|\^/| Maple 12 (IBM INTEL LINUX) ._|\| |/|_. Copyright (c) Maplesoft, a division of Waterloo Maple Inc. 2008 \ MAPLE / All rights reserved. Maple is a trademark of <____ ____> Waterloo Maple Inc. | Type ? for help. > #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_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_max_h, > glob_large_float, > glob_last_good_h, > glob_look_poles, > glob_neg_h, > glob_display_interval, > glob_next_display, > glob_dump_analytic, > 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_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, > 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_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_max_h, glob_large_float, glob_last_good_h, glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic, 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_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, 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_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_max_h, > glob_large_float, > glob_last_good_h, > glob_look_poles, > glob_neg_h, > glob_display_interval, > glob_next_display, > glob_dump_analytic, > 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_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, > 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_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_max_h, glob_large_float, glob_last_good_h, glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic, 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_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, 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_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_max_h, > glob_large_float, > glob_last_good_h, > glob_look_poles, > glob_neg_h, > glob_display_interval, > glob_next_display, > glob_dump_analytic, > 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_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, > 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_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_max_h, glob_large_float, glob_last_good_h, glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic, 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_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, 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_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_max_h, > glob_large_float, > glob_last_good_h, > glob_look_poles, > glob_neg_h, > glob_display_interval, > glob_next_display, > glob_dump_analytic, > 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_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, > 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_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_max_h, glob_large_float, glob_last_good_h, glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic, 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_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, 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_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_max_h, > glob_large_float, > glob_last_good_h, > glob_look_poles, > glob_neg_h, > glob_display_interval, > glob_next_display, > glob_dump_analytic, > 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_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, > 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_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_max_h, glob_large_float, glob_last_good_h, glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic, 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_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, 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_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_max_h, > glob_large_float, > glob_last_good_h, > glob_look_poles, > glob_neg_h, > glob_display_interval, > glob_next_display, > glob_dump_analytic, > 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_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, > 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_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_max_h, glob_large_float, glob_last_good_h, glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic, 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_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, 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_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_max_h, > glob_large_float, > glob_last_good_h, > glob_look_poles, > glob_neg_h, > glob_display_interval, > glob_next_display, > glob_dump_analytic, > 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_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, > 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,hdrc_BBB, m, n, nr1, nr2, ord_no, rad_c, rcs, rm0, rm1, rm2, rm3, rm4, found_sing, 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 * glob_small_float) or (omniabs(array_y_higher[1,m-1]) < glob_small_float * glob_small_float) or (omniabs(array_y_higher[1,m-2]) < glob_small_float * 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)*rm0-convfloat(m-1)*rm1; > if (omniabs(hdrc) > glob_small_float * glob_small_float) then # if number 2 > rcs := glob_h/hdrc; > ord_no := (rm1*convfloat((m-2)*(m-2))-rm0*convfloat(m-3))/hdrc; > 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_sing := 0; > #TOP WHICH RADII EQ = 1 > if (1 <> found_sing 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_sing := 1; > 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 for equation 1"); > fi;# end if 4; > fi;# end if 3; > fi;# end if 2; > if (1 <> found_sing 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] > -1.0 * glob_smallish_float) 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_sing := 1; > 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 for equation 1"); > fi;# end if 4; > fi;# end if 3; > fi;# end if 2; > if (1 <> found_sing 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_sing := 1; > array_type_pole[1] := 3; > if (reached_interval()) then # if number 3 > omniout_str(ALWAYS,"NO POLE for equation 1"); > fi;# end if 3; > fi;# end if 2; > if (1 <> found_sing 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] > -1.0 * glob_smallish_float))) then # if number 2 > array_poles[1,1] := array_real_pole[1,1]; > array_poles[1,2] := array_real_pole[1,2]; > found_sing := 1; > 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 for equation 1"); > fi;# end if 4; > fi;# end if 3; > fi;# end if 2; > if (1 <> found_sing 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_sing := 1; > if (glob_display_flag) then # if number 3 > if (reached_interval()) then # if number 4 > omniout_str(ALWAYS,"Complex estimate of poles used for equation 1"); > fi;# end if 4; > fi;# end if 3; > fi;# end if 2; > if (1 <> found_sing ) 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 for equation 1"); > 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, hdrc_BBB, m, n, nr1, nr2, ord_no, rad_c, rcs, rm0, rm1, rm2, rm3, rm4, found_sing, 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_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_max_h, glob_large_float, glob_last_good_h, glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic, 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_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, 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*glob_small_float or omniabs(array_y_higher[1, m - 1]) < glob_small_float*glob_small_float or omniabs(array_y_higher[1, m - 2]) < glob_small_float*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)*rm0 - convfloat(m - 1)*rm1; if glob_small_float*glob_small_float < omniabs(hdrc) then rcs := glob_h/hdrc; ord_no := ( rm1*convfloat((m - 2)*(m - 2)) - rm0*convfloat(m - 3))/hdrc ; 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_sing := 0; if 1 <> found_sing 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_sing := 1; array_type_pole[1] := 2; if glob_display_flag then if reached_interval() then omniout_str(ALWAYS, "Complex estimate of poles used for equation 1") end if end if end if; if 1 <> found_sing 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 -1.0*glob_smallish_float < 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_sing := 1; array_type_pole[1] := 1; if glob_display_flag then if reached_interval() then omniout_str(ALWAYS, "Real estimate of pole used for equation 1") end if end if end if; if 1 <> found_sing 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_sing := 1; array_type_pole[1] := 3; if reached_interval() then omniout_str(ALWAYS, "NO POLE for equation 1") end if end if; if 1 <> found_sing and array_real_pole[1, 1] < array_complex_pole[1, 1] and 0. < array_real_pole[1, 1] and -1.0*glob_smallish_float < 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_sing := 1; array_type_pole[1] := 1; if glob_display_flag then if reached_interval() then omniout_str(ALWAYS, "Real estimate of pole used for equation 1") end if end if end if; if 1 <> found_sing 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_sing := 1; if glob_display_flag then if reached_interval() then omniout_str(ALWAYS, "Complex estimate of poles used for equation 1") end if end if end if; if 1 <> found_sing 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 for equation 1") 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_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_max_h, > glob_large_float, > glob_last_good_h, > glob_look_poles, > glob_neg_h, > glob_display_interval, > glob_next_display, > glob_dump_analytic, > 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_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, > 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_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_max_h, glob_large_float, glob_last_good_h, glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic, 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_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, 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_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_max_h, > glob_large_float, > glob_last_good_h, > glob_look_poles, > glob_neg_h, > glob_display_interval, > glob_next_display, > glob_dump_analytic, > 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_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, > 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]); > #emit pre mult LINEAR - FULL $eq_no = 1 i = 1 > array_tmp4[1] := array_tmp2[1] * array_tmp3[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 mult LINEAR FULL $eq_no = 1 i = 2 > array_tmp4[2] := array_tmp3[1] * array_tmp2[2] + array_tmp3[2] * array_tmp2[1]; > #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 mult LINEAR FULL $eq_no = 1 i = 3 > array_tmp4[3] := array_tmp3[2] * array_tmp2[2] + array_tmp3[3] * array_tmp2[1]; > #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 mult LINEAR FULL $eq_no = 1 i = 4 > array_tmp4[4] := array_tmp3[3] * array_tmp2[2] + array_tmp3[4] * array_tmp2[1]; > #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 mult LINEAR FULL $eq_no = 1 i = 5 > array_tmp4[5] := array_tmp3[4] * array_tmp2[2] + array_tmp3[5] * array_tmp2[1]; > #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 mult LINEAR FULL $eq_no = 1 i = 1 > array_tmp4[kkk] := array_tmp3[kkk-1] * array_tmp2[2] + array_tmp3[kkk] * array_tmp2[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_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_max_h, glob_large_float, glob_last_good_h, glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic, 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_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, 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]); array_tmp4[1] := array_tmp2[1]*array_tmp3[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[2] := array_tmp3[1]*array_tmp2[2] + array_tmp3[2]*array_tmp2[1]; 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[3] := array_tmp3[2]*array_tmp2[2] + array_tmp3[3]*array_tmp2[1]; 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[4] := array_tmp3[3]*array_tmp2[2] + array_tmp3[4]*array_tmp2[1]; 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[5] := array_tmp3[4]*array_tmp2[2] + array_tmp3[5]*array_tmp2[1]; 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[kkk] := array_tmp3[kkk - 1]*array_tmp2[2] + array_tmp3[kkk]*array_tmp2[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_debug := proc(typ,radius,order2) > global ALWAYS,glob_display_flag, glob_large_float, array_pole; > if (typ = 1) then # if number 6 > omniout_str(ALWAYS,"Real"); > else > omniout_str(ALWAYS,"Complex"); > fi;# end if 6; > omniout_float(ALWAYS,"DBG Radius of convergence ",4, radius,4," "); > omniout_float(ALWAYS,"DBG Order of pole ",4, order2,4," "); > end; display_pole_debug := proc(typ, radius, order2) global ALWAYS, glob_display_flag, glob_large_float, array_pole; if typ = 1 then omniout_str(ALWAYS, "Real") else omniout_str(ALWAYS, "Complex") end if; omniout_float(ALWAYS, "DBG Radius of convergence ", 4, radius, 4, " "); omniout_float(ALWAYS, "DBG Order of pole ", 4, order2, 4, " ") end proc > # End Function number 15 > # Begin Function number 16 > 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 16 > # Begin Function number 17 > 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 17 > # Begin Function number 18 > 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 18 > # Begin Function number 19 > 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 19 > # Begin Function number 20 > 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 20 > # Begin Function number 21 > log_revs := proc(file,revs) > fprintf(file,revs); > end; log_revs := proc(file, revs) fprintf(file, revs) end proc > # End Function number 21 > # Begin Function number 22 > 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 22 > # Begin Function number 23 > 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 23 > # Begin Function number 24 > logstart := proc(file) > fprintf(file,""); > end; logstart := proc(file) fprintf(file, "") end proc > # End Function number 24 > # Begin Function number 25 > logend := proc(file) > fprintf(file,"\n"); > end; logend := proc(file) fprintf(file, "\n") end proc > # End Function number 25 > # Begin Function number 26 > 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 26 > # Begin Function number 27 > 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 27 > # Begin Function number 28 > 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 28 > # Begin Function number 29 > factorial_2 := proc(nnn) > nnn!; > end; factorial_2 := proc(nnn) nnn! end proc > # End Function number 29 > # Begin Function number 30 > 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 30 > # Begin Function number 31 > 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 31 > # Begin Function number 32 > convfp := proc(mmm) > (mmm); > end; convfp := proc(mmm) mmm end proc > # End Function number 32 > # Begin Function number 33 > convfloat := proc(mmm) > (mmm); > end; convfloat := proc(mmm) mmm end proc > # End Function number 33 > # Begin Function number 34 > elapsed_time_seconds := proc() > time(); > end; elapsed_time_seconds := proc() time() end proc > # End Function number 34 > # Begin Function number 35 > omniabs := proc(x) > abs(x); > end; omniabs := proc(x) abs(x) end proc > # End Function number 35 > # Begin Function number 36 > expt := proc(x,y) > (x^y); > end; expt := proc(x, y) x^y end proc > # End Function number 36 > # Begin Function number 37 > 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 37 > #END ATS LIBRARY BLOCK > #BEGIN USER DEF BLOCK > #BEGIN USER DEF BLOCK > exact_soln_y := proc(x) > return(0.2 * sin(x) - 0.2 * cos(x) * x - 0.3 * cos(x)); > end; exact_soln_y := proc(x) return 0.2*sin(x) - 0.2*cos(x)*x - 0.3*cos(x) 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, 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_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_max_h, > glob_large_float, > glob_last_good_h, > glob_look_poles, > glob_neg_h, > glob_display_interval, > glob_next_display, > glob_dump_analytic, > 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_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, > 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_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_max_h := 0.1; > 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_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-200; > 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_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/mult_lin_sinpostode.ode#################"); > omniout_str(ALWAYS,"diff ( y , x , 1 ) = (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_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(0.2 * sin(x) - 0.2 * cos(x) * x - 0.3 * cos(x));"); > 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; > #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:= 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[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 := 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_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); > 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; > if (glob_max_h < glob_h) then # if number 2 > glob_h := glob_max_h; > 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_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 ) = (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,"2013-01-28T18:36:49-06:00") > ; > logitem_str(html_log_file,"Maple") > ; > logitem_str(html_log_file,"mult_lin_sin") > ; > logitem_str(html_log_file,"diff ( y , x , 1 ) = (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," 165 ") > ; > logitem_str(html_log_file,"mult_lin_sin diffeq.mxt") > ; > logitem_str(html_log_file,"mult_lin_sin maple results") > ; > logitem_str(html_log_file,"All Tests - All Languages") > ; > 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, 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_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_max_h, glob_large_float, glob_last_good_h, glob_look_poles, glob_neg_h, glob_display_interval, glob_next_display, glob_dump_analytic, 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_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, 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_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_max_h := 0.1; 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_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^(-200); 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_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/mult_lin_sinpostode.ode#################"); omniout_str(ALWAYS, "diff ( y , x , 1 ) = (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_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(0.2 * sin(x) - 0.2 * cos(x) * x - 0.3 * cos(x));"); 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; 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 := 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[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 := 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_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); 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; if glob_max_h < glob_h then glob_h := glob_max_h 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_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 ) = (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, "2013-01-28T18:36:49-06:00"); logitem_str(html_log_file, "Maple"); logitem_str(html_log_file, "mult_lin_sin"); logitem_str(html_log_file, "diff ( y , x , 1 ) = (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, " 165 "); logitem_str(html_log_file, "mult_lin_sin diffeq.mxt"); logitem_str(html_log_file, "mult_lin_sin maple results"); logitem_str(html_log_file, "All Tests - All Languages"); 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/mult_lin_sinpostode.ode################# diff ( y , x , 1 ) = (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_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(0.2 * sin(x) - 0.2 * cos(x) * x - 0.3 * cos(x)); end; #END USER DEF BLOCK #######END OF ECHO OF PROBLEM################# START of Optimize min_size = 0 min_size = 1 opt_iter = 1 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 = 2.0274757049550757351770315662501e-105 max_value3 = 2.0274757049550757351770315662501e-105 value3 = 2.0274757049550757351770315662501e-105 best_h = 0.001 START of Soultion TOP MAIN SOLVE Loop x[1] = 0.1 y[1] (analytic) = -0.29843464955960261468921699641511 y[1] (numeric) = -0.29843464955960261468921699641511 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.101 y[1] (analytic) = -0.2984025336212741273070142166406 y[1] (numeric) = -0.29840253362127412730701421664059 absolute error = 1e-32 relative error = 3.3511779805099704857672430989374e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.102 y[1] (analytic) = -0.29837007894909531559150483152161 y[1] (numeric) = -0.2983700789490953155915048315216 absolute error = 1e-32 relative error = 3.3515424989065650017423427859617e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.103 y[1] (analytic) = -0.2983372851775796135894853599193 y[1] (numeric) = -0.29833728517757961358948535991929 absolute error = 1e-32 relative error = 3.3519109064921903959766049182528e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.104 y[1] (analytic) = -0.29830415194162028393579558689679 y[1] (numeric) = -0.29830415194162028393579558689677 absolute error = 2e-32 relative error = 6.7045664198177526001131889060959e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.105 y[1] (analytic) = -0.29827067887649118086049849299255 y[1] (numeric) = -0.29827067887649118086049849299253 absolute error = 2e-32 relative error = 6.7053188316514544523872996615516e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.106 y[1] (analytic) = -0.29823686561784751277434144352962 y[1] (numeric) = -0.2982368656178475127743414435296 absolute error = 2e-32 relative error = 6.7060790618781005867618899628152e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.107 y[1] (analytic) = -0.29820271180172660443133819325022 y[1] (numeric) = -0.29820271180172660443133819325021 absolute error = 1e-32 relative error = 3.3534235619724835916725033669421e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.108 y[1] (analytic) = -0.29816821706454865866731172596987 y[1] (numeric) = -0.29816821706454865866731172596986 absolute error = 1e-32 relative error = 3.3538115156771251888327784334530e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.109 y[1] (analytic) = -0.29813338104311751771323841490657 y[1] (numeric) = -0.29813338104311751771323841490656 absolute error = 1e-32 relative error = 3.3542033988316627836353262445691e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.11 y[1] (analytic) = -0.29809820337462142408223445686051 y[1] (numeric) = -0.29809820337462142408223445686049 absolute error = 2e-32 relative error = 6.7091984364850080202385032539532e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.111 y[1] (analytic) = -0.29806268369663378102902600249521 y[1] (numeric) = -0.2980626836966337810290260024952 absolute error = 1e-32 relative error = 3.3549989807439073971425110886097e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.112 y[1] (analytic) = -0.29802682164711391258074487560384 y[1] (numeric) = -0.29802682164711391258074487560383 absolute error = 1e-32 relative error = 3.3554026931981139876018063045371e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.113 y[1] (analytic) = -0.29799061686440782313789224643202 y[1] (numeric) = -0.297990616864407823137892246432 absolute error = 2e-32 relative error = 6.7116207249909592434394067185260e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.114 y[1] (analytic) = -0.29795406898724895664431309787218 y[1] (numeric) = -0.29795406898724895664431309787217 memory used=3.8MB, alloc=2.9MB, time=0.15 absolute error = 1e-32 relative error = 3.3562219955546078888307674646681e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.115 y[1] (analytic) = -0.29791717765475895532502479864248 y[1] (numeric) = -0.29791717765475895532502479864247 absolute error = 1e-32 relative error = 3.3566375993224837521299128402233e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.116 y[1] (analytic) = -0.29787994250644841799074357441507 y[1] (numeric) = -0.29787994250644841799074357441506 absolute error = 1e-32 relative error = 3.3570571807746078508778351693473e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.117 y[1] (analytic) = -0.29784236318221765790795314626524 y[1] (numeric) = -0.29784236318221765790795314626523 absolute error = 1e-32 relative error = 3.3574807469151314845903218789077e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.118 y[1] (analytic) = -0.29780443932235746023336028577124 y[1] (numeric) = -0.29780443932235746023336028577122 absolute error = 2e-32 relative error = 6.7158166095539845675408515946788e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.119 y[1] (analytic) = -0.29776617056754983901158251760674 y[1] (numeric) = -0.29776617056754983901158251760672 absolute error = 2e-32 relative error = 6.7166797228441011435498858474415e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.12 y[1] (analytic) = -0.29772755655886879373491368353168 y[1] (numeric) = -0.29772755655886879373491368353166 absolute error = 2e-32 relative error = 6.7175508478824528448787150047158e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.121 y[1] (analytic) = -0.29768859693778106546401356630237 y[1] (numeric) = -0.29768859693778106546401356630235 absolute error = 2e-32 relative error = 6.7184299989092748362368195721861e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.122 y[1] (analytic) = -0.29764929134614689250836825818838 y[1] (numeric) = -0.29764929134614689250836825818837 absolute error = 1e-32 relative error = 3.3596585951117371128327062521622e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.123 y[1] (analytic) = -0.29760963942622076566536844650071 y[1] (numeric) = -0.2976096394262207656653684465007 absolute error = 1e-32 relative error = 3.3601062180914542052453310971859e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.124 y[1] (analytic) = -0.29756964082065218301685327780228 y[1] (numeric) = -0.29756964082065218301685327780228 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.125 y[1] (analytic) = -0.29752929517248640428196795328876 y[1] (numeric) = -0.29752929517248640428196795328875 absolute error = 1e-32 relative error = 3.3610135748826711457962659221897e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.126 y[1] (analytic) = -0.29748860212516520472518370019222 y[1] (numeric) = -0.29748860212516520472518370019221 absolute error = 1e-32 relative error = 3.3614733232006667042771102753276e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.127 y[1] (analytic) = -0.29744756132252762861832925797448 y[1] (numeric) = -0.29744756132252762861832925797448 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.128 y[1] (analytic) = -0.29740617240881074225548351353783 y[1] (numeric) = -0.29740617240881074225548351353783 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.129 y[1] (analytic) = -0.29736443502865038651957941668976 y[1] (numeric) = -0.29736443502865038651957941668977 absolute error = 1e-32 relative error = 3.3628769355140007781352370963539e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.13 y[1] (analytic) = -0.29732234882708192899956980565382 y[1] (numeric) = -0.29732234882708192899956980565383 absolute error = 1e-32 relative error = 3.3633529532675140568481738084892e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.131 y[1] (analytic) = -0.29727991344954101565700627252004 y[1] (numeric) = -0.29727991344954101565700627252004 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.132 y[1] (analytic) = -0.29723712854186432204088270017583 y[1] (numeric) = -0.29723712854186432204088270017582 absolute error = 1e-32 relative error = 3.3643172537214008883231059788007e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.133 y[1] (analytic) = -0.2971939937502903040495956054504 y[1] (numeric) = -0.2971939937502903040495956054504 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.134 y[1] (analytic) = -0.29715050872145994823887392794259 y[1] (numeric) = -0.29715050872145994823887392794259 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.135 y[1] (analytic) = -0.29710667310241752167453141028257 y[1] (numeric) = -0.29710667310241752167453141028257 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.136 y[1] (analytic) = -0.29706248654061132132889522340241 y[1] (numeric) = -0.29706248654061132132889522340241 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.137 y[1] (analytic) = -0.29701794868389442301976499975714 y[1] (numeric) = -0.29701794868389442301976499975714 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.138 y[1] (analytic) = -0.29697305918052542989075694834734 y[1] (numeric) = -0.29697305918052542989075694834734 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.139 y[1] (analytic) = -0.29692781767916922043188823784526 y[1] (numeric) = -0.29692781767916922043188823784526 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.14 y[1] (analytic) = -0.29688222382889769603925734811866 y[1] (numeric) = -0.29688222382889769603925734811867 absolute error = 1e-32 relative error = 3.3683390911822682216983126493768e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.141 y[1] (analytic) = -0.29683627727919052811267660597919 y[1] (numeric) = -0.29683627727919052811267660597919 memory used=7.6MB, alloc=4.1MB, time=0.32 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.142 y[1] (analytic) = -0.29678997767993590469011363805476 y[1] (numeric) = -0.29678997767993590469011363805476 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.143 y[1] (analytic) = -0.29674332468143127661779899229785 y[1] (numeric) = -0.29674332468143127661779899229786 absolute error = 1e-32 relative error = 3.3699157380323542393769255421979e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.144 y[1] (analytic) = -0.29669631793438410325485769979231 y[1] (numeric) = -0.29669631793438410325485769979232 absolute error = 1e-32 relative error = 3.3704496468377308140763845830783e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.145 y[1] (analytic) = -0.29664895708991259771132307021062 y[1] (numeric) = -0.29664895708991259771132307021063 absolute error = 1e-32 relative error = 3.3709877486503542119846457198844e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.146 y[1] (analytic) = -0.29660124179954647161839153750092 y[1] (numeric) = -0.29660124179954647161839153750092 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.147 y[1] (analytic) = -0.29655317171522767942977789714666 y[1] (numeric) = -0.29655317171522767942977789714667 absolute error = 1e-32 relative error = 3.3720765629182818788486865004547e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.148 y[1] (analytic) = -0.29650474648931116225303080264308 y[1] (numeric) = -0.29650474648931116225303080264308 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.149 y[1] (analytic) = -0.29645596577456559120966891667064 y[1] (numeric) = -0.29645596577456559120966891667065 absolute error = 1e-32 relative error = 3.3731822444093816786620885405513e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.15 y[1] (analytic) = -0.2964068292241741103229986418184 y[1] (numeric) = -0.29640682922417411032299864181841 absolute error = 1e-32 relative error = 3.3737414303760677402800464801878e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.151 y[1] (analytic) = -0.29635733649173507893247488661622 y[1] (numeric) = -0.29635733649173507893247488661623 absolute error = 1e-32 relative error = 3.3743048572306505504808986689428e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.152 y[1] (analytic) = -0.2963074872312628136334668550766 y[1] (numeric) = -0.2963074872312628136334668550766 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.153 y[1] (analytic) = -0.29625728109718832974129138192085 y[1] (numeric) = -0.29625728109718832974129138192086 absolute error = 1e-32 relative error = 3.3754444660279798835129911121300e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.154 y[1] (analytic) = -0.29620671774436008227837687117249 y[1] (numeric) = -0.2962067177443600822783768711725 absolute error = 1e-32 relative error = 3.3760206642681400792537284395430e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.155 y[1] (analytic) = -0.29615579682804470648342143284025 y[1] (numeric) = -0.29615579682804470648342143284026 absolute error = 1e-32 relative error = 3.3766011359913526846405295016194e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.156 y[1] (analytic) = -0.29610451800392775784140935098569 y[1] (numeric) = -0.2961045180039277578414093509857 absolute error = 1e-32 relative error = 3.3771858894322417317552902017091e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.157 y[1] (analytic) = -0.29605288092811445163335055657278 y[1] (numeric) = -0.29605288092811445163335055657279 absolute error = 1e-32 relative error = 3.3777749328600967180176522553863e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.158 y[1] (analytic) = -0.29600088525713040200460832013112 y[1] (numeric) = -0.29600088525713040200460832013113 absolute error = 1e-32 relative error = 3.3783682745790398817148012645657e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.159 y[1] (analytic) = -0.29594853064792236055068092242789 y[1] (numeric) = -0.2959485306479223605506809224279 absolute error = 1e-32 relative error = 3.3789659229281943823003753861886e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.16 y[1] (analytic) = -0.29589581675785895441930360603689 y[1] (numeric) = -0.2958958167578589544193036060369 absolute error = 1e-32 relative error = 3.3795678862818533916457224858548e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.161 y[1] (analytic) = -0.29584274324473142392773765691505 y[1] (numeric) = -0.29584274324473142392773765691506 absolute error = 1e-32 relative error = 3.3801741730496501024728398137516e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.162 y[1] (analytic) = -0.29578930976675435969411401284696 y[1] (numeric) = -0.29578930976675435969411401284697 absolute error = 1e-32 relative error = 3.3807847916767286602448206894940e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.163 y[1] (analytic) = -0.29573551598256643928169934489559 y[1] (numeric) = -0.2957355159825664392816993448956 absolute error = 1e-32 relative error = 3.3813997506439160248365211728961e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.164 y[1] (analytic) = -0.29568136155123116335495310880236 y[1] (numeric) = -0.29568136155123116335495310880237 absolute error = 1e-32 relative error = 3.3820190584678947683554500070290e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.165 y[1] (analytic) = -0.29562684613223759134624461561064 y[1] (numeric) = -0.29562684613223759134624461561064 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.166 y[1] (analytic) = -0.29557196938550107663209972464359 y[1] (numeric) = -0.2955719693855010766320997246436 absolute error = 1e-32 relative error = 3.3832707549332781331348929738367e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.167 y[1] (analytic) = -0.29551673097136400121784731734948 y[1] (numeric) = -0.2955167309713640012178473173495 absolute error = 2e-32 relative error = 6.7678063215777887499119188130438e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.168 y[1] (analytic) = -0.29546113055059650992953626743373 y[1] (numeric) = -0.29546113055059650992953626743374 absolute error = 1e-32 relative error = 3.3845399499300774888778497140589e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=11.4MB, alloc=4.2MB, time=0.49 TOP MAIN SOLVE Loop x[1] = 0.169 y[1] (analytic) = -0.29540516778439724411199418112756 y[1] (numeric) = -0.29540516778439724411199418112757 absolute error = 1e-32 relative error = 3.3851811310554132926869570063897e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.17 y[1] (analytic) = -0.2953488423343940748318997413968 y[1] (numeric) = -0.29534884233439407483189974139682 absolute error = 2e-32 relative error = 6.7716534258008000505283072174429e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.171 y[1] (analytic) = -0.2952921538626448355847410513704 y[1] (numeric) = -0.29529215386264483558474105137042 absolute error = 2e-32 relative error = 6.7729534084752557597517719903366e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.172 y[1] (analytic) = -0.2952351020316380545045329352666 y[1] (numeric) = -0.29523510203163805450453293526662 absolute error = 2e-32 relative error = 6.7742622277539190526549339795853e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.173 y[1] (analytic) = -0.29517768650429368607516671961459 y[1] (numeric) = -0.2951776865042936860751667196146 absolute error = 1e-32 relative error = 3.3877899506657116287929063566416e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.174 y[1] (analytic) = -0.29511990694396384234226658360937 y[1] (numeric) = -0.29511990694396384234226658360938 absolute error = 1e-32 relative error = 3.3884532234888373661871460720008e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.175 y[1] (analytic) = -0.29506176301443352362442713499856 y[1] (numeric) = -0.29506176301443352362442713499858 absolute error = 2e-32 relative error = 6.7782418825382199239970756404222e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.176 y[1] (analytic) = -0.29500325437992134872270743697954 y[1] (numeric) = -0.29500325437992134872270743697955 absolute error = 1e-32 relative error = 3.3897931129673072305518218604975e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.177 y[1] (analytic) = -0.29494438070508028462725728218408 y[1] (numeric) = -0.29494438070508028462725728218409 absolute error = 1e-32 relative error = 3.3904697475823971467247427029823e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.178 y[1] (analytic) = -0.2948851416549983757199520819451 y[1] (numeric) = -0.29488514165499837571995208194511 absolute error = 1e-32 relative error = 3.3911508541517244461947723797253e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.179 y[1] (analytic) = -0.29482553689519947247191331267406 y[1] (numeric) = -0.29482553689519947247191331267408 absolute error = 2e-32 relative error = 6.7836728835023965266924218396723e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.18 y[1] (analytic) = -0.29476556609164395963479203632963 y[1] (numeric) = -0.29476556609164395963479203632965 absolute error = 2e-32 relative error = 6.7850530389909616280444008034619e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.181 y[1] (analytic) = -0.29470522891072948392469358862554 y[1] (numeric) = -0.29470522891072948392469358862555 absolute error = 1e-32 relative error = 3.3932210965381771303609281731038e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.182 y[1] (analytic) = -0.29464452501929168119762210680918 y[1] (numeric) = -0.29464452501929168119762210680919 absolute error = 1e-32 relative error = 3.3939201820720258550105110606013e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.183 y[1] (analytic) = -0.29458345408460490311532414854088 y[1] (numeric) = -0.2945834540846049031153241485409 absolute error = 2e-32 relative error = 6.7892475706581822041455004908136e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.184 y[1] (analytic) = -0.29452201577438294330041123461612 y[1] (numeric) = -0.29452201577438294330041123461614 absolute error = 2e-32 relative error = 6.7906638311619107843642612316033e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.185 y[1] (analytic) = -0.29446020975677976297964173099964 y[1] (numeric) = -0.29446020975677976297964173099966 absolute error = 2e-32 relative error = 6.7920891642778273383662270612498e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.186 y[1] (analytic) = -0.29439803570039021611424306987968 y[1] (numeric) = -0.29439803570039021611424306987971 absolute error = 3e-32 relative error = 1.0190285383062505217777828387708e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.187 y[1] (analytic) = -0.29433549327425077401615589520212 y[1] (numeric) = -0.29433549327425077401615589520214 absolute error = 2e-32 relative error = 6.7949671232360516135177101578571e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.188 y[1] (analytic) = -0.29427258214784024944908230540775 y[1] (numeric) = -0.29427258214784024944908230540777 absolute error = 2e-32 relative error = 6.7964197867241862287055256384193e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.189 y[1] (analytic) = -0.29420930199108052021322095487066 y[1] (numeric) = -0.29420930199108052021322095487067 absolute error = 1e-32 relative error = 3.3989407990584770285531648552789e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.19 y[1] (analytic) = -0.29414565247433725221257236581992 y[1] (numeric) = -0.29414565247433725221257236581995 absolute error = 3e-32 relative error = 1.0199028864659949735039727302842e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.191 y[1] (analytic) = -0.29408163326842062200369839432205 y[1] (numeric) = -0.29408163326842062200369839432207 absolute error = 2e-32 relative error = 6.8008327408006342428436420486948e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.192 y[1] (analytic) = -0.29401724404458603882482038720439 y[1] (numeric) = -0.29401724404458603882482038720441 absolute error = 2e-32 relative error = 6.8023221103885709584002529576238e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.193 y[1] (analytic) = -0.29395248447453486610414116161262 y[1] (numeric) = -0.29395248447453486610414116161264 absolute error = 2e-32 relative error = 6.8038207044759990972040854624110e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.194 y[1] (analytic) = -0.29388735423041514244627653521411 y[1] (numeric) = -0.29388735423041514244627653521413 absolute error = 2e-32 relative error = 6.8053285424181581304277850216548e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.195 y[1] (analytic) = -0.29382185298482230209568273288643 y[1] (numeric) = -0.29382185298482230209568273288645 absolute error = 2e-32 relative error = 6.8068456436537150518232355920570e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=15.2MB, alloc=4.3MB, time=0.66 TOP MAIN SOLVE Loop x[1] = 0.196 y[1] (analytic) = -0.29375598041079989487596659506287 y[1] (numeric) = -0.29375598041079989487596659506289 absolute error = 2e-32 relative error = 6.8083720277051772247912763163982e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.197 y[1] (analytic) = -0.29368973618184030560396611374578 y[1] (numeric) = -0.2936897361818403056039661137458 absolute error = 2e-32 relative error = 6.8099077141793075809732362852706e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.198 y[1] (analytic) = -0.29362311997188547297748942454224 y[1] (numeric) = -0.29362311997188547297748942454226 absolute error = 2e-32 relative error = 6.8114527227675421868577695790062e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.199 y[1] (analytic) = -0.29355613145532760793560098692468 y[1] (numeric) = -0.2935561314553276079356009869247 absolute error = 2e-32 relative error = 6.8130070732464101950246175676190e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.2 y[1] (analytic) = -0.2934887703070099114903442902707 y[1] (numeric) = -0.29348877030700991149034429027072 absolute error = 2e-32 relative error = 6.8145707854779561967762061228483e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.201 y[1] (analytic) = -0.29342103620222729202879103009118 y[1] (numeric) = -0.29342103620222729202879103009121 absolute error = 3e-32 relative error = 1.0224215819115247489557619716707e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.202 y[1] (analytic) = -0.29335292881672708208430730721271 y[1] (numeric) = -0.29335292881672708208430730721273 absolute error = 2e-32 relative error = 6.8177263750773888005434279106866e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.203 y[1] (analytic) = -0.29328444782670975457592801253871 y[1] (numeric) = -0.29328444782670975457592801253873 absolute error = 2e-32 relative error = 6.8193182926007769104403796394785e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.204 y[1] (analytic) = -0.29321559290882963851473117137354 y[1] (numeric) = -0.29321559290882963851473117137357 absolute error = 3e-32 relative error = 1.0231379478283061724920024742018e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.205 y[1] (analytic) = -0.29314636374019563417610463415311 y[1] (numeric) = -0.29314636374019563417610463415314 absolute error = 3e-32 relative error = 1.0233795711205835746682269618556e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.206 y[1] (analytic) = -0.29307675999837192773679811478492 y[1] (numeric) = -0.29307675999837192773679811478494 absolute error = 2e-32 relative error = 6.8241507788304682043124860122327e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.207 y[1] (analytic) = -0.29300678136137870537565419365856 y[1] (numeric) = -0.29300678136137870537565419365859 absolute error = 3e-32 relative error = 1.0238670880111687150946273111755e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.208 y[1] (analytic) = -0.29293642750769286683691251974377 y[1] (numeric) = -0.29293642750769286683691251974379 absolute error = 2e-32 relative error = 6.8274199184308601146159169828435e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.209 y[1] (analytic) = -0.29286569811624873845498206504652 y[1] (numeric) = -0.29286569811624873845498206504654 absolute error = 2e-32 relative error = 6.8290687945507683450561973306529e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.21 y[1] (analytic) = -0.29279459286643878563957690504444 y[1] (numeric) = -0.29279459286643878563957690504447 absolute error = 3e-32 relative error = 1.0246090853762727568113848805458e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.211 y[1] (analytic) = -0.29272311143811432482011162056875 y[1] (numeric) = -0.29272311143811432482011162056877 absolute error = 2e-32 relative error = 6.8323952631353038687380835925766e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.212 y[1] (analytic) = -0.29265125351158623484825303994156 y[1] (numeric) = -0.29265125351158623484825303994158 absolute error = 2e-32 relative error = 6.8340728973532957255595135343929e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.213 y[1] (analytic) = -0.29257901876762566785752566501423 y[1] (numeric) = -0.29257901876762566785752566501425 absolute error = 2e-32 relative error = 6.8357601595090972731440469749410e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.214 y[1] (analytic) = -0.29250640688746475957886875108191 y[1] (numeric) = -0.29250640688746475957886875108194 absolute error = 3e-32 relative error = 1.0256185606061553082431738270679e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.215 y[1] (analytic) = -0.29243341755279733911104363847335 y[1] (numeric) = -0.29243341755279733911104363847337 absolute error = 2e-32 relative error = 6.8391636521462543090572421245786e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.216 y[1] (analytic) = -0.29236005044577963814479056293059 y[1] (numeric) = -0.29236005044577963814479056293061 absolute error = 2e-32 relative error = 6.8408799251145121311563971148883e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.217 y[1] (analytic) = -0.29228630524903099963963480270121 y[1] (numeric) = -0.29228630524903099963963480270123 absolute error = 2e-32 relative error = 6.8426059109953133447178209447934e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.218 y[1] (analytic) = -0.29221218164563458595224265256406 y[1] (numeric) = -0.29221218164563458595224265256407 absolute error = 1e-32 relative error = 3.4221708156325220487343342458295e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.219 y[1] (analytic) = -0.29213767931913808641522834879876 y[1] (numeric) = -0.29213767931913808641522834879877 absolute error = 1e-32 relative error = 3.4230435537470551018555260855915e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.22 y[1] (analytic) = -0.29206279795355442436531370438798 y[1] (numeric) = -0.29206279795355442436531370438798 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.221 y[1] (analytic) = -0.29198753723336246361974285050878 y[1] (numeric) = -0.29198753723336246361974285050878 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.222 y[1] (analytic) = -0.29191189684350771439985511862551 y[1] (numeric) = -0.29191189684350771439985511862552 absolute error = 1e-32 relative error = 3.4256911445308247815874562610421e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=19.0MB, alloc=4.3MB, time=0.84 x[1] = 0.223 y[1] (analytic) = -0.29183587646940303870071973723957 y[1] (numeric) = -0.29183587646940303870071973723958 absolute error = 1e-32 relative error = 3.4265835033645804779632645642974e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.224 y[1] (analytic) = -0.29175947579692935510573665858155 y[1] (numeric) = -0.29175947579692935510573665858156 absolute error = 1e-32 relative error = 3.4274807948175117210804642242312e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.225 y[1] (analytic) = -0.29168269451243634304510847324716 y[1] (numeric) = -0.29168269451243634304510847324715 absolute error = 1e-32 relative error = 3.4283830299619076391567183478452e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.226 y[1] (analytic) = -0.29160553230274314649708901497942 y[1] (numeric) = -0.29160553230274314649708901497941 absolute error = 1e-32 relative error = 3.4292902199187561660184875930087e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.227 y[1] (analytic) = -0.29152798885513907713091490348579 y[1] (numeric) = -0.29152798885513907713091490348578 absolute error = 1e-32 relative error = 3.4302023758579910548297881894154e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.228 y[1] (analytic) = -0.29145006385738431689032692034775 y[1] (numeric) = -0.29145006385738431689032692034774 absolute error = 1e-32 relative error = 3.4311195089987403557639343842578e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.229 y[1] (analytic) = -0.29137175699771062001658876173374 y[1] (numeric) = -0.29137175699771062001658876173373 absolute error = 1e-32 relative error = 3.4320416306095763681424745332309e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.23 y[1] (analytic) = -0.29129306796482201450991136176076 y[1] (numeric) = -0.29129306796482201450991136176075 absolute error = 1e-32 relative error = 3.4329687520087670776501008562137e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.231 y[1] (analytic) = -0.29121399644789550302819163196685 y[1] (numeric) = -0.29121399644789550302819163196684 absolute error = 1e-32 relative error = 3.4339008845645290893196563177299e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.232 y[1] (analytic) = -0.29113454213658176322197511545374 y[1] (numeric) = -0.29113454213658176322197511545373 absolute error = 1e-32 relative error = 3.4348380396952820670674860081405e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.233 y[1] (analytic) = -0.29105470472100584750455270883678 y[1] (numeric) = -0.29105470472100584750455270883677 absolute error = 1e-32 relative error = 3.4357802288699046906462927129573e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.234 y[1] (analytic) = -0.29097448389176788225610226119581 y[1] (numeric) = -0.2909744838917678822561022611958 absolute error = 1e-32 relative error = 3.4367274636079921409703650736634e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.235 y[1] (analytic) = -0.29089387933994376646078651675639 y[1] (numeric) = -0.29089387933994376646078651675638 absolute error = 1e-32 relative error = 3.4376797554801151248565599625115e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.236 y[1] (analytic) = -0.29081289075708586977571952704392 y[1] (numeric) = -0.2908128907570858697757195270439 absolute error = 2e-32 relative error = 6.8772742322161609006274932102857e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.237 y[1] (analytic) = -0.29073151783522373003071431874363 y[1] (numeric) = -0.29073151783522373003071431874362 absolute error = 1e-32 relative error = 3.4395995571651931636035668694815e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.238 y[1] (analytic) = -0.29064976026686475015772526546652 y[1] (numeric) = -0.29064976026686475015772526546651 absolute error = 1e-32 relative error = 3.4405670903765202593863423710514e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.239 y[1] (analytic) = -0.29056761774499489454889927506319 y[1] (numeric) = -0.29056761774499489454889927506317 absolute error = 2e-32 relative error = 6.8830794550383119507155461830589e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.24 y[1] (analytic) = -0.29048508996307938484215056904529 y[1] (numeric) = -0.29048508996307938484215056904528 absolute error = 1e-32 relative error = 3.4425174804224886828747326320212e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.241 y[1] (analytic) = -0.29040217661506339513317449706547 y[1] (numeric) = -0.29040217661506339513317449706546 absolute error = 1e-32 relative error = 3.4435003609684693851619806846488e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.242 y[1] (analytic) = -0.29031887739537274661281649727104 y[1] (numeric) = -0.29031887739537274661281649727103 absolute error = 1e-32 relative error = 3.4444883810918818347859925625216e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.243 y[1] (analytic) = -0.29023519199891460162871298268445 y[1] (numeric) = -0.29023519199891460162871298268444 absolute error = 1e-32 relative error = 3.4454815527806142821773575346725e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.244 y[1] (analytic) = -0.29015112012107815717012160457218 y[1] (numeric) = -0.29015112012107815717012160457217 absolute error = 1e-32 relative error = 3.4464798880759328670793312247531e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.245 y[1] (analytic) = -0.29006666145773533777485901604387 y[1] (numeric) = -0.29006666145773533777485901604387 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.246 y[1] (analytic) = -0.28998181570524148785726493287405 y[1] (numeric) = -0.28998181570524148785726493287404 absolute error = 1e-32 relative error = 3.4484920979199344000206513292806e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.247 y[1] (analytic) = -0.2898965825604360634561119637583 y[1] (numeric) = -0.28989658256043606345611196375828 absolute error = 2e-32 relative error = 6.8990119936410456765830699494102e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.248 y[1] (analytic) = -0.28981096172064332340138135890465 y[1] (numeric) = -0.28981096172064332340138135890463 absolute error = 2e-32 relative error = 6.9010502160641337417728716120552e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.249 y[1] (analytic) = -0.28972495288367301989882550401724 y[1] (numeric) = -0.28972495288367301989882550401723 absolute error = 1e-32 relative error = 3.4515494438668813019875529990042e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.25 y[1] (analytic) = -0.28963855574782108853123866635309 y[1] (numeric) = -0.28963855574782108853123866635308 absolute error = 1e-32 relative error = 3.4525790166923343527142817391391e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=22.8MB, alloc=4.3MB, time=1.02 TOP MAIN SOLVE Loop x[1] = 0.251 y[1] (analytic) = -0.28955177001187033767535818062288 y[1] (numeric) = -0.28955177001187033767535818062287 absolute error = 1e-32 relative error = 3.4536138389311328938918155255041e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.252 y[1] (analytic) = -0.28946459537509113733331894506254 y[1] (numeric) = -0.28946459537509113733331894506253 absolute error = 1e-32 relative error = 3.4546539230616094203362203943633e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.253 y[1] (analytic) = -0.28937703153724210737758478202271 y[1] (numeric) = -0.2893770315372421073775847820227 absolute error = 1e-32 relative error = 3.4556992816180107794399689577269e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.254 y[1] (analytic) = -0.28928907819857080520828090290805 y[1] (numeric) = -0.28928907819857080520828090290804 absolute error = 1e-32 relative error = 3.4567499271907886669473871732439e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.255 y[1] (analytic) = -0.28920073505981441282185240424614 y[1] (numeric) = -0.28920073505981441282185240424612 absolute error = 2e-32 relative error = 6.9156117448537838058318377245415e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.256 y[1] (analytic) = -0.28911200182220042328997441007606 y[1] (numeric) = -0.28911200182220042328997441007605 absolute error = 1e-32 relative error = 3.4588671300300605009665624286131e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.257 