order of pole = 20.13
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.998
y[1] (analytic) = 0
y[1] (numeric) = 1.205833530810557824975600271034
absolute error = 1.205833530810557824975600271034
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.16
Order of pole = 20.11
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 1.999
y[1] (analytic) = 0
y[1] (numeric) = 1.2065561044583147968748448448529
absolute error = 1.2065561044583147968748448448529
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.157
Order of pole = 20.08
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2
y[1] (analytic) = 0
y[1] (numeric) = 1.2072789731321637820214864310851
absolute error = 1.2072789731321637820214864310851
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.154
Order of pole = 20.05
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=839.2MB, alloc=4.6MB, time=87.63
x[1] = 2.001
y[1] (analytic) = 0
y[1] (numeric) = 1.2080021369617397881222988987354
absolute error = 1.2080021369617397881222988987354
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.151
Order of pole = 20.02
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.002
y[1] (analytic) = 0
y[1] (numeric) = 1.2087255960761714182011914878914
absolute error = 1.2087255960761714182011914878914
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.148
Order of pole = 19.98
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.003
y[1] (analytic) = 0
y[1] (numeric) = 1.2094493506040803239879700633044
absolute error = 1.2094493506040803239879700633044
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.145
Order of pole = 19.94
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.004
y[1] (analytic) = 0
y[1] (numeric) = 1.2101734006735806596103269707421
absolute error = 1.2101734006735806596103269707421
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.142
Order of pole = 19.9
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.005
y[1] (analytic) = 0
y[1] (numeric) = 1.2108977464122785355944006651394
absolute error = 1.2108977464122785355944006651394
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.138
Order of pole = 19.86
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.006
y[1] (analytic) = 0
y[1] (numeric) = 1.21162238794727147317924953795
absolute error = 1.21162238794727147317924953795
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.134
Order of pole = 19.82
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.007
y[1] (analytic) = 0
y[1] (numeric) = 1.2123473254051478589505875994394
absolute error = 1.2123473254051478589505875994394
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.13
Order of pole = 19.77
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.008
y[1] (analytic) = 0
y[1] (numeric) = 1.2130725589119863997991328698383
absolute error = 1.2130725589119863997991328698383
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.126
Order of pole = 19.72
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.009
y[1] (analytic) = 0
y[1] (numeric) = 1.213798088593355578208922501154
absolute error = 1.213798088593355578208922501154
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.121
Order of pole = 19.67
memory used=843.0MB, alloc=4.6MB, time=88.02
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.01
y[1] (analytic) = 0
y[1] (numeric) = 1.2145239145743131078809517888962
absolute error = 1.2145239145743131078809517888962
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.117
Order of pole = 19.62
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.011
y[1] (analytic) = 0
y[1] (numeric) = 1.2152500369794053896974973398744
absolute error = 1.2152500369794053896974973398744
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.112
Order of pole = 19.57
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.012
y[1] (analytic) = 0
y[1] (numeric) = 1.2159764559326669680324877384432
absolute error = 1.2159764559326669680324877384432
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.107
Order of pole = 19.51
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.013
y[1] (analytic) = 0
y[1] (numeric) = 1.2167031715576199874132880989785
absolute error = 1.2167031715576199874132880989785
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.102
Order of pole = 19.46
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.014
y[1] (analytic) = 0
y[1] (numeric) = 1.2174301839772736495392679068287
absolute error = 1.2174301839772736495392679068287
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.097
Order of pole = 19.4
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.015
y[1] (analytic) = 0
y[1] (numeric) = 1.2181574933141236706625245333804
absolute error = 1.2181574933141236706625245333804
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.092
Order of pole = 19.34
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.016
y[1] (analytic) = 0
y[1] (numeric) = 1.2188850996901517393361377630699
absolute error = 1.2188850996901517393361377630699
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.087
Order of pole = 19.27
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.017
y[1] (analytic) = 0
y[1] (numeric) = 1.2196130032268249745353335910357
absolute error = 1.2196130032268249745353335910357
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.081
Order of pole = 19.21
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=846.8MB, alloc=4.6MB, time=88.39
x[1] = 2.018
y[1] (analytic) = 0
y[1] (numeric) = 1.2203412040450953841569384395192
absolute error = 1.2203412040450953841569384395192
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.076
Order of pole = 19.15
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.019
y[1] (analytic) = 0
y[1] (numeric) = 1.2210697022653993239025077989421
absolute error = 1.2210697022653993239025077989421
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.07
Order of pole = 19.08
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.02
y[1] (analytic) = 0
y[1] (numeric) = 1.2217984980076569565505161257043
absolute error = 1.2217984980076569565505161257043
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.064
Order of pole = 19.01
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.021
y[1] (analytic) = 0
y[1] (numeric) = 1.2225275913912717116229976230188
absolute error = 1.2225275913912717116229976230188
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.058
Order of pole = 18.94
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.022
y[1] (analytic) = 0
y[1] (numeric) = 1.2232569825351297454520302934061
absolute error = 1.2232569825351297454520302934061
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.052
Order of pole = 18.87
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.023
y[1] (analytic) = 0
y[1] (numeric) = 1.223986671557599401651458381685
absolute error = 1.223986671557599401651458381685
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.046
Order of pole = 18.8
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.024
y[1] (analytic) = 0
y[1] (numeric) = 1.2247166585765306719992510252875
absolute error = 1.2247166585765306719992510252875
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.04
Order of pole = 18.73
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.025
y[1] (analytic) = 0
y[1] (numeric) = 1.2254469437092546577358975943724
absolute error = 1.2254469437092546577358975943724
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.034
Order of pole = 18.66
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.026
y[1] (analytic) = 0
y[1] (numeric) = 1.2261775270725830312842428373818
absolute error = 1.2261775270725830312842428373818
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.027
Order of pole = 18.58
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=850.7MB, alloc=4.6MB, time=88.76
x[1] = 2.027
y[1] (analytic) = 0
y[1] (numeric) = 1.2269084087828074983961675482594
absolute error = 1.2269084087828074983961675482594
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.021
Order of pole = 18.51
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.028
y[1] (analytic) = 0
y[1] (numeric) = 1.227639588955699260731523039393
absolute error = 1.227639588955699260731523039393
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.014
Order of pole = 18.43
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.029
y[1] (analytic) = 0
y[1] (numeric) = 1.2283710677065084788747302393418
absolute error = 1.2283710677065084788747302393418
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.008
Order of pole = 18.36
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.03
y[1] (analytic) = 0
y[1] (numeric) = 1.2291028451499637357944567364265
absolute error = 1.2291028451499637357944567364265
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 5.001
Order of pole = 18.28
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.031
y[1] (analytic) = 0
y[1] (numeric) = 1.2298349214002715007517875581784
absolute error = 1.2298349214002715007517875581784
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.994
Order of pole = 18.2
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.032
y[1] (analytic) = 0
y[1] (numeric) = 1.2305672965711155936623079123337
absolute error = 1.2305672965711155936623079123337
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.988
Order of pole = 18.13
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.033
y[1] (analytic) = 0
y[1] (numeric) = 1.2312999707756566499175185174003
absolute error = 1.2312999707756566499175185174003
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.981
Order of pole = 18.05
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.034
y[1] (analytic) = 0
y[1] (numeric) = 1.2320329441265315856710065196883
absolute error = 1.2320329441265315856710065196883
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.974
Order of pole = 17.97
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.035
y[1] (analytic) = 0
y[1] (numeric) = 1.23276621673585306359479732896
absolute error = 1.23276621673585306359479732896
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.967
Order of pole = 17.89
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=854.5MB, alloc=4.6MB, time=89.15
x[1] = 2.036
y[1] (analytic) = 0
y[1] (numeric) = 1.2334997887152089591113150063978
absolute error = 1.2334997887152089591113150063978
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.96
Order of pole = 17.81
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.037
y[1] (analytic) = 0
y[1] (numeric) = 1.2342336601756618271063811062823
absolute error = 1.2342336601756618271063811062823
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.953
Order of pole = 17.73
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.038
y[1] (analytic) = 0
y[1] (numeric) = 1.2349678312277483691286841064975
absolute error = 1.2349678312277483691286841064975
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.946
Order of pole = 17.65
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.039
y[1] (analytic) = 0
y[1] (numeric) = 1.2357023019814789010811537626127
absolute error = 1.2357023019814789010811537626127
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.939
Order of pole = 17.56
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.04
y[1] (analytic) = 0
y[1] (numeric) = 1.2364370725463368214096768857034
absolute error = 1.2364370725463368214096768857034
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.932
Order of pole = 17.48
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.041
y[1] (analytic) = 0
y[1] (numeric) = 1.2371721430312780797945931751528
absolute error = 1.2371721430312780797945931751528
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.925
Order of pole = 17.4
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.042
y[1] (analytic) = 0
y[1] (numeric) = 1.2379075135447306463504118342903
absolute error = 1.2379075135447306463504118342903
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.917
Order of pole = 17.32
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.043
y[1] (analytic) = 0
y[1] (numeric) = 1.2386431841945939813391917587575
absolute error = 1.2386431841945939813391917587575
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.91
Order of pole = 17.24
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.044
y[1] (analytic) = 0
y[1] (numeric) = 1.2393791550882385054030301148203
absolute error = 1.2393791550882385054030301148203
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.903
Order of pole = 17.15
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=858.3MB, alloc=4.6MB, time=89.53
x[1] = 2.045
y[1] (analytic) = 0
y[1] (numeric) = 1.2401154263325050703211061173511
absolute error = 1.2401154263325050703211061173511
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.896
Order of pole = 17.07
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.046
y[1] (analytic) = 0
y[1] (numeric) = 1.24085199803370443029672877476
absolute error = 1.24085199803370443029672877476
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.888
Order of pole = 16.99
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.047
y[1] (analytic) = 0
y[1] (numeric) = 1.2415888702976167137798392906436
absolute error = 1.2415888702976167137798392906436
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.881
Order of pole = 16.91
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.048
y[1] (analytic) = 0
y[1] (numeric) = 1.2423260432294908958304206992221
absolute error = 1.2423260432294908958304206992221
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.874
Order of pole = 16.82
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.049
y[1] (analytic) = 0
y[1] (numeric) = 1.2430635169340442710282691636266
absolute error = 1.2430635169340442710282691636266
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.867
Order of pole = 16.74
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.05
y[1] (analytic) = 0
y[1] (numeric) = 1.2438012915154619269345831826642
absolute error = 1.2438012915154619269345831826642
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.859
Order of pole = 16.66
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.051
y[1] (analytic) = 0
y[1] (numeric) = 1.2445393670773962181108287327046
absolute error = 1.2445393670773962181108287327046
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.852
Order of pole = 16.57
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.052
y[1] (analytic) = 0
y[1] (numeric) = 1.2452777437229662407003401166817
absolute error = 1.2452777437229662407003401166817
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.845
Order of pole = 16.49
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.053
y[1] (analytic) = 0
y[1] (numeric) = 1.2460164215547573075781180017661
absolute error = 1.2460164215547573075781180017661
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.837
Order of pole = 16.41
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=862.1MB, alloc=4.6MB, time=89.91
x[1] = 2.054
y[1] (analytic) = 0
y[1] (numeric) = 1.2467554006748204240742878009236
absolute error = 1.2467554006748204240742878009236
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.83
Order of pole = 16.33
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.055
y[1] (analytic) = 0
y[1] (numeric) = 1.2474946811846717642766831912093
absolute error = 1.2474946811846717642766831912093
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.823
Order of pole = 16.24
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.056
y[1] (analytic) = 0
y[1] (numeric) = 1.2482342631852921479180211631394
absolute error = 1.2482342631852921479180211631394
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.815
Order of pole = 16.16
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.057
y[1] (analytic) = 0
y[1] (numeric) = 1.2489741467771265178531365607175
absolute error = 1.2489741467771265178531365607175
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.808
Order of pole = 16.08
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.058
y[1] (analytic) = 0
y[1] (numeric) = 1.2497143320600834181317456005486
absolute error = 1.2497143320600834181317456005486
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.801
Order of pole = 16
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.059
y[1] (analytic) = 0
y[1] (numeric) = 1.2504548191335344726722093508378
absolute error = 1.2504548191335344726722093508378
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.794
Order of pole = 15.92
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.06
y[1] (analytic) = 0
y[1] (numeric) = 1.251195608096313864541769606821
absolute error = 1.251195608096313864541769606821
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.786
Order of pole = 15.84
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.061
y[1] (analytic) = 0
y[1] (numeric) = 1.2519366990467178158487310182017
absolute error = 1.2519366990467178158487310182017
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.779
Order of pole = 15.76
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.062
y[1] (analytic) = 0
y[1] (numeric) = 1.2526780920825040682520647063467
absolute error = 1.2526780920825040682520647063467
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.772
Order of pole = 15.67
memory used=865.9MB, alloc=4.6MB, time=90.29
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.063
y[1] (analytic) = 0
y[1] (numeric) = 1.2534197873008913640939099542157
absolute error = 1.2534197873008913640939099542157
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.765
Order of pole = 15.59
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.064
y[1] (analytic) = 0
y[1] (numeric) = 1.2541617847985589281604518601456
absolute error = 1.2541617847985589281604518601456
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.757
Order of pole = 15.51
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.065
y[1] (analytic) = 0
y[1] (numeric) = 1.2549040846716459500766541175659
absolute error = 1.2549040846716459500766541175659
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.75
Order of pole = 15.43
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.066
y[1] (analytic) = 0
y[1] (numeric) = 1.2556466870157510673403273163707
absolute error = 1.2556466870157510673403273163707
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.743
Order of pole = 15.35
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.067
y[1] (analytic) = 0
y[1] (numeric) = 1.2563895919259318490010143579037
absolute error = 1.2563895919259318490010143579037
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.736
Order of pole = 15.28
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.068
y[1] (analytic) = 0
y[1] (numeric) = 1.2571327994967042799891757342087
absolute error = 1.2571327994967042799891757342087
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.729
Order of pole = 15.2
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.069
y[1] (analytic) = 0
y[1] (numeric) = 1.2578763098220422461011585432439
absolute error = 1.2578763098220422461011585432439
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.722
Order of pole = 15.12
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.07
y[1] (analytic) = 0
y[1] (numeric) = 1.2586201229953770196454341950461
absolute error = 1.2586201229953770196454341950461
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.715
Order of pole = 15.04
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=869.7MB, alloc=4.6MB, time=90.67
x[1] = 2.071
y[1] (analytic) = 0
y[1] (numeric) = 1.2593642391095967457555908092396
absolute error = 1.2593642391095967457555908092396
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.707
Order of pole = 14.96
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.072
y[1] (analytic) = 0
y[1] (numeric) = 1.2601086582570459293755673117089
absolute error = 1.2601086582570459293755673117089
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.7
Order of pole = 14.88
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.073
y[1] (analytic) = 0
y[1] (numeric) = 1.2608533805295249229226172075757
absolute error = 1.2608533805295249229226172075757
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.693
Order of pole = 14.81
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.074
y[1] (analytic) = 0
y[1] (numeric) = 1.2615984060182894146334909387303
absolute error = 1.2615984060182894146334909387303
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.686
Order of pole = 14.73
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.075
y[1] (analytic) = 0
y[1] (numeric) = 1.2623437348140499175993266269526
absolute error = 1.2623437348140499175993266269526
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.68
Order of pole = 14.65
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.076
y[1] (analytic) = 0
y[1] (numeric) = 1.263089367006971259494739858006
absolute error = 1.263089367006971259494739858006
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.673
Order of pole = 14.58
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.077
y[1] (analytic) = 0
y[1] (numeric) = 1.2638353026866720730066039778903
absolute error = 1.2638353026866720730066039778903
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.666
Order of pole = 14.5
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.078
y[1] (analytic) = 0
y[1] (numeric) = 1.2645815419422242869680131495818
absolute error = 1.2645815419422242869680131495818
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.659
Order of pole = 14.43
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.079
y[1] (analytic) = 0
y[1] (numeric) = 1.2653280848621526182029211569652
absolute error = 1.2653280848621526182029211569652
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.652
Order of pole = 14.36
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=873.5MB, alloc=4.6MB, time=91.05
x[1] = 2.08
y[1] (analytic) = 0
y[1] (numeric) = 1.2660749315344340640869496421574
absolute error = 1.2660749315344340640869496421574
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.645
Order of pole = 14.28
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.081
y[1] (analytic) = 0
y[1] (numeric) = 1.2668220820464973958298601229311
absolute error = 1.2668220820464973958298601229311
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.639
Order of pole = 14.21
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.082
y[1] (analytic) = 0
y[1] (numeric) = 1.2675695364852226524851847583586
absolute error = 1.2675695364852226524851847583586
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.632
Order of pole = 14.14
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.083
y[1] (analytic) = 0
y[1] (numeric) = 1.268317294936940635692511412998
absolute error = 1.268317294936940635692511412998
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.625
Order of pole = 14.06
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.084
y[1] (analytic) = 0
y[1] (numeric) = 1.2690653574874324051579191128337
absolute error = 1.2690653574874324051579191128337
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.619
Order of pole = 13.99
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.085
y[1] (analytic) = 0
y[1] (numeric) = 1.2698137242219287748780604896489
absolute error = 1.2698137242219287748780604896489
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.612
Order of pole = 13.92
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.086
y[1] (analytic) = 0
y[1] (numeric) = 1.2705623952251098101133882744409
absolute error = 1.2705623952251098101133882744409
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.605
Order of pole = 13.85
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.087
y[1] (analytic) = 0
y[1] (numeric) = 1.2713113705811043251160233247855
absolute error = 1.2713113705811043251160233247855
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.599
Order of pole = 13.78
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.088
y[1] (analytic) = 0
y[1] (numeric) = 1.2720606503734893816177620556068
absolute error = 1.2720606503734893816177620556068
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.592
Order of pole = 13.71
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=877.4MB, alloc=4.6MB, time=91.42
x[1] = 2.089
y[1] (analytic) = 0
y[1] (numeric) = 1.2728102346852897880837214875046
absolute error = 1.2728102346852897880837214875046
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.586
Order of pole = 13.64
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.09
y[1] (analytic) = 0
y[1] (numeric) = 1.2735601235989775997371204315294
absolute error = 1.2735601235989775997371204315294
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.579
Order of pole = 13.57
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.091
y[1] (analytic) = 0
y[1] (numeric) = 1.2743103171964716193606955939687
absolute error = 1.2743103171964716193606955939687
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.573
Order of pole = 13.5
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.092
y[1] (analytic) = 0
y[1] (numeric) = 1.27506081555913689888025160921
absolute error = 1.27506081555913689888025160921
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.567
Order of pole = 13.43
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.093
y[1] (analytic) = 0
y[1] (numeric) = 1.2758116187677842417358441929732
absolute error = 1.2758116187677842417358441929732
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.56
Order of pole = 13.37
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.094
y[1] (analytic) = 0
y[1] (numeric) = 1.2765627269026697060460957520503
absolute error = 1.2765627269026697060460957520503
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.554
Order of pole = 13.3
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.095
y[1] (analytic) = 0
y[1] (numeric) = 1.2773141400434941085711428900543
absolute error = 1.2773141400434941085711428900543
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.548
Order of pole = 13.23
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.096
y[1] (analytic) = 0
y[1] (numeric) = 1.2780658582694025294797153114492
absolute error = 1.2780658582694025294797153114492
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.542
Order of pole = 13.17
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.097
y[1] (analytic) = 0
y[1] (numeric) = 1.2788178816589838179258456482159
absolute error = 1.2788178816589838179258456482159
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.536
Order of pole = 13.1
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=881.2MB, alloc=4.6MB, time=91.79
x[1] = 2.098
y[1] (analytic) = 0
y[1] (numeric) = 1.2795702102902700984407097147918
absolute error = 1.2795702102902700984407097147918
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.529
Order of pole = 13.04
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.099
y[1] (analytic) = 0
y[1] (numeric) = 1.2803228442407362781450966373104
absolute error = 1.2803228442407362781450966373104
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.523
Order of pole = 12.97
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.1
y[1] (analytic) = 0
y[1] (numeric) = 1.2810757835872995547880082025515
absolute error = 1.2810757835872995547880082025515
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.517
Order of pole = 12.91
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.101
y[1] (analytic) = 0
y[1] (numeric) = 1.2818290284063189256168866302967
absolute error = 1.2818290284063189256168866302967
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.511
Order of pole = 12.85
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.102
y[1] (analytic) = 0
y[1] (numeric) = 1.2825825787735946970849697898644
absolute error = 1.2825825787735946970849697898644
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.505
Order of pole = 12.78
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.103
y[1] (analytic) = 0
y[1] (numeric) = 1.2833364347643679954012726573708
absolute error = 1.2833364347643679954012726573708
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.5
Order of pole = 12.72
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.104
y[1] (analytic) = 0
y[1] (numeric) = 1.2840905964533202779286935446332
absolute error = 1.2840905964533202779286935446332
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.494
Order of pole = 12.66
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.105
y[1] (analytic) = 0
y[1] (numeric) = 1.2848450639145728454357433234916
absolute error = 1.2848450639145728454357433234916
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.488
Order of pole = 12.6
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.106
y[1] (analytic) = 0
y[1] (numeric) = 1.2855998372216863552073955205799
absolute error = 1.2855998372216863552073955205799
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.482
Order of pole = 12.54
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=885.0MB, alloc=4.6MB, time=92.17
x[1] = 2.107
y[1] (analytic) = 0
y[1] (numeric) = 1.286354916447660335020554767129
absolute error = 1.286354916447660335020554767129
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.476
Order of pole = 12.48
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.108
y[1] (analytic) = 0
y[1] (numeric) = 1.2871103016649326979896406561261
absolute error = 1.2871103016649326979896406561261
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.471
Order of pole = 12.42
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.109
y[1] (analytic) = 0
y[1] (numeric) = 1.2878659929453792582877835849987
absolute error = 1.2878659929453792582877835849987
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.465
Order of pole = 12.36
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.11
y[1] (analytic) = 0
y[1] (numeric) = 1.2886219903603132477491286458296
absolute error = 1.2886219903603132477491286458296
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.459
Order of pole = 12.3
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.111
y[1] (analytic) = 0
y[1] (numeric) = 1.2893782939804848333577430668507
absolute error = 1.2893782939804848333577430668507
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.454
Order of pole = 12.24
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.112
y[1] (analytic) = 0
y[1] (numeric) = 1.2901349038760806356286221085069
absolute error = 1.2901349038760806356286221085069
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.448
Order of pole = 12.18
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.113
y[1] (analytic) = 0
y[1] (numeric) = 1.2908918201167232478862876746325
absolute error = 1.2908918201167232478862876746325
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.443
Order of pole = 12.13
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.114
y[1] (analytic) = 0
y[1] (numeric) = 1.2916490427714707564464732141432
absolute error = 1.2916490427714707564464732141432
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.438
Order of pole = 12.07
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.115
y[1] (analytic) = 0
y[1] (numeric) = 1.29240657190881626170638776102
absolute error = 1.29240657190881626170638776102
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.432
Order of pole = 12.02
memory used=888.8MB, alloc=4.6MB, time=92.54
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.116
y[1] (analytic) = 0
y[1] (numeric) = 1.2931644075966874001490511901569
absolute error = 1.2931644075966874001490511901569
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.427
Order of pole = 11.96
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.117
y[1] (analytic) = 0
y[1] (numeric) = 1.2939225499024458672671919537596
absolute error = 1.2939225499024458672671919537596
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.421
Order of pole = 11.9
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.118
y[1] (analytic) = 0
y[1] (numeric) = 1.2946809988928869414121977073277
absolute error = 1.2946809988928869414121977073277
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.416
Order of pole = 11.85
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.119
y[1] (analytic) = 0
y[1] (numeric) = 1.2954397546342390085736083357339
absolute error = 1.2954397546342390085736083357339
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.411
Order of pole = 11.8
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.12
y[1] (analytic) = 0
y[1] (numeric) = 1.296198817192163088094639948434
absolute error = 1.296198817192163088094639948434
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.406
Order of pole = 11.74
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.121
y[1] (analytic) = 0
y[1] (numeric) = 1.2969581866317523593292274283097
absolute error = 1.2969581866317523593292274283097
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.401
Order of pole = 11.69
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.122
y[1] (analytic) = 0
y[1] (numeric) = 1.2977178630175316892460720909694
absolute error = 1.2977178630175316892460720909694
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.396
Order of pole = 11.64
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.123
y[1] (analytic) = 0
y[1] (numeric) = 1.2984778464134571609851799404172
absolute error = 1.2984778464134571609851799404172
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.391
Order of pole = 11.59
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=892.6MB, alloc=4.6MB, time=92.91
x[1] = 2.124
y[1] (analytic) = 0
y[1] (numeric) = 1.2992381368829156033723748927563
absolute error = 1.2992381368829156033723748927563
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.385
Order of pole = 11.53
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.125
y[1] (analytic) = 0
y[1] (numeric) = 1.299998734488724121397270181926
absolute error = 1.299998734488724121397270181926
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.381
Order of pole = 11.48
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.126
y[1] (analytic) = 0
y[1] (numeric) = 1.3007596392931296276601799602951
absolute error = 1.3007596392931296276601799602951
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.376
Order of pole = 11.43
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.127
y[1] (analytic) = 0
y[1] (numeric) = 1.3015208513578083747934518621532
absolute error = 1.3015208513578083747934518621532
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.371
Order of pole = 11.38
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.128
y[1] (analytic) = 0
y[1] (numeric) = 1.3022823707438654888627000096678
absolute error = 1.3022823707438654888627000096678
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.366
Order of pole = 11.33
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.129
y[1] (analytic) = 0
y[1] (numeric) = 1.3030441975118345037534166086191
absolute error = 1.3030441975118345037534166086191
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.361
Order of pole = 11.28
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.13
y[1] (analytic) = 0
y[1] (numeric) = 1.3038063317216768965484389050981
absolute error = 1.3038063317216768965484389050981
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.356
Order of pole = 11.23
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.131
y[1] (analytic) = 0
y[1] (numeric) = 1.3045687734327816239017468542646
absolute error = 1.3045687734327816239017468542646
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.352
Order of pole = 11.19
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.132
y[1] (analytic) = 0
y[1] (numeric) = 1.3053315227039646594140653881271
absolute error = 1.3053315227039646594140653881271
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.347
Order of pole = 11.14
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=896.4MB, alloc=4.6MB, time=93.29
x[1] = 2.133
y[1] (analytic) = 0
y[1] (numeric) = 1.3060945795934685320157436610332
absolute error = 1.3060945795934685320157436610332
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.342
Order of pole = 11.09
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.134
y[1] (analytic) = 0
y[1] (numeric) = 1.3068579441589618653623820990654
absolute error = 1.3068579441589618653623820990654
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.338
Order of pole = 11.04
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.135
y[1] (analytic) = 0
y[1] (numeric) = 1.3076216164575389182486764827305
absolute error = 1.3076216164575389182486764827305
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.333
Order of pole = 11
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.136
y[1] (analytic) = 0
y[1] (numeric) = 1.3083855965457191260459466511307
absolute error = 1.3083855965457191260459466511307
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.328
Order of pole = 10.95
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.137
y[1] (analytic) = 0
y[1] (numeric) = 1.3091498844794466431688157301195
absolute error = 1.3091498844794466431688157301195
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.324
Order of pole = 10.91
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.138
y[1] (analytic) = 0
y[1] (numeric) = 1.3099144803140898865765040566964
absolute error = 1.3099144803140898865765040566964
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.32
Order of pole = 10.86
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.139
y[1] (analytic) = 0
y[1] (numeric) = 1.3106793841044410803142001969897
absolute error = 1.3106793841044410803142001969897
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.315
Order of pole = 10.82
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.14
y[1] (analytic) = 0
y[1] (numeric) = 1.3114445959047158010999696355394
absolute error = 1.3114445959047158010999696355394
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.311
Order of pole = 10.77
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.141
y[1] (analytic) = 0
y[1] (numeric) = 1.3122101157685525249626598491325
absolute error = 1.3122101157685525249626598491325
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.306
Order of pole = 10.73
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=900.3MB, alloc=4.6MB, time=93.67
x[1] = 2.142
y[1] (analytic) = 0
y[1] (numeric) = 1.3129759437490121749362585690794
absolute error = 1.3129759437490121749362585690794
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.302
Order of pole = 10.69
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.143
y[1] (analytic) = 0
y[1] (numeric) = 1.3137420798985776698161600814731
absolute error = 1.3137420798985776698161600814731
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.298
Order of pole = 10.64
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.144
y[1] (analytic) = 0
y[1] (numeric) = 1.3145085242691534739827924155546
absolute error = 1.3145085242691534739827924155546
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.294
Order of pole = 10.6
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.145
y[1] (analytic) = 0
y[1] (numeric) = 1.3152752769120651482980562257414
absolute error = 1.3152752769120651482980562257414
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.289
Order of pole = 10.56
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.146
y[1] (analytic) = 0
y[1] (numeric) = 1.3160423378780589020800240830763
absolute error = 1.3160423378780589020800240830763
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.285
Order of pole = 10.52
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.147
y[1] (analytic) = 0
y[1] (numeric) = 1.3168097072173011461613467567444
absolute error = 1.3168097072173011461613467567444
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.281
Order of pole = 10.48
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.148
y[1] (analytic) = 0
y[1] (numeric) = 1.3175773849793780470368108858014
absolute error = 1.3175773849793780470368108858014
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.277
Order of pole = 10.44
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.149
y[1] (analytic) = 0
y[1] (numeric) = 1.3183453712132950821054902152814
absolute error = 1.3183453712132950821054902152814
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.273
Order of pole = 10.39
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.15
y[1] (analytic) = 0
y[1] (numeric) = 1.3191136659674765960129302993256
absolute error = 1.3191136659674765960129302993256
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.269
Order of pole = 10.35
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=904.1MB, alloc=4.6MB, time=94.05
x[1] = 2.151
y[1] (analytic) = 0
y[1] (numeric) = 1.3198822692897653580988042568168
absolute error = 1.3198822692897653580988042568168
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.265
Order of pole = 10.32
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.152
y[1] (analytic) = 0
y[1] (numeric) = 1.3206511812274221209554748021382
absolute error = 1.3206511812274221209554748021382
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.261
Order of pole = 10.28
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.153
y[1] (analytic) = 0
y[1] (numeric) = 1.3214204018271251801028953650261
absolute error = 1.3214204018271251801028953650261
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.257
Order of pole = 10.24
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.154
y[1] (analytic) = 0
y[1] (numeric) = 1.3221899311349699347852806589699
absolute error = 1.3221899311349699347852806589699
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.253
Order of pole = 10.2
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.155
y[1] (analytic) = 0
y[1] (numeric) = 1.3229597691964684498949745571609
absolute error = 1.3229597691964684498949745571609
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.25
Order of pole = 10.16
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.156
y[1] (analytic) = 0
y[1] (numeric) = 1.3237299160565490190289405885218
absolute error = 1.3237299160565490190289405885218
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.246
Order of pole = 10.12
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.157
y[1] (analytic) = 0
y[1] (numeric) = 1.3245003717595557286832977737881
absolute error = 1.3245003717595557286832977737881
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.242
Order of pole = 10.09
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.158
y[1] (analytic) = 0
y[1] (numeric) = 1.3252711363492480235913218828859
absolute error = 1.3252711363492480235913218828859
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.238
Order of pole = 10.05
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.159
y[1] (analytic) = 0
y[1] (numeric) = 1.3260422098688002732103295098851
absolute error = 1.3260422098688002732103295098851
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.235
Order of pole = 10.01
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=907.9MB, alloc=4.6MB, time=94.42
x[1] = 2.16
y[1] (analytic) = 0
y[1] (numeric) = 1.326813592360801339362859630522
absolute error = 1.326813592360801339362859630522
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.231
Order of pole = 9.977
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.161
y[1] (analytic) = 0
y[1] (numeric) = 1.3275852838672541450375645296196
absolute error = 1.3275852838672541450375645296196
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.227
Order of pole = 9.941
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.162
y[1] (analytic) = 0
y[1] (numeric) = 1.3283572844295752443552191615995
absolute error = 1.3283572844295752443552191615995
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.224
Order of pole = 9.906
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.163
y[1] (analytic) = 0
y[1] (numeric) = 1.3291295940885943937052551366182
absolute error = 1.3291295940885943937052551366182
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.22
Order of pole = 9.871
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.164
y[1] (analytic) = 0
y[1] (numeric) = 1.3299022128845541240582226075914
absolute error = 1.3299022128845541240582226075914
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.217
Order of pole = 9.836
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.165
y[1] (analytic) = 0
y[1] (numeric) = 1.3306751408571093144595803694237
absolute error = 1.3306751408571093144595803694237
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.213
Order of pole = 9.802
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.166
y[1] (analytic) = 0
y[1] (numeric) = 1.331448378045326766710211471073
absolute error = 1.331448378045326766710211471073
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.21
Order of pole = 9.768
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.167
y[1] (analytic) = 0
y[1] (numeric) = 1.3322219244876847812390585835663
absolute error = 1.3322219244876847812390585835663
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.206
Order of pole = 9.734
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.168
y[1] (analytic) = 0
y[1] (numeric) = 1.3329957802220727341732702626925
absolute error = 1.3329957802220727341732702626925
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.203
Order of pole = 9.701
memory used=911.7MB, alloc=4.6MB, time=94.80
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.169
y[1] (analytic) = 0
y[1] (numeric) = 1.3337699452857906556112460937461
absolute error = 1.3337699452857906556112460937461
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.199
Order of pole = 9.668
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.17
y[1] (analytic) = 0
y[1] (numeric) = 1.3345444197155488091039655073204
absolute error = 1.3345444197155488091039655073204
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.196
Order of pole = 9.636
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.171
y[1] (analytic) = 0
y[1] (numeric) = 1.3353192035474672723499818096857
absolute error = 1.3353192035474672723499818096857
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.193
Order of pole = 9.603
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.172
y[1] (analytic) = 0
y[1] (numeric) = 1.3360942968170755191094596786605
absolute error = 1.3360942968170755191094596786605
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.19
Order of pole = 9.571
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.173
y[1] (analytic) = 0
y[1] (numeric) = 1.3368696995593120023426310360341
absolute error = 1.3368696995593120023426310360341
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.186
Order of pole = 9.54
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.174
y[1] (analytic) = 0
y[1] (numeric) = 1.3376454118085237385780408204562
absolute error = 1.3376454118085237385780408204562
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.183
Order of pole = 9.509
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.175
y[1] (analytic) = 0
y[1] (numeric) = 1.3384214335984658935159507502072
absolute error = 1.3384214335984658935159507502072
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.18
Order of pole = 9.478
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.176
y[1] (analytic) = 0
y[1] (numeric) = 1.3391977649623013688722656833414
absolute error = 1.3391977649623013688722656833414
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.177
Order of pole = 9.447
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.177
y[1] (analytic) = 0
y[1] (numeric) = 1.3399744059326003904683436532832
absolute error = 1.3399744059326003904683436532832
memory used=915.5MB, alloc=4.6MB, time=95.19
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.174
Order of pole = 9.417
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.178
y[1] (analytic) = 0
y[1] (numeric) = 1.3407513565413400975720470809959
absolute error = 1.3407513565413400975720470809959
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.171
Order of pole = 9.387
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.179
y[1] (analytic) = 0
y[1] (numeric) = 1.3415286168199041334953890402647
absolute error = 1.3415286168199041334953890402647
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.167
Order of pole = 9.357
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.18
y[1] (analytic) = 0
y[1] (numeric) = 1.3423061867990822374541247803839
absolute error = 1.3423061867990822374541247803839
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.164
Order of pole = 9.328
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.181
y[1] (analytic) = 0
y[1] (numeric) = 1.3430840665090698376946349905445
absolute error = 1.3430840665090698376946349905445
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.161
Order of pole = 9.299
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.182
y[1] (analytic) = 0
y[1] (numeric) = 1.3438622559794676458934435224235
absolute error = 1.3438622559794676458934435224235
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.158
Order of pole = 9.27
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.183
y[1] (analytic) = 0
y[1] (numeric) = 1.3446407552392812528347084718226
absolute error = 1.3446407552392812528347084718226
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.156
Order of pole = 9.242
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.184
y[1] (analytic) = 0
y[1] (numeric) = 1.3454195643169207253710216566221
absolute error = 1.3454195643169207253710216566221
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.153
Order of pole = 9.213
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.185
y[1] (analytic) = 0
y[1] (numeric) = 1.3461986832402002046728476167579
absolute error = 1.3461986832402002046728476167579
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.15
Order of pole = 9.185
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=919.3MB, alloc=4.6MB, time=95.57
x[1] = 2.186
y[1] (analytic) = 0
y[1] (numeric) = 1.346978112036337505771929302325
absolute error = 1.346978112036337505771929302325
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.147
Order of pole = 9.158
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.187
y[1] (analytic) = 0
y[1] (numeric) = 1.3477578507319537184039836082093
absolute error = 1.3477578507319537184039836082093
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.144
Order of pole = 9.131
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.188
y[1] (analytic) = 0
y[1] (numeric) = 1.3485378993530728091560058577871
absolute error = 1.3485378993530728091560058577871
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.141
Order of pole = 9.104
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.189
y[1] (analytic) = 0
y[1] (numeric) = 1.3493182579251212249234982341563
absolute error = 1.3493182579251212249234982341563
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.138
Order of pole = 9.077
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.19
y[1] (analytic) = 0
y[1] (numeric) = 1.3500989264729274976829330050117
absolute error = 1.3500989264729274976829330050117
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.136
Order of pole = 9.05
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.191
y[1] (analytic) = 0
y[1] (numeric) = 1.3508799050207218505847571865998
absolute error = 1.3508799050207218505847571865998
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.133
Order of pole = 9.024
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.192
y[1] (analytic) = 0
y[1] (numeric) = 1.3516611935921358053722410431241
absolute error = 1.3516611935921358053722410431241
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.13
Order of pole = 8.998
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.193
y[1] (analytic) = 0
y[1] (numeric) = 1.3524427922102017911314685204686
absolute error = 1.3524427922102017911314685204686
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.128
Order of pole = 8.973
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.194
y[1] (analytic) = 0
y[1] (numeric) = 1.3532247008973527543777633671104
absolute error = 1.3532247008973527543777633671104
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.125
Order of pole = 8.947
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=923.1MB, alloc=4.6MB, time=95.94
x[1] = 2.195
y[1] (analytic) = 0
y[1] (numeric) = 1.3540069196754217704838403005463
absolute error = 1.3540069196754217704838403005463
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.122
Order of pole = 8.922
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.196
y[1] (analytic) = 0
y[1] (numeric) = 1.3547894485656416564549661344113
absolute error = 1.3547894485656416564549661344113
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.12
Order of pole = 8.897
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.197
y[1] (analytic) = 0
y[1] (numeric) = 1.3555722875886445850564112896656
absolute error = 1.3555722875886445850564112896656
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.117
Order of pole = 8.873
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.198
y[1] (analytic) = 0
y[1] (numeric) = 1.3563554367644617002984675727204
absolute error = 1.3563554367644617002984675727204
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.114
Order of pole = 8.848
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.199
y[1] (analytic) = 0
y[1] (numeric) = 1.3571388961125227342843035141068
absolute error = 1.3571388961125227342843035141068
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.112
Order of pole = 8.824
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.2
y[1] (analytic) = 0
y[1] (numeric) = 1.3579226656516556254259239232207
absolute error = 1.3579226656516556254259239232207
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.109
Order of pole = 8.801
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.201
y[1] (analytic) = 0
y[1] (numeric) = 1.3587067454000861380334956277429
absolute error = 1.3587067454000861380334956277429
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.107
Order of pole = 8.777
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.202
y[1] (analytic) = 0
y[1] (numeric) = 1.3594911353754374832832966304956
absolute error = 1.3594911353754374832832966304956
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.105
Order of pole = 8.754
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.203
y[1] (analytic) = 0
y[1] (numeric) = 1.3602758355947299415695411316993
absolute error = 1.3602758355947299415695411316993
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.102
Order of pole = 8.73
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=927.0MB, alloc=4.6MB, time=96.32
x[1] = 2.204
y[1] (analytic) = 0
y[1] (numeric) = 1.3610608460743804862453280307907
absolute error = 1.3610608460743804862453280307907
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.1
Order of pole = 8.708
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.205
y[1] (analytic) = 0
y[1] (numeric) = 1.3618461668302024087579556391079
absolute error = 1.3618461668302024087579556391079
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.097
Order of pole = 8.685
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.206
y[1] (analytic) = 0
y[1] (numeric) = 1.3626317978774049451838404027931
absolute error = 1.3626317978774049451838404027931
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.095
Order of pole = 8.663
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.207
y[1] (analytic) = 0
y[1] (numeric) = 1.3634177392305929041682724541604
absolute error = 1.3634177392305929041682724541604
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.093
Order of pole = 8.64
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.208
y[1] (analytic) = 0
y[1] (numeric) = 1.3642039909037662962752357794815
absolute error = 1.3642039909037662962752357794815
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.09
Order of pole = 8.619
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.209
y[1] (analytic) = 0
y[1] (numeric) = 1.3649905529103199647525157116089
absolute error = 1.3649905529103199647525157116089
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.088
Order of pole = 8.597
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.21
y[1] (analytic) = 0
y[1] (numeric) = 1.365777425263043217717311327042
absolute error = 1.365777425263043217717311327042
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.086
Order of pole = 8.575
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.211
y[1] (analytic) = 0
y[1] (numeric) = 1.366564607974119461767565148899
absolute error = 1.366564607974119461767565148899
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.083
Order of pole = 8.554
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.212
y[1] (analytic) = 0
y[1] (numeric) = 1.3673521010551258370242173297477
absolute error = 1.3673521010551258370242173297477
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.081
Order of pole = 8.533
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=930.8MB, alloc=4.6MB, time=96.70
x[1] = 2.213
y[1] (analytic) = 0
y[1] (numeric) = 1.3681399045170328536095862113244
absolute error = 1.3681399045170328536095862113244
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.079
Order of pole = 8.512
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.214
y[1] (analytic) = 0
y[1] (numeric) = 1.368928018370204029567071831793
absolute error = 1.368928018370204029567071831793
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.077
Order of pole = 8.492
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.215
y[1] (analytic) = 0
y[1] (numeric) = 1.3697164426243955302273735753232
absolute error = 1.3697164426243955302273735753232
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.075
Order of pole = 8.471
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.216
y[1] (analytic) = 0
y[1] (numeric) = 1.370505177288755809026407733358
absolute error = 1.370505177288755809026407733358
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.072
Order of pole = 8.451
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.217
y[1] (analytic) = 0
y[1] (numeric) = 1.3712942223718252497801052719538
absolute error = 1.3712942223718252497801052719538
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.07
Order of pole = 8.431
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.218
y[1] (analytic) = 0
y[1] (numeric) = 1.3720835778815358104212645749756
absolute error = 1.3720835778815358104212645749756
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.068
Order of pole = 8.411
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.219
y[1] (analytic) = 0
y[1] (numeric) = 1.3728732438252106682036283586728
absolute error = 1.3728732438252106682036283586728
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.066
Order of pole = 8.392
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.22
y[1] (analytic) = 0
y[1] (numeric) = 1.3736632202095638663783483292122
absolute error = 1.3736632202095638663783483292122
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.064
Order of pole = 8.373
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.221
y[1] (analytic) = 0
y[1] (numeric) = 1.3744535070406999623479954810646
absolute error = 1.3744535070406999623479954810646
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.062
Order of pole = 8.353
memory used=934.6MB, alloc=4.6MB, time=97.07
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.222
y[1] (analytic) = 0
y[1] (numeric) = 1.3752441043241136773032682106956
absolute error = 1.3752441043241136773032682106956
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.06
Order of pole = 8.335
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.223
y[1] (analytic) = 0
y[1] (numeric) = 1.3760350120646895473475446467597
absolute error = 1.3760350120646895473475446467597
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.058
Order of pole = 8.316
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.224
y[1] (analytic) = 0
y[1] (numeric) = 1.3768262302667015761144197749088
absolute error = 1.3768262302667015761144197749088
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.056
Order of pole = 8.297
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.225
y[1] (analytic) = 0
y[1] (numeric) = 1.3776177589338128888833620623624
absolute error = 1.3776177589338128888833620623624
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.054
Order of pole = 8.279
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.226
y[1] (analytic) = 0
y[1] (numeric) = 1.3784095980690753881986183645166
absolute error = 1.3784095980690753881986183645166
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.052
Order of pole = 8.261
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.227
y[1] (analytic) = 0
y[1] (numeric) = 1.3792017476749294109964899230565
absolute error = 1.3792017476749294109964899230565
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.05
Order of pole = 8.243
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.228
y[1] (analytic) = 0
y[1] (numeric) = 1.3799942077532033872460962422486
absolute error = 1.3799942077532033872460962422486
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.048
Order of pole = 8.225
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.229
y[1] (analytic) = 0
y[1] (numeric) = 1.380786978305113500108737557298
absolute error = 1.380786978305113500108737557298
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.046
Order of pole = 8.207
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=938.4MB, alloc=4.6MB, time=97.45
x[1] = 2.23
y[1] (analytic) = 0
y[1] (numeric) = 1.381580059331263347620960485822
absolute error = 1.381580059331263347620960485822
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.044
Order of pole = 8.19
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.231
y[1] (analytic) = 0
y[1] (numeric) = 1.3823734508316436059064252805906
absolute error = 1.3823734508316436059064252805906
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.042
Order of pole = 8.173
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.232
y[1] (analytic) = 0
y[1] (numeric) = 1.3831671528056316939216668786861
absolute error = 1.3831671528056316939216668786861
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.041
Order of pole = 8.156
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.233
y[1] (analytic) = 0
y[1] (numeric) = 1.383961165251991439740835669102
absolute error = 1.383961165251991439740835669102
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.039
Order of pole = 8.139
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.234
y[1] (analytic) = 0
y[1] (numeric) = 1.3847554881688727483844975775162
absolute error = 1.3847554881688727483844975775162
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.037
Order of pole = 8.122
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.235
y[1] (analytic) = 0
y[1] (numeric) = 1.3855501215538112711975666935008
absolute error = 1.3855501215538112711975666935008
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.035
Order of pole = 8.106
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.236
y[1] (analytic) = 0
y[1] (numeric) = 1.3863450654037280767814372417427
absolute error = 1.3863450654037280767814372417427
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.033
Order of pole = 8.089
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.237
y[1] (analytic) = 0
y[1] (numeric) = 1.3871403197149293234853752249236
absolute error = 1.3871403197149293234853752249236
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.032
Order of pole = 8.073
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.238
y[1] (analytic) = 0
y[1] (numeric) = 1.3879358844831059334622235417145
absolute error = 1.3879358844831059334622235417145
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.03
Order of pole = 8.057
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=942.2MB, alloc=4.6MB, time=97.82
x[1] = 2.239
y[1] (analytic) = 0
y[1] (numeric) = 1.3887317597033332682934678088539
absolute error = 1.3887317597033332682934678088539
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.028
Order of pole = 8.041
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.24
y[1] (analytic) = 0
y[1] (numeric) = 1.3895279453700708061887034914765
absolute error = 1.3895279453700708061887034914765
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.026
Order of pole = 8.025
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.241
y[1] (analytic) = 0
y[1] (numeric) = 1.3903244414771618207645382707165
absolute error = 1.3903244414771618207645382707165
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.025
Order of pole = 8.01
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.242
y[1] (analytic) = 0
y[1] (numeric) = 1.3911212480178330614079568521013
absolute error = 1.3911212480178330614079568521013
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.023
Order of pole = 7.995
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.243
y[1] (analytic) = 0
y[1] (numeric) = 1.3919183649846944352291686423568
absolute error = 1.3919183649846944352291686423568
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.021
Order of pole = 7.979
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.244
y[1] (analytic) = 0
y[1] (numeric) = 1.3927157923697386906089518959411
absolute error = 1.3927157923697386906089518959411
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.964
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.245
y[1] (analytic) = 0
y[1] (numeric) = 1.3935135301643411023455010558881
absolute error = 1.3935135301643411023455010558881
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.949
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.246
y[1] (analytic) = 0
y[1] (numeric) = 1.3943115783592591584057770863572
absolute error = 1.3943115783592591584057770863572
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.935
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.247
y[1] (analytic) = 0
y[1] (numeric) = 1.3951099369446322482863536166271
absolute error = 1.3951099369446322482863536166271
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 7.92
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=946.0MB, alloc=4.6MB, time=98.20
x[1] = 2.248
y[1] (analytic) = 0
y[1] (numeric) = 1.3959086059099813529887446881233
absolute error = 1.3959086059099813529887446881233
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 7.906
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.249
y[1] (analytic) = 0
y[1] (numeric) = 1.396707585244208736614192817412
absolute error = 1.396707585244208736614192817412
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 7.891
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.25
y[1] (analytic) = 0
y[1] (numeric) = 1.3975068749355976395828889589073
absolute error = 1.3975068749355976395828889589073
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 7.877
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.251
y[1] (analytic) = 0
y[1] (numeric) = 1.3983064749718119734825887713108
absolute error = 1.3983064749718119734825887713108
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.009
Order of pole = 7.863
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.252
y[1] (analytic) = 0
y[1] (numeric) = 1.3991063853398960175515823615115
absolute error = 1.3991063853398960175515823615115
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.007
Order of pole = 7.849
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.253
y[1] (analytic) = 0
y[1] (numeric) = 1.3999066060262741168009673988073
absolute error = 1.3999066060262741168009673988073
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.006
Order of pole = 7.836
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.254
y[1] (analytic) = 0
y[1] (numeric) = 1.4007071370167503817811681608512
absolute error = 1.4007071370167503817811681608512
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.004
Order of pole = 7.822
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.255
y[1] (analytic) = 0
y[1] (numeric) = 1.4015079782965083899976356906592
absolute error = 1.4015079782965083899976356906592
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.003
Order of pole = 7.809
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.256
y[1] (analytic) = 0
y[1] (numeric) = 1.4023091298501108889806568113328
absolute error = 1.4023091298501108889806568113328
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.001
Order of pole = 7.796
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=949.8MB, alloc=4.6MB, time=98.57
x[1] = 2.257
y[1] (analytic) = 0
y[1] (numeric) = 1.4031105916614995010141922618297
absolute error = 1.4031105916614995010141922618297
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4
Order of pole = 7.782
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.258
y[1] (analytic) = 0
y[1] (numeric) = 1.4039123637139944295286566831544
absolute error = 1.4039123637139944295286566831544