y[1] (analytic) = -0.28902287818744732664764016571909 y[1] (numeric) = -0.28902287818744732664764016571908 absolute error = 1e-32 relative error = 3.4599337127611215440352913747538e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.258 y[1] (analytic) = -0.2889333638577652951893540793265 y[1] (numeric) = -0.28893336385776529518935407932649 absolute error = 1e-32 relative error = 3.4610056334382868799467455576057e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.259 y[1] (analytic) = -0.28884345853585686817235740039314 y[1] (numeric) = -0.28884345853585686817235740039313 absolute error = 1e-32 relative error = 3.4620829049374526502419842844510e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.26 y[1] (analytic) = -0.28875316192491763592581491867738 y[1] (numeric) = -0.28875316192491763592581491867737 absolute error = 1e-32 relative error = 3.4631655401925006658036360560893e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.261 y[1] (analytic) = -0.28866247372863692336489176267943 y[1] (numeric) = -0.28866247372863692336489176267942 absolute error = 1e-32 relative error = 3.4642535521956016429343738759192e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.262 y[1] (analytic) = -0.2885713936511984729086500739984 y[1] (numeric) = -0.2885713936511984729086500739984 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.263 y[1] (analytic) = -0.28847992139728112680069603251441 y[1] (numeric) = -0.28847992139728112680069603251441 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.264 y[1] (analytic) = -0.28838805667205950883150840742359 y[1] (numeric) = -0.28838805667205950883150840742358 absolute error = 1e-32 relative error = 3.4675499794956836351482732936986e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.265 y[1] (analytic) = -0.28829579918120470546138051069104 y[1] (numeric) = -0.28829579918120470546138051069102 absolute error = 2e-32 relative error = 6.9373192591784006778018137551169e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.266 y[1] (analytic) = -0.28820314863088494634290813247854 y[1] (numeric) = -0.28820314863088494634290813247852 absolute error = 2e-32 relative error = 6.9395494445534048123199794840168e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.267 y[1] (analytic) = -0.28811010472776628424195674254894 y[1] (numeric) = -0.28811010472776628424195674254892 absolute error = 2e-32 relative error = 6.9417905418131357565949666974582e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.268 y[1] (analytic) = -0.28801666717901327435604194754746 y[1] (numeric) = -0.28801666717901327435604194754746 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.269 y[1] (analytic) = -0.28792283569228965302905790141084 y[1] (numeric) = -0.28792283569228965302905790141083 absolute error = 1e-32 relative error = 3.4731527896895439373848938327937e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.27 y[1] (analytic) = -0.28782860997575901586128907495613 y[1] (numeric) = -0.28782860997575901586128907495613 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.271 y[1] (analytic) = -0.2877339897380854952136415009542 y[1] (numeric) = -0.2877339897380854952136415009542 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.272 y[1] (analytic) = -0.28763897468843443710503032269349 y[1] (numeric) = -0.28763897468843443710503032269349 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.273 y[1] (analytic) = -0.28754356453647307750186118719126 y[1] (numeric) = -0.28754356453647307750186118719126 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.274 y[1] (analytic) = -0.28744775899237121799854373880762 y[1] (numeric) = -0.28744775899237121799854373880762 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.275 y[1] (analytic) = -0.28735155776680190088797618506353 y[1] (numeric) = -0.28735155776680190088797618506353 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.276 y[1] (analytic) = -0.28725496057094208362094062395645 y[1] (numeric) = -0.28725496057094208362094062395645 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.277 y[1] (analytic) = -0.28715796711647331265334954100467 y[1] (numeric) = -0.28715796711647331265334954100467 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.278 y[1] (analytic) = -0.2870605771155823966802846046342 y[1] (numeric) = -0.28706057711558239668028460463419 absolute error = 1e-32 relative error = 3.4835852768363900580576667075290e-30 % Correct digits = 31 h = 0.001 memory used=26.7MB, alloc=4.3MB, time=1.20 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.279 y[1] (analytic) = -0.28696279028096207925576961034822 y[1] (numeric) = -0.28696279028096207925576961034821 absolute error = 1e-32 relative error = 3.4847723602802687830105770553228e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.28 y[1] (analytic) = -0.28686460632581171079722014738877 y[1] (numeric) = -0.28686460632581171079722014738876 absolute error = 1e-32 relative error = 3.4859650788157244951009481923911e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.281 y[1] (analytic) = -0.28676602496383791997351328631175 y[1] (numeric) = -0.28676602496383791997351328631173 absolute error = 2e-32 relative error = 6.9743268933347531920758388700479e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.282 y[1] (analytic) = -0.2866670459092552844756213120496 y[1] (numeric) = -0.28666704590925528447562131204958 absolute error = 2e-32 relative error = 6.9767349562499131096285373396007e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.283 y[1] (analytic) = -0.28656766887678700116875425462975 y[1] (numeric) = -0.28656766887678700116875425462973 absolute error = 2e-32 relative error = 6.9791543750873115412775910437207e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.284 y[1] (analytic) = -0.28646789358166555562495669874986 y[1] (numeric) = -0.28646789358166555562495669874984 absolute error = 2e-32 relative error = 6.9815851786889512881463771973147e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.285 y[1] (analytic) = -0.28636771973963339103510508388365 y[1] (numeric) = -0.28636771973963339103510508388363 absolute error = 2e-32 relative error = 6.9840273960291597461544811008805e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.286 y[1] (analytic) = -0.28626714706694357649925243850108 y[1] (numeric) = -0.28626714706694357649925243850105 absolute error = 3e-32 relative error = 1.0479721584322946972427156774025e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.287 y[1] (analytic) = -0.28616617528036047469426822533418 y[1] (numeric) = -0.28616617528036047469426822533416 absolute error = 2e-32 relative error = 6.9889461884884743243420531013236e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.288 y[1] (analytic) = -0.28606480409716040891772170940392 y[1] (numeric) = -0.28606480409716040891772170940389 absolute error = 3e-32 relative error = 1.0487134233336393768714021962720e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.289 y[1] (analytic) = -0.28596303323513232950695799674231 y[1] (numeric) = -0.28596303323513232950695799674227 absolute error = 4e-32 relative error = 1.3987821973866848847403547045046e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.29 y[1] (analytic) = -0.28586086241257847963231662939873 y[1] (numeric) = -0.2858608624125784796323166293987 absolute error = 3e-32 relative error = 1.0494616068393956141422190713112e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.291 y[1] (analytic) = -0.28575829134831506046344336140664 y[1] (numeric) = -0.28575829134831506046344336140661 absolute error = 3e-32 relative error = 1.0498383041992839591694911248377e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.292 y[1] (analytic) = -0.28565531976167289570764648090783 y[1] (numeric) = -0.2856553197616728957076464809078 absolute error = 3e-32 relative error = 1.0502167446077850593565545712452e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.293 y[1] (analytic) = -0.28555194737249809551924978558445 y[1] (numeric) = -0.28555194737249809551924978558441 absolute error = 4e-32 relative error = 1.4007959100982988264381522443093e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.294 y[1] (analytic) = -0.28544817390115271977889506193292 y[1] (numeric) = -0.28544817390115271977889506193289 absolute error = 3e-32 relative error = 1.0509788726267571188912142593176e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.295 y[1] (analytic) = -0.28534399906851544074174766372857 y[1] (numeric) = -0.28534399906851544074174766372853 absolute error = 4e-32 relative error = 1.4018167590899779424195350106321e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.296 y[1] (analytic) = -0.28523942259598220505355953127357 y[1] (numeric) = -0.28523942259598220505355953127354 absolute error = 3e-32 relative error = 1.0517480272175593301340648641221e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.297 y[1] (analytic) = -0.28513444420546689513354474069405 y[1] (numeric) = -0.28513444420546689513354474069401 absolute error = 4e-32 relative error = 1.4028470012264157826916355224315e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.298 y[1] (analytic) = -0.28502906361940198992302342165202 y[1] (numeric) = -0.28502906361940198992302342165199 absolute error = 3e-32 relative error = 1.0525242450383538193121581184347e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.299 y[1] (analytic) = -0.28492328056073922499879063236607 y[1] (numeric) = -0.28492328056073922499879063236604 absolute error = 3e-32 relative error = 1.0529150142086994468932943816686e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.3 y[1] (analytic) = -0.2848170947529502520501675327875 y[1] (numeric) = -0.28481709475295025205016753278746 absolute error = 4e-32 relative error = 1.4044100841171740667439602483102e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.301 y[1] (analytic) = -0.28471050592002729771869295015792 y[1] (numeric) = -0.2847105059200272977186929501579 absolute error = 2e-32 relative error = 7.0246793090304247044636557118604e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.302 y[1] (analytic) = -0.28460351378648382179941418597737 y[1] (numeric) = -0.28460351378648382179941418597734 absolute error = 3e-32 relative error = 1.0540980187091680828775401970547e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.303 y[1] (analytic) = -0.28449611807735517480273666963786 y[1] (numeric) = -0.28449611807735517480273666963783 absolute error = 3e-32 relative error = 1.0544959348739840542535899927555e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.304 y[1] (analytic) = -0.28438831851819925487579282162758 y[1] (numeric) = -0.28438831851819925487579282162756 absolute error = 2e-32 relative error = 7.0326376639552838549681060872461e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.305 y[1] (analytic) = -0.28428011483509716408229124828075 y[1] (numeric) = -0.28428011483509716408229124828072 absolute error = 3e-32 relative error = 1.0552971676334853588992231236971e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=30.5MB, alloc=4.3MB, time=1.36 x[1] = 0.306 y[1] (analytic) = -0.2841715067546538640398081505403 y[1] (numeric) = -0.28417150675465386403980815054026 absolute error = 4e-32 relative error = 1.4076006583775810518116496499400e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.307 y[1] (analytic) = -0.28406249400399883091348359111225 y[1] (numeric) = -0.28406249400399883091348359111222 absolute error = 3e-32 relative error = 1.0561056328533706816903529320705e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.308 y[1] (analytic) = -0.28395307631078670976508602772117 y[1] (numeric) = -0.28395307631078670976508602772113 absolute error = 4e-32 relative error = 1.4086834529033237328679457397462e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.309 y[1] (analytic) = -0.2838432534031979682564092849249 y[1] (numeric) = -0.28384325340319796825640928492486 absolute error = 4e-32 relative error = 1.4092284921488055774098613772356e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.31 y[1] (analytic) = -0.2837330250099395497059669031134 y[1] (numeric) = -0.28373302500993954970596690311337 absolute error = 3e-32 relative error = 1.0573319760344802874762184515153e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.311 y[1] (analytic) = -0.28362239086024552549794957089871 y[1] (numeric) = -0.28362239086024552549794957089868 absolute error = 3e-32 relative error = 1.0577444153477449350055111060773e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.312 y[1] (analytic) = -0.28351135068387774684241211610127 y[1] (numeric) = -0.28351135068387774684241211610124 absolute error = 3e-32 relative error = 1.0581586919759960859758941140788e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.313 y[1] (analytic) = -0.283399904211126495885657300951 y[1] (numeric) = -0.28339990421112649588565730095097 absolute error = 3e-32 relative error = 1.0585748108669324374536207790370e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.314 y[1] (analytic) = -0.28328805117281113616978443894762 y[1] (numeric) = -0.28328805117281113616978443894759 absolute error = 3e-32 relative error = 1.0589927769914808549849744161525e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.315 y[1] (analytic) = -0.28317579130028076244037162406432 y[1] (numeric) = -0.28317579130028076244037162406429 absolute error = 3e-32 relative error = 1.0594125953439246440780434180543e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.316 y[1] (analytic) = -0.28306312432541484980126113763023 y[1] (numeric) = -0.2830631243254148498012611376302 absolute error = 3e-32 relative error = 1.0598342709420326679753924356576e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.317 y[1] (analytic) = -0.2829500499806239022154183742896 y[1] (numeric) = -0.28295004998062390221541837428957 absolute error = 3e-32 relative error = 1.0602578088271893183291604712248e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.318 y[1] (analytic) = -0.28283656799885010035083540590805 y[1] (numeric) = -0.28283656799885010035083540590803 absolute error = 2e-32 relative error = 7.0712214270968356363247336944669e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.319 y[1] (analytic) = -0.28272267811356794877045108117826 y[1] (numeric) = -0.28272267811356794877045108117824 absolute error = 2e-32 relative error = 7.0740699449536636990008796577761e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.32 y[1] (analytic) = -0.28260838005878492246506033896743 y[1] (numeric) = -0.2826083800587849224650603389674 absolute error = 3e-32 relative error = 1.0615396469757813768966835584286e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.321 y[1] (analytic) = -0.28249367356904211272818619514688 y[1] (numeric) = -0.28249367356904211272818619514685 absolute error = 3e-32 relative error = 1.0619706848998843163796129609490e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.322 y[1] (analytic) = -0.28237855837941487237188864574797 y[1] (numeric) = -0.28237855837941487237188864574795 absolute error = 2e-32 relative error = 7.0826907378453352596653400996119e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.323 y[1] (analytic) = -0.28226303422551346028248551379862 y[1] (numeric) = -0.2822630342255134602824855137986 absolute error = 2e-32 relative error = 7.0855895299492323424816534465835e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.324 y[1] (analytic) = -0.28214710084348368531516105310909 y[1] (numeric) = -0.28214710084348368531516105310908 absolute error = 1e-32 relative error = 3.5442504885234777754588193197624e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.325 y[1] (analytic) = -0.28203075797000754952643890959434 y[1] (numeric) = -0.28203075797000754952643890959433 absolute error = 1e-32 relative error = 3.5457125570195595767603929015261e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.326 y[1] (analytic) = -0.28191400534230389074349682944127 y[1] (numeric) = -0.28191400534230389074349682944126 absolute error = 1e-32 relative error = 3.5471809879959179276589546206202e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.327 y[1] (analytic) = -0.28179684269812902446930129355264 y[1] (numeric) = -0.28179684269812902446930129355263 absolute error = 1e-32 relative error = 3.5486557990688213206404736988316e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.328 y[1] (analytic) = -0.28167926977577738512254104922381 y[1] (numeric) = -0.2816792697757773851225410492238 absolute error = 1e-32 relative error = 3.5501370079382164086591999750086e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.329 y[1] (analytic) = -0.28156128631408216661133930293278 y[1] (numeric) = -0.28156128631408216661133930293277 absolute error = 1e-32 relative error = 3.5516246323881971489124167432289e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.33 y[1] (analytic) = -0.28144289205241596223972513244798 y[1] (numeric) = -0.28144289205241596223972513244798 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.331 y[1] (analytic) = -0.28132408673069140394584547218019 y[1] (numeric) = -0.28132408673069140394584547218018 absolute error = 1e-32 relative error = 3.5546191995898648598429078188639e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.332 y[1] (analytic) = -0.28120487008936180087089982282426 y[1] (numeric) = -0.28120487008936180087089982282425 absolute error = 1e-32 relative error = 3.5561261783347427822991000254878e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.333 y[1] (analytic) = -0.28108524186942177725778063485265 y[1] (numeric) = -0.28108524186942177725778063485264 absolute error = 1e-32 relative error = 3.5576396446475488099632700699974e-30 % Correct digits = 31 h = 0.001 memory used=34.3MB, alloc=4.4MB, time=1.55 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.334 y[1] (analytic) = -0.28096520181240790967840311533362 y[1] (numeric) = -0.28096520181240790967840311533362 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.335 y[1] (analytic) = -0.28084474966039936358870900885354 y[1] (numeric) = -0.28084474966039936358870900885354 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.336 y[1] (analytic) = -0.28072388515601852921032970602191 y[1] (numeric) = -0.2807238851560185292103297060219 absolute error = 1e-32 relative error = 3.5622191515489599584675977566678e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.337 y[1] (analytic) = -0.28060260804243165673789483713067 y[1] (numeric) = -0.28060260804243165673789483713066 absolute error = 1e-32 relative error = 3.5637587511260188001372815978528e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.338 y[1] (analytic) = -0.28048091806334949087097331402324 y[1] (numeric) = -0.28048091806334949087097331402324 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.339 y[1] (analytic) = -0.28035881496302790466963459010396 y[1] (numeric) = -0.28035881496302790466963459010396 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.34 y[1] (analytic) = -0.28023629848626853273261871668362 y[1] (numeric) = -0.28023629848626853273261871668362 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.341 y[1] (analytic) = -0.28011336837841940369710458351092 y[1] (numeric) = -0.28011336837841940369710458351092 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.342 y[1] (analytic) = -0.27999002438537557205906654238153 y[1] (numeric) = -0.27999002438537557205906654238153 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.343 y[1] (analytic) = -0.27986626625357974931321042514584 y[1] (numeric) = -0.27986626625357974931321042514583 absolute error = 1e-32 relative error = 3.5731351741189317839567945466024e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.344 y[1] (analytic) = -0.27974209373002293441148078125156 y[1] (numeric) = -0.27974209373002293441148078125156 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.345 y[1] (analytic) = -0.27961750656224504353913197515828 y[1] (numeric) = -0.27961750656224504353913197515828 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.346 y[1] (analytic) = -0.27949250449833553920735660054529 y[1] (numeric) = -0.27949250449833553920735660054529 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.347 y[1] (analytic) = -0.2793670872869340586614654862027 y[1] (numeric) = -0.2793670872869340586614654862027 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.348 y[1] (analytic) = -0.27924125467723104160361438784597 y[1] (numeric) = -0.27924125467723104160361438784596 absolute error = 1e-32 relative error = 3.5811327418503347041833951738388e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.349 y[1] (analytic) = -0.27911500641896835722907328082594 y[1] (numeric) = -0.27911500641896835722907328082593 absolute error = 1e-32 relative error = 3.5827525464501183116450387777132e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.35 y[1] (analytic) = -0.27898834226243993057503499081883 y[1] (numeric) = -0.27898834226243993057503499081883 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.351 y[1] (analytic) = -0.27886126195849236818096072307241 y[1] (numeric) = -0.27886126195849236818096072307241 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.352 y[1] (analytic) = -0.27873376525852558305946087565482 y[1] (numeric) = -0.27873376525852558305946087565482 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.353 y[1] (analytic) = -0.27860585191449341897671034840072 y[1] (numeric) = -0.27860585191449341897671034840071 absolute error = 1e-32 relative error = 3.5893000564356730600637742440511e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.354 y[1] (analytic) = -0.27847752167890427404139838687347 y[1] (numeric) = -0.27847752167890427404139838687347 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.355 y[1] (analytic) = -0.2783487743048217236012138296628 y[1] (numeric) = -0.2783487743048217236012138296628 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.356 y[1] (analytic) = -0.2782196095458651424458674577116 y[1] (numeric) = -0.2782196095458651424458674577116 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.357 y[1] (analytic) = -0.27809002715621032631565397611458 y[1] (numeric) = -0.27809002715621032631565397611458 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.358 y[1] (analytic) = -0.27796002689059011271455699195248 y[1] (numeric) = -0.27796002689059011271455699195248 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.359 y[1] (analytic) = -0.27782960850429500102690118621859 y[1] (numeric) = -0.27782960850429500102690118621859 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.36 y[1] (analytic) = -0.27769877175317377193655671375826 y[1] (numeric) = -0.27769877175317377193655671375826 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.361 y[1] (analytic) = -0.27756751639363410614770170237568 y[1] (numeric) = -0.27756751639363410614770170237568 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=38.1MB, alloc=4.4MB, time=1.72 x[1] = 0.362 y[1] (analytic) = -0.27743584218264320240614956086463 y[1] (numeric) = -0.27743584218264320240614956086464 absolute error = 1e-32 relative error = 3.6044369470534167431730721287860e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.363 y[1] (analytic) = -0.27730374887772839482024864569032 y[1] (numeric) = -0.27730374887772839482024864569033 absolute error = 1e-32 relative error = 3.6061539162275452246496261762370e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.364 y[1] (analytic) = -0.27717123623697776948036267738657 y[1] (numeric) = -0.27717123623697776948036267738658 absolute error = 1e-32 relative error = 3.6078779803291461443866532193598e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.365 y[1] (analytic) = -0.27703830401904078037594114043582 y[1] (numeric) = -0.27703830401904078037594114043584 absolute error = 2e-32 relative error = 7.2192183210251693190534013948908e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.366 y[1] (analytic) = -0.27690495198312886460918974446742 y[1] (numeric) = -0.27690495198312886460918974446743 absolute error = 1e-32 relative error = 3.6113474780361729762247424158507e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.367 y[1] (analytic) = -0.2767711798890160569043518700414 y[1] (numeric) = -0.27677117988901605690435187004142 absolute error = 2e-32 relative error = 7.2261859085255574864058275684562e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.368 y[1] (analytic) = -0.27663698749703960341161276908043 y[1] (numeric) = -0.27663698749703960341161276908044 absolute error = 1e-32 relative error = 3.6148456106604377211610060503794e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.369 y[1] (analytic) = -0.27650237456810057480463913816855 y[1] (numeric) = -0.27650237456810057480463913816856 absolute error = 1e-32 relative error = 3.6166054688029707633954380040750e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.37 y[1] (analytic) = -0.27636734086366447867076753245416 y[1] (numeric) = -0.27636734086366447867076753245417 absolute error = 1e-32 relative error = 3.6183725503706051433123601914939e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.371 y[1] (analytic) = -0.27623188614576187119285593877158 y[1] (numeric) = -0.27623188614576187119285593877159 absolute error = 1e-32 relative error = 3.6201468771506002648570213655112e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.372 y[1] (analytic) = -0.27609601017698896812181367883285 y[1] (numeric) = -0.27609601017698896812181367883287 absolute error = 2e-32 relative error = 7.2438569420757555844431630078104e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.373 y[1] (analytic) = -0.27595971272050825503882566693593 y[1] (numeric) = -0.27595971272050825503882566693595 absolute error = 2e-32 relative error = 7.2474347080713124710744652095844e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.374 y[1] (analytic) = -0.27582299354004909690628790158703 y[1] (numeric) = -0.27582299354004909690628790158705 absolute error = 2e-32 relative error = 7.2510270965121800592076610320408e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.375 y[1] (analytic) = -0.27568585239990834690647192674283 y[1] (numeric) = -0.27568585239990834690647192674285 absolute error = 2e-32 relative error = 7.2546341518418262861225834645406e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.376 y[1] (analytic) = -0.27554828906495095456693685604064 y[1] (numeric) = -0.27554828906495095456693685604066 absolute error = 2e-32 relative error = 7.2582559187241745115236248544233e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.377 y[1] (analytic) = -0.27541030330061057317170841240144 y[1] (numeric) = -0.27541030330061057317170841240147 absolute error = 3e-32 relative error = 1.0892838663067363627381702742592e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.378 y[1] (analytic) = -0.2752718948728901664572452957602 y[1] (numeric) = -0.27527189487289016645724529576023 absolute error = 3e-32 relative error = 1.0898315650369185303914973302504e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.379 y[1] (analytic) = -0.27513306354836261459221405339944 y[1] (numeric) = -0.27513306354836261459221405339946 absolute error = 2e-32 relative error = 7.2692099386609781319381381981985e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.38 y[1] (analytic) = -0.2749938090941713194400944904346 y[1] (numeric) = -0.27499380909417131944009449043462 absolute error = 2e-32 relative error = 7.2728910028483668812986887057783e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.381 y[1] (analytic) = -0.27485413127803080910363852242226 y[1] (numeric) = -0.27485413127803080910363852242228 absolute error = 2e-32 relative error = 7.2765870052609273950271548757187e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.382 y[1] (analytic) = -0.27471402986822734175020623783346 y[1] (numeric) = -0.27471402986822734175020623783349 absolute error = 3e-32 relative error = 1.0920446987869590529713860042431e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.383 y[1] (analytic) = -0.2745735046336195087170038052539 y[1] (numeric) = -0.27457350463361950871700380525392 absolute error = 2e-32 relative error = 7.2840240090489586566354863432905e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.384 y[1] (analytic) = -0.27443255534363883689524872863888 y[1] (numeric) = -0.2744325553436388368952487286389 absolute error = 2e-32 relative error = 7.2877651031439796797789549393098e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.385 y[1] (analytic) = -0.27429118176829039039228882376312 y[1] (numeric) = -0.27429118176829039039228882376314 absolute error = 2e-32 relative error = 7.2915213209060273717200217049946e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.386 y[1] (analytic) = -0.27414938367815337147070216016233 y[1] (numeric) = -0.27414938367815337147070216016235 absolute error = 2e-32 relative error = 7.2952927092769442903988123132624e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.387 y[1] (analytic) = -0.27400716084438172076340608536444 y[1] (numeric) = -0.27400716084438172076340608536445 absolute error = 1e-32 relative error = 3.6495396577169568263203922786027e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.388 y[1] (analytic) = -0.27386451303870471676380432205192 y[1] (numeric) = -0.27386451303870471676380432205193 absolute error = 1e-32 relative error = 3.6514405933954357425373037540559e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.389 y[1] (analytic) = -0.27372144003342757459000200398226 y[1] (numeric) = -0.27372144003342757459000200398227 absolute error = 1e-32 relative error = 3.6533491854999644806719446954284e-30 % Correct digits = 31 h = 0.001 memory used=41.9MB, alloc=4.4MB, time=1.90 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.39 y[1] (analytic) = -0.27357794160143204402211939301962 y[1] (numeric) = -0.27357794160143204402211939301963 absolute error = 1e-32 relative error = 3.6552654579764025059527876329111e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.391 y[1] (analytic) = -0.27343401751617700681173589749697 y[1] (numeric) = -0.27343401751617700681173589749697 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.392 y[1] (analytic) = -0.27328966755169907326249689133249 y[1] (numeric) = -0.27328966755169907326249689133248 absolute error = 1e-32 relative error = 3.6591211404317978032757689584985e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.393 y[1] (analytic) = -0.2731448914826131780809167138666 y[1] (numeric) = -0.27314489148261317808091671386661 absolute error = 1e-32 relative error = 3.6610605989080129242255516323910e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.394 y[1] (analytic) = -0.272999689084113175496412112265 y[1] (numeric) = -0.27299968908411317549641211226501 absolute error = 1e-32 relative error = 3.6630078347521222969259946634031e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.395 y[1] (analytic) = -0.27285406013197243364960127154749 y[1] (numeric) = -0.27285406013197243364960127154749 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.396 y[1] (analytic) = -0.27270800440254442824790446185224 y[1] (numeric) = -0.27270800440254442824790446185224 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.397 y[1] (analytic) = -0.27256152167276333548748321842745 y[1] (numeric) = -0.27256152167276333548748321842745 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.398 y[1] (analytic) = -0.27241461172014462424055585705783 y[1] (numeric) = -0.27241461172014462424055585705783 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.399 y[1] (analytic) = -0.27226727432278564750712801618032 y[1] (numeric) = -0.27226727432278564750712801618032 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.4 y[1] (analytic) = -0.27211950925936623313017780682054 y[1] (numeric) = -0.27211950925936623313017780682054 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.401 y[1] (analytic) = -0.27197131630914927377333604268811 y[1] (numeric) = -0.27197131630914927377333604268811 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.402 y[1] (analytic) = -0.27182269525198131616010291530403 y[1] (numeric) = -0.27182269525198131616010291530402 absolute error = 1e-32 relative error = 3.6788686797215141587187660990901e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.403 y[1] (analytic) = -0.27167364586829314957364337289542 y[1] (numeric) = -0.27167364586829314957364337289542 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.404 y[1] (analytic) = -0.27152416793910039361620435698177 y[1] (numeric) = -0.27152416793910039361620435698177 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.405 y[1] (analytic) = -0.27137426124600408522719794708995 y[1] (numeric) = -0.27137426124600408522719794708995 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.406 y[1] (analytic) = -0.27122392557119126495899536187375 y[1] (numeric) = -0.27122392557119126495899536187376 absolute error = 1e-32 relative error = 3.6869903637521037653179357592344e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.407 y[1] (analytic) = -0.27107316069743556250947766407418 y[1] (numeric) = -0.27107316069743556250947766407419 absolute error = 1e-32 relative error = 3.6890409859357954319540541483694e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.408 y[1] (analytic) = -0.27092196640809778151038991723982 y[1] (numeric) = -0.27092196640809778151038991723982 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.409 y[1] (analytic) = -0.27077034248712648357054644393051 y[1] (numeric) = -0.27077034248712648357054644393052 absolute error = 1e-32 relative error = 3.6931666548656230384910881778912e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.41 y[1] (analytic) = -0.2706182887190585715729357382516 y[1] (numeric) = -0.2706182887190585715729357382516 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.411 y[1] (analytic) = -0.2704658048890198722247744900082 y[1] (numeric) = -0.2704658048890198722247744900082 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.412 y[1] (analytic) = -0.27031289078272571785956108353009 y[1] (numeric) = -0.2703128907827257178595610835301 absolute error = 1e-32 relative error = 3.6994166171815612368872731366388e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.413 y[1] (analytic) = -0.27015954618648152749017984129443 y[1] (numeric) = -0.27015954618648152749017984129443 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.414 y[1] (analytic) = -0.27000577088718338711210819086661 y[1] (numeric) = -0.27000577088718338711210819086662 absolute error = 1e-32 relative error = 3.7036245437058838880497915030750e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.415 y[1] (analytic) = -0.2698515646723186292557798433873 y[1] (numeric) = -0.2698515646723186292557798433873 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.416 y[1] (analytic) = -0.26969692732996641178715798285391 y[1] (numeric) = -0.26969692732996641178715798285392 absolute error = 1e-32 relative error = 3.7078657510121679760556529824752e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.417 y[1] (analytic) = -0.26954185864879829595557337777913 y[1] (numeric) = -0.26954185864879829595557337777914 absolute error = 1e-32 relative error = 3.7099989033723995235461397443213e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=45.7MB, alloc=4.4MB, time=2.08 TOP MAIN SOLVE Loop x[1] = 0.418 y[1] (analytic) = -0.26938635841807882368788324045304 y[1] (numeric) = -0.26938635841807882368788324045305 absolute error = 1e-32 relative error = 3.7121404583079618449959055938441e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.419 y[1] (analytic) = -0.26923042642766609412800757399112 y[1] (numeric) = -0.26923042642766609412800757399113 absolute error = 1e-32 relative error = 3.7142904435753628883651502676738e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.42 y[1] (analytic) = -0.26907406246801233942090066361435 y[1] (numeric) = -0.26907406246801233942090066361436 absolute error = 1e-32 relative error = 3.7164488870750242066134759942878e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.421 y[1] (analytic) = -0.26891726633016449974001628618028 y[1] (numeric) = -0.26891726633016449974001628618029 absolute error = 1e-32 relative error = 3.7186158168521803620585962940181e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.422 y[1] (analytic) = -0.26876003780576479755732613086338 y[1] (numeric) = -0.26876003780576479755732613086339 absolute error = 1e-32 relative error = 3.7207912610977850949934011152302e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.423 y[1] (analytic) = -0.26860237668705131115495184406854 y[1] (numeric) = -0.26860237668705131115495184406855 absolute error = 1e-32 relative error = 3.7229752481494243161925932462426e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.424 y[1] (analytic) = -0.26844428276685854737747203315211 y[1] (numeric) = -0.26844428276685854737747203315212 absolute error = 1e-32 relative error = 3.7251678064922359835403016002098e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.425 y[1] (analytic) = -0.26828575583861801362396648631884 y[1] (numeric) = -0.26828575583861801362396648631886 absolute error = 2e-32 relative error = 7.4547379295196738472341568843797e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.426 y[1] (analytic) = -0.26812679569635878907886079016047 y[1] (numeric) = -0.26812679569635878907886079016048 absolute error = 1e-32 relative error = 3.7295787517352566596985858743456e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.427 y[1] (analytic) = -0.26796740213470809518063545169985 y[1] (numeric) = -0.26796740213470809518063545169986 absolute error = 1e-32 relative error = 3.7317971963518783082391590720801e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.428 y[1] (analytic) = -0.2678075749488918653274645585042 y[1] (numeric) = -0.26780757494889186532746455850421 absolute error = 1e-32 relative error = 3.7340243276943866065413882393615e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.429 y[1] (analytic) = -0.26764731393473531381884993842923 y[1] (numeric) = -0.26764731393473531381884993842923 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.43 y[1] (analytic) = -0.26748661888866350403231770985318 y[1] (numeric) = -0.26748661888866350403231770985318 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.431 y[1] (analytic) = -0.26732548960770191583424504385415 y[1] (numeric) = -0.26732548960770191583424504385416 absolute error = 1e-32 relative error = 3.7407581352137136259314515298641e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.432 y[1] (analytic) = -0.26716392588947701222388589167431 y[1] (numeric) = -0.26716392588947701222388589167431 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.433 y[1] (analytic) = -0.26700192753221680520966536400027 y[1] (numeric) = -0.26700192753221680520966536400028 absolute error = 1e-32 relative error = 3.7452913139712771522382950653214e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.434 y[1] (analytic) = -0.26683949433475142091681338306868 y[1] (numeric) = -0.26683949433475142091681338306869 absolute error = 1e-32 relative error = 3.7475711850416536197613996194581e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.435 y[1] (analytic) = -0.26667662609651366392540916437792 y[1] (numeric) = -0.26667662609651366392540916437793 absolute error = 1e-32 relative error = 3.7498599507483167157894280510314e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.436 y[1] (analytic) = -0.2665133226175395808379090218517 y[1] (numeric) = -0.26651332261753958083790902185171 absolute error = 1e-32 relative error = 3.7521576414213700840023665914301e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.437 y[1] (analytic) = -0.2663495836984690230752309286546 y[1] (numeric) = -0.26634958369846902307523092865461 absolute error = 1e-32 relative error = 3.7544642875510828072268928391419e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.438 y[1] (analytic) = -0.26618540914054620890047020550442 y[1] (numeric) = -0.26618540914054620890047020550443 absolute error = 1e-32 relative error = 3.7567799197889123389188316626076e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.439 y[1] (analytic) = -0.266020798745620284669321649259 y[1] (numeric) = -0.26602079874562028466932164925901 absolute error = 1e-32 relative error = 3.7591045689485352991041153822578e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.44 y[1] (analytic) = -0.26585575231614588530628435677538 y[1] (numeric) = -0.26585575231614588530628435677539 absolute error = 1e-32 relative error = 3.7614382660068862056003883059937e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.441 y[1] (analytic) = -0.26569026965518369400572644254563 y[1] (numeric) = -0.26569026965518369400572644254563 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.442 y[1] (analytic) = -0.26552435056640100115688779340542 y[1] (numeric) = -0.26552435056640100115688779340542 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.443 y[1] (analytic) = -0.26535799485407226249189994968699 y[1] (numeric) = -0.26535799485407226249189994968698 absolute error = 1e-32 relative error = 3.7684939568145583739841575198503e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.444 y[1] (analytic) = -0.2651912023230796564559031495465 y[1] (numeric) = -0.2651912023230796564559031495465 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.445 y[1] (analytic) = -0.26502397277891364079834152183651 y[1] (numeric) = -0.2650239727789136407983415218365 absolute error = 1e-32 relative error = 3.7732435655328911784321917193066e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=49.5MB, alloc=4.4MB, time=2.26 TOP MAIN SOLVE Loop x[1] = 0.446 y[1] (analytic) = -0.26485630602767350838451836281458 y[1] (numeric) = -0.26485630602767350838451836281457 absolute error = 1e-32 relative error = 3.7756322097745900389698302613468e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.447 y[1] (analytic) = -0.26468820187606794222649438318038 y[1] (numeric) = -0.26468820187606794222649438318038 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.448 y[1] (analytic) = -0.26451966013141556973241276441183 y[1] (numeric) = -0.26451966013141556973241276441182 absolute error = 1e-32 relative error = 3.7804373387716877954842083393371e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.449 y[1] (analytic) = -0.26435068060164551617333581712726 y[1] (numeric) = -0.26435068060164551617333581712725 absolute error = 1e-32 relative error = 3.7828538883427987389315071859186e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.45 y[1] (analytic) = -0.26418126309529795736667898923334 y[1] (numeric) = -0.26418126309529795736667898923333 absolute error = 1e-32 relative error = 3.7852798047955072670753594734736e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.451 y[1] (analytic) = -0.26401140742152467157532892792519 y[1] (numeric) = -0.26401140742152467157532892792519 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.452 y[1] (analytic) = -0.26384111339008959062153325718711 y[1] (numeric) = -0.2638411133900895906215332571871 absolute error = 1e-32 relative error = 3.7901598698967665739107406496600e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.453 y[1] (analytic) = -0.26367038081136935021465069129591 y[1] (numeric) = -0.2636703808113693502146506912959 absolute error = 1e-32 relative error = 3.7926140847629118387548274560428e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.454 y[1] (analytic) = -0.26349920949635383949185106495505 y[1] (numeric) = -0.26349920949635383949185106495505 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.455 y[1] (analytic) = -0.26332759925664674977085582208364 y[1] (numeric) = -0.26332759925664674977085582208364 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.456 y[1] (analytic) = -0.26315554990446612251381046795013 y[1] (numeric) = -0.26315554990446612251381046795012 absolute error = 1e-32 relative error = 3.8000338596812112425299666986577e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.457 y[1] (analytic) = -0.2629830612526448965013814532745 y[1] (numeric) = -0.26298306125264489650138145327451 absolute error = 1e-32 relative error = 3.8025262738854163047803118104513e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.458 y[1] (analytic) = -0.26281013311463145421617092412368 y[1] (numeric) = -0.26281013311463145421617092412368 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.459 y[1] (analytic) = -0.26263676530449016743454373789139 y[1] (numeric) = -0.2626367653044901674345437378914 absolute error = 1e-32 relative error = 3.8075400404838275233832929492672e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.46 y[1] (analytic) = -0.26246295763690194202596211338638 y[1] (numeric) = -0.26246295763690194202596211338639 absolute error = 1e-32 relative error = 3.8100614616384302027207902499534e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.461 y[1] (analytic) = -0.26228870992716476195892425204713 y[1] (numeric) = -0.26228870992716476195892425204715 absolute error = 2e-32 relative error = 7.6251852416956192364749444904734e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.462 y[1] (analytic) = -0.2621140219911942325126042375602 y[1] (numeric) = -0.26211402199119423251260423756022 absolute error = 2e-32 relative error = 7.6302671059207597753067265693779e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.463 y[1] (analytic) = -0.26193889364552412269329149267787 y[1] (numeric) = -0.26193889364552412269329149267788 absolute error = 1e-32 relative error = 3.8176842930140683462082690984318e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.464 y[1] (analytic) = -0.26176332470730690685472904481079 y[1] (numeric) = -0.2617633247073069068547290448108 absolute error = 1e-32 relative error = 3.8202448762375679992540842103347e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.465 y[1] (analytic) = -0.26158731499431430552145082600977 y[1] (numeric) = -0.26158731499431430552145082600978 absolute error = 1e-32 relative error = 3.8228153380515999411518600426691e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.466 y[1] (analytic) = -0.26141086432493782541421920824729 y[1] (numeric) = -0.2614108643249378254142192082473 absolute error = 1e-32 relative error = 3.8253957140701858332909971716779e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.467 y[1] (analytic) = -0.26123397251818929867666495146295 y[1] (numeric) = -0.26123397251818929867666495146297 absolute error = 2e-32 relative error = 7.6559720802038610700718264895391e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.468 y[1] (analytic) = -0.26105663939370142130223271964575 y[1] (numeric) = -0.26105663939370142130223271964577 absolute error = 2e-32 relative error = 7.6611727043026299648107578168876e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.469 y[1] (analytic) = -0.26087886477172829076053629928953 y[1] (numeric) = -0.26087886477172829076053629928955 absolute error = 2e-32 relative error = 7.6663933728399988206031318117685e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.47 y[1] (analytic) = -0.26070064847314594282222863487488 y[1] (numeric) = -0.26070064847314594282222863487489 absolute error = 1e-32 relative error = 3.8358170793081370151298747940282e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.471 y[1] (analytic) = -0.26052199031945288758149277759925 y[1] (numeric) = -0.26052199031945288758149277759926 absolute error = 1e-32 relative error = 3.8384475674156981556869673742304e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.472 y[1] (analytic) = -0.26034289013277064467526082639729 y[1] (numeric) = -0.26034289013277064467526082639731 absolute error = 2e-32 relative error = 7.6821763750876103824865724027446e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.473 y[1] (analytic) = -0.26016334773584427769826892436281 y[1] (numeric) = -0.26016334773584427769826892436283 absolute error = 2e-32 relative error = 7.6874779533921561136157362917358e-30 % Correct digits = 31 h = 0.001 memory used=53.4MB, alloc=4.4MB, time=2.44 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.474 y[1] (analytic) = -0.25998336295204292781305735900201 y[1] (numeric) = -0.25998336295204292781305735900204 absolute error = 3e-32 relative error = 1.1539199916239972029912863367577e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.475 y[1] (analytic) = -0.25980293560536034655402580131392 y[1] (numeric) = -0.25980293560536034655402580131394 absolute error = 2e-32 relative error = 7.6981424222164766362812109588474e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.476 y[1] (analytic) = -0.25962206552041542782465470650537 y[1] (numeric) = -0.25962206552041542782465470650539 absolute error = 2e-32 relative error = 7.7035054628002319788468388560939e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.477 y[1] (analytic) = -0.25944075252245273908700488820583 y[1] (numeric) = -0.25944075252245273908700488820585 absolute error = 2e-32 relative error = 7.7088891415658159696934183258560e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.478 y[1] (analytic) = -0.25925899643734305174260826834816 y[1] (numeric) = -0.25925899643734305174260826834817 absolute error = 1e-32 relative error = 3.8571467672932886840802894780021e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.479 y[1] (analytic) = -0.2590767970915838707038637964256 y[1] (numeric) = -0.25907679709158387070386379642561 absolute error = 1e-32 relative error = 3.8598593591787347112905529367659e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.48 y[1] (analytic) = -0.25889415431229996315505352462113 y[1] (numeric) = -0.25889415431229996315505352462115 absolute error = 2e-32 relative error = 7.7251647697978971244959018453000e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.481 y[1] (analytic) = -0.25871106792724388650209481933121 y[1] (numeric) = -0.25871106792724388650209481933123 absolute error = 2e-32 relative error = 7.7306317662545876166230737745797e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.482 y[1] (analytic) = -0.2585275377647965155101456848715 y[1] (numeric) = -0.25852753776479651551014568487152 absolute error = 2e-32 relative error = 7.7361197855044839748621246986465e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.483 y[1] (analytic) = -0.25834356365396756862818117165569 y[1] (numeric) = -0.25834356365396756862818117165572 absolute error = 3e-32 relative error = 1.1612443358636493880515312185653e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.484 y[1] (analytic) = -0.25815914542439613349965983887903 y[1] (numeric) = -0.25815914542439613349965983887905 absolute error = 2e-32 relative error = 7.7471592056602743532927471241550e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.485 y[1] (analytic) = -0.25797428290635119165840024071406 y[1] (numeric) = -0.25797428290635119165840024071408 absolute error = 2e-32 relative error = 7.7527107642975099362658365981271e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.486 y[1] (analytic) = -0.25778897593073214240878840523726 y[1] (numeric) = -0.25778897593073214240878840523728 absolute error = 2e-32 relative error = 7.7582836611965892901331399516262e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.487 y[1] (analytic) = -0.25760322432906932588943827674894 y[1] (numeric) = -0.25760322432906932588943827674897 absolute error = 3e-32 relative error = 1.1645816964494663553053810872572e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.488 y[1] (analytic) = -0.2574170279335245453194280948253 y[1] (numeric) = -0.25741702793352454531942809482533 absolute error = 3e-32 relative error = 1.1654240685176121870632049088005e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.489 y[1] (analytic) = -0.25723038657689158842623668734862 y[1] (numeric) = -0.25723038657689158842623668734865 absolute error = 3e-32 relative error = 1.1662696775146495842260991055438e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.49 y[1] (analytic) = -0.2570433000925967480545046598988 y[1] (numeric) = -0.25704330009259674805450465989883 absolute error = 3e-32 relative error = 1.1671185356394374761203757900529e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.491 y[1] (analytic) = -0.256855768314699341954746470255 y[1] (numeric) = -0.25685576831469934195474647025503 absolute error = 3e-32 relative error = 1.1679706551594371958930313145496e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.492 y[1] (analytic) = -0.2566677910778922317511403843493 y[1] (numeric) = -0.25666779107789223175114038434933 absolute error = 3e-32 relative error = 1.1688260484111835074794657971361e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.493 y[1] (analytic) = -0.25647936821750234108752431883343 y[1] (numeric) = -0.25647936821750234108752431883346 absolute error = 3e-32 relative error = 1.1696847278007595268599194391312e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.494 y[1] (analytic) = -0.25629049956949117295072658546427 y[1] (numeric) = -0.25629049956949117295072658546429 absolute error = 2e-32 relative error = 7.8036447053618371684264432368781e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.495 y[1] (analytic) = -0.25610118497045532617036156378152 y[1] (numeric) = -0.25610118497045532617036156378154 absolute error = 2e-32 relative error = 7.8094132997890133493256066199741e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.496 y[1] (analytic) = -0.25591142425762701109422134104222 y[1] (numeric) = -0.25591142425762701109422134104224 absolute error = 2e-32 relative error = 7.8152040527373734546599416465195e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.497 y[1] (analytic) = -0.25572121726887456443839537208847 y[1] (numeric) = -0.25572121726887456443839537208849 absolute error = 2e-32 relative error = 7.8210170488009504801409577119569e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.498 y[1] (analytic) = -0.25553056384270296331125122675753 y[1] (numeric) = -0.25553056384270296331125122675755 absolute error = 2e-32 relative error = 7.8268523730536621242758353219331e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.499 y[1] (analytic) = -0.25533946381825433841041050859466 y[1] (numeric) = -0.25533946381825433841041050859468 absolute error = 2e-32 relative error = 7.8327101110526380723221408616607e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.5 y[1] (analytic) = -0.25514791703530848639185504599842 y[1] (numeric) = -0.25514791703530848639185504599844 absolute error = 2e-32 relative error = 7.8385903488415750591316837953986e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=57.2MB, alloc=4.4MB, time=2.62 x[1] = 0.501 y[1] (analytic) = -0.25495592333428338141029947551388 y[1] (numeric) = -0.2549559233342833814102994755139 absolute error = 2e-32 relative error = 7.8444931729541199821229004354647e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.502 y[1] (analytic) = -0.25476348255623568582996735679053 y[1] (numeric) = -0.25476348255623568582996735679055 absolute error = 2e-32 relative error = 7.8504186704172813386498738668249e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.503 y[1] (analytic) = -0.25457059454286126010490897973695 y[1] (numeric) = -0.25457059454286126010490897973698 absolute error = 3e-32 relative error = 1.1784550393132303897654404660007e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.504 y[1] (analytic) = -0.2543772591364956718280000466329 y[1] (numeric) = -0.25437725913649567182800004663292 absolute error = 2e-32 relative error = 7.8623380359909644581812830049374e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.505 y[1] (analytic) = -0.2541834761801147039477614353992 y[1] (numeric) = -0.25418347618011470394776143539922 absolute error = 2e-32 relative error = 7.8683320806534162619226915328311e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.506 y[1] (analytic) = -0.25398924551733486215214127487704 y[1] (numeric) = -0.25398924551733486215214127487706 absolute error = 2e-32 relative error = 7.8743491517773702072598531104180e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.507 y[1] (analytic) = -0.25379456699241388141840158882775 y[1] (numeric) = -0.25379456699241388141840158882778 absolute error = 3e-32 relative error = 1.1820584008363237941146271221305e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.508 y[1] (analytic) = -0.25359944045025123172825279243258 y[1] (numeric) = -0.2535994404502512317282527924326 absolute error = 2e-32 relative error = 7.8864527321082213091701973229134e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.509 y[1] (analytic) = -0.25340386573638862294738035334666 y[1] (numeric) = -0.25340386573638862294738035334669 absolute error = 3e-32 relative error = 1.1838809132931084714370905616058e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.51 y[1] (analytic) = -0.25320784269701050886850895884244 y[1] (numeric) = -0.25320784269701050886850895884247 absolute error = 3e-32 relative error = 1.1847974249319803607901738103069e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.511 y[1] (analytic) = -0.2530113711789445904171505612623 y[1] (numeric) = -0.25301137117894459041715056126233 absolute error = 3e-32 relative error = 