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.998
Order of pole = 7.769
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.259
y[1] (analytic) = 0
y[1] (numeric) = 1.4047144459902941671625455997186
absolute error = 1.4047144459902941671625455997186
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.997
Order of pole = 7.757
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.26
y[1] (analytic) = 0
y[1] (numeric) = 1.4055168384724752054978069053332
absolute error = 1.4055168384724752054978069053332
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.996
Order of pole = 7.744
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.261
y[1] (analytic) = 0
y[1] (numeric) = 1.4063195411419917464738466773285
absolute error = 1.4063195411419917464738466773285
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.994
Order of pole = 7.731
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.262
y[1] (analytic) = 0
y[1] (numeric) = 1.4071225539796754154850514056443
absolute error = 1.4071225539796754154850514056443
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.993
Order of pole = 7.719
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.263
y[1] (analytic) = 0
y[1] (numeric) = 1.4079258769657349761667009363822
absolute error = 1.4079258769657349761667009363822
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.991
Order of pole = 7.707
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.264
y[1] (analytic) = 0
y[1] (numeric) = 1.4087295100797560468741385912589
absolute error = 1.4087295100797560468741385912589
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.99
Order of pole = 7.694
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.265
y[1] (analytic) = 0
y[1] (numeric) = 1.4095334533007008188600570356318
absolute error = 1.4095334533007008188600570356318
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.989
Order of pole = 7.682
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=953.7MB, alloc=4.6MB, time=98.95
x[1] = 2.266
y[1] (analytic) = 0
y[1] (numeric) = 1.4103377066069077761547505282866
absolute error = 1.4103377066069077761547505282866
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.987
Order of pole = 7.67
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.267
y[1] (analytic) = 0
y[1] (numeric) = 1.4111422699760914171541761959672
absolute error = 1.4111422699760914171541761959672
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.986
Order of pole = 7.659
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.268
y[1] (analytic) = 0
y[1] (numeric) = 1.4119471433853419779206589346907
absolute error = 1.4119471433853419779206589346907
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.985
Order of pole = 7.647
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.269
y[1] (analytic) = 0
y[1] (numeric) = 1.4127523268111251572010664482216
absolute error = 1.4127523268111251572010664482216
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.983
Order of pole = 7.635
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.27
y[1] (analytic) = 0
y[1] (numeric) = 1.4135578202292818431672727916686
absolute error = 1.4135578202292818431672727916686
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.982
Order of pole = 7.624
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.271
y[1] (analytic) = 0
y[1] (numeric) = 1.4143636236150278418837205950209
absolute error = 1.4143636236150278418837205950209
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.981
Order of pole = 7.613
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.272
y[1] (analytic) = 0
y[1] (numeric) = 1.4151697369429536075068838975479
absolute error = 1.4151697369429536075068838975479
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.602
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.273
y[1] (analytic) = 0
y[1] (numeric) = 1.4159761601870239742214252293527
absolute error = 1.4159761601870239742214252293527
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.591
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.274
y[1] (analytic) = 0
y[1] (numeric) = 1.4167828933205778899178322309879
absolute error = 1.4167828933205778899178322309879
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=957.5MB, alloc=4.6MB, time=99.32
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.58
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.275
y[1] (analytic) = 0
y[1] (numeric) = 1.417589936316328151616310705917
absolute error = 1.417589936316328151616310705917
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.569
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.276
y[1] (analytic) = 0
y[1] (numeric) = 1.4183972891463611426417025537355
absolute error = 1.4183972891463611426417025537355
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.975
Order of pole = 7.558
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.277
y[1] (analytic) = 0
y[1] (numeric) = 1.419204951782136571554188534451
absolute error = 1.419204951782136571554188534451
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.974
Order of pole = 7.548
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.278
y[1] (analytic) = 0
y[1] (numeric) = 1.4200129241944872128405272657693
absolute error = 1.4200129241944872128405272657693
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.972
Order of pole = 7.537
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.279
y[1] (analytic) = 0
y[1] (numeric) = 1.4208212063536186493705732562399
absolute error = 1.4208212063536186493705732562399
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.971
Order of pole = 7.527
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.28
y[1] (analytic) = 0
y[1] (numeric) = 1.421629798229109016623808127287
absolute error = 1.421629798229109016623808127287
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.97
Order of pole = 7.516
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.281
y[1] (analytic) = 0
y[1] (numeric) = 1.4224386997899087486906104765962
absolute error = 1.4224386997899087486906104765962
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.506
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.282
y[1] (analytic) = 0
y[1] (numeric) = 1.4232479110043403260529810840427
absolute error = 1.4232479110043403260529810840427
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.496
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=961.3MB, alloc=4.6MB, time=99.70
x[1] = 2.283
y[1] (analytic) = 0
y[1] (numeric) = 1.4240574318400980251494313593462
absolute error = 1.4240574318400980251494313593462
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.486
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.284
y[1] (analytic) = 0
y[1] (numeric) = 1.4248672622642476697287340779203
absolute error = 1.4248672622642476697287340779203
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.477
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.285
y[1] (analytic) = 0
y[1] (numeric) = 1.4256774022432263839972265479656
absolute error = 1.4256774022432263839972265479656
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.964
Order of pole = 7.467
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.286
y[1] (analytic) = 0
y[1] (numeric) = 1.4264878517428423475643473977347
absolute error = 1.4264878517428423475643473977347
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.963
Order of pole = 7.457
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.287
y[1] (analytic) = 0
y[1] (numeric) = 1.4272986107282745521910791670904
absolute error = 1.4272986107282745521910791670904
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.962
Order of pole = 7.448
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.288
y[1] (analytic) = 0
y[1] (numeric) = 1.4281096791640725603459598319905
absolute error = 1.4281096791640725603459598319905
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.961
Order of pole = 7.439
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.289
y[1] (analytic) = 0
y[1] (numeric) = 1.428921057014156265573317284375
absolute error = 1.428921057014156265573317284375
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.96
Order of pole = 7.429
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.29
y[1] (analytic) = 0
y[1] (numeric) = 1.4297327442418156546783716331167
absolute error = 1.4297327442418156546783716331167
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.959
Order of pole = 7.42
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.291
y[1] (analytic) = 0
y[1] (numeric) = 1.4305447408097105717338409842339
absolute error = 1.4305447408097105717338409842339
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.958
Order of pole = 7.411
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=965.1MB, alloc=4.6MB, time=100.09
x[1] = 2.292
y[1] (analytic) = 0
y[1] (numeric) = 1.4313570466798704839126771004653
absolute error = 1.4313570466798704839126771004653
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.402
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.293
y[1] (analytic) = 0
y[1] (numeric) = 1.4321696618136942491515480315928
absolute error = 1.4321696618136942491515480315928
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.393
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.294
y[1] (analytic) = 0
y[1] (numeric) = 1.4329825861719498856496754475691
absolute error = 1.4329825861719498856496754475691
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.385
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.295
y[1] (analytic) = 0
y[1] (numeric) = 1.4337958197147743432076249965925
absolute error = 1.4337958197147743432076249965925
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.376
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.296
y[1] (analytic) = 0
y[1] (numeric) = 1.4346093624016732764106385497738
absolute error = 1.4346093624016732764106385497738
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.953
Order of pole = 7.368
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.297
y[1] (analytic) = 0
y[1] (numeric) = 1.435423214191520819661087682987
absolute error = 1.435423214191520819661087682987
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.952
Order of pole = 7.359
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.298
y[1] (analytic) = 0
y[1] (numeric) = 1.436237375042559364064618184894
absolute error = 1.436237375042559364064618184894
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.951
Order of pole = 7.351
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.299
y[1] (analytic) = 0
y[1] (numeric) = 1.4370518449123993361745457680087
absolute error = 1.4370518449123993361745457680087
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.95
Order of pole = 7.343
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.3
y[1] (analytic) = 0
y[1] (numeric) = 1.4378666237580189785990534970314
absolute error = 1.4378666237580189785990534970314
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.949
Order of pole = 7.335
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=968.9MB, alloc=4.6MB, time=100.47
x[1] = 2.301
y[1] (analytic) = 0
y[1] (numeric) = 1.4386817115357641324757317355616
absolute error = 1.4386817115357641324757317355616
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.948
Order of pole = 7.327
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.302
y[1] (analytic) = 0
y[1] (numeric) = 1.4394971082013480218179916487073
absolute error = 1.4394971082013480218179916487073
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.319
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.303
y[1] (analytic) = 0
y[1] (numeric) = 1.440312813709851039737873485068
absolute error = 1.440312813709851039737873485068
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.311
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.304
y[1] (analytic) = 0
y[1] (numeric) = 1.4411288280157205365497609971037
absolute error = 1.4411288280157205365497609971037
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.303
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.305
y[1] (analytic) = 0
y[1] (numeric) = 1.4419451510727706097595034440315
absolute error = 1.4419451510727706097595034440315
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.295
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.306
y[1] (analytic) = 0
y[1] (numeric) = 1.4427617828341818959434366561404
absolute error = 1.4427617828341818959434366561404
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.288
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.307
y[1] (analytic) = 0
y[1] (numeric) = 1.4435787232525013645217846238039
absolute error = 1.4435787232525013645217846238039
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.28
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.308
y[1] (analytic) = 0
y[1] (numeric) = 1.4443959722796421134309130085299
absolute error = 1.4443959722796421134309130085299
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.273
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.309
y[1] (analytic) = 0
y[1] (numeric) = 1.4452135298668831666988958571342
absolute error = 1.4452135298668831666988958571342
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.266
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=972.7MB, alloc=4.6MB, time=100.86
x[1] = 2.31
y[1] (analytic) = 0
y[1] (numeric) = 1.4460313959648692739288466335945
absolute error = 1.4460313959648692739288466335945
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.259
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.311
y[1] (analytic) = 0
y[1] (numeric) = 1.4468495705236107116944544663508
absolute error = 1.4468495705236107116944544663508
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.252
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.312
y[1] (analytic) = 0
y[1] (numeric) = 1.4476680534924830868521562418068
absolute error = 1.4476680534924830868521562418068
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.245
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.313
y[1] (analytic) = 0
y[1] (numeric) = 1.4484868448202271417743648575683
absolute error = 1.4484868448202271417743648575683
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.238
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.314
y[1] (analytic) = 0
y[1] (numeric) = 1.4493059444549485615081635815735
absolute error = 1.4493059444549485615081635815735
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.231
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.315
y[1] (analytic) = 0
y[1] (numeric) = 1.4501253523441177828638660457422
absolute error = 1.4501253523441177828638660457422
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.224
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.316
y[1] (analytic) = 0
y[1] (numeric) = 1.4509450684345698054378309351377
absolute error = 1.4509450684345698054378309351377
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.218
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.317
y[1] (analytic) = 0
y[1] (numeric) = 1.4517650926725040045739099159196
absolute error = 1.4517650926725040045739099159196
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.211
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.318
y[1] (analytic) = 0
y[1] (numeric) = 1.452585425003483946267896777608
absolute error = 1.452585425003483946267896777608
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.934
Order of pole = 7.205
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=976.6MB, alloc=4.6MB, time=101.24
x[1] = 2.319
y[1] (analytic) = 0
y[1] (numeric) = 1.453406065372437204019335147404
absolute error = 1.453406065372437204019335147404
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.933
Order of pole = 7.198
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.32
y[1] (analytic) = 0
y[1] (numeric) = 1.4542270137236551776350314665597
absolute error = 1.4542270137236551776350314665597
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.933
Order of pole = 7.192
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.321
y[1] (analytic) = 0
y[1] (numeric) = 1.4550482700007929139886092010907
absolute error = 1.4550482700007929139886092010907
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.932
Order of pole = 7.186
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.322
y[1] (analytic) = 0
y[1] (numeric) = 1.455869834146868929740429491516
absolute error = 1.455869834146868929740429491516
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.931
Order of pole = 7.18
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.323
y[1] (analytic) = 0
y[1] (numeric) = 1.4566917061042650360221926288267
absolute error = 1.4566917061042650360221926288267
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.93
Order of pole = 7.174
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.324
y[1] (analytic) = 0
y[1] (numeric) = 1.4575138858147261650905238765639
absolute error = 1.4575138858147261650905238765639
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.93
Order of pole = 7.168
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.325
y[1] (analytic) = 0
y[1] (numeric) = 1.458336373219360198953836241765
absolute error = 1.458336373219360198953836241765
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.929
Order of pole = 7.162
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.326
y[1] (analytic) = 0
y[1] (numeric) = 1.4591591682586377999767518306552
absolute error = 1.4591591682586377999767518306552
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.928
Order of pole = 7.156
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.327
y[1] (analytic) = 0
y[1] (numeric) = 1.4599822708723922434663524083559
absolute error = 1.4599822708723922434663524083559
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.928
Order of pole = 7.15
memory used=980.4MB, alloc=4.6MB, time=101.61
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.328
y[1] (analytic) = 0
y[1] (numeric) = 1.4608056809998192522445187155921
absolute error = 1.4608056809998192522445187155921
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.927
Order of pole = 7.145
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.329
y[1] (analytic) = 0
y[1] (numeric) = 1.4616293985794768332106069794512
absolute error = 1.4616293985794768332106069794512
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.139
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.33
y[1] (analytic) = 0
y[1] (numeric) = 1.4624534235492851158986998897139
absolute error = 1.4624534235492851158986998897139
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.134
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.331
y[1] (analytic) = 0
y[1] (numeric) = 1.4632777558465261930336580971855
absolute error = 1.4632777558465261930336580971855
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.129
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.332
y[1] (analytic) = 0
y[1] (numeric) = 1.4641023954078439630901870258522
absolute error = 1.4641023954078439630901870258522
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.123
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.333
y[1] (analytic) = 0
y[1] (numeric) = 1.4649273421692439748591224766055
absolute error = 1.4649273421692439748591224766055
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.118
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.334
y[1] (analytic) = 0
y[1] (numeric) = 1.4657525960660932740251271367718
absolute error = 1.4657525960660932740251271367718
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.113
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.335
y[1] (analytic) = 0
y[1] (numeric) = 1.4665781570331202517599786967963
absolute error = 1.4665781570331202517599786967963
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.108
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=984.2MB, alloc=4.6MB, time=101.98
x[1] = 2.336
y[1] (analytic) = 0
y[1] (numeric) = 1.4674040250044144953356188132023
absolute error = 1.4674040250044144953356188132023
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.103
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.337
y[1] (analytic) = 0
y[1] (numeric) = 1.4682301999134266407611206454328
absolute error = 1.4682301999134266407611206454328
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.921
Order of pole = 7.098
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.338
y[1] (analytic) = 0
y[1] (numeric) = 1.4690566816929682274477211334218
absolute error = 1.4690566816929682274477211334218
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.921
Order of pole = 7.094
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.339
y[1] (analytic) = 0
y[1] (numeric) = 1.4698834702752115549060525727926
absolute error = 1.4698834702752115549060525727926
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.92
Order of pole = 7.089
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.34
y[1] (analytic) = 0
y[1] (numeric) = 1.4707105655916895414796963854821
absolute error = 1.4707105655916895414796963854821
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.919
Order of pole = 7.084
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.341
y[1] (analytic) = 0
y[1] (numeric) = 1.4715379675732955851191702753982
absolute error = 1.4715379675732955851191702753982
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.919
Order of pole = 7.08
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.342
y[1] (analytic) = 0
y[1] (numeric) = 1.4723656761502834262004482014832
absolute error = 1.4723656761502834262004482014832
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.918
Order of pole = 7.075
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.343
y[1] (analytic) = 0
y[1] (numeric) = 1.4731936912522670123921007943244
absolute error = 1.4731936912522670123921007943244
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.918
Order of pole = 7.071
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.344
y[1] (analytic) = 0
y[1] (numeric) = 1.4740220128082203655751319872865
absolute error = 1.4740220128082203655751319872865
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.917
Order of pole = 7.067
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=988.0MB, alloc=4.6MB, time=102.36
x[1] = 2.345
y[1] (analytic) = 0
y[1] (numeric) = 1.4748506407464774508195757290811
absolute error = 1.4748506407464774508195757290811
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.917
Order of pole = 7.062
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.346
y[1] (analytic) = 0
y[1] (numeric) = 1.4756795749947320474219046917984
absolute error = 1.4756795749947320474219046917984
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.916
Order of pole = 7.058
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.347
y[1] (analytic) = 0
y[1] (numeric) = 1.4765088154800376220072908867562
absolute error = 1.4765088154800376220072908867562
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.916
Order of pole = 7.054
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.348
y[1] (analytic) = 0
y[1] (numeric) = 1.4773383621288072037007460501264
absolute error = 1.4773383621288072037007460501264
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.915
Order of pole = 7.05
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.349
y[1] (analytic) = 0
y[1] (numeric) = 1.4781682148668132613711575612379
absolute error = 1.4781682148668132613711575612379
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.915
Order of pole = 7.046
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.35
y[1] (analytic) = 0
y[1] (numeric) = 1.4789983736191875829522235087803
absolute error = 1.4789983736191875829522235087803
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.914
Order of pole = 7.043
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.351
y[1] (analytic) = 0
y[1] (numeric) = 1.4798288383104211568442783239087
absolute error = 1.4798288383104211568442783239087
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.914
Order of pole = 7.039
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.352
y[1] (analytic) = 0
y[1] (numeric) = 1.4806596088643640554009881545264
absolute error = 1.4806596088643640554009881545264
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.913
Order of pole = 7.035
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.353
y[1] (analytic) = 0
y[1] (numeric) = 1.4814906852042253205048828618667
absolute error = 1.4814906852042253205048828618667
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.913
Order of pole = 7.032
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=991.8MB, alloc=4.6MB, time=102.74
x[1] = 2.354
y[1] (analytic) = 0
y[1] (numeric) = 1.4823220672525728512356791789631
absolute error = 1.4823220672525728512356791789631
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.912
Order of pole = 7.028
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.355
y[1] (analytic) = 0
y[1] (numeric) = 1.4831537549313332936353371807488
absolute error = 1.4831537549313332936353371807488
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.912
Order of pole = 7.025
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.356
y[1] (analytic) = 0
y[1] (numeric) = 1.4839857481617919325737797774268
absolute error = 1.4839857481617919325737797774268
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.911
Order of pole = 7.021
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.357
y[1] (analytic) = 0
y[1] (numeric) = 1.4848180468645925857191924564606
absolute error = 1.4848180468645925857191924564606
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.911
Order of pole = 7.018
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.358
y[1] (analytic) = 0
y[1] (numeric) = 1.4856506509597374996168079641165
absolute error = 1.4856506509597374996168079641165
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.911
Order of pole = 7.015
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.359
y[1] (analytic) = 0
y[1] (numeric) = 1.4864835603665872478800680350058
absolute error = 1.4864835603665872478800680350058
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.91
Order of pole = 7.012
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.36
y[1] (analytic) = 0
y[1] (numeric) = 1.4873167750038606314980416475929
absolute error = 1.4873167750038606314980416475929
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.91
Order of pole = 7.009
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.361
y[1] (analytic) = 0
y[1] (numeric) = 1.4881502947896345812629666052204
absolute error = 1.4881502947896345812629666052204
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.909
Order of pole = 7.006
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.362
y[1] (analytic) = 0
y[1] (numeric) = 1.4889841196413440623217685159191
absolute error = 1.4889841196413440623217685159191
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.909
Order of pole = 7.003
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=995.6MB, alloc=4.6MB, time=103.12
x[1] = 2.363
y[1] (analytic) = 0
y[1] (numeric) = 1.4898182494757819808553984701877
absolute error = 1.4898182494757819808553984701877
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.909
Order of pole = 7
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.364
y[1] (analytic) = 0
y[1] (numeric) = 1.4906526842090990928898178941111
absolute error = 1.4906526842090990928898178941111
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.908
Order of pole = 6.997
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.365
y[1] (analytic) = 0
y[1] (numeric) = 1.491487423756803915242446185707
absolute error = 1.491487423756803915242446185707
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.908
Order of pole = 6.994
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.366
y[1] (analytic) = 0
y[1] (numeric) = 1.4923224680337626386078738253157
absolute error = 1.4923224680337626386078738253157
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.907
Order of pole = 6.992
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.367
y[1] (analytic) = 0
y[1] (numeric) = 1.4931578169541990427866306862504
absolute error = 1.4931578169541990427866306862504
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.907
Order of pole = 6.989
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.368
y[1] (analytic) = 0
y[1] (numeric) = 1.4939934704316944140607862598725
absolute error = 1.4939934704316944140607862598725
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.907
Order of pole = 6.987
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.369
y[1] (analytic) = 0
y[1] (numeric) = 1.4948294283791874647201454498234
absolute error = 1.4948294283791874647201454498234
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.906
Order of pole = 6.984
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.37
y[1] (analytic) = 0
y[1] (numeric) = 1.4956656907089742547427904834023
absolute error = 1.4956656907089742547427904834023
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.906
Order of pole = 6.982
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.371
y[1] (analytic) = 0
y[1] (numeric) = 1.4965022573327081156337063340981
absolute error = 1.4965022573327081156337063340981
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.906
Order of pole = 6.98
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=999.4MB, alloc=4.6MB, time=103.50
x[1] = 2.372
y[1] (analytic) = 0
y[1] (numeric) = 1.4973391281613995764252138481477
absolute error = 1.4973391281613995764252138481477
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.905
Order of pole = 6.978
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.373
y[1] (analytic) = 0
y[1] (numeric) = 1.4981763031054162918429215197603
absolute error = 1.4981763031054162918429215197603
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.905
Order of pole = 6.975
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.374
y[1] (analytic) = 0
y[1] (numeric) = 1.4990137820744829726408935644138
absolute error = 1.4990137820744829726408935644138
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.905
Order of pole = 6.973
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.375
y[1] (analytic) = 0
y[1] (numeric) = 1.4998515649776813181097185974514
absolute error = 1.4998515649776813181097185974514
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.905
Order of pole = 6.971
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.376
y[1] (analytic) = 0
y[1] (numeric) = 1.5006896517234499507611498361787
absolute error = 1.5006896517234499507611498361787
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.904
Order of pole = 6.969
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.377
y[1] (analytic) = 0
y[1] (numeric) = 1.5015280422195843531929743078479
absolute error = 1.5015280422195843531929743078479
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.904
Order of pole = 6.968
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.378
y[1] (analytic) = 0
y[1] (numeric) = 1.5023667363732368071377550634056
absolute error = 1.5023667363732368071377550634056
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.904
Order of pole = 6.966
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.379
y[1] (analytic) = 0
y[1] (numeric) = 1.503205734090916334699076867746
absolute error = 1.503205734090916334699076867746
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.903
Order of pole = 6.964
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.38
y[1] (analytic) = 0
y[1] (numeric) = 1.5040450352784886417789122615379
absolute error = 1.5040450352784886417789122615379
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.903
Order of pole = 6.963
memory used=1003.3MB, alloc=4.6MB, time=103.87
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.381
y[1] (analytic) = 0
y[1] (numeric) = 1.5048846398411760636997112675575
absolute error = 1.5048846398411760636997112675575
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.903
Order of pole = 6.961
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.382
y[1] (analytic) = 0
y[1] (numeric) = 1.5057245476835575130248043459481
absolute error = 1.5057245476835575130248043459481
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.903
Order of pole = 6.96
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.383
y[1] (analytic) = 0
y[1] (numeric) = 1.506564758709568429580694488018
absolute error = 1.506564758709568429580694488018
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.903
Order of pole = 6.958
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.384
y[1] (analytic) = 0
y[1] (numeric) = 1.5074052728225007326848005771686
absolute error = 1.5074052728225007326848005771686
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.902
Order of pole = 6.957
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.385
y[1] (analytic) = 0
y[1] (numeric) = 1.5082460899250027755822003383951
absolute error = 1.5082460899250027755822003383951
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.902
Order of pole = 6.955
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.386
y[1] (analytic) = 0
y[1] (numeric) = 1.5090872099190793020949073446125
absolute error = 1.5090872099190793020949073446125
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.902
Order of pole = 6.954
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.387
y[1] (analytic) = 0
y[1] (numeric) = 1.5099286327060914054872026489096
absolute error = 1.5099286327060914054872026489096
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.902
Order of pole = 6.953
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.388
y[1] (analytic) = 0
y[1] (numeric) = 1.5107703581867564895505276668161
absolute error = 1.5107703581867564895505276668161
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.901
Order of pole = 6.952
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1007.1MB, alloc=4.6MB, time=104.25
x[1] = 2.389
y[1] (analytic) = 0
y[1] (numeric) = 1.5116123862611482319114309418649
absolute error = 1.5116123862611482319114309418649
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.901
Order of pole = 6.951
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.39
y[1] (analytic) = 0
y[1] (numeric) = 1.5124547168286965495660473912342
absolute error = 1.5124547168286965495660473912342
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.901
Order of pole = 6.95
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.391
y[1] (analytic) = 0
y[1] (numeric) = 1.5132973497881875666445745461515
absolute error = 1.5132973497881875666445745461515
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.901
Order of pole = 6.949
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.392
y[1] (analytic) = 0
y[1] (numeric) = 1.5141402850377635844091961741188
absolute error = 1.5141402850377635844091961741188
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.901
Order of pole = 6.948
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.393
y[1] (analytic) = 0
y[1] (numeric) = 1.514983522474923053488889496974
absolute error = 1.514983522474923053488889496974
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.901
Order of pole = 6.948
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.394
y[1] (analytic) = 0
y[1] (numeric) = 1.5158270619965205483545380004207
absolute error = 1.5158270619965205483545380004207
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.9
Order of pole = 6.947
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.395
y[1] (analytic) = 0
y[1] (numeric) = 1.5166709034987667440377575670337
absolute error = 1.5166709034987667440377575670337
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.9
Order of pole = 6.946
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.396
y[1] (analytic) = 0
y[1] (numeric) = 1.5175150468772283950968293559725
absolute error = 1.5175150468772283950968293559725
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.9
Order of pole = 6.946
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.397
y[1] (analytic) = 0
y[1] (numeric) = 1.5183594920268283168331184988039
absolute error = 1.5183594920268283168331184988039
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.9
Order of pole = 6.945
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1010.9MB, alloc=4.6MB, time=104.63
x[1] = 2.398
y[1] (analytic) = 0
y[1] (numeric) = 1.5192042388418453687613432820391
absolute error = 1.5192042388418453687613432820391
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.9
Order of pole = 6.945
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.399
y[1] (analytic) = 0
y[1] (numeric) = 1.5200492872159144403370450433298
absolute error = 1.5200492872159144403370450433298
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.9
Order of pole = 6.945
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.4
y[1] (analytic) = 0
y[1] (numeric) = 1.5208946370420264389445945198337
absolute error = 1.5208946370420264389445945198337
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.9
Order of pole = 6.944
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.401
y[1] (analytic) = 0
y[1] (numeric) = 1.5217402882125282801490558541517
absolute error = 1.5217402882125282801490558541517
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.9
Order of pole = 6.944
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.402
y[1] (analytic) = 0
y[1] (numeric) = 1.5225862406191228802152148855526
absolute error = 1.5225862406191228802152148855526
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.944
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.403
y[1] (analytic) = 0
y[1] (numeric) = 1.523432494152869150897063732036
absolute error = 1.523432494152869150897063732036
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.944
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.404
y[1] (analytic) = 0
y[1] (numeric) = 1.5242790487041819965010190022374
absolute error = 1.5242790487041819965010190022374
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.944
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.405
y[1] (analytic) = 0
y[1] (numeric) = 1.5251259041628323132261362653528
absolute error = 1.5251259041628323132261362653528
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.944
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.406
y[1] (analytic) = 0
y[1] (numeric) = 1.5259730604179469907845686522528
absolute error = 1.5259730604179469907845686522528
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.944
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1014.7MB, alloc=4.6MB, time=105.01
x[1] = 2.407
y[1] (analytic) = 0
y[1] (numeric) = 1.5268205173580089163055026618694
absolute error = 1.5268205173580089163055026618694
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.944
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.408
y[1] (analytic) = 0
y[1] (numeric) = 1.5276682748708569805257894038752
absolute error = 1.5276682748708569805257894038752
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.944
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.409
y[1] (analytic) = 0
y[1] (numeric) = 1.5285163328436860862704746217369
absolute error = 1.5285163328436860862704746217369
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.945
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.41
y[1] (analytic) = 0
y[1] (numeric) = 1.5293646911630471592264159095153
absolute error = 1.5293646911630471592264159095153
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.945
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.411
y[1] (analytic) = 0
y[1] (numeric) = 1.5302133497148471610121605614089
absolute error = 1.5302133497148471610121605614089
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.945
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.412
y[1] (analytic) = 0
y[1] (numeric) = 1.5310623083843491045472424751017
absolute error = 1.5310623083843491045472424751017
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.946
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.413
y[1] (analytic) = 0
y[1] (numeric) = 1.5319115670561720717240414685819
absolute error = 1.5319115670561720717240414685819
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.946
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.414
y[1] (analytic) = 0
y[1] (numeric) = 1.5327611256142912333853332653578
absolute error = 1.5327611256142912333853332653578
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.947
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.415
y[1] (analytic) = 0
y[1] (numeric) = 1.5336109839420378716106432550122
absolute error = 1.5336109839420378716106432550122
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.947
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1018.5MB, alloc=4.6MB, time=105.44
x[1] = 2.416
y[1] (analytic) = 0
y[1] (numeric) = 1.5344611419220994043145019449214
absolute error = 1.5344611419220994043145019449214
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.948
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.417
y[1] (analytic) = 0
y[1] (numeric) = 1.5353115994365194121596847848207
absolute error = 1.5353115994365194121596847848207
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.949
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.418
y[1] (analytic) = 0
y[1] (numeric) = 1.5361623563666976677885037688436
absolute error = 1.5361623563666976677885037688436
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.95
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.419
y[1] (analytic) = 0
y[1] (numeric) = 1.5370134125933901673752028997987
absolute error = 1.5370134125933901673752028997987
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.951
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.42
y[1] (analytic) = 0
y[1] (numeric) = 1.5378647679967091645024942378937
absolute error = 1.5378647679967091645024942378937
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.951
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.421
y[1] (analytic) = 0
y[1] (numeric) = 1.5387164224561232063652558509795
absolute error = 1.5387164224561232063652558509795
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.952
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.422
y[1] (analytic) = 0
y[1] (numeric) = 1.5395683758504571723043975357806
absolute error = 1.5395683758504571723043975357806
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.953
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.423
y[1] (analytic) = 0
y[1] (numeric) = 1.540420628057892314673884689618
absolute error = 1.540420628057892314673884689618
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.955
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.424
y[1] (analytic) = 0
y[1] (numeric) = 1.5412731789559663020438951799268
absolute error = 1.5412731789559663020438951799268
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.956
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1022.3MB, alloc=4.6MB, time=105.84
x[1] = 2.425
y[1] (analytic) = 0
y[1] (numeric) = 1.5421260284215732647430684845434
absolute error = 1.5421260284215732647430684845434
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.957
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.426
y[1] (analytic) = 0
y[1] (numeric) = 1.5429791763309638427427907593961
absolute error = 1.5429791763309638427427907593961
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.958
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.427
y[1] (analytic) = 0
y[1] (numeric) = 1.5438326225597452358864438319994
absolute error = 1.5438326225597452358864438319994
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.96
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.428
y[1] (analytic) = 0
y[1] (numeric) = 1.544686366982881256466530419142
absolute error = 1.544686366982881256466530419142
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.961
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.429
y[1] (analytic) = 0
y[1] (numeric) = 1.5455404094746923841525721254877
absolute error = 1.5455404094746923841525721254877
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.962
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.43
y[1] (analytic) = 0
y[1] (numeric) = 1.5463947499088558232726609965982
absolute error = 1.5463947499088558232726609965982
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.964
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.431
y[1] (analytic) = 0
y[1] (numeric) = 1.5472493881584055624515295752558
absolute error = 1.5472493881584055624515295752558
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.965
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.432
y[1] (analytic) = 0
y[1] (numeric) = 1.5481043240957324366079885440314
absolute error = 1.5481043240957324366079885440314
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.899
Order of pole = 6.967
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.433
y[1] (analytic) = 0
y[1] (numeric) = 1.5489595575925841913145651299321
absolute error = 1.5489595575925841913145651299321
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.9
Order of pole = 6.969
memory used=1026.1MB, alloc=4.6MB, time=106.22
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.434
y[1] (analytic) = 0
y[1] (numeric) = 1.5498150885200655495221594987918
absolute error = 1.5498150885200655495221594987918
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.9
Order of pole = 6.97
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.435
y[1] (analytic) = 0
y[1] (numeric) = 1.5506709167486382806525203779636
absolute error = 1.5506709167486382806525203779636
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.9
Order of pole = 6.972
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.436
y[1] (analytic) = 0
y[1] (numeric) = 1.5515270421481212720613251159544
absolute error = 1.5515270421481212720613251159544
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.9
Order of pole = 6.974
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.437
y[1] (analytic) = 0
y[1] (numeric) = 1.5523834645876906028746333170354
absolute error = 1.5523834645876906028746333170354
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.9
Order of pole = 6.976
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.438
y[1] (analytic) = 0
y[1] (numeric) = 1.553240183935879620201467077692
absolute error = 1.553240183935879620201467077692
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.9
Order of pole = 6.977
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.439
y[1] (analytic) = 0
y[1] (numeric) = 1.5540972000605790177252547001682
absolute error = 1.5540972000605790177252547001682
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.9
Order of pole = 6.979
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.44
y[1] (analytic) = 0
y[1] (numeric) = 1.5549545128290369166768585664382
absolute error = 1.5549545128290369166768585664382
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.9
Order of pole = 6.981
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.441
y[1] (analytic) = 0
y[1] (numeric) = 1.5558121221078589491918916238334
absolute error = 1.5558121221078589491918916238334
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.901
Order of pole = 6.983
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1030.0MB, alloc=4.6MB, time=106.61
x[1] = 2.442
y[1] (analytic) = 0
y[1] (numeric) = 1.5566700277630083440550106613863
absolute error = 1.5566700277630083440550106613863
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.901
Order of pole = 6.985
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.443
y[1] (analytic) = 0
y[1] (numeric) = 1.557528229659806014833858243862
absolute error = 1.557528229659806014833858243862
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.901
Order of pole = 6.988
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.444
y[1] (analytic) = 0
y[1] (numeric) = 1.5583867276629306504053088185507
absolute error = 1.5583867276629306504053088185507
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.901
Order of pole = 6.99
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.445
y[1] (analytic) = 0
y[1] (numeric) = 1.5592455216364188078766581183334
absolute error = 1.5592455216364188078766581183334
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.901
Order of pole = 6.992
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.446
y[1] (analytic) = 0
y[1] (numeric) = 1.5601046114436650079043785534264
absolute error = 1.5601046114436650079043785534264
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.901
Order of pole = 6.994
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.447
y[1] (analytic) = 0
y[1] (numeric) = 1.5609639969474218324130468136981
absolute error = 1.5609639969474218324130468136981
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.901
Order of pole = 6.997
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.448
y[1] (analytic) = 0
y[1] (numeric) = 1.5618236780098000247170333936627
absolute error = 1.5618236780098000247170333936627
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.902
Order of pole = 6.999
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.449
y[1] (analytic) = 0
y[1] (numeric) = 1.562683654492268592047527203321
absolute error = 1.562683654492268592047527203321
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.902
Order of pole = 7.001
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.45
y[1] (analytic) = 0
y[1] (numeric) = 1.5635439262556549104874518400755
absolute error = 1.5635439262556549104874518400755
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.902
Order of pole = 7.004
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1033.8MB, alloc=4.6MB, time=107.00
x[1] = 2.451
y[1] (analytic) = 0
y[1] (numeric) = 1.5644044931601448323168134701277
absolute error = 1.5644044931601448323168134701277
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.902
Order of pole = 7.006
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.452
y[1] (analytic) = 0
y[1] (numeric) = 1.565265355065282795771003602204
absolute error = 1.565265355065282795771003602204
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.902
Order of pole = 7.009
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.453
y[1] (analytic) = 0
y[1] (numeric) = 1.5661265118299719372145633322903
absolute error = 1.5661265118299719372145633322903
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.903
Order of pole = 7.011
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.454
y[1] (analytic) = 0
y[1] (numeric) = 1.5669879633124742057328988954216
absolute error = 1.5669879633124742057328988954216
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.903
Order of pole = 7.014
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.455
y[1] (analytic) = 0
y[1] (numeric) = 1.5678497093704104801444215796025
absolute error = 1.5678497093704104801444215796025
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.903
Order of pole = 7.017
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.456
y[1] (analytic) = 0
y[1] (numeric) = 1.5687117498607606884355682377766
absolute error = 1.5687117498607606884355682377766
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.903
Order of pole = 7.019
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.457
y[1] (analytic) = 0
y[1] (numeric) = 1.5695740846398639296211417765423
absolute error = 1.5695740846398639296211417765423
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.903
Order of pole = 7.022
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.458
y[1] (analytic) = 0
y[1] (numeric) = 1.5704367135634185980323941051824
absolute error = 1.5704367135634185980323941051824
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.904
Order of pole = 7.025
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.459
y[1] (analytic) = 0
y[1] (numeric) = 1.5712996364864825100352570956619
absolute error = 1.5712996364864825100352570956619
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.904
Order of pole = 7.028
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1037.6MB, alloc=4.6MB, time=107.40
x[1] = 2.46
y[1] (analytic) = 0
y[1] (numeric) = 1.5721628532634730331811101337062
absolute error = 1.5721628532634730331811101337062
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.904
Order of pole = 7.03
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.461
y[1] (analytic) = 0
y[1] (numeric) = 1.5730263637481672177924558330292
absolute error = 1.5730263637481672177924558330292
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.904
Order of pole = 7.033
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.462
y[1] (analytic) = 0
y[1] (numeric) = 1.5738901677937019309858584393923
absolute error = 1.5738901677937019309858584393923
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.905
Order of pole = 7.036
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.463
y[1] (analytic) = 0
y[1] (numeric) = 1.5747542652525739931344823685718
absolute error = 1.5747542652525739931344823685718
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.905
Order of pole = 7.039
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.464
y[1] (analytic) = 0
y[1] (numeric) = 1.5756186559766403167725512026466
absolute error = 1.5756186559766403167725512026466
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.905
Order of pole = 7.042
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.465
y[1] (analytic) = 0
y[1] (numeric) = 1.5764833398171180479440303124308
absolute error = 1.5764833398171180479440303124308
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.905
Order of pole = 7.045
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.466
y[1] (analytic) = 0
y[1] (numeric) = 1.5773483166245847099978190805095
absolute error = 1.5773483166245847099978190805095
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.905
Order of pole = 7.048
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.467
y[1] (analytic) = 0
y[1] (numeric) = 1.5782135862489783498317214693427
absolute error = 1.5782135862489783498317214693427
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.906
Order of pole = 7.051
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.468
y[1] (analytic) = 0
y[1] (numeric) = 1.5790791485395976865874464124205
absolute error = 1.5790791485395976865874464124205
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.906
Order of pole = 7.054
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1041.4MB, alloc=4.6MB, time=107.80
x[1] = 2.469
y[1] (analytic) = 0
y[1] (numeric) = 1.5799450033451022627988722036371
absolute error = 1.5799450033451022627988722036371
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.906
Order of pole = 7.058
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.47
y[1] (analytic) = 0
y[1] (numeric) = 1.5808111505135125979957917210433
absolute error = 1.5808111505135125979957917210433
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.907
Order of pole = 7.061
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.471
y[1] (analytic) = 0
y[1] (numeric) = 1.58167758989221034476533794609
absolute error = 1.58167758989221034476533794609
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.907
Order of pole = 7.064
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.472
y[1] (analytic) = 0
y[1] (numeric) = 1.5825443213279384472732718285345
absolute error = 1.5825443213279384472732718285345
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.907
Order of pole = 7.067
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.473
y[1] (analytic) = 0
y[1] (numeric) = 1.5834113446668013022472971005001
absolute error = 1.5834113446668013022472971005001
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.907
Order of pole = 7.071
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.474
y[1] (analytic) = 0
y[1] (numeric) = 1.5842786597542649224245491609055
absolute error = 1.5842786597542649224245491609055
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.908
Order of pole = 7.074
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.475
y[1] (analytic) = 0
y[1] (numeric) = 1.5851462664351571024653876337663
absolute error = 1.5851462664351571024653876337663
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.908
Order of pole = 7.077
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.476
y[1] (analytic) = 0
y[1] (numeric) = 1.58601416455366758733560465087
absolute error = 1.58601416455366758733560465087
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.908
Order of pole = 7.081
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.477
y[1] (analytic) = 0
y[1] (numeric) = 1.5868823539533482431591433211859
absolute error = 1.5868823539533482431591433211859
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.908
Order of pole = 7.084
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1045.2MB, alloc=4.6MB, time=108.19
x[1] = 2.478
y[1] (analytic) = 0
y[1] (numeric) = 1.5877508344771132305434032262526
absolute error = 1.5877508344771132305434032262526
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.909
Order of pole = 7.087
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.479
y[1] (analytic) = 0
y[1] (numeric) = 1.5886196059672391803791921228361
absolute error = 1.5886196059672391803791921228361
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.909
Order of pole = 7.091
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.48
y[1] (analytic) = 0
y[1] (numeric) = 1.589488668265365372117365341529
absolute error = 1.589488668265365372117365341529
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.909
Order of pole = 7.094
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.481
y[1] (analytic) = 0
y[1] (numeric) = 1.5903580212124939145241766428213
absolute error = 1.5903580212124939145241766428213
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.91
Order of pole = 7.098
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.482
y[1] (analytic) = 0
y[1] (numeric) = 1.5912276646489899289173465306679
absolute error = 1.5912276646489899289173465306679
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.91
Order of pole = 7.101
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.483
y[1] (analytic) = 0
y[1] (numeric) = 1.5920975984145817348848362278713
absolute error = 1.5920975984145817348848362278713
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.91
Order of pole = 7.105
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.484
y[1] (analytic) = 0
y[1] (numeric) = 1.5929678223483610384882976878405
absolute error = 1.5929678223483610384882976878405
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.911
Order of pole = 7.108
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.485
y[1] (analytic) = 0
y[1] (numeric) = 1.5938383362887831229531521536382
absolute error = 1.5938383362887831229531521536382
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.911
Order of pole = 7.112
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.486
y[1] (analytic) = 0
y[1] (numeric) = 1.5947091400736670418472318778522
absolute error = 1.5947091400736670418472318778522
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.911
Order of pole = 7.116
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1049.0MB, alloc=4.6MB, time=108.57
x[1] = 2.487
y[1] (analytic) = 0
y[1] (numeric) = 1.5955802335401958147499016858752
absolute error = 1.5955802335401958147499016858752
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.911
Order of pole = 7.119
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.488
y[1] (analytic) = 0
y[1] (numeric) = 1.596451616524916625413559100815
absolute error = 1.596451616524916625413559100815
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.912
Order of pole = 7.123
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.489
y[1] (analytic) = 0
y[1] (numeric) = 1.597323288863741022419393750644
absolute error = 1.597323288863741022419393750644
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.912
Order of pole = 7.127
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.49
y[1] (analytic) = 0
y[1] (numeric) = 1.5981952503919451223292687474936
absolute error = 1.5981952503919451223292687474936
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.912
Order of pole = 7.13
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.491
y[1] (analytic) = 0
y[1] (numeric) = 1.5990675009441698153355686653687
absolute error = 1.5990675009441698153355686653687
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.913
Order of pole = 7.134
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.492
y[1] (analytic) = 0
y[1] (numeric) = 1.5999400403544209734108406461623
absolute error = 1.5999400403544209734108406461623
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.913
Order of pole = 7.138
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.493
y[1] (analytic) = 0
y[1] (numeric) = 1.6008128684560696609590370348527
absolute error = 1.6008128684560696609590370348527
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.913
Order of pole = 7.141
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.494
y[1] (analytic) = 0
y[1] (numeric) = 1.6016859850818523479701497833321
absolute error = 1.6016859850818523479701497833321
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.914
Order of pole = 7.145
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.495
y[1] (analytic) = 0
y[1] (numeric) = 1.6025593900638711256800086686094
absolute error = 1.6025593900638711256800086686094
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.914
Order of pole = 7.149
memory used=1052.8MB, alloc=4.6MB, time=108.94
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.496
y[1] (analytic) = 0
y[1] (numeric) = 1.6034330832335939247369971453143
absolute error = 1.6034330832335939247369971453143
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.914
Order of pole = 7.153
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.497
y[1] (analytic) = 0
y[1] (numeric) = 1.604307064421854735877421394677
absolute error = 1.604307064421854735877421394677
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.915
Order of pole = 7.157
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.498
y[1] (analytic) = 0
y[1] (numeric) = 1.6051813334588538331112498426258
absolute error = 1.6051813334588538331112498426258
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.915
Order of pole = 7.16
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.499
y[1] (analytic) = 0
y[1] (numeric) = 1.6060558901741579994199220985107
absolute error = 1.6060558901741579994199220985107
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.915
Order of pole = 7.164
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.5
y[1] (analytic) = 0
y[1] (numeric) = 1.6069307343967007549679079133829
absolute error = 1.6069307343967007549679079133829
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.916
Order of pole = 7.168
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.501
y[1] (analytic) = 0
y[1] (numeric) = 1.6078058659547825878296783729155
absolute error = 1.6078058659547825878296783729155
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.916
Order of pole = 7.172
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.502
y[1] (analytic) = 0
y[1] (numeric) = 1.6086812846760711872337331251019
absolute error = 1.6086812846760711872337331251019
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.916
Order of pole = 7.176
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.503
y[1] (analytic) = 0
y[1] (numeric) = 1.6095569903876016793253089969903
absolute error = 1.6095569903876016793253089969903
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.917
Order of pole = 7.18
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1056.7MB, alloc=4.6MB, time=109.31
x[1] = 2.504
y[1] (analytic) = 0
y[1] (numeric) = 1.6104329829157768654493768780719
absolute error = 1.6104329829157768654493768780719
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.917
Order of pole = 7.184
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.505
y[1] (analytic) = 0
y[1] (numeric) = 1.6113092620863674629555152407124
absolute error = 1.6113092620863674629555152407124
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.917
Order of pole = 7.187
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.506
y[1] (analytic) = 0
y[1] (numeric) = 1.6121858277245123485262301303674
absolute error = 1.6121858277245123485262301303674
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.918
Order of pole = 7.191
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.507
y[1] (analytic) = 0
y[1] (numeric) = 1.6130626796547188040302728904319
absolute error = 1.6130626796547188040302728904319
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.918
Order of pole = 7.195
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.508
y[1] (analytic) = 0
y[1] (numeric) = 1.6139398177008627649024882886079
absolute error = 1.6139398177008627649024882886079
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.918
Order of pole = 7.199
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.509
y[1] (analytic) = 0
y[1] (numeric) = 1.6148172416861890710517070838109
absolute error = 1.6148172416861890710517070838109
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.919
Order of pole = 7.203
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.51
y[1] (analytic) = 0
y[1] (numeric) = 1.6156949514333117202981784150502
absolute error = 1.6156949514333117202981784150502
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.919
Order of pole = 7.207
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.511
y[1] (analytic) = 0
y[1] (numeric) = 1.616572946764214124342018706579
absolute error = 1.616572946764214124342018706579
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.919
Order of pole = 7.211
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.512
y[1] (analytic) = 0
y[1] (numeric) = 1.6174512275002493672641350671019
absolute error = 1.6174512275002493672641350671019
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.92
Order of pole = 7.215
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1060.5MB, alloc=4.6MB, time=109.69
x[1] = 2.513
y[1] (analytic) = 0
y[1] (numeric) = 1.6183297934621404665610624151192
absolute error = 1.6183297934621404665610624151192
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.92
Order of pole = 7.219
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.514
y[1] (analytic) = 0
y[1] (numeric) = 1.6192086444699806367151347877586
absolute error = 1.6192086444699806367151347877586
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.92
Order of pole = 7.223
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.515
y[1] (analytic) = 0
y[1] (numeric) = 1.6200877803432335553013924868738
absolute error = 1.6200877803432335553013924868738
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.921
Order of pole = 7.227
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.516
y[1] (analytic) = 0
y[1] (numeric) = 1.620967200900733631632607883954
absolute error = 1.620967200900733631632607883954
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.921
Order of pole = 7.231
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.517
y[1] (analytic) = 0
y[1] (numeric) = 1.6218469059606862779437938446631
absolute error = 1.6218469059606862779437938446631
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.234
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.518
y[1] (analytic) = 0
y[1] (numeric) = 1.6227268953406681831175398447998
absolute error = 1.6227268953406681831175398447998
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.238
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.519
y[1] (analytic) = 0
y[1] (numeric) = 1.6236071688576275889515019323103
absolute error = 1.6236071688576275889515019323103
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.242
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.52
y[1] (analytic) = 0
y[1] (numeric) = 1.6244877263278845689693537448833
absolute error = 1.6244877263278845689693537448833
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.246
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.521
y[1] (analytic) = 0
y[1] (numeric) = 1.6253685675671313097764868197842
absolute error = 1.6253685675671313097764868197842
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.25
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1064.3MB, alloc=4.6MB, time=110.07
x[1] = 2.522
y[1] (analytic) = 0
y[1] (numeric) = 1.6262496923904323949617294321345
absolute error = 1.6262496923904323949617294321345
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.254
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.523
y[1] (analytic) = 0
y[1] (numeric) = 1.6271311006122250915463341699851
absolute error = 1.6271311006122250915463341699851
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.258
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.524
y[1] (analytic) = 0
y[1] (numeric) = 1.6280127920463196389814653994571
absolute error = 1.6280127920463196389814653994571
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.262