1.1857174584766874965569212621216e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.512 y[1] (analytic) = -0.25281445102966231801918370588898 y[1] (numeric) = -0.25281445102966231801918370588901 absolute error = 3e-32 relative error = 1.1866410277504329705435060755997e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.513 y[1] (analytic) = -0.25261708209727939312941257843231 y[1] (numeric) = -0.25261708209727939312941257843235 absolute error = 4e-32 relative error = 1.5834241955417941815639606983876e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.514 y[1] (analytic) = -0.25241926423055626892025524362191 y[1] (numeric) = -0.25241926423055626892025524362195 absolute error = 4e-32 relative error = 1.5846651055707282538130311281336e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.515 y[1] (analytic) = -0.25222099727889865012971158188604 y[1] (numeric) = -0.25222099727889865012971158188608 absolute error = 4e-32 relative error = 1.5859107858402907772305443303813e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.516 y[1] (analytic) = -0.25202228109235799206776246778569 y[1] (numeric) = -0.25202228109235799206776246778573 absolute error = 4e-32 relative error = 1.5871612552122444022354023919388e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.517 y[1] (analytic) = -0.25182311552163199878035277175889 y[1] (numeric) = -0.25182311552163199878035277175892 absolute error = 3e-32 relative error = 1.1913123994934830818862529718172e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.518 y[1] (analytic) = -0.2516235004180651203701118058119 y[1] (numeric) = -0.25162350041806512037011180581194 absolute error = 4e-32 relative error = 1.5896766372592847857797166959597e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.519 y[1] (analytic) = -0.25142343563364904947296587407049 y[1] (numeric) = -0.25142343563364904947296587407053 absolute error = 4e-32 relative error = 1.5909415882091555024067582401155e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.52 y[1] (analytic) = -0.2512229210210232168897986305738 y[1] (numeric) = -0.25122292102102321688979863057385 absolute error = 5e-32 relative error = 1.9902642560157090239300578800053e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.521 y[1] (analytic) = -0.25102195643347528637231598935575 y[1] (numeric) = -0.25102195643347528637231598935579 absolute error = 4e-32 relative error = 1.5934861064872873258151024638525e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.522 y[1] (analytic) = -0.25082054172494164856227337571087 y[1] (numeric) = -0.25082054172494164856227337571091 absolute error = 4e-32 relative error = 1.5947657127646810837465786271874e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.523 y[1] (analytic) = -0.25061867675000791408322415258457 y[1] (numeric) = -0.25061867675000791408322415258461 absolute error = 4e-32 relative error = 1.5960502432905267054305627275698e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.524 y[1] (analytic) = -0.25041636136390940578394910225782 y[1] (numeric) = -0.25041636136390940578394910225786 absolute error = 4e-32 relative error = 1.5973397178258374757346567814248e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.525 y[1] (analytic) = -0.25021359542253165013272789091476 y[1] (numeric) = -0.2502135954225316501327278909148 absolute error = 4e-32 relative error = 1.5986341562476909857840537369022e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.526 y[1] (analytic) = -0.25001037878241086776161449228505 y[1] (numeric) = -0.25001037878241086776161449228508 absolute error = 3e-32 relative error = 1.1999501839125491635962148205010e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.527 y[1] (analytic) = -0.2498067113007344631598795963414 y[1] (numeric) = -0.24980671130073446315987959634143 absolute error = 3e-32 relative error = 1.2009285036335129169783512329785e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.528 y[1] (analytic) = -0.2496025928353415135157840800047 y[1] (numeric) = -0.24960259283534151351578408000474 absolute error = 4e-32 relative error = 1.6025474553618641234188465307091e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=61.0MB, alloc=4.4MB, time=2.79 TOP MAIN SOLVE Loop x[1] = 0.529 y[1] (analytic) = -0.24939802324472325670584866896274 y[1] (numeric) = -0.24939802324472325670584866896279 absolute error = 5e-32 relative error = 2.0048274380642227473618758136616e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.53 y[1] (analytic) = -0.24919300238802357843078597304384 y[1] (numeric) = -0.24919300238802357843078597304389 absolute error = 5e-32 relative error = 2.0064768882291472125315064666986e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.531 y[1] (analytic) = -0.24898753012503949849726213210095 y[1] (numeric) = -0.24898753012503949849726213210099 absolute error = 4e-32 relative error = 1.6065061563489676606589932208797e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.532 y[1] (analytic) = -0.24878160631622165624465636505481 y[1] (numeric) = -0.24878160631622165624465636505485 absolute error = 4e-32 relative error = 1.6078359084616869386099776795811e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.533 y[1] (analytic) = -0.2485752308226747951159877716149 y[1] (numeric) = -0.24857523082267479511598777161495 absolute error = 5e-32 relative error = 2.0114634846972471466420906029016e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.534 y[1] (analytic) = -0.24836840350615824637217979424262 y[1] (numeric) = -0.24836840350615824637217979424267 absolute error = 5e-32 relative error = 2.0131385189968521781744763330132e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.535 y[1] (analytic) = -0.24816112422908641194883380714176 y[1] (numeric) = -0.2481611242290864119488338071418 absolute error = 4e-32 relative error = 1.6118560118656848510386879417730e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.536 y[1] (analytic) = -0.24795339285452924645468435945545 y[1] (numeric) = -0.2479533928545292464546843594555 absolute error = 5e-32 relative error = 2.0165079987162867261244318378672e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.537 y[1] (analytic) = -0.24774520924621273831090966141449 y[1] (numeric) = -0.24774520924621273831090966141454 absolute error = 5e-32 relative error = 2.0182024973209182691750878345512e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.538 y[1] (analytic) = -0.24753657326851939003047196491865 y[1] (numeric) = -0.2475365732685193900304719649187 absolute error = 5e-32 relative error = 2.0199035374769316782789173418177e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.539 y[1] (analytic) = -0.24732748478648869763666355393942 y[1] (numeric) = -0.24732748478648869763666355393947 absolute error = 5e-32 relative error = 2.0216111461758357696971690198289e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.54 y[1] (analytic) = -0.24711794366581762922003512520681 y[1] (numeric) = -0.24711794366581762922003512520686 absolute error = 5e-32 relative error = 2.0233253505708984957927070487336e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.541 y[1] (analytic) = -0.2469079497728611026328844058847 y[1] (numeric) = -0.24690794977286110263288440588474 absolute error = 4e-32 relative error = 1.6200369423826709702413116332871e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.542 y[1] (analytic) = -0.24669750297463246232048392234668 y[1] (numeric) = -0.24669750297463246232048392234673 absolute error = 5e-32 relative error = 2.0267736558785285195340997215464e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.543 y[1] (analytic) = -0.24648660313880395528822790273626 y[1] (numeric) = -0.2464866031388039552882279027363 absolute error = 4e-32 relative error = 1.6228062495337650212910697915445e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.544 y[1] (analytic) = -0.24627525013370720620387936573013 y[1] (numeric) = -0.24627525013370720620387936573017 absolute error = 4e-32 relative error = 1.6241989391253603337332652652058e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.545 y[1] (analytic) = -0.24606344382833369163409951882073 y[1] (numeric) = -0.24606344382833369163409951882078 absolute error = 5e-32 relative error = 2.0319962698271641611848263106679e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.546 y[1] (analytic) = -0.24585118409233521341444266149154 y[1] (numeric) = -0.24585118409233521341444266149158 absolute error = 4e-32 relative error = 1.6270005022622569977056083644912e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.547 y[1] (analytic) = -0.24563847079602437115200086187575 y[1] (numeric) = -0.24563847079602437115200086187579 absolute error = 4e-32 relative error = 1.6284094209825782365618435980595e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.548 y[1] (analytic) = -0.24542530381037503385988374986442 y[1] (numeric) = -0.24542530381037503385988374986446 absolute error = 4e-32 relative error = 1.6298237948156123376188881660771e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.549 y[1] (analytic) = -0.24521168300702281072271984516158 y[1] (numeric) = -0.24521168300702281072271984516163 absolute error = 5e-32 relative error = 2.0390545583657207139812275511137e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.55 y[1] (analytic) = -0.24499760825826552099236691547182 y[1] (numeric) = -0.24499760825826552099236691547187 absolute error = 5e-32 relative error = 2.0408362496050261957482039618030e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.551 y[1] (analytic) = -0.24478307943706366301301993784722 y[1] (numeric) = -0.24478307943706366301301993784726 absolute error = 4e-32 relative error = 1.6340998770008703176287536033261e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.552 y[1] (analytic) = -0.24456809641704088237490631521542 y[1] (numeric) = -0.24456809641704088237490631521547 absolute error = 5e-32 relative error = 2.0444203774943446500254859352696e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.553 y[1] (analytic) = -0.24435265907248443919575908025701 y[1] (numeric) = -0.24435265907248443919575908025706 absolute error = 5e-32 relative error = 2.0462228727033442374063257972014e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.554 y[1] (analytic) = -0.24413676727834567452925990009673 y[1] (numeric) = -0.24413676727834567452925990009677 absolute error = 4e-32 relative error = 1.6384258891408652131486752624212e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.555 y[1] (analytic) = -0.24392042091024047589964477771948 y[1] (numeric) = -0.24392042091024047589964477771953 absolute error = 5e-32 relative error = 2.0498488733913486454389842147055e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=64.8MB, alloc=4.4MB, time=2.98 x[1] = 0.556 y[1] (analytic) = -0.24370361984444974196166642961533 y[1] (numeric) = -0.24370361984444974196166642961538 absolute error = 5e-32 relative error = 2.0516724385100975406946467922312e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.557 y[1] (analytic) = -0.24348636395791984628510840389776 y[1] (numeric) = -0.24348636395791984628510840389782 absolute error = 6e-32 relative error = 2.4642037042521776318436333649676e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.558 y[1] (analytic) = -0.24326865312826310026304708902531 y[1] (numeric) = -0.24326865312826310026304708902536 absolute error = 5e-32 relative error = 2.0553408487709084763969185202709e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.559 y[1] (analytic) = -0.24305048723375821514305885028522 y[1] (numeric) = -0.24305048723375821514305885028528 absolute error = 6e-32 relative error = 2.4686229055897308929402500208712e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.56 y[1] (analytic) = -0.24283186615335076318057061937052 y[1] (numeric) = -0.24283186615335076318057061937057 absolute error = 5e-32 relative error = 2.0590378351918811864487959395115e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.561 y[1] (analytic) = -0.2426127897666536379135533516942 y[1] (numeric) = -0.24261278976665363791355335169425 absolute error = 5e-32 relative error = 2.0608971212148495793231503514072e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.562 y[1] (analytic) = -0.24239325795394751355775885653827 y[1] (numeric) = -0.24239325795394751355775885653831 absolute error = 4e-32 relative error = 1.6502109150081901856785679675032e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.563 y[1] (analytic) = -0.24217327059618130352170159672666 y[1] (numeric) = -0.2421732705961813035217015967267 absolute error = 4e-32 relative error = 1.6517099472426556845564027772140e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.564 y[1] (analytic) = -0.24195282757497261804058814724089 y[1] (numeric) = -0.24195282757497261804058814724093 absolute error = 4e-32 relative error = 1.6532148188103077937797385435714e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.565 y[1] (analytic) = -0.24173192877260822092839809606243 y[1] (numeric) = -0.24173192877260822092839809606247 absolute error = 4e-32 relative error = 1.6547255550021734523418628344578e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.566 y[1] (analytic) = -0.24151057407204448544732126552615 y[1] (numeric) = -0.2415105740720444854473212655262 absolute error = 5e-32 relative error = 2.0703027265830857796857181897731e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.567 y[1] (analytic) = -0.2412887633569078492937572286031 y[1] (numeric) = -0.24128876335690784929375722860314 absolute error = 4e-32 relative error = 1.6577647232098030110259567324107e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.568 y[1] (analytic) = -0.24106649651149526870008419179632 y[1] (numeric) = -0.24106649651149526870008419179636 absolute error = 4e-32 relative error = 1.6592932065983958859165945004171e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.569 y[1] (analytic) = -0.24084377342077467165140541473095 y[1] (numeric) = -0.240843773420774671651405414731 absolute error = 5e-32 relative error = 2.0760345716991289401380244448063e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.57 y[1] (analytic) = -0.24062059397038541021648243604545 y[1] (numeric) = -0.24062059397038541021648243604551 absolute error = 6e-32 relative error = 2.4935521523724836457527753675926e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.571 y[1] (analytic) = -0.2403969580466387119920654758459 y[1] (numeric) = -0.24039695804663871199206547584595 absolute error = 5e-32 relative error = 2.0798932068973870282886829030640e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.572 y[1] (analytic) = -0.24017286553651813065983248676654 y[1] (numeric) = -0.24017286553651813065983248676659 absolute error = 5e-32 relative error = 2.0818338444813838458165351718289e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.573 y[1] (analytic) = -0.23994831632767999565514942858727 y[1] (numeric) = -0.23994831632767999565514942858732 absolute error = 5e-32 relative error = 2.0837820729576876854886809441450e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.574 y[1] (analytic) = -0.23972331030845386094686544538966 y[1] (numeric) = -0.23972331030845386094686544538971 absolute error = 5e-32 relative error = 2.0857379257638570228103044413226e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.575 y[1] (analytic) = -0.23949784736784295292735772938795 y[1] (numeric) = -0.239497847367842952927357729388 absolute error = 5e-32 relative error = 2.0877014365480026162802873300428e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.576 y[1] (analytic) = -0.23927192739552461741204196184733 y[1] (numeric) = -0.23927192739552461741204196184738 absolute error = 5e-32 relative error = 2.0896726391704239874145621804925e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.577 y[1] (analytic) = -0.23904555028185076574756532889823 y[1] (numeric) = -0.23904555028185076574756532889828 absolute error = 5e-32 relative error = 2.0916515677052612105315352707247e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.578 y[1] (analytic) = -0.23881871591784832002790021857074 y[1] (numeric) = -0.23881871591784832002790021857079 absolute error = 5e-32 relative error = 2.0936382564421621797036270847898e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.579 y[1] (analytic) = -0.23859142419521965741755781500633 y[1] (numeric) = -0.23859142419521965741755781500638 absolute error = 5e-32 relative error = 2.0956327398879655223737351279274e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.58 y[1] (analytic) = -0.23836367500634305358114191655352 y[1] (numeric) = -0.23836367500634305358114191655356 absolute error = 4e-32 relative error = 1.6781080422147194650077738280247e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.581 y[1] (analytic) = -0.23813546824427312521846441631844 y[1] (numeric) = -0.2381354682442731252184644163185 absolute error = 6e-32 relative error = 2.5195742760357550659891460381330e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.582 y[1] (analytic) = -0.23790680380274127170444499671976 y[1] (numeric) = -0.2379068038027412717044449967198 absolute error = 4e-32 relative error = 1.6813306454726580454179913629371e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.583 y[1] (analytic) = -0.23767768157615611583301870368716 y[1] (numeric) = -0.2376776815761561158330187036872 absolute error = 4e-32 relative error = 1.6829514548753832154036851199675e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=68.6MB, alloc=4.4MB, time=3.16 x[1] = 0.584 y[1] (analytic) = -0.23744810145960394366427618134524 y[1] (numeric) = -0.23744810145960394366427618134528 absolute error = 4e-32 relative error = 1.6845786407268888341596635428966e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.585 y[1] (analytic) = -0.2372180633488491434740624643347 y[1] (numeric) = -0.23721806334884914347406246433475 absolute error = 5e-32 relative error = 2.1077652896301909524830269432674e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.586 y[1] (analytic) = -0.23698756714033464380526134234323 y[1] (numeric) = -0.23698756714033464380526134234329 absolute error = 6e-32 relative error = 2.5317783850015380011346728131857e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.587 y[1] (analytic) = -0.23675661273118235061999342994452 y[1] (numeric) = -0.23675661273118235061999342994457 absolute error = 5e-32 relative error = 2.1118734308287678176215473446582e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.588 y[1] (analytic) = -0.23652520001919358355195719447632 y[1] (numeric) = -0.23652520001919358355195719447639 absolute error = 7e-32 relative error = 2.9595155186136457832830288783725e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.589 y[1] (analytic) = -0.2362933289028495112581433154254 y[1] (numeric) = -0.23629332890284951125814331542546 absolute error = 6e-32 relative error = 2.5392168402971975440594253636193e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.59 y[1] (analytic) = -0.23606099928131158586915387062595 y[1] (numeric) = -0.23606099928131158586915387062601 absolute error = 6e-32 relative error = 2.5417159201507313102302092103720e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.591 y[1] (analytic) = -0.23582821105442197653735896752063 y[1] (numeric) = -0.2358282110544219765373589675207 absolute error = 7e-32 relative error = 2.9682623502514773180291314492997e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.592 y[1] (analytic) = -0.23559496412270400208212456177376 y[1] (numeric) = -0.23559496412270400208212456177382 absolute error = 6e-32 relative error = 2.5467437397664593155440227620238e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.593 y[1] (analytic) = -0.23536125838736256273134633066748 y[1] (numeric) = -0.23536125838736256273134633066754 absolute error = 6e-32 relative error = 2.5492725697978179750483500023726e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.594 y[1] (analytic) = -0.23512709375028457095852559494982 y[1] (numeric) = -0.23512709375028457095852559494987 absolute error = 5e-32 relative error = 2.1265095060929993617612913895738e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.595 y[1] (analytic) = -0.23489247011403938141462441013763 y[1] (numeric) = -0.23489247011403938141462441013768 absolute error = 5e-32 relative error = 2.1286335818140613152542869818413e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.596 y[1] (analytic) = -0.23465738738187921995393807670739 y[1] (numeric) = -0.23465738738187921995393807670745 absolute error = 6e-32 relative error = 2.5569192885607545634147913905084e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.597 y[1] (analytic) = -0.23442184545773961175322444812922 y[1] (numeric) = -0.23442184545773961175322444812927 absolute error = 5e-32 relative error = 2.1329070207756617921184859686325e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.598 y[1] (analytic) = -0.23418584424623980852333054631486 y[1] (numeric) = -0.23418584424623980852333054631491 absolute error = 5e-32 relative error = 2.1350564617145010083569426013823e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.599 y[1] (analytic) = -0.23394938365268321481255812575665 y[1] (numeric) = -0.2339493836526832148125581257567 absolute error = 5e-32 relative error = 2.1372144358469028801312789096702e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.6 y[1] (analytic) = -0.23371246358305781340101096042953 y[1] (numeric) = -0.23371246358305781340101096042958 absolute error = 5e-32 relative error = 2.1393809826590942316117834510808e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.601 y[1] (analytic) = -0.23347508394403658978516776141222 y[1] (numeric) = -0.23347508394403658978516776141228 absolute error = 6e-32 relative error = 2.5698673702750163346784058204865e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.602 y[1] (analytic) = -0.23323724464297795575192576815402 y[1] (numeric) = -0.23323724464297795575192576815408 absolute error = 6e-32 relative error = 2.5724879442750873886742135394893e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.603 y[1] (analytic) = -0.23299894558792617204136119236954 y[1] (numeric) = -0.2329989455879261720413611923696 absolute error = 6e-32 relative error = 2.5751189495129266506408163329955e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.604 y[1] (analytic) = -0.23276018668761177009745383068373 y[1] (numeric) = -0.23276018668761177009745383068379 absolute error = 6e-32 relative error = 2.5777604346282039173921212775693e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.605 y[1] (analytic) = -0.23252096785145197290602430037224 y[1] (numeric) = -0.2325209678514519729060243003723 absolute error = 6e-32 relative error = 2.5804124485810465846910179942762e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.606 y[1] (analytic) = -0.23228128898955111491913349184604 y[1] (numeric) = -0.2322812889895511149191334918461 absolute error = 6e-32 relative error = 2.5830750406546532220038397284294e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.607 y[1] (analytic) = -0.23204115001270106106519497191339 y[1] (numeric) = -0.23204115001270106106519497191345 absolute error = 6e-32 relative error = 2.5857482604579327996120607157936e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.608 y[1] (analytic) = -0.23180055083238162484405221331469 y[1] (numeric) = -0.23180055083238162484405221331474 absolute error = 5e-32 relative error = 2.1570267982734748852880691421952e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.609 y[1] (analytic) = -0.23155949136076098550627366856561 y[1] (numeric) = -0.23155949136076098550627366856566 absolute error = 5e-32 relative error = 2.1592723194447632900552965189854e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.61 y[1] (analytic) = -0.2313179715106961043159198497598 y[1] (numeric) = -0.23131797151069610431591984975984 absolute error = 4e-32 relative error = 1.7292214581844717019660180455095e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.611 y[1] (analytic) = -0.23107599119573313989603772067223 y[1] (numeric) = -0.23107599119573313989603772067228 absolute error = 5e-32 relative error = 2.1637903505798424579914890068598e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=72.4MB, alloc=4.4MB, time=3.34 TOP MAIN SOLVE Loop x[1] = 0.612 y[1] (analytic) = -0.23083355033010786265613885326812 y[1] (numeric) = -0.23083355033010786265613885326817 absolute error = 5e-32 relative error = 2.1660629457241618066712436166393e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.613 y[1] (analytic) = -0.2305906488287460683009189475569 y[1] (numeric) = -0.23059064882874606830091894755695 absolute error = 5e-32 relative error = 2.1683446511802720447406088792339e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.614 y[1] (analytic) = -0.23034728660726399041947746163658 y[1] (numeric) = -0.23034728660726399041947746163663 absolute error = 5e-32 relative error = 2.1706355102523379342005648170308e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.615 y[1] (analytic) = -0.23010346358196871215429724774809 y[1] (numeric) = -0.23010346358196871215429724774815 absolute error = 6e-32 relative error = 2.6075226798412129247254630702344e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.616 y[1] (analytic) = -0.22985917966985857694924524020123 y[1] (numeric) = -0.22985917966985857694924524020128 absolute error = 5e-32 relative error = 2.1752448639124982298114765033371e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.617 y[1] (analytic) = -0.22961443478862359837585639214223 y[1] (numeric) = -0.22961443478862359837585639214228 absolute error = 5e-32 relative error = 2.1775634465676581946763917437020e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.618 y[1] (analytic) = -0.22936922885664586903716421030618 y[1] (numeric) = -0.22936922885664586903716421030624 absolute error = 6e-32 relative error = 2.6158696307733402096040803913743e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.619 y[1] (analytic) = -0.22912356179299996854834239013401 y[1] (numeric) = -0.22912356179299996854834239013406 absolute error = 5e-32 relative error = 2.1822286459204112684850514435816e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.62 y[1] (analytic) = -0.2288774335174533705934232079325 y[1] (numeric) = -0.22887743351745337059342320793254 absolute error = 4e-32 relative error = 1.7476602819801255654467759703839e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.621 y[1] (analytic) = -0.22863084395046684905735948211543 y[1] (numeric) = -0.22863084395046684905735948211548 absolute error = 5e-32 relative error = 2.1869315240262403496214650354002e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.622 y[1] (analytic) = -0.22838379301319488323269807198253 y[1] (numeric) = -0.22838379301319488323269807198258 absolute error = 5e-32 relative error = 2.1892972062650368496229534679982e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.623 y[1] (analytic) = -0.22813628062748606210013403996944 y[1] (numeric) = -0.22813628062748606210013403996949 absolute error = 5e-32 relative error = 2.1916724451926545306721463197140e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.624 y[1] (analytic) = -0.22788830671588348768221576183561 y[1] (numeric) = -0.22788830671588348768221576183567 absolute error = 6e-32 relative error = 2.6328687445470446410013021487860e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.625 y[1] (analytic) = -0.22763987120162517746947242884494 y[1] (numeric) = -0.227639871201625177469472428845 absolute error = 6e-32 relative error = 2.6357421344197125484395455639526e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.626 y[1] (analytic) = -0.22739097400864446591823654663626 y[1] (numeric) = -0.22739097400864446591823654663632 absolute error = 6e-32 relative error = 2.6386271601844252509462070862351e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.627 y[1] (analytic) = -0.22714161506157040501943519717546 y[1] (numeric) = -0.22714161506157040501943519717552 absolute error = 6e-32 relative error = 2.6415238785607837864871357356733e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.628 y[1] (analytic) = -0.22689179428572816393762499292626 y[1] (numeric) = -0.22689179428572816393762499292633 absolute error = 7e-32 relative error = 3.0851710710986741742696077088412e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.629 y[1] (analytic) = -0.22664151160713942771954681617176 y[1] (numeric) = -0.22664151160713942771954681617182 absolute error = 6e-32 relative error = 2.6473526219682141288158668832571e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.63 y[1] (analytic) = -0.22639076695252279507147760126211 y[1] (numeric) = -0.22639076695252279507147760126216 absolute error = 5e-32 relative error = 2.2085706353247911415593729552542e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.631 y[1] (analytic) = -0.22613956024929417520465758345378 y[1] (numeric) = -0.22613956024929417520465758345384 absolute error = 6e-32 relative error = 2.6532288262105290562191966000736e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.632 y[1] (analytic) = -0.22588789142556718374807260494109 y[1] (numeric) = -0.22588789142556718374807260494115 absolute error = 6e-32 relative error = 2.6561848721214316196216466300865e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.633 y[1] (analytic) = -0.22563576041015353772787223665991 y[1] (numeric) = -0.22563576041015353772787223665997 absolute error = 6e-32 relative error = 2.6591529592177188864801937139389e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.634 y[1] (analytic) = -0.22538316713256344961270564346579 y[1] (numeric) = -0.22538316713256344961270564346586 absolute error = 7e-32 relative error = 3.1058220048362419237629153574907e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.635 y[1] (analytic) = -0.22513011152300602042425829035139 y[1] (numeric) = -0.22513011152300602042425829035144 absolute error = 5e-32 relative error = 2.2209379128251578066514431639023e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.636 y[1] (analytic) = -0.22487659351238963191227375847098 y[1] (numeric) = -0.22487659351238963191227375847104 absolute error = 6e-32 relative error = 2.6681300647101044360322482466082e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.637 y[1] (analytic) = -0.2246226130323223377933461118816 y[1] (numeric) = -0.22462261303232233779334611188165 absolute error = 5e-32 relative error = 2.2259557630916345270736685672244e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.638 y[1] (analytic) = -0.2243681700151122540527694290873 y[1] (numeric) = -0.22436817001511225405276942908735 absolute error = 5e-32 relative error = 2.2284800912995931762902988230146e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=76.2MB, alloc=4.4MB, time=3.52 x[1] = 0.639 y[1] (analytic) = -0.2241132643937679483087322876881 y[1] (numeric) = -0.22411326439376794830873228768816 absolute error = 6e-32 relative error = 2.6772177078541744677925653208925e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.64 y[1] (analytic) = -0.22385789610199882823814616568183 y[1] (numeric) = -0.22385789610199882823814616568189 absolute error = 6e-32 relative error = 2.6802717726187126311287781205702e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.641 y[1] (analytic) = -0.22360206507421552906339789924817 y[1] (numeric) = -0.22360206507421552906339789924822 absolute error = 5e-32 relative error = 2.2361153052591241479519994882559e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.642 y[1] (analytic) = -0.22334577124553030009931751415584 y[1] (numeric) = -0.22334577124553030009931751415591 absolute error = 7e-32 relative error = 3.1341538104631059898580935384762e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.643 y[1] (analytic) = -0.22308901455175739035965392627564 y[1] (numeric) = -0.2230890145517573903596539262757 absolute error = 6e-32 relative error = 2.6895093924976660493362958104230e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.644 y[1] (analytic) = -0.2228317949294134332223521860517 y[1] (numeric) = -0.22283179492941343322235218605176 absolute error = 6e-32 relative error = 2.6926139521070697049172532512943e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.645 y[1] (analytic) = -0.22257411231571783015292712218143 y[1] (numeric) = -0.22257411231571783015292712218148 absolute error = 5e-32 relative error = 2.2464427457347688789333909135895e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.646 y[1] (analytic) = -0.22231596664859313348522942117631 y[1] (numeric) = -0.22231596664859313348522942117636 absolute error = 5e-32 relative error = 2.2490512379182015664578918183261e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.647 y[1] (analytic) = -0.22205735786666542825890136192368 y[1] (numeric) = -0.22205735786666542825890136192372 absolute error = 4e-32 relative error = 1.8013363927358823051794317522298e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.648 y[1] (analytic) = -0.22179828590926471311282060783865 y[1] (numeric) = -0.22179828590926471311282060783869 absolute error = 4e-32 relative error = 1.8034404475228257011414722183819e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.649 y[1] (analytic) = -0.2215387507164252802338316436871 y[1] (numeric) = -0.22153875071642528023383164368714 absolute error = 4e-32 relative error = 1.8055531987359143428340705572012e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.65 y[1] (analytic) = -0.22127875222888609436006562967117 y[1] (numeric) = -0.22127875222888609436006562967122 absolute error = 5e-32 relative error = 2.2595933634098338561092332095638e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.651 y[1] (analytic) = -0.22101829038809117083815063189875 y[1] (numeric) = -0.2210182903880911708381506318988 absolute error = 5e-32 relative error = 2.2622562102079350023227719731338e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.652 y[1] (analytic) = -0.22075736513618995273361537590473 y[1] (numeric) = -0.22075736513618995273361537590478 absolute error = 5e-32 relative error = 2.2649300950459309813321593088503e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.653 y[1] (analytic) = -0.22049597641603768699379085845437 y[1] (numeric) = -0.22049597641603768699379085845442 absolute error = 5e-32 relative error = 2.2676150745562207874005704989259e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.654 y[1] (analytic) = -0.22023412417119579966251534243551 y[1] (numeric) = -0.22023412417119579966251534243556 absolute error = 5e-32 relative error = 2.2703112057754149744955437194428e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.655 y[1] (analytic) = -0.21997180834593227014594945023568 y[1] (numeric) = -0.21997180834593227014594945023572 absolute error = 4e-32 relative error = 1.8184148369183364960920965178155e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.656 y[1] (analytic) = -0.21970902888522200452880926260082 y[1] (numeric) = -0.21970902888522200452880926260087 absolute error = 5e-32 relative error = 2.2757371535295645437559002595824e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.657 y[1] (analytic) = -0.21944578573474720794032652258311 y[1] (numeric) = -0.21944578573474720794032652258316 absolute error = 5e-32 relative error = 2.2784670861912552571335279919766e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.658 y[1] (analytic) = -0.21918207884089775596924623780401 y[1] (numeric) = -0.21918207884089775596924623780405 absolute error = 4e-32 relative error = 1.8249667222581473040627585978453e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.659 y[1] (analytic) = -0.21891790815077156512717316888528 y[1] (numeric) = -0.21891790815077156512717316888533 absolute error = 5e-32 relative error = 2.2839611625360662629516784069600e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.66 y[1] (analytic) = -0.2186532736121749623595798875322 y[1] (numeric) = -0.21865327361217496235957988753226 absolute error = 6e-32 relative error = 2.7440705098439058761506567021560e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.661 y[1] (analytic) = -0.21838817517362305360379028438894 y[1] (numeric) = -0.21838817517362305360379028438899 absolute error = 5e-32 relative error = 2.2895012497928965328881157394422e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.662 y[1] (analytic) = -0.21812261278434009139325360442501 y[1] (numeric) = -0.21812261278434009139325360442506 absolute error = 5e-32 relative error = 2.2922886977076272740594053573589e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.663 y[1] (analytic) = -0.21785658639425984150742528625152 y[1] (numeric) = -0.21785658639425984150742528625157 absolute error = 5e-32 relative error = 2.2950878294546442406546811769763e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.664 y[1] (analytic) = -0.21759009595402594866657208140547 y[1] (numeric) = -0.21759009595402594866657208140552 absolute error = 5e-32 relative error = 2.2978987063163192550969969991383e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.665 y[1] (analytic) = -0.21732314141499230127082013027885 y[1] (numeric) = -0.21732314141499230127082013027891 absolute error = 6e-32 relative error = 2.7608656680250263957242094644478e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.666 y[1] (analytic) = -0.21705572272922339518276587300422 y[1] (numeric) = -0.21705572272922339518276587300427 absolute error = 5e-32 relative error = 2.3035559427463198341165666847502e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=80.1MB, alloc=4.4MB, time=3.71 TOP MAIN SOLVE Loop x[1] = 0.667 y[1] (analytic) = -0.21678783984949469655297087623885 y[1] (numeric) = -0.2167878398494946965529708762389 absolute error = 5e-32 relative error = 2.3064024271247215580235989846992e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.668 y[1] (analytic) = -0.2165194927292930036876628604148 y[1] (numeric) = -0.21651949272929300368766286041485 absolute error = 5e-32 relative error = 2.3092609062461322299114936436276e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.669 y[1] (analytic) = -0.21625068132281680795796641663873 y[1] (numeric) = -0.21625068132281680795796641663878 absolute error = 5e-32 relative error = 2.3121314436628530560674309185028e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.67 y[1] (analytic) = -0.21598140558497665374998810803443 y[1] (numeric) = -0.21598140558497665374998810803447 absolute error = 4e-32 relative error = 1.8520112827149014848302044252260e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.671 y[1] (analytic) = -0.21571166547139549745508185691864 y[1] (numeric) = -0.21571166547139549745508185691869 absolute error = 5e-32 relative error = 2.3179089499278963772921268025091e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.672 y[1] (analytic) = -0.21544146093840906549962172678752 y[1] (numeric) = -0.21544146093840906549962172678758 absolute error = 6e-32 relative error = 2.7849792578761312570970770218637e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.673 y[1] (analytic) = -0.21517079194306621141361041666386 y[1] (numeric) = -0.21517079194306621141361041666391 absolute error = 5e-32 relative error = 2.3237354637440710987553594196082e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.674 y[1] (analytic) = -0.21489965844312927193745299491399 y[1] (numeric) = -0.21489965844312927193745299491404 absolute error = 5e-32 relative error = 2.3266672623973446713124026942978e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.675 y[1] (analytic) = -0.21462806039707442216622661018564 y[1] (numeric) = -0.21462806039707442216622661018568 absolute error = 4e-32 relative error = 1.8636892084845601476505963101072e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.676 y[1] (analytic) = -0.21435599776409202973077812864253 y[1] (numeric) = -0.21435599776409202973077812864258 absolute error = 5e-32 relative error = 2.3325682752776129331128921787190e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.677 y[1] (analytic) = -0.21408347050408700801498285917772 y[1] (numeric) = -0.21408347050408700801498285917777 absolute error = 5e-32 relative error = 2.3355376238188115462756312862461e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.678 y[1] (analytic) = -0.21381047857767916840849874177235 y[1] (numeric) = -0.2138104785776791684084987417724 absolute error = 5e-32 relative error = 2.3385196241368766231449801545886e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.679 y[1] (analytic) = -0.21353702194620357159435158863038 y[1] (numeric) = -0.21353702194620357159435158863043 absolute error = 5e-32 relative error = 2.3415143446458905322869090570198e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.68 y[1] (analytic) = -0.21326310057171087787068818315927 y[1] (numeric) = -0.21326310057171087787068818315932 absolute error = 5e-32 relative error = 2.3445218542711390414358294011446e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.681 y[1] (analytic) = -0.2129887144169676965060352582816 y[1] (numeric) = -0.21298871441696769650603525828165 absolute error = 5e-32 relative error = 2.3475422224538654524800460606518e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.682 y[1] (analytic) = -0.21271386344545693412740359295148 y[1] (numeric) = -0.21271386344545693412740359295152 absolute error = 4e-32 relative error = 1.8804604153248623416774805786347e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.683 y[1] (analytic) = -0.21243854762137814214057768410991 y[1] (numeric) = -0.21243854762137814214057768410996 absolute error = 5e-32 relative error = 2.3536218148654106986402821518434e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.684 y[1] (analytic) = -0.21216276690964786318193267064519 y[1] (numeric) = -0.21216276690964786318193267064524 absolute error = 5e-32 relative error = 2.3566811806000398762999694666647e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.685 y[1] (analytic) = -0.21188652127589997660112140622462 y[1] (numeric) = -0.21188652127589997660112140622467 absolute error = 5e-32 relative error = 2.3597536879136545581406415281806e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.686 y[1] (analytic) = -0.21160981068648604297397579913271 y[1] (numeric) = -0.21160981068648604297397579913276 absolute error = 5e-32 relative error = 2.3628394089004839804021315406088e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.687 y[1] (analytic) = -0.21133263510847564764496775948535 y[1] (numeric) = -0.2113326351084756476449677594854 absolute error = 5e-32 relative error = 2.3659384162003814413924018035411e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.688 y[1] (analytic) = -0.21105499450965674329857631738929 y[1] (numeric) = -0.21105499450965674329857631738933 absolute error = 4e-32 relative error = 1.8952406264031725995557597715292e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.689 y[1] (analytic) = -0.21077688885853599155890869977878 y[1] (numeric) = -0.21077688885853599155890869977882 absolute error = 4e-32 relative error = 1.8977412664462567645903558298382e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.69 y[1] (analytic) = -0.21049831812433910361692437878628 y[1] (numeric) = -0.21049831812433910361692437878632 absolute error = 4e-32 relative error = 1.9002527125358041154403382771179e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.691 y[1] (analytic) = -0.21021928227701117988461233058891 y[1] (numeric) = -0.21021928227701117988461233058895 absolute error = 4e-32 relative error = 1.9027750245712952505875901717010e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.692 y[1] (analytic) = -0.20993978128721704867547297071645 y[1] (numeric) = -0.20993978128721704867547297071649 absolute error = 4e-32 relative error = 1.9053082629097483144943833499079e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.693 y[1] (analytic) = -0.20965981512634160391065745980805 y[1] (numeric) = -0.20965981512634160391065745980809 absolute error = 4e-32 relative error = 1.9078524883700715685282189152932e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.694 y[1] (analytic) = -0.20937938376649014185011830276214 y[1] (numeric) = -0.20937938376649014185011830276219 absolute error = 5e-32 relative error = 2.3880097027968322180211851294568e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=83.9MB, alloc=4.4MB, time=3.90 TOP MAIN SOLVE Loop x[1] = 0.695 y[1] (analytic) = -0.20909848718048869684812639413576 y[1] (numeric) = -0.20909848718048869684812639413579 absolute error = 3e-32 relative error = 1.4347306097009077924459840972611e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.696 y[1] (analytic) = -0.20881712534188437613251089351414 y[1] (numeric) = -0.20881712534188437613251089351417 absolute error = 3e-32 relative error = 1.4366637770193756900041316129658e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.697 y[1] (analytic) = -0.20853529822494569360697954638802 y[1] (numeric) = -0.20853529822494569360697954638806 absolute error = 4e-32 relative error = 1.9181404942223381103160847647148e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.698 y[1] (analytic) = -0.20825300580466290267587829884174 y[1] (numeric) = -0.20825300580466290267587829884178 absolute error = 4e-32 relative error = 1.9207405840528030140487515511014e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.699 y[1] (analytic) = -0.20797024805674832809075028807019 y[1] (numeric) = -0.20797024805674832809075028807024 absolute error = 5e-32 relative error = 2.4041900448354816336188647670080e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.7 y[1] (analytic) = -0.20768702495763669681805552540468 y[1] (numeric) = -0.20768702495763669681805552540472 absolute error = 4e-32 relative error = 1.9259749138473655694000881237140e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.701 y[1] (analytic) = -0.20740333648448546792741382413418 y[1] (numeric) = -0.20740333648448546792741382413422 absolute error = 4e-32 relative error = 1.9286092826665856003305817608925e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.702 y[1] (analytic) = -0.20711918261517516149973476096076 y[1] (numeric) = -0.20711918261517516149973476096081 absolute error = 5e-32 relative error = 2.4140690093828427116972923582096e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.703 y[1] (analytic) = -0.20683456332830968655459969742079 y[1] (numeric) = -0.20683456332830968655459969742083 absolute error = 4e-32 relative error = 1.9339127540549289621980810694167e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.704 y[1] (analytic) = -0.20654947860321666799626212603887 y[1] (numeric) = -0.20654947860321666799626212603891 absolute error = 4e-32 relative error = 1.9365819885142554830705272292672e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.705 y[1] (analytic) = -0.20626392841994777257763384535587 y[1] (numeric) = -0.20626392841994777257763384535591 absolute error = 4e-32 relative error = 1.9392629776041636912531871739840e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.706 y[1] (analytic) = -0.20597791275927903388162570828447 y[1] (numeric) = -0.20597791275927903388162570828452 absolute error = 5e-32 relative error = 2.4274447357097789508092536890278e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.707 y[1] (analytic) = -0.20569143160271117631921292949497 y[1] (numeric) = -0.20569143160271117631921292949503 absolute error = 6e-32 relative error = 2.9169907337651663454086841696787e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.708 y[1] (analytic) = -0.20540448493246993814359617971784 y[1] (numeric) = -0.2054044849324699381435961797179 absolute error = 6e-32 relative error = 2.9210657216041789392600218291252e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.709 y[1] (analytic) = -0.20511707273150639347983093796721 y[1] (numeric) = -0.20511707273150639347983093796727 absolute error = 6e-32 relative error = 2.9251587496345875720126850807144e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.71 y[1] (analytic) = -0.20482919498349727336929881673911 y[1] (numeric) = -0.20482919498349727336929881673918 absolute error = 7e-32 relative error = 3.4174815755947181465391083244722e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.711 y[1] (analytic) = -0.2045408516728452858283958202183 y[1] (numeric) = -0.20454085167284528582839582021837 absolute error = 7e-32 relative error = 3.4222992339917569508621836416010e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.712 y[1] (analytic) = -0.20425204278467943492081374143665 y[1] (numeric) = -0.20425204278467943492081374143672 absolute error = 7e-32 relative error = 3.4271383064595998031285613106509e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.713 y[1] (analytic) = -0.2039627683048553388427921511631 y[1] (numeric) = -0.20396276830485533884279215116316 absolute error = 6e-32 relative error = 2.9417133577202824466169995124934e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.714 y[1] (analytic) = -0.20367302821995554702071967906737 y[1] (numeric) = -0.20367302821995554702071967906744 absolute error = 7e-32 relative error = 3.4368811919663654108182405731768e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.715 y[1] (analytic) = -0.2033828225172898562204645363875 y[1] (numeric) = -0.20338282251728985622046453638756 absolute error = 6e-32 relative error = 2.9501016485745405891414000594795e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.716 y[1] (analytic) = -0.20309215118489562566781547894082 y[1] (numeric) = -0.20309215118489562566781547894088 absolute error = 6e-32 relative error = 2.9543239189670034593173583459712e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.717 y[1] (analytic) = -0.20280101421153809117941565985042 y[1] (numeric) = -0.20280101421153809117941565985048 absolute error = 6e-32 relative error = 2.9585650857453345333439393630972e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.718 y[1] (analytic) = -0.20250941158671067830357307281032 y[1] (numeric) = -0.20250941158671067830357307281038 absolute error = 6e-32 relative error = 2.9628252598180673298051397322832e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.719 y[1] (analytic) = -0.20221734330063531447033253908303 y[1] (numeric) = -0.20221734330063531447033253908309 absolute error = 6e-32 relative error = 2.9671045529857624014314631005000e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.72 y[1] (analytic) = -0.20192480934426274015019544471023 y[1] (numeric) = -0.20192480934426274015019544471029 absolute error = 6e-32 relative error = 2.9714030779499543035062320742079e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.721 y[1] (analytic) = -0.20163180970927281902087468861998 y[1] (numeric) = -0.20163180970927281902087468862004 absolute error = 6e-32 relative error = 2.9757209483222065143701508775153e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.722 y[1] (analytic) = -0.2013383443880748471414735574301 y[1] (numeric) = -0.20133834438807484714147355743016 memory used=87.7MB, alloc=4.4MB, time=4.08 absolute error = 6e-32 relative error = 2.9800582786332758306917864928313e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.723 y[1] (analytic) = -0.20104441337380786113347849877665 y[1] (numeric) = -0.20104441337380786113347849877672 absolute error = 7e-32 relative error = 3.4818177150661190822272626431075e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.724 y[1] (analytic) = -0.20075001666034094536795702193589 y[1] (numeric) = -0.20075001666034094536795702193595 absolute error = 6e-32 relative error = 2.9887917818466246561465733893895e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.725 y[1] (analytic) = -0.20045515424227353815835321235721 y[1] (numeric) = -0.20045515424227353815835321235728 absolute error = 7e-32 relative error = 3.4920528865721656213143362245115e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.726 y[1] (analytic) = -0.20015982611493573695827460548205 y[1] (numeric) = -0.20015982611493573695827460548212 absolute error = 7e-32 relative error = 3.4972052763377508844844529942528e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.727 y[1] (analytic) = -0.19986403227438860256366542488623 y[1] (numeric) = -0.1998640322743886025636654248863 absolute error = 7e-32 relative error = 3.5023810539306369890832323782934e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.728 y[1] (analytic) = -0.19956777271742446231876245035201 y[1] (numeric) = -0.19956777271742446231876245035208 absolute error = 7e-32 relative error = 3.5075803596363046356406319997558e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.729 y[1] (analytic) = -0.1992710474415672123252310429471 y[1] (numeric) = -0.19927104744156721232523104294718 absolute error = 8e-32 relative error = 4.0146323827328009685525316604573e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.73 y[1] (analytic) = -0.19897385644507261865388011656114 y[1] (numeric) = -0.19897385644507261865388011656122 absolute error = 8e-32 relative error = 4.0206287111937371856231620463058e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.731 y[1] (analytic) = -0.1986761997269286175583561086232 y[1] (numeric) = -0.19867619972692861755835610862328 absolute error = 8e-32 relative error = 4.0266524178515773019350990594798e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.732 y[1] (analytic) = -0.19837807728685561469021726689633 y[1] (numeric) = -0.19837807728685561469021726689641 absolute error = 8e-32 relative error = 4.0327036683755953050428274993684e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.733 y[1] (analytic) = -0.19807948912530678331479083431377 y[1] (numeric) = -0.19807948912530678331479083431385 absolute error = 8e-32 relative error = 4.0387826298053158858434060095833e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.734 y[1] (analytic) = -0.19778043524346836152721697978659 y[1] (numeric) = -0.19778043524346836152721697978666 absolute error = 7e-32 relative error = 3.5392782867440741271378265339632e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.735 y[1] (analytic) = -0.1974809156432599484680845897712 y[1] (numeric) = -0.19748091564325994846808458977127 absolute error = 7e-32 relative error = 3.5446463154167125152699418708926e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.736 y[1] (analytic) = -0.19718093032733479953806530313666 y[1] (numeric) = -0.19718093032733479953806530313674 absolute error = 8e-32 relative error = 4.0571874707759079570484731383088e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.737 y[1] (analytic) = -0.19688047929908012061095344051408 y[1] (numeric) = -0.19688047929908012061095344051416 absolute error = 8e-32 relative error = 4.0633789741273644825395592974083e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.738 y[1] (analytic) = -0.19657956256261736124452074884226 y[1] (numeric) = -0.19657956256261736124452074884232 absolute error = 6e-32 relative error = 3.0521992834777996561885889283682e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.739 y[1] (analytic) = -0.1962781801228025068885961522437 y[1] (numeric) = -0.19627818012280250688859615224376 absolute error = 6e-32 relative error = 3.0568858934019397826995129397389e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.74 y[1] (analytic) = -0.19597633198522637008978197167145 y[1] (numeric) = -0.19597633198522637008978197167151 absolute error = 6e-32 relative error = 3.0615941931458889614528040887054e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.741 y[1] (analytic) = -0.19567401815621488069221934795795 y[1] (numeric) = -0.19567401815621488069221934795802 absolute error = 7e-32 relative error = 3.5773783693712481788856825541351e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.742 y[1] (analytic) = -0.19537123864282937503381687597202 y[1] (numeric) = -0.1953712386428293750338168759721 absolute error = 8e-32 relative error = 4.0947685317311778709162245348182e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.743 y[1] (analytic) = -0.19506799345286688413735773154602 y[1] (numeric) = -0.1950679934528668841373577315461 absolute error = 8e-32 relative error = 4.1011341011886669596545509183672e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.744 y[1] (analytic) = -0.19476428259486042089590184767182 y[1] (numeric) = -0.1947642825948604208959018476719 absolute error = 8e-32 relative error = 4.1075293135965935667386668922343e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.745 y[1] (analytic) = -0.19446010607807926625190097217943 y[1] (numeric) = -0.19446010607807926625190097217951 absolute error = 8e-32 relative error = 4.1139543535926359243971276187932e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.746 y[1] (analytic) = -0.19415546391252925436944571570429 y[1] (numeric) = -0.19415546391252925436944571570437 absolute error = 8e-32 relative error = 4.1204094073830200481349475121545e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.747 y[1] (analytic) = -0.19385035610895305679906497621735 y[1] (numeric) = -0.19385035610895305679906497621743 absolute error = 8e-32 relative error = 4.1268946627591553734605658631522e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.748 y[1] (analytic) = -0.19354478267883046563449940473388 y[1] (numeric) = -0.19354478267883046563449940473397 absolute error = 9e-32 relative error = 4.6500865977537929676969931743690e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.749 y[1] (analytic) = -0.19323874363437867566087185603163 y[1] (numeric) = -0.19323874363437867566087185603171 absolute error = 8e-32 relative error = 4.1399565374615371746212477841363e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=91.5MB, alloc=4.4MB, time=4.27 x[1] = 0.75 y[1] (analytic) = -0.19293223898855256549367904829406 y[1] (numeric) = -0.19293223898855256549367904829414 absolute error = 8e-32 relative error = 4.1465335404492308365972765642012e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.751 y[1] (analytic) = -0.19262526875504497770802993654974 y[1] (numeric) = -0.19262526875504497770802993654983 absolute error = 9e-32 relative error = 4.6722842014279003068657148290895e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.752 y[1] (analytic) = -0.19231783294828699795755758660113 y[1] (numeric) = -0.19231783294828699795755758660122 absolute error = 9e-32 relative error = 4.6797532303829779964342746265458e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.753 y[1] (analytic) = -0.19200993158344823308243261882532 y[1] (numeric) = -0.19200993158344823308243261882541 absolute error = 9e-32 relative error = 4.6872575422425825931694096298746e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.754 y[1] (analytic) = -0.19170156467643708820590757478301 y[1] (numeric) = -0.19170156467643708820590757478309 absolute error = 8e-32 relative error = 4.1731532100443603786167162307959e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.755 y[1] (analytic) = -0.19139273224390104281882284398874 y[1] (numeric) = -0.19139273224390104281882284398883 absolute error = 9e-32 relative error = 4.7023729137900928369819697490819e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.756 y[1] (analytic) = -0.19108343430322692585150607347423 y[1] (numeric) = -0.19108343430322692585150607347433 absolute error = 1.0e-31 relative error = 5.2333160310124930448270921937482e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.757 y[1] (analytic) = -0.19077367087254118973249826891492 y[1] (numeric) = -0.19077367087254118973249826891501 absolute error = 9e-32 relative error = 4.7176321338456803038596762002693e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.758 y[1] (analytic) = -0.19046344197071018343354108308729 y[1] (numeric) = -0.19046344197071018343354108308738 absolute error = 9e-32 relative error = 4.7253162637814959081998791779034e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.759 y[1] (analytic) = -0.19015274761734042450026107527856 y[1] (numeric) = -0.19015274761734042450026107527865 absolute error = 9e-32 relative error = 4.7330370519343846091445777550490e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.76 y[1] (analytic) = -0.18984158783277887006798801397953 y[1] (numeric) = -0.18984158783277887006798801397963 absolute error = 1.0e-31 relative error = 5.2675497050775071142793919014529e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.761 y[1] (analytic) = -0.18952996263811318686214558475512 y[1] (numeric) = -0.1895299626381131868621455847552 absolute error = 8e-32 relative error = 4.2209684889112379281548895596556e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.762 y[1] (analytic) = -0.18921787205517202018265415560209 y[1] (numeric) = -0.18921787205517202018265415560217 absolute error = 8e-32 relative error = 4.2279304344292411064680621587588e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.763 y[1] (analytic) = -0.18890531610652526187178654337054 y[1] (numeric) = -0.18890531610652526187178654337062 absolute error = 8e-32 relative error = 4.2349258162161694720120167281260e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.764 y[1] (analytic) = -0.18859229481548431726491901694013 y[1] (numeric) = -0.18859229481548431726491901694022 absolute error = 9e-32 relative error = 4.7721992082473231213267102760584e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.765 y[1] (analytic) = -0.18827880820610237112362106580579 y[1] (numeric) = -0.18827880820610237112362106580588 absolute error = 9e-32 relative error = 4.7801449806013260142553647647369e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.766 y[1] (analytic) = -0.18796485630317465255052875653602 y[1] (numeric) = -0.18796485630317465255052875653612 absolute error = 1.0e-31 relative error = 5.3201434548332128457139403584901e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.767 y[1] (analytic) = -0.18765043913223869888544779422072 y[1] (numeric) = -0.18765043913223869888544779422081 absolute error = 9e-32 relative error = 4.7961518457506146322466094298050e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.768 y[1] (analytic) = -0.18733555671957461858213370152109 y[1] (numeric) = -0.18733555671957461858213370152119 absolute error = 1.0e-31 relative error = 5.3380149369983984125450536556517e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.769 y[1] (analytic) = -0.18702020909220535306519782427241 y[1] (numeric) = -0.18702020909220535306519782427251 absolute error = 1.0e-31 relative error = 5.3470157308346101072597346869716e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.77 y[1] (analytic) = -0.18670439627789693756658916976681 y[1] (numeric) = -0.18670439627789693756658916976691 absolute error = 1.0e-31 relative error = 5.3560602746148904403003845063985e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.771 y[1] (analytic) = -0.18638811830515876094110338185924 y[1] (numeric) = -0.18638811830515876094110338185933 absolute error = 9e-32 relative error = 4.8286339718634856332849504612081e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.772 y[1] (analytic) = -0.1860713752032438244603714558912 y[1] (numeric) = -0.1860713752032438244603714558913 absolute error = 1.0e-31 relative error = 5.3742817717540401847465670728262e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.773 y[1] (analytic) = -0.18575416700214899958478209611398 y[1] (numeric) = -0.18575416700214899958478209611408 absolute error = 1.0e-31 relative error = 5.3834593115126776573193534156162e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.774 y[1] (analytic) = -0.18543649373261528471279291881306 y[1] (numeric) = -0.18543649373261528471279291881316 absolute error = 1.0e-31 relative error = 5.3926817740736657844447701156425e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.775 y[1] (analytic) = -0.18511835542612806090708700568777 y[1] (numeric) = -0.18511835542612806090708700568787 absolute error = 1.0e-31 relative error = 5.4019494592963391004201819648085e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.776 y[1] (analytic) = -0.18479975211491734659703261422241 y[1] (numeric) = -0.18479975211491734659703261422251 absolute error = 1.0e-31 relative error = 5.4112626697580852394857439217057e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.777 y[1] (analytic) = -0.18448068383195805125690515479596 y[1] (numeric) = -0.18448068383195805125690515479607 absolute error = 1.1e-31 relative error = 5.9626838818636482248049826955166e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=95.3MB, alloc=4.4MB, time=4.45 TOP MAIN SOLVE Loop x[1] = 0.778 y[1] (analytic) = -0.18416115061097022805933184811582 y[1] (numeric) = -0.18416115061097022805933184811591 absolute error = 9e-32 relative error = 4.8870242014353934536005208304036e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.779 y[1] (analytic) = -0.18384115248641932550342078122407 y[1] (numeric) = -0.18384115248641932550342078122417 absolute error = 1.0e-31 relative error = 5.4394785197719633921907532812388e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.78 y[1] (analytic) = -0.18352068949351643801703738581306 y[1] (numeric) = -0.18352068949351643801703738581315 absolute error = 9e-32 relative error = 4.9040792211702969958589690421917e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.781 y[1] (analytic) = -0.18319976166821855553269266889573 y[1] (numeric) = -0.18319976166821855553269266889582 absolute error = 9e-32 relative error = 4.9126701465361772544725863918006e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.782 y[1] (analytic) = -0.18287836904722881203650883300784 y[1] (numeric) = -0.18287836904722881203650883300792 absolute error = 8e-32 relative error = 4.3744922057643565809512566316848e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.783 y[1] (analytic) = -0.18255651166799673308972923106788 y[1] (numeric) = -0.18255651166799673308972923106796 absolute error = 8e-32 relative error = 4.3822046811176271290751521464325e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.784 y[1] (analytic) = -0.18223418956871848232224090978851 y[1] (numeric) = -0.18223418956871848232224090978859 absolute error = 8e-32 relative error = 4.3899555944650491289195265804590e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.785 y[1] (analytic) = -0.18191140278833710689757930511591 y[1] (numeric) = -0.181911402788337106897579305116 absolute error = 9e-32 relative error = 4.9474633596619251417914973294509e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.786 y[1] (analytic) = -0.1815881513665427819488859635715 y[1] (numeric) = -0.18158815136654278194888596357158 absolute error = 8e-32 relative error = 4.4055737887058981475429339677308e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.787 y[1] (analytic) = -0.18126443534377305398529147458049 y[1] (numeric) = -0.18126443534377305398529147458057 absolute error = 8e-32 relative error = 4.4134416025006654047861481198031e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.788 y[1] (analytic) = -0.18094025476121308326819711089366 y[1] (numeric) = -0.18094025476121308326819711089373 absolute error = 7e-32 relative error = 3.8686803051304986935226889389075e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.789 y[1] (analytic) = -0.18061560966079588515692998703943 y[1] (numeric) = -0.18061560966079588515692998703951 absolute error = 8e-32 relative error = 4.4292960143502293845233393298533e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.79 y[1] (analytic) = -0.18029050008520257042324785938306 y[1] (numeric) = -0.18029050008520257042324785938315 absolute error = 9e-32 relative error = 4.9919435553990563988243063015606e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.791 y[1] (analytic) = -0.17996492607786258453417100581472 y[1] (numeric) = -0.17996492607786258453417100581481 absolute error = 9e-32 relative error = 5.0009744654945219877299986770955e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.792 y[1] (analytic) = -0.17963888768295394590261993833917 y[1] (numeric) = -0.17963888768295394590261993833925 absolute error = 8e-32 relative error = 4.4533787217160136903168569137695e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.793 y[1] (analytic) = -0.17931238494540348310533901789294 y[1] (numeric) = -0.17931238494540348310533901789301 absolute error = 7e-32 relative error = 3.9038017380290490115543880570237e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.794 y[1] (analytic) = -0.17898541791088707106758735757036 y[1] (numeric) = -0.17898541791088707106758735757042 absolute error = 6e-32 relative error = 3.3522283938165671720999725816808e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.795 y[1] (analytic) = -0.17865798662582986621407971809484 y[1] (numeric) = -0.17865798662582986621407971809491 absolute error = 7e-32 relative error = 3.9181007981805834398097743457175e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.796 y[1] (analytic) = -0.17833009113740654058566141782559 y[1] (numeric) = -0.17833009113740654058566141782566 absolute error = 7e-32 relative error = 3.9253050090163270200288183764283e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.797 y[1] (analytic) = -0.17800173149354151492120259884008 y[1] (numeric) = -0.17800173149354151492120259884014 absolute error = 6e-32 relative error = 3.3707537278746637509859235915490e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.798 y[1] (analytic) = -0.17767290774290919070419851067863 y[1] (numeric) = -0.1776729077429091907041985106787 absolute error = 7e-32 relative error = 3.9398240783726721059347748462210e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.799 y[1] (analytic) = -0.1773436199349341811735637941764 y[1] (numeric) = -0.17734361993493418117356379417647 absolute error = 7e-32 relative error = 3.9471394587345395391427050947807e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.8 y[1] (analytic) = -0.17701386811979154129811006943919 y[1] (numeric) = -0.17701386811979154129811006943927 absolute error = 8e-32 relative error = 4.5194199104140909635290807387265e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.801 y[1] (analytic) = -0.17668365234840699671419745444145 y[1] (numeric) = -0.17668365234840699671419745444153 absolute error = 8e-32 relative error = 4.5278665533948755632978824589407e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.802 y[1] (analytic) = -0.17635297267245717162605196393481 y[1] (numeric) = -0.17635297267245717162605196393488 absolute error = 7e-32 relative error = 3.9693121663456149030386100713755e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.803 y[1] (analytic) = -0.17602182914436981566824206235327 y[1] (numeric) = -0.17602182914436981566824206235334 absolute error = 7e-32 relative error = 3.9767794903771456551619280888304e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.804 y[1] (analytic) = -0.1756902218173240297298089691842 y[1] (numeric) = -0.17569022181732402972980896918428 absolute error = 8e-32 relative error = 4.5534691215303341689152637900642e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.805 y[1] (analytic) = -0.17535815074525049073954664084114 y[1] (numeric) = -0.17535815074525049073954664084121 absolute error = 7e-32 relative error = 3.9918304169215198885263572630596e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=99.1MB, alloc=4.4MB, time=4.64 TOP MAIN SOLVE Loop x[1] = 0.806 y[1] (analytic) = -0.17502561598283167541192867942394 y[1] (numeric) = -0.17502561598283167541192867942402 absolute error = 8e-32 relative error = 4.5707595171581757667094153012586e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.807 y[1] (analytic) = -0.17469261758550208295318074588192 y[1] (numeric) = -0.174692617585502082953180745882 absolute error = 8e-32 relative error = 4.5794722814113514620214259862594e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.808 y[1] (analytic) = -0.17435915560944845672699838300447 y[1] (numeric) = -0.17435915560944845672699838300455 absolute error = 8e-32 relative error = 4.5882305245383300218013128315724e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.809 y[1] (analytic) = -0.17402523011161000487941148235061 y[1] (numeric) = -0.17402523011161000487941148235068 absolute error = 7e-32 relative error = 4.0224052544051189010287433290243e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.81 y[1] (analytic) = -0.1736908411496786199222979586913 y[1] (numeric) = -0.17369084114967861992229795869137 absolute error = 7e-32 relative error = 4.0301491740532987202630520898092e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.811 y[1] (analytic) = -0.17335598878209909727505052577513 y[1] (numeric) = -0.1733559887820990972750505257752 absolute error = 7e-32 relative error = 4.0379337622992039343304608247842e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.812 y[1] (analytic) = -0.17302067306806935276390179823725 y[1] (numeric) = -0.17302067306806935276390179823732 absolute error = 7e-32 relative error = 4.0457593164292441625870659915160e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.813 y[1] (analytic) = -0.17268489406754063907841427625201 y[1] (numeric) = -0.17268489406754063907841427625208 absolute error = 7e-32 relative error = 4.0536261366684193010214979753005e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.814 y[1] (analytic) = -0.17234865184121776118464310207947 y[1] (numeric) = -0.17234865184121776118464310207955 absolute error = 8e-32 relative error = 4.6417537442476083395256309409259e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.815 y[1] (analytic) = -0.1720119464505592906944808109734 y[1] (numeric) = -0.17201194645055929069448081097347 absolute error = 7e-32 relative error = 4.0694847912856925585060300148295e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.816 y[1] (analytic) = -0.17167477795777777919069463300213 y[1] (numeric) = -0.17167477795777777919069463300221 absolute error = 8e-32 relative error = 4.6599739898702793182928867099564e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.817 y[1] (analytic) = -0.17133714642583997050716823718201 y[1] (numeric) = -0.17133714642583997050716823718209 absolute error = 8e-32 relative error = 4.6691567864197201684314383267003e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.818 y[1] (analytic) = -0.17099905191846701196386114493388 y[1] (numeric) = -0.17099905191846701196386114493395 absolute error = 7e-32 relative error = 4.0935899477019476121472367932072e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.819 y[1] (analytic) = -0.17066049450013466455600037624582 y[1] (numeric) = -0.1706604945001346645560003762459 absolute error = 8e-32 relative error = 4.6876695297479566195918880272191e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.82 y[1] (analytic) = -0.1703214742360735120970202290572 y[1] (numeric) = -0.17032147423607351209702022905727 absolute error = 7e-32 relative error = 4.1098751824433326087832042744256e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.821 y[1] (analytic) = -0.16998199119226916931476743026879 y[1] (numeric) = -0.16998199119226916931476743026887 absolute error = 8e-32 relative error = 4.7063809194652158776958412665238e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.822 y[1] (analytic) = -0.16964204543546248890049023543091 y[1] (numeric) = -0.169642045435462488900490235431 absolute error = 9e-32 relative error = 5.3052885426472302127905997385974e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.823 y[1] (analytic) = -0.16930163703314976751013139356165 y[1] (numeric) = -0.16930163703314976751013139356173 absolute error = 8e-32 relative error = 4.7252939429248259683100993083859e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.824 y[1] (analytic) = -0.16896076605358295071744623370224 y[1] (numeric) = -0.16896076605358295071744623370232 absolute error = 8e-32 relative error = 4.7348270174526433981022675437483e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.825 y[1] (analytic) = -0.16861943256576983691846847072232 y[1] (numeric) = -0.1686194325657698369184684707224 absolute error = 8e-32 relative error = 4.7444116483309883018090973266226e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.826 y[1] (analytic) = -0.16827763663947428018684766954291 y[1] (numeric) = -0.16827763663947428018684766954299 absolute error = 8e-32 relative error = 4.7540482263484402198416391427433e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.827 y[1] (analytic) = -0.16793537834521639207958364934936 y[1] (numeric) = -0.16793537834521639207958364934944 absolute error = 8e-32 relative error = 4.7637371462937359723034934830564e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.828 y[1] (analytic) = -0.16759265775427274239268445251651 y[1] (numeric) = -0.1675926577542727423926844525166 absolute error = 9e-32 relative error = 5.3701636578828864242610913793091e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.829 y[1] (analytic) = -0.16724947493867655886627584686391 y[1] (numeric) = -0.16724947493867655886627584686399 absolute error = 8e-32 relative error = 4.7832736114318254077457384175414e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.83 y[1] (analytic) = -0.16690582997121792583869167449722 y[1] (numeric) = -0.1669058299712179258386916744973 absolute error = 8e-32 relative error = 4.7931219666680066952055214638560e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.831 y[1] (analytic) = -0.16656172292544398184907570587284 y[1] (numeric) = -0.16656172292544398184907570587292 absolute error = 8e-32 relative error = 4.8030242840252941289465406843513e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.832 y[1] (analytic) = -0.1662171538756591161880270038424 y[1] (numeric) = -0.16621715387565911618802700384247 absolute error = 7e-32 relative error = 4.2113583566931005215030835002078e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=103.0MB, alloc=4.4MB, time=4.83 x[1] = 0.833 y[1] (analytic) = -0.16587212289692516439582214929307 y[1] (numeric) = -0.16587212289692516439582214929315 absolute error = 8e-32 relative error = 4.8229924717194893330127194117105e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.834 y[1] (analytic) = -0.16552663006506160270774902759502 y[1] (numeric) = -0.1655266300650616027077490275951 absolute error = 8e-32 relative error = 4.8330591862200869030144085103057e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.835 y[1] (analytic) = -0.16518067545664574144608822339747 y[1] (numeric) = -0.16518067545664574144608822339754 absolute error = 7e-32 relative error = 4.2377838573721414345959942939118e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.836 y[1] (analytic) = -0.16483425914901291735827942037955 y[1] (numeric) = -0.16483425914901291735827942037962 absolute error = 7e-32 relative error = 4.2466900000878357087811442950986e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.837 y[1] (analytic) = -0.16448738122025668490081155235749 y[1] (numeric) = -0.16448738122025668490081155235756 absolute error = 7e-32 relative error = 4.2556455991153850776316830711489e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.838 y[1] (analytic) = -0.16414004174922900646837680267589 y[1] (numeric) = -0.16414004174922900646837680267595 absolute error = 6e-32 relative error = 3.6554151784405665990271684116563e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.839 y[1] (analytic) = -0.16379224081554044156782990006524 y[1] (numeric) = -0.1637922408155404415678299000653 absolute error = 6e-32 relative error = 3.6631771872252974816699484010921e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.84 y[1] (analytic) = -0.16344397849956033493649551112963 y[1] (numeric) = -0.1634439784995603349364955111297 absolute error = 7e-32 relative error = 4.2828130251484486671418105792907e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.841 y[1] (analytic) = -0.16309525488241700360436788233469 y[1] (numeric) = -0.16309525488241700360436788233476 absolute error = 7e-32 relative error = 4.2919703611528289741206325566758e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.842 y[1] (analytic) = -0.16274607004599792289974823779647 y[1] (numeric) = -0.16274607004599792289974823779653 absolute error = 6e-32 relative error = 3.6867249687222450848498979857032e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.843 y[1] (analytic) = -0.16239642407294991139786679332389 y[1] (numeric) = -0.16239642407294991139786679332395 absolute error = 6e-32 relative error = 3.6946626345077320678419116053559e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.844 y[1] (analytic) = -0.16204631704667931481203760204001 y[1] (numeric) = -0.16204631704667931481203760204008 absolute error = 7e-32 relative error = 4.3197526038086808742261969690018e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.845 y[1] (analytic) = -0.1616957490513521888268958024981 y[1] (numeric) = -0.16169574905135218882689580249817 absolute error = 7e-32 relative error = 4.3291181376554946286261090515873e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.846 y[1] (analytic) = -0.16134472017189448087326819651672 y[1] (numeric) = -0.16134472017189448087326819651678 absolute error = 6e-32 relative error = 3.7187457969542983602617604355912e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.847 y[1] (analytic) = -0.16099323049399221084422944098137 y[1] (numeric) = -0.16099323049399221084422944098143 absolute error = 6e-32 relative error = 3.7268647766055617959036741059429e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.848 y[1] (analytic) = -0.16064128010409165075189749559715 y[1] (numeric) = -0.16064128010409165075189749559721 absolute error = 6e-32 relative error = 3.7350299973407492891549799234343e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.849 y[1] (analytic) = -0.16028886908939950332452332702578 y[1] (numeric) = -0.16028886908939950332452332702584 absolute error = 6e-32 relative error = 3.7432418321284433006021050877718e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.85 y[1] (analytic) = -0.1599359975378830795434312289998 y[1] (numeric) = -0.15993599753788307954343122899985 absolute error = 5e-32 relative error = 3.1262505483267955471065262142351e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.851 y[1] (analytic) = -0.15958266553827047511936747787471 y[1] (numeric) = -0.15958266553827047511936747787477 absolute error = 6e-32 relative error = 3.7598068560655192544162466399414e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.852 y[1] (analytic) = -0.15922887318005074590781640365485 y[1] (numeric) = -0.15922887318005074590781640365491 absolute error = 6e-32 relative error = 3.7681608116483989380625892938452e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.853 y[1] (analytic) = -0.1588746205534740822628443178091 y[1] (numeric) = -0.15887462055347408226284431780915 absolute error = 5e-32 relative error = 3.1471357618865865575838618184706e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.854 y[1] (analytic) = -0.1585199077495519823290331011767 y[1] (numeric) = -0.15851990774955198232903310117675 absolute error = 5e-32 relative error = 3.1541779647636284185611287290661e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.855 y[1] (analytic) = -0.15816473486005742427106661794974 y[1] (numeric) = -0.15816473486005742427106661794979 absolute error = 5e-32 relative error = 3.1612609501251653847604578363337e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.856 y[1] (analytic) = -0.15780910197752503744053448510494 y[1] (numeric) = -0.15780910197752503744053448510499 absolute error = 5e-32 relative error = 3.1683850534249243459334514166865e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.857 y[1] (analytic) = -0.15745300919525127247951909074304 y[1] (numeric) = -0.15745300919525127247951909074309 absolute error = 5e-32 relative error = 3.1755506138340595436050506613892e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.858 y[1] (analytic) = -0.15709645660729457036053311957616 y[1] (numeric) = -0.15709645660729457036053311957621 absolute error = 5e-32 relative error = 3.1827579742927387454261253872362e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.859 y[1] (analytic) = -0.15673944430847553036237620928109 y[1] (numeric) = -0.15673944430847553036237620928113 absolute error = 4e-32 relative error = 2.5520059852500727271434328806111e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.86 y[1] (analytic) = -0.15638197239437707698148072760793 y[1] (numeric) = -0.15638197239437707698148072760797 absolute error = 4e-32 relative error = 2.5578395890240257329226720376792e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=106.8MB, alloc=4.4MB, time=5.01 x[1] = 0.861 y[1] (analytic) = -0.15602404096134462577831802699696 y[1] (numeric) = -0.15602404096134462577831802699699 absolute error = 3e-32 relative error = 1.9227806058062924024870923751976e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.862 y[1] (analytic) = -0.15566565010648624815843790101004 y[1] (numeric) = -0.15566565010648624815843790101009 absolute error = 5e-32 relative error = 3.2120124103035245694116629013584e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.863 y[1] (analytic) = -0.15530679992767283508771533512608 y[1] (numeric) = -0.15530679992767283508771533512612 absolute error = 4e-32 relative error = 2.5755472405991368697970306638034e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.864 y[1] (analytic) = -0.15494749052353825974138001337842 y[1] (numeric) = -0.15494749052353825974138001337846 absolute error = 4e-32 relative error = 2.5815197048269427678165123794096e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.865 y[1] (analytic) = -0.15458772199347953908640541192838 y[1] (numeric) = -0.15458772199347953908640541192842 absolute error = 4e-32 relative error = 2.5875276176000049518383313534660e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.866 y[1] (analytic) = -0.15422749443765699439683568096628 y[1] (numeric) = -0.15422749443765699439683568096633 absolute error = 5e-32 relative error = 3.2419640987042928715332225794422e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.867 y[1] (analytic) = -0.15386680795699441070162988731302 y[1] (numeric) = -0.15386680795699441070162988731307 absolute error = 5e-32 relative error = 3.2495637404770845939810024745340e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.868 y[1] (analytic) = -0.15350566265317919516460456175538 y[1] (numeric) = -0.15350566265317919516460456175543 absolute error = 5e-32 relative error = 3.2572088309840907190431134335524e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.869 y[1] (analytic) = -0.15314405862866253439605686748839 y[1] (numeric) = -0.15314405862866253439605686748845 absolute error = 6e-32 relative error = 3.9178797099458851487827994891956e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.87 y[1] (analytic) = -0.1527819959866595506956520790543 y[1] (numeric) = -0.15278199598665955069565207905434 absolute error = 4e-32 relative error = 2.6181095319302331767150452734180e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.871 y[1] (analytic) = -0.1524194748311494572261604348596 y[1] (numeric) = -0.15241947483114945722616043485965 absolute error = 5e-32 relative error = 3.2804206979055715509313580009336e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.872 y[1] (analytic) = -0.15205649526687571211762980071756 y[1] (numeric) = -0.15205649526687571211762980071761 absolute error = 5e-32 relative error = 3.2882515089042762490303394570137e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.873 y[1] (analytic) = -0.1516930573993461715015819569002 y[1] (numeric) = -0.15169305739934617150158195690025 absolute error = 5e-32 relative error = 3.2961297542029441854191380052158e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.874 y[1] (analytic) = -0.15132916133483324147482169689252 y[1] (numeric) = -0.15132916133483324147482169689257 absolute error = 5e-32 relative error = 3.3040558448195736145344234317302e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.875 y[1] (analytic) = -0.15096480718037402899244930241721 y[1] (numeric) = -0.15096480718037402899244930241726 absolute error = 5e-32 relative error = 3.3120301965649236997397074842728e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.876 y[1] (analytic) = -0.1505999950437704916896683363418 y[1] (numeric) = -0.15059999504377049168966833634186 absolute error = 6e-32 relative error = 3.9840638761350262011530877909004e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.877 y[1] (analytic) = -0.15023472503358958663198207278855 y[1] (numeric) = -0.1502347250335895866319820727886 absolute error = 5e-32 relative error = 3.3281253710699017455941031795139e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.878 y[1] (analytic) = -0.14986899725916341799337326213914 y[1] (numeric) = -0.1498689972591634179933732621392 absolute error = 6e-32 relative error = 4.0034964600613172415248675860011e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.879 y[1] (analytic) = -0.14950281183058938366206330766067 y[1] (numeric) = -0.14950281183058938366206330766072 absolute error = 5e-32 relative error = 3.3444187027504207327222143807898e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.88 y[1] (analytic) = -0.14913616885873032077344831017252 y[1] (numeric) = -0.14913616885873032077344831017257 absolute error = 5e-32 relative error = 3.3526407700175434045260852379676e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.881 y[1] (analytic) = -0.14876906845521465016981081752735 y[1] (numeric) = -0.14876906845521465016981081752739 absolute error = 4e-32 relative error = 2.6887309583471362299269643904972e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.882 y[1] (analytic) = -0.14840151073243651978640749668756 y[1] (numeric) = -0.14840151073243651978640749668762 absolute error = 6e-32 relative error = 4.0430855254686863262167398212146e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.883 y[1] (analytic) = -0.14803349580355594696353432784408 y[1] (numeric) = -0.14803349580355594696353432784414 absolute error = 6e-32 relative error = 4.0531367360007130273473473422537e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.884 y[1] (analytic) = -0.14766502378249895968417230234103 y[1] (numeric) = -0.14766502378249895968417230234109 absolute error = 6e-32 relative error = 4.0632506238157062686953680467140e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.885 y[1] (analytic) = -0.14729609478395773673681798914045 y[1] (numeric) = -0.14729609478395773673681798914052 absolute error = 7e-32 relative error = 4.7523323753199610766532414242328e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.886 y[1] (analytic) = -0.14692670892339074680310471818008 y[1] (numeric) = -0.14692670892339074680310471818013 absolute error = 5e-32 relative error = 3.4030572362490313007373541831913e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.887 y[1] (analytic) = -0.14655686631702288646982151324516 y[1] (numeric) = -0.14655686631702288646982151324522 absolute error = 6e-32 relative error = 4.0939739984758990811851408769048e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.888 y[1] (analytic) = -0.14618656708184561716493829189048 y[1] (numeric) = -0.14618656708184561716493829189055 absolute error = 7e-32 relative error = 4.7884016566863514290946623137236e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=110.6MB, alloc=4.4MB, time=5.18 TOP MAIN SOLVE Loop x[1] = 0.889 y[1] (analytic) = -0.14581581133561710101724723550724 y[1] (numeric) = -0.1458158113356171010172472355073 absolute error = 6e-32 relative error = 4.1147801085782763889406003109899e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.89 y[1] (analytic) = -0.14544459919686233563923161883312 y[1] (numeric) = -0.14544459919686233563923161883318 absolute error = 6e-32 relative error = 4.1252820889408711065332284300009e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.891 y[1] (analytic) = -0.14507293078487328783277477504782 y[1] (numeric) = -0.14507293078487328783277477504788 absolute error = 6e-32 relative error = 4.1358508217479385544140601807003e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.892 y[1] (analytic) = -0.14470080621970902621732326008038 y[1] (numeric) = -0.14470080621970902621732326008043 absolute error = 5e-32 relative error = 3.4554057649189332380355653553129e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.893 y[1] (analytic) = -0.14432822562219585278011966787726 y[1] (numeric) = -0.14432822562219585278011966787732 absolute error = 6e-32 relative error = 4.1571909958250578026771496604262e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.894 y[1] (analytic) = -0.143955189113927433348121937139 y[1] (numeric) = -0.14395518911392743334812193713906 absolute error = 6e-32 relative error = 4.1679636815672868552925174586772e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.895 y[1] (analytic) = -0.14358169681726492698122737942636 y[1] (numeric) = -0.14358169681726492698122737942641 absolute error = 5e-32 relative error = 3.4823380074435621837388263292950e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.896 y[1] (analytic) = -0.14320774885533711428642104856427 y[1] (numeric) = -0.14320774885533711428642104856433 absolute error = 6e-32 relative error = 4.1897174195936604816186910113859e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.897 y[1] (analytic) = -0.14283334535204052465246946192947 y[1] (numeric) = -0.14283334535204052465246946192952 absolute error = 5e-32 relative error = 3.5005831360152832394115871275987e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.898 y[1] (analytic) = -0.1424584864320395624047820754953 y[1] (numeric) = -0.14245848643203956240478207549535 absolute error = 5e-32 relative error = 3.5097944146593693053835897033063e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.899 y[1] (analytic) = -0.14208317222076663188006430642332 y[1] (numeric) = -0.14208317222076663188006430642336 absolute error = 4e-32 relative error = 2.8152524591616394705688057609473e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.9 y[1] (analytic) = -0.14170740284442226142038728953272 y[1] (numeric) = -0.14170740284442226142038728953277 absolute error = 5e-32 relative error = 3.5283971758972963002983925225355e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.901 y[1] (analytic) = -0.14133117842997522628630094714546 y[1] (numeric) = -0.14133117842997522628630094714551 absolute error = 5e-32 relative error = 3.5377897895879565559734693883791e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.902 y[1] (analytic) = -0.14095449910516267048861834559399 y[1] (numeric) = -0.14095449910516267048861834559404 absolute error = 5e-32 relative error = 3.5472439913178106432651981100928e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.903 y[1] (analytic) = -0.14057736499849022753850070608919 y[1] (numeric) = -0.14057736499849022753850070608923 absolute error = 4e-32 relative error = 2.8454082917566133003034726330890e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.904 y[1] (analytic) = -0.14019977623923214011547383267581 y[1] (numeric) = -0.14019977623923214011547383267585 absolute error = 4e-32 relative error = 2.8530716006097868165170269767045e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.905 y[1] (analytic) = -0.13982173295743137865300811565051 y[1] (numeric) = -0.13982173295743137865300811565056 absolute error = 5e-32 relative error = 3.5759819981077235226451322251278e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.906 y[1] (analytic) = -0.13944323528389975884129566508102 y[1] (numeric) = -0.13944323528389975884129566508108 absolute error = 6e-32 relative error = 4.3028261555924795641127783132058e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.907 y[1] (analytic) = -0.13906428335021805804685952594304 y[1] (numeric) = -0.13906428335021805804685952594309 absolute error = 5e-32 relative error = 3.5954595094759533100617755738909e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.908 y[1] (analytic) = -0.13868487728873613064863132388187 y[1] (numeric) = -0.13868487728873613064863132388192 absolute error = 5e-32 relative error = 3.6052957595298646192650732128488e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.909 y[1] (analytic) = -0.13830501723257302229013508870749 y[1] (numeric) = -0.13830501723257302229013508870754 absolute error = 5e-32 relative error = 3.6151978431787656078675486473696e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.91 y[1] (analytic) = -0.13792470331561708304741640144189 y[1] (numeric) = -0.13792470331561708304741640144194 absolute error = 5e-32 relative error = 3.6251663986242954295481957162159e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.911 y[1] (analytic) = -0.13754393567252607951235741005592 y[1] (numeric) = -0.13754393567252607951235741005597 absolute error = 5e-32 relative error = 3.6352020723795040619378470917390e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.912 y[1] (analytic) = -0.1371627144387273057910196589565 y[1] (numeric) = -0.13716271443872730579101965895657 absolute error = 7e-32 relative error = 5.1034277271663413058531645263347e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.913 y[1] (analytic) = -0.13678103975041769341665807781299 y[1] (numeric) = -0.13678103975041769341665807781305 absolute error = 6e-32 relative error = 4.3865728838939298776949578405129e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.914 y[1] (analytic) = -0.13639891174456392017705087644123 y[1] (numeric) = -0.13639891174456392017705087644128 absolute error = 5e-32 relative error = 3.6657183961728135841233971842099e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.915 y[1] (analytic) = -0.13601633055890251785579149419515 y[1] (numeric) = -0.1360163305589025178557914941952 absolute error = 5e-32 relative error = 3.6760291793305850551972482530839e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.916 y[1] (analytic) = -0.13563329633193997888719015464481 y[1] (numeric) = -0.13563329633193997888719015464486 absolute error = 5e-32 relative error = 3.6864104428777797704011592804116e-29 % Correct digits = 30 h = 0.001 memory used=114.4MB, alloc=4.4MB, time=5.37 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.917 y[1] (analytic) = -0.13524980920295286192443397924672 y[1] (numeric) = -0.13524980920295286192443397924678 absolute error = 6e-32 relative error = 4.4362354633687750090548343145505e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.918 y[1] (analytic) = -0.13486586931198789632065601723456 y[1] (numeric) = -0.13486586931198789632065601723461 absolute error = 5e-32 relative error = 3.7073872177647857004018909101899e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.919 y[1] (analytic) = -0.13448147679986208552256495307406 y[1] (numeric) = -0.13448147679986208552256495307411 absolute error = 5e-32 relative error = 3.7179841558708460274877700613348e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.92 y[1] (analytic) = -0.13409663180816280937628865753408 y[1] (numeric) = -0.13409663180816280937628865753412 absolute error = 4e-32 relative error = 2.9829235425706715158370737247239e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.921 y[1] (analytic) = -0.13371133447924792534508615372354 y[1] (numeric) = -0.13371133447924792534508615372359 absolute error = 5e-32 relative error = 3.7393987723426713872797994005731e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.922 y[1] (analytic) = -0.13332558495624586863858397533129 y[1] (numeric) = -0.13332558495624586863858397533134 absolute error = 5e-32 relative error = 3.7502179357704489216802511388602e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.923 y[1] (analytic) = -0.13293938338305575125319430077872 y[1] (numeric) = -0.13293938338305575125319430077876 absolute error = 4e-32 relative error = 3.0088901409105180414083300845579e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.924 y[1] (analytic) = -0.13255272990434745992337365405429 y[1] (numeric) = -0.13255272990434745992337365405432 absolute error = 3e-32 relative error = 2.2632502568335305949202566836132e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.925 y[1] (analytic) = -0.13216562466556175298338237064086 y[1] (numeric) = -0.1321656246655617529833823706409 absolute error = 4e-32 relative error = 3.0265055759557692812232089536394e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.926 y[1] (analytic) = -0.13177806781291035613920643517035 y[1] (numeric) = -0.13177806781291035613920643517038 absolute error = 3e-32 relative error = 2.2765548545295096978010534430307e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.927 y[1] (analytic) = -0.13139005949337605715030470624377 y[1] (numeric) = -0.1313900594933760571503047062438 absolute error = 3e-32 relative error = 2.2832777544721661485784183810027e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.928 y[1] (analytic) = -0.13100159985471279942084595323697 y[1] (numeric) = -0.13100159985471279942084595323702 absolute error = 5e-32 relative error = 3.8167472806021035446649397499492e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.929 y[1] (analytic) = -0.13061268904544577450010153987017 y[1] (numeric) = -0.13061268904544577450010153987021 absolute error = 4e-32 relative error = 3.0624895859913181089635880130093e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.93 y[1] (analytic) = -0.1302233272148715134916609998523 y[1] (numeric) = -0.13022332721487151349166099985233 absolute error = 3e-32 relative error = 2.3037347180124881501251446558078e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.931 y[1] (analytic) = -0.12983351451305797737113916101798 y[1] (numeric) = -0.12983351451305797737113916101801 absolute error = 3e-32 relative error = 2.3106514610280195835668184062854e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.932 y[1] (analytic) = -0.12944325109084464621204488605131 y[1] (numeric) = -0.12944325109084464621204488605133 absolute error = 2e-32 relative error = 1.5450786218250797736106514640873e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.933 y[1] (analytic) = -0.12905253709984260731948291013791 y[1] (numeric) = -0.12905253709984260731948291013794 absolute error = 3e-32 relative error = 2.3246346545508238634969282860927e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.934 y[1] (analytic) = -0.12866137269243464227136166870164 y[1] (numeric) = -0.12866137269243464227136166870167 absolute error = 3e-32 relative error = 2.3317021552160088287387445724488e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.935 y[1] (analytic) = -0.12826975802177531286678142176229 y[1] (numeric) = -0.12826975802177531286678142176232 absolute error = 3e-32 relative error = 2.3388209709499213494904696069665e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.936 y[1] (analytic) = -0.12787769324179104598127839539662 y[1] (numeric) = -0.12787769324179104598127839539664 absolute error = 2e-32 relative error = 1.5639944303799737047925353626233e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.937 y[1] (analytic) = -0.12748517850718021732860207529201 y[1] (numeric) = -0.12748517850718021732860207529204 absolute error = 3e-32 relative error = 2.3532147306292817938299703292461e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.938 y[1] (analytic) = -0.1270922139734132341287042024511 y[1] (numeric) = -0.12709221397341323412870420245113 absolute error = 3e-32 relative error = 2.3604907855547926473048645477560e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.939 y[1] (analytic) = -0.12669879979673261668161943673302 y[1] (numeric) = -0.12669879979673261668161943673306 absolute error = 4e-32 relative error = 3.1570938370508181857121422203325e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.94 y[1] (analytic) = -0.12630493613415307884691907010249 y[1] (numeric) = -0.12630493613415307884691907010253 absolute error = 4e-32 relative error = 3.1669387772394375190026799075055e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.941 y[1] (analytic) = -0.12591062314346160742842058819819 y[1] (numeric) = -0.12591062314346160742842058819823 absolute error = 4e-32 relative error = 3.1768566465137976397866671647128e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.942 y[1] (analytic) = -0.12551586098321754046383729612707 y[1] (numeric) = -0.12551586098321754046383729612711 absolute error = 4e-32 relative error = 3.1868482346903006269986987087991e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.943 y[1] (analytic) = -0.12512064981275264441905364223776 y[1] (numeric) = -0.12512064981275264441905364223781 absolute error = 5e-32 relative error = 3.9961429288312296647047923401560e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=118.2MB, alloc=4.4MB, time=5.55 x[1] = 0.944 y[1] (analytic) = -0.12472498979217119028671329202376 y[1] (numeric) = -0.1247249897921711902867132920238 absolute error = 4e-32 relative error = 3.2070557846227815805177733271888e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.945 y[1] (analytic) = -0.12432888108235002858880842325287 y[1] (numeric) = -0.12432888108235002858880842325291 absolute error = 4e-32 relative error = 3.2172733842513827887575550507256e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.946 y[1] (analytic) = -0.12393232384493866328296013291276 y[1] (numeric) = -0.1239323238449386632829601329128 absolute error = 4e-32 relative error = 3.2275679789597991010208220862884e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.947 y[1] (analytic) = -0.12353531824235932457208126660018 y[1] (numeric) = -0.12353531824235932457208126660023 absolute error = 5e-32 relative error = 4.0474255226272108198261663295915e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.948 y[1] (analytic) = -0.12313786443780704061711440156345 y[1] (numeric) = -0.1231378644378070406171144015635 absolute error = 5e-32 relative error = 4.0604894545051482171730693209567e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.949 y[1] (analytic) = -0.12273996259524970815253913573099 y[1] (numeric) = -0.12273996259524970815253913573103 absolute error = 4e-32 relative error = 3.2589222902002157851940438336184e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.95 y[1] (analytic) = -0.12234161287942816200434425672212 y[1] (numeric) = -0.12234161287942816200434425672216 absolute error = 4e-32 relative error = 3.2695334856686388608871026867373e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.951 y[1] (analytic) = -0.12194281545585624351016178703814 y[1] (numeric) = -0.12194281545585624351016178703818 absolute error = 4e-32 relative error = 3.2802260510772075787472354653659e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.952 y[1] (analytic) = -0.12154357049082086784126132436934 y[1] (numeric) = -0.12154357049082086784126132436939 absolute error = 5e-32 relative error = 4.1137511262906388393155016779099e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.953 y[1] (analytic) = -0.12114387815138209022610451922703 y[1] (numeric) = -0.12114387815138209022610451922708 absolute error = 5e-32 relative error = 4.1273237049188495559770237157640e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.954 y[1] (analytic) = -0.12074373860537317107516095591492 y[1] (numeric) = -0.12074373860537317107516095591498 absolute error = 6e-32 relative error = 4.9692017733605246240465565733724e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.955 y[1] (analytic) = -0.12034315202140064000668812719187 y[1] (numeric) = -0.12034315202140064000668812719192 absolute error = 5e-32 relative error = 4.1547856409069701630716214182924e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.956 y[1] (analytic) = -0.11994211856884435877317961784399 y[1] (numeric) = -0.11994211856884435877317961784403 absolute error = 4e-32 relative error = 3.3349419267628498783454409087207e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.957 y[1] (analytic) = -0.11954063841785758308818703777892 y[1] (numeric) = -0.11954063841785758308818703777897 absolute error = 5e-32 relative error = 4.1826780132479824521941909740214e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.958 y[1] (analytic) = -0.11913871173936702335322267117514 y[1] (numeric) = -0.11913871173936702335322267117521 absolute error = 7e-32 relative error = 5.8755041898669354953714066304502e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.959 y[1] (analytic) = -0.11873633870507290428445123466374 y[1] (numeric) = -0.1187363387050729042844512346638 absolute error = 6e-32 relative error = 5.0532129131110351018667103757884e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.96 y[1] (analytic) = -0.11833351948744902343888056448703 y[1] (numeric) = -0.11833351948744902343888056448709 absolute error = 6e-32 relative error = 5.0704145587729151779544392143592e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.961 y[1] (analytic) = -0.11793025425974280863976248006672 y[1] (numeric) = -0.11793025425974280863976248006677 absolute error = 5e-32 relative error = 4.2397941320362454581885462404671e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.962 y[1] (analytic) = -0.11752654319597537430091649942009 y[1] (numeric) = -0.11752654319597537430091649942016 absolute error = 7e-32 relative error = 5.9561013279591727026210182245591e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.963 y[1] (analytic) = -0.11712238647094157664969051038777 y[1] (numeric) = -0.11712238647094157664969051038784 absolute error = 7e-32 relative error = 5.9766541742527774330642723792700e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.964 y[1] (analytic) = -0.11671778426021006784827393067496 y[1] (numeric) = -0.11671778426021006784827393067502 absolute error = 6e-32 relative error = 5.1406047827498411098989197348378e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.965 y[1] (analytic) = -0.11631273674012334901308031926226 y[1] (numeric) = -0.11631273674012334901308031926231 absolute error = 5e-32 relative error = 4.2987553557195214592575002312198e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.966 y[1] (analytic) = -0.11590724408779782213191783180647 y[1] (numeric) = -0.11590724408779782213191783180654 absolute error = 7e-32 relative error = 6.0393119128064296557706836294608e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.967 y[1] (analytic) = -0.11550130648112384087866734322758 y[1] (numeric) = -0.11550130648112384087866734322765 absolute error = 7e-32 relative error = 6.0605375066852570220666342995819e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.968 y[1] (analytic) = -0.11509492409876576032518949176143 y[1] (numeric) = -0.1150949240987657603251894917615 absolute error = 7e-32 relative error = 6.0819363276117453655387547824841e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.969 y[1] (analytic) = -0.11468809712016198555018333034857 y[1] (numeric) = -0.11468809712016198555018333034864 absolute error = 7e-32 relative error = 6.1035104564215592898893398606167e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.97 y[1] (analytic) = -0.11428082572552501914472070332456 y[1] (numeric) = -0.11428082572552501914472070332463 absolute error = 7e-32 relative error = 6.1252620074799876948442712048030e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.971 y[1] (analytic) = -0.1138731100958415076141818989758 y[1] (numeric) = -0.11387311009584150761418189897587 absolute error = 7e-32 relative error = 6.1471931293598966682003047812969e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=122.0MB, alloc=4.4MB, time=5.73 x[1] = 0.972 y[1] (analytic) = -0.11346495041287228667631956162479 y[1] (numeric) = -0.11346495041287228667631956162485 absolute error = 6e-32 relative error = 5.2879765761738847027586324181303e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.973 y[1] (analytic) = -0.11305634685915242545517928050806 y[1] (numeric) = -0.11305634685915242545517928050812 absolute error = 6e-32 relative error = 5.3070881615119803529871188498246e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.974 y[1] (analytic) = -0.11264729961799126957060670680778 y[1] (numeric) = -0.11264729961799126957060670680784 absolute error = 6e-32 relative error = 5.3263593715492140631530128821373e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.975 y[1] (analytic) = -0.11223780887347248312307248479106 y[1] (numeric) = -0.11223780887347248312307248479112 absolute error = 6e-32 relative error = 5.3457921713028967731816134963855e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.976 y[1] (analytic) = -0.11182787481045408957354771809909 y[1] (numeric) = -0.11182787481045408957354771809917 absolute error = 8e-32 relative error = 7.1538514109830243912829212876635e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.977 y[1] (analytic) = -0.11141749761456851151816412780874 y[1] (numeric) = -0.11141749761456851151816412780881 absolute error = 7e-32 relative error = 6.2826756567585194744997049072349e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.978 y[1] (analytic) = -0.11100667747222260935739449495986 y[1] (numeric) = -0.11100667747222260935739449495992 absolute error = 6e-32 relative error = 5.4050802497907301617334583659302e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.979 y[1] (analytic) = -0.11059541457059771885949041680273 y[1] (numeric) = -0.1105954145705977188594904168028 absolute error = 7e-32 relative error = 6.3293763373269012774619533934607e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.98 y[1] (analytic) = -0.1101837090976496876179158430667 y[1] (numeric) = -0.11018370909764968761791584306677 absolute error = 7e-32 relative error = 6.3530262843087717069756640608805e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.981 y[1] (analytic) = -0.10977156124210891040251629608449 y[1] (numeric) = -0.10977156124210891040251629608456 absolute error = 7e-32 relative error = 6.3768793308505532998610206412391e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.982 y[1] (analytic) = -0.10935897119348036340416511662348 y[1] (numeric) = -0.10935897119348036340416511662354 absolute error = 6e-32 relative error = 5.4865183299728235344610640285487e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.983 y[1] (analytic) = -0.10894593914204363737262951577377 y[1] (numeric) = -0.10894593914204363737262951577384 absolute error = 7e-32 relative error = 6.4252050651226247330333210471478e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.984 