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.525
y[1] (analytic) = 0
y[1] (numeric) = 1.628894766505899540695398691116
absolute error = 1.628894766505899540695398691116
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.266
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.526
y[1] (analytic) = 0
y[1] (numeric) = 1.6297770238035218581916251697811
absolute error = 1.6297770238035218581916251697811
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.27
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.527
y[1] (analytic) = 0
y[1] (numeric) = 1.630659563751117507699034614347
absolute error = 1.630659563751117507699034614347
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.274
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.528
y[1] (analytic) = 0
y[1] (numeric) = 1.6315423861599915593753319720814
absolute error = 1.6315423861599915593753319720814
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.277
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.529
y[1] (analytic) = 0
y[1] (numeric) = 1.632425490840823539064822763462
absolute error = 1.632425490840823539064822763462
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.281
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.53
y[1] (analytic) = 0
y[1] (numeric) = 1.6333088776036677326116836390975
absolute error = 1.6333088776036677326116836390975
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.285
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1068.1MB, alloc=4.6MB, time=110.44
x[1] = 2.531
y[1] (analytic) = 0
y[1] (numeric) = 1.634192546257953492729815109844
absolute error = 1.634192546257953492729815109844
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.289
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.532
y[1] (analytic) = 0
y[1] (numeric) = 1.6350764966124855484303542050551
absolute error = 1.6350764966124855484303542050551
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.927
Order of pole = 7.293
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.533
y[1] (analytic) = 0
y[1] (numeric) = 1.6359607284754443170079055221877
absolute error = 1.6359607284754443170079055221877
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.927
Order of pole = 7.297
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.534
y[1] (analytic) = 0
y[1] (numeric) = 1.636845241654386218586529813908
absolute error = 1.636845241654386218586529813908
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.927
Order of pole = 7.3
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.535
y[1] (analytic) = 0
y[1] (numeric) = 1.6377300359562439932265099166001
absolute error = 1.6377300359562439932265099166001
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.928
Order of pole = 7.304
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.536
y[1] (analytic) = 0
y[1] (numeric) = 1.6386151111873270205928944569543
absolute error = 1.6386151111873270205928944569543
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.928
Order of pole = 7.308
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.537
y[1] (analytic) = 0
y[1] (numeric) = 1.6395004671533216421868003813029
absolute error = 1.6395004671533216421868003813029
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.928
Order of pole = 7.312
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.538
y[1] (analytic) = 0
y[1] (numeric) = 1.6403861036592914861404359357607
absolute error = 1.6403861036592914861404359357607
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.929
Order of pole = 7.316
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.539
y[1] (analytic) = 0
y[1] (numeric) = 1.6412720205096777945767862842142
absolute error = 1.6412720205096777945767862842142
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.929
Order of pole = 7.319
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1071.9MB, alloc=4.6MB, time=110.82
x[1] = 2.54
y[1] (analytic) = 0
y[1] (numeric) = 1.642158217508299753534884485973
absolute error = 1.642158217508299753534884485973
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.929
Order of pole = 7.323
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.541
y[1] (analytic) = 0
y[1] (numeric) = 1.6430446944583548254615710656496
absolute error = 1.6430446944583548254615710656496
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.93
Order of pole = 7.327
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.542
y[1] (analytic) = 0
y[1] (numeric) = 1.643931451162419084270625894753
absolute error = 1.643931451162419084270625894753
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.93
Order of pole = 7.331
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.543
y[1] (analytic) = 0
y[1] (numeric) = 1.6448184874224475529701365677718
absolute error = 1.6448184874224475529701365677718
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.93
Order of pole = 7.334
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.544
y[1] (analytic) = 0
y[1] (numeric) = 1.6457058030397745438589478953695
absolute error = 1.6457058030397745438589478953695
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.931
Order of pole = 7.338
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.545
y[1] (analytic) = 0
y[1] (numeric) = 1.6465933978151140012930175539165
absolute error = 1.6465933978151140012930175539165
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.931
Order of pole = 7.342
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.546
y[1] (analytic) = 0
y[1] (numeric) = 1.6474812715485598470224833241366
absolute error = 1.6474812715485598470224833241366
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.931
Order of pole = 7.345
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.547
y[1] (analytic) = 0
y[1] (numeric) = 1.6483694240395863281002277223457
absolute error = 1.6483694240395863281002277223457
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.932
Order of pole = 7.349
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.548
y[1] (analytic) = 0
y[1] (numeric) = 1.6492578550870483673627061757984
absolute error = 1.6492578550870483673627061757984
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.932
Order of pole = 7.352
memory used=1075.7MB, alloc=4.6MB, time=111.19
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.549
y[1] (analytic) = 0
y[1] (numeric) = 1.6501465644891819164837852192426
absolute error = 1.6501465644891819164837852192426
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.932
Order of pole = 7.356
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.55
y[1] (analytic) = 0
y[1] (numeric) = 1.6510355520436043116023174930969
absolute error = 1.6510355520436043116023174930969
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.933
Order of pole = 7.359
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.551
y[1] (analytic) = 0
y[1] (numeric) = 1.6519248175473146315241606049184
absolute error = 1.6519248175473146315241606049184
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.933
Order of pole = 7.363
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.552
y[1] (analytic) = 0
y[1] (numeric) = 1.6528143607966940584993271752158
absolute error = 1.6528143607966940584993271752158
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.933
Order of pole = 7.366
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.553
y[1] (analytic) = 0
y[1] (numeric) = 1.6537041815875062415749336263791
absolute error = 1.6537041815875062415749336263791
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.933
Order of pole = 7.37
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.554
y[1] (analytic) = 0
y[1] (numeric) = 1.6545942797148976625245954897492
absolute error = 1.6545942797148976625245954897492
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.934
Order of pole = 7.373
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.555
y[1] (analytic) = 0
y[1] (numeric) = 1.6554846549733980043548972008314
absolute error = 1.6554846549733980043548972008314
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.934
Order of pole = 7.377
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.556
y[1] (analytic) = 0
y[1] (numeric) = 1.6563753071569205223895445265753
absolute error = 1.6563753071569205223895445265753
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.934
Order of pole = 7.38
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1079.6MB, alloc=4.6MB, time=111.57
x[1] = 2.557
y[1] (analytic) = 0
y[1] (numeric) = 1.6572662360587624179317879216889
absolute error = 1.6572662360587624179317879216889
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.384
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.558
y[1] (analytic) = 0
y[1] (numeric) = 1.6581574414716052145056852433439
absolute error = 1.6581574414716052145056852433439
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.387
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.559
y[1] (analytic) = 0
y[1] (numeric) = 1.6590489231875151366767523655482
absolute error = 1.6590489231875151366767523655482
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.39
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.56
y[1] (analytic) = 0
y[1] (numeric) = 1.6599406809979434914525303261267
absolute error = 1.6599406809979434914525303261267
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.393
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.561
y[1] (analytic) = 0
y[1] (numeric) = 1.6608327146937270522635777108578
absolute error = 1.6608327146937270522635777108578
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.397
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.562
y[1] (analytic) = 0
y[1] (numeric) = 1.6617250240650884455253770310651
absolute error = 1.6617250240650884455253770310651
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.4
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.563
y[1] (analytic) = 0
y[1] (numeric) = 1.6626176089016365397816238830707
absolute error = 1.6626176089016365397816238830707
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.403
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.564
y[1] (analytic) = 0
y[1] (numeric) = 1.6635104689923668374293476905755
absolute error = 1.6635104689923668374293476905755
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.406
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.565
y[1] (analytic) = 0
y[1] (numeric) = 1.6644036041256618690262928244545
absolute error = 1.6644036041256618690262928244545
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.409
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1083.4MB, alloc=4.6MB, time=111.94
x[1] = 2.566
y[1] (analytic) = 0
y[1] (numeric) = 1.6652970140892915901809688688429
absolute error = 1.6652970140892915901809688688429
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.413
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.567
y[1] (analytic) = 0
y[1] (numeric) = 1.6661906986704137810257587579502
absolute error = 1.6661906986704137810257587579502
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.416
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.568
y[1] (analytic) = 0
y[1] (numeric) = 1.6670846576555744482734534449788
absolute error = 1.6670846576555744482734534449788
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.419
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.569
y[1] (analytic) = 0
y[1] (numeric) = 1.6679788908307082298575616830512
absolute error = 1.6679788908307082298575616830512
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.422
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.57
y[1] (analytic) = 0
y[1] (numeric) = 1.6688733979811388021567233983686
absolute error = 1.6688733979811388021567233983686
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.425
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.571
y[1] (analytic) = 0
y[1] (numeric) = 1.6697681788915792898035350181469
absolute error = 1.6697681788915792898035350181469
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.428
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.572
y[1] (analytic) = 0
y[1] (numeric) = 1.6706632333461326780780749804072
absolute error = 1.6706632333461326780780749804072
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.431
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.573
y[1] (analytic) = 0
y[1] (numeric) = 1.6715585611282922278863974996498
absolute error = 1.6715585611282922278863974996498
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.433
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.574
y[1] (analytic) = 0
y[1] (numeric) = 1.6724541620209418933242424920201
absolute error = 1.6724541620209418933242424920201
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.436
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1087.2MB, alloc=4.6MB, time=112.32
x[1] = 2.575
y[1] (analytic) = 0
y[1] (numeric) = 1.6733500358063567418261893759921
absolute error = 1.6733500358063567418261893759921
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.439
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.576
y[1] (analytic) = 0
y[1] (numeric) = 1.6742461822662033769004622600634
absolute error = 1.6742461822662033769004622600634
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.442
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.577
y[1] (analytic) = 0
y[1] (numeric) = 1.6751426011815403634495738076799
absolute error = 1.6751426011815403634495738076799
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.445
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.578
y[1] (analytic) = 0
y[1] (numeric) = 1.6760392923328186556769748318059
absolute error = 1.6760392923328186556769748318059
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.447
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.579
y[1] (analytic) = 0
y[1] (numeric) = 1.6769362554998820275798564174339
absolute error = 1.6769362554998820275798564174339
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.45
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.58
y[1] (analytic) = 0
y[1] (numeric) = 1.6778334904619675060282311001008
absolute error = 1.6778334904619675060282311001008
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.453
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.581
y[1] (analytic) = 0
y[1] (numeric) = 1.6787309969977058064303993423578
absolute error = 1.6787309969977058064303993423578
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.455
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.582
y[1] (analytic) = 0
y[1] (numeric) = 1.6796287748851217709848872483404
absolute error = 1.6796287748851217709848872483404
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.458
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.583
y[1] (analytic) = 0
y[1] (numeric) = 1.6805268239016348095189211393179
absolute error = 1.6805268239016348095189211393179
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.46
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1091.0MB, alloc=4.6MB, time=112.70
x[1] = 2.584
y[1] (analytic) = 0
y[1] (numeric) = 1.6814251438240593429134842805813
absolute error = 1.6814251438240593429134842805813
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.463
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.585
y[1] (analytic) = 0
y[1] (numeric) = 1.6823237344286052491149807024702
absolute error = 1.6823237344286052491149807024702
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.465
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.586
y[1] (analytic) = 0
y[1] (numeric) = 1.6832225954908783117335106959555
absolute error = 1.6832225954908783117335106959555
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.468
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.587
y[1] (analytic) = 0
y[1] (numeric) = 1.6841217267858806712277421862033
absolute error = 1.6841217267858806712277421862033
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.47
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.588
y[1] (analytic) = 0
y[1] (numeric) = 1.6850211280880112786763417961606
absolute error = 1.6850211280880112786763417961606
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.472
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.589
y[1] (analytic) = 0
y[1] (numeric) = 1.6859207991710663521359090066395
absolute error = 1.6859207991710663521359090066395
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.475
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.59
y[1] (analytic) = 0
y[1] (numeric) = 1.6868207398082398355853363998542
absolute error = 1.6868207398082398355853363998542
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.477
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.591
y[1] (analytic) = 0
y[1] (numeric) = 1.6877209497721238604564985400958
absolute error = 1.6877209497721238604564985400958
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.479
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.592
y[1] (analytic) = 0
y[1] (numeric) = 1.6886214288347092097511515984358
absolute error = 1.6886214288347092097511515984358
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.481
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1094.8MB, alloc=4.6MB, time=113.07
x[1] = 2.593
y[1] (analytic) = 0
y[1] (numeric) = 1.6895221767673857847439053682437
absolute error = 1.6895221767673857847439053682437
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.483
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.594
y[1] (analytic) = 0
y[1] (numeric) = 1.690423193340943074271108845108
absolute error = 1.690423193340943074271108845108
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.485
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.595
y[1] (analytic) = 0
y[1] (numeric) = 1.6913244783255706266054700586809
absolute error = 1.6913244783255706266054700586809
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.487
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.596
y[1] (analytic) = 0
y[1] (numeric) = 1.6922260314908585239162103452419
absolute error = 1.6922260314908585239162103452419
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.489
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.597
y[1] (analytic) = 0
y[1] (numeric) = 1.6931278526057978593145327386184
absolute error = 1.6931278526057978593145327386184
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.491
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.598
y[1] (analytic) = 0
y[1] (numeric) = 1.6940299414387812164841636337245
absolute error = 1.6940299414387812164841636337245
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.493
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.599
y[1] (analytic) = 0
y[1] (numeric) = 1.6949322977576031518967063416104
absolute error = 1.6949322977576031518967063416104
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.495
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.6
y[1] (analytic) = 0
y[1] (numeric) = 1.6958349213294606796115246077674
absolute error = 1.6958349213294606796115246077674
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.497
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.601
y[1] (analytic) = 0
y[1] (numeric) = 1.6967378119209537586598536067342
absolute error = 1.6967378119209537586598536067342
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.499
memory used=1098.6MB, alloc=4.6MB, time=113.45
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.602
y[1] (analytic) = 0
y[1] (numeric) = 1.6976409692980857830128153560155
absolute error = 1.6976409692980857830128153560155
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.5
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.603
y[1] (analytic) = 0
y[1] (numeric) = 1.6985443932262640741329949111763
absolute error = 1.6985443932262640741329949111763
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.502
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.604
y[1] (analytic) = 0
y[1] (numeric) = 1.6994480834703003761092131119405
absolute error = 1.6994480834703003761092131119405
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.504
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.605
y[1] (analytic) = 0
y[1] (numeric) = 1.7003520397944113533741110464157
absolute error = 1.7003520397944113533741110464157
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.505
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.606
y[1] (analytic) = 0
y[1] (numeric) = 1.7012562619622190910041407874159
absolute error = 1.7012562619622190910041407874159
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.507
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.607
y[1] (analytic) = 0
y[1] (numeric) = 1.7021607497367515976015363314806
absolute error = 1.7021607497367515976015363314806
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.508
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.608
y[1] (analytic) = 0
y[1] (numeric) = 1.7030655028804433107578180378154
absolute error = 1.7030655028804433107578180378154
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.51
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.609
y[1] (analytic) = 0
y[1] (numeric) = 1.7039705211551356050983632212309
absolute error = 1.7039705211551356050983632212309
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.511
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1102.4MB, alloc=4.6MB, time=113.82
x[1] = 2.61
y[1] (analytic) = 0
y[1] (numeric) = 1.7048758043220773029075549004546
absolute error = 1.7048758043220773029075549004546
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.513
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.611
y[1] (analytic) = 0
y[1] (numeric) = 1.7057813521419251873340000411644
absolute error = 1.7057813521419251873340000411644
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.514
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.612
y[1] (analytic) = 0
y[1] (numeric) = 1.706687164374744518175287961958
absolute error = 1.706687164374744518175287961958
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.515
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.613
y[1] (analytic) = 0
y[1] (numeric) = 1.7075932407800095502417388914651
absolute error = 1.7075932407800095502417388914651
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.517
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.614
y[1] (analytic) = 0
y[1] (numeric) = 1.7084995811166040542985719761467
absolute error = 1.7084995811166040542985719761467
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.518
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.615
y[1] (analytic) = 0
y[1] (numeric) = 1.7094061851428218405859013412356
absolute error = 1.7094061851428218405859013412356
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.519
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.616
y[1] (analytic) = 0
y[1] (numeric) = 1.7103130526163672849159481019838
absolute error = 1.7103130526163672849159481019838
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.52
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.617
y[1] (analytic) = 0
y[1] (numeric) = 1.7112201832943558573468355091149
absolute error = 1.7112201832943558573468355091149
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.521
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.618
y[1] (analytic) = 0
y[1] (numeric) = 1.7121275769333146534323136913693
absolute error = 1.7121275769333146534323136913693
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.522
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1106.3MB, alloc=4.6MB, time=114.20
x[1] = 2.619
y[1] (analytic) = 0
y[1] (numeric) = 1.7130352332891829280467397294927
absolute error = 1.7130352332891829280467397294927
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.523
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.62
y[1] (analytic) = 0
y[1] (numeric) = 1.7139431521173126317846180601925
absolute error = 1.7139431521173126317846180601925
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.524
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.621
y[1] (analytic) = 0
y[1] (numeric) = 1.71485133317246894993398546569
absolute error = 1.71485133317246894993398546569
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.525
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.622
y[1] (analytic) = 0
y[1] (numeric) = 1.7157597762088308440229041547642
absolute error = 1.7157597762088308440229041547642
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.526
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.623
y[1] (analytic) = 0
y[1] (numeric) = 1.7166684809799915959383056848391
absolute error = 1.7166684809799915959383056848391
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.527
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.624
y[1] (analytic) = 0
y[1] (numeric) = 1.7175774472389593546164077119407
absolute error = 1.7175774472389593546164077119407
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.528
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.625
y[1] (analytic) = 0
y[1] (numeric) = 1.7184866747381576853039047864713
absolute error = 1.7184866747381576853039047864713
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.528
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.626
y[1] (analytic) = 0
y[1] (numeric) = 1.7193961632294261213891136379466
absolute error = 1.7193961632294261213891136379466
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.529
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.627
y[1] (analytic) = 0
y[1] (numeric) = 1.7203059124640207188022326113431
absolute error = 1.7203059124640207188022326113431
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.53
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1110.1MB, alloc=4.6MB, time=114.58
x[1] = 2.628
y[1] (analytic) = 0
y[1] (numeric) = 1.7212159221926146129838541317426
absolute error = 1.7212159221926146129838541317426
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.53
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.629
y[1] (analytic) = 0
y[1] (numeric) = 1.7221261921652985784208482827609
absolute error = 1.7221261921652985784208482827609
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.531
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.63
y[1] (analytic) = 0
y[1] (numeric) = 1.7230367221315815907487147880479
absolute error = 1.7230367221315815907487147880479
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.531
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.631
y[1] (analytic) = 0
y[1] (numeric) = 1.7239475118403913914194798841686
absolute error = 1.7239475118403913914194798841686
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.532
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.632
y[1] (analytic) = 0
y[1] (numeric) = 1.724858561040075054934193767655
absolute error = 1.724858561040075054934193767655
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.532
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.633
y[1] (analytic) = 0
y[1] (numeric) = 1.725769869478399558639063489185
absolute error = 1.725769869478399558639063489185
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.533
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.634
y[1] (analytic) = 0
y[1] (numeric) = 1.7266814369025523550842353539324
absolute error = 1.7266814369025523550842353539324
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.533
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.635
y[1] (analytic) = 0
y[1] (numeric) = 1.7275932630591419469442200693657
absolute error = 1.7275932630591419469442200693657
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.533
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.636
y[1] (analytic) = 0
y[1] (numeric) = 1.7285053476941984644989330603949
absolute error = 1.7285053476941984644989330603949
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.534
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1113.9MB, alloc=4.6MB, time=114.95
x[1] = 2.637
y[1] (analytic) = 0
y[1] (numeric) = 1.7294176905531742456743015469947
absolute error = 1.7294176905531742456743015469947
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.534
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.638
y[1] (analytic) = 0
y[1] (numeric) = 1.730330291380944418641369151514
absolute error = 1.730330291380944418641369151514
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.534
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.639
y[1] (analytic) = 0
y[1] (numeric) = 1.7312431499218074869728079720386
absolute error = 1.7312431499218074869728079720386
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.534
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.64
y[1] (analytic) = 0
y[1] (numeric) = 1.7321562659194859173557272246432
absolute error = 1.7321562659194859173557272246432
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.534
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.641
y[1] (analytic) = 0
y[1] (numeric) = 1.7330696391171267298596467213856
absolute error = 1.7330696391171267298596467213856
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.534
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.642
y[1] (analytic) = 0
y[1] (numeric) = 1.7339832692573020907584826126862
absolute error = 1.7339832692573020907584826126862
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.534
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.643
y[1] (analytic) = 0
y[1] (numeric) = 1.7348971560820099079053719825429
absolute error = 1.7348971560820099079053719825429
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.534
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.644
y[1] (analytic) = 0
y[1] (numeric) = 1.7358112993326744286591420430812
absolute error = 1.7358112993326744286591420430812
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.534
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.645
y[1] (analytic) = 0
y[1] (numeric) = 1.7367256987501468403612088314674
absolute error = 1.7367256987501468403612088314674
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.534
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1117.7MB, alloc=4.6MB, time=115.32
x[1] = 2.646
y[1] (analytic) = 0
y[1] (numeric) = 1.7376403540747058733616694674586
absolute error = 1.7376403540747058733616694674586
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.534
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.647
y[1] (analytic) = 0
y[1] (numeric) = 1.7385552650460584065933311840526
absolute error = 1.7385552650460584065933311840526
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.534
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.648
y[1] (analytic) = 0
y[1] (numeric) = 1.7394704314033400756923994970753
absolute error = 1.7394704314033400756923994970753
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.533
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.649
y[1] (analytic) = 0
y[1] (numeric) = 1.7403858528851158836645270323364
absolute error = 1.7403858528851158836645270323364
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.533
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.65
y[1] (analytic) = 0
y[1] (numeric) = 1.741301529229380814094903681426
absolute error = 1.741301529229380814094903681426
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.533
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.651
y[1] (analytic) = 0
y[1] (numeric) = 1.7422174601735604469010479095589
absolute error = 1.7422174601735604469010479095589
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.532
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.652
y[1] (analytic) = 0
y[1] (numeric) = 1.7431336454545115766269381913281
absolute error = 1.7431336454545115766269381913281
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.532
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.653
y[1] (analytic) = 0
y[1] (numeric) = 1.7440500848085228332771027030439
absolute error = 1.7440500848085228332771027030439
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.532
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.654
y[1] (analytic) = 0
y[1] (numeric) = 1.7449667779713153056892645537435
absolute error = 1.7449667779713153056892645537435
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=1121.5MB, alloc=4.6MB, time=115.70
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.531
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.655
y[1] (analytic) = 0
y[1] (numeric) = 1.7458837246780431674441189911981
absolute error = 1.7458837246780431674441189911981
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.531
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.656
y[1] (analytic) = 0
y[1] (numeric) = 1.7468009246632943053107981745495
absolute error = 1.7468009246632943053107981745495
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.53
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.657
y[1] (analytic) = 0
y[1] (numeric) = 1.7477183776610909502265582618215
absolute error = 1.7477183776610909502265582618215
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.529
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.658
y[1] (analytic) = 0
y[1] (numeric) = 1.7486360834048903108092027187008
absolute error = 1.7486360834048903108092027187008
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.529
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.659
y[1] (analytic) = 0
y[1] (numeric) = 1.7495540416275852094007349149106
absolute error = 1.7495540416275852094007349149106
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.528
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.66
y[1] (analytic) = 0
y[1] (numeric) = 1.7504722520615047206407122364419
absolute error = 1.7504722520615047206407122364419
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.527
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.661
y[1] (analytic) = 0
y[1] (numeric) = 1.7513907144384148125677531061001
absolute error = 1.7513907144384148125677531061001
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.527
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.662
y[1] (analytic) = 0
y[1] (numeric) = 1.752309428489518990247627471505
absolute error = 1.752309428489518990247627471505
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.526
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1125.3MB, alloc=4.6MB, time=116.07
x[1] = 2.663
y[1] (analytic) = 0
y[1] (numeric) = 1.7532283939454589419263404890884
absolute error = 1.7532283939454589419263404890884
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.525
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.664
y[1] (analytic) = 0
y[1] (numeric) = 1.7541476105363151877065983050049
absolute error = 1.7541476105363151877065983050049
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.524
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.665
y[1] (analytic) = 0
y[1] (numeric) = 1.755067077991607730746024009438
absolute error = 1.755067077991607730746024009438
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.523
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.666
y[1] (analytic) = 0
y[1] (numeric) = 1.7559867960402967109754710197978
absolute error = 1.7559867960402967109754710197978
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.523
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.667
y[1] (analytic) = 0
y[1] (numeric) = 1.7569067644107830613357603309873
absolute error = 1.7569067644107830613357603309873
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.522
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.668
y[1] (analytic) = 0
y[1] (numeric) = 1.7578269828309091665311472575202
absolute error = 1.7578269828309091665311472575202
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.521
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.669
y[1] (analytic) = 0
y[1] (numeric) = 1.7587474510279595242978024830222
absolute error = 1.7587474510279595242978024830222
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.52
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.67
y[1] (analytic) = 0
y[1] (numeric) = 1.7596681687286614091855714277984
absolute error = 1.7596681687286614091855714277984
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.519
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.671
y[1] (analytic) = 0
y[1] (numeric) = 1.7605891356591855388512551449214
absolute error = 1.7605891356591855388512551449214
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.518
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1129.1MB, alloc=4.6MB, time=116.44
x[1] = 2.672
y[1] (analytic) = 0
y[1] (numeric) = 1.7615103515451467428616351599417
absolute error = 1.7615103515451467428616351599417
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.517
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.673
y[1] (analytic) = 0
y[1] (numeric) = 1.762431816111604634004443879075
absolute error = 1.762431816111604634004443879075
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.515
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.674
y[1] (analytic) = 0
y[1] (numeric) = 1.7633535290830642821054614058181
absolute error = 1.7633535290830642821054614058181
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.514
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.675
y[1] (analytic) = 0
y[1] (numeric) = 1.7642754901834768903498988266324
absolute error = 1.7642754901834768903498988266324
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.513
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.676
y[1] (analytic) = 0
y[1] (numeric) = 1.7651976991362404741062072528425
absolute error = 1.7651976991362404741062072528425
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.512
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.677
y[1] (analytic) = 0
y[1] (numeric) = 1.7661201556642005422504311384714
absolute error = 1.7661201556642005422504311384714
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.511
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.678
y[1] (analytic) = 0
y[1] (numeric) = 1.7670428594896507809892036326117
absolute error = 1.7670428594896507809892036326117
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.509
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.679
y[1] (analytic) = 0
y[1] (numeric) = 1.7679658103343337401794609703513
absolute error = 1.7679658103343337401794609703513
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.508
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.68
y[1] (analytic) = 0
y[1] (numeric) = 1.7688890079194415221429321584764
absolute error = 1.7688890079194415221429321584764
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.507
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1133.0MB, alloc=4.6MB, time=116.81
x[1] = 2.681
y[1] (analytic) = 0
y[1] (numeric) = 1.7698124519656164729734394713979
absolute error = 1.7698124519656164729734394713979
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.505
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.682
y[1] (analytic) = 0
y[1] (numeric) = 1.7707361421929518763350245392341
absolute error = 1.7707361421929518763350245392341
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.504
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.683
y[1] (analytic) = 0
y[1] (numeric) = 1.7716600783209926497488940839724
absolute error = 1.7716600783209926497488940839724
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.503
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.684
y[1] (analytic) = 0
y[1] (numeric) = 1.7725842600687360433671586413599
absolute error = 1.7725842600687360433671586413599
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.501
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.685
y[1] (analytic) = 0
y[1] (numeric) = 1.7735086871546323412313168958867
absolute error = 1.7735086871546323412313168958867
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.5
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.686
y[1] (analytic) = 0
y[1] (numeric) = 1.7744333592965855650134175541557
absolute error = 1.7744333592965855650134175541557
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.498
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.687
y[1] (analytic) = 0
y[1] (numeric) = 1.7753582762119541802378099883305
absolute error = 1.7753582762119541802378099883305
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.497
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.688
y[1] (analytic) = 0
y[1] (numeric) = 1.7762834376175518049813741964463
absolute error = 1.7762834376175518049813741964463
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.495
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.689
y[1] (analytic) = 0
y[1] (numeric) = 1.7772088432296479210500999504078
absolute error = 1.7772088432296479210500999504078
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.494
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1136.8MB, alloc=4.6MB, time=117.18
x[1] = 2.69
y[1] (analytic) = 0
y[1] (numeric) = 1.7781344927639685876298643357207
absolute error = 1.7781344927639685876298643357207
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.492
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.691
y[1] (analytic) = 0
y[1] (numeric) = 1.7790603859356971574092362296432
absolute error = 1.7790603859356971574092362296432
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.491
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.692
y[1] (analytic) = 0
y[1] (numeric) = 1.7799865224594749951721156167538
absolute error = 1.7799865224594749951721156167538
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.489
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.693
y[1] (analytic) = 0
y[1] (numeric) = 1.7809129020494021988579950031389
absolute error = 1.7809129020494021988579950031389
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.488
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.694
y[1] (analytic) = 0
y[1] (numeric) = 1.7818395244190383230876095627587
absolute error = 1.7818395244190383230876095627587
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.486
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.695
y[1] (analytic) = 0
y[1] (numeric) = 1.7827663892814031051517220322889
absolute error = 1.7827663892814031051517220322889
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.484
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.696
y[1] (analytic) = 0
y[1] (numeric) = 1.7836934963489771934607677640972
absolute error = 1.7836934963489771934607677640972
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.483
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.697
y[1] (analytic) = 0
y[1] (numeric) = 1.7846208453337028784530647512438
absolute error = 1.7846208453337028784530647512438
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.481
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.698
y[1] (analytic) = 0
y[1] (numeric) = 1.7855484359469848259592728537302
absolute error = 1.7855484359469848259592728537302
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.479
memory used=1140.6MB, alloc=4.6MB, time=117.55
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.699
y[1] (analytic) = 0
y[1] (numeric) = 1.7864762678996908130207658819019
absolute error = 1.7864762678996908130207658819019
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.478
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.7
y[1] (analytic) = 0
y[1] (numeric) = 1.7874043409021524661595596311801
absolute error = 1.7874043409021524661595596311801
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.476
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.701
y[1] (analytic) = 0
y[1] (numeric) = 1.7883326546641660020974184123948
absolute error = 1.7883326546641660020974184123948
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.474
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.702
y[1] (analytic) = 0
y[1] (numeric) = 1.7892612088949929709217420841589
absolute error = 1.7892612088949929709217420841589
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.472
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.703
y[1] (analytic) = 0
y[1] (numeric) = 1.790190003303361001695815068196
absolute error = 1.790190003303361001695815068196
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.471
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.704
y[1] (analytic) = 0
y[1] (numeric) = 1.7911190375974645505109783155631
absolute error = 1.7911190375974645505109783155631
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.469
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.705
y[1] (analytic) = 0
y[1] (numeric) = 1.7920483114849656509782646915233
absolute error = 1.7920483114849656509782646915233
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.467
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.706
y[1] (analytic) = 0
y[1] (numeric) = 1.7929778246729946671570177596728
absolute error = 1.7929778246729946671570177596728
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.465
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1144.4MB, alloc=4.6MB, time=117.92
x[1] = 2.707
y[1] (analytic) = 0
y[1] (numeric) = 1.7939075768681510489179934720452
absolute error = 1.7939075768681510489179934720452
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.463
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.708
y[1] (analytic) = 0
y[1] (numeric) = 1.7948375677765040897384238115494
absolute error = 1.7948375677765040897384238115494
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.462
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.709
y[1] (analytic) = 0
y[1] (numeric) = 1.7957677971035936869265009864817
absolute error = 1.7957677971035936869265009864817
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.46
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.71
y[1] (analytic) = 0
y[1] (numeric) = 1.7966982645544311042727203442332
absolute error = 1.7966982645544311042727203442332
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.458
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.711
y[1] (analytic) = 0
y[1] (numeric) = 1.7976289698334997371254997529271
absolute error = 1.7976289698334997371254997529271
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.456
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.712
y[1] (analytic) = 0
y[1] (numeric) = 1.7985599126447558798884727958092
absolute error = 1.7985599126447558798884727958092
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.454
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.713
y[1] (analytic) = 0
y[1] (numeric) = 1.7994910926916294959368327340187
absolute error = 1.7994910926916294959368327340187
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.452
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.714
y[1] (analytic) = 0
y[1] (numeric) = 1.8004225096770249899500838191276
absolute error = 1.8004225096770249899500838191276
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.45
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.715
y[1] (analytic) = 0
y[1] (numeric) = 1.8013541633033219826585361777915
absolute error = 1.8013541633033219826585361777915
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.449
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1148.2MB, alloc=4.6MB, time=118.30
x[1] = 2.716
y[1] (analytic) = 0
y[1] (numeric) = 1.8022860532723760880008601472498
absolute error = 1.8022860532723760880008601472498
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.447
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.717
y[1] (analytic) = 0
y[1] (numeric) = 1.8032181792855196926899956124821
absolute error = 1.8032181792855196926899956124821
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.445
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.718
y[1] (analytic) = 0
y[1] (numeric) = 1.8041505410435627381846915838145
absolute error = 1.8041505410435627381846915838145
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.443
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.719
y[1] (analytic) = 0
y[1] (numeric) = 1.805083138246793505063930957916
absolute error = 1.805083138246793505063930957916
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.441
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.72
y[1] (analytic) = 0
y[1] (numeric) = 1.8060159705949793998014751256658
absolute error = 1.8060159705949793998014751256658
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.439
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.721
y[1] (analytic) = 0
y[1] (numeric) = 1.8069490377873677439377428275531
absolute error = 1.8069490377873677439377428275531
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.934
Order of pole = 7.437
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.722
y[1] (analytic) = 0
y[1] (numeric) = 1.8078823395226865656462174113297
absolute error = 1.8078823395226865656462174113297
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.934
Order of pole = 7.435
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.723
y[1] (analytic) = 0
y[1] (numeric) = 1.8088158754991453936915564178099
absolute error = 1.8088158754991453936915564178099
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.934
Order of pole = 7.433
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.724
y[1] (analytic) = 0
y[1] (numeric) = 1.8097496454144360537765572092452
absolute error = 1.8097496454144360537765572092452
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.934
Order of pole = 7.432
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1152.0MB, alloc=4.6MB, time=118.67
x[1] = 2.725
y[1] (analytic) = 0
y[1] (numeric) = 1.8106836489657334672751121608334
absolute error = 1.8106836489657334672751121608334
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.934
Order of pole = 7.43
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.726
y[1] (analytic) = 0
y[1] (numeric) = 1.8116178858496964523482667598864
absolute error = 1.8116178858496964523482667598864
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.933
Order of pole = 7.428
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.727
y[1] (analytic) = 0
y[1] (numeric) = 1.8125523557624685274404737992267
absolute error = 1.8125523557624685274404737992267
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.933
Order of pole = 7.426
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.728
y[1] (analytic) = 0
y[1] (numeric) = 1.8134870583996787171531167117421
absolute error = 1.8134870583996787171531167117421
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.933
Order of pole = 7.424
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.729
y[1] (analytic) = 0
y[1] (numeric) = 1.8144219934564423604923549719433
absolute error = 1.8144219934564423604923549719433
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.933
Order of pole = 7.422
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.73
y[1] (analytic) = 0
y[1] (numeric) = 1.8153571606273619214883243880791
absolute error = 1.8153571606273619214883243880791
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.933
Order of pole = 7.42
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.731
y[1] (analytic) = 0
y[1] (numeric) = 1.8162925596065278021827050251094
absolute error = 1.8162925596065278021827050251094
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.932
Order of pole = 7.418
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.732
y[1] (analytic) = 0
y[1] (numeric) = 1.8172281900875191579816494348522
absolute error = 1.8172281900875191579816494348522
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.932
Order of pole = 7.416
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.733
y[1] (analytic) = 0
y[1] (numeric) = 1.8181640517634047153710438251512
absolute error = 1.8181640517634047153710438251512
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.932
Order of pole = 7.415
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1155.8MB, alloc=4.6MB, time=119.04
x[1] = 2.734
y[1] (analytic) = 0
y[1] (numeric) = 1.8191001443267435919910547751908
absolute error = 1.8191001443267435919910547751908
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.932
Order of pole = 7.413
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.735
y[1] (analytic) = 0
y[1] (numeric) = 1.820036467469586119066894099355
absolute error = 1.820036467469586119066894099355
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.931
Order of pole = 7.411
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.736
y[1] (analytic) = 0
y[1] (numeric) = 1.8209730208834746661927144775265
absolute error = 1.8209730208834746661927144775265
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.931
Order of pole = 7.409
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.737
y[1] (analytic) = 0
y[1] (numeric) = 1.8219098042594444684655285056859
absolute error = 1.8219098042594444684655285056859
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.931
Order of pole = 7.407
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.738
y[1] (analytic) = 0
y[1] (numeric) = 1.8228468172880244559660238773425
absolute error = 1.8228468172880244559660238773425
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.931
Order of pole = 7.405
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.739
y[1] (analytic) = 0
y[1] (numeric) = 1.8237840596592380855831274839418
absolute error = 1.8237840596592380855831274839418
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.931
Order of pole = 7.404
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.74
y[1] (analytic) = 0
y[1] (numeric) = 1.8247215310626041751791513211899
absolute error = 1.8247215310626041751791513211899
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.93
Order of pole = 7.402
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.741
y[1] (analytic) = 0
y[1] (numeric) = 1.8256592311871377400923332084492
absolute error = 1.8256592311871377400923332084492
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.93
Order of pole = 7.4
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.742
y[1] (analytic) = 0
y[1] (numeric) = 1.8265971597213508319735654702333
absolute error = 1.8265971597213508319735654702333
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.93
Order of pole = 7.398
memory used=1159.7MB, alloc=4.6MB, time=119.41
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.743
y[1] (analytic) = 0
y[1] (numeric) = 1.8275353163532533799540848925929
absolute error = 1.8275353163532533799540848925929
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.93
Order of pole = 7.396
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.744
y[1] (analytic) = 0
y[1] (numeric) = 1.8284737007703540341408774530862
absolute error = 1.8284737007703540341408774530862
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.93
Order of pole = 7.395
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.745
y[1] (analytic) = 0
y[1] (numeric) = 1.8294123126596610114365315312936
absolute error = 1.8294123126596610114365315312936
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.929
Order of pole = 7.393
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.746
y[1] (analytic) = 0
y[1] (numeric) = 1.8303511517076829436802535377125
absolute error = 1.8303511517076829436802535377125
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.929
Order of pole = 7.391
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.747
y[1] (analytic) = 0
y[1] (numeric) = 1.8312902176004297281067401525871
absolute error = 1.8312902176004297281067401525871
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.929
Order of pole = 7.389
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.748
y[1] (analytic) = 0
y[1] (numeric) = 1.8322295100234133801195816430265
absolute error = 1.8322295100234133801195816430265
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.929
Order of pole = 7.388
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.749
y[1] (analytic) = 0
y[1] (numeric) = 1.8331690286616488883758510268816
absolute error = 1.8331690286616488883758510268816
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.929
Order of pole = 7.386
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.75
y[1] (analytic) = 0
y[1] (numeric) = 1.8341087731996550721785141755207
absolute error = 1.8341087731996550721785141755207
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.929
Order of pole = 7.384
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1163.5MB, alloc=4.6MB, time=119.78
x[1] = 2.751
y[1] (analytic) = 0
y[1] (numeric) = 1.8350487433214554411732762951037
absolute error = 1.8350487433214554411732762951037
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.928
Order of pole = 7.383
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.752
y[1] (analytic) = 0
y[1] (numeric) = 1.8359889387105790573464605974406
absolute error = 1.8359889387105790573464605974406
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.928
Order of pole = 7.381
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.753
y[1] (analytic) = 0
y[1] (numeric) = 1.836929359050061399320495367267
absolute error = 1.836929359050061399320495367267
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.928
Order of pole = 7.379
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.754
y[1] (analytic) = 0
y[1] (numeric) = 1.8378700040224452289435660530137
absolute error = 1.8378700040224452289435660530137
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.928
Order of pole = 7.378
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.755
y[1] (analytic) = 0
y[1] (numeric) = 1.8388108733097814601699694531267
absolute error = 1.8388108733097814601699694531267
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.928
Order of pole = 7.376
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.756
y[1] (analytic) = 0
y[1] (numeric) = 1.8397519665936300302276875399379
absolute error = 1.8397519665936300302276875399379
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.927
Order of pole = 7.375
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.757
y[1] (analytic) = 0
y[1] (numeric) = 1.8406932835550607730696789582374
absolute error = 1.8406932835550607730696789582374
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.927
Order of pole = 7.373
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.758
y[1] (analytic) = 0
y[1] (numeric) = 1.8416348238746542951053667562843
absolute error = 1.8416348238746542951053667562843
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.927
Order of pole = 7.371
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.759
y[1] (analytic) = 0
y[1] (numeric) = 1.8425765872325028532087814532536
absolute error = 1.8425765872325028532087814532536
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.927
Order of pole = 7.37
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1167.3MB, alloc=4.6MB, time=120.16
x[1] = 2.76
y[1] (analytic) = 0
y[1] (numeric) = 1.843518573308211234999799119284
absolute error = 1.843518573308211234999799119284
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.927
Order of pole = 7.368
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.761
y[1] (analytic) = 0
y[1] (numeric) = 1.8444607817808976413948947425989
absolute error = 1.8444607817808976413948947425989
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.927
Order of pole = 7.367
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.762
y[1] (analytic) = 0
y[1] (numeric) = 1.8454032123291945714238117828574
absolute error = 1.8454032123291945714238117828574
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.365
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.763
y[1] (analytic) = 0
y[1] (numeric) = 1.8463458646312497093085294611842
absolute error = 1.8463458646312497093085294611842
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.364
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.764
y[1] (analytic) = 0
y[1] (numeric) = 1.8472887383647268138008900154628
absolute error = 1.8472887383647268138008900154628
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.363
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.765
y[1] (analytic) = 0
y[1] (numeric) = 1.8482318332068066097752288546876
absolute error = 1.8482318332068066097752288546876
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.361
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.766
y[1] (analytic) = 0
y[1] (numeric) = 1.849175148834187682072331278689
absolute error = 1.849175148834187682072331278689
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.36
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.767
y[1] (analytic) = 0
y[1] (numeric) = 1.8501186849230873715910201896087
absolute error = 1.8501186849230873715910201896087
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.359
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.768
y[1] (analytic) = 0
y[1] (numeric) = 1.8510624411492426736236600093353
absolute error = 1.8510624411492426736236600093353
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.357
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1171.1MB, alloc=4.6MB, time=120.53
x[1] = 2.769
y[1] (analytic) = 0
y[1] (numeric) = 1.8520064171879111384318428329544
absolute error = 1.8520064171879111384318428329544
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.356
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.77
y[1] (analytic) = 0
y[1] (numeric) = 1.8529506127138717740585036923445
absolute error = 1.8529506127138717740585036923445
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.355
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.771
y[1] (analytic) = 0
y[1] (numeric) = 1.8538950274014259513726926766015
absolute error = 1.8538950274014259513726926766015
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.353
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.772
y[1] (analytic) = 0
y[1] (numeric) = 1.8548396609243983113432125572257
absolute error = 1.8548396609243983113432125572257
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.352
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.773
y[1] (analytic) = 0
y[1] (numeric) = 1.8557845129561376745373114961877
absolute error = 1.8557845129561376745373114961877
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.351
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.774
y[1] (analytic) = 0
y[1] (numeric) = 1.856729583169517952840601374338
absolute error = 1.856729583169517952840601374338
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.35
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.775
y[1] (analytic) = 0
y[1] (numeric) = 1.8576748712369390633943532663667
absolute error = 1.8576748712369390633943532663667
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.349
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.776
y[1] (analytic) = 0
y[1] (numeric) = 1.8586203768303278447463026068847
absolute error = 1.8586203768303278447463026068847
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.348
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.777
y[1] (analytic) = 0
y[1] (numeric) = 1.8595660996211389752110776404192
absolute error = 1.8595660996211389752110776404192
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.347
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1174.9MB, alloc=4.6MB, time=120.91
x[1] = 2.778
y[1] (analytic) = 0
y[1] (numeric) = 1.8605120392803558934363458264207
absolute error = 1.8605120392803558934363458264207
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.345
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.779
y[1] (analytic) = 0
y[1] (numeric) = 1.861458195478491721170753978998
absolute error = 1.861458195478491721170753978998
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.344
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.78
y[1] (analytic) = 0
y[1] (numeric) = 1.862404567885590188229719060258
absolute error = 1.862404567885590188229719060258
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.343
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.781
y[1] (analytic) = 0
y[1] (numeric) = 1.8633511561712265596551077160622
absolute error = 1.8633511561712265596551077160622
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.343
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.782
y[1] (analytic) = 0
y[1] (numeric) = 1.8642979600045085650648238439445
absolute error = 1.8642979600045085650648238439445
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.342
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.783
y[1] (analytic) = 0
y[1] (numeric) = 1.8652449790540773301883047150981
absolute error = 1.8652449790540773301883047150981
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.341
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.784
y[1] (analytic) = 0
y[1] (numeric) = 1.8661922129881083105839074359579
absolute error = 1.8661922129881083105839074359579
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.34
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.785
y[1] (analytic) = 0
y[1] (numeric) = 1.8671396614743122275341488302081
absolute error = 1.8671396614743122275341488302081
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.339
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.786
y[1] (analytic) = 0
y[1] (numeric) = 1.8680873241799360061147431492607
absolute error = 1.8680873241799360061147431492607
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.338
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1178.7MB, alloc=4.6MB, time=121.28
x[1] = 2.787
y[1] (analytic) = 0
y[1] (numeric) = 1.8690352007717637154333633786014
absolute error = 1.8690352007717637154333633786014
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.337
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.788
y[1] (analytic) = 0
y[1] (numeric) = 1.8699832909161175110340332991209
absolute error = 1.8699832909161175110340332991209
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.337
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.789
y[1] (analytic) = 0
y[1] (numeric) = 1.8709315942788585794630388868563
absolute error = 1.8709315942788585794630388868563
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.336
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.79
y[1] (analytic) = 0
y[1] (numeric) = 1.8718801105253880849922290916971
absolute error = 1.8718801105253880849922290916971
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.335
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.791
y[1] (analytic) = 0
y[1] (numeric) = 1.872828839320648118495557525778
absolute error = 1.872828839320648118495557525778
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.335
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.792
y[1] (analytic) = 0
y[1] (numeric) = 1.8737777803291226484746981157216
absolute error = 1.8737777803291226484746981157216
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.334
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.793
y[1] (analytic) = 0
y[1] (numeric) = 1.8747269332148384742295493298234
absolute error = 1.8747269332148384742295493298234
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.333
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.794
y[1] (analytic) = 0
y[1] (numeric) = 1.8756762976413661811694231819222
absolute error = 1.8756762976413661811694231819222
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.333
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.795
y[1] (analytic) = 0
memory used=1182.6MB, alloc=4.6MB, time=121.65
y[1] (numeric) = 1.8766258732718210982606968382904
absolute error = 1.8766258732718210982606968382904
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.332
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.796
y[1] (analytic) = 0
y[1] (numeric) = 1.8775756597688642576066863126349
absolute error = 1.8775756597688642576066863126349
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.332
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.797
y[1] (analytic) = 0
y[1] (numeric) = 1.878525656794703356155483427447
absolute error = 1.878525656794703356155483427447
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.331
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.798
y[1] (analytic) = 0
y[1] (numeric) = 1.8794758640110937195314789476983
absolute error = 1.8794758640110937195314789476983
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.331
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.799
y[1] (analytic) = 0
y[1] (numeric) = 1.8804262810793392679862765554726
absolute error = 1.8804262810793392679862765554726
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.331
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.8
y[1] (analytic) = 0
y[1] (numeric) = 1.8813769076602934844646841317785
absolute error = 1.8813769076602934844646841317785
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.33
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.801
y[1] (analytic) = 0
y[1] (numeric) = 1.882327743414360384781450644715
absolute error = 1.882327743414360384781450644715
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.33
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.802
y[1] (analytic) = 0
y[1] (numeric) = 1.8832787880014954899043988115987