y[1] (analytic) = -0.10853246527885296964740065222192 y[1] (numeric) = -0.108532465278852969647400652222 absolute error = 8e-32 relative error = 7.3710663251272903989631362640247e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.985 y[1] (analytic) = -0.10811854979573727508123339369638 y[1] (numeric) = -0.10811854979573727508123339369646 absolute error = 8e-32 relative error = 7.3992853355080898243858489439846e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.986 y[1] (analytic) = -0.10770419288530017585614286130485 y[1] (numeric) = -0.10770419288530017585614286130493 absolute error = 8e-32 relative error = 7.4277516832790512794274038034147e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.987 y[1] (analytic) = -0.10728939474092003019160629589258 y[1] (numeric) = -0.10728939474092003019160629589266 absolute error = 8e-32 relative error = 7.4564685720505894596954641432191e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.988 y[1] (analytic) = -0.1068741555567499599447202264325 y[1] (numeric) = -0.10687415555674995994472022643258 absolute error = 8e-32 relative error = 7.4854392610868548267937875725231e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.989 y[1] (analytic) = -0.10645847552771787710206436181151 y[1] (numeric) = -0.10645847552771787710206436181159 absolute error = 8e-32 relative error = 7.5146670665193715063793633236707e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.99 y[1] (analytic) = -0.10604235484952650916302506920007 y[1] (numeric) = -0.10604235484952650916302506920016 absolute error = 9e-32 relative error = 8.4871747829166451172176673792068e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.991 y[1] (analytic) = -0.10562579371865342341433274448283 y[1] (numeric) = -0.10562579371865342341433274448291 absolute error = 8e-32 relative error = 7.5739075829422211949196765959244e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.992 y[1] (analytic) = -0.10520879233235105009556882298469 y[1] (numeric) = -0.10520879233235105009556882298477 absolute error = 8e-32 relative error = 7.6039272219077166378708064402280e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.993 y[1] (analytic) = -0.10479135088864670445539962194774 y[1] (numeric) = -0.10479135088864670445539962194782 absolute error = 8e-32 relative error = 7.6342178358793686602106584386664e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.994 y[1] (analytic) = -0.10437346958634260769829564989752 y[1] (numeric) = -0.1043734695863426076982956498976 absolute error = 8e-32 relative error = 7.6647830446817008845384775000245e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.995 y[1] (analytic) = -0.10395514862501590682149646218136 y[1] (numeric) = -0.10395514862501590682149646218143 absolute error = 7e-32 relative error = 6.7336732163696898246066232198662e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.996 y[1] (analytic) = -0.10353638820501869334198258656421 y[1] (numeric) = -0.10353638820501869334198258656428 absolute error = 7e-32 relative error = 6.7609080453326946922331631190830e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.997 y[1] (analytic) = -0.10311718852747802091321748782766 y[1] (numeric) = -0.10311718852747802091321748782774 absolute error = 8e-32 relative error = 7.7581634199309169809161287991700e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.998 y[1] (analytic) = -0.10269754979429592183142398583288 y[1] (numeric) = -0.10269754979429592183142398583295 absolute error = 7e-32 relative error = 6.8161314598265103560838854119923e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.999 y[1] (analytic) = -0.10227747220814942243116098747727 y[1] (numeric) = -0.10227747220814942243116098747734 absolute error = 7e-32 relative error = 6.8441269116956560706250505616931e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=125.8MB, alloc=4.4MB, time=5.91 TOP MAIN SOLVE Loop x[1] = 1 y[1] (analytic) = -0.10185695597249055736996783939543 y[1] (numeric) = -0.1018569559724905573699678393955 absolute error = 7e-32 relative error = 6.8723828757365910527670902569088e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.001 y[1] (analytic) = -0.10143600129154638280184505512537 y[1] (numeric) = -0.10143600129154638280184505512545 absolute error = 8e-32 relative error = 7.8867462223855578335286970267528e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.002 y[1] (analytic) = -0.10101460837031898843934161778012 y[1] (numeric) = -0.10101460837031898843934161778019 absolute error = 7e-32 relative error = 6.9296907773359267121001422596439e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.003 y[1] (analytic) = -0.10059277741458550850402050702985 y[1] (numeric) = -0.10059277741458550850402050702993 absolute error = 8e-32 relative error = 7.9528572583582281408103843536251e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.004 y[1] (analytic) = -0.10017050863089813156507554740999 y[1] (numeric) = -0.10017050863089813156507554741006 absolute error = 7e-32 relative error = 6.9880847124308325531195217781934e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.005 y[1] (analytic) = -0.099747802226584109265874123623 y[1] (numeric) = -0.099747802226584109265874123623073 absolute error = 7.3e-32 relative error = 7.3184569855659971607686586950630e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.006 y[1] (analytic) = -0.09932465840974576393820175759611 y[1] (numeric) = -0.099324658409745763938201757596177 absolute error = 6.7e-32 relative error = 6.7455555420692935205198155530730e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.007 y[1] (analytic) = -0.09890107738926049510398599158961 y[1] (numeric) = -0.098901077389260495103985991589679 absolute error = 6.9e-32 relative error = 6.9766681841519146294109496607103e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.008 y[1] (analytic) = -0.09847705937478078486427847162173 y[1] (numeric) = -0.098477059374780784864278471621804 absolute error = 7.4e-32 relative error = 7.5144404666241312517539047806290e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.009 y[1] (analytic) = -0.09805260457673420217527557588189 y[1] (numeric) = -0.098052604576734202175275575881971 absolute error = 8.1e-32 relative error = 8.2608718401366746976610052930817e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.01 y[1] (analytic) = -0.09762771320632340601115938364475 y[1] (numeric) = -0.097627713206323406011159383644822 absolute error = 7.2e-32 relative error = 7.3749550855336962320664677709741e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.011 y[1] (analytic) = -0.09720238547552614741354223146963 y[1] (numeric) = -0.097202385475526147413542231469703 absolute error = 7.3e-32 relative error = 7.5101037534084096338347642876450e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.012 y[1] (analytic) = -0.09677662159709527042729955517298 y[1] (numeric) = -0.096776621597095270427299555173062 absolute error = 8.2e-32 relative error = 8.4731207441179381322658299279006e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.013 y[1] (analytic) = -0.09635042178455871192257716819244 y[1] (numeric) = -0.096350421784558711922577168192517 absolute error = 7.7e-32 relative error = 7.9916619537144730428640941074574e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.014 y[1] (analytic) = -0.09592378625221950030276057951935 y[1] (numeric) = -0.095923786252219500302760579519425 absolute error = 7.5e-32 relative error = 7.8187072185408692305580484961854e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.015 y[1] (analytic) = -0.09549671521515575309819540735974 y[1] (numeric) = -0.095496715215155753098195407359816 absolute error = 7.6e-32 relative error = 7.9583889172282715595548948260787e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.016 y[1] (analytic) = -0.0950692088892206734454493980897 y[1] (numeric) = -0.09506920888922067344544939808978 absolute error = 8.0e-32 relative error = 8.4149222376742339204532945383480e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.017 y[1] (analytic) = -0.09464126749104254545190801389892 y[1] (numeric) = -0.094641267491042545451908013898998 absolute error = 7.8e-32 relative error = 8.2416478633258391867704079267839e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.018 y[1] (analytic) = -0.09421289123802472844549700676322 y[1] (numeric) = -0.094212891238024728445497006763304 absolute error = 8.4e-32 relative error = 8.9159773037617211369291464410739e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.019 y[1] (analytic) = -0.09378408034834565010932685105211 y[1] (numeric) = -0.093784080348345650109326851052175 absolute error = 6.5e-32 relative error = 6.9308138181414282118331634500737e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.02 y[1] (analytic) = -0.09335483504095879850105536215796 y[1] (numeric) = -0.093354835040958798501055362158042 absolute error = 8.2e-32 relative error = 8.7836907391055919162771592458462e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.021 y[1] (analytic) = -0.09292515553559271295676628402946 y[1] (numeric) = -0.092925155535592712956766284029538 absolute error = 7.8e-32 relative error = 8.3938519715604891957879022107412e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.022 y[1] (analytic) = -0.09249504205275097387916308439833 y[1] (numeric) = -0.092495042052750973879163084398418 absolute error = 8.8e-32 relative error = 9.5140234597452909636954525583027e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.023 y[1] (analytic) = -0.09206449481371219140987865280807 y[1] (numeric) = -0.092064494813712191409878652808155 absolute error = 8.5e-32 relative error = 9.2326580591131427733797964486770e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.024 y[1] (analytic) = -0.09163351404052999298570305327919 y[1] (numeric) = -0.091633514040529992985703053279269 absolute error = 7.9e-32 relative error = 8.6212998406956081366579934015961e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.025 y[1] (analytic) = -0.09120209995603300977853294058048 y[1] (numeric) = -0.091202099956033009778532940580548 absolute error = 6.8e-32 relative error = 7.4559686709825377008715148220864e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=129.7MB, alloc=4.4MB, time=6.10 x[1] = 1.026 y[1] (analytic) = -0.09077025278382486201884770661456 y[1] (numeric) = -0.090770252783824862018847706614646 absolute error = 8.6e-32 relative error = 9.4744695935588586680023703409744e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.027 y[1] (analytic) = -0.0903379727482841432025188813692 y[1] (numeric) = -0.090337972748284143202518881369276 absolute error = 7.6e-32 relative error = 8.4128520585429591610008091337917e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.028 y[1] (analytic) = -0.08990526007456440318076077122954 y[1] (numeric) = -0.089905260074564403180760771229613 absolute error = 7.3e-32 relative error = 8.1196583981244536472304076527636e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.029 y[1] (analytic) = -0.08947211498859413013303177619162 y[1] (numeric) = -0.089472114988594130133031776191698 absolute error = 7.8e-32 relative error = 8.7177999547617052733164235455995e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.03 y[1] (analytic) = -0.08903853771707673142269728665881 y[1] (numeric) = -0.089038537717076731422697286658893 absolute error = 8.3e-32 relative error = 9.3218062794040475104546109284272e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.031 y[1] (analytic) = -0.08860452848749051333526652004178 y[1] (numeric) = -0.088604528487490513335266520041866 absolute error = 8.6e-32 relative error = 9.7060501836699882144269145501814e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.032 y[1] (analytic) = -0.0881700875280886596990171173154 y[1] (numeric) = -0.088170087528088659699017117315487 absolute error = 8.7e-32 relative error = 9.8672920078801213919610087977394e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.033 y[1] (analytic) = -0.08773521506789920938782278001142 y[1] (numeric) = -0.087735215067899209387822780011494 absolute error = 7.4e-32 relative error = 8.4344695505368760527102049237476e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.034 y[1] (analytic) = -0.08729991133672503270600068884205 y[1] (numeric) = -0.087299911336725032706000688842133 absolute error = 8.3e-32 relative error = 9.5074552458432840944429180874342e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.035 y[1] (analytic) = -0.08686417656514380665499690625521 y[1] (numeric) = -0.086864176565143806654996906255282 absolute error = 7.2e-32 relative error = 8.2888024554061806531206354265100e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.036 y[1] (analytic) = -0.08642801098450798908172942671407 y[1] (numeric) = -0.086428010984507989081729426714144 absolute error = 7.4e-32 relative error = 8.5620389914172987451683362177383e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.037 y[1] (analytic) = -0.08599141482694479170841000037243 y[1] (numeric) = -0.085991414826944791708410000372512 absolute error = 8.2e-32 relative error = 9.5358356604578029848083879936212e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.038 y[1] (analytic) = -0.08555438832535615204366731807811 y[1] (numeric) = -0.085554388325356152043667318078185 absolute error = 7.5e-32 relative error = 8.7663533651577637567487008427636e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.039 y[1] (analytic) = -0.08511693171341870417479560828038 y[1] (numeric) = -0.08511693171341870417479560828045 absolute error = 7.0e-32 relative error = 8.2239806570664346025008829623457e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.04 y[1] (analytic) = -0.08467904522558374844095415944079 y[1] (numeric) = -0.084679045225583748440954159440868 absolute error = 7.8e-32 relative error = 9.2112517084018993339563135537432e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.041 y[1] (analytic) = -0.08424072909707721998714474494805 y[1] (numeric) = -0.084240729097077219987144744948135 absolute error = 8.5e-32 relative error = 1.0090131093481849191249676492811e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.042 y[1] (analytic) = -0.08380198356389965619879539131558 y[1] (numeric) = -0.083801983563899656198795391315652 absolute error = 7.2e-32 relative error = 8.5916820745775601989795475174071e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.043 y[1] (analytic) = -0.08336280886282616301678039459282 y[1] (numeric) = -0.083362808862826163016780394592906 absolute error = 8.6e-32 relative error = 1.0316351041087560472822033645712e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.044 y[1] (analytic) = -0.08292320523140638013270795444689 y[1] (numeric) = -0.082923205231406380132707954446966 absolute error = 7.6e-32 relative error = 9.1651064123623285132812194861273e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.045 y[1] (analytic) = -0.08248317290796444506430826026646 y[1] (numeric) = -0.082483172907964445064308260266534 absolute error = 7.4e-32 relative error = 8.9715268449444767576402592955753e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.046 y[1] (analytic) = -0.08204271213159895611075632890622 y[1] (numeric) = -0.082042712131598956110756328906308 absolute error = 8.8e-32 relative error = 1.0726120299246735840481922016836e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.047 y[1] (analytic) = -0.08160182314218293418776535932193 y[1] (numeric) = -0.081601823142182934187765359321997 absolute error = 6.7e-32 relative error = 8.2106008689608892316845031192587e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.048 y[1] (analytic) = -0.0811605061803637835422878353444 y[1] (numeric) = -0.081160506180363783542287835344474 absolute error = 7.4e-32 relative error = 9.1177351500924697412903327618565e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.049 y[1] (analytic) = -0.08071876148756325134666307420331 y[1] (numeric) = -0.080718761487563251346663074203379 absolute error = 6.9e-32 relative error = 8.5481985511672128024373304340849e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.05 y[1] (analytic) = -0.08027658930597738617205138513412 y[1] (numeric) = -0.080276589305977386172051385134195 absolute error = 7.5e-32 relative error = 9.3426988675533463524894236158829e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.051 y[1] (analytic) = -0.07983398987857649534099646948655 y[1] (numeric) = -0.079833989878576495340996469486634 absolute error = 8.4e-32 relative error = 1.0521834137033586525731209042960e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.052 y[1] (analytic) = -0.07939096344910510115895916119412 y[1] (numeric) = -0.079390963449105101158959161194204 absolute error = 8.4e-32 relative error = 1.0580549265389580320997762546240e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 memory used=133.5MB, alloc=4.4MB, time=6.28 TOP MAIN SOLVE Loop x[1] = 1.053 y[1] (analytic) = -0.07894751026208189602466707426329 y[1] (numeric) = -0.078947510262081896024667074263372 absolute error = 8.2e-32 relative error = 1.0386648005463979768167148083020e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.054 y[1] (analytic) = -0.07850363056279969641912619209377 y[1] (numeric) = -0.078503630562799696419126192093849 absolute error = 7.9e-32 relative error = 1.0063228851155263235262188689129e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.055 y[1] (analytic) = -0.07805932459732539577314190194743 y[1] (numeric) = -0.078059324597325395773141901947517 absolute error = 8.7e-32 relative error = 1.1145369300694787869603636873695e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.056 y[1] (analytic) = -0.07761459261249991621319844674039 y[1] (numeric) = -0.077614592612499916213198446740464 absolute error = 7.4e-32 relative error = 9.5342895593685327075403679086245e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.057 y[1] (analytic) = -0.07716943485593815918554723553869 y[1] (numeric) = -0.077169434855938159185547235538769 absolute error = 7.9e-32 relative error = 1.0237213755352645233273237838283e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.058 y[1] (analytic) = -0.07672385157602895495835592369212 y[1] (numeric) = -0.0767238515760289549583559236922 absolute error = 8.0e-32 relative error = 1.0427005208507366065321301666104e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.059 y[1] (analytic) = -0.07627784302193501100177164343899 y[1] (numeric) = -0.076277843021935011001771643439062 absolute error = 7.2e-32 relative error = 9.4391761942318107544266064259021e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.06 y[1] (analytic) = -0.0758314094435928592457532360582 y[1] (numeric) = -0.075831409443592859245753236058276 absolute error = 7.6e-32 relative error = 1.0022232285756543496853050370216e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.061 y[1] (analytic) = -0.0753845510917128022155288072294 y[1] (numeric) = -0.075384551091712802215528807229477 absolute error = 7.7e-32 relative error = 1.0214294425700279564768805941029e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.062 y[1] (analytic) = -0.07493726821777885804453639818669 y[1] (numeric) = -0.074937268217778858044536398186778 absolute error = 8.8e-32 relative error = 1.1743155587718903580355511493095e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.063 y[1] (analytic) = -0.07448956107404870436470703651487 y[1] (numeric) = -0.074489561074048704364707036514947 absolute error = 7.7e-32 relative error = 1.0337018890936370857826116942788e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.064 y[1] (analytic) = -0.07404142991355362107395090203626 y[1] (numeric) = -0.07404142991355362107395090203633 absolute error = 7.0e-32 relative error = 9.4541664149014741116223706690851e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.065 y[1] (analytic) = -0.07359287499009843198070881517098 y[1] (numeric) = -0.073592874990098431980708815171057 absolute error = 7.7e-32 relative error = 1.0462969412509020789332135709552e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.066 y[1] (analytic) = -0.07314389655826144532543272742003 y[1] (numeric) = -0.0731438965582614453254327274201 absolute error = 7.0e-32 relative error = 9.5701765005427033144028658663804e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.067 y[1] (analytic) = -0.07269449487339439317886036621872 y[1] (numeric) = -0.072694494873394393178860366218788 absolute error = 6.8e-32 relative error = 9.3542159029276725937240857610894e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.068 y[1] (analytic) = -0.07224467019162236971695065933549 y[1] (numeric) = -0.072244670191622369716950659335575 absolute error = 8.5e-32 relative error = 1.1765573816662915951742107280197e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.069 y[1] (analytic) = -0.07179442276984376837234803724534 y[1] (numeric) = -0.071794422769843768372348037245408 absolute error = 6.8e-32 relative error = 9.4714878087385971744145405730486e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.07 y[1] (analytic) = -0.07134375286573021786224518548707 y[1] (numeric) = -0.071343752865730217862245185487136 absolute error = 6.6e-32 relative error = 9.2509851737422302950332474460467e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.071 y[1] (analytic) = -0.07089266073772651709251529291809 y[1] (numeric) = -0.070892660737726517092515292918166 absolute error = 7.6e-32 relative error = 1.0720432723095063797386769677922e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.072 y[1] (analytic) = -0.07044114664505056893798631600519 y[1] (numeric) = -0.070441146645050568937986316005263 absolute error = 7.3e-32 relative error = 1.0363261172882855772661201693550e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.073 y[1] (analytic) = -0.069989210847693312898731253836 y[1] (numeric) = -0.06998921084769331289873125383608 absolute error = 8.0e-32 relative error = 1.1430333194367860230597989764906e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.074 y[1] (analytic) = -0.06953685360641865663224990339991 y[1] (numeric) = -0.069536853606418656632249903399988 absolute error = 7.8e-32 relative error = 1.1217073530747175719026706147133e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.075 y[1] (analytic) = -0.06908407518276340636141903986703 y[1] (numeric) = -0.069084075182763406361419039867102 absolute error = 7.2e-32 relative error = 1.0422083498913816510612238529213e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.076 y[1] (analytic) = -0.06863087583903719615808944208928 y[1] (numeric) = -0.068630875839037196158089442089359 absolute error = 7.9e-32 relative error = 1.1510854121296941539536335232278e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.077 y[1] (analytic) = -0.06817725583832241610220965935509 y[1] (numeric) = -0.068177255838322416102209659355169 absolute error = 7.9e-32 relative error = 1.1587442033064951036774505792776e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.078 y[1] (analytic) = -0.06772321544447413931635789154769 y[1] (numeric) = -0.067723215444474139316357891547781 absolute error = 9.1e-32 relative error = 1.3437046572989488014068454021816e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.079 y[1] (analytic) = -0.06726875492212004787556483128513 y[1] (numeric) = -0.067268754922120047875564831285212 absolute error = 8.2e-32 relative error = 1.2189908984480975277639678044265e-28 % Correct digits = 29 h = 0.001 memory used=137.3MB, alloc=4.4MB, time=6.46 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.08 y[1] (analytic) = -0.06681387453666035759231179335448 y[1] (numeric) = -0.06681387453666035759231179335456 absolute error = 8.0e-32 relative error = 1.1973560963913939363141850100248e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.081 y[1] (analytic) = -0.06635857455426774167658993379385 y[1] (numeric) = -0.066358574554267741676589933793927 absolute error = 7.7e-32 relative error = 1.1603624779044906818767076564723e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.082 y[1] (analytic) = -0.06590285524188725327090783831915 y[1] (numeric) = -0.065902855241887253270907838319225 absolute error = 7.5e-32 relative error = 1.1380387044646691506924660279908e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.083 y[1] (analytic) = -0.06544671686723624686013623743884 y[1] (numeric) = -0.065446716867236246860136237438921 absolute error = 8.1e-32 relative error = 1.2376480269333417766672336654461e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.084 y[1] (analytic) = -0.06499015969880429855608008354546 y[1] (numeric) = -0.064990159698804298556080083545539 absolute error = 7.9e-32 relative error = 1.2155686394082434787019642450054e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.085 y[1] (analytic) = -0.06453318400585312525666970351655 y[1] (numeric) = -0.06453318400585312525666970351662 absolute error = 7.0e-32 relative error = 1.0847132537835268976970865853733e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.086 y[1] (analytic) = -0.06407579005841650267966421889792 y[1] (numeric) = -0.064075790058416502679664218897998 absolute error = 7.8e-32 relative error = 1.2173084394104091153180314665568e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.087 y[1] (analytic) = -0.06361797812730018227076190457678 y[1] (numeric) = -0.063617978127300182270761904576857 absolute error = 7.7e-32 relative error = 1.2103496883525953003623402062428e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.088 y[1] (analytic) = -0.06315974848408180698601363597923 y[1] (numeric) = -0.063159748484081806986013635979311 absolute error = 8.1e-32 relative error = 1.2824623584499308662538161587819e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.089 y[1] (analytic) = -0.06270110140111082594843705424517 y[1] (numeric) = -0.062701101401110825948437054245247 absolute error = 7.7e-32 relative error = 1.2280486032839584496601888573304e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.09 y[1] (analytic) = -0.06224203715150840797873055854011 y[1] (numeric) = -0.062242037151508407978730558540192 absolute error = 8.2e-32 relative error = 1.3174375992931774826034359422480e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.091 y[1] (analytic) = -0.061782556009167353999987714658 y[1] (numeric) = -0.061782556009167353999987714658079 absolute error = 7.9e-32 relative error = 1.2786780784575812208668622897710e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.092 y[1] (analytic) = -0.06132265824875200831631414934811 y[1] (numeric) = -0.061322658248752008316314149348187 absolute error = 7.7e-32 relative error = 1.2556533294374440284921989641713e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.093 y[1] (analytic) = -0.06086234414569816876525048036233 y[1] (numeric) = -0.060862344145698168765250480362411 absolute error = 8.1e-32 relative error = 1.3308721695979103602869550471522e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.094 y[1] (analytic) = -0.06040161397621299574390631306342 y[1] (numeric) = -0.060401613976212995743906313063498 absolute error = 7.8e-32 relative error = 1.2913562215525812925827497480925e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.095 y[1] (analytic) = -0.05994046801727492010871181555909 y[1] (numeric) = -0.059940468017274920108711815559167 absolute error = 7.7e-32 relative error = 1.2846079209426342949924516538224e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.096 y[1] (analytic) = -0.05947890654663354994869486572916 y[1] (numeric) = -0.059478906546633549948694865729241 absolute error = 8.1e-32 relative error = 1.3618273216992171430058520997567e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.097 y[1] (analytic) = -0.0590169298428095762321932451912 y[1] (numeric) = -0.059016929842809576232193245191272 absolute error = 7.2e-32 relative error = 1.2199889115169252957307468543323e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.098 y[1] (analytic) = -0.05855453818509467732691283720267 y[1] (numeric) = -0.058554538185094677326912837202749 absolute error = 7.9e-32 relative error = 1.3491695511332682237829609096412e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.099 y[1] (analytic) = -0.058091731853551422393244267722944 y[1] (numeric) = -0.05809173185355142239324426772303 absolute error = 8.6e-32 relative error = 1.4804172169768495745799332459675e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.1 y[1] (analytic) = -0.057628511129013173650751911353718 y[1] (numeric) = -0.05762851112901317365075191135379 absolute error = 7.2e-32 relative error = 1.2493815750126411891302240505610e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.101 y[1] (analytic) = -0.057164876293083987517750666641133 y[1] (numeric) = -0.057164876293083987517750666641212 absolute error = 7.9e-32 relative error = 1.3819674793830998692719320543551e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.102 y[1] (analytic) = -0.056700827628138514623887388254397 y[1] (numeric) = -0.056700827628138514623887388254472 absolute error = 7.5e-32 relative error = 1.3227320153397599763231344217416e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.103 y[1] (analytic) = -0.056236365417321898695645346851427 y[1] (numeric) = -0.056236365417321898695645346851505 absolute error = 7.8e-32 relative error = 1.3870028658711019198764044179048e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.104 y[1] (analytic) = -0.055771489944549674314691571002634 y[1] (numeric) = -0.055771489944549674314691571002715 absolute error = 8.1e-32 relative error = 1.4523549591472911248272210611739e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.105 y[1] (analytic) = -0.055306201494507663548988409364287 y[1] (numeric) = -0.055306201494507663548988409364369 absolute error = 8.2e-32 relative error = 1.4826547075040624240717108404726e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=141.1MB, alloc=4.4MB, time=6.64 x[1] = 1.106 y[1] (analytic) = -0.054840500352651871456592135373981 y[1] (numeric) = -0.054840500352651871456592135374061 absolute error = 8.0e-32 relative error = 1.4587758952883352721219332564275e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.107 y[1] (analytic) = -0.054374386805208380462062901078916 y[1] (numeric) = -0.054374386805208380462062901078994 absolute error = 7.8e-32 relative error = 1.4344989356740402591645466130169e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.108 y[1] (analytic) = -0.053907861139173243605411831302025 y[1] (numeric) = -0.053907861139173243605411831302097 absolute error = 7.2e-32 relative error = 1.3356122554022039608756790399272e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.109 y[1] (analytic) = -0.053440923642312376663512534199191 y[1] (numeric) = -0.053440923642312376663512534199266 absolute error = 7.5e-32 relative error = 1.4034188574655923926853585471721e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.11 y[1] (analytic) = -0.052973574603161449143905789361453 y[1] (numeric) = -0.052973574603161449143905789361529 absolute error = 7.6e-32 relative error = 1.4346775834807330480190779848958e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.111 y[1] (analytic) = -0.052505814311025774150927659966684 y[1] (numeric) = -0.05250581431102577415092765996677 absolute error = 8.6e-32 relative error = 1.6379138411332234477694153408095e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.112 y[1] (analytic) = -0.052037643055980197124092761084942 y[1] (numeric) = -0.052037643055980197124092761085014 absolute error = 7.2e-32 relative error = 1.3836137797890851409967961298329e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.113 y[1] (analytic) = -0.051569061128868983448665902087226 y[1] (numeric) = -0.051569061128868983448665902087312 absolute error = 8.6e-32 relative error = 1.6676665837504681851928175892367e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.114 y[1] (analytic) = -0.051100068821305704938356807199031 y[1] (numeric) = -0.051100068821305704938356807199106 absolute error = 7.5e-32 relative error = 1.4677083951153004709481760767279e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.115 y[1] (analytic) = -0.050630666425673125190074104572734 y[1] (numeric) = -0.050630666425673125190074104572812 absolute error = 7.8e-32 relative error = 1.5405683058607499785895883830655e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.116 y[1] (analytic) = -0.050160854235123083810676260829238 y[1] (numeric) = -0.050160854235123083810676260829318 absolute error = 8.0e-32 relative error = 1.5948691707882294485994073395857e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.117 y[1] (analytic) = -0.049690632543576379515658624832281 y[1] (numeric) = -0.049690632543576379515658624832365 absolute error = 8.4e-32 relative error = 1.6904594628843957035466018201841e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.118 y[1] (analytic) = -0.04922000164572265209971723151142 y[1] (numeric) = -0.049220001645722652099717231511499 absolute error = 7.9e-32 relative error = 1.6050385485280719868772993250925e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.119 y[1] (analytic) = -0.048748961837020263279131503836493 y[1] (numeric) = -0.048748961837020263279131503836575 absolute error = 8.2e-32 relative error = 1.6820871031909584704517558670170e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.12 y[1] (analytic) = -0.048277513413696176405909478567803 y[1] (numeric) = -0.04827751341369617640590947856788 absolute error = 7.7e-32 relative error = 1.5949454426158441263077154570524e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.121 y[1] (analytic) = -0.047805656672745835053640669158818 y[1] (numeric) = -0.047805656672745835053640669158899 absolute error = 8.1e-32 relative error = 1.6943601581395778886659564730842e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.122 y[1] (analytic) = -0.047333391911933040475003167171692 y[1] (numeric) = -0.047333391911933040475003167171777 absolute error = 8.5e-32 relative error = 1.7957724254823786453136937922804e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.123 y[1] (analytic) = -0.046860719429789827930873071776703 y[1] (numeric) = -0.046860719429789827930873071776782 absolute error = 7.9e-32 relative error = 1.6858469302496220326927627646259e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.124 y[1] (analytic) = -0.046387639525616341890985825344597 y[1] (numeric) = -0.046387639525616341890985825344676 absolute error = 7.9e-32 relative error = 1.7030398788964967318115905406045e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.125 y[1] (analytic) = -0.04591415249948071010610052180292 y[1] (numeric) = -0.045914152499480710106100521803001 absolute error = 8.1e-32 relative error = 1.7641619324437298818206478473757e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.126 y[1] (analytic) = -0.045440258652218916551619743312041 y[1] (numeric) = -0.045440258652218916551619743312114 absolute error = 7.3e-32 relative error = 1.6065049400073188095367251511024e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.127 y[1] (analytic) = -0.044965958285434673242618969922278 y[1] (numeric) = -0.044965958285434673242618969922356 absolute error = 7.8e-32 relative error = 1.7346455624246237720003320502000e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.128 y[1] (analytic) = -0.044491251701499290920241096198284 y[1] (numeric) = -0.044491251701499290920241096198355 absolute error = 7.1e-32 relative error = 1.5958193416618890619052016026561e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.129 y[1] (analytic) = -0.044016139203551548609413078338047 y[1] (numeric) = -0.044016139203551548609413078338123 absolute error = 7.6e-32 relative error = 1.7266393958029775645311049284533e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.13 y[1] (analytic) = -0.04354062109549756204784322507148 y[1] (numeric) = -0.043540621095497562047843225071562 absolute error = 8.2e-32 relative error = 1.8832988123929044284618529447415e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.131 y[1] (analytic) = -0.043064697682010650986259135593298 y[1] (numeric) = -0.043064697682010650986259135593373 absolute error = 7.5e-32 relative error = 1.7415656915508693575635051572551e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.132 y[1] (analytic) = -0.042588369268531205359847777967203 y[1] (numeric) = -0.042588369268531205359847777967287 absolute error = 8.4e-32 relative error = 1.9723694859119222089272361788447e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 memory used=144.9MB, alloc=4.4MB, time=6.83 TOP MAIN SOLVE Loop x[1] = 1.133 y[1] (analytic) = -0.042111636161266550330860691830104 y[1] (numeric) = -0.042111636161266550330860691830183 absolute error = 7.9e-32 relative error = 1.8759660559724971410639345393018e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.134 y[1] (analytic) = -0.041634498667190810202348789824086 y[1] (numeric) = -0.041634498667190810202348789824171 absolute error = 8.5e-32 relative error = 2.0415761621018979577328621401378e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.135 y[1] (analytic) = -0.041156957094044771202992722990132 y[1] (numeric) = -0.04115695709404477120299272299022 absolute error = 8.8e-32 relative error = 2.1381561275027596474813731390480e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.136 y[1] (analytic) = -0.040679011750335743142996266366512 y[1] (numeric) = -0.040679011750335743142996266366598 absolute error = 8.6e-32 relative error = 2.1141123222908727934932422916755e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.137 y[1] (analytic) = -0.04020066294533741994101167224728 y[1] (numeric) = -0.040200662945337419941011672247357 absolute error = 7.7e-32 relative error = 1.9153912985141620723847264684704e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.138 y[1] (analytic) = -0.039721910989089739022067429968436 y[1] (numeric) = -0.039721910989089739022067429968509 absolute error = 7.3e-32 relative error = 1.8377766371827030862339575786689e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.139 y[1] (analytic) = -0.039242756192398739586470362700503 y[1] (numeric) = -0.039242756192398739586470362700579 absolute error = 7.6e-32 relative error = 1.9366631545294232154587025509332e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.14 y[1] (analytic) = -0.038763198866836419749655483533878 y[1] (numeric) = -0.038763198866836419749655483533961 absolute error = 8.3e-32 relative error = 2.1412061549700961896847579861263e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.141 y[1] (analytic) = -0.038283239324740592552958525146076 y[1] (numeric) = -0.038283239324740592552958525146156 absolute error = 8.0e-32 relative error = 2.0896873256046516762267224861916e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.142 y[1] (analytic) = -0.037802877879214740845287549535573 y[1] (numeric) = -0.037802877879214740845287549535649 absolute error = 7.6e-32 relative error = 2.0104289478391084794359465705911e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.143 y[1] (analytic) = -0.037322114844127871035671536693956 y[1] (numeric) = -0.037322114844127871035671536694036 absolute error = 8.0e-32 relative error = 2.1435012547952361226753341774747e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.144 y[1] (analytic) = -0.036840950534114365716665343664106 y[1] (numeric) = -0.036840950534114365716665343664177 absolute error = 7.1e-32 relative error = 1.9272032607914033909361835996525e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.145 y[1] (analytic) = -0.036359385264573835158591918195729 y[1] (numeric) = -0.036359385264573835158591918195805 absolute error = 7.6e-32 relative error = 2.0902443604856361879524889849322e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.146 y[1] (analytic) = -0.035877419351670967674604144159178 y[1] (numeric) = -0.035877419351670967674604144159256 absolute error = 7.8e-32 relative error = 2.1740694121682194037158715483042e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.147 y[1] (analytic) = -0.03539505311233537885655018901089 y[1] (numeric) = -0.035395053112335378856550189010981 absolute error = 9.1e-32 relative error = 2.5709807444330682042266145212699e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.148 y[1] (analytic) = -0.03491228686426145968162771691933 y[1] (numeric) = -0.034912286864261459681627716919412 absolute error = 8.2e-32 relative error = 2.3487433040068382706764281854362e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.149 y[1] (analytic) = -0.034429120925908223489813824654576 y[1] (numeric) = -0.034429120925908223489813824654652 absolute error = 7.6e-32 relative error = 2.2074336479154573973124979455039e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.15 y[1] (analytic) = -0.033945555616499151832059051018522 y[1] (numeric) = -0.033945555616499151832059051018603 absolute error = 8.1e-32 relative error = 2.3861739343759674376644818584996e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.151 y[1] (analytic) = -0.033461591256022039189235304441468 y[1] (numeric) = -0.033461591256022039189235304441543 absolute error = 7.5e-32 relative error = 2.2413757739779439583974420040849e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.152 y[1] (analytic) = -0.032977228165228836561829047394998 y[1] (numeric) = -0.032977228165228836561829047395081 absolute error = 8.3e-32 relative error = 2.5168883080208401115353347508150e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.153 y[1] (analytic) = -0.032492466665635493930372570467812 y[1] (numeric) = -0.032492466665635493930372570467896 absolute error = 8.4e-32 relative error = 2.5852146241897856171153506806373e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.154 y[1] (analytic) = -0.032007307079521801586607683317828 y[1] (numeric) = -0.032007307079521801586607683317916 absolute error = 8.8e-32 relative error = 2.7493721912113683954339789303626e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.155 y[1] (analytic) = -0.031521749729931230335377644250632 y[1] (numeric) = -0.031521749729931230335377644250715 absolute error = 8.3e-32 relative error = 2.6331025628690910103284032635279e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.156 y[1] (analytic) = -0.031035794940670770567244644876972 y[1] (numeric) = -0.031035794940670770567244644877059 absolute error = 8.7e-32 relative error = 2.8032148094261021693737439148408e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.157 y[1] (analytic) = -0.030549443036310770201831661170765 y[1] (numeric) = -0.030549443036310770201831661170845 absolute error = 8.0e-32 relative error = 2.6187056799992320589058388730976e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.158 y[1] (analytic) = -0.030062694342184771501888977280211 y[1] (numeric) = -0.030062694342184771501888977280298 absolute error = 8.7e-32 relative error = 2.8939521857134171872375165503174e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=148.7MB, alloc=4.4MB, time=7.01 x[1] = 1.159 y[1] (analytic) = -0.029575549184389346758087183638279 y[1] (numeric) = -0.029575549184389346758087183638357 absolute error = 7.8e-32 relative error = 2.6373136645310440797208429546993e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.16 y[1] (analytic) = -0.02908800788978393284453994627074 y[1] (numeric) = -0.029088007889783932844539946270827 absolute error = 8.7e-32 relative error = 2.9909232811558564344695863743047e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.161 y[1] (analytic) = -0.028600070785990664645061339711166 y[1] (numeric) = -0.028600070785990664645061339711245 absolute error = 7.9e-32 relative error = 2.7622309256205414486177003513995e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.162 y[1] (analytic) = -0.028111738201394207350164031597559 y[1] (numeric) = -0.028111738201394207350164031597632 absolute error = 7.3e-32 relative error = 2.5967800168393553911854334560385e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.163 y[1] (analytic) = -0.027623010465141587624806102846445 y[1] (numeric) = -0.02762301046514158762480610284653 absolute error = 8.5e-32 relative error = 3.0771446909186230289482722640567e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.164 y[1] (analytic) = -0.027133887907142023646895783272007 y[1] (numeric) = -0.02713388790714202364689578327209 absolute error = 8.3e-32 relative error = 3.0589055384928167374961338749994e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.165 y[1] (analytic) = -0.02664437085806675401656487864052 y[1] (numeric) = -0.026644370858066754016564878640602 absolute error = 8.2e-32 relative error = 3.0775731368103959015929462676974e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.166 y[1] (analytic) = -0.026154459649348865536223161421825 y[1] (numeric) = -0.026154459649348865536223161421902 absolute error = 7.7e-32 relative error = 2.9440485879782636418820522438625e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.167 y[1] (analytic) = -0.025664154613183119861407493916606 y[1] (numeric) = -0.025664154613183119861407493916694 absolute error = 8.8e-32 relative error = 3.4289070232921799698914381493142e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.168 y[1] (analytic) = -0.025173456082525779022440949000987 y[1] (numeric) = -0.025173456082525779022440949001072 absolute error = 8.5e-32 relative error = 3.3765725183441527654321087758239e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.169 y[1] (analytic) = -0.024682364391094429816918690434552 y[1] (numeric) = -0.024682364391094429816918690434636 absolute error = 8.4e-32 relative error = 3.4032396033464196459818629755067e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.17 y[1] (analytic) = -0.024190879873367807073038871524557 y[1] (numeric) = -0.024190879873367807073038871524644 absolute error = 8.7e-32 relative error = 3.5963966774015495878858070082672e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.171 y[1] (analytic) = -0.023699002864585615783798307923677 y[1] (numeric) = -0.023699002864585615783798307923756 absolute error = 7.9e-32 relative error = 3.3334735833148876594327963769487e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.172 y[1] (analytic) = -0.023206733700748352112074177461216 y[1] (numeric) = -0.023206733700748352112074177461304 absolute error = 8.8e-32 relative error = 3.7920028356753301594067542812212e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.173 y[1] (analytic) = -0.022714072718617123266614497165659 y[1] (numeric) = -0.02271407271861712326661449716574 absolute error = 8.1e-32 relative error = 3.5660711754968545710542785673802e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.174 y[1] (analytic) = -0.022221020255713466248961625027036 y[1] (numeric) = -0.022221020255713466248961625027116 absolute error = 8.0e-32 relative error = 3.6001947291070223891073357464918e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.175 y[1] (analytic) = -0.021727576650319165471334531571237 y[1] (numeric) = -0.02172757665031916547133453157131 absolute error = 7.3e-32 relative error = 3.3597856389993530379719443378471e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.176 y[1] (analytic) = -0.02123374224147606924549708397022 y[1] (numeric) = -0.021233742241476069245497083970303 absolute error = 8.3e-32 relative error = 3.9088729182120010938246571992968e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.177 y[1] (analytic) = -0.020739517368985905142641083193246 y[1] (numeric) = -0.020739517368985905142641083193328 absolute error = 8.2e-32 relative error = 3.9538046397658063222417373356494e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.178 y[1] (analytic) = -0.020244902373410094224314292610147 y[1] (numeric) = -0.020244902373410094224314292610231 absolute error = 8.4e-32 relative error = 4.1491926436912158905205544869323e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.179 y[1] (analytic) = -0.019749897596069564144425194489012 y[1] (numeric) = -0.019749897596069564144425194489097 absolute error = 8.5e-32 relative error = 4.3038197836993285268367186223423e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.18 y[1] (analytic) = -0.019254503379044561122357708983091 y[1] (numeric) = -0.01925450337904456112235770898317 absolute error = 7.9e-32 relative error = 4.1029362557321956133056407549644e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.181 y[1] (analytic) = -0.018758720065174460787230608475444 y[1] (numeric) = -0.018758720065174460787230608475526 absolute error = 8.2e-32 relative error = 4.3713003720457928532914241376985e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.182 y[1] (analytic) = -0.018262547998057577893337858541851 y[1] (numeric) = -0.018262547998057577893337858541938 absolute error = 8.7e-32 relative error = 4.7638478491201448655962937481710e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.183 y[1] (analytic) = -0.017765987522050974906807615300975 y[1] (numeric) = -0.017765987522050974906807615301048 absolute error = 7.3e-32 relative error = 4.1089750800169758994735221580425e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.184 y[1] (analytic) = -0.017269038982270269463519107544385 y[1] (numeric) = -0.017269038982270269463519107544467 absolute error = 8.2e-32 relative error = 4.7483823555084645791433729176506e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.185 y[1] (analytic) = -0.016771702724589440698318130775781 y[1] (numeric) = -0.016771702724589440698318130775859 absolute error = 7.8e-32 relative error = 4.6506905876433237508388573599369e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 memory used=152.5MB, alloc=4.4MB, time=7.20 TOP MAIN SOLVE Loop x[1] = 1.186 y[1] (analytic) = -0.016273979095640634445573379135566 y[1] (numeric) = -0.016273979095640634445573379135649 absolute error = 8.3e-32 relative error = 5.1001663153317856575657225613069e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.187 y[1] (analytic) = -0.015775868442813967311117340144636 y[1] (numeric) = -0.015775868442813967311117340144711 absolute error = 7.5e-32 relative error = 4.7540964398801824709104789800259e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.188 y[1] (analytic) = -0.015277371114257329615616976264478 y[1] (numeric) = -0.01527737111425732961561697626455 absolute error = 7.2e-32 relative error = 4.7128527193273000582340952453490e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.189 y[1] (analytic) = -0.01477848745887618720942091644097 y[1] (numeric) = -0.014778487458876187209420916441052 absolute error = 8.2e-32 relative error = 5.5486057168015213157965337470530e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.19 y[1] (analytic) = -0.014279217826333382158931380072022 y[1] (numeric) = -0.014279217826333382158931380072097 absolute error = 7.5e-32 relative error = 5.2523885350139309073560334341813e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.191 y[1] (analytic) = -0.013779562567048932304550555214181 y[1] (numeric) = -0.013779562567048932304550555214266 absolute error = 8.5e-32 relative error = 6.1685557568612880591355409773620e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.192 y[1] (analytic) = -0.013279522032199829690252652318608 y[1] (numeric) = -0.013279522032199829690252652318695 absolute error = 8.7e-32 relative error = 6.5514406157875809043304369691667e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.193 y[1] (analytic) = -0.012779096573719837864834354358844 y[1] (numeric) = -0.012779096573719837864834354358927 absolute error = 8.3e-32 relative error = 6.4949818260775316037811129040868e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.194 y[1] (analytic) = -0.012278286544299288054897883882493 y[1] (numeric) = -0.012278286544299288054897883882574 absolute error = 8.1e-32 relative error = 6.5970117009207333905574351952030e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.195 y[1] (analytic) = -0.011777092297384874209622407281705 y[1] (numeric) = -0.011777092297384874209622407281784 absolute error = 7.9e-32 relative error = 6.7079375795961198813602623518973e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.196 y[1] (analytic) = -0.011275514187179446917380996433017 y[1] (numeric) = -0.011275514187179446917380996433103 absolute error = 8.6e-32 relative error = 7.6271466269612997516224871406202e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.197 y[1] (analytic) = -0.010773552568641806194261867803346 y[1] (numeric) = -0.010773552568641806194261867803418 absolute error = 7.2e-32 relative error = 6.6830323183800877947887141746888e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.198 y[1] (analytic) = -0.010271207797486493144554119153336 y[1] (numeric) = -0.010271207797486493144554119153418 absolute error = 8.2e-32 relative error = 7.9834817498353539404137300048125e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.199 y[1] (analytic) = -0.009768480230183580493259684091436 y[1] (numeric) = -0.0097684802301835804932596840915129 absolute error = 7.69e-32 relative error = 7.8722583439732064575356912939292e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.2 y[1] (analytic) = -0.009265370223958461990694724937489 y[1] (numeric) = -0.0092653702239584619906947249375762 absolute error = 8.72e-32 relative error = 9.4113886323201206977031502068415e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.201 y[1] (analytic) = -0.008761878136791640689245184645233 y[1] (numeric) = -0.0087618781367916406892451846453135 absolute error = 8.05e-32 relative error = 9.1875279184694174187682965733409e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.202 y[1] (analytic) = -0.008258004327418516092342718902568 y[1] (numeric) = -0.0082580043274185160923427189026498 absolute error = 8.18e-32 relative error = 9.9055409463040320965203629059157e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.203 y[1] (analytic) = -0.00775374915532917017572872997933 y[1] (numeric) = -0.0077537491553291701757287299794101 absolute error = 8.01e-32 relative error = 1.0330486374445977545266663572025e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.204 y[1] (analytic) = -0.00724911298076815228107572441877 y[1] (numeric) = -0.0072491129807681522810757244188463 absolute error = 7.63e-32 relative error = 1.0525425690346306376186104542476e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.205 y[1] (analytic) = -0.0067440961647342628820367172723 y[1] (numeric) = -0.0067440961647342628820367172723851 absolute error = 8.51e-32 relative error = 1.2618444031833165437996142629854e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.206 y[1] (analytic) = -0.00623869906898033622279490625336 y[1] (numeric) = -0.0062386990689803362227949062534466 absolute error = 8.66e-32 relative error = 1.3881099094935837951052267170612e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.207 y[1] (analytic) = -0.00573292205601302182918733993438 y[1] (numeric) = -0.005732922056013021829187339934453 absolute error = 7.30e-32 relative error = 1.2733471567685689621781899086764e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.208 y[1] (analytic) = -0.00522676548909256489247780492925 y[1] (numeric) = -0.0052267654890925648924778049293227 absolute error = 7.27e-32 relative error = 1.3909175789828993155839594584856e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.209 y[1] (analytic) = -0.00472022973223258552585565788989 y[1] (numeric) = -0.0047202297322325855258556578899653 absolute error = 7.53e-32 relative error = 1.5952613383583011808249704764893e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.21 y[1] (analytic) = -0.0042133151501998568937388290976 y[1] (numeric) = -0.0042133151501998568937388290976755 absolute error = 7.55e-32 relative error = 1.7919381130656387797030760230212e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.211 y[1] (analytic) = -0.00370602210851408221396072544692 y[1] (numeric) = -0.0037060221085140822139607254469947 absolute error = 7.47e-32 relative error = 2.0156382723240344508003374103015e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.212 y[1] (analytic) = -0.00319835097344767063292226169862 y[1] (numeric) = -0.0031983509734476706329222616986995 memory used=156.4MB, alloc=4.4MB, time=7.39 absolute error = 7.95e-32 relative error = 2.4856559101862035844369422060176e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.213 y[1] (analytic) = -0.00269030211202551197379175001812 y[1] (numeric) = -0.0026903021120255119737917500182017 absolute error = 8.17e-32 relative error = 3.0368336565178016629178535423091e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.214 y[1] (analytic) = -0.00218187589202475035783687901386 y[1] (numeric) = -0.002181875892024750357836879013938 absolute error = 7.80e-32 relative error = 3.5749054419230549943119304979611e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.215 y[1] (analytic) = -0.00167307268197455669897451474533 y[1] (numeric) = -0.0016730726819745566989745147454092 absolute error = 7.92e-32 relative error = 4.7338051032264978600836243197018e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.216 y[1] (analytic) = -0.00116389285115590007162555748044 y[1] (numeric) = -0.0011638928511559000716255574805239 absolute error = 8.39e-32 relative error = 7.2085673450675605486525259056736e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.217 y[1] (analytic) = -0.00065433676960131795196358934486 y[1] (numeric) = -0.0006543367696013179519635893449364 absolute error = 7.640e-32 relative error = 1.1675944796217075779060827077738e-26 % Correct digits = 27 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.218 y[1] (analytic) = -0.00014440480809468533264754942018 y[1] (numeric) = -0.00014440480809468533264754942026148 absolute error = 8.148e-32 relative error = 5.6424714020999959941630011189234e-26 % Correct digits = 27 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.219 y[1] (analytic) = 0.00036590266182901728886982568855 y[1] (numeric) = 0.00036590266182901728886982568846813 absolute error = 8.187e-32 relative error = 2.2374803066684725265391736043729e-26 % Correct digits = 27 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.22 y[1] (analytic) = 0.00087658526788393704836455628492 y[1] (numeric) = 0.00087658526788393704836455628484713 absolute error = 7.287e-32 relative error = 8.3129391594621508692900389302683e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.221 y[1] (analytic) = 0.00138764263703358297910022792505 y[1] (numeric) = 0.0013876426370335829791002279249682 absolute error = 8.18e-32 relative error = 5.8948894922158780923829172887782e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.222 y[1] (analytic) = 0.00189907439549106140222681098544 y[1] (numeric) = 0.0018990743954910614022268109853615 absolute error = 7.85e-32 relative error = 4.1335926694805193176702429003074e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.223 y[1] (analytic) = 0.00241088016871931244322174712547 y[1] (numeric) = 0.0024108801687193124432217471253904 absolute error = 7.96e-32 relative error = 3.3016987336323913952112845445363e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.224 y[1] (analytic) = 0.00292305958143134767427405663282 y[1] (numeric) = 0.0029230595814313476742740566327296 absolute error = 9.04e-32 relative error = 3.0926499266133134105320569370753e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.225 y[1] (analytic) = 0.00343561225759048888251071892085 y[1] (numeric) = 0.0034356122575904888825107189207712 absolute error = 7.88e-32 relative error = 2.2936232057591128207255807158148e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.226 y[1] (analytic) = 0.00394853782041060796396307669095 y[1] (numeric) = 0.0039485378204106079639630766908716 absolute error = 7.84e-32 relative error = 1.9855451198855984013259245984895e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.227 y[1] (analytic) = 0.00446183589235636794316951248223 y[1] (numeric) = 0.0044618358923563679431695124821534 absolute error = 7.66e-32 relative error = 1.7167821015386179276367813123023e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.228 y[1] (analytic) = 0.00497550609514346511830914450907 y[1] (numeric) = 0.0049755060951434651183091445089853 absolute error = 8.47e-32 relative error = 1.7023393877996593386400032614793e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.229 y[1] (analytic) = 0.00548954804973887233175978683324 y[1] (numeric) = 0.0054895480497388723317597868331593 absolute error = 8.07e-32 relative error = 1.4700663746597272255542490721307e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.23 y[1] (analytic) = 0.00600396137636108336597191703613 y[1] (numeric) = 0.0060039613763610833659719170360439 absolute error = 8.61e-32 relative error = 1.4340531959281856720977456346873e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.231 y[1] (analytic) = 0.006518745694480358464548892647575 y[1] (numeric) = 0.0065187456944803584645488926474961 absolute error = 7.89e-32 relative error = 1.2103555453437505225495974666561e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.232 y[1] (analytic) = 0.007033900622818970978422155655023 y[1] (numeric) = 0.0070339006228189709784221556549403 absolute error = 8.27e-32 relative error = 1.1757345523436807412008899151577e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.233 y[1] (analytic) = 0.007549425779351455137008662459722 y[1] (numeric) = 0.0075494257793514551370086624596476 absolute error = 7.44e-32 relative error = 9.8550541689531577533802757034041e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.234 y[1] (analytic) = 0.008065320781304854944236274669841 y[1] (numeric) = 0.0080653207813048549442362746697533 absolute error = 8.77e-32 relative error = 1.0873715054618246584950458408989e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.235 y[1] (analytic) = 0.00858158524515897419932134412289 y[1] (numeric) = 0.0085815852451589741993213441228137 absolute error = 7.63e-32 relative error = 8.8911311628632012199189861097112e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.236 y[1] (analytic) = 0.009098218786646627642181223516678 y[1] (numeric) = 0.0090982187866466276421812235166026 absolute error = 7.54e-32 relative error = 8.2873364301443145339869851665070e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.237 y[1] (analytic) = 0.009615221020753893223362931997348 y[1] (numeric) = 0.0096152210207538932233629319972646 absolute error = 8.34e-32 relative error = 8.6737475737672560004217347247766e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.238 y[1] (analytic) = 0.010132591561720365498367703010823 y[1] (numeric) = 0.010132591561720365498367703010755 absolute error = 6.8e-32 relative error = 6.7110175699665325218823006686451e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=160.2MB, alloc=4.4MB, time=7.57 x[1] = 1.239 y[1] (analytic) = 0.010650330023039410146249639668657 y[1] (numeric) = 0.010650330023039410146249639668582 absolute error = 7.5e-32 relative error = 7.0420353019817846407832175792200e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.24 y[1] (analytic) = 0.011168436017458419612365200814196 y[1] (numeric) = 0.011168436017458419612365200814114 absolute error = 8.2e-32 relative error = 7.3421202280980241292003816648179e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.241 y[1] (analytic) = 0.011686909156979069875148738903067 y[1] (numeric) = 0.011686909156979069875148738902987 absolute error = 8.0e-32 relative error = 6.8452658376510449219214469799530e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.242 y[1] (analytic) = 0.012205749052857578336787808732427 y[1] (numeric) = 0.012205749052857578336787808732348 absolute error = 7.9e-32 relative error = 6.4723598410787189443517248350912e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.243 y[1] (analytic) = 0.012724955315604962837670463970721 y[1] (numeric) = 0.012724955315604962837670463970644 absolute error = 7.7e-32 relative error = 6.0511017988073232212179813684832e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.244 y[1] (analytic) = 0.013244527554987301794475256354438 y[1] (numeric) = 0.013244527554987301794475256354356 absolute error = 8.2e-32 relative error = 6.1912363170041830602092454945160e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.245 y[1] (analytic) = 0.013764465380025995461773150332344 y[1] (numeric) = 0.013764465380025995461773150332263 absolute error = 8.1e-32 relative error = 5.8847182047143936390839747332265e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.246 y[1] (analytic) = 0.014284768398998028317009063853586 y[1] (numeric) = 0.01428476839899802831700906385351 absolute error = 7.6e-32 relative error = 5.3203522715377620206721266489621e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.247 y[1] (analytic) = 0.014805436219436232568729243914772 y[1] (numeric) = 0.014805436219436232568729243914697 absolute error = 7.5e-32 relative error = 5.0657068720164923685583479994102e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.248 y[1] (analytic) = 0.015326468448129552787919183405489 y[1] (numeric) = 0.015326468448129552787919183405406 absolute error = 8.3e-32 relative error = 5.4154680369390214672581905456420e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.249 y[1] (analytic) = 0.01584786469112331166231528372289 y[1] (numeric) = 0.015847864691123311662315283722807 absolute error = 8.3e-32 relative error = 5.2372986277760099535776245882414e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.25 y[1] (analytic) = 0.016369624553719476873551965566288 y[1] (numeric) = 0.01636962455371947687355196556621 absolute error = 7.8e-32 relative error = 4.7649229671719611442980394382860e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.251 y[1] (analytic) = 0.016891747640476929097004428273544 y[1] (numeric) = 0.016891747640476929097004428273467 absolute error = 7.7e-32 relative error = 4.5584389276269076346736769372188e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.252 y[1] (analytic) = 0.017414233555211731124185756024996 y[1] (numeric) = 0.01741423355521173112418575602492 absolute error = 7.6e-32 relative error = 4.3642460495916986843063335093892e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.253 y[1] (analytic) = 0.017937081900997398107555567219014 y[1] (numeric) = 0.017937081900997398107555567218938 absolute error = 7.6e-32 relative error = 4.2370325574403488532634547926955e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.254 y[1] (analytic) = 0.018460292280165168927595901318055 y[1] (numeric) = 0.018460292280165168927595901317977 absolute error = 7.8e-32 relative error = 4.2252852130520066810433719001593e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.255 y[1] (analytic) = 0.018983864294304278682008535477377 y[1] (numeric) = 0.018983864294304278682008535477302 absolute error = 7.5e-32 relative error = 3.9507235638268980053750213184691e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.256 y[1] (analytic) = 0.019507797544262232296886421302068 y[1] (numeric) = 0.019507797544262232296886421301997 absolute error = 7.1e-32 relative error = 3.6395702712673993664492591893880e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.257 y[1] (analytic) = 0.020032091630145079259710430133566 y[1] (numeric) = 0.02003209163014507925971043013349 absolute error = 7.6e-32 relative error = 3.7939123583895858010129612608588e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.258 y[1] (analytic) = 0.020556746151317689474021093346516 y[1] (numeric) = 0.020556746151317689474021093346444 absolute error = 7.2e-32 relative error = 3.5024998348478799907182942326856e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.259 y[1] (analytic) = 0.021081760706404030235613522242448 y[1] (numeric) = 0.021081760706404030235613522242366 absolute error = 8.2e-32 relative error = 3.8896181937541283011625355811380e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.26 y[1] (analytic) = 0.021607134893287444330102190259666 y[1] (numeric) = 0.021607134893287444330102190259588 absolute error = 7.8e-32 relative error = 3.6099186858981372927372981782475e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.261 y[1] (analytic) = 0.022132868309110929251700758382285 y[1] (numeric) = 0.022132868309110929251700758382208 absolute error = 7.7e-32 relative error = 3.4789887566584932677081931643061e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.262 y[1] (analytic) = 0.022658960550277417543060622825159 y[1] (numeric) = 0.022658960550277417543060622825074 absolute error = 8.5e-32 relative error = 3.7512753425469612025573135018259e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.263 y[1] (analytic) = 0.023185411212450058256010362299878 y[1] (numeric) = 0.023185411212450058256010362299802 absolute error = 7.6e-32 relative error = 3.2779233158129049597962135961415e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.264 y[1] (analytic) = 0.023712219890552499533036760430114 y[1] (numeric) = 0.023712219890552499533036760430031 absolute error = 8.3e-32 relative error = 3.5003049222341739664501460074991e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.265 y[1] (analytic) = 0.02423938617876917230934657718462 y[1] (numeric) = 0.024239386178769172309346577184537 absolute error = 8.3e-32 relative error = 3.4241791185578022948466499777535e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 memory used=164.0MB, alloc=4.4MB, time=7.75 TOP MAIN SOLVE Loop x[1] = 1.266 y[1] (analytic) = 0.024766909670545575135346741536351 y[1] (numeric) = 0.024766909670545575135346741536273 absolute error = 7.8e-32 relative error = 3.1493634465329636586590618412829e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.267 y[1] (analytic) = 0.025294789958588560119379135935943 y[1] (numeric) = 0.02529478995858856011937913593587 absolute error = 7.3e-32 relative error = 2.8859698032485015690785551636828e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.268 y[1] (analytic) = 0.025823026634866619990544641611436 y[1] (numeric) = 0.025823026634866619990544641611357 absolute error = 7.9e-32 relative error = 3.0592850759536091642325539194586e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.269 y[1] (analytic) = 0.026351619290610176281449612173964 y[1] (numeric) = 0.026351619290610176281449612173882 absolute error = 8.2e-32 relative error = 3.1117632315376880159317414373478e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.27 y[1] (analytic) = 0.026880567516311868630706441523852 y[1] (numeric) = 0.02688056751631186863070644152377 absolute error = 8.2e-32 relative error = 3.0505308323658026121855297153137e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.271 y[1] (analytic) = 0.027409870901726845205018390614427 y[1] (numeric) = 0.027409870901726845205018390614339 absolute error = 8.8e-32 relative error = 3.2105222354205223590512841973705e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.272 y[1] (analytic) = 0.027939529035873054240677336244417 y[1] (numeric) = 0.027939529035873054240677336244345 absolute error = 7.2e-32 relative error = 2.5769940469488713562744933839056e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.273 y[1] (analytic) = 0.028469541507031536704301603715671 y[1] (numeric) = 0.028469541507031536704301603715594 absolute error = 7.7e-32 relative error = 2.7046448914880554073341824025125e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.274 y[1] (analytic) = 0.028999907902746720072639543912188 y[1] (numeric) = 0.028999907902746720072639543912108 absolute error = 8.0e-32 relative error = 2.7586294504205241670976256017169e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.275 y[1] (analytic) = 0.029530627809826713231263014133147 y[1] (numeric) = 0.029530627809826713231263014133064 absolute error = 8.3e-32 relative error = 2.8106412276267501045184990497332e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.276 y[1] (analytic) = 0.030061700814343602491973420845565 y[1] (numeric) = 0.03006170081434360249197342084548 absolute error = 8.5e-32 relative error = 2.8275179945721236719565646619248e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.277 y[1] (analytic) = 0.03059312650163374872874148141622 y[1] (numeric) = 0.030593126501633748728741481416138 absolute error = 8.2e-32 relative error = 2.6803406312728774844592557946517e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.278 y[1] (analytic) = 0.03112490445629808563200036083753 y[1] (numeric) = 0.031124904456298085632000360837455 absolute error = 7.5e-32 relative error = 2.4096459510520310515353681177072e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.279 y[1] (analytic) = 0.031657034262202419081110338480825 y[1] (numeric) = 0.031657034262202419081110338480742 absolute error = 8.3e-32 relative error = 2.6218501490867574151540037465924e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.28 y[1] (analytic) = 0.032189515502477727634811658994583 y[1] (numeric) = 0.032189515502477727634811658994499 absolute error = 8.4e-32 relative error = 2.6095453345215543057913409658301e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.281 y[1] (analytic) = 0.032722347759520464139480720616964 y[1] (numeric) = 0.032722347759520464139480720616884 absolute error = 8.0e-32 relative error = 2.4448123523387545342555496487662e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.282 y[1] (analytic) = 0.033255530614992858455003253392296 y[1] (numeric) = 0.033255530614992858455003253392215 absolute error = 8.1e-32 relative error = 2.4356850876251578508951474076134e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.283 y[1] (analytic) = 0.033789063649823221298076639073224 y[1] (numeric) = 0.033789063649823221298076639073151 absolute error = 7.3e-32 relative error = 2.1604623542263185422877031093337e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.284 y[1] (analytic) = 0.034322946444206249202752023855046 y[1] (numeric) = 0.034322946444206249202752023854975 absolute error = 7.1e-32 relative error = 2.0685869762205359103910646401530e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.285 y[1] (analytic) = 0.034857178577603330598025374528085 y[1] (numeric) = 0.034857178577603330598025374528017 absolute error = 6.8e-32 relative error = 1.9508176729969710883497209649460e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.286 y[1] (analytic) = 0.035391759628742853002285128150685 y[1] (numeric) = 0.035391759628742853002285128150612 absolute error = 7.3e-32 relative error = 2.0626270286011497014795780713869e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.287 y[1] (analytic) = 0.035926689175620511334422584940056 y[1] (numeric) = 0.03592668917562051133442258493998 absolute error = 7.6e-32 relative error = 2.1154189752495432540453415919780e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.288 y[1] (analytic) = 0.036461966795499617341409693753973 y[1] (numeric) = 0.036461966795499617341409693753893 absolute error = 8.0e-32 relative error = 2.1940670520788840527648158607862e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.289 y[1] (analytic) = 0.036997592064911410142147379293955 y[1] (numeric) = 0.036997592064911410142147379293879 absolute error = 7.6e-32 relative error = 2.0541877392090754758101344098935e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.29 y[1] (analytic) = 0.037533564559655367887386060002936 y[1] (numeric) = 0.037533564559655367887386060002857 absolute error = 7.9e-32 relative error = 2.1047827704836935885416265646289e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.291 y[1] (analytic) = 0.038069883854799520535518505558509 y[1] (numeric) = 0.038069883854799520535518505558426 absolute error = 8.3e-32 relative error = 2.1802010302045111278681993467477e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=167.8MB, alloc=4.4MB, time=7.94 x[1] = 1.292 y[1] (analytic) = 0.038606549524680763744043682879428 y[1] (numeric) = 0.038606549524680763744043682879355 absolute error = 7.3e-32 relative error = 1.8908708729157953552692298426305e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.293 y[1] (analytic) = 0.0391435611429051738764987396692 y[1] (numeric) = 0.039143561142905173876498739669129 absolute error = 7.1e-32 relative error = 1.8138359905679877307133703390208e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.294 y[1] (analytic) = 0.039680918282348324124654774718557 y[1] (numeric) = 0.03968091828234832412465477471848 absolute error = 7.7e-32 relative error = 1.9404792865958626620244144484408e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.295 y[1] (analytic) = 0.040218620515155601745770544480696 y[1] (numeric) = 0.040218620515155601745770544480622 absolute error = 7.4e-32 relative error = 1.8399437636632650063993466599565e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.296 y[1] (analytic) = 0.040756667412742526414696755820332 y[1] (numeric) = 0.040756667412742526414696755820264 absolute error = 6.8e-32 relative error = 1.6684386706931753739853291035465e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.297 y[1] (analytic) = 0.041295058545795069690622095322395 y[1] (numeric) = 0.041295058545795069690622095322316 absolute error = 7.9e-32 relative error = 1.9130618234235265818512163867440e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.298 y[1] (analytic) = 0.041833793484269975598250646130447 y[1] (numeric) = 0.041833793484269975598250646130366 absolute error = 8.1e-32 relative error = 1.9362336822372325155996353030532e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.299 y[1] (analytic) = 0.042372871797395082323198843970484 y[1] (numeric) = 0.042372871797395082323198843970406 absolute error = 7.8e-32 relative error = 1.8408004152504747988581899733959e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.3 y[1] (analytic) = 0.042912293053669645021398624803899 y[1] (numeric) = 0.042912293053669645021398624803826 absolute error = 7.3e-32 relative error = 1.7011442364242850574521945106773e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.301 y[1] (analytic) = 0.043452056820864659742291917447271 y[1] (numeric) = 0.043452056820864659742291917447186 absolute error = 8.5e-32 relative error = 1.9561789756103096891575850277245e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.302 y[1] (analytic) = 0.04399216266602318846560013549679 y[1] (numeric) = 0.04399216266602318846560013549671 absolute error = 8.0e-32 relative error = 1.8185057326537625883212747126602e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.303 y[1] (analytic) = 0.044532610155460685251450824004663 y[1] (numeric) = 0.044532610155460685251450824004587 absolute error = 7.6e-32 relative error = 1.7066145401019283202952762287912e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.304 y[1] (analytic) = 0.045073398854765323503642117574095 y[1] (numeric) = 0.045073398854765323503642117574023 absolute error = 7.2e-32 relative error = 1.5973945127146296486574370664292e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.305 y[1] (analytic) = 0.045614528328798324345824167872389 y[1] (numeric) = 0.045614528328798324345824167872316 absolute error = 7.3e-32 relative error = 1.6003673100333716074666680342129e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.306 y[1] (analytic) = 0.046155998141694286110375200008099 y[1] (numeric) = 0.046155998141694286110375200008027 absolute error = 7.2e-32 relative error = 1.5599272662020485318374335127324e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.307 y[1] (analytic) = 0.046697807856861514939748358781488 y[1] (numeric) = 0.04669780785686151493974835878141 absolute error = 7.8e-32 relative error = 1.6703139521899231049874371508834e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.308 y[1] (analytic) = 0.047239957036982356500064007498599 y[1] (numeric) = 0.047239957036982356500064007498519 absolute error = 8.0e-32 relative error = 1.6934816417671815026811393614060e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.309 y[1] (analytic) = 0.047782445244013528806720643840852 y[1] (numeric) = 0.047782445244013528806720643840781 absolute error = 7.1e-32 relative error = 1.4859013522104188596556287598617e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.31 y[1] (analytic) = 0.0483252720391864561617960992052 y[1] (numeric) = 0.04832527203918645616179609920512 absolute error = 8.0e-32 relative error = 1.6554485184300429639471210756593e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.311 y[1] (analytic) = 0.048868436983007604203009189976943 y[1] (numeric) = 0.048868436983007604203009189976867 absolute error = 7.6e-32 relative error = 1.5551960466103408784266679170341e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.312 y[1] (analytic) = 0.04941193963525881606401049137064 y[1] (numeric) = 0.049411939635258816064010491370563 absolute error = 7.7e-32 relative error = 1.5583278164829458779472140960419e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.313 y[1] (analytic) = 0.049955779554997649645769406774326 y[1] (numeric) = 0.049955779554997649645769406774249 absolute error = 7.7e-32 relative error = 1.5413631953281531120229762215173e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.314 y[1] (analytic) = 0.050499956300557715998823207962894 y[1] (numeric) = 0.050499956300557715998823207962814 absolute error = 8.0e-32 relative error = 1.5841597866712706193427155947404e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.315 y[1] (analytic) = 0.051044469429549018816152224107399 y[1] (numeric) = 0.051044469429549018816152224107321 absolute error = 7.8e-32 relative error = 1.5280793565237207528208098605191e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.316 y[1] (analytic) = 0.051589318498858295036443860201938 y[1] (numeric) = 0.051589318498858295036443860201863 absolute error = 7.5e-32 relative error = 1.4537893149656512418721166920129e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.317 y[1] (analytic) = 0.052134503064649356557506628359322 y[1] (numeric) = 0.052134503064649356557506628359245 absolute error = 7.7e-32 relative error = 1.4769489584376818585711705668909e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.318 y[1] (analytic) = 0.052680022682363433059593878393666 y[1] (numeric) = 0.052680022682363433059593878393595 absolute error = 7.1e-32 relative error = 1.3477594804409575604902676508990e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 memory used=171.6MB, alloc=4.4MB, time=8.12 TOP MAIN SOLVE Loop x[1] = 1.319 y[1] (analytic) = 0.053225876906719515938395417213784 y[1] (numeric) = 0.05322587690671951593839541721371 absolute error = 7.4e-32 relative error = 1.3903011899585603444497377399353e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.32 y[1] (analytic) = 0.053772065291714703347453709797525 y[1] (numeric) = 0.053772065291714703347453709797448 absolute error = 7.7e-32 relative error = 1.4319702913078233329661311093887e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.321 y[1] (analytic) = 0.054318587390624546349759857906737 y[1] (numeric) = 0.054318587390624546349759857906658 absolute error = 7.9e-32 relative error = 1.4543824461391552169396166887726e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.322 y[1] (analytic) = 0.054865442756003396178283056235983 y[1] (numeric) = 0.054865442756003396178283056235898 absolute error = 8.5e-32 relative error = 1.5492447655623679423456006081777e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.323 y[1] (analytic) = 0.055412630939684752605185729368475 y[1] (numeric) = 0.055412630939684752605185729368388 absolute error = 8.7e-32 relative error = 1.5700391503644232264260144754450e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.324 y[1] (analytic) = 0.055960151492781613419475056741263 y[1] (numeric) = 0.055960151492781613419475056741179 absolute error = 8.4e-32 relative error = 1.5010681307900906960866403493167e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.325 y[1] (analytic) = 0.05650800396568682501284009680035 y[1] (numeric) = 0.056508003965686825012840096800266 absolute error = 8.4e-32 relative error = 1.4865150793683502259152188997659e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.326 y[1] (analytic) = 0.05705618790807343407342222565731 y[1] (numeric) = 0.057056187908073434073422225657225 absolute error = 8.5e-32 relative error = 1.4897595355818106558820439399286e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.327 y[1] (analytic) = 0.057604702868895040387265109843867 y[1] (numeric) = 0.057604702868895040387265109843785 absolute error = 8.2e-32 relative error = 1.4234948869821833760124371868637e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.328 y[1] (analytic) = 0.058153548396386150747188937201539 y[1] (numeric) = 0.058153548396386150747188937201455 absolute error = 8.4e-32 relative error = 1.4444518402804811684323493747900e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.329 y[1] (analytic) = 0.058702724038062533968832134541833 y[1] (numeric) = 0.058702724038062533968832134541751 absolute error = 8.2e-32 relative error = 1.3968687372468718187343621715240e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.33 y[1] (analytic) = 0.059252229340721577013602305470776 y[1] (numeric) = 0.059252229340721577013602305470691 absolute error = 8.5e-32 relative error = 1.4345451799158391830594832899997e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.331 y[1] (analytic) = 0.059802063850442642218276626690865 y[1] (numeric) = 0.05980206385044264221827662669079 absolute error = 7.5e-32 relative error = 1.2541373185307695007803988997382e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.332 y[1] (analytic) = 0.060352227112587425630990446176898 y[1] (numeric) = 0.060352227112587425630990446176815 absolute error = 8.3e-32 relative error = 1.3752599360610673774381830277505e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.333 y[1] (analytic) = 0.060902718671800316453351331869913 y[1] (numeric) = 0.060902718671800316453351331869832 absolute error = 8.1e-32 relative error = 1.3299898882429577641940972491784e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.334 y[1] (analytic) = 0.061453538072008757588414324949611 y[1] (numeric) = 0.061453538072008757588414324949535 absolute error = 7.6e-32 relative error = 1.2367066630231491260013256344583e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.335 y[1] (analytic) = 0.062004684856423607294252657329425 y[1] (numeric) = 0.062004684856423607294252657329345 absolute error = 8.0e-32 relative error = 1.2902250883984954357998909354150e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.336 y[1] (analytic) = 0.062556158567539501942856698774282 y[1] (numeric) = 0.062556158567539501942856698774209 absolute error = 7.3e-32 relative error = 1.1669514508501138256130176830871e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.337 y[1] (analytic) = 0.063107958747135219884092404969344 y[1] (numeric) = 0.063107958747135219884092404969271 absolute error = 7.3e-32 relative error = 1.1567479197433846398905799323265e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.338 y[1] (analytic) = 0.063660084936274046414449043970619 y[1] (numeric) = 0.063660084936274046414449043970544 absolute error = 7.5e-32 relative error = 1.1781322641193080716261545385792e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.339 y[1] (analytic) = 0.064212536675304139850304484748319 y[1] (numeric) = 0.06421253667530413985030448474823 absolute error = 8.9e-32 relative error = 1.3860221789716183241248485724040e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.34 y[1] (analytic) = 0.064765313503858898705434837991428 y[1] (numeric) = 0.064765313503858898705434837991349 absolute error = 7.9e-32 relative error = 1.2197887376132744083686113881022e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.341 y[1] (analytic) = 0.065318414960857329972493745980727 y[1] (numeric) = 0.065318414960857329972493745980656 absolute error = 7.1e-32 relative error = 1.0869828982002611807067768717707e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.342 y[1] (analytic) = 0.065871840584504418508185125157485 y[1] (numeric) = 0.065871840584504418508185125157414 absolute error = 7.1e-32 relative error = 1.0778505560189541921922503335637e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.343 y[1] (analytic) = 0.066425589912291497521851672020327 y[1] (numeric) = 0.06642558991229149752185167202025 absolute error = 7.7e-32 relative error = 1.1591918129996433302757035387458e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.344 y[1] (analytic) = 0.0669796624809966201671999501731 y[1] (numeric) = 0.066979662480996620167199950173025 absolute error = 7.5e-32 relative error = 1.1197428774932823708402134605682e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.345 y[1] (analytic) = 0.067534057826684932236881383725247 y[1] (numeric) = 0.067534057826684932236881383725167 absolute error = 8.0e-32 relative error = 1.1845874892533018076787055862158e-28 % memory used=175.4MB, alloc=4.4MB, time=8.30 Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.346 y[1] (analytic) = 0.068088775484709045959646989814316 y[1] (numeric) = 0.068088775484709045959646989814244 absolute error = 7.2e-32 relative error = 1.0574430144682116149162613006540e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.347 y[1] (analytic) = 0.068643814989709414899792190780582 y[1] (numeric) = 0.0686438149897094148997921907805 absolute error = 8.2e-32 relative error = 1.1945723006842327734631609376733e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.348 y[1] (analytic) = 0.069199175875614709958606554476611 y[1] (numeric) = 0.069199175875614709958606554476534 absolute error = 7.7e-32 relative error = 1.1127300148546168473950550170459e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.349 y[1] (analytic) = 0.069754857675642196477541819344277 y[1] (numeric) = 0.069754857675642196477541819344196 absolute error = 8.1e-32 relative error = 1.1612094511990454775270488547399e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.35 y[1] (analytic) = 0.070310859922298112442810069236981 y[1] (numeric) = 0.070310859922298112442810069236906 absolute error = 7.5e-32 relative error = 1.0666915478332073695008248164679e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.351 y[1] (analytic) = 0.070867182147378047791122431511042 y[1] (numeric) = 0.070867182147378047791122431510958 absolute error = 8.4e-32 relative error = 1.1853159312206100143927008176244e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.352 y[1] (analytic) = 0.071423823881967324816277180655793 y[1] (numeric) = 0.071423823881967324816277180655715 absolute error = 7.8e-32 relative error = 1.0920725853169139857277836983820e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.353 y[1] (analytic) = 0.071980784656441379676304638682015 y[1] (numeric) = 0.071980784656441379676304638681925 absolute error = 9.0e-32 relative error = 1.2503336887693419439345074066711e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.354 y[1] (analytic) = 0.072538064000466145000874772641576 y[1] (numeric) = 0.072538064000466145000874772641493 absolute error = 8.3e-32 relative error = 1.1442268434330784507436943631027e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.355 y[1] (analytic) = 0.073095661442998433598671899012935 y[1] (numeric) = 0.073095661442998433598671899012858 absolute error = 7.7e-32 relative error = 1.0534140943514992808057683627762e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.356 y[1] (analytic) = 0.07365357651228632326443941425558 y[1] (numeric) = 0.073653576512286323264439414255489 absolute error = 9.1e-32 relative error = 1.2355136615099754152068537414778e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.357 y[1] (analytic) = 0.07421180873586954268539598061695 y[1] (numeric) = 0.074211808735869542685395980616868 absolute error = 8.2e-32 relative error = 1.1049454446239108063812597870292e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.358 y[1] (analytic) = 0.074770357640579858446723106267558 y[1] (numeric) = 0.074770357640579858446723106267479 absolute error = 7.9e-32 relative error = 1.0565684382539933490484957536378e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.359 y[1] (analytic) = 0.0753292227525414631358225690458 y[1] (numeric) = 0.075329222752541463135822569045717 absolute error = 8.3e-32 relative error = 1.1018300331155313770829358056829e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.36 y[1] (analytic) = 0.075888403597171364545040643517182 y[1] (numeric) = 0.075888403597171364545040643517103 absolute error = 7.9e-32 relative error = 1.0410022645797837802228238871999e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.361 y[1] (analytic) = 0.076447899699179775972554601692747 y[1] (numeric) = 0.076447899699179775972554601692659 absolute error = 8.8e-32 relative error = 1.1511107610055658429609901051283e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.362 y[1] (analytic) = 0.077007710582570507621115468611671 y[1] (numeric) = 0.07700771058257050762111546861159 absolute error = 8.1e-32 relative error = 1.0518427231147043699584141661276e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.363 y[1] (analytic) = 0.077567835770641359094339525075567 y[1] (numeric) = 0.077567835770641359094339525075493 absolute error = 7.4e-32 relative error = 9.5400367001096930398739139127307e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.364 y[1] (analytic) = 0.078128274785984512990239561127049 y[1] (numeric) = 0.078128274785984512990239561126965 absolute error = 8.4e-32 relative error = 1.0751549324505091975900122371490e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.365 y[1] (analytic) = 0.078689027150486929591685395396726 y[1] (numeric) = 0.078689027150486929591685395396644 absolute error = 8.2e-32 relative error = 1.0420766778979371589387642360932e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.366 y[1] (analytic) = 0.079250092385330742653481687201344 y[1] (numeric) = 0.079250092385330742653481687201264 absolute error = 8.0e-32 relative error = 1.0094625456210580501908258127433e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.367 y[1] (analytic) = 0.079811470010993656285749580263174 y[1] (numeric) = 0.079811470010993656285749580263095 absolute error = 7.9e-32 relative error = 9.8983266426640331156220279228688e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.368 y[1] (analytic) = 0.080373159547249342933297229140152 y[1] (numeric) = 0.080373159547249342933297229140072 absolute error = 8.0e-32 relative error = 9.9535716215025773752802308750537e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.369 y[1] (analytic) = 0.080935160513167842450662771907938 y[1] (numeric) = 0.080935160513167842450662771907853 absolute error = 8.5e-32 relative error = 1.0502234067500344753368002640292e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.37 y[1] (analytic) = 0.081497472427115962272511825321987 y[1] (numeric) = 0.081497472427115962272511825321899 absolute error = 8.8e-32 relative error = 1.0797880888723182894667365334312e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.371 y[1] (analytic) = 0.082060094806757678679070091611346 y[1] (numeric) = 0.082060094806757678679070091611266 absolute error = 8.0e-32 relative error = 9.7489529092540081830599572654612e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=179.2MB, alloc=4.4MB, time=8.49 x[1] = 1.372 y[1] (analytic) = 0.082623027169054539156270179218141 y[1] (numeric) = 0.082623027169054539156270179218068 absolute error = 7.3e-32 relative error = 8.8353092958740286613186674396962e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.373 y[1] (analytic) = 0.083186269030266065850290253199443 y[1] (numeric) = 0.083186269030266065850290253199357 absolute error = 8.6e-32 relative error = 1.0338244640916663865783016888187e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.374 y[1] (analytic) = 0.083749819905950160116160644653457 y[1] (numeric) = 0.083749819905950160116160644653377 absolute error = 8.0e-32 relative error = 9.5522593469262198068881683686807e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.375 y[1] (analytic) = 0.084313679310963508160113062421694 y[1] (numeric) = 0.084313679310963508160113062421617 absolute error = 7.7e-32 relative error = 9.1325631415052606946944051816007e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.376 y[1] (analytic) = 0.084877846759461987775345564453836 y[1] (numeric) = 0.08487784675946198777534556445376 absolute error = 7.6e-32 relative error = 8.9540443003200589827694818835575e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.377 y[1] (analytic) = 0.085442321764901076170874960606395 y[1] (numeric) = 0.085442321764901076170874960606309 absolute error = 8.6e-32 relative error = 1.0065269555365478486369786159661e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.378 y[1] (analytic) = 0.086007103840036258893146833279367 y[1] (numeric) = 0.086007103840036258893146833279289 absolute error = 7.8e-32 relative error = 9.0690183156348817178581875719721e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.379 y[1] (analytic) = 0.086572192496923439840071877180918 y[1] (numeric) = 0.086572192496923439840071877180834 absolute error = 8.4e-32 relative error = 9.7028846766223635659045302695155e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.38 y[1] (analytic) = 0.08713758724691935236715577464865 y[1] (numeric) = 0.087137587246919352367155774648564 absolute error = 8.6e-32 relative error = 9.8694493062223764480315014251008e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.381 y[1] (analytic) = 0.087703287600681971485388338351382 y[1] (numeric) = 0.0877032876006819714853883383513 absolute error = 8.2e-32 relative error = 9.3497065210771388090573242117612e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.382 y[1] (analytic) = 0.088269293068170927150556168846813 y[1] (numeric) = 0.088269293068170927150556168846731 absolute error = 8.2e-32 relative error = 9.2897537920317190146385647487866e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.383 y[1] (analytic) = 0.088835603158647918643641590382112 y[1] (numeric) = 0.08883560315864791864364159038203 absolute error = 8.2e-32 relative error = 9.2305333767543075247349233502671e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.384 y[1] (analytic) = 0.089402217380677130041969144497068 y[1] (numeric) = 0.089402217380677130041969144496988 absolute error = 8.0e-32 relative error = 8.9483239167724188839429252255927e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.385 y[1] (analytic) = 0.089969135242125646780759437424924 y[1] (numeric) = 0.089969135242125646780759437424849 absolute error = 7.5e-32 relative error = 8.3361921616962759635356283474618e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.386 y[1] (analytic) = 0.090536356250163873304748653986676 y[1] (numeric) = 0.090536356250163873304748653986592 absolute error = 8.4e-32 relative error = 9.2780407207792789518795474600212e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.387 y[1] (analytic) = 0.091103879911265951809530567641875 y[1] (numeric) = 0.091103879911265951809530567641793 absolute error = 8.2e-32 relative error = 9.0007143581444590680906299105525e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.388 y[1] (analytic) = 0.091671705731210182072276393595331 y[1] (numeric) = 0.091671705731210182072276393595242 absolute error = 8.9e-32 relative error = 9.7085572140389895864098738752646e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.389 y[1] (analytic) = 0.092239833215079442371486349365229 y[1] (numeric) = 0.09223983321507944237148634936514 absolute error = 8.9e-32 relative error = 9.6487598576284294686970581475806e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.39 y[1] (analytic) = 0.092808261867261611495425304997835 y[1] (numeric) = 0.092808261867261611495425304997757 absolute error = 7.8e-32 relative error = 8.4044241784808956099235878222065e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.391 y[1] (analytic) = 0.093376991191449991838893423166904 y[1] (numeric) = 0.093376991191449991838893423166822 absolute error = 8.2e-32 relative error = 8.7816065771359187669150266782407e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.392 y[1] (analytic) = 0.09394602069064373358798120772556 y[1] (numeric) = 0.093946020690643733587981207725485 absolute error = 7.5e-32 relative error = 7.9833078025698001134175912210605e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.393 y[1] (analytic) = 0.094515349867148259992456897886436 y[1] (numeric) = 0.09451534986714825999245689788635 absolute error = 8.6e-32 relative error = 9.0990511193031055126706955694640e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.394 y[1] (analytic) = 0.095084978222575693725432664092727 y[1] (numeric) = 0.09508497822257569372543266409264 absolute error = 8.7e-32 relative error = 9.1497102514289575100022304109179e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.395 y[1] (analytic) = 0.09565490525784528432995458081305 y[1] (numeric) = 0.095654905257845284329954580812966 absolute error = 8.4e-32 relative error = 8.7815674244380280403091688934774e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.396 y[1] (analytic) = 0.096225130473183836752159870945336 y[1] (numeric) = 0.096225130473183836752159870945257 absolute error = 7.9e-32 relative error = 8.2099135237874099978958572689544e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.397 y[1] (analytic) = 0.096795653368126140960643436254156 y[1] (numeric) = 0.096795653368126140960643436254069 absolute error = 8.7e-32 relative error = 8.9880068962526623623775450941218e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.398 y[1] (analytic) = 0.097366473441515402651674208291635 y[1] (numeric) = 0.097366473441515402651674208291561 absolute error = 7.4e-32 relative error = 7.6001520219841569058348151757194e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=183.1MB, alloc=4.4MB, time=8.67 TOP MAIN SOLVE Loop x[1] = 1.399 y[1] (analytic) = 0.09793759019150367503990037456792 y[1] (numeric) = 0.097937590191503675039900374567847 absolute error = 7.3e-32 relative error = 7.4537263840429808892979838190277e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.4 y[1] (analytic) = 0.098509003115552291734181055343105 y[1] (numeric) = 0.098509003115552291734181055343021 absolute error = 8.4e-32 relative error = 8.5271393825259758482413422944131e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.401 y[1] (analytic) = 0.099080711710432300698180527312854 y[1] (numeric) = 0.099080711710432300698180527312777 absolute error = 7.7e-32 relative error = 7.7714419558305007679746008943462e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.402 y[1] (analytic) = 0.099652715472224899295359611654229 y[1] (numeric) = 0.099652715472224899295359611654152 absolute error = 7.7e-32 relative error = 7.7268340993137672724682469670717e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.403 y[1] (analytic) = 0.10022501389632187041799736538937 y[1] (numeric) = 0.10022501389632187041799736538928 absolute error = 9e-32 relative error = 8.9797942151547942737981199700175e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.404 y[1] (analytic) = 0.1007976064774260196998747368152 y[1] (numeric) = 0.10079760647742601969987473681511 absolute error = 9e-32 relative error = 8.9287834448882293806152180170130e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.405 y[1] (analytic) = 0.10137049270955161381225036783776 y[1] (numeric) = 0.10137049270955161381225036783767 absolute error = 9e-32 relative error = 8.8783232274375409564442643756009e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.406 y[1] (analytic) = 0.10194367208602481984275724844254 y[1] (numeric) = 0.10194367208602481984275724844245 absolute error = 9e-32 relative error = 8.8284047610187915433771906641643e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.407 y[1] (analytic) = 0.10251714409948414575684745122993 y[1] (numeric) = 0.10251714409948414575684745122983 absolute error = 1.0e-31 relative error = 9.7544660337941649965766080407060e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.408 y[1] (analytic) = 0.10309090824188088194141069694804 y[1] (numeric) = 0.10309090824188088194141069694795 absolute error = 9e-32 relative error = 8.7301588020579030060503970492877e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.409 y[1] (analytic) = 0.10366496400447954383019102526712 y[1] (numeric) = 0.10366496400447954383019102526702 absolute error = 1.0e-31 relative error = 9.6464606880757538925258295015511e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.41 y[1] (analytic) = 0.10423931087785831561062436866039 y[1] (numeric) = 0.1042393108778583156106243686603 absolute error = 9e-32 relative error = 8.6339787976396804208142428831272e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.411 y[1] (analytic) = 0.10481394835190949501171835119061 y[1] (numeric) = 0.10481394835190949501171835119051 absolute error = 1.0e-31 relative error = 9.5407149117456374542520019098581e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.412 y[1] (analytic) = 0.10538887591583993917259415824705 y[1] (numeric) = 0.10538887591583993917259415824695 absolute error = 1.0e-31 relative error = 9.4886674832604423313351091089790e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.413 y[1] (analytic) = 0.10596409305817151159130884784136 y[1] (numeric) = 0.10596409305817151159130884784125 absolute error = 1.1e-31 relative error = 1.0380874957294531951439563529921e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.414 y[1] (analytic) = 0.10653959926674153015357499894942 y[1] (numeric) = 0.10653959926674153015357499894932 absolute error = 1.0e-31 relative error = 9.3861813530602421695407172509716e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.415 y[1] (analytic) = 0.10711539402870321624099311758625 y[1] (numeric) = 0.10711539402870321624099311758615 absolute error = 1.0e-31 relative error = 9.3357262890900128655412977703081e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.416 y[1] (analytic) = 0.10769147683052614491841074682028 y[1] (numeric) = 0.10769147683052614491841074682017 absolute error = 1.1e-31 relative error = 1.0214364519590233982430776264805e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.417 y[1] (analytic) = 0.1082678471579966962000207527774 y[1] (numeric) = 0.10826784715799669620002075277729 absolute error = 1.1e-31 relative error = 1.0159987742203421698218042660275e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.418 y[1] (analytic) = 0.10884450449621850739380978485253 y[1] (numeric) = 0.10884450449621850739380978485243 absolute error = 1.0e-31 relative error = 9.1874183692456623258667012997685e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.419 y[1] (analytic) = 0.10942144832961292652396643484147 y[1] (numeric) = 0.10942144832961292652396643484137 absolute error = 1.0e-31 relative error = 9.1389760898400407349322281085594e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.42 y[1] (analytic) = 0.10999867814191946683085714652921 y[1] (numeric) = 0.10999867814191946683085714652911 absolute error = 1.0e-31 relative error = 9.0910183366913511879408012369101e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.421 y[1] (analytic) = 0.11057619341619626234817645442468 y[1] (numeric) = 0.11057619341619626234817645442458 absolute error = 1.0e-31 relative error = 9.0435379362003655936089822049236e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.422 y[1] (analytic) = 0.1111539936348205245568766578181 y[1] (numeric) = 0.111153993634820524556876657818 absolute error = 1.0e-31 relative error = 8.9965278556283575660611071025039e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.423 y[1] (analytic) = 0.11173207827948900011548056415747 y[1] (numeric) = 0.11173207827948900011548056415737 absolute error = 1.0e-31 relative error = 8.9499811996567243961541006791996e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.424 y[1] (analytic) = 0.1123104468312184296663794638973 y[1] (numeric) = 0.11231044683121842966637946389719 absolute error = 1.1e-31 relative error = 9.7942803277516473067337240337172e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=186.9MB, alloc=4.4MB, time=8.86 x[1] = 1.425 y[1] (analytic) = 0.11288909877034600771771702746696 y[1] (numeric) = 0.11288909877034600771771702746686 absolute error = 1.0e-31 relative error = 8.8582512473975256335809258804880e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.426 y[1] (analytic) = 0.11346803357652984360045834384057 y[1] (numeric) = 0.11346803357652984360045834384047 absolute error = 1.0e-31 relative error = 8.8130548179945173116674637274661e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.427 y[1] (analytic) = 0.11404725072874942350024184936577 y[1] (numeric) = 0.11404725072874942350024184936567 absolute error = 1.0e-31 relative error = 8.7682955407527115261150103362112e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.428 y[1] (analytic) = 0.1146267497053060735636104250287 y[1] (numeric) = 0.1146267497053060735636104250286 absolute error = 1.0e-31 relative error = 8.7239671592442439156636801889150e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.429 y[1] (analytic) = 0.11520652998382342407821647019709 y[1] (numeric) = 0.11520652998382342407821647019698 absolute error = 1.1e-31 relative error = 9.5480698893930324736997256990366e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.43 y[1] (analytic) = 0.11578659104124787472659429109546 y[1] (numeric) = 0.11578659104124787472659429109536 absolute error = 1.0e-31 relative error = 8.6365786487639098540297058215042e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.431 y[1] (analytic) = 0.11636693235384906091309167282811 y[1] (numeric) = 0.11636693235384906091309167282801 absolute error = 1.0e-31 relative error = 8.5935065896486448856653019736901e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.432 y[1] (analytic) = 0.11694755339722032116355103467729 y[1] (numeric) = 0.11694755339722032116355103467719 absolute error = 1.0e-31 relative error = 8.5508415606047949466537654922333e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.433 y[1] (analytic) = 0.11752845364627916559732909966971 y[1] (numeric) = 0.11752845364627916559732909966962 absolute error = 9e-32 relative error = 7.6577200846077251892510741078159e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.434 y[1] (analytic) = 0.11810963257526774547124254102412 y[1] (numeric) = 0.11810963257526774547124254102403 absolute error = 9e-32 relative error = 7.6200389449730685446744703890265e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.435 y[1] (analytic) = 0.11869108965775332379502560006918 y[1] (numeric) = 0.11869108965775332379502560006909 absolute error = 9e-32 relative error = 7.5827090525089707226596868214760e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.436 y[1] (analytic) = 0.11927282436662874701788420255615 y[1] (numeric) = 0.11927282436662874701788420255606 absolute error = 9e-32 relative error = 7.5457255647231098583257284682558e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.437 y[1] (analytic) = 0.11985483617411291778572963298583 y[1] (numeric) = 0.11985483617411291778572963298574 absolute error = 9e-32 relative error = 7.5090837276901494594221029515755e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.438 y[1] (analytic) = 0.12043712455175126876867335962705 y[1] (numeric) = 0.12043712455175126876867335962695 absolute error = 1.0e-31 relative error = 8.3030876378180606599041505487754e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.439 y[1] (analytic) = 0.12101968897041623755836313632527 y[1] (numeric) = 0.12101968897041623755836313632516 absolute error = 1.1e-31 relative error = 9.0894300700847077860467539602167e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.44 y[1] (analytic) = 0.12160252890030774263473904098765 y[1] (numeric) = 0.12160252890030774263473904098754 absolute error = 1.1e-31 relative error = 9.0458645058426593447554494648765e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.441 y[1] (analytic) = 0.12218564381095366040178664478597 y[1] (numeric) = 0.12218564381095366040178664478587 absolute error = 1.0e-31 relative error = 8.1842675523092207383748562880993e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.442 y[1] (analytic) = 0.12276903317121030329186304064378 y[1] (numeric) = 0.12276903317121030329186304064368 absolute error = 1.0e-31 relative error = 8.1453765185674111795737126000012e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.443 y[1] (analytic) = 0.12335269644926289893816999447061 y[1] (numeric) = 0.1233526964492628989381699944705 absolute error = 1.1e-31 relative error = 8.9175188841733107702844486417302e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.444 y[1] (analytic) = 0.12393663311262607041494701787584 y[1] (numeric) = 0.12393663311262607041494701787574 absolute error = 1.0e-31 relative error = 8.0686393916418630779176344106323e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.445 y[1] (analytic) = 0.12452084262814431754495569673996 y[1] (numeric) = 0.12452084262814431754495569673985 absolute error = 1.1e-31 relative error = 8.8338624826441462671245405235424e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.446 y[1] (analytic) = 0.12510532446199249927382514604266 y[1] (numeric) = 0.12510532446199249927382514604255 absolute error = 1.1e-31 relative error = 8.7925914003299230004634880626624e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.447 y[1] (analytic) = 0.12569007807967631711082699774899 y[1] (numeric) = 0.12569007807967631711082699774888 absolute error = 1.1e-31 relative error = 8.7516852308954566190103916172258e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.448 y[1] (analytic) = 0.12627510294603279963564686533586 y[1] (numeric) = 0.12627510294603279963564686533576 absolute error = 1.0e-31 relative error = 7.9192174598929291341534315815815e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.449 y[1] (analytic) = 0.1268603985252307880707177657064 y[1] (numeric) = 0.1268603985252307880707177657063 absolute error = 1.0e-31 relative error = 7.8826805813723953958904739229731e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.45 y[1] (analytic) = 0.12744596428077142291867951678826 y[1] (numeric) = 0.12744596428077142291867951678816 absolute error = 1.0e-31 relative error = 7.8464626608100160303709861034114e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.451 