absolute error = 1.8832787880014954899043988115987
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.33
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.803
y[1] (analytic) = 0
y[1] (numeric) = 1.8842300410812068003395856068129
absolute error = 1.8842300410812068003395856068129
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.329
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1186.4MB, alloc=4.6MB, time=122.02
x[1] = 2.804
y[1] (analytic) = 0
y[1] (numeric) = 1.8851815023125557726141046272393
absolute error = 1.8851815023125557726141046272393
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.329
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.805
y[1] (analytic) = 0
y[1] (numeric) = 1.8861331713541582978521263033942
absolute error = 1.8861331713541582978521263033942
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.329
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.806
y[1] (analytic) = 0
y[1] (numeric) = 1.8870850478641856824397539570363
absolute error = 1.8870850478641856824397539570363
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.329
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.807
y[1] (analytic) = 0
y[1] (numeric) = 1.8880371315003656307742557552624
absolute error = 1.8880371315003656307742557552624
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.329
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.808
y[1] (analytic) = 0
y[1] (numeric) = 1.8889894219199832300932146971788
absolute error = 1.8889894219199832300932146971788
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.329
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.809
y[1] (analytic) = 0
y[1] (numeric) = 1.8899419187798819373791208923499
absolute error = 1.8899419187798819373791208923499
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.329
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.81
y[1] (analytic) = 0
y[1] (numeric) = 1.8908946217364645683349125505959
absolute error = 1.8908946217364645683349125505959
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.329
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.811
y[1] (analytic) = 0
y[1] (numeric) = 1.8918475304456942884259543005645
absolute error = 1.8918475304456942884259543005645
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.329
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.812
y[1] (analytic) = 0
y[1] (numeric) = 1.8928006445630956059839236900457
absolute error = 1.8928006445630956059839236900457
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.329
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1190.2MB, alloc=4.6MB, time=122.40
x[1] = 2.813
y[1] (analytic) = 0
y[1] (numeric) = 1.8937539637437553673680589944579
absolute error = 1.8937539637437553673680589944579
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.329
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.814
y[1] (analytic) = 0
y[1] (numeric) = 1.8947074876423237541792037715195
absolute error = 1.8947074876423237541792037715195
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.329
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.815
y[1] (analytic) = 0
y[1] (numeric) = 1.8956612159130152825220659500556
absolute error = 1.8956612159130152825220659500556
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.329
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.816
y[1] (analytic) = 0
y[1] (numeric) = 1.8966151482096098043110916293807
absolute error = 1.8966151482096098043110916293807
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.329
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.817
y[1] (analytic) = 0
y[1] (numeric) = 1.8975692841854535106153361929713
absolute error = 1.8975692841854535106153361929713
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.922
Order of pole = 7.33
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.818
y[1] (analytic) = 0
y[1] (numeric) = 1.8985236234934599370376978064035
absolute error = 1.8985236234934599370376978064035
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.33
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.819
y[1] (analytic) = 0
y[1] (numeric) = 1.8994781657861109711238608750006
absolute error = 1.8994781657861109711238608750006
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.33
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.82
y[1] (analytic) = 0
y[1] (numeric) = 1.9004329107154578617962795815236
absolute error = 1.9004329107154578617962795815236
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.331
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.821
y[1] (analytic) = 0
y[1] (numeric) = 1.9013878579331222308085142087601
absolute error = 1.9013878579331222308085142087601
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.331
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1194.0MB, alloc=4.6MB, time=122.77
x[1] = 2.822
y[1] (analytic) = 0
y[1] (numeric) = 1.9023430070902970862152155762378
absolute error = 1.9023430070902970862152155762378
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.331
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.823
y[1] (analytic) = 0
y[1] (numeric) = 1.9032983578377478378530355847173
absolute error = 1.9032983578377478378530355847173
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.332
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.824
y[1] (analytic) = 0
y[1] (numeric) = 1.9042539098258133148277245668205
absolute error = 1.9042539098258133148277245668205
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.332
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.825
y[1] (analytic) = 0
y[1] (numeric) = 1.9052096627044067850026588873349
absolute error = 1.9052096627044067850026588873349
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.333
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.826
y[1] (analytic) = 0
y[1] (numeric) = 1.9061656161230169764840250226151
absolute error = 1.9061656161230169764840250226151
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.333
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.827
y[1] (analytic) = 0
y[1] (numeric) = 1.9071217697307091010978691752867
absolute error = 1.9071217697307091010978691752867
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.334
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.828
y[1] (analytic) = 0
y[1] (numeric) = 1.90807812317612587985420434836
absolute error = 1.90807812317612587985420434836
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.335
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.829
y[1] (analytic) = 0
y[1] (numeric) = 1.9090346761074885703933497120879
absolute error = 1.9090346761074885703933497120879
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.335
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.83
y[1] (analytic) = 0
y[1] (numeric) = 1.9099914281725979964096600476645
absolute error = 1.9099914281725979964096600476645
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.336
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1197.8MB, alloc=4.6MB, time=123.14
x[1] = 2.831
y[1] (analytic) = 0
y[1] (numeric) = 1.9109483790188355790477860443674
absolute error = 1.9109483790188355790477860443674
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.337
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.832
y[1] (analytic) = 0
y[1] (numeric) = 1.9119055282931643702665892612048
absolute error = 1.9119055282931643702665892612048
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.337
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.833
y[1] (analytic) = 0
y[1] (numeric) = 1.9128628756421300881658186407487
absolute error = 1.9128628756421300881658186407487
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.923
Order of pole = 7.338
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.834
y[1] (analytic) = 0
y[1] (numeric) = 1.9138204207118621542706385818205
absolute error = 1.9138204207118621542706385818205
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.339
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.835
y[1] (analytic) = 0
y[1] (numeric) = 1.9147781631480747327690817392576
absolute error = 1.9147781631480747327690817392576
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.34
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.836
y[1] (analytic) = 0
y[1] (numeric) = 1.9157361025960677716974829233298
absolute error = 1.9157361025960677716974829233298
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.341
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.837
y[1] (analytic) = 0
y[1] (numeric) = 1.9166942387007280460689337187049
absolute error = 1.9166942387007280460689337187049
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.342
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.838
y[1] (analytic) = 0
y[1] (numeric) = 1.9176525711065302029397807333803
absolute error = 1.9176525711065302029397807333803
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.343
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.839
y[1] (analytic) = 0
y[1] (numeric) = 1.9186110994575378084091737219173
absolute error = 1.9186110994575378084091737219173
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=1201.6MB, alloc=4.6MB, time=123.51
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.344
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.84
y[1] (analytic) = 0
y[1] (numeric) = 1.9195698233974043965466532048307
absolute error = 1.9195698233974043965466532048307
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.345
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.841
y[1] (analytic) = 0
y[1] (numeric) = 1.9205287425693745202427506273103
absolute error = 1.9205287425693745202427506273103
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.346
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.842
y[1] (analytic) = 0
y[1] (numeric) = 1.9214878566162848039775575657803
absolute error = 1.9214878566162848039775575657803
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.347
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.843
y[1] (analytic) = 0
y[1] (numeric) = 1.9224471651805649985022040003462
absolute error = 1.9224471651805649985022040003462
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.924
Order of pole = 7.348
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.844
y[1] (analytic) = 0
y[1] (numeric) = 1.92340666790423903742816922513
absolute error = 1.92340666790423903742816922513
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.349
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.845
y[1] (analytic) = 0
y[1] (numeric) = 1.9243663644289260957193325670656
absolute error = 1.9243663644289260957193325670656
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.351
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.846
y[1] (analytic) = 0
y[1] (numeric) = 1.9253262543958416500816547271086
absolute error = 1.9253262543958416500816547271086
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.352
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.847
y[1] (analytic) = 0
y[1] (numeric) = 1.9262863374457985412453642462154
absolute error = 1.9262863374457985412453642462154
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.353
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1205.4MB, alloc=4.6MB, time=123.89
x[1] = 2.848
y[1] (analytic) = 0
y[1] (numeric) = 1.9272466132192080381345073320621
absolute error = 1.9272466132192080381345073320621
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.354
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.849
y[1] (analytic) = 0
y[1] (numeric) = 1.9282070813560809039187030615044
absolute error = 1.9282070813560809039187030615044
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.356
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.85
y[1] (analytic) = 0
y[1] (numeric) = 1.9291677414960284639419297984262
absolute error = 1.9291677414960284639419297984262
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.925
Order of pole = 7.357
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.851
y[1] (analytic) = 0
y[1] (numeric) = 1.9301285932782636755231525370809
absolute error = 1.9301285932782636755231525370809
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.358
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.852
y[1] (analytic) = 0
y[1] (numeric) = 1.9310896363416021996235847974978
absolute error = 1.9310896363416021996235847974978
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.36
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.853
y[1] (analytic) = 0
y[1] (numeric) = 1.9320508703244634743753626622024
absolute error = 1.9320508703244634743753626622024
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.361
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.854
y[1] (analytic) = 0
y[1] (numeric) = 1.9330122948648717904663925525763
absolute error = 1.9330122948648717904663925525763
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.363
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.855
y[1] (analytic) = 0
y[1] (numeric) = 1.9339739096004573683761183988636
absolute error = 1.9339739096004573683761183988636
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.364
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.856
y[1] (analytic) = 0
y[1] (numeric) = 1.9349357141684574374569379603041
absolute error = 1.9349357141684574374569379603041
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.926
Order of pole = 7.366
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1209.3MB, alloc=4.6MB, time=124.27
x[1] = 2.857
y[1] (analytic) = 0
y[1] (numeric) = 1.9358977082057173168559822013374
absolute error = 1.9358977082057173168559822013374
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.927
Order of pole = 7.367
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.858
y[1] (analytic) = 0
y[1] (numeric) = 1.9368598913486914982719558264734
absolute error = 1.9368598913486914982719558264734
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.927
Order of pole = 7.369
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.859
y[1] (analytic) = 0
y[1] (numeric) = 1.9378222632334447305417213204489
absolute error = 1.9378222632334447305417213204489
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.927
Order of pole = 7.37
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.86
y[1] (analytic) = 0
y[1] (numeric) = 1.9387848234956531060512931318908
absolute error = 1.9387848234956531060512931318908
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.927
Order of pole = 7.372
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.861
y[1] (analytic) = 0
y[1] (numeric) = 1.9397475717706051489658929780667
absolute error = 1.9397475717706051489658929780667
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.927
Order of pole = 7.374
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.862
y[1] (analytic) = 0
y[1] (numeric) = 1.9407105076932029052737016356228
absolute error = 1.9407105076932029052737016356228
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.927
Order of pole = 7.375
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.863
y[1] (analytic) = 0
y[1] (numeric) = 1.9416736308979630346379270176717
absolute error = 1.9416736308979630346379270176717
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.928
Order of pole = 7.377
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.864
y[1] (analytic) = 0
y[1] (numeric) = 1.9426369410190179040517928213969
absolute error = 1.9426369410190179040517928213969
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.928
Order of pole = 7.379
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.865
y[1] (analytic) = 0
y[1] (numeric) = 1.9436004376901166832910365626676
absolute error = 1.9436004376901166832910365626676
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.928
Order of pole = 7.381
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1213.1MB, alloc=4.6MB, time=124.65
x[1] = 2.866
y[1] (analytic) = 0
y[1] (numeric) = 1.9445641205446264421584903952076
absolute error = 1.9445641205446264421584903952076
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.928
Order of pole = 7.382
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.867
y[1] (analytic) = 0
y[1] (numeric) = 1.9455279892155332495153027418109
absolute error = 1.9455279892155332495153027418109
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.928
Order of pole = 7.384
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.868
y[1] (analytic) = 0
y[1] (numeric) = 1.9464920433354432740933434441464
absolute error = 1.9464920433354432740933434441464
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.929
Order of pole = 7.386
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.869
y[1] (analytic) = 0
y[1] (numeric) = 1.9474562825365838870833198660209
absolute error = 1.9474562825365838870833198660209
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.929
Order of pole = 7.388
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.87
y[1] (analytic) = 0
y[1] (numeric) = 1.9484207064508047664931161627678
absolute error = 1.9484207064508047664931161627678
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.929
Order of pole = 7.39
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.871
y[1] (analytic) = 0
y[1] (numeric) = 1.9493853147095790032708527568795
absolute error = 1.9493853147095790032708527568795
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.929
Order of pole = 7.392
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.872
y[1] (analytic) = 0
y[1] (numeric) = 1.9503501069440042091871479372979
absolute error = 1.9503501069440042091871479372979
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.929
Order of pole = 7.394
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.873
y[1] (analytic) = 0
y[1] (numeric) = 1.951315082784803626471048427092
absolute error = 1.951315082784803626471048427092
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.93
Order of pole = 7.396
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.874
y[1] (analytic) = 0
y[1] (numeric) = 1.9522802418623272391940807417855
absolute error = 1.9522802418623272391940807417855
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.93
Order of pole = 7.398
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1216.9MB, alloc=4.6MB, time=125.02
x[1] = 2.875
y[1] (analytic) = 0
y[1] (numeric) = 1.9532455838065528863968601885169
absolute error = 1.9532455838065528863968601885169
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.93
Order of pole = 7.4
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.876
y[1] (analytic) = 0
y[1] (numeric) = 1.9542111082470873769526794347184
absolute error = 1.9542111082470873769526794347184
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.93
Order of pole = 7.402
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.877
y[1] (analytic) = 0
y[1] (numeric) = 1.9551768148131676061624837042592
absolute error = 1.9551768148131676061624837042592
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.931
Order of pole = 7.404
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.878
y[1] (analytic) = 0
y[1] (numeric) = 1.9561427031336616740756248392009
absolute error = 1.9561427031336616740756248392009
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.931
Order of pole = 7.406
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.879
y[1] (analytic) = 0
y[1] (numeric) = 1.957108772837070005530771696639
absolute error = 1.957108772837070005530771696639
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.931
Order of pole = 7.408
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.88
y[1] (analytic) = 0
y[1] (numeric) = 1.9580750235515264719113396327333
absolute error = 1.9580750235515264719113396327333
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.931
Order of pole = 7.41
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.881
y[1] (analytic) = 0
y[1] (numeric) = 1.9590414549047995146097871601417
absolute error = 1.9590414549047995146097871601417
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.931
Order of pole = 7.412
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.882
y[1] (analytic) = 0
y[1] (numeric) = 1.9600080665242932701951132508464
absolute error = 1.9600080665242932701951132508464
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.932
Order of pole = 7.414
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.883
y[1] (analytic) = 0
y[1] (numeric) = 1.9609748580370486972778741939794
absolute error = 1.9609748580370486972778741939794
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=1220.7MB, alloc=4.6MB, time=125.39
Complex estimate of poles used
Radius of convergence = 3.932
Order of pole = 7.416
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.884
y[1] (analytic) = 0
y[1] (numeric) = 1.9619418290697447050670244078871
absolute error = 1.9619418290697447050670244078871
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.932
Order of pole = 7.418
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.885
y[1] (analytic) = 0
y[1] (numeric) = 1.9629089792486992836128711475077
absolute error = 1.9629089792486992836128711475077
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.932
Order of pole = 7.421
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.886
y[1] (analytic) = 0
y[1] (numeric) = 1.9638763081998706357304186423374
absolute error = 1.9638763081998706357304186423374
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.933
Order of pole = 7.423
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.887
y[1] (analytic) = 0
y[1] (numeric) = 1.9648438155488583105973628470163
absolute error = 1.9648438155488583105973628470163
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.933
Order of pole = 7.425
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.888
y[1] (analytic) = 0
y[1] (numeric) = 1.9658115009209043390209836860412
absolute error = 1.9658115009209043390209836860412
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.933
Order of pole = 7.427
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.889
y[1] (analytic) = 0
y[1] (numeric) = 1.9667793639408943703681674264891
absolute error = 1.9667793639408943703681674264891
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.933
Order of pole = 7.429
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.89
y[1] (analytic) = 0
y[1] (numeric) = 1.9677474042333588111527776180822
absolute error = 1.9677474042333588111527776180822
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.934
Order of pole = 7.432
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.891
y[1] (analytic) = 0
y[1] (numeric) = 1.9687156214224739652745788986199
absolute error = 1.9687156214224739652745788986199
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.934
Order of pole = 7.434
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1224.5MB, alloc=4.6MB, time=125.76
x[1] = 2.892
y[1] (analytic) = 0
y[1] (numeric) = 1.9696840151320631759039038749141
absolute error = 1.9696840151320631759039038749141
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.934
Order of pole = 7.436
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.893
y[1] (analytic) = 0
y[1] (numeric) = 1.9706525849855979690062392550655
absolute error = 1.9706525849855979690062392550655
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.934
Order of pole = 7.438
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.894
y[1] (analytic) = 0
y[1] (numeric) = 1.9716213306061991985008934273807
absolute error = 1.9716213306061991985008934273807
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.441
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.895
y[1] (analytic) = 0
y[1] (numeric) = 1.9725902516166381930478937546221
absolute error = 1.9725902516166381930478937546221
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.443
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.896
y[1] (analytic) = 0
y[1] (numeric) = 1.9735593476393379044572479797776
absolute error = 1.9735593476393379044572479797776
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.445
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.897
y[1] (analytic) = 0
y[1] (numeric) = 1.9745286182963740577146903212992
absolute error = 1.9745286182963740577146903212992
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.447
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.898
y[1] (analytic) = 0
y[1] (numeric) = 1.9754980632094763026180190719616
absolute error = 1.9754980632094763026180190719616
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.45
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.899
y[1] (analytic) = 0
y[1] (numeric) = 1.9764676820000293670181188062986
absolute error = 1.9764676820000293670181188062986
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.452
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.9
y[1] (analytic) = 0
y[1] (numeric) = 1.9774374742890742116587466471533
absolute error = 1.9774374742890742116587466471533
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.454
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1228.3MB, alloc=4.6MB, time=126.13
x[1] = 2.901
y[1] (analytic) = 0
y[1] (numeric) = 1.9784074396973091866091484423959
absolute error = 1.9784074396973091866091484423959
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.457
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.902
y[1] (analytic) = 0
y[1] (numeric) = 1.979377577845091189283557158484
absolute error = 1.979377577845091189283557158484
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.459
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.903
y[1] (analytic) = 0
y[1] (numeric) = 1.980347888352436824041612308428
absolute error = 1.980347888352436824041612308428
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.461
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.904
y[1] (analytic) = 0
y[1] (numeric) = 1.9813183708390235633637257980476
absolute error = 1.9813183708390235633637257980476
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.464
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.905
y[1] (analytic) = 0
y[1] (numeric) = 1.9822890249241909105954061963198
absolute error = 1.9822890249241909105954061963198
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.466
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.906
y[1] (analytic) = 0
y[1] (numeric) = 1.9832598502269415642545401132951
absolute error = 1.9832598502269415642545401132951
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.468
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.907
y[1] (analytic) = 0
y[1] (numeric) = 1.9842308463659425838956161026514
absolute error = 1.9842308463659425838956161026514
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.471
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.908
y[1] (analytic) = 0
y[1] (numeric) = 1.9852020129595265575248632956306
absolute error = 1.9852020129595265575248632956306
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.473
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.909
y[1] (analytic) = 0
y[1] (numeric) = 1.9861733496256927705602638190167
absolute error = 1.9861733496256927705602638190167
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.476
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1232.1MB, alloc=4.6MB, time=126.50
x[1] = 2.91
y[1] (analytic) = 0
y[1] (numeric) = 1.9871448559821083763303849521312
absolute error = 1.9871448559821083763303849521312
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.478
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.911
y[1] (analytic) = 0
y[1] (numeric) = 1.9881165316461095681059639366946
absolute error = 1.9881165316461095681059639366946
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.48
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.912
y[1] (analytic) = 0
y[1] (numeric) = 1.9890883762347027526581653689946
absolute error = 1.9890883762347027526581653689946
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.483
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.913
y[1] (analytic) = 0
y[1] (numeric) = 1.9900603893645657253374181762678
absolute error = 1.9900603893645657253374181762678
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.485
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.914
y[1] (analytic) = 0
y[1] (numeric) = 1.9910325706520488466667263086953
absolute error = 1.9910325706520488466667263086953
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.487
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.915
y[1] (analytic) = 0
y[1] (numeric) = 1.9920049197131762204433344650988
absolute error = 1.9920049197131762204433344650988
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.49
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.916
y[1] (analytic) = 0
y[1] (numeric) = 1.9929774361636468733426174144433
absolute error = 1.9929774361636468733426174144433
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.492
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.917
y[1] (analytic) = 0
y[1] (numeric) = 1.9939501196188359360180487767757
absolute error = 1.9939501196188359360180487767757
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.494
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.918
y[1] (analytic) = 0
y[1] (numeric) = 1.9949229696937958256910924863936
absolute error = 1.9949229696937958256910924863936
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.497
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1236.0MB, alloc=4.6MB, time=126.88
x[1] = 2.919
y[1] (analytic) = 0
y[1] (numeric) = 1.9958959860032574302248475770109
absolute error = 1.9958959860032574302248475770109
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.499
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.92
y[1] (analytic) = 0
y[1] (numeric) = 1.9968691681616312936752644036087
absolute error = 1.9968691681616312936752644036087
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.501
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.921
y[1] (analytic) = 0
y[1] (numeric) = 1.9978425157830088033137379486882
absolute error = 1.9978425157830088033137379486882
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.504
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.922
y[1] (analytic) = 0
y[1] (numeric) = 1.9988160284811633781148714519269
absolute error = 1.9988160284811633781148714519269
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.506
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.923
y[1] (analytic) = 0
y[1] (numeric) = 1.9997897058695516587031912519237
absolute error = 1.9997897058695516587031912519237
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.508
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.924
y[1] (analytic) = 0
y[1] (numeric) = 2.0007635475613146987525814369638
absolute error = 2.0007635475613146987525814369638
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.511
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.925
y[1] (analytic) = 0
y[1] (numeric) = 2.0017375531692791578321946686721
absolute error = 2.0017375531692791578321946686721
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.513
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.926
y[1] (analytic) = 0
y[1] (numeric) = 2.0027117223059584956925833682184
absolute error = 2.0027117223059584956925833682184
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.515
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1239.8MB, alloc=4.6MB, time=127.25
x[1] = 2.927
y[1] (analytic) = 0
y[1] (numeric) = 2.0036860545835541679857833395212
absolute error = 2.0036860545835541679857833395212
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.517
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.928
y[1] (analytic) = 0
y[1] (numeric) = 2.0046605496139568234130698478244
absolute error = 2.0046605496139568234130698478244
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.52
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.929
y[1] (analytic) = 0
y[1] (numeric) = 2.0056352070087475022940941752328
absolute error = 2.0056352070087475022940941752328
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.522
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.93
y[1] (analytic) = 0
y[1] (numeric) = 2.0066100263791988365510967374344
absolute error = 2.0066100263791988365510967374344
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.524
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.931
y[1] (analytic) = 0
y[1] (numeric) = 2.007585007336276251101880968051
absolute error = 2.007585007336276251101880968051
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.526
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.932
y[1] (analytic) = 0
y[1] (numeric) = 2.0085601494906391666552203589884
absolute error = 2.0085601494906391666552203589884
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.529
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.933
y[1] (analytic) = 0
y[1] (numeric) = 2.0095354524526422039023592869446
absolute error = 2.0095354524526422039023592869446
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.531
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.934
y[1] (analytic) = 0
y[1] (numeric) = 2.0105109158323363890982565580177
absolute error = 2.0105109158323363890982565580177
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.533
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.935
y[1] (analytic) = 0
y[1] (numeric) = 2.0114865392394703610262089642769
absolute error = 2.0114865392394703610262089642769
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.535
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1243.6MB, alloc=4.6MB, time=127.63
x[1] = 2.936
y[1] (analytic) = 0
y[1] (numeric) = 2.01246232228349157933948056836
absolute error = 2.01246232228349157933948056836
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.537
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.937
y[1] (analytic) = 0
y[1] (numeric) = 2.013438264573547534273551914774
absolute error = 2.013438264573547534273551914774
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.54
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.938
y[1] (analytic) = 0
y[1] (numeric) = 2.0144143657184869577225919097433
absolute error = 2.0144143657184869577225919097433
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.542
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.939
y[1] (analytic) = 0
y[1] (numeric) = 2.0153906253268610356737437153061
absolute error = 2.0153906253268610356737437153061
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.544
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.94
y[1] (analytic) = 0
y[1] (numeric) = 2.0163670430069246219928046680434
absolute error = 2.0163670430069246219928046680434
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.546
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.941
y[1] (analytic) = 0
y[1] (numeric) = 2.0173436183666374535548689584685
absolute error = 2.0173436183666374535548689584685
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.548
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.942
y[1] (analytic) = 0
y[1] (numeric) = 2.0183203510136653667134905938417
absolute error = 2.0183203510136653667134905938417
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.55
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.943
y[1] (analytic) = 0
y[1] (numeric) = 2.0192972405553815151019130151457
absolute error = 2.0192972405553815151019130151457
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.552
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.944
y[1] (analytic) = 0
y[1] (numeric) = 2.0202742865988675887599006482824
absolute error = 2.0202742865988675887599006482824
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.554
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1247.4MB, alloc=4.6MB, time=128.00
x[1] = 2.945
y[1] (analytic) = 0
y[1] (numeric) = 2.021251488750915034579696640376
absolute error = 2.021251488750915034579696640376
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.948
Order of pole = 7.556
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.946
y[1] (analytic) = 0
y[1] (numeric) = 2.0222288466180262780646200645125
absolute error = 2.0222288466180262780646200645125
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.948
Order of pole = 7.558
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.947
y[1] (analytic) = 0
y[1] (numeric) = 2.0232063598064159463938049704453
absolute error = 2.0232063598064159463938049704453
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.948
Order of pole = 7.56
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.948
y[1] (analytic) = 0
y[1] (numeric) = 2.0241840279220120927865728148815
absolute error = 2.0241840279220120927865728148815
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.948
Order of pole = 7.562
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.949
y[1] (analytic) = 0
y[1] (numeric) = 2.025161850570457422159919023059
absolute error = 2.025161850570457422159919023059
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.948
Order of pole = 7.564
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.95
y[1] (analytic) = 0
y[1] (numeric) = 2.0261398273571105180725837135597
absolute error = 2.0261398273571105180725837135597
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.949
Order of pole = 7.566
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.951
y[1] (analytic) = 0
y[1] (numeric) = 2.027117957887047070949165960807
absolute error = 2.027117957887047070949165960807
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.949
Order of pole = 7.568
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.952
y[1] (analytic) = 0
y[1] (numeric) = 2.0280962417650611075777303745896
absolute error = 2.0280962417650611075777303745896
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.949
Order of pole = 7.57
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.953
y[1] (analytic) = 0
y[1] (numeric) = 2.0290746785956662218743442433669
absolute error = 2.0290746785956662218743442433669
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.949
Order of pole = 7.572
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1251.2MB, alloc=4.6MB, time=128.37
x[1] = 2.954
y[1] (analytic) = 0
y[1] (numeric) = 2.0300532679830968069079730181643
absolute error = 2.0300532679830968069079730181643
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.95
Order of pole = 7.573
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.955
y[1] (analytic) = 0
y[1] (numeric) = 2.0310320095313092881791515066859
absolute error = 2.0310320095313092881791515066859
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.95
Order of pole = 7.575
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.956
y[1] (analytic) = 0
y[1] (numeric) = 2.0320109028439833581458378029801
absolute error = 2.0320109028439833581458378029801
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.95
Order of pole = 7.577
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.957
y[1] (analytic) = 0
y[1] (numeric) = 2.0329899475245232119898466967089
absolute error = 2.0329899475245232119898466967089
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.95
Order of pole = 7.579
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.958
y[1] (analytic) = 0
y[1] (numeric) = 2.0339691431760587846172490879191
absolute error = 2.0339691431760587846172490879191
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.95
Order of pole = 7.58
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.959
y[1] (analytic) = 0
y[1] (numeric) = 2.0349484894014469888861137783092
absolute error = 2.0349484894014469888861137783092
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.951
Order of pole = 7.582
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.96
y[1] (analytic) = 0
y[1] (numeric) = 2.0359279858032729550549579184548
absolute error = 2.0359279858032729550549579184548
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.951
Order of pole = 7.584
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.961
y[1] (analytic) = 0
y[1] (numeric) = 2.0369076319838512714452623624055
absolute error = 2.0369076319838512714452623624055
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.951
Order of pole = 7.585
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.962
y[1] (analytic) = 0
y[1] (numeric) = 2.0378874275452272263113982166279
absolute error = 2.0378874275452272263113982166279
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.951
Order of pole = 7.587
memory used=1255.0MB, alloc=4.6MB, time=128.75
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.963
y[1] (analytic) = 0
y[1] (numeric) = 2.0388673720891780509113009695483
absolute error = 2.0388673720891780509113009695483
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.951
Order of pole = 7.589
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.964
y[1] (analytic) = 0
y[1] (numeric) = 2.0398474652172141637712187510665
absolute error = 2.0398474652172141637712187510665
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.952
Order of pole = 7.59
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.965
y[1] (analytic) = 0
y[1] (numeric) = 2.0408277065305804161378514984801
absolute error = 2.0408277065305804161378514984801
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.952
Order of pole = 7.592
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.966
y[1] (analytic) = 0
y[1] (numeric) = 2.0418080956302573386111880963957
absolute error = 2.0418080956302573386111880963957
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.952
Order of pole = 7.593
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.967
y[1] (analytic) = 0
y[1] (numeric) = 2.042788632116962388951338913515
absolute error = 2.042788632116962388951338913515
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.952
Order of pole = 7.595
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.968
y[1] (analytic) = 0
y[1] (numeric) = 2.0437693155911512010526515787893
absolute error = 2.0437693155911512010526515787893
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.952
Order of pole = 7.596
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.969
y[1] (analytic) = 0
y[1] (numeric) = 2.0447501456530188350783883234433
absolute error = 2.0447501456530188350783883234433
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.952
Order of pole = 7.597
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.97
y[1] (analytic) = 0
y[1] (numeric) = 2.0457311219025010287492337638866
absolute error = 2.0457311219025010287492337638866
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.953
Order of pole = 7.599
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1258.9MB, alloc=4.6MB, time=129.12
x[1] = 2.971
y[1] (analytic) = 0
y[1] (numeric) = 2.0467122439392754497788926136736
absolute error = 2.0467122439392754497788926136736
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.953
Order of pole = 7.6
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.972
y[1] (analytic) = 0
y[1] (numeric) = 2.0476935113627629494500274905452
absolute error = 2.0476935113627629494500274905452
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.953
Order of pole = 7.601
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.973
y[1] (analytic) = 0
y[1] (numeric) = 2.0486749237721288173237777272934
absolute error = 2.0486749237721288173237777272934
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.953
Order of pole = 7.603
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.974
y[1] (analytic) = 0
y[1] (numeric) = 2.049656480766284037076090902848
absolute error = 2.049656480766284037076090902848
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.953
Order of pole = 7.604
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.975
y[1] (analytic) = 0
y[1] (numeric) = 2.0506381819438865434540896826886
absolute error = 2.0506381819438865434540896826886
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.953
Order of pole = 7.605
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.976
y[1] (analytic) = 0
y[1] (numeric) = 2.0516200269033424803456874955502
absolute error = 2.0516200269033424803456874955502
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.606
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.977
y[1] (analytic) = 0
y[1] (numeric) = 2.052602015242807459955657576511
absolute error = 2.052602015242807459955657576511
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.607
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.978
y[1] (analytic) = 0
y[1] (numeric) = 2.0535841465601878230813509750388
absolute error = 2.0535841465601878230813509750388
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.609
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.979
y[1] (analytic) = 0
y[1] (numeric) = 2.0545664204531419004812502605256
absolute error = 2.0545664204531419004812502605256
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.61
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1262.7MB, alloc=4.6MB, time=129.49
x[1] = 2.98
y[1] (analytic) = 0
y[1] (numeric) = 2.0555488365190812753295368573573
absolute error = 2.0555488365190812753295368573573
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.611
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.981
y[1] (analytic) = 0
y[1] (numeric) = 2.0565313943551720467498412067555
absolute error = 2.0565313943551720467498412067555
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.612
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.982
y[1] (analytic) = 0
y[1] (numeric) = 2.0575140935583360944213362835822
absolute error = 2.0575140935583360944213362835822
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.613
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.983
y[1] (analytic) = 0
y[1] (numeric) = 2.0584969337252523442503263931204
absolute error = 2.0584969337252523442503263931204
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.614
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.984
y[1] (analytic) = 0
y[1] (numeric) = 2.0594799144523580351004746356291
absolute error = 2.0594799144523580351004746356291
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.615
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.985
y[1] (analytic) = 0
y[1] (numeric) = 2.0604630353358499865748039553185
absolute error = 2.0604630353358499865748039553185
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.615
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.986
y[1] (analytic) = 0
y[1] (numeric) = 2.0614462959716858678425982853952
absolute error = 2.0614462959716858678425982853952
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.616
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.987
y[1] (analytic) = 0
y[1] (numeric) = 2.0624296959555854675043219620831
absolute error = 2.0624296959555854675043219620831
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.617
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.988
y[1] (analytic) = 0
y[1] (numeric) = 2.06341323488303196448766730813
absolute error = 2.06341323488303196448766730813
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.618
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1266.5MB, alloc=4.6MB, time=129.88
x[1] = 2.989
y[1] (analytic) = 0
y[1] (numeric) = 2.0643969123492731999678320803509
absolute error = 2.0643969123492731999678320803509
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.619
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.99
y[1] (analytic) = 0
y[1] (numeric) = 2.0653807279493229503051203363351
absolute error = 2.0653807279493229503051203363351
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.619
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.991
y[1] (analytic) = 0
y[1] (numeric) = 2.066364681277962200992952202643
absolute error = 2.066364681277962200992952202643
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.62
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.992
y[1] (analytic) = 0
y[1] (numeric) = 2.0673487719297404216093600207302
absolute error = 2.0673487719297404216093600207302
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.62
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.993
y[1] (analytic) = 0
y[1] (numeric) = 2.0683329994989768417650404075541
absolute error = 2.0683329994989768417650404075541
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.621
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.994
y[1] (analytic) = 0
y[1] (numeric) = 2.0693173635797617280410238954273
absolute error = 2.0693173635797617280410238954273
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.622
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.995
y[1] (analytic) = 0
y[1] (numeric) = 2.0703018637659576619090160102714
absolute error = 2.0703018637659576619090160102714
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.622
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.996
y[1] (analytic) = 0
y[1] (numeric) = 2.0712864996512008186274559090817
absolute error = 2.0712864996512008186274559090817
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.623
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.997
y[1] (analytic) = 0
y[1] (numeric) = 2.0722712708289022471063310262231
absolute error = 2.0722712708289022471063310262231
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.623
memory used=1270.3MB, alloc=4.6MB, time=130.25
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.998
y[1] (analytic) = 0
y[1] (numeric) = 2.0732561768922491507337785742264
absolute error = 2.0732561768922491507337785742264
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.623
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 2.999
y[1] (analytic) = 0
y[1] (numeric) = 2.0742412174342061691574972081234
absolute error = 2.0742412174342061691574972081234
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.624
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3
y[1] (analytic) = 0
y[1] (numeric) = 2.0752263920475166610139846931357
absolute error = 2.0752263920475166610139846931357
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.624
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.001
y[1] (analytic) = 0
y[1] (numeric) = 2.0762117003247039875986100137954
absolute error = 2.0762117003247039875986100137954
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.624
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.002
y[1] (analytic) = 0
y[1] (numeric) = 2.0771971418580727974695210284088
absolute error = 2.0771971418580727974695210284088
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.625
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.003
y[1] (analytic) = 0
y[1] (numeric) = 2.0781827162397103119783815062547
absolute error = 2.0781827162397103119783815062547
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.625
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.004
y[1] (analytic) = 0
y[1] (numeric) = 2.0791684230614876117209241861205
absolute error = 2.0791684230614876117209241861205
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.625
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.005
y[1] (analytic) = 0
y[1] (numeric) = 2.0801542619150609239002993637969
absolute error = 2.0801542619150609239002993637969
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.625
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1274.1MB, alloc=4.6MB, time=130.62
x[1] = 3.006
y[1] (analytic) = 0
y[1] (numeric) = 2.0811402323918729105961914530541
absolute error = 2.0811402323918729105961914530541
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.625
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.007
y[1] (analytic) = 0
y[1] (numeric) = 2.082126334083153957932668969486
absolute error = 2.082126334083153957932668969486
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.625
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.008
y[1] (analytic) = 0
y[1] (numeric) = 2.0831125665799234661377264595117
absolute error = 2.0831125665799234661377264595117
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.625
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.009
y[1] (analytic) = 0
y[1] (numeric) = 2.0840989294729911404874700378349
absolute error = 2.0840989294729911404874700378349
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.625
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.01
y[1] (analytic) = 0
y[1] (numeric) = 2.0850854223529582831278914058602
absolute error = 2.0850854223529582831278914058602
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.625
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.011
y[1] (analytic) = 0
y[1] (numeric) = 2.086072044810219085767168501025
absolute error = 2.086072044810219085767168501025
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.625
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.012
y[1] (analytic) = 0
y[1] (numeric) = 2.0870587964349619232314242727903
absolute error = 2.0870587964349619232314242727903
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.625
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.013
y[1] (analytic) = 0
y[1] (numeric) = 2.0880456768171706478768684952246
absolute error = 2.0880456768171706478768684952246
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.625
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.014
y[1] (analytic) = 0
y[1] (numeric) = 2.0890326855466258848512410087755
absolute error = 2.0890326855466258848512410087755
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.625
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1277.9MB, alloc=4.6MB, time=130.99
x[1] = 3.015
y[1] (analytic) = 0
y[1] (numeric) = 2.0900198222129063281974683350244
absolute error = 2.0900198222129063281974683350244
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.624
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.016
y[1] (analytic) = 0
y[1] (numeric) = 2.0910070864053900377924392280291
absolute error = 2.0910070864053900377924392280291
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.624
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.017
y[1] (analytic) = 0
y[1] (numeric) = 2.0919944777132557371137984143466
absolute error = 2.0919944777132557371137984143466
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.624
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.018
y[1] (analytic) = 0
y[1] (numeric) = 2.092981995725484111827651531054
absolute error = 2.092981995725484111827651531054
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.623
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.019
y[1] (analytic) = 0
y[1] (numeric) = 2.0939696400308591091900680971221
absolute error = 2.0939696400308591091900680971221
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.623
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.02
y[1] (analytic) = 0
y[1] (numeric) = 2.0949574102179692382552632484035
absolute error = 2.0949574102179692382552632484035
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.622
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.021
y[1] (analytic) = 0
y[1] (numeric) = 2.0959453058752088708833329303381
absolute error = 2.0959453058752088708833329303381
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.622
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.022
y[1] (analytic) = 0
y[1] (numeric) = 2.0969333265907795435404112753202
absolute error = 2.0969333265907795435404112753202
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.621
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.023
y[1] (analytic) = 0
y[1] (numeric) = 2.0979214719526912598841129935684
absolute error = 2.0979214719526912598841129935684
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.621
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1281.7MB, alloc=4.6MB, time=131.37
x[1] = 3.024
y[1] (analytic) = 0
y[1] (numeric) = 2.0989097415487637941271177773608
absolute error = 2.0989097415487637941271177773608
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.62
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.025
y[1] (analytic) = 0
y[1] (numeric) = 2.0998981349666279951717479586919
absolute error = 2.0998981349666279951717479586919
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.62
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.026
y[1] (analytic) = 0
y[1] (numeric) = 2.1008866517937270915083849698469
absolute error = 2.1008866517937270915083849698469
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.619
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.027
y[1] (analytic) = 0
y[1] (numeric) = 2.1018752916173179968705645351171
absolute error = 2.1018752916173179968705645351171
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.618
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.028
y[1] (analytic) = 0
y[1] (numeric) = 2.102864054024472616639584969965
absolute error = 2.102864054024472616639584969965
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.617
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.029
y[1] (analytic) = 0
y[1] (numeric) = 2.103852938602079154991457481437
absolute error = 2.103852938602079154991457481437
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.617
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.03
y[1] (analytic) = 0
y[1] (numeric) = 2.1048419449368434227790219505768
absolute error = 2.1048419449368434227790219505768
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.616
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.031
y[1] (analytic) = 0
y[1] (numeric) = 2.1058310726152901461420463340619
absolute error = 2.1058310726152901461420463340619
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.615
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.032
y[1] (analytic) = 0
y[1] (numeric) = 2.1068203212237642758381225483242
absolute error = 2.1068203212237642758381225483242
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=1285.6MB, alloc=4.6MB, time=131.74
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.614
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.033
y[1] (analytic) = 0
y[1] (numeric) = 2.1078096903484322972871664950781
absolute error = 2.1078096903484322972871664950781
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.613
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.034
y[1] (analytic) = 0
y[1] (numeric) = 2.1087991795752835413223247525106
absolute error = 2.1087991795752835413223247525106
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.612
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.035
y[1] (analytic) = 0
y[1] (numeric) = 2.1097887884901314956400853914442
absolute error = 2.1097887884901314956400853914442
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.611
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.036
y[1] (analytic) = 0
y[1] (numeric) = 2.1107785166786151169423853806087
absolute error = 2.1107785166786151169423853806087
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.61
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.037
y[1] (analytic) = 0
y[1] (numeric) = 2.1117683637262001437635021198033
absolute error = 2.1117683637262001437635021198033
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.609
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.038
y[1] (analytic) = 0
y[1] (numeric) = 2.1127583292181804099745117842421
absolute error = 2.1127583292181804099745117842421
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.608
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.039
y[1] (analytic) = 0
y[1] (numeric) = 2.1137484127396791589580923778009
absolute error = 2.1137484127396791589580923778009
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.607
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.04
y[1] (analytic) = 0
y[1] (numeric) = 2.1147386138756503584464446772626
absolute error = 2.1147386138756503584464446772626
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.606
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1289.4MB, alloc=4.6MB, time=132.11
x[1] = 3.041
y[1] (analytic) = 0
y[1] (numeric) = 2.1157289322108800160150996040439
absolute error = 2.1157289322108800160150996040439
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.604
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.042
y[1] (analytic) = 0
y[1] (numeric) = 2.1167193673299874952253759843127
absolute error = 2.1167193673299874952253759843127
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.603
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.043
y[1] (analytic) = 0
y[1] (numeric) = 2.117709918817426832408248152921
absolute error = 2.117709918817426832408248152921
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.602
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.044
y[1] (analytic) = 0
y[1] (numeric) = 2.1187005862574880540823784212223
absolute error = 2.1187005862574880540823784212223
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.601
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.045
y[1] (analytic) = 0
y[1] (numeric) = 2.119691369234298494999065063654
absolute error = 2.119691369234298494999065063654
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.599
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.046
y[1] (analytic) = 0
y[1] (numeric) = 2.1206822673318241168068521829863
absolute error = 2.1206822673318241168068521829863
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.598
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.047
y[1] (analytic) = 0
y[1] (numeric) = 2.1216732801338708273285435894061
absolute error = 2.1216732801338708273285435894061
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.596
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.048
y[1] (analytic) = 0
y[1] (numeric) = 2.1226644072240858004433586741542
absolute error = 2.1226644072240858004433586741542
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.595
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.049
y[1] (analytic) = 0
y[1] (numeric) = 2.1236556481859587965669641743058
absolute error = 2.1236556481859587965669641743058
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.594
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1293.2MB, alloc=4.6MB, time=132.48
x[1] = 3.05
y[1] (analytic) = 0
y[1] (numeric) = 2.1246470026028234837221117115103
absolute error = 2.1246470026028234837221117115103
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.592
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.051
y[1] (analytic) = 0
y[1] (numeric) = 2.1256384700578587591926070441235
absolute error = 2.1256384700578587591926070441235
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.59
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.052
y[1] (analytic) = 0
y[1] (numeric) = 2.1266300501340900717533330992054
absolute error = 2.1266300501340900717533330992054
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.589
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.053
y[1] (analytic) = 0
y[1] (numeric) = 2.1276217424143907444690450483533
absolute error = 2.1276217424143907444690450483533
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.587
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.054
y[1] (analytic) = 0
y[1] (numeric) = 2.1286135464814832980546519593249
absolute error = 2.1286135464814832980546519593249
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.586
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.055
y[1] (analytic) = 0
y[1] (numeric) = 2.1296054619179407747896958939073
absolute error = 2.1296054619179407747896958939073
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.584
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.056
y[1] (analytic) = 0
y[1] (numeric) = 2.1305974883061880629797357315403
absolute error = 2.1305974883061880629797357315403
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.582
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.057
y[1] (analytic) = 0
y[1] (numeric) = 2.1315896252285032219573394778281
absolute error = 2.1315896252285032219573394778281
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.581
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.058
y[1] (analytic) = 0
y[1] (numeric) = 2.1325818722670188076153853673058
absolute error = 2.1325818722670188076153853673058
relative error = -1 %
memory used=1297.0MB, alloc=4.6MB, time=132.85
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.579
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.059
y[1] (analytic) = 0
y[1] (numeric) = 2.1335742290037231984653686906888
absolute error = 2.1335742290037231984653686906888
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.577
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.06
y[1] (analytic) = 0
y[1] (numeric) = 2.1345666950204619222134079683531
absolute error = 2.1345666950204619222134079683531
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.575
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.061
y[1] (analytic) = 0
y[1] (numeric) = 2.1355592698989389828466408539949
absolute error = 2.1355592698989389828466408539949
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.574
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.062
y[1] (analytic) = 0
y[1] (numeric) = 2.1365519532207181882226969853221
absolute error = 2.1365519532207181882226969853221
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.572
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.063
y[1] (analytic) = 0
y[1] (numeric) = 2.1375447445672244781549319022664
absolute error = 2.1375447445672244781549319022664
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.57
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.064
y[1] (analytic) = 0
y[1] (numeric) = 2.1385376435197452529861031275858
absolute error = 2.1385376435197452529861031275858
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.953
Order of pole = 7.568
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.065
y[1] (analytic) = 0
y[1] (numeric) = 2.1395306496594317026431665498826
absolute error = 2.1395306496594317026431665498826
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.953
Order of pole = 7.566
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.066
y[1] (analytic) = 0
y[1] (numeric) = 2.140523762567300136165868365006
absolute error = 2.140523762567300136165868365006
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.953
Order of pole = 7.564
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1300.8MB, alloc=4.6MB, time=133.22
x[1] = 3.067
y[1] (analytic) = 0
y[1] (numeric) = 2.1415169818242333117018050185625
absolute error = 2.1415169818242333117018050185625
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.953
Order of pole = 7.562
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.068
y[1] (analytic) = 0
y[1] (numeric) = 2.1425103070109817669606208498377
absolute error = 2.1425103070109817669606208498377
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.953
Order of pole = 7.56
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.069
y[1] (analytic) = 0
y[1] (numeric) = 2.1435037377081651501200104658597
absolute error = 2.1435037377081651501200104658597
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.953
Order of pole = 7.558
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.07
y[1] (analytic) = 0
y[1] (numeric) = 2.1444972734962735511761902736184
absolute error = 2.1444972734962735511761902736184
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.952
Order of pole = 7.556
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.071
y[1] (analytic) = 0
y[1] (numeric) = 2.1454909139556688337315010686165
absolute error = 2.1454909139556688337315010686165
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.952
Order of pole = 7.554
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.072
y[1] (analytic) = 0
y[1] (numeric) = 2.1464846586665859672118011189781
absolute error = 2.1464846586665859672118011189781
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.952
Order of pole = 7.552
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.073
y[1] (analytic) = 0
y[1] (numeric) = 2.1474785072091343595063067962909
absolute error = 2.1474785072091343595063067962909
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.952
Order of pole = 7.55
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.074
y[1] (analytic) = 0
y[1] (numeric) = 2.1484724591632991900225354872276
absolute error = 2.1484724591632991900225354872276
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.952
Order of pole = 7.548
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.075
y[1] (analytic) = 0
y[1] (numeric) = 2.1494665141089427431490032737795
absolute error = 2.1494665141089427431490032737795
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.952
Order of pole = 7.545
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1304.6MB, alloc=4.6MB, time=133.59
x[1] = 3.076
y[1] (analytic) = 0
y[1] (numeric) = 2.1504606716258057421183276946667
absolute error = 2.1504606716258057421183276946667
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.951
Order of pole = 7.543
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.077
y[1] (analytic) = 0
y[1] (numeric) = 2.1514549312935086832633837961569
absolute error = 2.1514549312935086832633837961569