y[1] (analytic) = 0.12803179967548863166452666704788 y[1] (numeric) = 0.12803179967548863166452666704777 absolute error = 1.1e-31 relative error = 8.5916155422955618513732724068152e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=190.7MB, alloc=4.4MB, time=9.04 TOP MAIN SOLVE Loop x[1] = 1.452 y[1] (analytic) = 0.128617904171549617542006051476 y[1] (numeric) = 0.12861790417154961754200605147588 absolute error = 1.2e-31 relative error = 9.3299607681326294863654939521448e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.453 y[1] (analytic) = 0.12920427723045534936382360731393 y[1] (numeric) = 0.12920427723045534936382360731382 absolute error = 1.1e-31 relative error = 8.5136500399130270717780692940791e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.454 y[1] (analytic) = 0.12979091831304105241521862189565 y[1] (numeric) = 0.12979091831304105241521862189553 absolute error = 1.2e-31 relative error = 9.2456391833651671975074989459205e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.455 y[1] (analytic) = 0.13037782687947670041046212448032 y[1] (numeric) = 0.13037782687947670041046212448021 absolute error = 1.1e-31 relative error = 8.4370174463550246264589486849914e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.456 y[1] (analytic) = 0.13096500238926750851183467384572 y[1] (numeric) = 0.1309650023892675085118346738456 absolute error = 1.2e-31 relative error = 9.1627532402377077432024730005760e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.457 y[1] (analytic) = 0.13155244430125442741063733370491 y[1] (numeric) = 0.13155244430125442741063733370479 absolute error = 1.2e-31 relative error = 9.1218373506767089176155710539759e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.458 y[1] (analytic) = 0.13214015207361463846978816870185 y[1] (numeric) = 0.13214015207361463846978816870173 absolute error = 1.2e-31 relative error = 9.0812669818291552614910142731896e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.459 y[1] (analytic) = 0.13272812516386204992755513483425 y[1] (numeric) = 0.13272812516386204992755513483412 absolute error = 1.3e-31 relative error = 9.7944576433597633706530432032753e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.46 y[1] (analytic) = 0.13331636302884779416197477964898 y[1] (numeric) = 0.13331636302884779416197477964885 absolute error = 1.3e-31 relative error = 9.7512411114808030248486123871262e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.461 y[1] (analytic) = 0.133904865124760726015504709457 y[1] (numeric) = 0.13390486512476072601550470945688 absolute error = 1.2e-31 relative error = 8.9615862641133015700262268930085e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.462 y[1] (analytic) = 0.13449363090712792217945632312292 y[1] (numeric) = 0.1344936309071279221794563231228 absolute error = 1.2e-31 relative error = 8.9223555933933979595821516009316e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.463 y[1] (analytic) = 0.13508265983081518163775285470136 y[1] (numeric) = 0.13508265983081518163775285470124 absolute error = 1.2e-31 relative error = 8.8834495967353974703626347897111e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.464 y[1] (analytic) = 0.13567195135002752716955631032029 y[1] (numeric) = 0.13567195135002752716955631032017 absolute error = 1.2e-31 relative error = 8.8448643073176858668400799766984e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.465 y[1] (analytic) = 0.13626150491830970791030542825093 y[1] (numeric) = 0.13626150491830970791030542825081 absolute error = 1.2e-31 relative error = 8.8065958226383407776628484281124e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.466 y[1] (analytic) = 0.1368513199885467029707053350585 y[1] (numeric) = 0.13685131998854670297070533505838 absolute error = 1.2e-31 relative error = 8.7686403032168768407625686441676e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.467 y[1] (analytic) = 0.13744139601296422611320811509809 y[1] (numeric) = 0.13744139601296422611320811509797 absolute error = 1.2e-31 relative error = 8.7309939713273097136080883991751e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.468 y[1] (analytic) = 0.13803173244312923148552205540848 y[1] (numeric) = 0.13803173244312923148552205540836 absolute error = 1.2e-31 relative error = 8.6936531097616610263906289985048e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.469 y[1] (analytic) = 0.1386223287299504204106858732645 y[1] (numeric) = 0.13862232872995042041068587326437 absolute error = 1.3e-31 relative error = 9.3779985656749755665244813325330e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.47 y[1] (analytic) = 0.13921318432367874923324277927844 y[1] (numeric) = 0.13921318432367874923324277927832 absolute error = 1.2e-31 relative error = 8.6198732241475794150271838889761e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.471 y[1] (analytic) = 0.13980429867390793822104777499432 y[1] (numeric) = 0.1398042986739079382210477749942 absolute error = 1.2e-31 relative error = 8.5834270575541273328588458190697e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.472 y[1] (analytic) = 0.14039567122957498152224013039699 y[1] (numeric) = 0.14039567122957498152224013039687 absolute error = 1.2e-31 relative error = 8.5472720739214257650716994120672e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.473 y[1] (analytic) = 0.14098730143896065817691153366437 y[1] (numeric) = 0.14098730143896065817691153366425 absolute error = 1.2e-31 relative error = 8.5114048410915258881671383568813e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.474 y[1] (analytic) = 0.14157918874969004418299895282557 y[1] (numeric) = 0.14157918874969004418299895282545 absolute error = 1.2e-31 relative error = 8.4758219805990174550053847675315e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.475 y[1] (analytic) = 0.14217133260873302561592979675354 y[1] (numeric) = 0.14217133260873302561592979675341 absolute error = 1.3e-31 relative error = 9.1438968471773761414696078336178e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.476 y[1] (analytic) = 0.14276373246240481280154551111934 y[1] (numeric) = 0.14276373246240481280154551111921 absolute error = 1.3e-31 relative error = 9.1059541353917743103318943217503e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.477 y[1] (analytic) = 0.14335638775636645554182829356845 y[1] (numeric) = 0.14335638775636645554182829356832 absolute error = 1.3e-31 relative error = 9.0683088514293777248011529260607e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=194.5MB, alloc=4.4MB, time=9.23 x[1] = 1.478 y[1] (analytic) = 0.14394929793562535939295416144872 y[1] (numeric) = 0.1439492979356253593929541614486 absolute error = 1.2e-31 relative error = 8.3362685140475244943232820955602e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.479 y[1] (analytic) = 0.14454246244453580299519415492793 y[1] (numeric) = 0.14454246244453580299519415492781 absolute error = 1.2e-31 relative error = 8.3020586456417055733177588348108e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.48 y[1] (analytic) = 0.14513588072679945645418400828643 y[1] (numeric) = 0.1451358807267994564541840082863 absolute error = 1.3e-31 relative error = 8.9571234452153909055736311237266e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.481 y[1] (analytic) = 0.14572955222546590077308117256095 y[1] (numeric) = 0.14572955222546590077308117256082 absolute error = 1.3e-31 relative error = 8.9206340110666175466447664206603e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.482 y[1] (analytic) = 0.14632347638293314833512662354915 y[1] (numeric) = 0.14632347638293314833512662354903 absolute error = 1.2e-31 relative error = 8.2010079972373140458771216556798e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.483 y[1] (analytic) = 0.1469176526409481644361274404642 y[1] (numeric) = 0.14691765264094816443612744046407 absolute error = 1.3e-31 relative error = 8.8484942185747283286343430362865e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.484 y[1] (analytic) = 0.14751208044060738986637469225579 y[1] (numeric) = 0.14751208044060738986637469225566 absolute error = 1.3e-31 relative error = 8.8128375392510135747133826753247e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.485 y[1] (analytic) = 0.14810675922235726454150972079081 y[1] (numeric) = 0.14810675922235726454150972079068 absolute error = 1.3e-31 relative error = 8.7774522028955460332522556557687e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.486 y[1] (analytic) = 0.14870168842599475218185046271411 y[1] (numeric) = 0.14870168842599475218185046271398 absolute error = 1.3e-31 relative error = 8.7423351662007434467296552680648e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.487 y[1] (analytic) = 0.14929686749066786603968800489122 y[1] (numeric) = 0.1492968674906678660396880048911 absolute error = 1.2e-31 relative error = 8.0376770133841467143885070863466e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.488 y[1] (analytic) = 0.1498922958548761956740621218704 y[1] (numeric) = 0.14989229585487619567406212187026 absolute error = 1.4e-31 relative error = 9.3400397399707727448514240121092e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.489 y[1] (analytic) = 0.15048797295647143477252309779385 y[1] (numeric) = 0.15048797295647143477252309779372 absolute error = 1.3e-31 relative error = 8.6385640955907107653490705660574e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.49 y[1] (analytic) = 0.15108389823265791001938568963964 y[1] (numeric) = 0.15108389823265791001938568963951 absolute error = 1.3e-31 relative error = 8.6044907181180695559062608863826e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.491 y[1] (analytic) = 0.15168007111999311100997964358674 y[1] (numeric) = 0.15168007111999311100997964358661 absolute error = 1.3e-31 relative error = 8.5706710868534503312908592383139e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.492 y[1] (analytic) = 0.15227649105438822121039973167026 y[1] (numeric) = 0.15227649105438822121039973167013 absolute error = 1.3e-31 relative error = 8.5371024180986819901741131275490e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.493 y[1] (analytic) = 0.15287315747110864996225683173177 y[1] (numeric) = 0.15287315747110864996225683173164 absolute error = 1.3e-31 relative error = 8.5037819686931352974910725464534e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.494 y[1] (analytic) = 0.1534700698047745655319301299736 y[1] (numeric) = 0.15347006980477456553193012997348 absolute error = 1.2e-31 relative error = 7.8191141864110048571525189671751e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.495 y[1] (analytic) = 0.15406722748936142920381908219829 y[1] (numeric) = 0.15406722748936142920381908219818 absolute error = 1.1e-31 relative error = 7.1397403453369512548034678596854e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.496 y[1] (analytic) = 0.15466462995820053041709232705558 y[1] (numeric) = 0.15466462995820053041709232705546 absolute error = 1.2e-31 relative error = 7.7587228594172468531714177631180e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.497 y[1] (analytic) = 0.15526227664397952294542930233277 y[1] (numeric) = 0.15526227664397952294542930233265 absolute error = 1.2e-31 relative error = 7.7288574271755109472585366768338e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.498 y[1] (analytic) = 0.15586016697874296211924887351085 y[1] (numeric) = 0.15586016697874296211924887351073 absolute error = 1.2e-31 relative error = 7.6992089977913495840016046836854e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.499 y[1] (analytic) = 0.15645830039389284308991784247005 y[1] (numeric) = 0.15645830039389284308991784246993 absolute error = 1.2e-31 relative error = 7.6697752498840292970235176861845e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.5 y[1] (analytic) = 0.15705667632018914013543076336774 y[1] (numeric) = 0.15705667632018914013543076336761 absolute error = 1.3e-31 relative error = 8.2772667196248893384938887263556e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.501 y[1] (analytic) = 0.15765529418775034700705105232891 y[1] (numeric) = 0.1576552941877503470070510523288 absolute error = 1.1e-31 relative error = 6.9772474541198684348330934250453e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.502 y[1] (analytic) = 0.15825415342605401831640193768811 y[1] (numeric) = 0.15825415342605401831640193768798 absolute error = 1.3e-31 relative error = 8.2146343198975766469004696825255e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.503 y[1] (analytic) = 0.15885325346393731196249435810198 y[1] (numeric) = 0.15885325346393731196249435810185 absolute error = 1.3e-31 relative error = 8.1836536026322214853392031004920e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.504 y[1] (analytic) = 0.15945259372959753259817747691793 y[1] (numeric) = 0.15945259372959753259817747691781 absolute error = 1.2e-31 relative error = 7.5257477594562103091323606741961e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=198.3MB, alloc=4.4MB, time=9.41 TOP MAIN SOLVE Loop x[1] = 1.505 y[1] (analytic) = 0.16005217365059267613549604273493 y[1] (numeric) = 0.16005217365059267613549604273481 absolute error = 1.2e-31 relative error = 7.4975551573557550243471496054038e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.506 y[1] (analytic) = 0.16065199265384197528943738813258 y[1] (numeric) = 0.16065199265384197528943738813247 absolute error = 1.1e-31 relative error = 6.8470983884412691546360479027795e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.507 y[1] (analytic) = 0.1612520501656264461595494210743 y[1] (numeric) = 0.1612520501656264461595494210742 absolute error = 1.0e-31 relative error = 6.2014715408137279974762310905302e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.508 y[1] (analytic) = 0.16185234561158943584890952651125 y[1] (numeric) = 0.16185234561158943584890952651114 absolute error = 1.1e-31 relative error = 6.7963179393134139987003944906159e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.509 y[1] (analytic) = 0.1624528784167371711199228592288 y[1] (numeric) = 0.1624528784167371711199228592287 absolute error = 1.0e-31 relative error = 6.1556311574530534632040070454951e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.51 y[1] (analytic) = 0.16305364800543930808642707298779 y[1] (numeric) = 0.16305364800543930808642707298769 absolute error = 1.0e-31 relative error = 6.1329507940027259687714661539646e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.511 y[1] (analytic) = 0.16365465380142948294157909551976 y[1] (numeric) = 0.16365465380142948294157909551966 absolute error = 1.0e-31 relative error = 6.1104281288166169291307472371388e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.512 y[1] (analytic) = 0.16425589522780586372099812394266 y[1] (numeric) = 0.16425589522780586372099812394257 absolute error = 9e-32 relative error = 5.4792553944672335340868805928166e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.513 y[1] (analytic) = 0.16485737170703170310063758067067 y[1] (numeric) = 0.16485737170703170310063758067058 absolute error = 9e-32 relative error = 5.4592645186615702472522598582005e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.514 y[1] (analytic) = 0.16545908266093589222885733590205 y[1] (numeric) = 0.16545908266093589222885733590196 absolute error = 9e-32 relative error = 5.4394112763474528093150462539554e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.515 y[1] (analytic) = 0.16606102751071351559216606928414 y[1] (numeric) = 0.16606102751071351559216606928406 absolute error = 8e-32 relative error = 4.8175060216846338260873867326940e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.516 y[1] (analytic) = 0.16666320567692640691410221037566 y[1] (numeric) = 0.16666320567692640691410221037557 absolute error = 9e-32 relative error = 5.4001121383962434493096534173415e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.517 y[1] (analytic) = 0.16726561657950370608672046505602 y[1] (numeric) = 0.16726561657950370608672046505594 absolute error = 8e-32 relative error = 4.7828120109774546498694906075987e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.518 y[1] (analytic) = 0.16786825963774241713414950307141 y[1] (numeric) = 0.16786825963774241713414950307132 absolute error = 9e-32 relative error = 5.3613470583550971831402518714544e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.519 y[1] (analytic) = 0.16847113427030796720768495045828 y[1] (numeric) = 0.1684711342703079672076849504582 absolute error = 8e-32 relative error = 4.7485879611662069129912629708208e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.52 y[1] (analytic) = 0.16907423989523476661188039965112 y[1] (numeric) = 0.16907423989523476661188039965104 absolute error = 8e-32 relative error = 4.7316492476660686911409816635380e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.521 y[1] (analytic) = 0.16967757592992676986109771966126 y[1] (numeric) = 0.16967757592992676986109771966118 absolute error = 8e-32 relative error = 4.7148245465881890339924455685328e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.522 y[1] (analytic) = 0.1702811417911580377659765188127 y[1] (numeric) = 0.17028114179115803776597651881263 absolute error = 7e-32 relative error = 4.1108486391201070065698068319447e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.523 y[1] (analytic) = 0.17088493689507330054928118313799 y[1] (numeric) = 0.1708849368950733005492811831379 absolute error = 9e-32 relative error = 5.2667017722727523605888752172749e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.524 y[1] (analytic) = 0.17148896065718852199058248467569 y[1] (numeric) = 0.1714889606571885219905824846756 absolute error = 9e-32 relative error = 5.2481512311403325859800479160577e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.525 y[1] (analytic) = 0.17209321249239146459922932557316 y[1] (numeric) = 0.17209321249239146459922932557308 absolute error = 8e-32 relative error = 4.6486435369167704328617553431138e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.526 y[1] (analytic) = 0.17269769181494225581506475608373 y[1] (numeric) = 0.17269769181494225581506475608365 absolute error = 8e-32 relative error = 4.6323722777792326486369894341725e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.527 y[1] (analytic) = 0.1733023980384739552363389772608 y[1] (numeric) = 0.17330239803847395523633897726071 absolute error = 9e-32 relative error = 5.1932345437031732626905418689000e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.528 y[1] (analytic) = 0.17390733057599312287427061239224 y[1] (numeric) = 0.17390733057599312287427061239216 absolute error = 8e-32 relative error = 4.6001511112288630717850764177744e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.529 y[1] (analytic) = 0.17451248883988038843370610499012 y[1] (numeric) = 0.17451248883988038843370610499004 absolute error = 8e-32 relative error = 4.5841991327853915629163837434168e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.53 y[1] (analytic) = 0.17511787224189102161932567545367 y[1] (numeric) = 0.17511787224189102161932567545358 absolute error = 9e-32 relative error = 5.1393954739058636934051608394094e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=202.1MB, alloc=4.4MB, time=9.60 x[1] = 1.531 y[1] (analytic) = 0.17572348019315550346684284336126 y[1] (numeric) = 0.17572348019315550346684284336117 absolute error = 9e-32 relative error = 5.1216832207666197988745860801316e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.532 y[1] (analytic) = 0.17632931210418009869864309771975 y[1] (numeric) = 0.17632931210418009869864309771967 absolute error = 8e-32 relative error = 4.5369654679270709668453891606008e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.533 y[1] (analytic) = 0.17693536738484742910330587341003 y[1] (numeric) = 0.17693536738484742910330587340995 absolute error = 8e-32 relative error = 4.5214250368607266555183925046546e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.534 y[1] (analytic) = 0.17754164544441704793845256851739 y[1] (numeric) = 0.17754164544441704793845256851732 absolute error = 7e-32 relative error = 3.9427369181342242156471837164446e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.535 y[1] (analytic) = 0.1781481456915260153563619142264 y[1] (numeric) = 0.17814814569152601535636191422633 absolute error = 7e-32 relative error = 3.9293139834982685781398886752551e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.536 y[1] (analytic) = 0.17875486753418947485179258649356 y[1] (numeric) = 0.17875486753418947485179258649348 absolute error = 8e-32 relative error = 4.4754026060128870904736364271568e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.537 y[1] (analytic) = 0.17936181037980123073145152679001 y[1] (numeric) = 0.17936181037980123073145152678993 absolute error = 8e-32 relative error = 4.4602582807677309656067125192823e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.538 y[1] (analytic) = 0.17996897363513432660454501783173 y[1] (numeric) = 0.17996897363513432660454501783165 absolute error = 8e-32 relative error = 4.4452106595990527828383519366999e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.539 y[1] (analytic) = 0.18057635670634162489384813938831 y[1] (numeric) = 0.18057635670634162489384813938822 absolute error = 9e-32 relative error = 4.9840411913039392953333541355497e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.54 y[1] (analytic) = 0.18118395899895638736672680898556 y[1] (numeric) = 0.18118395899895638736672680898547 absolute error = 9e-32 relative error = 4.9673271572853972430028645510190e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.541 y[1] (analytic) = 0.18179177991789285668554519259331 y[1] (numeric) = 0.18179177991789285668554519259322 absolute error = 9e-32 relative error = 4.9507188961265981658458160138637e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.542 y[1] (analytic) = 0.1823998188674468389768898512195 y[1] (numeric) = 0.18239981886744683897688985121941 absolute error = 9e-32 relative error = 4.9342154262447258893263004215168e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.543 y[1] (analytic) = 0.18300807525129628741904057071763 y[1] (numeric) = 0.18300807525129628741904057071755 absolute error = 8e-32 relative error = 4.3713918028015182887528418633850e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.544 y[1] (analytic) = 0.18361654847250188684711640405776 y[1] (numeric) = 0.18361654847250188684711640405767 absolute error = 9e-32 relative error = 4.9015189942685504946489330359623e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.545 y[1] (analytic) = 0.18422523793350763937532403781372 y[1] (numeric) = 0.18422523793350763937532403781362 absolute error = 1.0e-31 relative error = 5.4281379208256455293710495754275e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.546 y[1] (analytic) = 0.18483414303614145103573417768329 y[1] (numeric) = 0.18483414303614145103573417768321 absolute error = 8e-32 relative error = 4.3282046642409157222359110227165e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.547 y[1] (analytic) = 0.18544326318161571943301023148454 y[1] (numeric) = 0.18544326318161571943301023148446 absolute error = 8e-32 relative error = 4.3139879350403361784694391220469e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.548 y[1] (analytic) = 0.186052597770527922414512152263 y[1] (numeric) = 0.18605259777052792241451215226291 absolute error = 9e-32 relative error = 4.8373417559588975088158680344942e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.549 y[1] (analytic) = 0.18666214620286120775519688890298 y[1] (numeric) = 0.1866621462028612077551968889029 absolute error = 8e-32 relative error = 4.2858180743865109598113166768858e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.55 y[1] (analytic) = 0.1872719078779849838567354769626 y[1] (numeric) = 0.18727190787798498385673547696252 absolute error = 8e-32 relative error = 4.2718633513427517157346735506666e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.551 y[1] (analytic) = 0.18788188219465551146026538834881 y[1] (numeric) = 0.18788188219465551146026538834873 absolute error = 8e-32 relative error = 4.2579943880440686909892784544080e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.552 y[1] (analytic) = 0.18849206855101649637219534491808 y[1] (numeric) = 0.18849206855101649637219534491799 absolute error = 9e-32 relative error = 4.7747367139557368789461251373260e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.553 y[1] (analytic) = 0.18910246634459968320247838813077 y[1] (numeric) = 0.18910246634459968320247838813068 absolute error = 9e-32 relative error = 4.7593244942661841703221218971151e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.554 y[1] (analytic) = 0.18971307497232545011476758450607 y[1] (numeric) = 0.18971307497232545011476758450598 absolute error = 9e-32 relative error = 4.7440061794965277731665437534139e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.555 y[1] (analytic) = 0.19032389383050340458786733482002 y[1] (numeric) = 0.19032389383050340458786733481994 absolute error = 8e-32 relative error = 4.2033608282124332201333042729874e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.556 y[1] (analytic) = 0.19093492231483298018789184376475 y[1] (numeric) = 0.19093492231483298018789184376466 absolute error = 9e-32 relative error = 4.7136479230132043463546511264994e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.557 y[1] (analytic) = 0.19154615982040403435054089614321 y[1] (numeric) = 0.19154615982040403435054089614312 absolute error = 9e-32 relative error = 4.6986063351196951270779205212782e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=205.9MB, alloc=4.4MB, time=9.79 TOP MAIN SOLVE Loop x[1] = 1.558 y[1] (analytic) = 0.19215760574169744717290167561341 y[1] (numeric) = 0.19215760574169744717290167561333 absolute error = 8e-32 relative error = 4.1632492084407936399647557141893e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.559 y[1] (analytic) = 0.19276925947258572121418395251989 y[1] (numeric) = 0.19276925947258572121418395251981 absolute error = 8e-32 relative error = 4.1500392862886436204129628525727e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.56 y[1] (analytic) = 0.19338112040633358230479455846103 y[1] (numeric) = 0.19338112040633358230479455846094 absolute error = 9e-32 relative error = 4.6540220581456687446434147393665e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.561 y[1] (analytic) = 0.19399318793559858136315565693983 y[1] (numeric) = 0.19399318793559858136315565693976 absolute error = 7e-32 relative error = 3.6083741261697519641659561009764e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.562 y[1] (analytic) = 0.19460546145243169721966991173511 y[1] (numeric) = 0.19460546145243169721966991173504 absolute error = 7e-32 relative error = 3.5970213516906060766672314038492e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.563 y[1] (analytic) = 0.19521794034827794044723424751074 y[1] (numeric) = 0.19521794034827794044723424751066 absolute error = 8e-32 relative error = 4.0979840201815599809397080220954e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.564 y[1] (analytic) = 0.19583062401397695819770249065627 y[1] (numeric) = 0.19583062401397695819770249065619 absolute error = 8e-32 relative error = 4.0851629004812947381976778233462e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.565 y[1] (analytic) = 0.19644351183976364004369577242232 y[1] (numeric) = 0.19644351183976364004369577242223 absolute error = 9e-32 relative error = 4.5814697139710983695749600015357e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.566 y[1] (analytic) = 0.19705660321526872482515817108211 y[1] (numeric) = 0.19705660321526872482515817108203 absolute error = 8e-32 relative error = 4.0597472347884906432423358380412e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.567 y[1] (analytic) = 0.19766989752951940850005366511802 y[1] (numeric) = 0.19766989752951940850005366511794 absolute error = 8e-32 relative error = 4.0471513872289557135973603790889e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.568 y[1] (analytic) = 0.19828339417093995299859906529978 y[1] (numeric) = 0.1982833941709399529985990652997 absolute error = 8e-32 relative error = 4.0346293412262282036791232287585e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.569 y[1] (analytic) = 0.1988970925273522960804261899923 y[1] (numeric) = 0.19889709252735229608042618999221 absolute error = 9e-32 relative error = 4.5249530225095278613904323393788e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.57 y[1] (analytic) = 0.19951099198597666219406514510642 y[1] (numeric) = 0.19951099198597666219406514510633 absolute error = 9e-32 relative error = 4.5110296482474494067472807082339e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.571 y[1] (analytic) = 0.20012509193343217433813916778821 y[1] (numeric) = 0.20012509193343217433813916778812 absolute error = 9e-32 relative error = 4.4971871907964842953610936198925e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.572 y[1] (analytic) = 0.20073939175573746692366009123235 y[1] (numeric) = 0.20073939175573746692366009123227 absolute error = 8e-32 relative error = 3.9852666335337476905956297960019e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.573 y[1] (analytic) = 0.20135389083831129963681208690574 y[1] (numeric) = 0.20135389083831129963681208690566 absolute error = 8e-32 relative error = 3.9731042527626449644156462559976e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.574 y[1] (analytic) = 0.20196858856597317230160993997925 y[1] (numeric) = 0.20196858856597317230160993997917 absolute error = 8e-32 relative error = 3.9610119854785214473748892642748e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.575 y[1] (analytic) = 0.20258348432294394074181671389161 y[1] (numeric) = 0.20258348432294394074181671389153 absolute error = 8e-32 relative error = 3.9489892410217303428220562911408e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.576 y[1] (analytic) = 0.20319857749284643364150426071028 y[1] (numeric) = 0.20319857749284643364150426071019 absolute error = 9e-32 relative error = 4.4291648647574037508838362529770e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.577 y[1] (analytic) = 0.2038138674587060704036386353126 y[1] (numeric) = 0.20381386745870607040363863531251 absolute error = 9e-32 relative error = 4.4157937397578968752046072212143e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.578 y[1] (analytic) = 0.20442935360295148000607107338813 y[1] (numeric) = 0.20442935360295148000607107338804 absolute error = 9e-32 relative error = 4.4024988786493238345929798992684e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.579 y[1] (analytic) = 0.20504503530741512085431379586093 y[1] (numeric) = 0.20504503530741512085431379586084 absolute error = 9e-32 relative error = 4.3892796460576042094548737525848e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.58 y[1] (analytic) = 0.2056609119533339016304785055517 y[1] (numeric) = 0.20566091195333390163047850555162 absolute error = 8e-32 relative error = 3.8898981454556924725844577385903e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.581 y[1] (analytic) = 0.20627698292134980313775404574482 y[1] (numeric) = 0.20627698292134980313775404574474 absolute error = 8e-32 relative error = 3.8782804977568802459922921228369e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.582 y[1] (analytic) = 0.2068932475915105011397982947967 y[1] (numeric) = 0.20689324759151050113979829479662 absolute error = 8e-32 relative error = 3.8667284182203855864225484075508e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.583 y[1] (analytic) = 0.20750970534326999019441797602159 y[1] (numeric) = 0.20750970534326999019441797602152 absolute error = 7e-32 relative error = 3.3733361957313510573822264564997e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=209.8MB, alloc=4.4MB, time=9.97 x[1] = 1.584 y[1] (analytic) = 0.20812635555548920848090866782002 y[1] (numeric) = 0.20812635555548920848090866781994 absolute error = 8e-32 relative error = 3.8438188083618729237776429116979e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.585 y[1] (analytic) = 0.20874319760643666362042590537588 y[1] (numeric) = 0.20874319760643666362042590537582 absolute error = 6e-32 relative error = 2.8743451613270621234727069700307e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.586 y[1] (analytic) = 0.20936023087378905948875687224297 y[1] (numeric) = 0.2093602308737890594887568722429 absolute error = 7e-32 relative error = 3.3435194309753543021311240094746e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.587 y[1] (analytic) = 0.20997745473463192402086078777017 y[1] (numeric) = 0.20997745473463192402086078777011 absolute error = 6e-32 relative error = 2.8574496283816560691763142595924e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.588 y[1] (analytic) = 0.21059486856546023800654470458227 y[1] (numeric) = 0.2105948685654602380065447045822 absolute error = 7e-32 relative error = 3.3239176470361886320646841329683e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.589 y[1] (analytic) = 0.21121247174217906487664003923723 y[1] (numeric) = 0.21121247174217906487664003923715 absolute error = 8e-32 relative error = 3.7876551199899634002702006227090e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.59 y[1] (analytic) = 0.21183026364010418147904376872752 y[1] (numeric) = 0.21183026364010418147904376872745 absolute error = 7e-32 relative error = 3.3045325439866677631446448839044e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.591 y[1] (analytic) = 0.21244824363396270984398683568072 y[1] (numeric) = 0.21244824363396270984398683568065 absolute error = 7e-32 relative error = 3.2949201557347946123084599290524e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.592 y[1] (analytic) = 0.21306641109789374993789091594667 y[1] (numeric) = 0.21306641109789374993789091594659 absolute error = 8e-32 relative error = 3.7546978703857669315325547679729e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.593 y[1] (analytic) = 0.21368476540544901340517331373717 y[1] (numeric) = 0.2136847654054490134051733137371 absolute error = 7e-32 relative error = 3.2758535624746500062128007779825e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.594 y[1] (analytic) = 0.21430330592959345829735836160969 y[1] (numeric) = 0.21430330592959345829735836160961 absolute error = 8e-32 relative error = 3.7330268729630774441172495105103e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.595 y[1] (analytic) = 0.21492203204270592478885231536181 y[1] (numeric) = 0.21492203204270592478885231536174 absolute error = 7e-32 relative error = 3.2569950755951675222574222382280e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.596 y[1] (analytic) = 0.21554094311657977187873734733044 y[1] (numeric) = 0.21554094311657977187873734733036 absolute error = 8e-32 relative error = 3.7115918137525429358715367088198e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.597 y[1] (analytic) = 0.21616003852242351507793885566859 y[1] (numeric) = 0.21616003852242351507793885566852 absolute error = 7e-32 relative error = 3.2383413917988592649768832269516e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.598 y[1] (analytic) = 0.21677931763086146508111892190831 y[1] (numeric) = 0.21677931763086146508111892190823 absolute error = 8e-32 relative error = 3.6903889575031543048471591940115e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.599 y[1] (analytic) = 0.21739877981193436742264736450836 y[1] (numeric) = 0.21739877981193436742264736450828 absolute error = 8e-32 relative error = 3.6798734596949335686342805098254e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.6 y[1] (analytic) = 0.21801842443510004311600045213608 y[1] (numeric) = 0.218018424435100043116000452136 absolute error = 8e-32 relative error = 3.6694146472842934079558356353134e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.601 y[1] (analytic) = 0.21863825086923403027593595714192 y[1] (numeric) = 0.21863825086923403027593595714185 absolute error = 7e-32 relative error = 3.2016355656753994956198032609947e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.602 y[1] (analytic) = 0.21925825848263022672279184705754 y[1] (numeric) = 0.21925825848263022672279184705747 absolute error = 7e-32 relative error = 3.1925821396390158226783225354759e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.603 y[1] (analytic) = 0.21987844664300153356825452998375 y[1] (numeric) = 0.21987844664300153356825452998367 absolute error = 8e-32 relative error = 3.6383738934580245614969876996204e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.604 y[1] (analytic) = 0.22049881471748049978194118843613 y[1] (numeric) = 0.22049881471748049978194118843604 absolute error = 9e-32 relative error = 4.0816545937135626596392348672683e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.605 y[1] (analytic) = 0.22111936207261996773813935558445 y[1] (numeric) = 0.22111936207261996773813935558437 absolute error = 8e-32 relative error = 3.6179554449748466274423359696474e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.606 y[1] (analytic) = 0.22174008807439371974204550786002 y[1] (numeric) = 0.22174008807439371974204550785994 absolute error = 8e-32 relative error = 3.6078275558887677898350161329687e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.607 y[1] (analytic) = 0.22236099208819712553484306861337 y[1] (numeric) = 0.2223609920881971255348430686133 absolute error = 7e-32 relative error = 3.1480341647439333045613704969196e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.608 y[1] (analytic) = 0.2229820734788477907769588388865 y[1] (numeric) = 0.22298207347884779077695883888643 absolute error = 7e-32 relative error = 3.1392658121748177539745677423722e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.609 y[1] (analytic) = 0.22360333161058620650883549341909 y[1] (numeric) = 0.22360333161058620650883549341902 absolute error = 7e-32 relative error = 3.1305436952034189545932671122308e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.61 y[1] (analytic) = 0.2242247658470763995885564027407 y[1] (numeric) = 0.22422476584707639958855640274062 absolute error = 8e-32 relative error = 3.5678485245720280608976593682773e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=213.6MB, alloc=4.4MB, time=10.15 TOP MAIN SOLVE Loop x[1] = 1.611 y[1] (analytic) = 0.2248463755514065841056576656104 y[1] (numeric) = 0.22484637555140658410565766561032 absolute error = 8e-32 relative error = 3.5579848598319796000286904346290e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.612 y[1] (analytic) = 0.2254681600860898137704608601558 y[1] (numeric) = 0.22546816008608981377046086015572 absolute error = 8e-32 relative error = 3.5481728315631726524282527381167e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.613 y[1] (analytic) = 0.22609011881306463527825864683409 y[1] (numeric) = 0.22609011881306463527825864683402 absolute error = 7e-32 relative error = 3.0961105406768022141659620226058e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.614 y[1] (analytic) = 0.22671225109369574264768398179311 y[1] (numeric) = 0.22671225109369574264768398179303 absolute error = 8e-32 relative error = 3.5287021153055184244277829429064e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.615 y[1] (analytic) = 0.22733455628877463253259232534976 y[1] (numeric) = 0.22733455628877463253259232534968 absolute error = 8e-32 relative error = 3.5190426526435767693686312338956e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.616 y[1] (analytic) = 0.2279570337585202605067848571305 y[1] (numeric) = 0.22795703375852026050678485713042 absolute error = 8e-32 relative error = 3.5094332770071794911163567769135e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.617 y[1] (analytic) = 0.22857968286257969832089933693323 y[1] (numeric) = 0.22857968286257969832089933693316 absolute error = 7e-32 relative error = 3.0623894093896108714841608679515e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.618 y[1] (analytic) = 0.22920250296002879213079387857654 y[1] (numeric) = 0.22920250296002879213079387857648 absolute error = 6e-32 relative error = 2.6177724599483781691113542498823e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.619 y[1] (analytic) = 0.2298254934093728216967475328998 y[1] (numeric) = 0.22982549340937282169674753289973 absolute error = 7e-32 relative error = 3.0457891751509772289492500179644e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.62 y[1] (analytic) = 0.23044865356854716055280020566985 y[1] (numeric) = 0.23044865356854716055280020566979 absolute error = 6e-32 relative error = 2.6036168608879698098072621421831e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.621 y[1] (analytic) = 0.23107198279491793714555306643798 y[1] (numeric) = 0.23107198279491793714555306643791 absolute error = 7e-32 relative error = 3.0293590401276263815857801505804e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.622 y[1] (analytic) = 0.23169548044528269694174923537566 y[1] (numeric) = 0.2316954804452826969417492353756 absolute error = 6e-32 relative error = 2.5896059726624501629311130661905e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.623 y[1] (analytic) = 0.23231914587587106550395316680295 y[1] (numeric) = 0.23231914587587106550395316680288 absolute error = 7e-32 relative error = 3.0130964770936806699325201775433e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.624 y[1] (analytic) = 0.23294297844234541253364578050805 y[1] (numeric) = 0.23294297844234541253364578050799 absolute error = 6e-32 relative error = 2.5757376505276508759963682054645e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.625 y[1] (analytic) = 0.23356697749980151688105102504625 y[1] (numeric) = 0.23356697749980151688105102504618 absolute error = 7e-32 relative error = 2.9969990085631640873149827119869e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.626 y[1] (analytic) = 0.23419114240276923252100819099818 y[1] (numeric) = 0.23419114240276923252100819099811 absolute error = 7e-32 relative error = 2.9890114238228453697465066017467e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.627 y[1] (analytic) = 0.23481547250521315549420292666802 y[1] (numeric) = 0.23481547250521315549420292666795 absolute error = 7e-32 relative error = 2.9810642055729919959092366621289e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.628 y[1] (analytic) = 0.23543996716053329181306854390878 y[1] (numeric) = 0.23543996716053329181306854390872 absolute error = 6e-32 relative error = 2.5484203350695071015191269549523e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.629 y[1] (analytic) = 0.23606462572156572633166783767996 y[1] (numeric) = 0.2360646257215657263316678376799 absolute error = 6e-32 relative error = 2.5416768741441589573523218074293e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.63 y[1] (analytic) = 0.23668944754058329257886427957142 y[1] (numeric) = 0.23668944754058329257886427957135 absolute error = 7e-32 relative error = 2.9574618018404747951642114449857e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.631 y[1] (analytic) = 0.23731443196929624355409008287011 y[1] (numeric) = 0.23731443196929624355409008287005 absolute error = 6e-32 relative error = 2.5282912422183748122212812461773e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.632 y[1] (analytic) = 0.23793957835885292348501727480396 y[1] (numeric) = 0.23793957835885292348501727480389 absolute error = 7e-32 relative error = 2.9419233438511108370134671602381e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.633 y[1] (analytic) = 0.23856488605984044054643655037133 y[1] (numeric) = 0.23856488605984044054643655037126 absolute error = 7e-32 relative error = 2.9342122034858702931104252842435e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.634 y[1] (analytic) = 0.23919035442228534053964732165854 y[1] (numeric) = 0.23919035442228534053964732165847 absolute error = 7e-32 relative error = 2.9265394153986883031481466727668e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.635 y[1] (analytic) = 0.23981598279565428153166101676088 y[1] (numeric) = 0.23981598279565428153166101676081 absolute error = 7e-32 relative error = 2.9189047028465391259755591111523e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.636 y[1] (analytic) = 0.24044177052885470945351832335895 y[1] (numeric) = 0.24044177052885470945351832335888 absolute error = 7e-32 relative error = 2.9113077917382706160851039346286e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=217.4MB, alloc=4.4MB, time=10.34 x[1] = 1.637 y[1] (analytic) = 0.24106771697023553465701971366202 y[1] (numeric) = 0.24106771697023553465701971366195 absolute error = 7e-32 relative error = 2.9037484106029365969899868283084e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.638 y[1] (analytic) = 0.2416938214675878094291672298155 y[1] (numeric) = 0.24169382146758780942916722981543 absolute error = 7e-32 relative error = 2.8962262905585819390333105410361e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.639 y[1] (analytic) = 0.24232008336814540646361415198312 y[1] (numeric) = 0.24232008336814540646361415198304 absolute error = 8e-32 relative error = 3.3014184746073974964723606157369e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.64 y[1] (analytic) = 0.24294650201858569828841781515634 y[1] (numeric) = 0.24294650201858569828841781515626 absolute error = 8e-32 relative error = 3.2929060239723025201092924731527e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.641 y[1] (analytic) = 0.24357307676503023764938948531735 y[1] (numeric) = 0.24357307676503023764938948531728 absolute error = 7e-32 relative error = 2.8738808463436010191279364769883e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.642 y[1] (analytic) = 0.24419980695304543884833385088773 y[1] (numeric) = 0.24419980695304543884833385088765 absolute error = 8e-32 relative error = 3.2760058657778686031389203264514e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.643 y[1] (analytic) = 0.24482669192764326003546933143552 y[1] (numeric) = 0.24482669192764326003546933143545 absolute error = 7e-32 relative error = 2.8591653732219683196381718041615e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.644 y[1] (analytic) = 0.24545373103328188645531905239083 y[1] (numeric) = 0.24545373103328188645531905239077 absolute error = 6e-32 relative error = 2.4444525551687132741667730160057e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.645 y[1] (analytic) = 0.24608092361386641464536098203412 y[1] (numeric) = 0.24608092361386641464536098203404 absolute error = 8e-32 relative error = 3.2509630907241962163508963791145e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.646 y[1] (analytic) = 0.24670826901274953758672437527661 y[1] (numeric) = 0.24670826901274953758672437527654 absolute error = 7e-32 relative error = 2.8373592940406265062545888708094e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.647 y[1] (analytic) = 0.24733576657273223080621831774844 y[1] (numeric) = 0.24733576657273223080621831774838 absolute error = 6e-32 relative error = 2.4258521455026293653794824677687e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.648 y[1] (analytic) = 0.24796341563606443942897681344906 y[1] (numeric) = 0.24796341563606443942897681344899 absolute error = 7e-32 relative error = 2.8229970869065178038751047726840e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.649 y[1] (analytic) = 0.24859121554444576618100350969924 y[1] (numeric) = 0.24859121554444576618100350969917 absolute error = 7e-32 relative error = 2.8158678031599495438491746172794e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.65 y[1] (analytic) = 0.24921916563902616034089780436544 y[1] (numeric) = 0.24921916563902616034089780436538 absolute error = 6e-32 relative error = 2.4075194957881030564430075836094e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.651 y[1] (analytic) = 0.24984726526040660764004273230629 y[1] (numeric) = 0.24984726526040660764004273230622 absolute error = 7e-32 relative error = 2.8017116748122728786990462441867e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.652 y[1] (analytic) = 0.25047551374863982111053368072152 y[1] (numeric) = 0.25047551374863982111053368072146 absolute error = 6e-32 relative error = 2.3954437342810250329240952297952e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.653 y[1] (analytic) = 0.25110391044323093288012563656555 y[1] (numeric) = 0.25110391044323093288012563656548 absolute error = 7e-32 relative error = 2.7876905571259695390005649600873e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.654 y[1] (analytic) = 0.25173245468313818691347532342313 y[1] (numeric) = 0.25173245468313818691347532342305 absolute error = 8e-32 relative error = 3.1779771941086405234195574984755e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.655 y[1] (analytic) = 0.25236114580677363269895324023641 y[1] (numeric) = 0.25236114580677363269895324023634 absolute error = 7e-32 relative error = 2.7738025905777579492667737436074e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.656 y[1] (analytic) = 0.25298998315200381988029927002071 y[1] (numeric) = 0.25298998315200381988029927002063 absolute error = 8e-32 relative error = 3.1621805339199397459663250883724e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.657 y[1] (analytic) = 0.25361896605615049383239418321352 y[1] (numeric) = 0.25361896605615049383239418321345 absolute error = 7e-32 relative error = 2.7600459495802141900183113133277e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.658 y[1] (analytic) = 0.25424809385599129218041801757018 y[1] (numeric) = 0.2542480938559912921804180175701 absolute error = 8e-32 relative error = 3.1465329311500291582389499430542e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.659 y[1] (analytic) = 0.25487736588776044226166497454916 y[1] (numeric) = 0.25487736588776044226166497454908 absolute error = 8e-32 relative error = 3.1387643905276921570103751389979e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.66 y[1] (analytic) = 0.25550678148714945952928313092579 y[1] (numeric) = 0.25550678148714945952928313092571 absolute error = 8e-32 relative error = 3.1310323559464329051681691723174e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.661 y[1] (analytic) = 0.25613633998930784689720592393296 y[1] (numeric) = 0.2561363399893078468972059239329 absolute error = 6e-32 relative error = 2.3425024345434403984760863036091e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.662 y[1] (analytic) = 0.25676604072884379502554102855662 y[1] (numeric) = 0.25676604072884379502554102855656 absolute error = 6e-32 relative error = 2.3367576113136640441832999792415e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.663 y[1] (analytic) = 0.25739588303982488354568090671091 y[1] (numeric) = 0.25739588303982488354568090671085 absolute error = 6e-32 relative error = 2.3310396145969693649230076940082e-29 % Correct digits = 30 h = 0.001 memory used=221.2MB, alloc=4.4MB, time=10.52 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.664 y[1] (analytic) = 0.25802586625577878322439796988753 y[1] (numeric) = 0.25802586625577878322439796988747 absolute error = 6e-32 relative error = 2.3253482633606401717285527381768e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.665 y[1] (analytic) = 0.2586559897096939590661859595152 y[1] (numeric) = 0.25865598970969395906618595951513 absolute error = 7e-32 relative error = 2.7062972745601385352317762009863e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.666 y[1] (analytic) = 0.25928625273402037435310781268176 y[1] (numeric) = 0.25928625273402037435310781268169 absolute error = 7e-32 relative error = 2.6997189115077004311318171468752e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.667 y[1] (analytic) = 0.25991665466067019562140894506455 y[1] (numeric) = 0.25991665466067019562140894506448 absolute error = 7e-32 relative error = 2.6931710125073485299824691110517e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.668 y[1] (analytic) = 0.26054719482101849857415354788523 y[1] (numeric) = 0.26054719482101849857415354788516 absolute error = 7e-32 relative error = 2.6866533737999415217405407667821e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.669 y[1] (analytic) = 0.26117787254590397492914016145637 y[1] (numeric) = 0.2611778725459039749291401614563 absolute error = 7e-32 relative error = 2.6801657934363093359379463034101e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.67 y[1] (analytic) = 0.26180868716562964020135145441927 y[1] (numeric) = 0.26180868716562964020135145441919 absolute error = 8e-32 relative error = 3.0556663671511063306825703824007e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.671 y[1] (analytic) = 0.26243963800996354241919180508814 y[1] (numeric) = 0.26243963800996354241919180508806 absolute error = 8e-32 relative error = 3.0483200101412574508721368832174e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.672 y[1] (analytic) = 0.26307072440813947177376494941657 y[1] (numeric) = 0.26307072440813947177376494941649 absolute error = 8e-32 relative error = 3.0410073253109109799213347771917e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.673 y[1] (analytic) = 0.26370194568885767120044262898941 y[1] (numeric) = 0.26370194568885767120044262898934 absolute error = 7e-32 relative error = 2.6545120786705573647306761340985e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.674 y[1] (analytic) = 0.26433330118028554789197384211935 y[1] (numeric) = 0.26433330118028554789197384211927 absolute error = 8e-32 relative error = 3.0264820831423318072793347345339e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.675 y[1] (analytic) = 0.26496479021005838574238297159321 y[1] (numeric) = 0.26496479021005838574238297159313 absolute error = 8e-32 relative error = 3.0192690861520778275521615945009e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.676 y[1] (analytic) = 0.26559641210528005872090373387166 y[1] (numeric) = 0.26559641210528005872090373387158 absolute error = 8e-32 relative error = 3.0120888819947127359198488181599e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.677 y[1] (analytic) = 0.266228166192523745175194566597 y[1] (numeric) = 0.26622816619252374517519456659692 absolute error = 8e-32 relative error = 3.0049412556201039052966541411526e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.678 y[1] (analytic) = 0.26686005179783264306307974411145 y[1] (numeric) = 0.26686005179783264306307974411137 absolute error = 8e-32 relative error = 2.9978259938511237258309379275263e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.679 y[1] (analytic) = 0.26749206824672068611205918433219 y[1] (numeric) = 0.26749206824672068611205918433211 absolute error = 8e-32 relative error = 2.9907428853633217390894809374759e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.68 y[1] (analytic) = 0.26812421486417326090582858477263 y[1] (numeric) = 0.26812421486417326090582858477256 absolute error = 7e-32 relative error = 2.6107302555817533200802555797281e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.681 y[1] (analytic) = 0.26875649097464792489705020074311 y[1] (numeric) = 0.26875649097464792489705020074304 absolute error = 7e-32 relative error = 2.6045882555671249520347352554765e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.682 y[1] (analytic) = 0.26938889590207512534561325480988 y[1] (numeric) = 0.26938889590207512534561325480981 absolute error = 7e-32 relative error = 2.5984738444989775135915951328248e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.683 y[1] (analytic) = 0.27002142896985891918162164344152 y[1] (numeric) = 0.27002142896985891918162164344144 absolute error = 8e-32 relative error = 2.9627278214622729765256979372022e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.684 y[1] (analytic) = 0.27065408950087769379234528442722 y[1] (numeric) = 0.27065408950087769379234528442714 absolute error = 8e-32 relative error = 2.9558023729673063395772083247147e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.685 y[1] (analytic) = 0.27128687681748488873237012711488 y[1] (numeric) = 0.27128687681748488873237012711481 absolute error = 7e-32 relative error = 2.5802943666565291082382689761264e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.686 y[1] (analytic) = 0.27191979024150971835618052678887 y[1] (numeric) = 0.27191979024150971835618052678881 absolute error = 6e-32 relative error = 2.2065330348596577991158193253447e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.687 y[1] (analytic) = 0.27255282909425789537240636459073 y[1] (numeric) = 0.27255282909425789537240636459066 absolute error = 7e-32 relative error = 2.5683094258321441193184191662093e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.688 y[1] (analytic) = 0.27318599269651235531896597528174 y[1] (numeric) = 0.27318599269651235531896597528166 