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.951
Order of pole = 7.541
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.078
y[1] (analytic) = 0
y[1] (numeric) = 2.1524492926915531706591596471517
absolute error = 2.1524492926915531706591596471517
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.951
Order of pole = 7.539
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.079
y[1] (analytic) = 0
y[1] (numeric) = 2.1534437553993232511429555309828
absolute error = 2.1534437553993232511429555309828
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.951
Order of pole = 7.537
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.08
y[1] (analytic) = 0
y[1] (numeric) = 2.1544383189960867497055691349103
absolute error = 2.1544383189960867497055691349103
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.951
Order of pole = 7.534
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.081
y[1] (analytic) = 0
y[1] (numeric) = 2.1554329830609966052461072378368
absolute error = 2.1554329830609966052461072378368
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.951
Order of pole = 7.532
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.082
y[1] (analytic) = 0
y[1] (numeric) = 2.1564277471730922066830626472494
absolute error = 2.1564277471730922066830626472494
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.95
Order of pole = 7.53
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.083
y[1] (analytic) = 0
y[1] (numeric) = 2.1574226109113007294142934578759
absolute error = 2.1574226109113007294142934578759
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.95
Order of pole = 7.528
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1308.4MB, alloc=4.6MB, time=133.96
x[1] = 3.084
y[1] (analytic) = 0
y[1] (numeric) = 2.1584175738544384721185400970002
absolute error = 2.1584175738544384721185400970002
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.95
Order of pole = 7.525
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.085
y[1] (analytic) = 0
y[1] (numeric) = 2.1594126355812121938911140848209
absolute error = 2.1594126355812121938911140848209
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.95
Order of pole = 7.523
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.086
y[1] (analytic) = 0
y[1] (numeric) = 2.1604077956702204517063909726584
absolute error = 2.1604077956702204517063909726584
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.95
Order of pole = 7.521
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.087
y[1] (analytic) = 0
y[1] (numeric) = 2.161403053699954938199738527223
absolute error = 2.161403053699954938199738527223
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.95
Order of pole = 7.518
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.088
y[1] (analytic) = 0
y[1] (numeric) = 2.1623984092488018197615099055388
absolute error = 2.1623984092488018197615099055388
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.949
Order of pole = 7.516
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.089
y[1] (analytic) = 0
y[1] (numeric) = 2.163393861895043074935730312484
absolute error = 2.163393861895043074935730312484
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.949
Order of pole = 7.513
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.09
y[1] (analytic) = 0
y[1] (numeric) = 2.1643894112168578331161044512442
absolute error = 2.1643894112168578331161044512442
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.949
Order of pole = 7.511
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.091
y[1] (analytic) = 0
y[1] (numeric) = 2.1653850567923237135319709662834
absolute error = 2.1653850567923237135319709662834
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.949
Order of pole = 7.509
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.092
y[1] (analytic) = 0
y[1] (numeric) = 2.1663807981994181645168290387107
absolute error = 2.1663807981994181645168290387107
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.949
Order of pole = 7.506
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1312.3MB, alloc=4.6MB, time=134.33
x[1] = 3.093
y[1] (analytic) = 0
y[1] (numeric) = 2.1673766350160198030520613251492
absolute error = 2.1673766350160198030520613251492
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.948
Order of pole = 7.504
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.094
y[1] (analytic) = 0
y[1] (numeric) = 2.1683725668199097545784765333962
absolute error = 2.1683725668199097545784765333962
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.948
Order of pole = 7.501
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.095
y[1] (analytic) = 0
y[1] (numeric) = 2.169368593188772993068294101285
absolute error = 2.169368593188772993068294101285
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.948
Order of pole = 7.499
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.096
y[1] (analytic) = 0
y[1] (numeric) = 2.1703647137001996813501926892164
absolute error = 2.1703647137001996813501926892164
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.948
Order of pole = 7.496
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.097
y[1] (analytic) = 0
y[1] (numeric) = 2.1713609279316865116800435118051
absolute error = 2.1713609279316865116800435118051
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.948
Order of pole = 7.494
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.098
y[1] (analytic) = 0
y[1] (numeric) = 2.1723572354606380465499489199751
absolute error = 2.1723572354606380465499489199751
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.492
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.099
y[1] (analytic) = 0
y[1] (numeric) = 2.1733536358643680597282061016292
absolute error = 2.1733536358643680597282061016292
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.489
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.1
y[1] (analytic) = 0
y[1] (numeric) = 2.1743501287201008775228152966884
absolute error = 2.1743501287201008775228152966884
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.487
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.101
y[1] (analytic) = 0
y[1] (numeric) = 2.1753467136049727202611515208447
absolute error = 2.1753467136049727202611515208447
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.484
memory used=1316.1MB, alloc=4.6MB, time=134.70
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.102
y[1] (analytic) = 0
y[1] (numeric) = 2.1763433900960330439784184617719
absolute error = 2.1763433900960330439784184617719
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.482
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.103
y[1] (analytic) = 0
y[1] (numeric) = 2.1773401577702458823075029517798
absolute error = 2.1773401577702458823075029517798
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.479
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.104
y[1] (analytic) = 0
y[1] (numeric) = 2.1783370162044911885628482319632
absolute error = 2.1783370162044911885628482319632
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.477
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.105
y[1] (analytic) = 0
y[1] (numeric) = 2.1793339649755661780109641047661
absolute error = 2.1793339649755661780109641047661
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.474
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.106
y[1] (analytic) = 0
y[1] (numeric) = 2.1803310036601866703201920245355
absolute error = 2.1803310036601866703201920245355
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.472
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.107
y[1] (analytic) = 0
y[1] (numeric) = 2.1813281318349884321823431990625
absolute error = 2.1813281318349884321823431990625
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.469
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.108
y[1] (analytic) = 0
y[1] (numeric) = 2.1823253490765285200988278692725
absolute error = 2.1823253490765285200988278692725
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.467
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.109
y[1] (analytic) = 0
y[1] (numeric) = 2.1833226549612866233238940991159
absolute error = 2.1833226549612866233238940991159
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.464
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1319.9MB, alloc=4.6MB, time=135.07
x[1] = 3.11
y[1] (analytic) = 0
y[1] (numeric) = 2.1843200490656664069575946432983
absolute error = 2.1843200490656664069575946432983
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.462
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.111
y[1] (analytic) = 0
y[1] (numeric) = 2.1853175309659968551811007667553
absolute error = 2.1853175309659968551811007667553
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.459
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.112
y[1] (analytic) = 0
y[1] (numeric) = 2.1863151002385336146269822666917
absolute error = 2.1863151002385336146269822666917
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.457
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.113
y[1] (analytic) = 0
y[1] (numeric) = 2.1873127564594603378770733955461
absolute error = 2.1873127564594603378770733955461
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.454
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.114
y[1] (analytic) = 0
y[1] (numeric) = 2.1883104992048900270805449013836
absolute error = 2.1883104992048900270805449013836
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.452
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.115
y[1] (analytic) = 0
y[1] (numeric) = 2.1893083280508663776848029909275
absolute error = 2.1893083280508663776848029909275
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.449
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.116
y[1] (analytic) = 0
y[1] (numeric) = 2.1903062425733651222718366796967
absolute error = 2.1903062425733651222718366796967
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.447
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.117
y[1] (analytic) = 0
y[1] (numeric) = 2.1913042423482953744926357234794
absolute error = 2.1913042423482953744926357234794
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.444
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.118
y[1] (analytic) = 0
y[1] (numeric) = 2.1923023269515009730923021256231
absolute error = 2.1923023269515009730923021256231
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.442
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1323.7MB, alloc=4.6MB, time=135.43
x[1] = 3.119
y[1] (analytic) = 0
y[1] (numeric) = 2.1933004959587618260184790853176
absolute error = 2.1933004959587618260184790853176
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.439
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.12
y[1] (analytic) = 0
y[1] (numeric) = 2.1942987489457952546057221931664
absolute error = 2.1942987489457952546057221931664
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.437
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.121
y[1] (analytic) = 0
y[1] (numeric) = 2.1952970854882573378284386918403
absolute error = 2.1952970854882573378284386918403
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.434
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.122
y[1] (analytic) = 0
y[1] (numeric) = 2.19629550516174425661502170146
absolute error = 2.19629550516174425661502170146
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.432
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.123
y[1] (analytic) = 0
y[1] (numeric) = 2.1972940075417936382158074615197
absolute error = 2.1972940075417936382158074615197
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.429
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.124
y[1] (analytic) = 0
y[1] (numeric) = 2.1982925922038859006174848636079
absolute error = 2.1982925922038859006174848636079
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.427
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.125
y[1] (analytic) = 0
y[1] (numeric) = 2.1992912587234455969965878418676
absolute error = 2.1992912587234455969965878418676
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.424
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.126
y[1] (analytic) = 0
y[1] (numeric) = 2.2002900066758427602047025510263
absolute error = 2.2002900066758427602047025510263
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.422
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1327.5MB, alloc=4.6MB, time=135.81
x[1] = 3.127
y[1] (analytic) = 0
y[1] (numeric) = 2.2012888356363942472780226948782
absolute error = 2.2012888356363942472780226948782
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.419
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.128
y[1] (analytic) = 0
y[1] (numeric) = 2.2022877451803650839638878712788
absolute error = 2.2022877451803650839638878712788
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.417
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.129
y[1] (analytic) = 0
y[1] (numeric) = 2.203286734882969809256941372968
absolute error = 2.203286734882969809256941372968
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.415
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.13
y[1] (analytic) = 0
y[1] (numeric) = 2.2042858043193738199375455268402
absolute error = 2.2042858043193738199375455268402
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.412
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.131
y[1] (analytic) = 0
y[1] (numeric) = 2.2052849530646947151050943675751
absolute error = 2.2052849530646947151050943675751
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.41
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.132
y[1] (analytic) = 0
y[1] (numeric) = 2.2062841806940036406988652247941
absolute error = 2.2062841806940036406988652247941
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.407
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.133
y[1] (analytic) = 0
y[1] (numeric) = 2.2072834867823266339990526560678
absolute error = 2.2072834867823266339990526560678
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.405
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.134
y[1] (analytic) = 0
y[1] (numeric) = 2.2082828709046459681006300811228
absolute error = 2.2082828709046459681006300811228
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.403
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.135
y[1] (analytic) = 0
y[1] (numeric) = 2.2092823326359014963526864654351
absolute error = 2.2092823326359014963526864654351
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.4
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1331.3MB, alloc=4.6MB, time=136.19
x[1] = 3.136
y[1] (analytic) = 0
y[1] (numeric) = 2.2102818715509919967558874640068
absolute error = 2.2102818715509919967558874640068
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.398
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.137
y[1] (analytic) = 0
y[1] (numeric) = 2.2112814872247765163107125684508
absolute error = 2.2112814872247765163107125684508
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.396
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.138
y[1] (analytic) = 0
y[1] (numeric) = 2.2122811792320757153091220025076
absolute error = 2.2122811792320757153091220025076
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.393
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.139
y[1] (analytic) = 0
y[1] (numeric) = 2.2132809471476732115623093827383
absolute error = 2.2132809471476732115623093827383
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.391
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.14
y[1] (analytic) = 0
y[1] (numeric) = 2.2142807905463169245571985023254
absolute error = 2.2142807905463169245571985023254
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.389
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.141
y[1] (analytic) = 0
y[1] (numeric) = 2.2152807090027204195343450066197
absolute error = 2.2152807090027204195343450066197
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.387
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.142
y[1] (analytic) = 0
y[1] (numeric) = 2.2162807020915642514799062092374
absolute error = 2.2162807020915642514799062092374
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.384
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.143
y[1] (analytic) = 0
y[1] (numeric) = 2.2172807693874973090243448470906
absolute error = 2.2172807693874973090243448470906
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.382
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.144
y[1] (analytic) = 0
y[1] (numeric) = 2.218280910465138158240535191665
absolute error = 2.218280910465138158240535191665
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.38
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1335.1MB, alloc=4.6MB, time=136.56
x[1] = 3.145
y[1] (analytic) = 0
y[1] (numeric) = 2.2192811248990763863339426220865
absolute error = 2.2192811248990763863339426220865
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.378
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.146
y[1] (analytic) = 0
y[1] (numeric) = 2.2202814122638739452175505229901
absolute error = 2.2202814122638739452175505229901
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.376
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.147
y[1] (analytic) = 0
y[1] (numeric) = 2.221281772134066494964211196855
absolute error = 2.221281772134066494964211196855
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.374
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.148
y[1] (analytic) = 0
y[1] (numeric) = 2.2222822040841647471291003762492
absolute error = 2.2222822040841647471291003762492
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.372
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.149
y[1] (analytic) = 0
y[1] (numeric) = 2.2232827076886558079349578862656
absolute error = 2.2232827076886558079349578862656
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.37
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.15
y[1] (analytic) = 0
y[1] (numeric) = 2.2242832825220045213128000412782
absolute error = 2.2242832825220045213128000412782
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.367
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.151
y[1] (analytic) = 0
y[1] (numeric) = 2.2252839281586548117907924629333
absolute error = 2.2252839281586548117907924629333
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.365
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.152
y[1] (analytic) = 0
y[1] (numeric) = 2.2262846441730310272239751779577
absolute error = 2.2262846441730310272239751779577
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.363
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1339.0MB, alloc=4.6MB, time=136.93
x[1] = 3.153
y[1] (analytic) = 0
y[1] (numeric) = 2.2272854301395392813575350948475
absolute error = 2.2272854301395392813575350948475
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.361
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.154
y[1] (analytic) = 0
y[1] (numeric) = 2.2282862856325687962163242677363
absolute error = 2.2282862856325687962163242677363
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.359
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.155
y[1] (analytic) = 0
y[1] (numeric) = 2.2292872102264932443133257336634
absolute error = 2.2292872102264932443133257336634
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.358
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.156
y[1] (analytic) = 0
y[1] (numeric) = 2.2302882034956720906697721560014
absolute error = 2.2302882034956720906697721560014
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.356
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.157
y[1] (analytic) = 0
y[1] (numeric) = 2.2312892650144519346396260218993
absolute error = 2.2312892650144519346396260218993
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.354
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.158
y[1] (analytic) = 0
y[1] (numeric) = 2.2322903943571678515311337251771
absolute error = 2.2322903943571678515311337251771
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.352
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.159
y[1] (analytic) = 0
y[1] (numeric) = 2.233291591098144734018169518101
absolute error = 2.233291591098144734018169518101
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.35
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.16
y[1] (analytic) = 0
y[1] (numeric) = 2.234292854811698633334089035815
absolute error = 2.234292854811698633334089035815
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.348
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.161
y[1] (analytic) = 0
y[1] (numeric) = 2.2352941850721381002408158858192
absolute error = 2.2352941850721381002408158858192
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.346
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1342.8MB, alloc=4.6MB, time=137.29
x[1] = 3.162
y[1] (analytic) = 0
y[1] (numeric) = 2.2362955814537655257658886517108
absolute error = 2.2362955814537655257658886517108
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.345
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.163
y[1] (analytic) = 0
y[1] (numeric) = 2.2372970435308784817001995853547
absolute error = 2.2372970435308784817001995853547
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.343
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.164
y[1] (analytic) = 0
y[1] (numeric) = 2.2382985708777710608491602546659
absolute error = 2.2382985708777710608491602546659
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.341
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.165
y[1] (analytic) = 0
y[1] (numeric) = 2.2393001630687352170300334751796
absolute error = 2.2393001630687352170300334751796
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.34
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.166
y[1] (analytic) = 0
y[1] (numeric) = 2.2403018196780621048081749824911
absolute error = 2.2403018196780621048081749824911
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.338
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.167
y[1] (analytic) = 0
y[1] (numeric) = 2.2413035402800434189649324993838
absolute error = 2.2413035402800434189649324993838
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.336
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.168
y[1] (analytic) = 0
y[1] (numeric) = 2.2423053244489727336899541159576
absolute error = 2.2423053244489727336899541159576
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.335
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.169
y[1] (analytic) = 0
y[1] (numeric) = 2.2433071717591468414906622332387
absolute error = 2.2433071717591468414906622332387
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.333
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.17
y[1] (analytic) = 0
y[1] (numeric) = 2.2443090817848670918116537205216
absolute error = 2.2443090817848670918116537205216
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.332
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1346.6MB, alloc=4.6MB, time=137.66
x[1] = 3.171
y[1] (analytic) = 0
y[1] (numeric) = 2.2453110541004407293567914039828
absolute error = 2.2453110541004407293567914039828
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.33
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.172
y[1] (analytic) = 0
y[1] (numeric) = 2.2463130882801822321067565388306
absolute error = 2.2463130882801822321067565388306
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.329
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.173
y[1] (analytic) = 0
y[1] (numeric) = 2.2473151838984146490248365193409
absolute error = 2.2473151838984146490248365193409
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.327
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.174
y[1] (analytic) = 0
y[1] (numeric) = 2.2483173405294709374437267504854
absolute error = 2.2483173405294709374437267504854
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.326
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.175
y[1] (analytic) = 0
y[1] (numeric) = 2.2493195577476953001261303414101
absolute error = 2.2493195577476953001261303414101
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.324
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.176
y[1] (analytic) = 0
y[1] (numeric) = 2.2503218351274445219919440846767
absolute error = 2.2503218351274445219919440846767
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.323
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.177
y[1] (analytic) = 0
y[1] (numeric) = 2.2513241722430893065048240558614
absolute error = 2.2513241722430893065048240558614
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.322
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.178
y[1] (analytic) = 0
y[1] (numeric) = 2.2523265686690156117109291057191
absolute error = 2.2523265686690156117109291057191
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.32
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1350.4MB, alloc=4.6MB, time=138.03
x[1] = 3.179
y[1] (analytic) = 0
y[1] (numeric) = 2.2533290239796259859226455215883
absolute error = 2.2533290239796259859226455215883
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.319
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.18
y[1] (analytic) = 0
y[1] (numeric) = 2.2543315377493409030401012059383
absolute error = 2.2543315377493409030401012059383
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.318
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.181
y[1] (analytic) = 0
y[1] (numeric) = 2.255334109552600097503282857862
absolute error = 2.255334109552600097503282857862
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.317
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.182
y[1] (analytic) = 0
y[1] (numeric) = 2.2563367389638638988675748478034
absolute error = 2.2563367389638638988675748478034
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.316
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.183
y[1] (analytic) = 0
y[1] (numeric) = 2.2573394255576145659955437467878
absolute error = 2.2573394255576145659955437467878
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.314
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.184
y[1] (analytic) = 0
y[1] (numeric) = 2.2583421689083576208577978088049
absolute error = 2.2583421689083576208577978088049
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.313
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.185
y[1] (analytic) = 0
y[1] (numeric) = 2.2593449685906231819357561086893
absolute error = 2.2593449685906231819357561086893
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.312
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.186
y[1] (analytic) = 0
y[1] (numeric) = 2.2603478241789672972191675077534
absolute error = 2.2603478241789672972191675077534
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.311
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.187
y[1] (analytic) = 0
y[1] (numeric) = 2.2613507352479732767912251554642
absolute error = 2.2613507352479732767912251554642
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.31
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1354.2MB, alloc=4.6MB, time=138.40
x[1] = 3.188
y[1] (analytic) = 0
y[1] (numeric) = 2.2623537013722530249941278375214
absolute error = 2.2623537013722530249941278375214
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.309
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.189
y[1] (analytic) = 0
y[1] (numeric) = 2.263356722126448372167945148694
absolute error = 2.263356722126448372167945148694
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.308
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.19
y[1] (analytic) = 0
y[1] (numeric) = 2.2643597970852324059556492026121
absolute error = 2.2643597970852324059556492026121
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.308
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.191
y[1] (analytic) = 0
y[1] (numeric) = 2.2653629258233108021671813902904
absolute error = 2.2653629258233108021671813902904
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.307
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.192
y[1] (analytic) = 0
y[1] (numeric) = 2.2663661079154231551954285643825
absolute error = 2.2663661079154231551954285643825
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.306
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.193
y[1] (analytic) = 0
y[1] (numeric) = 2.2673693429363443079769889569329
absolute error = 2.2673693429363443079769889569329
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.305
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.194
y[1] (analytic) = 0
y[1] (numeric) = 2.2683726304608856814906141346066
absolute error = 2.2683726304608856814906141346066
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.304
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.195
y[1] (analytic) = 0
y[1] (numeric) = 2.2693759700638966037862193569318
absolute error = 2.2693759700638966037862193569318
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.304
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.196
y[1] (analytic) = 0
y[1] (numeric) = 2.2703793613202656385373608298922
absolute error = 2.2703793613202656385373608298922
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.303
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1358.0MB, alloc=4.6MB, time=138.78
x[1] = 3.197
y[1] (analytic) = 0
y[1] (numeric) = 2.2713828038049219131100845391445
absolute error = 2.2713828038049219131100845391445
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.302
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.198
y[1] (analytic) = 0
y[1] (numeric) = 2.2723862970928364461410576041157
absolute error = 2.2723862970928364461410576041157
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.302
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.199
y[1] (analytic) = 0
y[1] (numeric) = 2.2733898407590234746178994161478
absolute error = 2.2733898407590234746178994161478
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.301
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.2
y[1] (analytic) = 0
y[1] (numeric) = 2.2743934343785417804546362105971
absolute error = 2.2743934343785417804546362105971
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.301
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.201
y[1] (analytic) = 0
y[1] (numeric) = 2.2753970775264960165552091742626
absolute error = 2.2753970775264960165552091742626
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.3
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.202
y[1] (analytic) = 0
y[1] (numeric) = 2.2764007697780380323579727055999
absolute error = 2.2764007697780380323579727055999
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.3
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.203
y[1] (analytic) = 0
y[1] (numeric) = 2.2774045107083681988541260257695
absolute error = 2.2774045107083681988541260257695
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.299
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.204
y[1] (analytic) = 0
y[1] (numeric) = 2.2784082998927367330730279835649
absolute error = 2.2784082998927367330730279835649
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.299
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.205
y[1] (analytic) = 0
y[1] (numeric) = 2.2794121369064450220273516065541
absolute error = 2.2794121369064450220273516065541
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=1361.9MB, alloc=4.6MB, time=139.15
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.299
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.206
y[1] (analytic) = 0
y[1] (numeric) = 2.2804160213248469461110417242403
absolute error = 2.2804160213248469461110417242403
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.298
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.207
y[1] (analytic) = 0
y[1] (numeric) = 2.2814199527233502019430458265948
absolute error = 2.2814199527233502019430458265948
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.298
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.208
y[1] (analytic) = 0
y[1] (numeric) = 2.282423930677417624649795222822
absolute error = 2.282423930677417624649795222822
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.298
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.209
y[1] (analytic) = 0
y[1] (numeric) = 2.2834279547625685095794205305765
absolute error = 2.2834279547625685095794205305765
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.298
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.21
y[1] (analytic) = 0
y[1] (numeric) = 2.2844320245543799334406925549451
absolute error = 2.2844320245543799334406925549451
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.298
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.211
y[1] (analytic) = 0
y[1] (numeric) = 2.285436139628488074859686709228
absolute error = 2.285436139628488074859686709228
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.297
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.212
y[1] (analytic) = 0
y[1] (numeric) = 2.2864402995605895343471762857799
absolute error = 2.2864402995605895343471762857799
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.297
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.213
y[1] (analytic) = 0
y[1] (numeric) = 2.2874445039264426536697671047936
absolute error = 2.2874445039264426536697671047936
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.935
Order of pole = 7.297
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1365.7MB, alloc=4.6MB, time=139.53
x[1] = 3.214
y[1] (analytic) = 0
y[1] (numeric) = 2.2884487523018688346177933518079
absolute error = 2.2884487523018688346177933518079
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.297
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.215
y[1] (analytic) = 0
y[1] (numeric) = 2.2894530442627538571630017607812
absolute error = 2.2894530442627538571630017607812
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.297
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.216
y[1] (analytic) = 0
y[1] (numeric) = 2.2904573793850491969990587086748
absolute error = 2.2904573793850491969990587086748
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.297
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.217
y[1] (analytic) = 0
y[1] (numeric) = 2.2914617572447733424579222595171
absolute error = 2.2914617572447733424579222595171
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.297
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.218
y[1] (analytic) = 0
y[1] (numeric) = 2.2924661774180131107951287307523
absolute error = 2.2924661774180131107951287307523
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.298
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.219
y[1] (analytic) = 0
y[1] (numeric) = 2.2934706394809249638370509521938
absolute error = 2.2934706394809249638370509521938
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.298
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.22
y[1] (analytic) = 0
y[1] (numeric) = 2.2944751430097363229831930479843
absolute error = 2.2944751430097363229831930479843
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.298
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.221
y[1] (analytic) = 0
y[1] (numeric) = 2.2954796875807468835565942944896
absolute error = 2.2954796875807468835565942944896
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.298
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.222
y[1] (analytic) = 0
y[1] (numeric) = 2.2964842727703299284954223918943
absolute error = 2.2964842727703299284954223918943
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.298
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1369.5MB, alloc=4.6MB, time=139.90
x[1] = 3.223
y[1] (analytic) = 0
y[1] (numeric) = 2.2974888981549336413788443343119
absolute error = 2.2974888981549336413788443343119
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.936
Order of pole = 7.299
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.224
y[1] (analytic) = 0
y[1] (numeric) = 2.2984935633110824187802709723328
absolute error = 2.2984935633110824187802709723328
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.299
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.225
y[1] (analytic) = 0
y[1] (numeric) = 2.2994982678153781819410793329972
absolute error = 2.2994982678153781819410793329972
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.299
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.226
y[1] (analytic) = 0
y[1] (numeric) = 2.3005030112445016877579247950626
absolute error = 2.3005030112445016877579247950626
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.3
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.227
y[1] (analytic) = 0
y[1] (numeric) = 2.301507793175213839076763312018
absolute error = 2.301507793175213839076763312018
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.3
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.228
y[1] (analytic) = 0
y[1] (numeric) = 2.302512613184356994286712031445
absolute error = 2.302512613184356994286712031445
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.301
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.229
y[1] (analytic) = 0
y[1] (numeric) = 2.3035174708488562762068848769172
absolute error = 2.3035174708488562762068848769172
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.301
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.23
y[1] (analytic) = 0
y[1] (numeric) = 2.3045223657457208802593479375339
absolute error = 2.3045223657457208802593479375339
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.302
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.231
y[1] (analytic) = 0
y[1] (numeric) = 2.305527297452045381921347850269
absolute error = 2.305527297452045381921347850269
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.937
Order of pole = 7.302
TOP MAIN SOLVE Loop
memory used=1373.3MB, alloc=4.6MB, time=140.28
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.232
y[1] (analytic) = 0
y[1] (numeric) = 2.306532265545011043449974761458
absolute error = 2.306532265545011043449974761458
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.303
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.233
y[1] (analytic) = 0
y[1] (numeric) = 2.3075372696018871198724299158063
absolute error = 2.3075372696018871198724299158063
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.304
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.234
y[1] (analytic) = 0
y[1] (numeric) = 2.3085423092000321642350764441567
absolute error = 2.3085423092000321642350764441567
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.304
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.235
y[1] (analytic) = 0
y[1] (numeric) = 2.3095473839168953321044605047636
absolute error = 2.3095473839168953321044605047636
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.305
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.236
y[1] (analytic) = 0
y[1] (numeric) = 2.3105524933300176853134985768577
absolute error = 2.3105524933300176853134985768577
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.306
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.237
y[1] (analytic) = 0
y[1] (numeric) = 2.3115576370170334949460354097134
absolute error = 2.3115576370170334949460354097134
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.938
Order of pole = 7.307
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.238
y[1] (analytic) = 0
y[1] (numeric) = 2.3125628145556715435529858951136
absolute error = 2.3125628145556715435529858951136
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.308
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.239
y[1] (analytic) = 0
y[1] (numeric) = 2.3135680255237564265932829559124
absolute error = 2.3135680255237564265932829559124
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.308
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1377.1MB, alloc=4.6MB, time=140.65
x[1] = 3.24
y[1] (analytic) = 0
y[1] (numeric) = 2.3145732694992098530928624281868
absolute error = 2.3145732694992098530928624281868
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.309
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.241
y[1] (analytic) = 0
y[1] (numeric) = 2.3155785460600519455149248591058
absolute error = 2.3155785460600519455149248591058
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.31
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.242
y[1] (analytic) = 0
y[1] (numeric) = 2.3165838547844025388347231469956
absolute error = 2.3165838547844025388347231469956
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.939
Order of pole = 7.311
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.243
y[1] (analytic) = 0
y[1] (numeric) = 2.3175891952504824788121340140005
absolute error = 2.3175891952504824788121340140005
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.312
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.244
y[1] (analytic) = 0
y[1] (numeric) = 2.3185945670366149194552804250943
absolute error = 2.3185945670366149194552804250943
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.313
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.245
y[1] (analytic) = 0
y[1] (numeric) = 2.3195999697212266196684812498455
absolute error = 2.3195999697212266196684812498455
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.314
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.246
y[1] (analytic) = 0
y[1] (numeric) = 2.3206054028828492390778137051418
absolute error = 2.3206054028828492390778137051418
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.315
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.247
y[1] (analytic) = 0
y[1] (numeric) = 2.3216108661001206330275834178917
absolute error = 2.3216108661001206330275834178917
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.94
Order of pole = 7.316
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.248
y[1] (analytic) = 0
y[1] (numeric) = 2.322616358951786146741006306407
absolute error = 2.322616358951786146741006306407
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.317
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1380.9MB, alloc=4.6MB, time=141.02
x[1] = 3.249
y[1] (analytic) = 0
y[1] (numeric) = 2.3236218810166999086384158975795
absolute error = 2.3236218810166999086384158975795
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.319
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.25
y[1] (analytic) = 0
y[1] (numeric) = 2.324627431873826122806319173961
absolute error = 2.324627431873826122806319173961
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.32
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.251
y[1] (analytic) = 0
y[1] (numeric) = 2.3256330111022403606106335802921
absolute error = 2.3256330111022403606106335802921
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.321
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.252
y[1] (analytic) = 0
y[1] (numeric) = 2.3266386182811308514474474127552
absolute error = 2.3266386182811308514474474127552
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.941
Order of pole = 7.322
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.253
y[1] (analytic) = 0
y[1] (numeric) = 2.3276442529897997726246554661084
absolute error = 2.3276442529897997726246554661084
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.323
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.254
y[1] (analytic) = 0
y[1] (numeric) = 2.3286499148076645383678315237417
absolute error = 2.3286499148076645383678315237417
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.325
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.255
y[1] (analytic) = 0
y[1] (numeric) = 2.3296556033142590879437090434391
absolute error = 2.3296556033142590879437090434391
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.326
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.256
y[1] (analytic) = 0
y[1] (numeric) = 2.3306613180892351728946512170798
absolute error = 2.3306613180892351728946512170798
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.942
Order of pole = 7.327
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.257
y[1] (analytic) = 0
y[1] (numeric) = 2.3316670587123636433775014655264
absolute error = 2.3316670587123636433775014655264
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.329
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1384.7MB, alloc=4.6MB, time=141.39
x[1] = 3.258
y[1] (analytic) = 0
y[1] (numeric) = 2.3326728247635357336002153703705
absolute error = 2.3326728247635357336002153703705
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.33
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.259
y[1] (analytic) = 0
y[1] (numeric) = 2.3336786158227643463496850418957
absolute error = 2.3336786158227643463496850418957
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.332
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.26
y[1] (analytic) = 0
y[1] (numeric) = 2.334684431470185336604176977416
absolute error = 2.334684431470185336604176977416
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.333
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.261
y[1] (analytic) = 0
y[1] (numeric) = 2.3356902712860587942238145759115
absolute error = 2.3356902712860587942238145759115
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.943
Order of pole = 7.334
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.262
y[1] (analytic) = 0
y[1] (numeric) = 2.3366961348507703257125466434533
absolute error = 2.3366961348507703257125466434533
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.336
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.263
y[1] (analytic) = 0
y[1] (numeric) = 2.3377020217448323350450534491387
absolute error = 2.3377020217448323350450534491387
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.337
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.264
y[1] (analytic) = 0
y[1] (numeric) = 2.3387079315488853035520521729937
absolute error = 2.3387079315488853035520521729937
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.339
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.265
y[1] (analytic) = 0
y[1] (numeric) = 2.339713863843699068857473925382
absolute error = 2.339713863843699068857473925382
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.944
Order of pole = 7.341
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.266
y[1] (analytic) = 0
y[1] (numeric) = 2.3407198182101741028609949117445
absolute error = 2.3407198182101741028609949117445
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.342
memory used=1388.6MB, alloc=4.6MB, time=141.77
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.267
y[1] (analytic) = 0
y[1] (numeric) = 2.3417257942293427887594147668147
absolute error = 2.3417257942293427887594147668147
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.344
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.268
y[1] (analytic) = 0
y[1] (numeric) = 2.3427317914823706971003855886665
absolute error = 2.3427317914823706971003855886665
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.345
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.269
y[1] (analytic) = 0
y[1] (numeric) = 2.343737809550557860862005764891
absolute error = 2.343737809550557860862005764891
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.945
Order of pole = 7.347
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.27
y[1] (analytic) = 0
y[1] (numeric) = 2.3447438480153400495518033007107
absolute error = 2.3447438480153400495518033007107
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.349
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.271
y[1] (analytic) = 0
y[1] (numeric) = 2.3457499064582900423186440317696
absolute error = 2.3457499064582900423186440317696
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.35
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.272
y[1] (analytic) = 0
y[1] (numeric) = 2.3467559844611189000711108325218
absolute error = 2.3467559844611189000711108325218
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.946
Order of pole = 7.352
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.273
y[1] (analytic) = 0
y[1] (numeric) = 2.3477620816056772365959107144266
absolute error = 2.3477620816056772365959107144266
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.354
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.274
y[1] (analytic) = 0
y[1] (numeric) = 2.3487681974739564886698775463808
absolute error = 2.3487681974739564886698775463808
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.355
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1392.4MB, alloc=4.6MB, time=142.15
x[1] = 3.275
y[1] (analytic) = 0
y[1] (numeric) = 2.3497743316480901851591490228206
absolute error = 2.3497743316480901851591490228206
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.357
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.276
y[1] (analytic) = 0
y[1] (numeric) = 2.3507804837103552150991074525456
absolute error = 2.3507804837103552150991074525456
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.947
Order of pole = 7.359
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.277
y[1] (analytic) = 0
y[1] (numeric) = 2.3517866532431730947486849433944
absolute error = 2.3517866532431730947486849433944
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.948
Order of pole = 7.361
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.278
y[1] (analytic) = 0
y[1] (numeric) = 2.352792839829111233612644614272
absolute error = 2.352792839829111233612644614272
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.948
Order of pole = 7.363
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.279
y[1] (analytic) = 0
y[1] (numeric) = 2.3537990430508841994254605765324
absolute error = 2.3537990430508841994254605765324
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.948
Order of pole = 7.364
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.28
y[1] (analytic) = 0
y[1] (numeric) = 2.3548052624913549820904305911927
absolute error = 2.3548052624913549820904305911927
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.949
Order of pole = 7.366
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.281
y[1] (analytic) = 0
y[1] (numeric) = 2.3558114977335362565676665267305
absolute error = 2.3558114977335362565676665267305
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.949
Order of pole = 7.368
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.282
y[1] (analytic) = 0
y[1] (numeric) = 2.3568177483605916447046190141337
absolute error = 2.3568177483605916447046190141337
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.949
Order of pole = 7.37
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.283
y[1] (analytic) = 0
y[1] (numeric) = 2.3578240139558369760028040212657
absolute error = 2.3578240139558369760028040212657
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.949
Order of pole = 7.372
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1396.2MB, alloc=4.6MB, time=142.52
x[1] = 3.284
y[1] (analytic) = 0
y[1] (numeric) = 2.3588302941027415473144104473083
absolute error = 2.3588302941027415473144104473083
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.95
Order of pole = 7.374
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.285
y[1] (analytic) = 0
y[1] (numeric) = 2.3598365883849293814624792698913
absolute error = 2.3598365883849293814624792698913
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.95
Order of pole = 7.376
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.286
y[1] (analytic) = 0
y[1] (numeric) = 2.3608428963861804847783562623389
absolute error = 2.3608428963861804847783562623389
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.95
Order of pole = 7.378
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.287
y[1] (analytic) = 0
y[1] (numeric) = 2.3618492176904321035501318360914
absolute error = 2.3618492176904321035501318360914
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.951
Order of pole = 7.379
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.288
y[1] (analytic) = 0
y[1] (numeric) = 2.3628555518817799793757931536339
absolute error = 2.3628555518817799793757931536339
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.951
Order of pole = 7.381
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.289
y[1] (analytic) = 0
y[1] (numeric) = 2.3638618985444796034148253000025
absolute error = 2.3638618985444796034148253000025
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.951
Order of pole = 7.383
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.29
y[1] (analytic) = 0
y[1] (numeric) = 2.3648682572629474695320099959867
absolute error = 2.3648682572629474695320099959867
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.951
Order of pole = 7.385
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.291
y[1] (analytic) = 0
y[1] (numeric) = 2.3658746276217623263271820833218
absolute error = 2.3658746276217623263271820833218
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.952
Order of pole = 7.387
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.292
y[1] (analytic) = 0
y[1] (numeric) = 2.3668810092056664280447158113058
absolute error = 2.3668810092056664280447158113058
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.952
Order of pole = 7.389
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1400.0MB, alloc=4.6MB, time=142.89
x[1] = 3.293
y[1] (analytic) = 0
y[1] (numeric) = 2.3678874015995667843565248052061
absolute error = 2.3678874015995667843565248052061
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.952
Order of pole = 7.391
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.294
y[1] (analytic) = 0
y[1] (numeric) = 2.3688938043885364090123714993706
absolute error = 2.3688938043885364090123714993706
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.953
Order of pole = 7.393
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.295
y[1] (analytic) = 0
y[1] (numeric) = 2.3699002171578155673512937719567
absolute error = 2.3699002171578155673512937719567
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.953
Order of pole = 7.395
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.296
y[1] (analytic) = 0
y[1] (numeric) = 2.3709066394928130226679685234615
absolute error = 2.3709066394928130226679685234615
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.953
Order of pole = 7.397
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.297
y[1] (analytic) = 0
y[1] (numeric) = 2.3719130709791072814278439976119
absolute error = 2.3719130709791072814278439976119
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.399
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.298
y[1] (analytic) = 0
y[1] (numeric) = 2.3729195112024478373248847504709
absolute error = 2.3729195112024478373248847504709
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.401
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.299
y[1] (analytic) = 0
y[1] (numeric) = 2.3739259597487564141757853316712
absolute error = 2.3739259597487564141757853316712
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.403
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.3
y[1] (analytic) = 0
y[1] (numeric) = 2.374932416204128207644520950317
absolute error = 2.374932416204128207644520950317
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.954
Order of pole = 7.405
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.301
y[1] (analytic) = 0
y[1] (numeric) = 2.3759388801548331257911156571268
absolute error = 2.3759388801548331257911156571268
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.407
memory used=1403.8MB, alloc=4.6MB, time=143.27
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.302
y[1] (analytic) = 0
y[1] (numeric) = 2.3769453511873170284385208836494
absolute error = 2.3769453511873170284385208836494
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.409
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.303
y[1] (analytic) = 0
y[1] (numeric) = 2.3779518288882029653515095386927
absolute error = 2.3779518288882029653515095386927
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.955
Order of pole = 7.411
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.304
y[1] (analytic) = 0
y[1] (numeric) = 2.3789583128442924132215032712841
absolute error = 2.3789583128442924132215032712841
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.413
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.305
y[1] (analytic) = 0
y[1] (numeric) = 2.379964802642566511451262968356
absolute error = 2.379964802642566511451262968356
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.415
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.306
y[1] (analytic) = 0
y[1] (numeric) = 2.3809712978701872967333850637389
absolute error = 2.3809712978701872967333850637389
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.956
Order of pole = 7.417
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.307
y[1] (analytic) = 0
y[1] (numeric) = 2.3819777981144989364165587927712
absolute error = 2.3819777981144989364165587927712
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.419
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.308
y[1] (analytic) = 0
y[1] (numeric) = 2.3829843029630289606535521337213
absolute error = 2.3829843029630289606535521337213
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.421
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.309
y[1] (analytic) = 0
y[1] (numeric) = 2.3839908120034894933249068330762
absolute error = 2.3839908120034894933249068330762
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.957
Order of pole = 7.423
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1407.6MB, alloc=4.6MB, time=143.64
x[1] = 3.31
y[1] (analytic) = 0
y[1] (numeric) = 2.3849973248237784817323356164133
absolute error = 2.3849973248237784817323356164133
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.958
Order of pole = 7.425
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.311
y[1] (analytic) = 0
y[1] (numeric) = 2.3860038410119809250558274398473
absolute error = 2.3860038410119809250558274398473
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.958
Order of pole = 7.427
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.312
y[1] (analytic) = 0
y[1] (numeric) = 2.3870103601563701015684794387526
absolute error = 2.3870103601563701015684794387526
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.958
Order of pole = 7.429
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.313
y[1] (analytic) = 0
y[1] (numeric) = 2.3880168818454087946030870804286
absolute error = 2.3880168818454087946030870804286
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.958
Order of pole = 7.431
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.314
y[1] (analytic) = 0
y[1] (numeric) = 2.3890234056677505172645369254057
absolute error = 2.3890234056677505172645369254057
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.959
Order of pole = 7.433
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.315
y[1] (analytic) = 0
y[1] (numeric) = 2.3900299312122407358820593480134
absolute error = 2.3900299312122407358820593480134
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.959
Order of pole = 7.435
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.316
y[1] (analytic) = 0
y[1] (numeric) = 2.3910364580679180921954115604554
absolute error = 2.3910364580679180921954115604554
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.959
Order of pole = 7.437
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.317
y[1] (analytic) = 0
y[1] (numeric) = 2.3920429858240156242690743257821
absolute error = 2.3920429858240156242690743257821
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.96
Order of pole = 7.439
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.318
y[1] (analytic) = 0
y[1] (numeric) = 2.3930495140699619861285588336307
absolute error = 2.3930495140699619861285588336307
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.96
Order of pole = 7.441
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1411.4MB, alloc=4.6MB, time=144.02
x[1] = 3.319
y[1] (analytic) = 0
y[1] (numeric) = 2.3940560423953826661129333482325
absolute error = 2.3940560423953826661129333482325
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.96
Order of pole = 7.443
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.32
y[1] (analytic) = 0
y[1] (numeric) = 2.395062570390101203937692420784
absolute error = 2.395062570390101203937692420784
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.961
Order of pole = 7.445
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.321
y[1] (analytic) = 0
y[1] (numeric) = 2.3960690976441404064621046876492
absolute error = 2.3960690976441404064621046876492
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.961
Order of pole = 7.447
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.322
y[1] (analytic) = 0
y[1] (numeric) = 2.397075623747723562155188551829
absolute error = 2.397075623747723562155188551829
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.961
Order of pole = 7.449
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.323
y[1] (analytic) = 0
y[1] (numeric) = 2.3980821482912756542544783675035
absolute error = 2.3980821482912756542544783675035
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.962
Order of pole = 7.451
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.324
y[1] (analytic) = 0
y[1] (numeric) = 2.3990886708654245726117571160418
absolute error = 2.3990886708654245726117571160418
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.962
Order of pole = 7.453
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.325
y[1] (analytic) = 0
y[1] (numeric) = 2.4000951910610023242199449764943
absolute error = 2.4000951910610023242199449764943
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.962
Order of pole = 7.455
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.326
y[1] (analytic) = 0
y[1] (numeric) = 2.4011017084690462424153466540406
absolute error = 2.4011017084690462424153466540406
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.962
Order of pole = 7.457
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.327
y[1] (analytic) = 0
y[1] (numeric) = 2.4021082226808001947494738359823
absolute error = 2.4021082226808001947494738359823
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.963
Order of pole = 7.459
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1415.3MB, alloc=4.6MB, time=144.39
x[1] = 3.328
y[1] (analytic) = 0
y[1] (numeric) = 2.4031147332877157895246726964433
absolute error = 2.4031147332877157895246726964433
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.963
Order of pole = 7.461
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.329
y[1] (analytic) = 0
y[1] (numeric) = 2.4041212398814535809877999677929
absolute error = 2.4041212398814535809877999677929
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.963
Order of pole = 7.462
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.33
y[1] (analytic) = 0
y[1] (numeric) = 2.4051277420538842731762047387387
absolute error = 2.4051277420538842731762047387387
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.964
Order of pole = 7.464
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.331
y[1] (analytic) = 0
y[1] (numeric) = 2.4061342393970899224102868258635
absolute error = 2.4061342393970899224102868258635
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.964
Order of pole = 7.466
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.332
y[1] (analytic) = 0
y[1] (numeric) = 2.4071407315033651384269162969063
absolute error = 2.4071407315033651384269162969063
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.964
Order of pole = 7.468
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.333
y[1] (analytic) = 0
y[1] (numeric) = 2.4081472179652182841480125001274
absolute error = 2.4081472179652182841480125001274
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.47
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.334
y[1] (analytic) = 0
y[1] (numeric) = 2.4091536983753726740785947744499
absolute error = 2.4091536983753726740785947744499
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.472
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.335
y[1] (analytic) = 0
y[1] (numeric) = 2.4101601723267677713286308795533
absolute error = 2.4101601723267677713286308795533
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.473
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.336
y[1] (analytic) = 0
y[1] (numeric) = 2.4111666394125603832530230935054
absolute error = 2.4111666394125603832530230935054
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.475
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1419.1MB, alloc=4.6MB, time=144.77
x[1] = 3.337
y[1] (analytic) = 0
y[1] (numeric) = 2.4121730992261258557040858776731
absolute error = 2.4121730992261258557040858776731
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.477
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.338
y[1] (analytic) = 0
y[1] (numeric) = 2.4131795513610592658908830043491
absolute error = 2.4131795513610592658908830043491
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.479
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.339
y[1] (analytic) = 0
y[1] (numeric) = 2.41418599541117661383980608158
absolute error = 2.41418599541117661383980608158
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.48
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.34
y[1] (analytic) = 0
y[1] (numeric) = 2.4151924309705160124507904918873
absolute error = 2.4151924309705160124507904918873
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.482
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.341
y[1] (analytic) = 0
y[1] (numeric) = 2.416198857633338876143578886738
absolute error = 2.416198857633338876143578886738
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.484
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.342
y[1] (analytic) = 0
y[1] (numeric) = 2.4172052749941311080884565465563
absolute error = 2.4172052749941311080884565465563
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.485
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.343
y[1] (analytic) = 0
y[1] (numeric) = 2.4182116826476042860158971265679
absolute error = 2.4182116826476042860158971265679
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.487
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.344
y[1] (analytic) = 0
y[1] (numeric) = 2.4192180801886968465995715616475
absolute error = 2.4192180801886968465995715616475
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.488
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.345
y[1] (analytic) = 0
y[1] (numeric) = 2.4202244672125752684071871983913
absolute error = 2.4202244672125752684071871983913
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.49
memory used=1422.9MB, alloc=4.6MB, time=145.14
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.346
y[1] (analytic) = 0
y[1] (numeric) = 2.4212308433146352534136385596724
absolute error = 2.4212308433146352534136385596724
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.492
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.347
y[1] (analytic) = 0
y[1] (numeric) = 2.4222372080905029070709655257516
absolute error = 2.4222372080905029070709655257516
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.493
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.348
y[1] (analytic) = 0
y[1] (numeric) = 2.4232435611360359169296291364169
absolute error = 2.4232435611360359169296291364169
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.495
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.349
y[1] (analytic) = 0
y[1] (numeric) = 2.4242499020473247298056296804142
absolute error = 2.4242499020473247298056296804142
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.496
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.35
y[1] (analytic) = 0
y[1] (numeric) = 2.4252562304206937274880062414043
absolute error = 2.4252562304206937274880062414043
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.498
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.351
y[1] (analytic) = 0
y[1] (numeric) = 2.426262545852702400981271413646
absolute error = 2.426262545852702400981271413646
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.499
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.352
y[1] (analytic) = 0
y[1] (numeric) = 2.4272688479401465232773494853592
absolute error = 2.4272688479401465232773494853592
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.97
Order of pole = 7.5
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.353
y[1] (analytic) = 0
y[1] (numeric) = 2.4282751362800593206516010130616
absolute error = 2.4282751362800593206516010130616
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.97
Order of pole = 7.502
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1426.7MB, alloc=4.6MB, time=145.51
x[1] = 3.354
y[1] (analytic) = 0
y[1] (numeric) = 2.4292814104697126424775313759064
absolute error = 2.4292814104697126424775313759064
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.97
Order of pole = 7.503
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.355
y[1] (analytic) = 0
y[1] (numeric) = 2.4302876701066181295547956049681
absolute error = 2.4302876701066181295547956049681
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.97
Order of pole = 7.505
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.356
y[1] (analytic) = 0
y[1] (numeric) = 2.4312939147885283809451265283308
absolute error = 2.4312939147885283809451265283308
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.971
Order of pole = 7.506
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.357
y[1] (analytic) = 0
y[1] (numeric) = 2.4323001441134381193108280585281
absolute error = 2.4323001441134381193108280585281
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.971
Order of pole = 7.507
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.358
y[1] (analytic) = 0
y[1] (numeric) = 2.4333063576795853547504902741644
absolute error = 2.4333063576795853547504902741644
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.971
Order of pole = 7.508
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.359
y[1] (analytic) = 0
y[1] (numeric) = 2.434312555085452547126597812207
absolute error = 2.434312555085452547126597812207
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.971
Order of pole = 7.51
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.36
y[1] (analytic) = 0
y[1] (numeric) = 2.4353187359297677668797179912841
absolute error = 2.4353187359297677668797179912841
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.972
Order of pole = 7.511
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.361
y[1] (analytic) = 0
y[1] (numeric) = 2.436324899811505854323970029141
absolute error = 2.436324899811505854323970029141
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.972
Order of pole = 7.512
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.362
y[1] (analytic) = 0
y[1] (numeric) = 2.437331046329889577418491699005
absolute error = 2.437331046329889577418491699005
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.972
Order of pole = 7.513
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1430.5MB, alloc=4.6MB, time=145.88
x[1] = 3.363
y[1] (analytic) = 0
y[1] (numeric) = 2.4383371750843907880096347897737
absolute error = 2.4383371750843907880096347897737
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.972
Order of pole = 7.514
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.364
y[1] (analytic) = 0
y[1] (numeric) = 2.4393432856747315765386357934773
absolute error = 2.4393432856747315765386357934773
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.973
Order of pole = 7.515
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.365
y[1] (analytic) = 0
y[1] (numeric) = 2.4403493777008854252095233401613
absolute error = 2.4403493777008854252095233401613
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.973
Order of pole = 7.516
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.366
y[1] (analytic) = 0
y[1] (numeric) = 2.4413554507630783596120390349948
absolute error = 2.4413554507630783596120390349948
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.973
Order of pole = 7.517
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.367
y[1] (analytic) = 0
y[1] (numeric) = 2.4423615044617900987943635248198
absolute error = 2.4423615044617900987943635248198
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.973
Order of pole = 7.518
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.368
y[1] (analytic) = 0
y[1] (numeric) = 2.4433675383977552037804548313178
absolute error = 2.4433675383977552037804548313178
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.973
Order of pole = 7.519
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.369
y[1] (analytic) = 0
y[1] (numeric) = 2.4443735521719642245268212352745
absolute error = 2.4443735521719642245268212352745
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.974
Order of pole = 7.52
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.37
y[1] (analytic) = 0
y[1] (numeric) = 2.4453795453856648453135662808674
absolute error = 2.4453795453856648453135662808674
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.974
Order of pole = 7.521
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.371
y[1] (analytic) = 0
y[1] (numeric) = 2.4463855176403630285645587902752
absolute error = 2.4463855176403630285645587902752
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.974
Order of pole = 7.522
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1434.3MB, alloc=4.6MB, time=146.26
x[1] = 3.372
y[1] (analytic) = 0
y[1] (numeric) = 2.4473914685378241570915961370108
absolute error = 2.4473914685378241570915961370108
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.974
Order of pole = 7.523
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.373
y[1] (analytic) = 0
y[1] (numeric) = 2.4483973976800741747574444209995
absolute error = 2.4483973976800741747574444209995
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.974
Order of pole = 7.524
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.374
y[1] (analytic) = 0
y[1] (numeric) = 2.449403304669400725552654619358
absolute error = 2.449403304669400725552654619358
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.975
Order of pole = 7.524
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.375
y[1] (analytic) = 0
y[1] (numeric) = 2.4504091891083542910810692538688
absolute error = 2.4504091891083542910810692538688
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.975
Order of pole = 7.525
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.376
y[1] (analytic) = 0
y[1] (numeric) = 2.4514150505997493264489496190804
absolute error = 2.4514150505997493264489496190804
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.975
Order of pole = 7.526
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.377
y[1] (analytic) = 0
y[1] (numeric) = 2.4524208887466653945526691535915
absolute error = 2.4524208887466653945526691535915
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.975
Order of pole = 7.527
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.378
y[1] (analytic) = 0
y[1] (numeric) = 2.4534267031524482987599341111842
absolute error = 2.4534267031524482987599341111842
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.975
Order of pole = 7.527
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.379
y[1] (analytic) = 0
y[1] (numeric) = 2.4544324934207112139795082978554
absolute error = 2.4544324934207112139795082978554
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.528
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.38
y[1] (analytic) = 0
y[1] (numeric) = 2.4554382591553358161144342852407
absolute error = 2.4554382591553358161144342852407
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.528
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1438.1MB, alloc=4.6MB, time=146.63
x[1] = 3.381
y[1] (analytic) = 0
y[1] (numeric) = 2.4564439999604734098937591902286
absolute error = 2.4564439999604734098937591902286
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.529
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.382
y[1] (analytic) = 0
y[1] (numeric) = 2.4574497154405460550777888245129
absolute error = 2.4574497154405460550777888245129
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.529
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.383
y[1] (analytic) = 0
y[1] (numeric) = 2.4584554052002476910319097662181
absolute error = 2.4584554052002476910319097662181
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.53
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.384
y[1] (analytic) = 0
y[1] (numeric) = 2.4594610688445452596640346883458
absolute error = 2.4594610688445452596640346883458
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.53
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.385
y[1] (analytic) = 0
y[1] (numeric) = 2.4604667059786798267207420954241
absolute error = 2.4604667059786798267207420954241
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.531
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.386
y[1] (analytic) = 0
y[1] (numeric) = 2.4614723162081677014371974701796
absolute error = 2.4614723162081677014371974701796
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.531
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.387
y[1] (analytic) = 0
y[1] (numeric) = 2.4624778991388015545359587160888
absolute error = 2.4624778991388015545359587160888
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.531
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.388
y[1] (analytic) = 0
y[1] (numeric) = 2.4634834543766515345697846990869
absolute error = 2.4634834543766515345697846990869
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.532
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.389
y[1] (analytic) = 0
y[1] (numeric) = 2.4644889815280663826035816423093
absolute error = 2.4644889815280663826035816423093
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.532
memory used=1442.0MB, alloc=4.6MB, time=147.01
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.39
y[1] (analytic) = 0
y[1] (numeric) = 2.4654944801996745452306381113018
absolute error = 2.4654944801996745452306381113018
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.532
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.391
y[1] (analytic) = 0
y[1] (numeric) = 2.4664999499983852859183153434486
absolute error = 2.4664999499983852859183153434486
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.532
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.392
y[1] (analytic) = 0
y[1] (numeric) = 2.4675053905313897946783757242198
absolute error = 2.4675053905313897946783757242198
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.533
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.393
y[1] (analytic) = 0
y[1] (numeric) = 2.4685108014061622960571482940221
absolute error = 2.4685108014061622960571482940221
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.533
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.394
y[1] (analytic) = 0
y[1] (numeric) = 2.4695161822304611554407462827353
absolute error = 2.4695161822304611554407462827353
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.533
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.395
y[1] (analytic) = 0
y[1] (numeric) = 2.4705215326123299836705678142177
absolute error = 2.4705215326123299836705678142177
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.533
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.396
y[1] (analytic) = 0
y[1] (numeric) = 2.4715268521600987399643270999571
absolute error = 2.4715268521600987399643270999571
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.533
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.397
y[1] (analytic) = 0
y[1] (numeric) = 2.4725321404823848331378796494159
absolute error = 2.4725321404823848331378796494159
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.533
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1445.8MB, alloc=4.6MB, time=147.40
x[1] = 3.398
y[1] (analytic) = 0
y[1] (numeric) = 2.4735373971880942211231212642539
absolute error = 2.4735373971880942211231212642539
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.533
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.399
y[1] (analytic) = 0
y[1] (numeric) = 2.4745426218864225087772568543024
absolute error = 2.4745426218864225087772568543024
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.532
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.4
y[1] (analytic) = 0
y[1] (numeric) = 2.4755478141868560439787514146888
absolute error = 2.4755478141868560439787514146888
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.532
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.401
y[1] (analytic) = 0
y[1] (numeric) = 2.4765529736991730120052918356623
absolute error = 2.4765529736991730120052918356623
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.532
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.402
y[1] (analytic) = 0
y[1] (numeric) = 2.477558100033444528189104579234
absolute error = 2.477558100033444528189104579234
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.532
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.403
y[1] (analytic) = 0
y[1] (numeric) = 2.4785631928000357288449906495027
absolute error = 2.4785631928000357288449906495027
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.532
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.404
y[1] (analytic) = 0
y[1] (numeric) = 2.4795682516096068604664557062794
absolute error = 2.4795682516096068604664557062794
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.531
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.405
y[1] (analytic) = 0
y[1] (numeric) = 2.4805732760731143671853296241312
absolute error = 2.4805732760731143671853296241312
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.531
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.406
y[1] (analytic) = 0
y[1] (numeric) = 2.4815782658018119764902862810284
absolute error = 2.4815782658018119764902862810284
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.531
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1449.6MB, alloc=4.6MB, time=147.77
x[1] = 3.407
y[1] (analytic) = 0
y[1] (numeric) = 2.4825832204072517831996908721774
absolute error = 2.4825832204072517831996908721774
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.53
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.408
y[1] (analytic) = 0
y[1] (numeric) = 2.4835881395012853316842185851461
absolute error = 2.4835881395012853316842185851461
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.53
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.409
y[1] (analytic) = 0
y[1] (numeric) = 2.4845930226960646963347050418194
absolute error = 2.4845930226960646963347050418194
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.529
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.41
y[1] (analytic) = 0
y[1] (numeric) = 2.4855978696040435602707055108456
absolute error = 2.4855978696040435602707055108456
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.529
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.411
y[1] (analytic) = 0
y[1] (numeric) = 2.4866026798379782922852565208353
absolute error = 2.4866026798379782922852565208353
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.528
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.412
y[1] (analytic) = 0
y[1] (numeric) = 2.4876074530109290220213501594368
absolute error = 2.4876074530109290220213501594368
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.528
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.413
y[1] (analytic) = 0
y[1] (numeric) = 2.488612188736260713375648026318
absolute error = 2.488612188736260713375648026318
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.527
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.414
y[1] (analytic) = 0
y[1] (numeric) = 2.4896168866276442361249785188221
absolute error = 2.4896168866276442361249785188221
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.526
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.415
y[1] (analytic) = 0
y[1] (numeric) = 2.4906215462990574357711778674123
absolute error = 2.4906215462990574357711778674123
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.526
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1453.4MB, alloc=4.6MB, time=148.15
x[1] = 3.416
y[1] (analytic) = 0
y[1] (numeric) = 2.4916261673647862015998521037689
absolute error = 2.4916261673647862015998521037689
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.525
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.417
y[1] (analytic) = 0
y[1] (numeric) = 2.4926307494394255329486539373262
absolute error = 2.4926307494394255329486539373262
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.524
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.418
y[1] (analytic) = 0
y[1] (numeric) = 2.493635292137880603680685335927
absolute error = 2.493635292137880603680685335927
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.523
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.419
y[1] (analytic) = 0
y[1] (numeric) = 2.4946397950753678248586534529096
absolute error = 2.4946397950753678248586534529096
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.522
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.42
y[1] (analytic) = 0
y[1] (numeric) = 2.4956442578674159056154244161066
absolute error = 2.4956442578674159056154244161066
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.521
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.421
y[1] (analytic) = 0
y[1] (numeric) = 2.4966486801298669122166363937147
absolute error = 2.4966486801298669122166363937147
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.521
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.422
y[1] (analytic) = 0
y[1] (numeric) = 2.4976530614788773253110502775689
absolute error = 2.4976530614788773253110502775689
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.52
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.423
y[1] (analytic) = 0
y[1] (numeric) = 2.4986574015309190953643332758062
absolute error = 2.4986574015309190953643332758062
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.519
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.424
y[1] (analytic) = 0
y[1] (numeric) = 2.4996616999027806962719876840173
absolute error = 2.4996616999027806962719876840173
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.518
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1457.2MB, alloc=4.6MB, time=148.53
x[1] = 3.425
y[1] (analytic) = 0
y[1] (numeric) = 2.5006659562115681771471541065414
absolute error = 2.5006659562115681771471541065414
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.516
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.426
y[1] (analytic) = 0
y[1] (numeric) = 2.5016701700747062122790354273401
absolute error = 2.5016701700747062122790354273401
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.515
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.427
y[1] (analytic) = 0
y[1] (numeric) = 2.5026743411099391492577048826766
absolute error = 2.5026743411099391492577048826766
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.514
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.428
y[1] (analytic) = 0
y[1] (numeric) = 2.5036784689353320552610786654047
absolute error = 2.5036784689353320552610786654047
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.513
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.429
y[1] (analytic) = 0
y[1] (numeric) = 2.5046825531692717614998505928238
absolute error = 2.5046825531692717614998505928238
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.512
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.43
y[1] (analytic) = 0
y[1] (numeric) = 2.5056865934304679058162034965604
absolute error = 2.5056865934304679058162034965604
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.511
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.431
y[1] (analytic) = 0
y[1] (numeric) = 2.506690589337953973432129143576
absolute error = 2.506690589337953973432129143576
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.509
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.432
y[1] (analytic) = 0
y[1] (numeric) = 2.5076945405110883358432056719597
absolute error = 2.5076945405110883358432056719597
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.508
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.433
y[1] (analytic) = 0
y[1] (numeric) = 2.5086984465695552878536987234184
absolute error = 2.5086984465695552878536987234184
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.507
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1461.0MB, alloc=4.6MB, time=148.90
x[1] = 3.434
y[1] (analytic) = 0
y[1] (numeric) = 2.5097023071333660827488696761154
absolute error = 2.5097023071333660827488696761154
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.505
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.435
y[1] (analytic) = 0
y[1] (numeric) = 2.5107061218228599656003916265044
absolute error = 2.5107061218228599656003916265044
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.504
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.436
y[1] (analytic) = 0
y[1] (numeric) = 2.5117098902587052047007910368484
absolute error = 2.5117098902587052047007910368484
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.502
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.437
y[1] (analytic) = 0
y[1] (numeric) = 2.512713612061900121122850255978
absolute error = 2.512713612061900121122850255978
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.501
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.438
y[1] (analytic) = 0
y[1] (numeric) = 2.513717286853774116399923434315
absolute error = 2.513717286853774116399923434315
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.499
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.439
y[1] (analytic) = 0
y[1] (numeric) = 2.5147209142559886983231356900441
absolute error = 2.5147209142559886983231356900441
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.498
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.44
y[1] (analytic) = 0
y[1] (numeric) = 2.5157244938905385048514527413427
absolute error = 2.5157244938905385048514527413427
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.496
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.441
y[1] (analytic) = 0
y[1] (numeric) = 2.516728025379752326130625599553
absolute error = 2.516728025379752326130625599553
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.495
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.442
y[1] (analytic) = 0
y[1] (numeric) = 2.5177315083462941246170323198831
absolute error = 2.5177315083462941246170323198831
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.493
memory used=1464.9MB, alloc=4.6MB, time=149.28
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.443
y[1] (analytic) = 0
y[1] (numeric) = 2.5187349424131640533024562294426
absolute error = 2.5187349424131640533024562294426
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.491
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.444
y[1] (analytic) = 0
y[1] (numeric) = 2.5197383272036994720358574969207
absolute error = 2.5197383272036994720358574969207
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.49
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.445
y[1] (analytic) = 0
y[1] (numeric) = 2.5207416623415759619382123737975
absolute error = 2.5207416623415759619382123737975
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.488
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.446
y[1] (analytic) = 0
y[1] (numeric) = 2.5217449474508083379065119234088
absolute error = 2.5217449474508083379065119234088
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.486
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.447
y[1] (analytic) = 0
y[1] (numeric) = 2.5227481821557516592030295612522
absolute error = 2.5227481821557516592030295612522
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.484
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.448
y[1] (analytic) = 0
y[1] (numeric) = 2.5237513660811022381259842574024
absolute error = 2.5237513660811022381259842574024
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.482
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.449
y[1] (analytic) = 0
y[1] (numeric) = 2.5247544988518986467577437995796
absolute error = 2.5247544988518986467577437995796
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.481
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.45
y[1] (analytic) = 0
y[1] (numeric) = 2.525757580093522721786730083066
absolute error = 2.525757580093522721786730083066
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.479
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1468.7MB, alloc=4.6MB, time=149.65
x[1] = 3.451
y[1] (analytic) = 0
y[1] (numeric) = 2.5267606094317005673992059810743
absolute error = 2.5267606094317005673992059810743
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.477
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.452
y[1] (analytic) = 0
y[1] (numeric) = 2.5277635864925035562371409561168
absolute error = 2.5277635864925035562371409561168
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.475
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.453
y[1] (analytic) = 0
y[1] (numeric) = 2.5287665109023493284183701991851
absolute error = 2.5287665109023493284183701991851
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.473
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.454
y[1] (analytic) = 0
y[1] (numeric) = 2.5297693822880027886152797289131
absolute error = 2.5297693822880027886152797289131
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.471
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.455
y[1] (analytic) = 0
y[1] (numeric) = 2.530772200276577101188267547134
absolute error = 2.530772200276577101188267547134
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.469
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.456
y[1] (analytic) = 0
y[1] (numeric) = 2.5317749644955346833702486301394
absolute error = 2.5317749644955346833702486301394
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.467
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.457
y[1] (analytic) = 0
y[1] (numeric) = 2.5327776745726881964984892362885
absolute error = 2.5327776745726881964984892362885
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.465
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.458
y[1] (analytic) = 0
y[1] (numeric) = 2.5337803301362015352900737301723
absolute error = 2.5337803301362015352900737301723
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.463
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.459
y[1] (analytic) = 0
y[1] (numeric) = 2.5347829308145908151573248610961
absolute error = 2.5347829308145908151573248610961
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.46
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1472.5MB, alloc=4.6MB, time=150.02
x[1] = 3.46
y[1] (analytic) = 0
y[1] (numeric) = 2.5357854762367253575595161889835
absolute error = 2.5357854762367253575595161889835
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.458
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.461
y[1] (analytic) = 0
y[1] (numeric) = 2.5367879660318286733872331237074
absolute error = 2.5367879660318286733872331237074
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.456
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.462
y[1] (analytic) = 0
y[1] (numeric) = 2.5377903998294794443757568340962
absolute error = 2.5377903998294794443757568340962
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.454
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.463
y[1] (analytic) = 0
y[1] (numeric) = 2.5387927772596125025438630902288
absolute error = 2.5387927772596125025438630902288
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.452
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.464
y[1] (analytic) = 0
y[1] (numeric) = 2.5397950979525198076544459269044
absolute error = 2.5397950979525198076544459269044
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.449
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.465
y[1] (analytic) = 0
y[1] (numeric) = 2.5407973615388514226933938571233
absolute error = 2.5407973615388514226933938571233
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.447
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.466
y[1] (analytic) = 0
y[1] (numeric) = 2.5417995676496164873631642218351
absolute error = 2.5417995676496164873631642218351
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.445
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.467
y[1] (analytic) = 0
y[1] (numeric) = 2.5428017159161841895875191358728
absolute error = 2.5428017159161841895875191358728
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.442
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.468
y[1] (analytic) = 0
y[1] (numeric) = 2.5438038059702847350239043796801
absolute error = 2.5438038059702847350239043796801
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.44
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1476.3MB, alloc=4.6MB, time=150.40
x[1] = 3.469
y[1] (analytic) = 0
y[1] (numeric) = 2.544805837444010314579970491935
absolute error = 2.544805837444010314579970491935
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.438
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.47
y[1] (analytic) = 0
y[1] (numeric) = 2.5458078099698160699307532392548
absolute error = 2.5458078099698160699307532392548
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.435
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.471
y[1] (analytic) = 0
y[1] (numeric) = 2.546809723180521057033048575619
absolute error = 2.546809723180521057033048575619
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.433
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.472
y[1] (analytic) = 0
y[1] (numeric) = 2.5478115767093092076335351557454
absolute error = 2.5478115767093092076335351557454
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.431
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.473
y[1] (analytic) = 0
y[1] (numeric) = 2.5488133701897302887672154331838
absolute error = 2.5488133701897302887672154331838
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.428
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.474
y[1] (analytic) = 0
y[1] (numeric) = 2.5498151032557008602427643551327
absolute error = 2.5498151032557008602427643551327
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.426
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.475
y[1] (analytic) = 0
y[1] (numeric) = 2.5508167755415052301113926617149
absolute error = 2.5508167755415052301113926617149
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.423
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.476
y[1] (analytic) = 0
y[1] (numeric) = 2.5518183866817964081158498074525
absolute error = 2.5518183866817964081158498074525
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.421
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.477
y[1] (analytic) = 0
y[1] (numeric) = 2.5528199363115970571162095467408
absolute error = 2.5528199363115970571162095467408
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.418
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1480.1MB, alloc=4.6MB, time=150.78
x[1] = 3.478
y[1] (analytic) = 0
y[1] (numeric) = 2.5538214240663004424890992630126
absolute error = 2.5538214240663004424890992630126
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.416
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.479
y[1] (analytic) = 0
y[1] (numeric) = 2.5548228495816713794970521727947
absolute error = 2.5548228495816713794970521727947
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.413
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.48
y[1] (analytic) = 0
y[1] (numeric) = 2.5558242124938471786246796007659
absolute error = 2.5558242124938471786246796007659
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.41
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.481
y[1] (analytic) = 0
y[1] (numeric) = 2.5568255124393385888783786000104
absolute error = 2.5568255124393385888783786000104
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.408
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.482
y[1] (analytic) = 0
y[1] (numeric) = 2.5578267490550307390463082827091
absolute error = 2.5578267490550307390463082827091
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.405
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.483
y[1] (analytic) = 0
y[1] (numeric) = 2.5588279219781840769153863302986
absolute error = 2.5588279219781840769153863302986
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.403
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.484
y[1] (analytic) = 0
y[1] (numeric) = 2.5598290308464353064420752684406
absolute error = 2.5598290308464353064420752684406
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.975
Order of pole = 7.4
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.485
y[1] (analytic) = 0
y[1] (numeric) = 2.5608300752977983228737462207618
absolute error = 2.5608300752977983228737462207618
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.975
Order of pole = 7.397
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.486
y[1] (analytic) = 0
y[1] (numeric) = 2.5618310549706651458174259960304
absolute error = 2.5618310549706651458174259960304
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.975
Order of pole = 7.395
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1483.9MB, alloc=4.6MB, time=151.15
x[1] = 3.487
y[1] (analytic) = 0
y[1] (numeric) = 2.5628319695038068502527515160087
absolute error = 2.5628319695038068502527515160087
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.975
Order of pole = 7.392
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.488
y[1] (analytic) = 0
y[1] (numeric) = 2.5638328185363744954859737554472
absolute error = 2.5638328185363744954859737554472
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.975
Order of pole = 7.389
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.489
y[1] (analytic) = 0
y[1] (numeric) = 2.5648336017079000520418715413443
absolute error = 2.5648336017079000520418715413443
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.975
Order of pole = 7.387
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.49
y[1] (analytic) = 0
y[1] (numeric) = 2.5658343186582973264904537454703
absolute error = 2.5658343186582973264904537454703
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.975
Order of pole = 7.384
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.491
y[1] (analytic) = 0
y[1] (numeric) = 2.5668349690278628842053466020275
absolute error = 2.5668349690278628842053466020275
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.974
Order of pole = 7.381
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.492
y[1] (analytic) = 0
y[1] (numeric) = 2.5678355524572769700507810909692
absolute error = 2.5678355524572769700507810909692
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.974
Order of pole = 7.379
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.493
y[1] (analytic) = 0
y[1] (numeric) = 2.5688360685876044269941135467184
absolute error = 2.5688360685876044269941135467184
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.974
Order of pole = 7.376
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.494
y[1] (analytic) = 0
y[1] (numeric) = 2.5698365170602956126408308815867
absolute error = 2.5698365170602956126408308815867
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.974
Order of pole = 7.373
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.495
y[1] (analytic) = 0
y[1] (numeric) = 2.5708368975171873136890100528853
absolute error = 2.5708368975171873136890100528853
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.974
Order of pole = 7.371
memory used=1487.7MB, alloc=4.6MB, time=151.53
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.496
y[1] (analytic) = 0
y[1] (numeric) = 2.5718372096005036583002196523201
absolute error = 2.5718372096005036583002196523201
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.974
Order of pole = 7.368
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.497
y[1] (analytic) = 0
y[1] (numeric) = 2.5728374529528570263838697555595
absolute error = 2.5728374529528570263838697555595
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.974
Order of pole = 7.365
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.498
y[1] (analytic) = 0
y[1] (numeric) = 2.5738376272172489577920344386377
absolute error = 2.5738376272172489577920344386377
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.973
Order of pole = 7.362
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.499
y[1] (analytic) = 0
y[1] (numeric) = 2.5748377320370710584217896458893
absolute error = 2.5748377320370710584217896458893
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.973
Order of pole = 7.36
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.5
y[1] (analytic) = 0
y[1] (numeric) = 2.5758377670561059042221273811921
absolute error = 2.5758377670561059042221273811921
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.973
Order of pole = 7.357
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.501
y[1] (analytic) = 0
y[1] (numeric) = 2.576837731918527943102525490201
absolute error = 2.576837731918527943102525490201
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.973
Order of pole = 7.354
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.502
y[1] (analytic) = 0
y[1] (numeric) = 2.577837626268904394740270605776
absolute error = 2.577837626268904394740270605776
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.973
Order of pole = 7.351
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.503
y[1] (analytic) = 0
y[1] (numeric) = 2.5788374497521961482836501417214
absolute error = 2.5788374497521961482836501417214
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.973
Order of pole = 7.348
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.504
y[1] (analytic) = 0
y[1] (numeric) = 2.5798372020137586579481475410502
absolute error = 2.5798372020137586579481475410502
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.973
Order of pole = 7.346
memory used=1491.6MB, alloc=4.6MB, time=151.90
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.505
y[1] (analytic) = 0
y[1] (numeric) = 2.5808368826993428365027933140443
absolute error = 2.5808368826993428365027933140443
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.972
Order of pole = 7.343
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.506
y[1] (analytic) = 0
y[1] (numeric) = 2.5818364914550959466438427381915
absolute error = 2.5818364914550959466438427381915
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.972
Order of pole = 7.34
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.507
y[1] (analytic) = 0
y[1] (numeric) = 2.5828360279275624902529694364186
absolute error = 2.5828360279275624902529694364186
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.972
Order of pole = 7.337
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.508
y[1] (analytic) = 0
y[1] (numeric) = 2.5838354917636850955371824016995
absolute error = 2.5838354917636850955371824016995
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.972
Order of pole = 7.335
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.509
y[1] (analytic) = 0
y[1] (numeric) = 2.5848348826108054020476923948792
absolute error = 2.5848348826108054020476923948792
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.972
Order of pole = 7.332
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.51
y[1] (analytic) = 0
y[1] (numeric) = 2.5858342001166649435749720082011
absolute error = 2.5858342001166649435749720082011
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.972
Order of pole = 7.329
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.511
y[1] (analytic) = 0
y[1] (numeric) = 2.5868334439294060289172720593485
absolute error = 2.5868334439294060289172720593485
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.971
Order of pole = 7.326
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.512
y[1] (analytic) = 0
y[1] (numeric) = 2.587832613697572620519875359591
absolute error = 2.587832613697572620519875359591
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.971
Order of pole = 7.323
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1495.4MB, alloc=4.6MB, time=152.27
x[1] = 3.513
y[1] (analytic) = 0
y[1] (numeric) = 2.5888317090701112109823872846493
absolute error = 2.5888317090701112109823872846493
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.971
Order of pole = 7.321
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.514
y[1] (analytic) = 0
y[1] (numeric) = 2.5898307296963716974313809679458
absolute error = 2.5898307296963716974313809679458
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.971
Order of pole = 7.318
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.515
y[1] (analytic) = 0
y[1] (numeric) = 2.5908296752261082537557333327787
absolute error = 2.5908296752261082537557333327787
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.971
Order of pole = 7.315
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.516
y[1] (analytic) = 0
y[1] (numeric) = 2.5918285453094802007020065824256
absolute error = 2.5918285453094802007020065824256
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.971
Order of pole = 7.312
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.517
y[1] (analytic) = 0
y[1] (numeric) = 2.5928273395970528738272481750435
absolute error = 2.5928273395970528738272481750435
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.971
Order of pole = 7.31
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.518
y[1] (analytic) = 0
y[1] (numeric) = 2.5938260577397984893066007232646
absolute error = 2.5938260577397984893066007232646
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.97
Order of pole = 7.307
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.519
y[1] (analytic) = 0
y[1] (numeric) = 2.594824699389097007593131676381
absolute error = 2.594824699389097007593131676381
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.97
Order of pole = 7.304
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.52
y[1] (analytic) = 0
y[1] (numeric) = 2.5958232641967369949273110657567
absolute error = 2.5958232641967369949273110657567
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.97
Order of pole = 7.301
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.521
y[1] (analytic) = 0
y[1] (numeric) = 2.5968217518149164826935840213805
absolute error = 2.5968217518149164826935840213805
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.97
Order of pole = 7.299
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1499.2MB, alloc=4.6MB, time=152.65
x[1] = 3.522
y[1] (analytic) = 0
y[1] (numeric) = 2.5978201618962438246215031990762
absolute error = 2.5978201618962438246215031990762
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.97
Order of pole = 7.296
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.523
y[1] (analytic) = 0
y[1] (numeric) = 2.5988184940937385518289046935974
absolute error = 2.5988184940937385518289046935974
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.97
Order of pole = 7.293
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.524
y[1] (analytic) = 0
y[1] (numeric) = 2.5998167480608322257046294524423
absolute error = 2.5998167480608322257046294524423
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.97
Order of pole = 7.291
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.525
y[1] (analytic) = 0
y[1] (numeric) = 2.6008149234513692886283106485197
absolute error = 2.6008149234513692886283106485197
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.288
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.526
y[1] (analytic) = 0
y[1] (numeric) = 2.6018130199196079125247659165668
absolute error = 2.6018130199196079125247659165668
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.285
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.527
y[1] (analytic) = 0
y[1] (numeric) = 2.6028110371202208452505518082505
absolute error = 2.6028110371202208452505518082505
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.282
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.528
y[1] (analytic) = 0
y[1] (numeric) = 2.6038089747082962548102562739674
absolute error = 2.6038089747082962548102562739674
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.28
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.529
y[1] (analytic) = 0
y[1] (numeric) = 2.6048068323393385714001234352815
absolute error = 2.6048068323393385714001234352815
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.277
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.53
y[1] (analytic) = 0
y[1] (numeric) = 2.6058046096692693272766233704896
absolute error = 2.6058046096692693272766233704896
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.274
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1503.0MB, alloc=4.6MB, time=153.03
x[1] = 3.531
y[1] (analytic) = 0
y[1] (numeric) = 2.6068023063544279944475980967771
absolute error = 2.6068023063544279944475980967771
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.272
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.532
y[1] (analytic) = 0
y[1] (numeric) = 2.6077999220515728201836333956047
absolute error = 2.6077999220515728201836333956047
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.269
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.533
y[1] (analytic) = 0
y[1] (numeric) = 2.6087974564178816603473245931456
absolute error = 2.6087974564178816603473245931456
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.267
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.534
y[1] (analytic) = 0
y[1] (numeric) = 2.6097949091109528105381228745556
absolute error = 2.6097949091109528105381228745556
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.264
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.535
y[1] (analytic) = 0
y[1] (numeric) = 2.6107922797888058350504671794051
absolute error = 2.6107922797888058350504671794051
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.261
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.536
y[1] (analytic) = 0
y[1] (numeric) = 2.6117895681098823936429251955124
absolute error = 2.6117895681098823936429251955124
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.259
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.537
y[1] (analytic) = 0
y[1] (numeric) = 2.6127867737330470661160854394919
absolute error = 2.6127867737330470661160854394919
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.256
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.538
y[1] (analytic) = 0
y[1] (numeric) = 2.6137838963175881746969608843535
absolute error = 2.6137838963175881746969608843535
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.254
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.539
y[1] (analytic) = 0
y[1] (numeric) = 2.6147809355232186042276830672546
absolute error = 2.6147809355232186042276830672546
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.251
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1506.8MB, alloc=4.6MB, time=153.41
x[1] = 3.54
y[1] (analytic) = 0
y[1] (numeric) = 2.6157778910100766201562840838075
absolute error = 2.6157778910100766201562840838075
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.249
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.541
y[1] (analytic) = 0
y[1] (numeric) = 2.6167747624387266843273823489678
absolute error = 2.6167747624387266843273823489678
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.246
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.542
y[1] (analytic) = 0
y[1] (numeric) = 2.6177715494701602685706064782745
absolute error = 2.6177715494701602685706064782745
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.244
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.543
y[1] (analytic) = 0
y[1] (numeric) = 2.6187682517657966660846101168639
absolute error = 2.6187682517657966660846101168639
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.241
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.544
y[1] (analytic) = 0
y[1] (numeric) = 2.6197648689874838006145490170372
absolute error = 2.6197648689874838006145490170372
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.239
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.545
y[1] (analytic) = 0
y[1] (numeric) = 2.6207614007974990334209101380129
absolute error = 2.6207614007974990334209101380129
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.237
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.546
y[1] (analytic) = 0
y[1] (numeric) = 2.6217578468585499680376010136357
absolute error = 2.6217578468585499680376010136357
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.234
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.547
y[1] (analytic) = 0
y[1] (numeric) = 2.6227542068337752528172261050386
absolute error = 2.6227542068337752528172261050386
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.232
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.548
y[1] (analytic) = 0
y[1] (numeric) = 2.6237504803867453812614953253535
absolute error = 2.6237504803867453812614953253535
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.229
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1510.6MB, alloc=4.6MB, time=153.79
x[1] = 3.549
y[1] (analytic) = 0
y[1] (numeric) = 2.6247466671814634901347283923381
absolute error = 2.6247466671814634901347283923381
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.227
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.55
y[1] (analytic) = 0
y[1] (numeric) = 2.62574276688236615535843713202
absolute error = 2.62574276688236615535843713202
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.225
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.551
y[1] (analytic) = 0
y[1] (numeric) = 2.6267387791543241856849863219564
absolute error = 2.6267387791543241856849863219564
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.222
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.552
y[1] (analytic) = 0
y[1] (numeric) = 2.6277347036626434141483521262553
absolute error = 2.6277347036626434141483521262553
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.22
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.553
y[1] (analytic) = 0
y[1] (numeric) = 2.628730540073065487290015635905
absolute error = 2.628730540073065487290015635905
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.218
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.554
y[1] (analytic) = 0
y[1] (numeric) = 2.6297262880517686521580474870022
absolute error = 2.6297262880517686521580474870022
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.216
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.555
y[1] (analytic) = 0
y[1] (numeric) = 2.6307219472653685410774579859555
absolute error = 2.6307219472653685410774579859555
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.214
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.556
y[1] (analytic) = 0
y[1] (numeric) = 2.631717517380918954189905624465
absolute error = 2.631717517380918954189905624465
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.211
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.557
y[1] (analytic) = 0
y[1] (numeric) = 2.632712998065912639760875317834
absolute error = 2.632712998065912639760875317834
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.209
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1514.4MB, alloc=4.6MB, time=154.16
x[1] = 3.558
y[1] (analytic) = 0
y[1] (numeric) = 2.6337083889882820722524561477592
absolute error = 2.6337083889882820722524561477592
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.207
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.559
y[1] (analytic) = 0
y[1] (numeric) = 2.6347036898164002281598668349593
absolute error = 2.6347036898164002281598668349593
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.205
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.56
y[1] (analytic) = 0
y[1] (numeric) = 2.6356989002190813596098956076445
absolute error = 2.6356989002190813596098956076445
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.203
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.561
y[1] (analytic) = 0
y[1] (numeric) = 2.6366940198655817657194395686926
absolute error = 2.6366940198655817657194395686926
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.201
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.562
y[1] (analytic) = 0
y[1] (numeric) = 2.6376890484256005617123470972824
absolute error = 2.6376890484256005617123470972824
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.199
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.563
y[1] (analytic) = 0
y[1] (numeric) = 2.6386839855692804457927852494398
absolute error = 2.6386839855692804457927852494398
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.197
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.564
y[1] (analytic) = 0
y[1] (numeric) = 2.6396788309672084637733725462759
absolute error = 2.6396788309672084637733725462759
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.195
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.565
y[1] (analytic) = 0
y[1] (numeric) = 2.640673584290416771456335958434
absolute error = 2.640673584290416771456335958434
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.193
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.566
y[1] (analytic) = 0
y[1] (numeric) = 2.6416682452103833947659693102226
absolute error = 2.6416682452103833947659693102226
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.191
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1518.3MB, alloc=4.6MB, time=154.54
x[1] = 3.567
y[1] (analytic) = 0
y[1] (numeric) = 2.642662813399032987630688736881
absolute error = 2.642662813399032987630688736881
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.189
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.568
y[1] (analytic) = 0
y[1] (numeric) = 2.643657288528737587612999233218
absolute error = 2.643657288528737587612999233218
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.187
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.569
y[1] (analytic) = 0
y[1] (numeric) = 2.6446516702723173692857047312672
absolute error = 2.6446516702723173692857047312672
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.185
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.57
y[1] (analytic) = 0
y[1] (numeric) = 2.6456459583030413953527125384292
absolute error = 2.6456459583030413953527125384292
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.184
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.571
y[1] (analytic) = 0
y[1] (numeric) = 2.6466401522946283655128013556143
absolute error = 2.6466401522946283655128013556143
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.182
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.572
y[1] (analytic) = 0
y[1] (numeric) = 2.6476342519212473630647404769607
absolute error = 2.6476342519212473630647404769607
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.18
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.573
y[1] (analytic) = 0
y[1] (numeric) = 2.6486282568575185992521661485923
absolute error = 2.6486282568575185992521661485923
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.178
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.574
y[1] (analytic) = 0
y[1] (numeric) = 2.6496221667785141553466394333868
absolute error = 2.6496221667785141553466394333868
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.177
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.575
y[1] (analytic) = 0
y[1] (numeric) = 2.6506159813597587224673282916646
absolute error = 2.6506159813597587224673282916646
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.175
memory used=1522.1MB, alloc=4.6MB, time=154.92
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.576
y[1] (analytic) = 0
y[1] (numeric) = 2.6516097002772303391357749438729
absolute error = 2.6516097002772303391357749438729
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.173
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.577
y[1] (analytic) = 0
y[1] (numeric) = 2.6526033232073611265642279305409
absolute error = 2.6526033232073611265642279305409
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.172
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.578
y[1] (analytic) = 0
y[1] (numeric) = 2.6535968498270380216760366268169
absolute error = 2.6535968498270380216760366268169
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.17
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.579
y[1] (analytic) = 0
y[1] (numeric) = 2.6545902798136035078566243035753
absolute error = 2.6545902798136035078566243035753
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.169
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.58
y[1] (analytic) = 0
y[1] (numeric) = 2.6555836128448563434335741542021
absolute error = 2.6555836128448563434335741542021
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.167
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.581
y[1] (analytic) = 0
y[1] (numeric) = 2.6565768485990522878843810255403
absolute error = 2.6565768485990522878843810255403
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.166
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.582
y[1] (analytic) = 0
y[1] (numeric) = 2.6575699867549048257704399029009
absolute error = 2.6575699867549048257704399029009
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.164
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.583
y[1] (analytic) = 0
y[1] (numeric) = 2.6585630269915858883958605023323
absolute error = 2.6585630269915858883958605023323
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.163
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.584
memory used=1525.9MB, alloc=4.6MB, time=155.29
y[1] (analytic) = 0
y[1] (numeric) = 2.6595559689887265731897156182924
absolute error = 2.6595559689887265731897156182924
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.161
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.585
y[1] (analytic) = 0
y[1] (numeric) = 2.6605488124264178608103491612939
absolute error = 2.6605488124264178608103491612939
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.16
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.586
y[1] (analytic) = 0
y[1] (numeric) = 2.6615415569852113299703880977944
absolute error = 2.6615415569852113299703880977944
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.159
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.587
y[1] (analytic) = 0
y[1] (numeric) = 2.6625342023461198699811207733949
absolute error = 2.6625342023461198699811207733949
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.157
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.588
y[1] (analytic) = 0
y[1] (numeric) = 2.6635267481906183910149223600919
absolute error = 2.6635267481906183910149223600919
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.156
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.589
y[1] (analytic) = 0
y[1] (numeric) = 2.6645191942006445320844264187132
absolute error = 2.6645191942006445320844264187132
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.155
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.59
y[1] (analytic) = 0
y[1] (numeric) = 2.6655115400585993667371598085598
absolute error = 2.6655115400585993667371598085598
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.154
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.591
y[1] (analytic) = 0
y[1] (numeric) = 2.6665037854473481064643764074907
absolute error = 2.6665037854473481064643764074907
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.153
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.592
y[1] (analytic) = 0
y[1] (numeric) = 2.6674959300502208018228433270223
absolute error = 2.6674959300502208018228433270223
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.151
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1529.7MB, alloc=4.6MB, time=155.67
x[1] = 3.593
y[1] (analytic) = 0
y[1] (numeric) = 2.6684879735510130412683515182928
absolute error = 2.6684879735510130412683515182928
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.15
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.594
y[1] (analytic) = 0
y[1] (numeric) = 2.6694799156339866476997408657606
absolute error = 2.6694799156339866476997408657606
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.149
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.595
y[1] (analytic) = 0
y[1] (numeric) = 2.6704717559838703727122480560842
absolute error = 2.6704717559838703727122480560842
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.965
Order of pole = 7.148
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.596
y[1] (analytic) = 0
y[1] (numeric) = 2.6714634942858605885590036895766
absolute error = 2.6714634942858605885590036895766
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.147
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.597
y[1] (analytic) = 0
y[1] (numeric) = 2.6724551302256219778195232707482
absolute error = 2.6724551302256219778195232707482
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.146
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.598
y[1] (analytic) = 0
y[1] (numeric) = 2.6734466634892882207740548725664
absolute error = 2.6734466634892882207740548725664
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.145
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.599
y[1] (analytic) = 0
y[1] (numeric) = 2.6744380937634626804826644159716
absolute error = 2.6744380937634626804826644159716
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.144
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.6
y[1] (analytic) = 0
y[1] (numeric) = 2.6754294207352190855679576417186
absolute error = 2.6754294207352190855679576417186
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.144
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.601
y[1] (analytic) = 0
y[1] (numeric) = 2.6764206440921022107003559755643
absolute error = 2.6764206440921022107003559755643
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.143
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1533.5MB, alloc=4.6MB, time=156.04
x[1] = 3.602
y[1] (analytic) = 0
y[1] (numeric) = 2.6774117635221285547848616000166
absolute error = 2.6774117635221285547848616000166
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.142
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.603
y[1] (analytic) = 0
y[1] (numeric) = 2.678402778713787016848265146105
absolute error = 2.678402778713787016848265146105
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.141
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.604
y[1] (analytic) = 0
y[1] (numeric) = 2.6793936893560395696257675067465
absolute error = 2.6793936893560395696257675067465
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.141
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.605
y[1] (analytic) = 0
y[1] (numeric) = 2.6803844951383219308460053490751
absolute error = 2.6803844951383219308460053490751
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.14
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.606
y[1] (analytic) = 0
y[1] (numeric) = 2.681375195750544232213487966393
absolute error = 2.681375195750544232213487966393
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.139
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.607
y[1] (analytic) = 0
y[1] (numeric) = 2.6823657908830916860874711610053
absolute error = 2.6823657908830916860874711610053
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.139
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.608
y[1] (analytic) = 0
y[1] (numeric) = 2.6833562802268252498563118869271
absolute error = 2.6833562802268252498563118869271
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.966
Order of pole = 7.138
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.609
y[1] (analytic) = 0
y[1] (numeric) = 2.6843466634730822880063654061268
absolute error = 2.6843466634730822880063654061268
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.137
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.61
y[1] (analytic) = 0
y[1] (numeric) = 2.6853369403136772318845047234005
absolute error = 2.6853369403136772318845047234005
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.137
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1537.3MB, alloc=4.6MB, time=156.42
x[1] = 3.611
y[1] (analytic) = 0
y[1] (numeric) = 2.6863271104409022371533600629827
absolute error = 2.6863271104409022371533600629827
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.136
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.612
y[1] (analytic) = 0
y[1] (numeric) = 2.6873171735475278389383941344022
absolute error = 2.6873171735475278389383941344022
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.136
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.613
y[1] (analytic) = 0
y[1] (numeric) = 2.6883071293268036046659469057088
absolute error = 2.6883071293268036046659469057088
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.136
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.614
y[1] (analytic) = 0
y[1] (numeric) = 2.6892969774724587845914015588436
absolute error = 2.6892969774724587845914015588436
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.135
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.615
y[1] (analytic) = 0
y[1] (numeric) = 2.6902867176787029600166412444212
absolute error = 2.6902867176787029600166412444212
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.135
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.616
y[1] (analytic) = 0
y[1] (numeric) = 2.6912763496402266891959841813598
absolute error = 2.6912763496402266891959841813598
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.967
Order of pole = 7.135
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.617
y[1] (analytic) = 0
y[1] (numeric) = 2.6922658730522021509298025604474
absolute error = 2.6922658730522021509298025604474
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.134
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.618
y[1] (analytic) = 0
y[1] (numeric) = 2.693255287610283785845048609896
absolute error = 2.693255287610283785845048609896
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.134
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.619
y[1] (analytic) = 0
y[1] (numeric) = 2.6942445930106089353619290650277
absolute error = 2.6942445930106089353619290650277
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.134
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1541.1MB, alloc=4.6MB, time=156.79
x[1] = 3.62
y[1] (analytic) = 0
y[1] (numeric) = 2.69523378894979847834598715328
absolute error = 2.69523378894979847834598715328
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.134
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.621
y[1] (analytic) = 0
y[1] (numeric) = 2.6962228751249574654448690595317
absolute error = 2.6962228751249574654448690595317
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.134
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.622
y[1] (analytic) = 0
y[1] (numeric) = 2.6972118512336757511090696751598
absolute error = 2.6972118512336757511090696751598
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.133
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.623
y[1] (analytic) = 0
y[1] (numeric) = 2.6982007169740286232959702570652
absolute error = 2.6982007169740286232959702570652
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.968
Order of pole = 7.133
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.624
y[1] (analytic) = 0
y[1] (numeric) = 2.6991894720445774308564984299674
absolute error = 2.6991894720445774308564984299674
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.133
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.625
y[1] (analytic) = 0
y[1] (numeric) = 2.7001781161443702086037587564001
absolute error = 2.7001781161443702086037587564001
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.133
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.626
y[1] (analytic) = 0
y[1] (numeric) = 2.7011666489729423000629998738523
absolute error = 2.7011666489729423000629998738523
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.133
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.627
y[1] (analytic) = 0
y[1] (numeric) = 2.702155070230316977902301957228
absolute error = 2.702155070230316977902301957228
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.133
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.628
y[1] (analytic) = 0
y[1] (numeric) = 2.7031433796170060620433860070606
absolute error = 2.7031433796170060620433860070606
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.133
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1545.0MB, alloc=4.6MB, time=157.17
x[1] = 3.629
y[1] (analytic) = 0
y[1] (numeric) = 2.7041315768340105354519641895422
absolute error = 2.7041315768340105354519641895422
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.969
Order of pole = 7.134
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.63
y[1] (analytic) = 0
y[1] (numeric) = 2.7051196615828211576070681632411
absolute error = 2.7051196615828211576070681632411
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.97
Order of pole = 7.134
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.631
y[1] (analytic) = 0
y[1] (numeric) = 2.7061076335654190756488100192068
absolute error = 2.7061076335654190756488100192068
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.97
Order of pole = 7.134
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.632
y[1] (analytic) = 0
y[1] (numeric) = 2.7070954924842764332040481358284
absolute error = 2.7070954924842764332040481358284
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.97
Order of pole = 7.134
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.633
y[1] (analytic) = 0
y[1] (numeric) = 2.7080832380423569768894479071473
absolute error = 2.7080832380423569768894479071473
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.97
Order of pole = 7.134
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.634
y[1] (analytic) = 0
y[1] (numeric) = 2.7090708699431166604914449431563
absolute error = 2.7090708699431166604914449431563
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.97
Order of pole = 7.135
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.635
y[1] (analytic) = 0
y[1] (numeric) = 2.7100583878905042468226359627699
absolute error = 2.7100583878905042468226359627699
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.971
Order of pole = 7.135
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.636
y[1] (analytic) = 0
y[1] (numeric) = 2.7110457915889619072541402044598
absolute error = 2.7110457915889619072541402044598
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.971
Order of pole = 7.135
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.637
y[1] (analytic) = 0
y[1] (numeric) = 2.7120330807434258189234917658392
absolute error = 2.7120330807434258189234917658392
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.971
Order of pole = 7.136
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1548.8MB, alloc=4.6MB, time=157.54
x[1] = 3.638
y[1] (analytic) = 0
y[1] (numeric) = 2.7130202550593267596176408515781
absolute error = 2.7130202550593267596176408515781
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.971
Order of pole = 7.136
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.639
y[1] (analytic) = 0
y[1] (numeric) = 2.7140073142425907003306594587789
absolute error = 2.7140073142425907003306594587789
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.971
Order of pole = 7.136
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.64
y[1] (analytic) = 0
y[1] (numeric) = 2.7149942579996393954957645601548
absolute error = 2.7149942579996393954957645601548
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.972
Order of pole = 7.137
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.641
y[1] (analytic) = 0
y[1] (numeric) = 2.7159810860373909708912893578759
absolute error = 2.7159810860373909708912893578759
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.972
Order of pole = 7.137
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.642
y[1] (analytic) = 0
y[1] (numeric) = 2.7169677980632605092202506746025
absolute error = 2.7169677980632605092202506746025
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.972
Order of pole = 7.138
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.643
y[1] (analytic) = 0
y[1] (numeric) = 2.7179543937851606333631780228514
absolute error = 2.7179543937851606333631780228514
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.972
Order of pole = 7.138
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.644
y[1] (analytic) = 0
y[1] (numeric) = 2.7189408729115020873038873492653
absolute error = 2.7189408729115020873038873492653
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.973
Order of pole = 7.139
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.645
y[1] (analytic) = 0
y[1] (numeric) = 2.7199272351511943147278998864152
absolute error = 2.7199272351511943147278998864152
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.973
Order of pole = 7.14
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.646
y[1] (analytic) = 0
y[1] (numeric) = 2.7209134802136460352932239612942
absolute error = 2.7209134802136460352932239612942
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.973
Order of pole = 7.14
memory used=1552.6MB, alloc=4.6MB, time=157.91
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.647
y[1] (analytic) = 0
y[1] (numeric) = 2.7218996078087658185732350064911
absolute error = 2.7218996078087658185732350064911
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.973
Order of pole = 7.141
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.648
y[1] (analytic) = 0
y[1] (numeric) = 2.7228856176469626556714063969994
absolute error = 2.7228856176469626556714063969994
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.973
Order of pole = 7.141
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.649
y[1] (analytic) = 0
y[1] (numeric) = 2.7238715094391465285076610925581
absolute error = 2.7238715094391465285076610925581
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.974
Order of pole = 7.142
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.65
y[1] (analytic) = 0
y[1] (numeric) = 2.7248572828967289767761314021692
absolute error = 2.7248572828967289767761314021692
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.974
Order of pole = 7.143
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.651
y[1] (analytic) = 0
y[1] (numeric) = 2.7258429377316236625741315038291
absolute error = 2.7258429377316236625741315038291
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.974
Order of pole = 7.144
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.652
y[1] (analytic) = 0
y[1] (numeric) = 2.726828473656246932702164648389
absolute error = 2.726828473656246932702164648389
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.974
Order of pole = 7.144
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.653
y[1] (analytic) = 0
y[1] (numeric) = 2.7278138903835183786348042516512
absolute error = 2.7278138903835183786348042516512
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.975
Order of pole = 7.145
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.654
y[1] (analytic) = 0
y[1] (numeric) = 2.7287991876268613941623053331615
absolute error = 2.7287991876268613941623053331615
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.975
Order of pole = 7.146
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1556.4MB, alloc=4.6MB, time=158.29
x[1] = 3.655
y[1] (analytic) = 0
y[1] (numeric) = 2.7297843651002037307028199935051
absolute error = 2.7297843651002037307028199935051
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.975
Order of pole = 7.147
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.656
y[1] (analytic) = 0
y[1] (numeric) = 2.7307694225179780502851078340949
absolute error = 2.7307694225179780502851078340949
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.975
Order of pole = 7.148
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.657
y[1] (analytic) = 0
y[1] (numeric) = 2.7317543595951224762016494142985
absolute error = 2.7317543595951224762016494142985
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.149
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.658
y[1] (analytic) = 0
y[1] (numeric) = 2.7327391760470811413320880101197
absolute error = 2.7327391760470811413320880101197
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.15
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.659
y[1] (analytic) = 0
y[1] (numeric) = 2.7337238715898047341369420863767
absolute error = 2.7337238715898047341369420863767
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.976
Order of pole = 7.151
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.66
y[1] (analytic) = 0
y[1] (numeric) = 2.7347084459397510423215480202405
absolute error = 2.7347084459397510423215480202405
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.152
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.661
y[1] (analytic) = 0
y[1] (numeric) = 2.735692898813885494170209717957
absolute error = 2.735692898813885494170209717957
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.153
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.662
y[1] (analytic) = 0
y[1] (numeric) = 2.7366772299296816975505488484149
absolute error = 2.7366772299296816975505488484149
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.154
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.663
y[1] (analytic) = 0
y[1] (numeric) = 2.7376614390051219765880664767843
absolute error = 2.7376614390051219765880664767843
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.977
Order of pole = 7.155
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1560.2MB, alloc=4.6MB, time=158.66
x[1] = 3.664
y[1] (analytic) = 0
y[1] (numeric) = 2.7386455257586979060109439185793
absolute error = 2.7386455257586979060109439185793
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.156
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.665
y[1] (analytic) = 0
y[1] (numeric) = 2.7396294899094108431651276490352
absolute error = 2.7396294899094108431651276490352
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.157
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.666
y[1] (analytic) = 0
y[1] (numeric) = 2.740613331176772457699760094484
absolute error = 2.740613331176772457699760094484
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.978
Order of pole = 7.158
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.667
y[1] (analytic) = 0
y[1] (numeric) = 2.7415970492808052589230351013038
absolute error = 2.7415970492808052589230351013038
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.159
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.668
y[1] (analytic) = 0
y[1] (numeric) = 2.7425806439420431208285738238528
absolute error = 2.7425806439420431208285738238528
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.16
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.669
y[1] (analytic) = 0
y[1] (numeric) = 2.7435641148815318047924336954267
absolute error = 2.7435641148815318047924336954267
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.161
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.67
y[1] (analytic) = 0
y[1] (numeric) = 2.7445474618208294799408800455424
absolute error = 2.7445474618208294799408800455424
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.979
Order of pole = 7.162
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.671
y[1] (analytic) = 0
y[1] (numeric) = 2.7455306844820072411890668025994
absolute error = 2.7455306844820072411890668025994
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.164
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.672
y[1] (analytic) = 0
y[1] (numeric) = 2.7465137825876496249507895730509
absolute error = 2.7465137825876496249507895730509
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.165
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1564.0MB, alloc=4.7MB, time=159.05
x[1] = 3.673
y[1] (analytic) = 0
y[1] (numeric) = 2.7474967558608551225194912164787
absolute error = 2.7474967558608551225194912164787
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.98
Order of pole = 7.166
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.674
y[1] (analytic) = 0
y[1] (numeric) = 2.7484796040252366911207168402553
absolute error = 2.7484796040252366911207168402553
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.981
Order of pole = 7.167
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.675
y[1] (analytic) = 0
y[1] (numeric) = 2.7494623268049222626362319176458
absolute error = 2.7494623268049222626362319176458
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.981
Order of pole = 7.169
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.676
y[1] (analytic) = 0
y[1] (numeric) = 2.7504449239245552500000339890993
absolute error = 2.7504449239245552500000339890993
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.981
Order of pole = 7.17
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.677
y[1] (analytic) = 0
y[1] (numeric) = 2.7514273951092950512665051379557
absolute error = 2.7514273951092950512665051379557
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.982
Order of pole = 7.171
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.678
y[1] (analytic) = 0
y[1] (numeric) = 2.7524097400848175513509691386996
absolute error = 2.7524097400848175513509691386996
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.982
Order of pole = 7.173
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.679
y[1] (analytic) = 0
y[1] (numeric) = 2.7533919585773156214429338580795
absolute error = 2.7533919585773156214429338580795
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.982
Order of pole = 7.174
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.68
y[1] (analytic) = 0
y[1] (numeric) = 2.754374050313499616092316146733
absolute error = 2.754374050313499616092316146733
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.983
Order of pole = 7.175
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.681
y[1] (analytic) = 0
y[1] (numeric) = 2.7553560150205978679689630912644
absolute error = 2.7553560150205978679689630912644
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.983
Order of pole = 7.177
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1567.9MB, alloc=4.7MB, time=159.43
x[1] = 3.682
y[1] (analytic) = 0
y[1] (numeric) = 2.7563378524263571802958001038695
absolute error = 2.7563378524263571802958001038695
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.983
Order of pole = 7.178
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.683
y[1] (analytic) = 0
y[1] (numeric) = 2.7573195622590433169559529084406
absolute error = 2.7573195622590433169559529084406
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.983
Order of pole = 7.179
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.684
y[1] (analytic) = 0
y[1] (numeric) = 2.7583011442474414902742070384754
absolute error = 2.7583011442474414902742070384754
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.984
Order of pole = 7.181
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.685
y[1] (analytic) = 0
y[1] (numeric) = 2.7592825981208568464731849929029
absolute error = 2.7592825981208568464731849929029
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.984
Order of pole = 7.182
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.686
y[1] (analytic) = 0
y[1] (numeric) = 2.760263923609114948804637700989
absolute error = 2.760263923609114948804637700989
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.984
Order of pole = 7.184
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.687
y[1] (analytic) = 0
y[1] (numeric) = 2.7612451204425622583562634266495
absolute error = 2.7612451204425622583562634266495
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.985
Order of pole = 7.185
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.688
y[1] (analytic) = 0
y[1] (numeric) = 2.7622261883520666125344836956323
absolute error = 2.7622261883520666125344836956323
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.985
Order of pole = 7.186
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.689
y[1] (analytic) = 0
y[1] (numeric) = 2.7632071270690177012236222559954
absolute error = 2.7632071270690177012236222559954
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.985
Order of pole = 7.188
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.69
y[1] (analytic) = 0
y[1] (numeric) = 2.7641879363253275406219494829573
absolute error = 2.7641879363253275406219494829573
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.986
Order of pole = 7.189
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1571.7MB, alloc=4.7MB, time=159.81
x[1] = 3.691
y[1] (analytic) = 0
y[1] (numeric) = 2.7651686158534309447550710133911
absolute error = 2.7651686158534309447550710133911
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.986
Order of pole = 7.191
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.692
y[1] (analytic) = 0
y[1] (numeric) = 2.7661491653862859946671557428331
absolute error = 2.7661491653862859946671557428331
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.986
Order of pole = 7.192
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.693
y[1] (analytic) = 0
y[1] (numeric) = 2.7671295846573745052905146387384
absolute error = 2.7671295846573745052905146387384
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.987
Order of pole = 7.194
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.694
y[1] (analytic) = 0
y[1] (numeric) = 2.7681098734007024899940581177033
absolute error = 2.7681098734007024899940581177033
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.987
Order of pole = 7.195
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.695
y[1] (analytic) = 0
y[1] (numeric) = 2.7690900313508006228111760013432
absolute error = 2.7690900313508006228111760013432
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.987
Order of pole = 7.197
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.696
y[1] (analytic) = 0
y[1] (numeric) = 2.7700700582427246983476003053312
absolute error = 2.7700700582427246983476003053312
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.988
Order of pole = 7.198
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.697
y[1] (analytic) = 0
y[1] (numeric) = 2.7710499538120560893698273286273
absolute error = 2.7710499538120560893698273286273
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.988
Order of pole = 7.2
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.698
y[1] (analytic) = 0
y[1] (numeric) = 2.7720297177949022020746916950207
absolute error = 2.7720297177949022020746916950207
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.988
Order of pole = 7.201
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.699
y[1] (analytic) = 0
y[1] (numeric) = 2.7730093499278969290407011566353
absolute error = 2.7730093499278969290407011566353
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.989
Order of pole = 7.203
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1575.5MB, alloc=4.7MB, time=160.18
x[1] = 3.7
y[1] (analytic) = 0
y[1] (numeric) = 2.7739888499482010998617570988727
absolute error = 2.7739888499482010998617570988727
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.989
Order of pole = 7.204
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.701
y[1] (analytic) = 0
y[1] (numeric) = 2.7749682175935029294639017882522
absolute error = 2.7749682175935029294639017882522
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.989
Order of pole = 7.206
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.702
y[1] (analytic) = 0
y[1] (numeric) = 2.7759474526020184641057494786177
absolute error = 2.7759474526020184641057494786177
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.99
Order of pole = 7.207
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.703
y[1] (analytic) = 0
y[1] (numeric) = 2.776926554712492025063274537086
absolute error = 2.776926554712492025063274537086
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.99
Order of pole = 7.209
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.704
y[1] (analytic) = 0
y[1] (numeric) = 2.7779055236641966499996457687689
absolute error = 2.7779055236641966499996457687689
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.99
Order of pole = 7.21
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.705
y[1] (analytic) = 0
y[1] (numeric) = 2.778884359196934532020812108588
absolute error = 2.778884359196934532020812108588
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.991
Order of pole = 7.212
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.706
y[1] (analytic) = 0
y[1] (numeric) = 2.7798630610510374564175608092764
absolute error = 2.7798630610510374564175608092764
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.991
Order of pole = 7.213
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.707
y[1] (analytic) = 0
y[1] (numeric) = 2.7808416289673672350947851867954
absolute error = 2.7808416289673672350947851867954
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.991
Order of pole = 7.215
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.708
y[1] (analytic) = 0
y[1] (numeric) = 2.7818200626873161386887148877594
absolute error = 2.7818200626873161386887148877594
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.992
Order of pole = 7.216
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1579.3MB, alloc=4.7MB, time=160.56
x[1] = 3.709
y[1] (analytic) = 0
y[1] (numeric) = 2.7827983619528073263728775179191
absolute error = 2.7827983619528073263728775179191
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.992
Order of pole = 7.218
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.71
y[1] (analytic) = 0
y[1] (numeric) = 2.7837765265062952733535763161809
absolute error = 2.7837765265062952733535763161809
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.992
Order of pole = 7.219
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.711
y[1] (analytic) = 0
y[1] (numeric) = 2.7847545560907661960556843749011
absolute error = 2.7847545560907661960556843749011
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.993
Order of pole = 7.221
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.712
y[1] (analytic) = 0
y[1] (numeric) = 2.7857324504497384749995716941639
absolute error = 2.7857324504497384749995716941639
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.993
Order of pole = 7.222
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.713
y[1] (analytic) = 0
y[1] (numeric) = 2.7867102093272630753699971153
absolute error = 2.7867102093272630753699971153
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.994
Order of pole = 7.224
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.714
y[1] (analytic) = 0
y[1] (numeric) = 2.7876878324679239652778129069014
absolute error = 2.7876878324679239652778129069014
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.994
Order of pole = 7.225
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.715
y[1] (analytic) = 0
y[1] (numeric) = 2.7886653196168385317153454749106
absolute error = 2.7886653196168385317153454749106
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.994
Order of pole = 7.227
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.716
y[1] (analytic) = 0
y[1] (numeric) = 2.789642670519657994206331336881
absolute error = 2.789642670519657994206331336881
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.995
Order of pole = 7.228
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.717
y[1] (analytic) = 0
y[1] (numeric) = 2.7906198849225678161513031390948
absolute error = 2.7906198849225678161513031390948
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.995
Order of pole = 7.23
memory used=1583.1MB, alloc=4.7MB, time=160.93
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.718
y[1] (analytic) = 0
y[1] (numeric) = 2.7915969625722881138693361037577
absolute error = 2.7915969625722881138693361037577
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.995
Order of pole = 7.231
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.719
y[1] (analytic) = 0
y[1] (numeric) = 2.7925739032160740633370808718448
absolute error = 2.7925739032160740633370808718448
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.996
Order of pole = 7.233
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.72
y[1] (analytic) = 0
y[1] (numeric) = 2.7935507066017163046260242552208
absolute error = 2.7935507066017163046260242552208
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.996
Order of pole = 7.234
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.721
y[1] (analytic) = 0
y[1] (numeric) = 2.7945273724775413440389349292783
absolute error = 2.7945273724775413440389349292783
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.996
Order of pole = 7.236
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.722
y[1] (analytic) = 0
y[1] (numeric) = 2.7955039005924119539464665844083
absolute error = 2.7955039005924119539464665844083
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.997
Order of pole = 7.237
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.723
y[1] (analytic) = 0
y[1] (numeric) = 2.7964802906957275703249065110115
absolute error = 2.7964802906957275703249065110115
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.997
Order of pole = 7.239
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.724
y[1] (analytic) = 0
y[1] (numeric) = 2.7974565425374246879960730183602
absolute error = 2.7974565425374246879960730183602
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.997
Order of pole = 7.24
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.725
y[1] (analytic) = 0
y[1] (numeric) = 2.798432655867977253570380482302
absolute error = 2.798432655867977253570380482302
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.998
Order of pole = 7.242
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1586.9MB, alloc=4.7MB, time=161.30
x[1] = 3.726
y[1] (analytic) = 0
y[1] (numeric) = 2.7994086304383970560941061804407
absolute error = 2.7994086304383970560941061804407
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.998
Order of pole = 7.243
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.727
y[1] (analytic) = 0
y[1] (numeric) = 2.800384466000234115401908405918
absolute error = 2.800384466000234115401908405918
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.998
Order of pole = 7.244
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.728
y[1] (analytic) = 0
y[1] (numeric) = 2.8013601623055770681756606521269
absolute error = 2.8013601623055770681756606521269
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.999
Order of pole = 7.246
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.729
y[1] (analytic) = 0
y[1] (numeric) = 2.8023357191070535517106819305013
absolute error = 2.8023357191070535517106819305013
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.999
Order of pole = 7.247
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.73
y[1] (analytic) = 0
y[1] (numeric) = 2.8033111361578305853904585218243
absolute error = 2.8033111361578305853904585218243
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 3.999
Order of pole = 7.248
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.731
y[1] (analytic) = 0
y[1] (numeric) = 2.8042864132116149498709676681627
absolute error = 2.8042864132116149498709676681627
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4
Order of pole = 7.25
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.732
y[1] (analytic) = 0
y[1] (numeric) = 2.8052615500226535639757288874532
absolute error = 2.8052615500226535639757288874532
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4
Order of pole = 7.251
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.733
y[1] (analytic) = 0
y[1] (numeric) = 2.8062365463457338593027237358146
absolute error = 2.8062365463457338593027237358146
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4
Order of pole = 7.253
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.734
y[1] (analytic) = 0
y[1] (numeric) = 2.807211401936184152544339953731
absolute error = 2.807211401936184152544339953731
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4
Order of pole = 7.254
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1590.7MB, alloc=4.7MB, time=161.68
x[1] = 3.735
y[1] (analytic) = 0
y[1] (numeric) = 2.8081861165498740155215110112235
absolute error = 2.8081861165498740155215110112235
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.001
Order of pole = 7.255
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.736
y[1] (analytic) = 0
y[1] (numeric) = 2.8091606899432146429332371138882
absolute error = 2.8091606899432146429332371138882
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.001
Order of pole = 7.256
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.737
y[1] (analytic) = 0
y[1] (numeric) = 2.810135121873159217822688746116
absolute error = 2.810135121873159217822688746116
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.001
Order of pole = 7.258
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.738
y[1] (analytic) = 0
y[1] (numeric) = 2.8111094120972032747611088098053
absolute error = 2.8111094120972032747611088098053
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.002
Order of pole = 7.259
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.739
y[1] (analytic) = 0
y[1] (numeric) = 2.8120835603733850607507443663279
absolute error = 2.8120835603733850607507443663279
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.002
Order of pole = 7.26
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.74
y[1] (analytic) = 0
y[1] (numeric) = 2.813057566460285893848053906289
absolute error = 2.813057566460285893848053906289
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.002
Order of pole = 7.261
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.741
y[1] (analytic) = 0
y[1] (numeric) = 2.8140314301170305195084509556325
absolute error = 2.8140314301170305195084509556325
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.003
Order of pole = 7.263
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.742
y[1] (analytic) = 0
y[1] (numeric) = 2.8150051511032874646538596777642
absolute error = 2.8150051511032874646538596777642
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.003
Order of pole = 7.264
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.743
y[1] (analytic) = 0
y[1] (numeric) = 2.8159787291792693894643729494941
absolute error = 2.8159787291792693894643729494941
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.003
Order of pole = 7.265
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1594.6MB, alloc=4.7MB, time=162.05
x[1] = 3.744
y[1] (analytic) = 0
y[1] (numeric) = 2.8169521641057334368953181736196
absolute error = 2.8169521641057334368953181736196
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.004
Order of pole = 7.266
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.745
y[1] (analytic) = 0
y[1] (numeric) = 2.817925455643981579921050842779
absolute error = 2.817925455643981579921050842779
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.004
Order of pole = 7.267
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.746
y[1] (analytic) = 0
y[1] (numeric) = 2.8188986035558609665068105876894
absolute error = 2.8188986035558609665068105876894
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.004
Order of pole = 7.268
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.747
y[1] (analytic) = 0
y[1] (numeric) = 2.8198716076037642623099891279377
absolute error = 2.8198716076037642623099891279377
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.005
Order of pole = 7.269
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.748
y[1] (analytic) = 0
y[1] (numeric) = 2.8208444675506299911121741950093
absolute error = 2.8208444675506299911121741950093
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.005
Order of pole = 7.271
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.749
y[1] (analytic) = 0
y[1] (numeric) = 2.8218171831599428729833481151121
absolute error = 2.8218171831599428729833481151121
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.005
Order of pole = 7.272
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.75
y[1] (analytic) = 0
y[1] (numeric) = 2.8227897541957341601796343234763
absolute error = 2.8227897541957341601796343234763
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.005
Order of pole = 7.273
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.751
y[1] (analytic) = 0
y[1] (numeric) = 2.8237621804225819707759996320784
absolute error = 2.8237621804225819707759996320784
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.006
Order of pole = 7.274
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.752
y[1] (analytic) = 0
y[1] (numeric) = 2.8247344616056116200353345890454
absolute error = 2.8247344616056116200353345890454
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.006
Order of pole = 7.275
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1598.4MB, alloc=4.7MB, time=162.43
x[1] = 3.753
y[1] (analytic) = 0
y[1] (numeric) = 2.8257065975104959495153487502393
absolute error = 2.8257065975104959495153487502393
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.006
Order of pole = 7.276
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.754
y[1] (analytic) = 0
y[1] (numeric) = 2.8266785879034556539147321316012
absolute error = 2.8266785879034556539147321316012
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.007
Order of pole = 7.276
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.755
y[1] (analytic) = 0
y[1] (numeric) = 2.8276504325512596056600485246393
absolute error = 2.8276504325512596056600485246393
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.007
Order of pole = 7.277
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.756
y[1] (analytic) = 0
y[1] (numeric) = 2.8286221312212251772348407368829
absolute error = 2.8286221312212251772348407368829
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.007
Order of pole = 7.278
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.757
y[1] (analytic) = 0
y[1] (numeric) = 2.8295936836812185612524421640874
absolute error = 2.8295936836812185612524421640874
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.007
Order of pole = 7.279
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.758
y[1] (analytic) = 0
y[1] (numeric) = 2.830565089699655088274003411362
absolute error = 2.830565089699655088274003411362
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.008
Order of pole = 7.28
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.759
y[1] (analytic) = 0
y[1] (numeric) = 2.8315363490454995423732569561078
absolute error = 2.8315363490454995423732569561078
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.008
Order of pole = 7.281
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.76
y[1] (analytic) = 0
y[1] (numeric) = 2.8325074614882664744495570865936
absolute error = 2.8325074614882664744495570865936
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.008
Order of pole = 7.282
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.761
y[1] (analytic) = 0
y[1] (numeric) = 2.8334784267980205132907465560651
absolute error = 2.8334784267980205132907465560651
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.009
Order of pole = 7.282
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1602.2MB, alloc=4.7MB, time=162.80
x[1] = 3.762
y[1] (analytic) = 0
y[1] (numeric) = 2.834449244745376674387415563378
absolute error = 2.834449244745376674387415563378
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.009
Order of pole = 7.283
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.763
y[1] (analytic) = 0
y[1] (numeric) = 2.8354199151015006665001328071755
absolute error = 2.8354199151015006665001328071755
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.009
Order of pole = 7.284
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.764
y[1] (analytic) = 0
y[1] (numeric) = 2.8363904376381091959812424614908
absolute error = 2.8363904376381091959812424614908
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.009
Order of pole = 7.284
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.765
y[1] (analytic) = 0
y[1] (numeric) = 2.837360812127470268852834986255
absolute error = 2.837360812127470268852834986255
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 7.285
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.766
y[1] (analytic) = 0
y[1] (numeric) = 2.8383310383424034906425137164334
absolute error = 2.8383310383424034906425137164334
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 7.286
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.767
y[1] (analytic) = 0
y[1] (numeric) = 2.8393011160562803639785931682996
absolute error = 2.8393011160562803639785931682996
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 7.286
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.768
y[1] (analytic) = 0
y[1] (numeric) = 2.8402710450430245839463789605997
absolute error = 2.8402710450430245839463789605997
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 7.287
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.769
y[1] (analytic) = 0
y[1] (numeric) = 2.8412408250771123312071931719554
absolute error = 2.8412408250771123312071931719554
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 7.287
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.77
y[1] (analytic) = 0
y[1] (numeric) = 2.8422104559335725628818228437199
absolute error = 2.8422104559335725628818228437199
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 7.288
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1606.0MB, alloc=4.7MB, time=163.18
x[1] = 3.771
y[1] (analytic) = 0
y[1] (numeric) = 2.8431799373879873012000831895372
absolute error = 2.8431799373879873012000831895372
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 7.288
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.772
y[1] (analytic) = 0
y[1] (numeric) = 2.8441492692164919199182008889716
absolute error = 2.8441492692164919199182008889716
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 7.289
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.773
y[1] (analytic) = 0
y[1] (numeric) = 2.8451184511957754285057366226802
absolute error = 2.8451184511957754285057366226802
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 7.289
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.774
y[1] (analytic) = 0
y[1] (numeric) = 2.846087483103080754103779750606
absolute error = 2.846087483103080754103779750606
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 7.29
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.775
y[1] (analytic) = 0
y[1] (numeric) = 2.8470563647162050212561617424807
absolute error = 2.8470563647162050212561617424807
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 7.29
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.776
y[1] (analytic) = 0
y[1] (numeric) = 2.8480250958134998294154486414591
absolute error = 2.8480250958134998294154486414591
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 7.29
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.777
y[1] (analytic) = 0
y[1] (numeric) = 2.8489936761738715282254864768668
absolute error = 2.8489936761738715282254864768668
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 7.291
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.778
y[1] (analytic) = 0
y[1] (numeric) = 2.8499621055767814905822871407469
absolute error = 2.8499621055767814905822871407469
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 7.291
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.779
y[1] (analytic) = 0
y[1] (numeric) = 2.8509303838022463834750558050478
absolute error = 2.8509303838022463834750558050478
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 7.291
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1609.8MB, alloc=4.7MB, time=163.56
x[1] = 3.78
y[1] (analytic) = 0
y[1] (numeric) = 2.8518985106308384366091744818196
absolute error = 2.8518985106308384366091744818196
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 7.291
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.781
y[1] (analytic) = 0
y[1] (numeric) = 2.852866485843685708812969817591
absolute error = 2.852866485843685708812969817591
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 7.292
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.782
y[1] (analytic) = 0
y[1] (numeric) = 2.8538343092224723522301066650993
absolute error = 2.8538343092224723522301066650993
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 7.292
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.783
y[1] (analytic) = 0
y[1] (numeric) = 2.8548019805494388742994623906584
absolute error = 2.8548019805494388742994623906584
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 7.292
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.784
y[1] (analytic) = 0
y[1] (numeric) = 2.8557694996073823975243502535838
absolute error = 2.8557694996073823975243502535838
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 7.292
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.785
y[1] (analytic) = 0
y[1] (numeric) = 2.856736866179656917032973535175
absolute error = 2.856736866179656917032973535175
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 7.292
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.786
y[1] (analytic) = 0
y[1] (numeric) = 2.8577040800501735559320053986918
absolute error = 2.8577040800501735559320053986918
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 7.292
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.787
y[1] (analytic) = 0
y[1] (numeric) = 2.8586711410034008184552027284761
absolute error = 2.8586711410034008184552027284761
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 7.292
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.788
y[1] (analytic) = 0
y[1] (numeric) = 2.8596380488243648409089754257778
absolute error = 2.8596380488243648409089754257778
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 7.292
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1613.6MB, alloc=4.7MB, time=163.93
x[1] = 3.789
y[1] (analytic) = 0
y[1] (numeric) = 2.8606048032986496404168458308688
absolute error = 2.8606048032986496404168458308688
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 7.292
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.79
y[1] (analytic) = 0
y[1] (numeric) = 2.8615714042123973614647460955799
absolute error = 2.8615714042123973614647460955799
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 7.292
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.791
y[1] (analytic) = 0
y[1] (numeric) = 2.8625378513523085202491144474067
absolute error = 2.8625378513523085202491144474067
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 7.291
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.792
y[1] (analytic) = 0
y[1] (numeric) = 2.8635041445056422468297643657085
absolute error = 2.8635041445056422468297643657085
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 7.291
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.793
y[1] (analytic) = 0
y[1] (numeric) = 2.864470283460216525089513732203
absolute error = 2.864470283460216525089513732203
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 7.291
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.794
y[1] (analytic) = 0
y[1] (numeric) = 2.8654362680044084305025740218497
absolute error = 2.8654362680044084305025740218497
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 7.291
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.795
y[1] (analytic) = 0
y[1] (numeric) = 2.8664020979271543657137125662484
absolute error = 2.8664020979271543657137125662484
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 7.29
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.796
y[1] (analytic) = 0
y[1] (numeric) = 2.8673677730179502939302138497726
absolute error = 2.8673677730179502939302138497726
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 7.29
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.797
y[1] (analytic) = 0
y[1] (numeric) = 2.8683332930668519701286786887387
absolute error = 2.8683332930668519701286786887387
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 7.29
memory used=1617.4MB, alloc=4.7MB, time=164.30
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.798
y[1] (analytic) = 0
y[1] (numeric) = 2.8692986578644751700787129959032
absolute error = 2.8692986578644751700787129959032
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 7.289
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.799
y[1] (analytic) = 0
y[1] (numeric) = 2.8702638672019959171855706464075
absolute error = 2.8702638672019959171855706464075
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.289
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.8
y[1] (analytic) = 0
y[1] (numeric) = 2.8712289208711507071538277368787
absolute error = 2.8712289208711507071538277368787
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.289
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.801
y[1] (analytic) = 0
y[1] (numeric) = 2.8721938186642367304741782666723
absolute error = 2.8721938186642367304741782666723
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.288
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.802
y[1] (analytic) = 0
y[1] (numeric) = 2.8731585603741120927354539691344
absolute error = 2.8731585603741120927354539691344
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.287
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.803
y[1] (analytic) = 0
y[1] (numeric) = 2.8741231457941960327639836811955
absolute error = 2.8741231457941960327639836811955
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.287
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.804
y[1] (analytic) = 0
y[1] (numeric) = 2.8750875747184691385924202615142
absolute error = 2.8750875747184691385924202615142
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.286
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.805
y[1] (analytic) = 0
y[1] (numeric) = 2.8760518469414735612601756506942
absolute error = 2.8760518469414735612601756506942
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.286
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.806
y[1] (analytic) = 0
y[1] (numeric) = 2.8770159622583132264476172117333
absolute error = 2.8770159622583132264476172117333
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.285
memory used=1621.3MB, alloc=4.7MB, time=164.68
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.807
y[1] (analytic) = 0
y[1] (numeric) = 2.8779799204646540439461909947563
absolute error = 2.8779799204646540439461909947563
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.284
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.808
y[1] (analytic) = 0
y[1] (numeric) = 2.8789437213567241149666500371709
absolute error = 2.8789437213567241149666500371709
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.284
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.809
y[1] (analytic) = 0
y[1] (numeric) = 2.879907364731313937287578238589
absolute error = 2.879907364731313937287578238589
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.283
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.81
y[1] (analytic) = 0
y[1] (numeric) = 2.8808708503857766082464127391191
absolute error = 2.8808708503857766082464127391191
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.282
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.811
y[1] (analytic) = 0
y[1] (numeric) = 2.8818341781180280255751800798811
absolute error = 2.8818341781180280255751800798811
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.281
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.812
y[1] (analytic) = 0
y[1] (numeric) = 2.8827973477265470860831737357608
absolute error = 2.8827973477265470860831737357608
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.28
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.813
y[1] (analytic) = 0
y[1] (numeric) = 2.8837603590103758821888128824439
absolute error = 2.8837603590103758821888128824439
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.279
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.814
y[1] (analytic) = 0
y[1] (numeric) = 2.884723211769119896302934492577
absolute error = 2.884723211769119896302934492577
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.278
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1625.1MB, alloc=4.7MB, time=165.07
x[1] = 3.815
y[1] (analytic) = 0
y[1] (numeric) = 2.8856859058029481930657830494358
absolute error = 2.8856859058029481930657830494358
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.277
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.816
y[1] (analytic) = 0
y[1] (numeric) = 2.8866484409125936094399743206728
absolute error = 2.8866484409125936094399743206728
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.276
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.817
y[1] (analytic) = 0
y[1] (numeric) = 2.8876108168993529426617217495061
absolute error = 2.8876108168993529426617217495061
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.275
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.818
y[1] (analytic) = 0
y[1] (numeric) = 2.8885730335650871360526260960293
absolute error = 2.8885730335650871360526260960293
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.274
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.819
y[1] (analytic) = 0
y[1] (numeric) = 2.8895350907122214626943409971175
absolute error = 2.8895350907122214626943409971175
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.273
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.82
y[1] (analytic) = 0
y[1] (numeric) = 2.8904969881437457069684391096029
absolute error = 2.8904969881437457069684391096029
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.272
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.821
y[1] (analytic) = 0
y[1] (numeric) = 2.8914587256632143439638154579439
absolute error = 2.8914587256632143439638154579439
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.271
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.822
y[1] (analytic) = 0
y[1] (numeric) = 2.8924203030747467167539765244482
absolute error = 2.8924203030747467167539765244482
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.269
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.823
y[1] (analytic) = 0
y[1] (numeric) = 2.8933817201830272115465754971755
absolute error = 2.8933817201830272115465754971755
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.268
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1628.9MB, alloc=4.7MB, time=165.45
x[1] = 3.824
y[1] (analytic) = 0
y[1] (numeric) = 2.8943429767933054307075659278785
absolute error = 2.8943429767933054307075659278785
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.267
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.825
y[1] (analytic) = 0
y[1] (numeric) = 2.8953040727113963636623578496856
absolute error = 2.8953040727113963636623578496856
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.266
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.826
y[1] (analytic) = 0
y[1] (numeric) = 2.8962650077436805556763721616255
absolute error = 2.8962650077436805556763721616255
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.264
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.827
y[1] (analytic) = 0
y[1] (numeric) = 2.897225781697104274517400804485
absolute error = 2.897225781697104274517400804485
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.263
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.828
y[1] (analytic) = 0
y[1] (numeric) = 2.898186394379179675002191929823
absolute error = 2.898186394379179675002191929823
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.261
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.829
y[1] (analytic) = 0
y[1] (numeric) = 2.8991468455979849614296909011748
absolute error = 2.8991468455979849614296909011748
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.26
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.83
y[1] (analytic) = 0
y[1] (numeric) = 2.9001071351621645479033795635237
absolute error = 2.9001071351621645479033795635237
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.258
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.831
y[1] (analytic) = 0
y[1] (numeric) = 2.9010672628809292165451677739281
absolute error = 2.9010672628809292165451677739281
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.257
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.832
y[1] (analytic) = 0
y[1] (numeric) = 2.9020272285640562736033027027238
absolute error = 2.9020272285640562736033027027238
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.255
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1632.7MB, alloc=4.7MB, time=165.82
x[1] = 3.833
y[1] (analytic) = 0
y[1] (numeric) = 2.9029870320218897034567728909176
absolute error = 2.9029870320218897034567728909176
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.254
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.834
y[1] (analytic) = 0
y[1] (numeric) = 2.9039466730653403205186954851964
absolute error = 2.9039466730653403205186954851964
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.252
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.835
y[1] (analytic) = 0
y[1] (numeric) = 2.9049061515058859190411864673442
absolute error = 2.9049061515058859190411864673442
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.25
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.836
y[1] (analytic) = 0
y[1] (numeric) = 2.9058654671555714208242250497342
absolute error = 2.9058654671555714208242250497342
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.249
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.837
y[1] (analytic) = 0
y[1] (numeric) = 2.9068246198270090208310347228977
absolute error = 2.9068246198270090208310347228977
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.247
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.838
y[1] (analytic) = 0
y[1] (numeric) = 2.9077836093333783307125147149105
absolute error = 2.9077836093333783307125147149105
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.245
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.839
y[1] (analytic) = 0
y[1] (numeric) = 2.9087424354884265202432668554338
absolute error = 2.9087424354884265202432668554338
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.243
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.84
y[1] (analytic) = 0
y[1] (numeric) = 2.9097010981064684566717740296522
absolute error = 2.9097010981064684566717740296522
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.242
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.841
y[1] (analytic) = 0
y[1] (numeric) = 2.9106595970023868419872975590143
absolute error = 2.9106595970023868419872975590143
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.24
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1636.5MB, alloc=4.7MB, time=166.20
x[1] = 3.842
y[1] (analytic) = 0
y[1] (numeric) = 2.9116179319916323481060719565557
absolute error = 2.9116179319916323481060719565557
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.238
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.843
y[1] (analytic) = 0
y[1] (numeric) = 2.912576102890223749979386574625
absolute error = 2.912576102890223749979386574625
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.236
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.844
y[1] (analytic) = 0
y[1] (numeric) = 2.9135341095147480566261546919883
absolute error = 2.9135341095147480566261546919883
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.234
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.845
y[1] (analytic) = 0
y[1] (numeric) = 2.9144919516823606400925815755157
absolute error = 2.9144919516823606400925815755157
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.232
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.846
y[1] (analytic) = 0
y[1] (numeric) = 2.915449629210785362341553998907
absolute error = 2.915449629210785362341553998907
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.23
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.847
y[1] (analytic) = 0
y[1] (numeric) = 2.9164071419183147000743846071474
absolute error = 2.9164071419183147000743846071474
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.228
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.848
y[1] (analytic) = 0
y[1] (numeric) = 2.917364489623809867487555380557
absolute error = 2.917364489623809867487555380557
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.226
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.849
y[1] (analytic) = 0
y[1] (numeric) = 2.9183216721467009369671152763599
absolute error = 2.9183216721467009369671152763599
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.224
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.85
y[1] (analytic) = 0
y[1] (numeric) = 2.9192786893069869577233979086152
absolute error = 2.9192786893069869577233979086152
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.222
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1640.3MB, alloc=4.7MB, time=166.57
x[1] = 3.851
y[1] (analytic) = 0
y[1] (numeric) = 2.9202355409252360723687358690733
absolute error = 2.9202355409252360723687358690733
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.219
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.852
y[1] (analytic) = 0
y[1] (numeric) = 2.9211922268225856314408589920104
absolute error = 2.9211922268225856314408589920104
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.217
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.853
y[1] (analytic) = 0
y[1] (numeric) = 2.9221487468207423058746745253061
absolute error = 2.9221487468207423058746745253061
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.215
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.854
y[1] (analytic) = 0
y[1] (numeric) = 2.9231051007419821974251377879277
absolute error = 2.9231051007419821974251377879277
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.213
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.855
y[1] (analytic) = 0
y[1] (numeric) = 2.9240612884091509470439324705265
absolute error = 2.9240612884091509470439324705265
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.211
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.856
y[1] (analytic) = 0
y[1] (numeric) = 2.9250173096456638412126902709985
absolute error = 2.9250173096456638412126902709985
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.208
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.857
y[1] (analytic) = 0
y[1] (numeric) = 2.925973164275505916235490050575
absolute error = 2.925973164275505916235490050575
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 7.206
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.858
y[1] (analytic) = 0
y[1] (numeric) = 2.9269288521232320604933871482515
absolute error = 2.9269288521232320604933871482515
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.204
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.859
y[1] (analytic) = 0
y[1] (numeric) = 2.9278843730139671146637339020946
absolute error = 2.9278843730139671146637339020946
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.201
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1644.1MB, alloc=4.7MB, time=166.95
x[1] = 3.86
y[1] (analytic) = 0
y[1] (numeric) = 2.9288397267734059699070627951542
absolute error = 2.9288397267734059699070627951542
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.199
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.861
y[1] (analytic) = 0
y[1] (numeric) = 2.9297949132278136640243139713114
absolute error = 2.9297949132278136640243139713114
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.196
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.862
y[1] (analytic) = 0
y[1] (numeric) = 2.9307499322040254755871991523793
absolute error = 2.9307499322040254755871991523793
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.194
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.863
y[1] (analytic) = 0
y[1] (numeric) = 2.9317047835294470160445042321064
absolute error = 2.9317047835294470160445042321064
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.192
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.864
y[1] (analytic) = 0
y[1] (numeric) = 2.9326594670320543198071430253774
absolute error = 2.9326594670320543198071430253774
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.189
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.865
y[1] (analytic) = 0
y[1] (numeric) = 2.9336139825403939323147848118308
absolute error = 2.9336139825403939323147848118308
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.187
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.866
y[1] (analytic) = 0
y[1] (numeric) = 2.9345683298835829960868884322803
absolute error = 2.9345683298835829960868884322803
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.184
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.867
y[1] (analytic) = 0
y[1] (numeric) = 2.9355225088913093347609857737103
absolute error = 2.9355225088913093347609857737103
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.181
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.868
y[1] (analytic) = 0
y[1] (numeric) = 2.9364765193938315351210675141765
absolute error = 2.9364765193938315351210675141765
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.179
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1648.0MB, alloc=4.7MB, time=167.33
x[1] = 3.869
y[1] (analytic) = 0
y[1] (numeric) = 2.9374303612219790271189339926548
absolute error = 2.9374303612219790271189339926548
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.176
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.87
y[1] (analytic) = 0
y[1] (numeric) = 2.9383840342071521618913840207111
absolute error = 2.9383840342071521618913840207111
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.174
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.871
y[1] (analytic) = 0
y[1] (numeric) = 2.9393375381813222877761243627813
absolute error = 2.9393375381813222877761243627813
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.171
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.872
y[1] (analytic) = 0
y[1] (numeric) = 2.9402908729770318243292924798267
absolute error = 2.9402908729770318243292924798267
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.168
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.873
y[1] (analytic) = 0
y[1] (numeric) = 2.9412440384273943343474949571359
absolute error = 2.9412440384273943343474949571359
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.166
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.874
y[1] (analytic) = 0
y[1] (numeric) = 2.9421970343660945938972738210485
absolute error = 2.9421970343660945938972738210485
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 7.163
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.875
y[1] (analytic) = 0
y[1] (numeric) = 2.9431498606273886603549226913545
absolute error = 2.9431498606273886603549226913545
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.16
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.876
y[1] (analytic) = 0
y[1] (numeric) = 2.9441025170461039384595844160486
absolute error = 2.9441025170461039384595844160486
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.157
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.877
y[1] (analytic) = 0
y[1] (numeric) = 2.9450550034576392443825714929602
absolute error = 2.9450550034576392443825714929602
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.155
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1651.8MB, alloc=4.7MB, time=167.70
x[1] = 3.878
y[1] (analytic) = 0
y[1] (numeric) = 2.9460073196979648678158601985156
absolute error = 2.9460073196979648678158601985156
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.152
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.879
y[1] (analytic) = 0
y[1] (numeric) = 2.9469594656036226320827189174927
absolute error = 2.9469594656036226320827189174927
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.149
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.88
y[1] (analytic) = 0
y[1] (numeric) = 2.9479114410117259522734406990729
absolute error = 2.9479114410117259522734406990729
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.146
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.881
y[1] (analytic) = 0
y[1] (numeric) = 2.9488632457599598914091595537584
absolute error = 2.9488632457599598914091595537584
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.144
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.882
y[1] (analytic) = 0
y[1] (numeric) = 2.9498148796865812146367394527807
absolute error = 2.9498148796865812146367394527807
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.141
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.883
y[1] (analytic) = 0
y[1] (numeric) = 2.950766342630418441457734396455
absolute error = 2.950766342630418441457734396455
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.138
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.884
y[1] (analytic) = 0
y[1] (numeric) = 2.9517176344308718959944272805116
absolute error = 2.9517176344308718959944272805116
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.135
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.885
y[1] (analytic) = 0
y[1] (numeric) = 2.9526687549279137552959646097398
absolute error = 2.9526687549279137552959646097398
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 7.132
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.886
y[1] (analytic) = 0
y[1] (numeric) = 2.9536197039620880956876133862888
absolute error = 2.9536197039620880956876133862888
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.129
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1655.6MB, alloc=4.7MB, time=168.07
x[1] = 3.887
y[1] (analytic) = 0
y[1] (numeric) = 2.954570481374510937166175735663
absolute error = 2.954570481374510937166175735663
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.126
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.888
y[1] (analytic) = 0
y[1] (numeric) = 2.9555210870068702858446060268065
absolute error = 2.9555210870068702858446060268065
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.123
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.889
y[1] (analytic) = 0
y[1] (numeric) = 2.9564715207014261744488843936737
absolute error = 2.9564715207014261744488843936737
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.12
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.89
y[1] (analytic) = 0
y[1] (numeric) = 2.9574217823010107008702096743104
absolute error = 2.9574217823010107008702096743104
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.117
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.891
y[1] (analytic) = 0
y[1] (numeric) = 2.9583718716490280647755838497034
absolute error = 2.9583718716490280647755838497034
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.114
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.892
y[1] (analytic) = 0
y[1] (numeric) = 2.9593217885894546022798690884808
absolute error = 2.9593217885894546022798690884808
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.111
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.893
y[1] (analytic) = 0
y[1] (numeric) = 2.9602715329668388186824074849389
absolute error = 2.9602715329668388186824074849389
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.108
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.894
y[1] (analytic) = 0
y[1] (numeric) = 2.9612211046263014192713025168228
absolute error = 2.9612211046263014192713025168228
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.105
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.895
y[1] (analytic) = 0
y[1] (numeric) = 2.9621705034135353381984701457754
absolute error = 2.9621705034135353381984701457754
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 7.102
memory used=1659.4MB, alloc=4.7MB, time=168.45
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.896
y[1] (analytic) = 0
y[1] (numeric) = 2.9631197291748057654285763373821
absolute error = 2.9631197291748057654285763373821
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 7.099
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.897
y[1] (analytic) = 0
y[1] (numeric) = 2.9640687817569501717649865892582
absolute error = 2.9640687817569501717649865892582
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 7.096
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.898
y[1] (analytic) = 0
y[1] (numeric) = 2.9650176610073783319558618246387
absolute error = 2.9650176610073783319558618246387
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 7.093
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.899
y[1] (analytic) = 0
y[1] (numeric) = 2.9659663667740723458835437354256
absolute error = 2.9659663667740723458835437354256
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 7.09
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.9
y[1] (analytic) = 0
y[1] (numeric) = 2.9669148989055866578403813426058
absolute error = 2.9669148989055866578403813426058
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 7.087
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.901
y[1] (analytic) = 0
y[1] (numeric) = 2.9678632572510480738941591833669
absolute error = 2.9678632572510480738941591833669
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 7.084
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.902
y[1] (analytic) = 0
y[1] (numeric) = 2.9688114416601557773462961330944
absolute error = 2.9688114416601557773462961330944
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 7.081
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.903
y[1] (analytic) = 0
y[1] (numeric) = 2.9697594519831813422859924267175
absolute error = 2.9697594519831813422859924267175
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 7.078
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.904
y[1] (analytic) = 0
y[1] (numeric) = 2.9707072880709687452435109575752
memory used=1663.2MB, alloc=4.7MB, time=168.83
absolute error = 2.9707072880709687452435109575752
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 7.075
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.905
y[1] (analytic) = 0
y[1] (numeric) = 2.9716549497749343749457874030878
absolute error = 2.9716549497749343749457874030878
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 7.072
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.906
y[1] (analytic) = 0
y[1] (numeric) = 2.9726024369470670401775721550287
absolute error = 2.9726024369470670401775721550287
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 7.069
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.907
y[1] (analytic) = 0
y[1] (numeric) = 2.9735497494399279757513154180918
absolute error = 2.9735497494399279757513154180918
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 7.066
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.908
y[1] (analytic) = 0
y[1] (numeric) = 2.974496887106650846589015183732
absolute error = 2.974496887106650846589015183732
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 7.063
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.909
y[1] (analytic) = 0
y[1] (numeric) = 2.9754438498009417499192560869062
absolute error = 2.9754438498009417499192560869062
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 7.059
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.91
y[1] (analytic) = 0
y[1] (numeric) = 2.9763906373770792155926754113625
absolute error = 2.9763906373770792155926754113625
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 7.056
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.911
y[1] (analytic) = 0
y[1] (numeric) = 2.9773372496899142045191007244972
absolute error = 2.9773372496899142045191007244972
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 7.053
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.912
y[1] (analytic) = 0
y[1] (numeric) = 2.9782836865948701052296117955272
absolute error = 2.9782836865948701052296117955272
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 7.05
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1667.0MB, alloc=4.7MB, time=169.20
x[1] = 3.913
y[1] (analytic) = 0
y[1] (numeric) = 2.979229947947942728566787580794
absolute error = 2.979229947947942728566787580794
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 7.047
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.914
y[1] (analytic) = 0
y[1] (numeric) = 2.9801760336057003005064071474257
absolute error = 2.9801760336057003005064071474257
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 7.044
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.915
y[1] (analytic) = 0
y[1] (numeric) = 2.9811219434252834531138814513283
absolute error = 2.9811219434252834531138814513283
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 7.041
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.916
y[1] (analytic) = 0
y[1] (numeric) = 2.982067677264405213638700887551
absolute error = 2.982067677264405213638700887551
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 7.038
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.917
y[1] (analytic) = 0
y[1] (numeric) = 2.9830132349813509917501914904724
absolute error = 2.9830132349813509917501914904724
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 7.035
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.918
y[1] (analytic) = 0
y[1] (numeric) = 2.9839586164349785649178805779773
absolute error = 2.9839586164349785649178805779773
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 7.032
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.919
y[1] (analytic) = 0
y[1] (numeric) = 2.9849038214847180619397805078389
absolute error = 2.9849038214847180619397805078389
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 7.028
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.92
y[1] (analytic) = 0
y[1] (numeric) = 2.9858488499905719446219070458846
absolute error = 2.9858488499905719446219070458846
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 7.025
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.921
y[1] (analytic) = 0
y[1] (numeric) = 2.9867937018131149876123566342019
absolute error = 2.9867937018131149876123566342019
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 7.022
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1670.9MB, alloc=4.7MB, time=169.58
x[1] = 3.922
y[1] (analytic) = 0
y[1] (numeric) = 2.9877383768134942563932745936388
absolute error = 2.9877383768134942563932745936388
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 7.019
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.923
y[1] (analytic) = 0
y[1] (numeric) = 2.9886828748534290834340539981604
absolute error = 2.9886828748534290834340539981604
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 7.016
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.924
y[1] (analytic) = 0
y[1] (numeric) = 2.9896271957952110425091126192527
absolute error = 2.9896271957952110425091126192527
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 7.013
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.925
y[1] (analytic) = 0
y[1] (numeric) = 2.9905713395017039211836029565037
absolute error = 2.9905713395017039211836029565037
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 7.01
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.926
y[1] (analytic) = 0
y[1] (numeric) = 2.9915153058363436914704179457535
absolute error = 2.9915153058363436914704179457535
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 7.007
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.927
y[1] (analytic) = 0
y[1] (numeric) = 2.992459094663138478661862468779
absolute error = 2.992459094663138478661862468779
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 7.004
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.928
y[1] (analytic) = 0
y[1] (numeric) = 2.9934027058466685283393682783812
absolute error = 2.9934027058466685283393682783812
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 7.001
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.929
y[1] (analytic) = 0
y[1] (numeric) = 2.9943461392520861715646373999617
absolute error = 2.9943461392520861715646373999617
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 6.998
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.93
y[1] (analytic) = 0
y[1] (numeric) = 2.9952893947451157882556064752259
absolute error = 2.9952893947451157882556064752259
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 6.995
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1674.7MB, alloc=4.7MB, time=169.96
x[1] = 3.931
y[1] (analytic) = 0
y[1] (numeric) = 2.9962324721920537687506318755295
absolute error = 2.9962324721920537687506318755295
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 6.992
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.932
y[1] (analytic) = 0
y[1] (numeric) = 2.9971753714597684735643027315984
absolute error = 2.9971753714597684735643027315984
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 6.989
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.933
y[1] (analytic) = 0
y[1] (numeric) = 2.9981180924157001913382963029089
absolute error = 2.9981180924157001913382963029089
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.986
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.934
y[1] (analytic) = 0
y[1] (numeric) = 2.9990606349278610949906973439127
absolute error = 2.9990606349278610949906973439127
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.983
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.935
y[1] (analytic) = 0
y[1] (numeric) = 3.0000029988648351960672103155439
absolute error = 3.0000029988648351960672103155439
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.98
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.936
y[1] (analytic) = 0
y[1] (numeric) = 3.0009451840957782972977004390529
absolute error = 3.0009451840957782972977004390529
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.977
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.937
y[1] (analytic) = 0
y[1] (numeric) = 3.0018871904904179433615066951873
absolute error = 3.0018871904904179433615066951873
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.974
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.938
y[1] (analytic) = 0
y[1] (numeric) = 3.0028290179190533698649769350835
absolute error = 3.0028290179190533698649769350835
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.971
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.939
y[1] (analytic) = 0
y[1] (numeric) = 3.0037706662525554505346822899607
absolute error = 3.0037706662525554505346822899607
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.968
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1678.5MB, alloc=4.7MB, time=170.33
x[1] = 3.94
y[1] (analytic) = 0
y[1] (numeric) = 3.0047121353623666426297750448237
absolute error = 3.0047121353623666426297750448237
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.965
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.941
y[1] (analytic) = 0
y[1] (numeric) = 3.0056534251205009305769610768923
absolute error = 3.0056534251205009305769610768923
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.962
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.942
y[1] (analytic) = 0
y[1] (numeric) = 3.0065945353995437678315648523972
absolute error = 3.0065945353995437678315648523972
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.959
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.943
y[1] (analytic) = 0
y[1] (numeric) = 3.0075354660726520169681718257193
absolute error = 3.0075354660726520169681718257193
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.956
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.944
y[1] (analytic) = 0
y[1] (numeric) = 3.0084762170135538880043398926164
absolute error = 3.0084762170135538880043398926164
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.953
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.945
y[1] (analytic) = 0
y[1] (numeric) = 3.0094167880965488749608783144858
absolute error = 3.0094167880965488749608783144858
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.95
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.946
y[1] (analytic) = 0
y[1] (numeric) = 3.0103571791965076906621992532692
absolute error = 3.0103571791965076906621992532692
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.947
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.947
y[1] (analytic) = 0
y[1] (numeric) = 3.0112973901888721997802537367263
absolute error = 3.0112973901888721997802537367263
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.945
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.948
y[1] (analytic) = 0
y[1] (numeric) = 3.0122374209496553501255705113987
absolute error = 3.0122374209496553501255705113987
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.942
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1682.3MB, alloc=4.7MB, time=170.71
x[1] = 3.949
y[1] (analytic) = 0
y[1] (numeric) = 3.0131772713554411021889228356722
absolute error = 3.0131772713554411021889228356722
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.939
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.95
y[1] (analytic) = 0
y[1] (numeric) = 3.0141169412833843569371548179326
absolute error = 3.0141169412833843569371548179326
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.936
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.951
y[1] (analytic) = 0
y[1] (numeric) = 3.0150564306112108818667054149159
absolute error = 3.0150564306112108818667054149159
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.933
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.952
y[1] (analytic) = 0
y[1] (numeric) = 3.0159957392172172353183746729911
absolute error = 3.0159957392172172353183746729911
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.931
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.953
y[1] (analytic) = 0
y[1] (numeric) = 3.0169348669802706890568832202967
absolute error = 3.0169348669802706890568832202967
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.928
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.954
y[1] (analytic) = 0
y[1] (numeric) = 3.0178738137798091491187824004008
absolute error = 3.0178738137798091491187824004008
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.925
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.955
y[1] (analytic) = 0
y[1] (numeric) = 3.018812579495841074932278778479
absolute error = 3.018812579495841074932278778479
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.923
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.956
y[1] (analytic) = 0
y[1] (numeric) = 3.0197511640089453967125430489262
absolute error = 3.0197511640089453967125430489262
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.92
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.957
y[1] (analytic) = 0
y[1] (numeric) = 3.020689567200271431136079628854
absolute error = 3.020689567200271431136079628854
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.917
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1686.1MB, alloc=4.7MB, time=171.09
x[1] = 3.958
y[1] (analytic) = 0
y[1] (numeric) = 3.0216277889515387952977394350904
absolute error = 3.0216277889515387952977394350904
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.915
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.959
y[1] (analytic) = 0
y[1] (numeric) = 3.022565829145037318953964513111
absolute error = 3.022565829145037318953964513111
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.912
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.96
y[1] (analytic) = 0
y[1] (numeric) = 3.0235036876636269550558593148169
absolute error = 3.0235036876636269550558593148169
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.909
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.961
y[1] (analytic) = 0
y[1] (numeric) = 3.0244413643907376885756895082386
absolute error = 3.0244413643907376885756895082386
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.907
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.962
y[1] (analytic) = 0
y[1] (numeric) = 3.0253788592103694436304152461246
absolute error = 3.0253788592103694436304152461246
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.904
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.963
y[1] (analytic) = 0
y[1] (numeric) = 3.0263161720070919889058718219735
absolute error = 3.0263161720070919889058718219735
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.902
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.964
y[1] (analytic) = 0
y[1] (numeric) = 3.0272533026660448413852166014185
absolute error = 3.0272533026660448413852166014185
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.899
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.965
y[1] (analytic) = 0
y[1] (numeric) = 3.028190251072937168385267033992
absolute error = 3.028190251072937168385267033992
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.897
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.966
y[1] (analytic) = 0
y[1] (numeric) = 3.0291270171140476879043604252063
absolute error = 3.0291270171140476879043604252063
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.894
TOP MAIN SOLVE Loop
memory used=1689.9MB, alloc=4.7MB, time=171.47
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.967
y[1] (analytic) = 0
y[1] (numeric) = 3.0300636006762245672853719816076
absolute error = 3.0300636006762245672853719816076
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.892
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.968
y[1] (analytic) = 0
y[1] (numeric) = 3.0310000016468853201975334320167
absolute error = 3.0310000016468853201975334320167
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.889
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.969
y[1] (analytic) = 0
y[1] (numeric) = 3.031936219914016701940700276584
absolute error = 3.031936219914016701940700276584
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.887
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.97
y[1] (analytic) = 0
y[1] (numeric) = 3.0328722553661746030757214215825
absolute error = 3.0328722553661746030757214215825
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.885
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.971
y[1] (analytic) = 0
y[1] (numeric) = 3.0338081078924839413845706220647
absolute error = 3.0338081078924839413845706220647
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.882
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.972
y[1] (analytic) = 0
y[1] (numeric) = 3.0347437773826385521639047766418
absolute error = 3.0347437773826385521639047766418
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.88
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.973
y[1] (analytic) = 0
y[1] (numeric) = 3.03567926372690107685571969873
absolute error = 3.03567926372690107685571969873
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.878
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.974
y[1] (analytic) = 0
y[1] (numeric) = 3.0366145668161028500187795266791
absolute error = 3.0366145668161028500187795266791
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.875
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.975
y[1] (analytic) = 0
y[1] (numeric) = 3.0375496865416437846445014312728
absolute error = 3.0375496865416437846445014312728
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.873
memory used=1693.7MB, alloc=4.7MB, time=171.84
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.976
y[1] (analytic) = 0
y[1] (numeric) = 3.0384846227954922558209827331988
absolute error = 3.0384846227954922558209827331988
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.871
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.977
y[1] (analytic) = 0
y[1] (numeric) = 3.0394193754701849827488629552567
absolute error = 3.0394193754701849827488629552567
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.869
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.978
y[1] (analytic) = 0
y[1] (numeric) = 3.0403539444588269091127187043266
absolute error = 3.0403539444588269091127187043266
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.867
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.979
y[1] (analytic) = 0
y[1] (numeric) = 3.0412883296550910818116946064945
absolute error = 3.0412883296550910818116946064945
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.864
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.98
y[1] (analytic) = 0
y[1] (numeric) = 3.0422225309532185280530788052452
absolute error = 3.0422225309532185280530788052452
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.862
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.981
y[1] (analytic) = 0
y[1] (numeric) = 3.0431565482480181308125367773224
absolute error = 3.0431565482480181308125367773224
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.86
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.982
y[1] (analytic) = 0
y[1] (numeric) = 3.0440903814348665026647224237433
absolute error = 3.0440903814348665026647224237433
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.858
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.983
y[1] (analytic) = 0
y[1] (numeric) = 3.045024030409707857987990554579
absolute error = 3.045024030409707857987990554579
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.856
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1697.6MB, alloc=4.7MB, time=172.22
x[1] = 3.984
y[1] (analytic) = 0
y[1] (numeric) = 3.045957495069053883546940005492
absolute error = 3.045957495069053883546940005492
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.854
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.985
y[1] (analytic) = 0
y[1] (numeric) = 3.0468907753099836074565217016977
absolute error = 3.0468907753099836074565217016977
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.852
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.986
y[1] (analytic) = 0
y[1] (numeric) = 3.0478238710301432665314510210156
absolute error = 3.0478238710301432665314510210156
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.85
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.987
y[1] (analytic) = 0
y[1] (numeric) = 3.0487567821277461720246688020265
absolute error = 3.0487567821277461720246688020265
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.848
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.988
y[1] (analytic) = 0
y[1] (numeric) = 3.0496895085015725737586002960933
absolute error = 3.0496895085015725737586002960933
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.846
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.989
y[1] (analytic) = 0
y[1] (numeric) = 3.0506220500509695226529662731594
absolute error = 3.0506220500509695226529662731594
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.845
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.99
y[1] (analytic) = 0
y[1] (numeric) = 3.0515544066758507316529053608507
absolute error = 3.0515544066758507316529053608507
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.843
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.991
y[1] (analytic) = 0
y[1] (numeric) = 3.0524865782766964350611715245015
absolute error = 3.0524865782766964350611715245015
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.841
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.992
y[1] (analytic) = 0
y[1] (numeric) = 3.0534185647545532462781753823392
absolute error = 3.0534185647545532462781753823392
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.839
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1701.4MB, alloc=4.7MB, time=172.60
x[1] = 3.993
y[1] (analytic) = 0
y[1] (numeric) = 3.0543503660110340139536427952317
absolute error = 3.0543503660110340139536427952317
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.837
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.994
y[1] (analytic) = 0
y[1] (numeric) = 3.0552819819483176765536688741545
absolute error = 3.0552819819483176765536688741545
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.01
Order of pole = 6.836
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.995
y[1] (analytic) = 0
y[1] (numeric) = 3.0562134124691491153469502109161
absolute error = 3.0562134124691491153469502109161
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.834
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.996
y[1] (analytic) = 0
y[1] (numeric) = 3.0571446574768390058139827587148
absolute error = 3.0571446574768390058139827587148
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.832
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.997
y[1] (analytic) = 0
y[1] (numeric) = 3.0580757168752636674830173688326
absolute error = 3.0580757168752636674830173688326
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.831
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.998
y[1] (analytic) = 0
y[1] (numeric) = 3.0590065905688649121965695282343
absolute error = 3.0590065905688649121965695282343
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.829
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 3.999
y[1] (analytic) = 0
y[1] (numeric) = 3.0599372784626498908122843400693
absolute error = 3.0599372784626498908122843400693
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.828
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4
y[1] (analytic) = 0
y[1] (numeric) = 3.0608677804621909383419622451084
absolute error = 3.0608677804621909383419622451084
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.826
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.001
y[1] (analytic) = 0
y[1] (numeric) = 3.0617980964736254175325553970271
absolute error = 3.0617980964736254175325553970271
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.825
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1705.2MB, alloc=4.7MB, time=172.97
x[1] = 4.002
y[1] (analytic) = 0
y[1] (numeric) = 3.0627282264036555608929489782023
absolute error = 3.0627282264036555608929489782023
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.823
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.003
y[1] (analytic) = 0
y[1] (numeric) = 3.0636581701595483111703460753697
absolute error = 3.0636581701595483111703460753697
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.822
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.004
y[1] (analytic) = 0
y[1] (numeric) = 3.0645879276491351602800790261236
absolute error = 3.0645879276491351602800790261236
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.82
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.005
y[1] (analytic) = 0
y[1] (numeric) = 3.0655174987808119866926743978754
absolute error = 3.0655174987808119866926743978754
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.819
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.006
y[1] (analytic) = 0
y[1] (numeric) = 3.066446883463538891282002970557
absolute error = 3.066446883463538891282002970557
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.818
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.007
y[1] (analytic) = 0
y[1] (numeric) = 3.0673760816068400316383502631064
absolute error = 3.0673760816068400316383502631064
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.011
Order of pole = 6.816
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.008
y[1] (analytic) = 0
y[1] (numeric) = 3.0683050931208034548502472716387
absolute error = 3.0683050931208034548502472716387
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.815
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.009
y[1] (analytic) = 0
y[1] (numeric) = 3.0692339179160809287589051742328
absolute error = 3.0692339179160809287589051742328
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.814
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.01
y[1] (analytic) = 0
y[1] (numeric) = 3.0701625559038877716891018034942
absolute error = 3.0701625559038877716891018034942
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.812
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1709.0MB, alloc=4.7MB, time=173.35
x[1] = 4.011
y[1] (analytic) = 0
y[1] (numeric) = 3.0710910069960026806603716935231
absolute error = 3.0710910069960026806603716935231
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.811
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.012
y[1] (analytic) = 0
y[1] (numeric) = 3.0720192711047675580823554726755
absolute error = 3.0720192711047675580823554726755
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.81
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.013
y[1] (analytic) = 0
y[1] (numeric) = 3.0729473481430873369381682975888
absolute error = 3.0729473481430873369381682975888
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.809
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.014
y[1] (analytic) = 0
y[1] (numeric) = 3.0738752380244298044596509073993
absolute error = 3.0738752380244298044596509073993
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.808
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.015
y[1] (analytic) = 0
y[1] (numeric) = 3.0748029406628254242983707199511
absolute error = 3.0748029406628254242983707199511
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.807
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.016
y[1] (analytic) = 0
y[1] (numeric) = 3.0757304559728671571962441941235
absolute error = 3.0757304559728671571962441941235
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.012
Order of pole = 6.806
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.017
y[1] (analytic) = 0
y[1] (numeric) = 3.076657783869710280159655444239
absolute error = 3.076657783869710280159655444239
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 6.805
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.018
y[1] (analytic) = 0
y[1] (numeric) = 3.0775849242690722041409498138931
absolute error = 3.0775849242690722041409498138931
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 6.804
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.019
y[1] (analytic) = 0
y[1] (numeric) = 3.0785118770872322902311847975226
absolute error = 3.0785118770872322902311847975226
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 6.803
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1712.8MB, alloc=4.7MB, time=173.72
x[1] = 4.02
y[1] (analytic) = 0
y[1] (numeric) = 3.0794386422410316643680243386408
absolute error = 3.0794386422410316643680243386408
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 6.802
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.021
y[1] (analytic) = 0
y[1] (numeric) = 3.0803652196478730305626661339659
absolute error = 3.0803652196478730305626661339659
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 6.801
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.022
y[1] (analytic) = 0
y[1] (numeric) = 3.081291609225720482649695132698
absolute error = 3.081291609225720482649695132698
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 6.8
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.023
y[1] (analytic) = 0
y[1] (numeric) = 3.0822178108930993145637599400064
absolute error = 3.0822178108930993145637599400064
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.013
Order of pole = 6.799
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.024
y[1] (analytic) = 0
y[1] (numeric) = 3.0831438245690958291469723134197
absolute error = 3.0831438245690958291469723134197
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 6.799
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.025
y[1] (analytic) = 0
y[1] (numeric) = 3.0840696501733571454909333803175
absolute error = 3.0840696501733571454909333803175
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 6.798
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.026
y[1] (analytic) = 0
y[1] (numeric) = 3.0849952876260910048172936041458
absolute error = 3.0849952876260910048172936041458
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 6.797
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.027
y[1] (analytic) = 0
y[1] (numeric) = 3.0859207368480655749007568863723
absolute error = 3.0859207368480655749007568863723
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 6.796
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.028
y[1] (analytic) = 0
y[1] (numeric) = 3.08684599776060925303844251061
absolute error = 3.08684599776060925303844251061
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 6.796
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1716.6MB, alloc=4.7MB, time=174.10
x[1] = 4.029
y[1] (analytic) = 0
y[1] (numeric) = 3.0877710702856104675695219148157
absolute error = 3.0877710702856104675695219148157
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.014
Order of pole = 6.795
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.03
y[1] (analytic) = 0
y[1] (numeric) = 3.088695954345517477949050517064
absolute error = 3.088695954345517477949050517064
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 6.795
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.031
y[1] (analytic) = 0
y[1] (numeric) = 3.0896206498633381733799180201583
absolute error = 3.0896206498633381733799180201583
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 6.794
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.032
y[1] (analytic) = 0
y[1] (numeric) = 3.0905451567626398700068437803191
absolute error = 3.0905451567626398700068437803191
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 6.793
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.033
y[1] (analytic) = 0
y[1] (numeric) = 3.0914694749675491066763469454316
absolute error = 3.0914694749675491066763469454316
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 6.793
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.034
y[1] (analytic) = 0
y[1] (numeric) = 3.0923936044027514392666241488987
absolute error = 3.0923936044027514392666241488987
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.015
Order of pole = 6.792
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.035
y[1] (analytic) = 0
y[1] (numeric) = 3.0933175449934912335912705860774
absolute error = 3.0933175449934912335912705860774
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 6.792
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.036
y[1] (analytic) = 0
y[1] (numeric) = 3.0942412966655714568807833016284
absolute error = 3.0942412966655714568807833016284
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 6.792
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.037
y[1] (analytic) = 0
y[1] (numeric) = 3.0951648593453534678457884779365
absolute error = 3.0951648593453534678457884779365
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 6.791
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1720.4MB, alloc=4.7MB, time=174.47
x[1] = 4.038
y[1] (analytic) = 0
y[1] (numeric) = 3.0960882329597568053259374371102
absolute error = 3.0960882329597568053259374371102
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 6.791
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.039
y[1] (analytic) = 0
y[1] (numeric) = 3.0970114174362589755284189520021
absolute error = 3.0970114174362589755284189520021
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.016
Order of pole = 6.79
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.04
y[1] (analytic) = 0
y[1] (numeric) = 3.0979344127028952378600383052516
absolute error = 3.0979344127028952378600383052516
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 6.79
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.041
y[1] (analytic) = 0
y[1] (numeric) = 3.0988572186882583893568163396034
absolute error = 3.0988572186882583893568163396034
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 6.79
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.042
y[1] (analytic) = 0
y[1] (numeric) = 3.0997798353214985477150645077401
absolute error = 3.0997798353214985477150645077401
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 6.79
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.043
y[1] (analytic) = 0
y[1] (numeric) = 3.1007022625323229329278946556519
absolute error = 3.1007022625323229329278946556519
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.017
Order of pole = 6.789
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.044
y[1] (analytic) = 0
y[1] (numeric) = 3.1016245002509956475311249601947
absolute error = 3.1016245002509956475311249601947
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 6.789
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.045
y[1] (analytic) = 0
y[1] (numeric) = 3.1025465484083374554625460890242
absolute error = 3.1025465484083374554625460890242
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 6.789
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.046
y[1] (analytic) = 0
y[1] (numeric) = 3.1034684069357255595385142595839
absolute error = 3.1034684069357255595385142595839
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 6.789
memory used=1724.3MB, alloc=4.7MB, time=174.85
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.047
y[1] (analytic) = 0
y[1] (numeric) = 3.1043900757650933775518404433356
absolute error = 3.1043900757650933775518404433356
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 6.789
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.048
y[1] (analytic) = 0
y[1] (numeric) = 3.1053115548289303169949474919975
absolute error = 3.1053115548289303169949474919975
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.018
Order of pole = 6.789
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.049
y[1] (analytic) = 0
y[1] (numeric) = 3.1062328440602815484122694542622
absolute error = 3.1062328440602815484122694542622
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 6.789
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.05
y[1] (analytic) = 0
y[1] (numeric) = 3.1071539433927477773858698043561
absolute error = 3.1071539433927477773858698043561
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 6.788
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.051
y[1] (analytic) = 0
y[1] (numeric) = 3.108074852760485015158257717934
absolute error = 3.108074852760485015158257717934
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 6.788
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.052
y[1] (analytic) = 0
y[1] (numeric) = 3.1089955720982043478963839062315
absolute error = 3.1089955720982043478963839062315
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.019
Order of pole = 6.788
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.053
y[1] (analytic) = 0
y[1] (numeric) = 3.1099161013411717046007998561861
absolute error = 3.1099161013411717046007998561861
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 6.788
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.054
y[1] (analytic) = 0
y[1] (numeric) = 3.1108364404252076236639666224373
absolute error = 3.1108364404252076236639666224373
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 6.789
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1728.1MB, alloc=4.7MB, time=175.22
x[1] = 4.055
y[1] (analytic) = 0
y[1] (numeric) = 3.1117565892866870180817015767926
absolute error = 3.1117565892866870180817015767926
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 6.789
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.056
y[1] (analytic) = 0
y[1] (numeric) = 3.1126765478625389393217537419524
absolute error = 3.1126765478625389393217537419524
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.02
Order of pole = 6.789
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.057
y[1] (analytic) = 0
y[1] (numeric) = 3.1135963160902463398535005190851
absolute error = 3.1135963160902463398535005190851
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.021
Order of pole = 6.789
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.058
y[1] (analytic) = 0
y[1] (numeric) = 3.1145158939078458343427607632924
absolute error = 3.1145158939078458343427607632924
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.021
Order of pole = 6.789
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.059
y[1] (analytic) = 0
y[1] (numeric) = 3.1154352812539274595157212671659
absolute error = 3.1154352812539274595157212671659
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.021
Order of pole = 6.789
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.06
y[1] (analytic) = 0
y[1] (numeric) = 3.116354478067634432695975780566
absolute error = 3.116354478067634432695975780566
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.022
Order of pole = 6.789
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.061
y[1] (analytic) = 0
y[1] (numeric) = 3.1172734842886629090186777245163
absolute error = 3.1172734842886629090186777245163
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.022
Order of pole = 6.789
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.062
y[1] (analytic) = 0
y[1] (numeric) = 3.118192299857261737325809748763
absolute error = 3.118192299857261737325809748763
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.022
Order of pole = 6.79
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.063
y[1] (analytic) = 0
y[1] (numeric) = 3.1191109247142322147465752361545
absolute error = 3.1191109247142322147465752361545
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.022
Order of pole = 6.79
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1731.9MB, alloc=4.7MB, time=175.60
x[1] = 4.064
y[1] (analytic) = 0
y[1] (numeric) = 3.1200293588009278399669187726223
absolute error = 3.1200293588009278399669187726223
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.023
Order of pole = 6.79
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.065
y[1] (analytic) = 0
y[1] (numeric) = 3.120947602059254065192184479242
absolute error = 3.120947602059254065192184479242
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.023
Order of pole = 6.791
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.066
y[1] (analytic) = 0
y[1] (numeric) = 3.1218656544316680468069229426951
absolute error = 3.1218656544316680468069229426951
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.023
Order of pole = 6.791
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.067
y[1] (analytic) = 0
y[1] (numeric) = 3.1227835158611783947358592824895
absolute error = 3.1227835158611783947358592824895
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.023
Order of pole = 6.791
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.068
y[1] (analytic) = 0
y[1] (numeric) = 3.1237011862913449205100366576049
absolute error = 3.1237011862913449205100366576049
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.024
Order of pole = 6.791
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.069
y[1] (analytic) = 0
y[1] (numeric) = 3.1246186656662783840421512418593
absolute error = 3.1246186656662783840421512418593
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.024
Order of pole = 6.792
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.07
y[1] (analytic) = 0
y[1] (numeric) = 3.1255359539306402391150963863166
absolute error = 3.1255359539306402391150963863166
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.024
Order of pole = 6.792
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.071
y[1] (analytic) = 0
y[1] (numeric) = 3.126453051029642377587735338533
absolute error = 3.126453051029642377587735338533
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.025
Order of pole = 6.793
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.072
y[1] (analytic) = 0
y[1] (numeric) = 3.127369956909046872321923502436
absolute error = 3.127369956909046872321923502436
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.025
Order of pole = 6.793
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1735.7MB, alloc=4.7MB, time=175.97
x[1] = 4.073
y[1] (analytic) = 0
y[1] (numeric) = 3.1282866715151657188348027992085
absolute error = 3.1282866715151657188348027992085
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.025
Order of pole = 6.793
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.074
y[1] (analytic) = 0
y[1] (numeric) = 3.1292031947948605756803922287772
absolute error = 3.1292031947948605756803922287772
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.026
Order of pole = 6.794
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.075
y[1] (analytic) = 0
y[1] (numeric) = 3.1301195266955425035645002334444
absolute error = 3.1301195266955425035645002334444
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.026
Order of pole = 6.794
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.076
y[1] (analytic) = 0
y[1] (numeric) = 3.1310356671651717031969859299178
absolute error = 3.1310356671651717031969859299178
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.026
Order of pole = 6.795
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.077
y[1] (analytic) = 0
y[1] (numeric) = 3.1319516161522572518853977035547
absolute error = 3.1319516161522572518853977035547
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.026
Order of pole = 6.795
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.078
y[1] (analytic) = 0
y[1] (numeric) = 3.1328673736058568388740190491048
absolute error = 3.1328673736058568388740190491048
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.027
Order of pole = 6.796
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.079
y[1] (analytic) = 0
y[1] (numeric) = 3.1337829394755764994323528956826
absolute error = 3.1337829394755764994323528956826
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.027
Order of pole = 6.796
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.08
y[1] (analytic) = 0
y[1] (numeric) = 3.1346983137115703476970769701855
absolute error = 3.1346983137115703476970769701855
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.027
Order of pole = 6.797
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.081
y[1] (analytic) = 0
y[1] (numeric) = 3.1356134962645403082715040329696
absolute error = 3.1356134962645403082715040329696
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.028
Order of pole = 6.797
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1739.5MB, alloc=4.7MB, time=176.34
x[1] = 4.082
y[1] (analytic) = 0
y[1] (numeric) = 3.1365284870857358465865820623665
absolute error = 3.1365284870857358465865820623665
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.028
Order of pole = 6.798
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.083
y[1] (analytic) = 0
y[1] (numeric) = 3.1374432861269536980274706706377
absolute error = 3.1374432861269536980274706706377
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.028
Order of pole = 6.798
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.084
y[1] (analytic) = 0
y[1] (numeric) = 3.1383578933405375958297312032883
absolute error = 3.1383578933405375958297312032883
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.029
Order of pole = 6.799
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.085
y[1] (analytic) = 0
y[1] (numeric) = 3.1392723086793779977491691063639
absolute error = 3.1392723086793779977491691063639
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.029
Order of pole = 6.8
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.086
y[1] (analytic) = 0
y[1] (numeric) = 3.1401865320969118115093682425062
absolute error = 3.1401865320969118115093682425062
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.029
Order of pole = 6.8
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.087
y[1] (analytic) = 0
y[1] (numeric) = 3.1411005635471221190309578962051
absolute error = 3.1411005635471221190309578962051
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.03
Order of pole = 6.801
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.088
y[1] (analytic) = 0
y[1] (numeric) = 3.1420144029845378994466542319368
absolute error = 3.1420144029845378994466542319368
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.03
Order of pole = 6.801
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.089
y[1] (analytic) = 0
y[1] (numeric) = 3.1429280503642337509061189557778
absolute error = 3.1429280503642337509061189557778
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.03
Order of pole = 6.802
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.09
y[1] (analytic) = 0
y[1] (numeric) = 3.1438415056418296111746788817091
absolute error = 3.1438415056418296111746788817091
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.031
Order of pole = 6.803
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1743.3MB, alloc=4.7MB, time=176.73
x[1] = 4.091
y[1] (analytic) = 0
y[1] (numeric) = 3.1447547687734904770299510182424
absolute error = 3.1447547687734904770299510182424
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.031
Order of pole = 6.803
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.092
y[1] (analytic) = 0
y[1] (numeric) = 3.1456678397159261224604186692772
absolute error = 3.1456678397159261224604186692772
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.031
Order of pole = 6.804
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.093
y[1] (analytic) = 0
y[1] (numeric) = 3.1465807184263908156700048853074
absolute error = 3.1465807184263908156700048853074
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.032
Order of pole = 6.805
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.094
y[1] (analytic) = 0
y[1] (numeric) = 3.1474934048626830348926904073108
absolute error = 3.1474934048626830348926904073108
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.032
Order of pole = 6.805
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.095
y[1] (analytic) = 0
y[1] (numeric) = 3.1484058989831451830212240159376
absolute error = 3.1484058989831451830212240159376
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.032
Order of pole = 6.806
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.096
y[1] (analytic) = 0
y[1] (numeric) = 3.1493182007466633010539739330466
absolute error = 3.1493182007466633010539739330466
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.032
Order of pole = 6.806
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.097
y[1] (analytic) = 0
y[1] (numeric) = 3.1502303101126667803639696212804
absolute error = 3.1502303101126667803639696212804
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.033
Order of pole = 6.807
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.098
y[1] (analytic) = 0
y[1] (numeric) = 3.1511422270411280737941839903044
absolute error = 3.1511422270411280737941839903044
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.033
Order of pole = 6.808
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.099
y[1] (analytic) = 0
y[1] (numeric) = 3.1520539514925624055831066456246
absolute error = 3.1520539514925624055831066456246
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.033
Order of pole = 6.808
memory used=1747.1MB, alloc=4.7MB, time=177.11
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.1
y[1] (analytic) = 0
y[1] (numeric) = 3.1529654834280274801246594076187
absolute error = 3.1529654834280274801246594076187
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.034
Order of pole = 6.809
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.101
y[1] (analytic) = 0
y[1] (numeric) = 3.1538768228091231895665058846414
absolute error = 3.1538768228091231895665058846414
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.034
Order of pole = 6.81
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.102
y[1] (analytic) = 0
y[1] (numeric) = 3.154787969597991320250807404861
absolute error = 3.154787969597991320250807404861
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.034
Order of pole = 6.81
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.103
y[1] (analytic) = 0
y[1] (numeric) = 3.1556989237573152580014780969341
absolute error = 3.1556989237573152580014780969341
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.035
Order of pole = 6.811
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.104
y[1] (analytic) = 0
y[1] (numeric) = 3.1566096852503196922619923597929
absolute error = 3.1566096852503196922619923597929
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.035
Order of pole = 6.812
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.105
y[1] (analytic) = 0
y[1] (numeric) = 3.157520254040770319087798376782
absolute error = 3.157520254040770319087798376782
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.035
Order of pole = 6.812
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.106
y[1] (analytic) = 0
y[1] (numeric) = 3.1584306300929735429973917092137
absolute error = 3.1584306300929735429973917092137
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.036
Order of pole = 6.813
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.107
y[1] (analytic) = 0
y[1] (numeric) = 3.1593408133717761776861033491835
absolute error = 3.1593408133717761776861033491835
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.036
Order of pole = 6.814
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.108
y[1] (analytic) = 0
y[1] (numeric) = 3.1602508038425651456066569212758
absolute error = 3.1602508038425651456066569212758
relative error = -1 %
memory used=1751.0MB, alloc=4.7MB, time=177.48
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.036
Order of pole = 6.814
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.109
y[1] (analytic) = 0
y[1] (numeric) = 3.1611606014712671764205499976696
absolute error = 3.1611606014712671764205499976696
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.037
Order of pole = 6.815
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.11
y[1] (analytic) = 0
y[1] (numeric) = 3.1620702062243485043243147311968
absolute error = 3.1620702062243485043243147311968
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.037
Order of pole = 6.815
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.111
y[1] (analytic) = 0
y[1] (numeric) = 3.1629796180688145642547132161902
absolute error = 3.1629796180688145642547132161902
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.037
Order of pole = 6.816
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.112
y[1] (analytic) = 0
y[1] (numeric) = 3.1638888369722096869769231575543
absolute error = 3.1638888369722096869769231575543
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.038
Order of pole = 6.817
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.113
y[1] (analytic) = 0
y[1] (numeric) = 3.1647978629026167930597695644812
absolute error = 3.1647978629026167930597695644812
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.038
Order of pole = 6.817
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.114
y[1] (analytic) = 0
y[1] (numeric) = 3.1657066958286570857420582866853
absolute error = 3.1657066958286570857420582866853
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.038
Order of pole = 6.818
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.115
y[1] (analytic) = 0
y[1] (numeric) = 3.1666153357194897426940672780244
absolute error = 3.1666153357194897426940672780244
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.039
Order of pole = 6.818
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.116
y[1] (analytic) = 0
y[1] (numeric) = 3.1675237825448116066782515049863
absolute error = 3.1675237825448116066782515049863
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.039
Order of pole = 6.819
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1754.8MB, alloc=4.7MB, time=177.85
x[1] = 4.117
y[1] (analytic) = 0
y[1] (numeric) = 3.1684320362748568751132174158212
absolute error = 3.1684320362748568751132174158212
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.039
Order of pole = 6.82
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.118
y[1] (analytic) = 0
y[1] (numeric) = 3.169340096880396788545022850177
absolute error = 3.169340096880396788545022850177
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.04
Order of pole = 6.82
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.119
y[1] (analytic) = 0
y[1] (numeric) = 3.1702479643327393180298581990104
absolute error = 3.1702479643327393180298581990104
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.04
Order of pole = 6.821
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.12
y[1] (analytic) = 0
y[1] (numeric) = 3.1711556386037288514321645203906
absolute error = 3.1711556386037288514321645203906
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.04
Order of pole = 6.821
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.121
y[1] (analytic) = 0
y[1] (numeric) = 3.1720631196657458786422441786555
absolute error = 3.1720631196657458786422441786555
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.041
Order of pole = 6.822
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.122
y[1] (analytic) = 0
y[1] (numeric) = 3.1729704074917066757174194022984
absolute error = 3.1729704074917066757174194022984
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.041
Order of pole = 6.822
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.123
y[1] (analytic) = 0
y[1] (numeric) = 3.1738775020550629879507939500396
absolute error = 3.1738775020550629879507939500396
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.041
Order of pole = 6.823
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.124
y[1] (analytic) = 0
y[1] (numeric) = 3.1747844033298017118716728348441
absolute error = 3.1747844033298017118716728348441
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.042
Order of pole = 6.823
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.125
y[1] (analytic) = 0
y[1] (numeric) = 3.1756911112904445761816947822647
absolute error = 3.1756911112904445761816947822647
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.042
Order of pole = 6.824
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1758.6MB, alloc=4.7MB, time=178.23
x[1] = 4.126
y[1] (analytic) = 0
y[1] (numeric) = 3.1765976259120478216307317924979
absolute error = 3.1765976259120478216307317924979
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.042
Order of pole = 6.824
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.127
y[1] (analytic) = 0
y[1] (numeric) = 3.177503947170201879836609835013
absolute error = 3.177503947170201879836609835013
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.042
Order of pole = 6.825
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.128
y[1] (analytic) = 0
y[1] (numeric) = 3.1784100750410310510527043306367
absolute error = 3.1784100750410310510527043306367
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.043
Order of pole = 6.825
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.129
y[1] (analytic) = 0
y[1] (numeric) = 3.179316009501193180887463668619
absolute error = 3.179316009501193180887463668619
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.043
Order of pole = 6.825
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.13
y[1] (analytic) = 0
y[1] (numeric) = 3.1802217505278793359799135655564
absolute error = 3.1802217505278793359799135655564
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.043
Order of pole = 6.826
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.131
y[1] (analytic) = 0
y[1] (numeric) = 3.1811272980988134786351945991797
absolute error = 3.1811272980988134786351945991797
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.044
Order of pole = 6.826
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.132
y[1] (analytic) = 0
y[1] (numeric) = 3.1820326521922521404241847430068
absolute error = 3.1820326521922521404241847430068
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.044
Order of pole = 6.826
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.133
y[1] (analytic) = 0
y[1] (numeric) = 3.1829378127869840947512581877999
absolute error = 3.1829378127869840947512581877999
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.044
Order of pole = 6.827
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.134
y[1] (analytic) = 0
y[1] (numeric) = 3.1838427798623300283942311627222
absolute error = 3.1838427798623300283942311627222
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.045
Order of pole = 6.827
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1762.4MB, alloc=4.7MB, time=178.60
x[1] = 4.135
y[1] (analytic) = 0
y[1] (numeric) = 3.1847475533981422120205448631505
absolute error = 3.1847475533981422120205448631505
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.045
Order of pole = 6.827
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.136
y[1] (analytic) = 0
y[1] (numeric) = 3.1856521333748041696837349533433
absolute error = 3.1856521333748041696837349533433
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.045
Order of pole = 6.827
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.137
y[1] (analytic) = 0
y[1] (numeric) = 3.1865565197732303473042364406678
absolute error = 3.1865565197732303473042364406678
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.045
Order of pole = 6.828
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.138
y[1] (analytic) = 0
y[1] (numeric) = 3.1874607125748657801385720139389
absolute error = 3.1874607125748657801385720139389
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.046
Order of pole = 6.828
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.139
y[1] (analytic) = 0
y[1] (numeric) = 3.1883647117616857592409712016956
absolute error = 3.1883647117616857592409712016956
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.046
Order of pole = 6.828
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.14
y[1] (analytic) = 0
y[1] (numeric) = 3.1892685173161954969214669370173
absolute error = 3.1892685173161954969214669370173
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.046
Order of pole = 6.828
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.141
y[1] (analytic) = 0
y[1] (numeric) = 3.1901721292214297912045153138485
absolute error = 3.1901721292214297912045153138485
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.047
Order of pole = 6.828
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.142
y[1] (analytic) = 0
y[1] (numeric) = 3.1910755474609526892921834858299
absolute error = 3.1910755474609526892921834858299
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.047
Order of pole = 6.828
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.143
y[1] (analytic) = 0
y[1] (numeric) = 3.1919787720188571500359497924182
absolute error = 3.1919787720188571500359497924182
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.047
Order of pole = 6.828
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1766.2MB, alloc=4.7MB, time=178.97
x[1] = 4.144
y[1] (analytic) = 0
y[1] (numeric) = 3.1928818028797647054211592986866
absolute error = 3.1928818028797647054211592986866
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.047
Order of pole = 6.828
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.145
y[1] (analytic) = 0
y[1] (numeric) = 3.1937846400288251210681770047258
absolute error = 3.1937846400288251210681770047258
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.048
Order of pole = 6.828
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.146
y[1] (analytic) = 0
y[1] (numeric) = 3.1946872834517160557542800180848
absolute error = 3.1946872834517160557542800180848
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.048
Order of pole = 6.828
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.147
y[1] (analytic) = 0
y[1] (numeric) = 3.1955897331346427199603289882897
absolute error = 3.1955897331346427199603289882897
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.048
Order of pole = 6.828
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.148
y[1] (analytic) = 0
y[1] (numeric) = 3.1964919890643375334462580762372
absolute error = 3.1964919890643375334462580762372
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.048
Order of pole = 6.828
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.149
y[1] (analytic) = 0
y[1] (numeric) = 3.1973940512280597818594216732603
absolute error = 3.1973940512280597818594216732603
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.049
Order of pole = 6.828
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.15
y[1] (analytic) = 0
y[1] (numeric) = 3.1982959196135952723798349949902
absolute error = 3.1982959196135952723798349949902
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.049
Order of pole = 6.828
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.151
y[1] (analytic) = 0
y[1] (numeric) = 3.1991975942092559884063445538746
absolute error = 3.1991975942092559884063445538746
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.049
Order of pole = 6.827
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.152
y[1] (analytic) = 0
y[1] (numeric) = 3.2000990750038797432877633614378
absolute error = 3.2000990750038797432877633614378
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.049
Order of pole = 6.827
TOP MAIN SOLVE Loop
memory used=1770.0MB, alloc=4.7MB, time=179.35
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.153
y[1] (analytic) = 0
y[1] (numeric) = 3.2010003619868298331030045271716
absolute error = 3.2010003619868298331030045271716
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.05
Order of pole = 6.827
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.154
y[1] (analytic) = 0
y[1] (numeric) = 3.2019014551479946884942457054056
absolute error = 3.2019014551479946884942457054056
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.05
Order of pole = 6.827
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.155
y[1] (analytic) = 0
y[1] (numeric) = 3.2028023544777875255571555947085
absolute error = 3.2028023544777875255571555947085
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.05
Order of pole = 6.826
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.156
y[1] (analytic) = 0
y[1] (numeric) = 3.2037030599671459957922124164018
absolute error = 3.2037030599671459957922124164018
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.05
Order of pole = 6.826
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.157
y[1] (analytic) = 0
y[1] (numeric) = 3.2046035716075318351211429897053
absolute error = 3.2046035716075318351211429897053
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.05
Order of pole = 6.825
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.158
y[1] (analytic) = 0
y[1] (numeric) = 3.2055038893909305119725096809673
absolute error = 3.2055038893909305119725096809673
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.051
Order of pole = 6.825
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.159
y[1] (analytic) = 0
y[1] (numeric) = 3.2064040133098508744404711334462
absolute error = 3.2064040133098508744404711334462
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.051
Order of pole = 6.824
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.16
y[1] (analytic) = 0
y[1] (numeric) = 3.2073039433573247965207412822831
absolute error = 3.2073039433573247965207412822831
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.051
Order of pole = 6.824
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.161
y[1] (analytic) = 0
y[1] (numeric) = 3.2082036795269068234277697267294
absolute error = 3.2082036795269068234277697267294
relative error = -1 %
Correct digits = -1
h = 0.001
memory used=1773.9MB, alloc=4.7MB, time=179.72
Complex estimate of poles used
Radius of convergence = 4.051
Order of pole = 6.823
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.162
y[1] (analytic) = 0
y[1] (numeric) = 3.2091032218126738159971650684484
absolute error = 3.2091032218126738159971650684484
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.051
Order of pole = 6.823
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.163
y[1] (analytic) = 0
y[1] (numeric) = 3.2100025702092245941773813308839
absolute error = 3.2100025702092245941773813308839
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.052
Order of pole = 6.822
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.164
y[1] (analytic) = 0
y[1] (numeric) = 3.2109017247116795796146860503626
absolute error = 3.2109017247116795796146860503626
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.052
Order of pole = 6.821
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.165
y[1] (analytic) = 0
y[1] (numeric) = 3.2118006853156804373354270748628
absolute error = 3.2118006853156804373354270748628
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.052
Order of pole = 6.82
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.166
y[1] (analytic) = 0
y[1] (numeric) = 3.2126994520173897165296135213172
absolute error = 3.2126994520173897165296135213172
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.052
Order of pole = 6.82
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.167
y[1] (analytic) = 0
y[1] (numeric) = 3.2135980248134904904398247270139
absolute error = 3.2135980248134904904398247270139
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.052
Order of pole = 6.819
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.168
y[1] (analytic) = 0
y[1] (numeric) = 3.2144964037011859953594593851989
absolute error = 3.2144964037011859953594593851989
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.053
Order of pole = 6.818
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.169
y[1] (analytic) = 0
y[1] (numeric) = 3.2153945886781992687443353794556
absolute error = 3.2153945886781992687443353794556
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.053
Order of pole = 6.817
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
memory used=1777.7MB, alloc=4.7MB, time=180.10
x[1] = 4.17
y[1] (analytic) = 0
y[1] (numeric) = 3.2162925797427727864416491259207
absolute error = 3.2162925797427727864416491259207
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.053
Order of pole = 6.816
TOP MAIN SOLVE Loop
WARNING: expt of linear to full series power seems to have NO accuracy - needs more work.
x[1] = 4.171
y[1] (analytic) = 0
y[1] (numeric) = 3.2171903768936680990403014969878
absolute error = 3.2171903768936680990403014969878
relative error = -1 %
Correct digits = -1
h = 0.001
Complex estimate of poles used
Radius of convergence = 4.053
Order of pole = 6.815
Finished!
Maximum Time Reached before Solution Completed!
diff ( y , x , 1 ) = expt((0.2 * x + 0.3) , sin(x));
Iterations = 4072
Total Elapsed Time = 3 Minutes 0 Seconds
Elapsed Time(since restart) = 3 Minutes 0 Seconds
Expected Time Remaining = 36 Seconds
Optimized Time Remaining = 36 Seconds
Expected Total Time = 3 Minutes 36 Seconds
Time to Timeout Unknown
Percent Done = 83.12 %
> quit
memory used=1778.3MB, alloc=4.7MB, time=180.15