absolute error = 8e-32 relative error = 2.9284078297848001120865936320641e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.689 y[1] (analytic) = 0.27381928036853398195833462685648 y[1] (numeric) = 0.27381928036853398195833462685641 absolute error = 7e-32 relative error = 2.5564306467311886663343589027555e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=225.0MB, alloc=4.4MB, time=10.70 x[1] = 1.69 y[1] (analytic) = 0.27445269143006233359216697854263 y[1] (numeric) = 0.27445269143006233359216697854255 absolute error = 8e-32 relative error = 2.9148921653182648998464453873616e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.691 y[1] (analytic) = 0.27508622520031637029450062706579 y[1] (numeric) = 0.27508622520031637029450062706572 absolute error = 7e-32 relative error = 2.5446566780661721996589352222627e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.692 y[1] (analytic) = 0.27571988099799518206276653522224 y[1] (numeric) = 0.27571988099799518206276653522217 absolute error = 7e-32 relative error = 2.5388085816165351129816680880969e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.693 y[1] (analytic) = 0.27635365814127871788583082178614 y[1] (numeric) = 0.27635365814127871788583082178607 absolute error = 7e-32 relative error = 2.5329861913466799794053289167841e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.694 y[1] (analytic) = 0.27698755594782851572829107758587 y[1] (numeric) = 0.2769875559478285157282910775858 absolute error = 7e-32 relative error = 2.5271893446788895424152017301422e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.695 y[1] (analytic) = 0.27762157373478843343024905921577 y[1] (numeric) = 0.2776215737347884334302490592157 absolute error = 7e-32 relative error = 2.5214178804011434141576049220442e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.696 y[1] (analytic) = 0.27825571081878538052178029930804 y[1] (numeric) = 0.27825571081878538052178029930797 absolute error = 7e-32 relative error = 2.5156716386528234769298978295612e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.697 y[1] (analytic) = 0.27888996651593005095131986057594 y[1] (numeric) = 0.27888996651593005095131986057587 absolute error = 7e-32 relative error = 2.5099504609105984502042148534316e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.698 y[1] (analytic) = 0.27952434014181765672718214995541 y[1] (numeric) = 0.27952434014181765672718214995534 absolute error = 7e-32 relative error = 2.5042541899744850088138689115316e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.699 y[1] (analytic) = 0.28015883101152866247143139911993 y[1] (numeric) = 0.28015883101152866247143139911986 absolute error = 7e-32 relative error = 2.4985826699540828814392486490159e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.7 y[1] (analytic) = 0.2807934384396295208853181084239 y[1] (numeric) = 0.28079343843962952088531810842382 absolute error = 8e-32 relative error = 2.8490694242914073156857729282069e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.701 y[1] (analytic) = 0.28142816174017340912549544294544 y[1] (numeric) = 0.28142816174017340912549544294537 absolute error = 7e-32 relative error = 2.4873132655653350222596848946498e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.702 y[1] (analytic) = 0.28206300022670096609022826175186 y[1] (numeric) = 0.28206300022670096609022826175179 absolute error = 7e-32 relative error = 2.4817150758426053567670955219489e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.703 y[1] (analytic) = 0.28269795321224103061480615480071 y[1] (numeric) = 0.28269795321224103061480615480064 absolute error = 7e-32 relative error = 2.4761410263004673282172120349727e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.704 y[1] (analytic) = 0.28333302000931138057537055602046 y[1] (numeric) = 0.28333302000931138057537055602039 absolute error = 7e-32 relative error = 2.4705909673958770751693681149840e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.705 y[1] (analytic) = 0.28396819992991947290036469608622 y[1] (numeric) = 0.28396819992991947290036469608615 absolute error = 7e-32 relative error = 2.4650647508162992795388265633776e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.706 y[1] (analytic) = 0.28460349228556318448881385422153 y[1] (numeric) = 0.28460349228556318448881385422146 absolute error = 7e-32 relative error = 2.4595622294670916311349074996938e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.707 y[1] (analytic) = 0.28523889638723155403464206501762 y[1] (numeric) = 0.28523889638723155403464206501755 absolute error = 7e-32 relative error = 2.4540832574590441777748912614009e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.708 y[1] (analytic) = 0.2858744115454055247562301337687 y[1] (numeric) = 0.28587441154540552475623013376863 absolute error = 7e-32 relative error = 2.4486276900960713470451769500711e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.709 y[1] (analytic) = 0.28651003707005868803041851217747 y[1] (numeric) = 0.2865100370700586880304185121774 absolute error = 7e-32 relative error = 2.4431953838630544618741564861568e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.71 y[1] (analytic) = 0.28714577227065802793015728549104 y[1] (numeric) = 0.28714577227065802793015728549096 absolute error = 8e-32 relative error = 2.7860413673300944085870005919732e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.711 y[1] (analytic) = 0.28778161645616466666500422218476 y[1] (numeric) = 0.28778161645616466666500422218468 absolute error = 8e-32 relative error = 2.7798856989249597054979476864913e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.712 y[1] (analytic) = 0.28841756893503461092367053822319 y[1] (numeric) = 0.28841756893503461092367053822311 absolute error = 8e-32 relative error = 2.7737561305781554043466193049182e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.713 y[1] (analytic) = 0.28905362901521949911781272969353 y[1] (numeric) = 0.28905362901521949911781272969345 absolute error = 8e-32 relative error = 2.7676525035355211373735388850649e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.714 y[1] (analytic) = 0.28968979600416734952626753023044 y[1] (numeric) = 0.28968979600416734952626753023036 absolute error = 8e-32 relative error = 2.7615746603255972231329118223455e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.715 y[1] (analytic) = 0.2903260692088233093389257531334 y[1] (numeric) = 0.29032606920882330933892575313332 absolute error = 8e-32 relative error = 2.7555224447467123048130560737767e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.716 y[1] (analytic) = 0.29096244793563040459943948241988 y[1] (numeric) = 0.2909624479356304045994394824198 absolute error = 8e-32 relative error = 2.7494957018542266522446110986193e-29 % Correct digits = 30 h = 0.001 memory used=228.8MB, alloc=4.4MB, time=10.89 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.717 y[1] (analytic) = 0.29159893149053029104595578226241 y[1] (numeric) = 0.29159893149053029104595578226233 absolute error = 8e-32 relative error = 2.7434942779479289427000269325901e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.718 y[1] (analytic) = 0.29223551917896400584906880032551 y[1] (numeric) = 0.29223551917896400584906880032543 absolute error = 8e-32 relative error = 2.7375180205595843705659998787557e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.719 y[1] (analytic) = 0.29287221030587272024618084745219 y[1] (numeric) = 0.29287221030587272024618084745211 absolute error = 8e-32 relative error = 2.7315667784406319703199805687624e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.72 y[1] (analytic) = 0.29350900417569849307146174395039 y[1] (numeric) = 0.2935090041756984930714617439503 absolute error = 9e-32 relative error = 3.0663454517437827048470607160759e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.721 y[1] (analytic) = 0.29414590009238502518059443139908 y[1] (numeric) = 0.294145900092385025180594431399 absolute error = 8e-32 relative error = 2.7197387410422408332877472814277e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.722 y[1] (analytic) = 0.29478289735937841476949355843402 y[1] (numeric) = 0.29478289735937841476949355843393 absolute error = 9e-32 relative error = 3.0530943554122944602523560279432e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.723 y[1] (analytic) = 0.29541999527962791358618245938461 y[1] (numeric) = 0.29541999527962791358618245938453 absolute error = 8e-32 relative error = 2.7080089796994448498111900165487e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.724 y[1] (analytic) = 0.29605719315558668403501265592011 y[1] (numeric) = 0.29605719315558668403501265592003 absolute error = 8e-32 relative error = 2.7021805870448034775426488231592e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.725 y[1] (analytic) = 0.29669449028921255717240872402405 y[1] (numeric) = 0.29669449028921255717240872402398 absolute error = 7e-32 relative error = 2.3593292862218383088948781005467e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.726 y[1] (analytic) = 0.29733188598196879159332008165512 y[1] (numeric) = 0.29733188598196879159332008165505 absolute error = 7e-32 relative error = 2.3542715497471077184079994981831e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.727 y[1] (analytic) = 0.29796937953482483320755996636974 y[1] (numeric) = 0.29796937953482483320755996636967 absolute error = 7e-32 relative error = 2.3492346800627824044631341122781e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.728 y[1] (analytic) = 0.29860697024825707590521058698024 y[1] (numeric) = 0.29860697024825707590521058698017 absolute error = 7e-32 relative error = 2.3442185539675485689743789105092e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.729 y[1] (analytic) = 0.29924465742224962311027214900253 y[1] (numeric) = 0.29924465742224962311027214900246 absolute error = 7e-32 relative error = 2.3392230492264526851460835253452e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.73 y[1] (analytic) = 0.29988244035629505022173217021171 y[1] (numeric) = 0.29988244035629505022173217021164 absolute error = 7e-32 relative error = 2.3342480445614587360733591030697e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.731 y[1] (analytic) = 0.30052031834939516794123022007399 y[1] (numeric) = 0.30052031834939516794123022007392 absolute error = 7e-32 relative error = 2.3292934196421159598924038672599e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.732 y[1] (analytic) = 0.30115829070006178648649193516047 y[1] (numeric) = 0.3011582907000617864864919351604 absolute error = 7e-32 relative error = 2.3243590550763355957002086903432e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.733 y[1] (analytic) = 0.30179635670631748068970488187464 y[1] (numeric) = 0.30179635670631748068970488187457 absolute error = 7e-32 relative error = 2.3194448324012751478668502035392e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.734 y[1] (analytic) = 0.30243451566569635598000755794222 y[1] (numeric) = 0.30243451566569635598000755794215 absolute error = 7e-32 relative error = 2.3145506340743287093587961164922e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.735 y[1] (analytic) = 0.30307276687524481524926154512114 y[1] (numeric) = 0.30307276687524481524926154512107 absolute error = 7e-32 relative error = 2.3096763434642219072863417346334e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.736 y[1] (analytic) = 0.30371110963152232660027554749274 y[1] (numeric) = 0.30371110963152232660027554749267 absolute error = 7e-32 relative error = 2.3048218448422100560902044831407e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.737 y[1] (analytic) = 0.30434954323060219197664877249399 y[1] (numeric) = 0.30434954323060219197664877249391 absolute error = 8e-32 relative error = 2.6285565981410035721131392476791e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.738 y[1] (analytic) = 0.30498806696807231667339983554662 y[1] (numeric) = 0.30498806696807231667339983554655 absolute error = 7e-32 relative error = 2.2951717651080411526281894648852e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.739 y[1] (analytic) = 0.30562668013903597972754609373463 y[1] (numeric) = 0.30562668013903597972754609373454 absolute error = 9e-32 relative error = 2.9447690875370276732479553555724e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.74 y[1] (analytic) = 0.30626538203811260518779703947673 y[1] (numeric) = 0.30626538203811260518779703947665 absolute error = 8e-32 relative error = 2.6121136991592655479368114173696e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.741 y[1] (analytic) = 0.30690417195943853426252411153959 y[1] (numeric) = 0.30690417195943853426252411153951 absolute error = 8e-32 relative error = 2.6066768492991702755722717742258e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.742 y[1] (analytic) = 0.30754304919666779834516800803868 y[1] (numeric) = 0.3075430491966677983451680080386 absolute error = 8e-32 relative error = 2.6012618463973658521859274892674e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=232.7MB, alloc=4.4MB, time=11.07 x[1] = 1.743 y[1] (analytic) = 0.30818201304297289291624331428257 y[1] (numeric) = 0.3081820130429728929162433142825 absolute error = 7e-32 relative error = 2.2713849944980144440158320197367e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.744 y[1] (analytic) = 0.30882106279104555232109898743113 y[1] (numeric) = 0.30882106279104555232109898743106 absolute error = 7e-32 relative error = 2.2666847710242933280478910279215e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.745 y[1] (analytic) = 0.30946019773309752542259196996232 y[1] (numeric) = 0.30946019773309752542259196996225 absolute error = 7e-32 relative error = 2.2620033371908276495014295848979e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.746 y[1] (analytic) = 0.31009941716086135212782993487774 y[1] (numeric) = 0.31009941716086135212782993487766 absolute error = 8e-32 relative error = 2.5798178123792055321962140885037e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.747 y[1] (analytic) = 0.31073872036559114078813789742375 y[1] (numeric) = 0.31073872036559114078813789742368 absolute error = 7e-32 relative error = 2.2526964105935499425425984482387e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.748 y[1] (analytic) = 0.31137810663806334647140216086677 y[1] (numeric) = 0.31137810663806334647140216086669 absolute error = 8e-32 relative error = 2.5692236639164108447880977384569e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.749 y[1] (analytic) = 0.31201757526857755010594379753783 y[1] (numeric) = 0.31201757526857755010594379753774 absolute error = 9e-32 relative error = 2.8844529005306855121205428611928e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.75 y[1] (analytic) = 0.31265712554695723849507260095631 y[1] (numeric) = 0.31265712554695723849507260095622 absolute error = 9e-32 relative error = 2.8785526586849885059968149549554e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.751 y[1] (analytic) = 0.31329675676255058520147118035557 y[1] (numeric) = 0.31329675676255058520147118035549 absolute error = 8e-32 relative error = 2.5534895677401620967115526338853e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.752 y[1] (analytic) = 0.31393646820423123230055760536729 y[1] (numeric) = 0.3139364682042312323005576053672 absolute error = 9e-32 relative error = 2.8668220839335728049657290510098e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.753 y[1] (analytic) = 0.31457625916039907300197374597745 y[1] (numeric) = 0.31457625916039907300197374597736 absolute error = 9e-32 relative error = 2.8609914886841464325142414894894e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.754 y[1] (analytic) = 0.31521612891898103513834519114737 y[1] (numeric) = 0.31521612891898103513834519114727 absolute error = 1.0e-31 relative error = 3.1724264980648458853858279765967e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.755 y[1] (analytic) = 0.31585607676743186552045736869836 y[1] (numeric) = 0.31585607676743186552045736869827 absolute error = 9e-32 relative error = 2.8493990339235404918532209251107e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.756 y[1] (analytic) = 0.31649610199273491515799122919235 y[1] (numeric) = 0.31649610199273491515799122919225 absolute error = 1.0e-31 relative error = 3.1595965754515192644842610229939e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.757 y[1] (analytic) = 0.31713620388140292534496059760203 y[1] (numeric) = 0.31713620388140292534496059760194 absolute error = 9e-32 relative error = 2.8378973733839808672697621393563e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.758 y[1] (analytic) = 0.31777638171947881460899203855742 y[1] (numeric) = 0.31777638171947881460899203855732 absolute error = 1.0e-31 relative error = 3.1468669716390781148487165562748e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.759 y[1] (analytic) = 0.31841663479253646652358682387959 y[1] (numeric) = 0.31841663479253646652358682387949 absolute error = 1.0e-31 relative error = 3.1405394402574080631743334504910e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.76 y[1] (analytic) = 0.31905696238568151838250333497186 y[1] (numeric) = 0.31905696238568151838250333497177 absolute error = 9e-32 relative error = 2.8208129146295343713976265743692e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.761 y[1] (analytic) = 0.31969736378355215073539697743212 y[1] (numeric) = 0.31969736378355215073539697743203 absolute error = 9e-32 relative error = 2.8151624065606491776723454133523e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.762 y[1] (analytic) = 0.32033783827031987778385343098173 y[1] (numeric) = 0.32033783827031987778385343098163 absolute error = 1.0e-31 relative error = 3.1217042775825354768316708938434e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.763 y[1] (analytic) = 0.32097838512969033863694980447646 y[1] (numeric) = 0.32097838512969033863694980447635 absolute error = 1.1e-31 relative error = 3.4270220393673809256600068059562e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.764 y[1] (analytic) = 0.32161900364490408942547701337551 y[1] (numeric) = 0.3216190036449040894254770133754 absolute error = 1.1e-31 relative error = 3.4201959073739858359620514784425e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.765 y[1] (analytic) = 0.32225969309873739627395544559739 y[1] (numeric) = 0.3222596930987373962739554455973 absolute error = 9e-32 relative error = 2.7927786790396039533936153700098e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.766 y[1] (analytic) = 0.32290045277350302912957473118795 y[1] (numeric) = 0.32290045277350302912957473118785 absolute error = 1.0e-31 relative error = 3.0969296927602798823229900826773e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.767 y[1] (analytic) = 0.32354128195105105644718718166742 y[1] (numeric) = 0.32354128195105105644718718166731 absolute error = 1.1e-31 relative error = 3.3998752597092704298986918743302e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.768 y[1] (analytic) = 0.32418217991276964072948321631286 y[1] (numeric) = 0.32418217991276964072948321631275 absolute error = 1.1e-31 relative error = 3.3931538133773609215689500632380e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.769 y[1] (analytic) = 0.32482314593958583492147584496933 y[1] (numeric) = 0.32482314593958583492147584496923 absolute error = 1.0e-31 relative error = 3.0785983465168179508886923618399e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=236.5MB, alloc=4.4MB, time=11.26 TOP MAIN SOLVE Loop x[1] = 1.77 y[1] (analytic) = 0.32546417931196637965842003027136 y[1] (numeric) = 0.32546417931196637965842003027126 absolute error = 1.0e-31 relative error = 3.0725347474920502954956751679109e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.771 y[1] (analytic) = 0.32610527930991850136629150639599 y[1] (numeric) = 0.32610527930991850136629150639589 absolute error = 1.0e-31 relative error = 3.0664943607050184038330656841933e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.772 y[1] (analytic) = 0.32674644521299071121394838666243 y[1] (numeric) = 0.32674644521299071121394838666233 absolute error = 1.0e-31 relative error = 3.0604770599666258475856855766388e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.773 y[1] (analytic) = 0.32738767630027360491609764844159 y[1] (numeric) = 0.32738767630027360491609764844149 absolute error = 1.0e-31 relative error = 3.0544827199995746404082736677618e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.774 y[1] (analytic) = 0.32802897185040066338618734094476 y[1] (numeric) = 0.32802897185040066338618734094465 absolute error = 1.1e-31 relative error = 3.3533623380731772107053125894021e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.775 y[1] (analytic) = 0.32867033114154905423834411952443 y[1] (numeric) = 0.32867033114154905423834411952434 absolute error = 9e-32 relative error = 2.7383061832021441252411877483302e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.776 y[1] (analytic) = 0.32931175345144043413747446914495 y[1] (numeric) = 0.32931175345144043413747446914485 absolute error = 1.0e-31 relative error = 3.0366362254587968625015911357199e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.777 y[1] (analytic) = 0.32995323805734175199664673966582 y[1] (numeric) = 0.32995323805734175199664673966572 absolute error = 1.0e-31 relative error = 3.0307324937548043973883756597390e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.778 y[1] (analytic) = 0.33059478423606605302086987653102 y[1] (numeric) = 0.33059478423606605302086987653092 absolute error = 1.0e-31 relative error = 3.0248511098285668582326224661293e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.779 y[1] (analytic) = 0.33123639126397328359638349237105 y[1] (numeric) = 0.33123639126397328359638349237094 absolute error = 1.1e-31 relative error = 3.3208911490747810342872712213669e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.78 y[1] (analytic) = 0.33187805841697109702457268790621 y[1] (numeric) = 0.3318780584169710970245726879061 absolute error = 1.1e-31 relative error = 3.3144703968888525994502001632745e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.781 y[1] (analytic) = 0.3325197849705156600996197943887 y[1] (numeric) = 0.3325197849705156600996197943886 absolute error = 1.0e-31 relative error = 3.0073398492323379503891006476102e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.782 y[1] (analytic) = 0.33316157019961246052900397464052 y[1] (numeric) = 0.33316157019961246052900397464042 absolute error = 1.0e-31 relative error = 3.0015466651836641446072616728574e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.783 y[1] (analytic) = 0.3338034133788171151959583855349 y[1] (numeric) = 0.3338034133788171151959583855348 absolute error = 1.0e-31 relative error = 2.9957752375202618636709007160144e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.784 y[1] (analytic) = 0.33444531378223617926299337153327 y[1] (numeric) = 0.33444531378223617926299337153317 absolute error = 1.0e-31 relative error = 2.9900254504720594356890437468196e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.785 y[1] (analytic) = 0.33508727068352795611559292662831 y[1] (numeric) = 0.3350872706835279561155929266282 absolute error = 1.1e-31 relative error = 3.2827269079967269007006359753894e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.786 y[1] (analytic) = 0.33572928335590330814519043075898 y[1] (numeric) = 0.33572928335590330814519043075888 absolute error = 1.0e-31 relative error = 2.9785903392284963258902655069939e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.787 y[1] (analytic) = 0.33637135107212646837052843645697 y[1] (numeric) = 0.33637135107212646837052843645687 absolute error = 1.0e-31 relative error = 2.9729047875589585418394809014191e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.788 y[1] (analytic) = 0.33701347310451585289650605215639 y[1] (numeric) = 0.33701347310451585289650605215629 absolute error = 1.0e-31 relative error = 2.9672404215420679534480884622910e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.789 y[1] (analytic) = 0.33765564872494487420961624025343 y[1] (numeric) = 0.33765564872494487420961624025334 absolute error = 9e-32 relative error = 2.6654374164880097234164887971074e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.79 y[1] (analytic) = 0.33829787720484275530907412063943 y[1] (numeric) = 0.33829787720484275530907412063934 absolute error = 9e-32 relative error = 2.6603773202367479816047840891007e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.791 y[1] (analytic) = 0.33894015781519534467273614405256 y[1] (numeric) = 0.33894015781519534467273614405247 absolute error = 9e-32 relative error = 2.6553359914664300495222877803312e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.792 y[1] (analytic) = 0.33958248982654593205690877420123 y[1] (numeric) = 0.33958248982654593205690877420113 absolute error = 1.0e-31 relative error = 2.9447925907804794473341335076267e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.793 y[1] (analytic) = 0.34022487250899606512914409320785 y[1] (numeric) = 0.34022487250899606512914409320775 absolute error = 1.0e-31 relative error = 2.9392324923967999225826790989445e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.794 y[1] (analytic) = 0.34086730513220636693311852150651 y[1] (numeric) = 0.3408673051322063669331185215064 absolute error = 1.1e-31 relative error = 3.2270622128847524081764221605492e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.795 y[1] (analytic) = 0.34150978696539735418468962090394 y[1] (numeric) = 0.34150978696539735418468962090384 absolute error = 1.0e-31 relative error = 2.9281737688569451153370295450900e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=240.3MB, alloc=4.4MB, time=11.44 x[1] = 1.796 y[1] (analytic) = 0.34215231727735025639822472808202 y[1] (numeric) = 0.34215231727735025639822472808192 absolute error = 1.0e-31 relative error = 2.9226749301522203596640210241416e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.797 y[1] (analytic) = 0.34279489533640783584229394538225 y[1] (numeric) = 0.34279489533640783584229394538215 absolute error = 1.0e-31 relative error = 2.9171962990249090679074463732408e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.798 y[1] (analytic) = 0.3434375204104752083238187962718 y[1] (numeric) = 0.3434375204104752083238187962717 absolute error = 1.0e-31 relative error = 2.9117377705406323457407980511708e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.799 y[1] (analytic) = 0.34408019176702066479976663444615 y[1] (numeric) = 0.34408019176702066479976663444606 absolute error = 9e-32 relative error = 2.6156693164406188730794018577080e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.8 y[1] (analytic) = 0.34472290867307649381547967807885 y[1] (numeric) = 0.34472290867307649381547967807876 absolute error = 9e-32 relative error = 2.6107925448422386476212729929495e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.801 y[1] (analytic) = 0.34536567039523980476872632428406 y[1] (numeric) = 0.34536567039523980476872632428397 absolute error = 9e-32 relative error = 2.6059335861900556536322082900395e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.802 y[1] (analytic) = 0.34600847619967335199856118341609 y[1] (numeric) = 0.346008476199673351998561183416 absolute error = 9e-32 relative error = 2.6010923486181626715225363037156e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.803 y[1] (analytic) = 0.34665132535210635969807905839134 y[1] (numeric) = 0.34665132535210635969807905839125 absolute error = 9e-32 relative error = 2.5962687408906839310280035019456e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.804 y[1] (analytic) = 0.34729421711783534765014688078559 y[1] (numeric) = 0.34729421711783534765014688078551 absolute error = 8e-32 relative error = 2.3035223754634637065303352894347e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.805 y[1] (analytic) = 0.34793715076172495778519640303393 y[1] (numeric) = 0.34793715076172495778519640303384 absolute error = 9e-32 relative error = 2.5866740531434076989630882856989e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.806 y[1] (analytic) = 0.34858012554820878156015923464316 y[1] (numeric) = 0.34858012554820878156015923464307 absolute error = 9e-32 relative error = 2.5819027937538843195073499107720e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.807 y[1] (analytic) = 0.34922314074129018815762459992048 y[1] (numeric) = 0.3492231407412901881576245999204 absolute error = 8e-32 relative error = 2.2907989381856346176862285506805e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.808 y[1] (analytic) = 0.3498661956045431535042989853266 y[1] (numeric) = 0.34986619560454315350429898532652 absolute error = 8e-32 relative error = 2.2865884445270815918042846870869e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.809 y[1] (analytic) = 0.35050928940111309010784563618034 y[1] (numeric) = 0.35050928940111309010784563618025 absolute error = 9e-32 relative error = 2.5676922900895360039262623600792e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.81 y[1] (analytic) = 0.35115242139371767771118065507547 y[1] (numeric) = 0.35115242139371767771118065507538 absolute error = 9e-32 relative error = 2.5629895884753296097239740795256e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.811 y[1] (analytic) = 0.35179559084464769476330124802071 y[1] (numeric) = 0.35179559084464769476330124802063 absolute error = 8e-32 relative error = 2.2740478301027899255990990665916e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.812 y[1] (analytic) = 0.35243879701576785070572045898232 y[1] (numeric) = 0.35243879701576785070572045898224 absolute error = 8e-32 relative error = 2.2698976581860497969196560318860e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.813 y[1] (analytic) = 0.353082039168517619073581529197 y[1] (numeric) = 0.35308203916851761907358152919691 absolute error = 9e-32 relative error = 2.5489826730338200773801668543865e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.814 y[1] (analytic) = 0.35372531656391207141052381433298 y[1] (numeric) = 0.3537253165639120714105238143329 absolute error = 8e-32 relative error = 2.2616419083915181989690803773201e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.815 y[1] (analytic) = 0.35436862846254271199637099030983 y[1] (numeric) = 0.35436862846254271199637099030974 absolute error = 9e-32 relative error = 2.5397282030994776129130074048185e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.816 y[1] (analytic) = 0.35501197412457831338671107734462 y[1] (numeric) = 0.35501197412457831338671107734453 absolute error = 9e-32 relative error = 2.5351257579953579505060041485146e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.817 y[1] (analytic) = 0.35565535280976575276343661157669 y[1] (numeric) = 0.35565535280976575276343661157661 absolute error = 8e-32 relative error = 2.2493686477085217706658760275733e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.818 y[1] (analytic) = 0.35629876377743084909531209443377 y[1] (numeric) = 0.35629876377743084909531209443368 absolute error = 9e-32 relative error = 2.5259700327284969346541664734930e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.819 y[1] (analytic) = 0.3569422062864792011076346517436 y[1] (numeric) = 0.35694220628647920110763465174352 absolute error = 8e-32 relative error = 2.2412591896121296955417270900483e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.82 y[1] (analytic) = 0.35758567959539702606005263746731 y[1] (numeric) = 0.35758567959539702606005263746723 absolute error = 8e-32 relative error = 2.2372260569975517924463631782166e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.821 y[1] (analytic) = 0.35822918296225199933160572083436 y[1] (numeric) = 0.35822918296225199933160572083428 absolute error = 8e-32 relative error = 2.2332072261245648092953192106471e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.822 y[1] (analytic) = 0.35887271564469409481204880059847 y[1] (numeric) = 0.35887271564469409481204880059839 absolute error = 8e-32 relative error = 2.2292026256798214126830597355228e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=244.1MB, alloc=4.4MB, time=11.62 x[1] = 1.823 y[1] (analytic) = 0.35951627689995642609852089610736 y[1] (numeric) = 0.35951627689995642609852089610727 absolute error = 9e-32 relative error = 2.5033637079259291843305566025424e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.824 y[1] (analytic) = 0.36015986598485608849661897189134 y[1] (numeric) = 0.36015986598485608849661897189125 absolute error = 9e-32 relative error = 2.4988903123310329467598073241058e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.825 y[1] (analytic) = 0.36080348215579500182493546052595 y[1] (numeric) = 0.36080348215579500182493546052587 absolute error = 8e-32 relative error = 2.2172735008542957212592088030705e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.826 y[1] (analytic) = 0.36144712466876075402211705761492 y[1] (numeric) = 0.36144712466876075402211705761484 absolute error = 8e-32 relative error = 2.2133251183921856988629694703460e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.827 y[1] (analytic) = 0.36209079277932744555550117287262 y[1] (numeric) = 0.36209079277932744555550117287255 absolute error = 7e-32 relative error = 1.9332167897088946066630732722821e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.828 y[1] (analytic) = 0.36273448574265653463038523246212 y[1] (numeric) = 0.36273448574265653463038523246204 absolute error = 8e-32 relative error = 2.2054699275755194501433687203025e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.829 y[1] (analytic) = 0.36337820281349768319898283996629 y[1] (numeric) = 0.3633782028134976831989828399662 absolute error = 9e-32 relative error = 2.4767583554314653579929928061671e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.83 y[1] (analytic) = 0.3640219432461896037681196166385 y[1] (numeric) = 0.36402194324618960376811961663842 absolute error = 8e-32 relative error = 2.1976697142648803559403353053070e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.831 y[1] (analytic) = 0.36466570629466090700472035589622 y[1] (numeric) = 0.36466570629466090700472035589613 absolute error = 9e-32 relative error = 2.4680138122798221436634076191379e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.832 y[1] (analytic) = 0.36530949121243095013813794238737 y[1] (numeric) = 0.36530949121243095013813794238729 absolute error = 8e-32 relative error = 2.1899239391368355575489503380543e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.833 y[1] (analytic) = 0.36595329725261068615837330237852 y[1] (numeric) = 0.36595329725261068615837330237844 absolute error = 8e-32 relative error = 2.1860712992777737676682687001314e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.834 y[1] (analytic) = 0.36659712366790351380923446968436 y[1] (numeric) = 0.36659712366790351380923446968427 absolute error = 9e-32 relative error = 2.4550110786338317066930854614520e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.835 y[1] (analytic) = 0.36724096971060612837548166988487 y[1] (numeric) = 0.36724096971060612837548166988479 absolute error = 8e-32 relative error = 2.1784061855364814007631042843342e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.836 y[1] (analytic) = 0.36788483463260937326300414515851 y[1] (numeric) = 0.36788483463260937326300414515844 absolute error = 7e-32 relative error = 1.9027693835193278253699505749807e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.837 y[1] (analytic) = 0.36852871768539909237107326269956 y[1] (numeric) = 0.36852871768539909237107326269948 absolute error = 8e-32 relative error = 2.1707941921718399789208928511801e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.838 y[1] (analytic) = 0.36917261812005698325571527138756 y[1] (numeric) = 0.36917261812005698325571527138749 absolute error = 7e-32 relative error = 1.8961319600695740576818743631301e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.839 y[1] (analytic) = 0.36981653518726145108324589413698 y[1] (numeric) = 0.36981653518726145108324589413691 absolute error = 7e-32 relative error = 1.8928304534721407809097788603248e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.84 y[1] (analytic) = 0.37046046813728846337300776717753 y[1] (numeric) = 0.37046046813728846337300776717746 absolute error = 7e-32 relative error = 1.8895403429134250023139033422172e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.841 y[1] (analytic) = 0.37110441622001240552835056240303 y[1] (numeric) = 0.37110441622001240552835056240297 absolute error = 6e-32 relative error = 1.6167956342623659408520797168573e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.842 y[1] (analytic) = 0.37174837868490693715489245487847 y[1] (numeric) = 0.37174837868490693715489245487841 absolute error = 6e-32 relative error = 1.6139949342147867368057172221589e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.843 y[1] (analytic) = 0.37239235478104584916510042461462 y[1] (numeric) = 0.37239235478104584916510042461456 absolute error = 6e-32 relative error = 1.6112038614562314881761209826285e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.844 y[1] (analytic) = 0.37303634375710392166822570980793 y[1] (numeric) = 0.37303634375710392166822570980787 absolute error = 6e-32 relative error = 1.6084223696731262353748075940793e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.845 y[1] (analytic) = 0.37368034486135778264462955790152 y[1] (numeric) = 0.37368034486135778264462955790145 absolute error = 7e-32 relative error = 1.8732588149898886327315176447742e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.846 y[1] (analytic) = 0.37432435734168676740353325105362 y[1] (numeric) = 0.37432435734168676740353325105355 absolute error = 7e-32 relative error = 1.8700359361360860256636214911364e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.847 y[1] (analytic) = 0.37496838044557377882322521390347 y[1] (numeric) = 0.3749683804455737788232252139034 absolute error = 7e-32 relative error = 1.8668240750545209771548867233070e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.848 y[1] (analytic) = 0.375612413420106148372756843903 y[1] (numeric) = 0.37561241342010614837275684390294 absolute error = 6e-32 relative error = 1.5973912963545379290868379533138e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.849 y[1] (analytic) = 0.37625645551197649791415753793801 y[1] (numeric) = 0.37625645551197649791415753793796 absolute error = 5e-32 relative error = 1.3288808542026055981422984695364e-29 % Correct digits = 30 h = 0.001 memory used=247.9MB, alloc=4.4MB, time=11.80 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.85 y[1] (analytic) = 0.37690050596748360228419822349535 y[1] (numeric) = 0.37690050596748360228419822349529 absolute error = 6e-32 relative error = 1.5919320629719820437071362455536e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.851 y[1] (analytic) = 0.37754456403253325265473153824538 y[1] (numeric) = 0.37754456403253325265473153824533 absolute error = 5e-32 relative error = 1.3243469715456284132121089458566e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.852 y[1] (analytic) = 0.37818862895263912067063563860305 y[1] (numeric) = 0.37818862895263912067063563860299 absolute error = 6e-32 relative error = 1.5865098896856005246002329994807e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.853 y[1] (analytic) = 0.37883269997292362336438745560664 y[1] (numeric) = 0.37883269997292362336438745560659 absolute error = 5e-32 relative error = 1.3198438256141473228750220771175e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.854 y[1] (analytic) = 0.37947677633811878884629005531502 y[1] (numeric) = 0.37947677633811878884629005531498 absolute error = 4e-32 relative error = 1.0540829503716315685068955737552e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.855 y[1] (analytic) = 0.38012085729256712276937760086966 y[1] (numeric) = 0.3801208572925671227693776008696 absolute error = 6e-32 relative error = 1.5784453509695175322046268264663e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.856 y[1] (analytic) = 0.38076494208022247556802025440202 y[1] (numeric) = 0.38076494208022247556802025440196 absolute error = 6e-32 relative error = 1.5757753240674857155423382660445e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.857 y[1] (analytic) = 0.38140902994465091046925019908975 y[1] (numeric) = 0.38140902994465091046925019908969 absolute error = 6e-32 relative error = 1.5731143022153157840951445570306e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.858 y[1] (analytic) = 0.38205312012903157227582880487737 y[1] (numeric) = 0.38205312012903157227582880487732 absolute error = 5e-32 relative error = 1.3087185358704412351091814390372e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.859 y[1] (analytic) = 0.38269721187615755692007380568308 y[1] (numeric) = 0.38269721187615755692007380568303 absolute error = 5e-32 relative error = 1.3065159203767654400949149268156e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.86 y[1] (analytic) = 0.38334130442843678178746420131093 y[1] (numeric) = 0.38334130442843678178746420131088 absolute error = 5e-32 relative error = 1.3043207038320635420790201886196e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.861 y[1] (analytic) = 0.38398539702789285680903944378184 y[1] (numeric) = 0.38398539702789285680903944378178 absolute error = 6e-32 relative error = 1.5625594219053485354006279100710e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.862 y[1] (analytic) = 0.38462948891616595632160831538628 y[1] (numeric) = 0.38462948891616595632160831538623 absolute error = 5e-32 relative error = 1.2999523292115032301824995233922e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.863 y[1] (analytic) = 0.38527357933451369169478175445024 y[1] (numeric) = 0.38527357933451369169478175445018 absolute error = 6e-32 relative error = 1.5573349229822223176845671918565e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.864 y[1] (analytic) = 0.38591766752381198472384273459316 y[1] (numeric) = 0.38591766752381198472384273459311 absolute error = 5e-32 relative error = 1.2956131374035859080334430515862e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.865 y[1] (analytic) = 0.38656175272455594178746515414624 y[1] (numeric) = 0.3865617527245559417874651541462 absolute error = 4e-32 relative error = 1.0347635201380604854539642094662e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.866 y[1] (analytic) = 0.38720583417686072876929254439034 y[1] (numeric) = 0.3872058341768607287692925443903 absolute error = 4e-32 relative error = 1.0330422857660129895923189435299e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.867 y[1] (analytic) = 0.38784991112046244674238625836914 y[1] (numeric) = 0.38784991112046244674238625836909 absolute error = 5e-32 relative error = 1.2891584751316465194366337020081e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.868 y[1] (analytic) = 0.3884939827947190084155516562345 y[1] (numeric) = 0.38849398279471900841555165623445 absolute error = 5e-32 relative error = 1.2870212207744823486514923576458e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.869 y[1] (analytic) = 0.38913804843861101534054965839003 y[1] (numeric) = 0.38913804843861101534054965838999 absolute error = 4e-32 relative error = 1.0279128489361854989993233416633e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.87 y[1] (analytic) = 0.3897821072907426358791998941164 y[1] (numeric) = 0.38978210729074263587919989411635 absolute error = 5e-32 relative error = 1.2827679635562251733999417902932e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.871 y[1] (analytic) = 0.39042615858934248392938053088995 y[1] (numeric) = 0.39042615858934248392938053088991 absolute error = 4e-32 relative error = 1.0245215162970866945507775404813e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.872 y[1] (analytic) = 0.39107020157226449840892872824647 y[1] (numeric) = 0.39107020157226449840892872824643 absolute error = 4e-32 relative error = 1.0228342594036416126395346094551e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.873 y[1] (analytic) = 0.39171423547698882349644451979451 y[1] (numeric) = 0.39171423547698882349644451979446 absolute error = 5e-32 relative error = 1.2764407180432236363266346326874e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.874 y[1] (analytic) = 0.39235825954062268962799978785151 y[1] (numeric) = 0.39235825954062268962799978785148 absolute error = 3e-32 relative error = 7.6460732686306453011867116039733e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.875 y[1] (analytic) = 0.39300227299990129524875285716048 y[1] (numeric) = 0.39300227299990129524875285716044 absolute error = 4e-32 relative error = 1.0178058181360708371019956303817e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=251.7MB, alloc=4.5MB, time=11.98 x[1] = 1.876 y[1] (analytic) = 0.39364627509118868931846809724688 y[1] (numeric) = 0.39364627509118868931846809724684 absolute error = 4e-32 relative error = 1.0161406961296393869262002193007e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.877 y[1] (analytic) = 0.39429026505047865456993878719867 y[1] (numeric) = 0.39429026505047865456993878719863 absolute error = 4e-32 relative error = 1.0144810446912514103722030443268e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.878 y[1] (analytic) = 0.39493424211339559151931036199412 y[1] (numeric) = 0.39493424211339559151931036199407 absolute error = 5e-32 relative error = 1.2660335485836079437119818643095e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.879 y[1] (analytic) = 0.39557820551519540322730002596851 y[1] (numeric) = 0.39557820551519540322730002596847 absolute error = 4e-32 relative error = 1.0111780538542200898302235323338e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.88 y[1] (analytic) = 0.39622215449076638081030758660006 y[1] (numeric) = 0.39622215449076638081030758660002 absolute error = 4e-32 relative error = 1.0095346650014787566741610767016e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.881 y[1] (analytic) = 0.39686608827463008970041123051019 y[1] (numeric) = 0.39686608827463008970041123051015 absolute error = 4e-32 relative error = 1.0078966478063029996259373543014e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.882 y[1] (analytic) = 0.39751000610094225665324083341597 y[1] (numeric) = 0.39751000610094225665324083341594 absolute error = 3e-32 relative error = 7.5469798343596684824160963414898e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.883 y[1] (analytic) = 0.39815390720349365750272026674286 y[1] (numeric) = 0.39815390720349365750272026674281 absolute error = 5e-32 relative error = 1.2557957888994255727354746038814e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.884 y[1] (analytic) = 0.39879779081571100566166903570641 y[1] (numeric) = 0.39879779081571100566166903570637 absolute error = 4e-32 relative error = 1.0030145833602286650432739520355e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.885 y[1] (analytic) = 0.3994416561706578413672524569048 y[1] (numeric) = 0.39944165617065784136725245690476 absolute error = 4e-32 relative error = 1.0013978107208318084693960499607e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.886 y[1] (analytic) = 0.4000855025010354216702684578282 y[1] (numeric) = 0.40008550250103542167026845782816 absolute error = 4e-32 relative error = 9.9978628942938215965545396217214e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.887 y[1] (analytic) = 0.40072932903918361116725795619214 y[1] (numeric) = 0.4007293290391836111672579561921 absolute error = 4e-32 relative error = 9.9817999585672378666203136179761e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.888 y[1] (analytic) = 0.40137313501708177347442465363741 y[1] (numeric) = 0.40137313501708177347442465363737 absolute error = 4e-32 relative error = 9.9657890651544644329400202710641e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.889 y[1] (analytic) = 0.40201691966634966344234895611302 y[1] (numeric) = 0.40201691966634966344234895611298 absolute error = 4e-32 relative error = 9.9498299805882899697721416831235e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.89 y[1] (analytic) = 0.40266068221824832011047961217139 y[1] (numeric) = 0.40266068221824832011047961217136 absolute error = 3e-32 relative error = 7.4504418545984422217639908131915e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.891 y[1] (analytic) = 0.40330442190368096040038554045856 y[1] (numeric) = 0.40330442190368096040038554045852 absolute error = 4e-32 relative error = 9.9180663110986137954379024533341e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.892 y[1] (analytic) = 0.40394813795319387354674919887729 y[1] (numeric) = 0.40394813795319387354674919887725 absolute error = 4e-32 relative error = 9.9022612661813692850788993151220e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.893 y[1] (analytic) = 0.40459182959697731626508173024059 y[1] (numeric) = 0.40459182959697731626508173024055 absolute error = 4e-32 relative error = 9.8865071101027586945538789404163e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.894 y[1] (analytic) = 0.40523549606486640865513900271689 y[1] (numeric) = 0.40523549606486640865513900271685 absolute error = 4e-32 relative error = 9.8708036162748102867871532128422e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.895 y[1] (analytic) = 0.4058791365863420308390165479991 y[1] (numeric) = 0.40587913658634203083901654799907 absolute error = 3e-32 relative error = 7.3913629195912481075614219612776e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.896 y[1] (analytic) = 0.40652275039053172033290028590876 y[1] (numeric) = 0.40652275039053172033290028590873 absolute error = 3e-32 relative error = 7.3796607868022352438009400078044e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.897 y[1] (analytic) = 0.40716633670621057015144881107472 y[1] (numeric) = 0.40716633670621057015144881107468 absolute error = 4e-32 relative error = 9.8239948625374347916683715902844e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.898 y[1] (analytic) = 0.40780989476180212764378190540556 y[1] (numeric) = 0.40780989476180212764378190540552 absolute error = 4e-32 relative error = 9.8084917785929688456536901474954e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.899 y[1] (analytic) = 0.40845342378537929406004882930701 y[1] (numeric) = 0.40845342378537929406004882930697 absolute error = 4e-32 relative error = 9.7930382439437912049726291701259e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.9 y[1] (analytic) = 0.4090969230046652248475488349816 y[1] (numeric) = 0.40909692300466522484754883498156 absolute error = 4e-32 relative error = 9.7776340399274651565313559981863e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.901 y[1] (analytic) = 0.40974039164703423067537523668985 y[1] (numeric) = 0.4097403916470342306753752366898 absolute error = 5e-32 relative error = 1.2202848686460933230543377946318e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.902 y[1] (analytic) = 0.41038382893951267918655326555071 y[1] (numeric) = 0.41038382893951267918655326555067 absolute error = 4e-32 relative error = 9.7469727555701720109105418373192e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=255.5MB, alloc=4.5MB, time=12.17 TOP MAIN SOLVE Loop x[1] = 1.903 y[1] (analytic) = 0.41102723410877989747664083031663 y[1] (numeric) = 0.41102723410877989747664083031659 absolute error = 4e-32 relative error = 9.7317152443027291312110147276482e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.904 y[1] (analytic) = 0.41167060638116907529776020057531 y[1] (numeric) = 0.41167060638116907529776020057526 absolute error = 5e-32 relative error = 1.2145632752245761250489409406746e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.905 y[1] (analytic) = 0.41231394498266816898702752500966 y[1] (numeric) = 0.41231394498266816898702752500961 absolute error = 5e-32 relative error = 1.2126681769665048799598394927861e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.906 y[1] (analytic) = 0.41295724913892080611834599468874 y[1] (numeric) = 0.4129572491389208061183459946887 absolute error = 4e-32 relative error = 9.6862326750301960398204373235185e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.907 y[1] (analytic) = 0.41360051807522719087652735986883 y[1] (numeric) = 0.41360051807522719087652735986878 absolute error = 5e-32 relative error = 1.2088959712305247935457769023816e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.908 y[1] (analytic) = 0.41424375101654501015270540845569 y[1] (numeric) = 0.41424375101654501015270540845565 absolute error = 4e-32 relative error = 9.6561504915501764372572297666888e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.909 y[1] (analytic) = 0.41488694718749034036000391511914 y[1] (numeric) = 0.41488694718749034036000391511911 absolute error = 3e-32 relative error = 7.2308854745538157923095533014805e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.91 y[1] (analytic) = 0.41553010581233855496842047205876 y[1] (numeric) = 0.41553010581233855496842047205872 absolute error = 4e-32 relative error = 9.6262579872046081881864919947110e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.911 y[1] (analytic) = 0.41617322611502523275788651559876 y[1] (numeric) = 0.41617322611502523275788651559873 absolute error = 3e-32 relative error = 7.2085367624558250199755450579195e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.912 y[1] (analytic) = 0.41681630731914706678846276714083 y[1] (numeric) = 0.41681630731914706678846276714079 absolute error = 4e-32 relative error = 9.5965535171283212144816359062520e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.913 y[1] (analytic) = 0.41745934864796277408662821252703 y[1] (numeric) = 0.417459348647962774086628212527 absolute error = 3e-32 relative error = 7.1863284645946571846405182320683e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.914 y[1] (analytic) = 0.41810234932439400604661965056435 y[1] (numeric) = 0.41810234932439400604661965056432 absolute error = 3e-32 relative error = 7.1752765915993054656542158431543e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.915 y[1] (analytic) = 0.41874530857102625954577774933671 y[1] (numeric) = 0.41874530857102625954577774933669 absolute error = 2e-32 relative error = 4.7761729124202625020858597060441e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.916 y[1] (analytic) = 0.41938822561010978877285445798358 y[1] (numeric) = 0.41938822561010978877285445798356 absolute error = 2e-32 relative error = 4.7688510975492391666099794344428e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.917 y[1] (analytic) = 0.4200310996635605177682355318556 y[1] (numeric) = 0.42003109966356051776823553185557 absolute error = 3e-32 relative error = 7.1423282761751718555260924121443e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.918 y[1] (analytic) = 0.42067392995296095367503084037065 y[1] (numeric) = 0.42067392995296095367503084037063 absolute error = 2e-32 relative error = 4.7542760736887988577565049002854e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.919 y[1] (analytic) = 0.42131671569956110069998403948827 y[1] (numeric) = 0.42131671569956110069998403948824 absolute error = 3e-32 relative error = 7.1205340025941087943154646591213e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.92 y[1] (analytic) = 0.42195945612427937478315210449821 y[1] (numeric) = 0.42195945612427937478315210449816 absolute error = 5e-32 relative error = 1.1849479677325572422285782164484e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.921 y[1] (analytic) = 0.42260215044770351897530413378284 y[1] (numeric) = 0.42260215044770351897530413378281 absolute error = 3e-32 relative error = 7.0988753768096270050571012791972e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.922 y[1] (analytic) = 0.42324479789009151952198775036262 y[1] (numeric) = 0.42324479789009151952198775036259 absolute error = 3e-32 relative error = 7.0880965695390352404034665791487e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.923 y[1] (analytic) = 0.42388739767137252265321034537105 y[1] (numeric) = 0.42388739767137252265321034537102 absolute error = 3e-32 relative error = 7.0773512411091119171767836411226e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.924 y[1] (analytic) = 0.42452994901114775207768132613384 y[1] (numeric) = 0.42452994901114775207768132613381 absolute error = 3e-32 relative error = 7.0666392488630357092457161079702e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.925 y[1] (analytic) = 0.42517245112869142718056045124409 y[1] (numeric) = 0.42517245112869142718056045124405 absolute error = 4e-32 relative error = 9.4079472679411155904106385263378e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.926 y[1] (analytic) = 0.42581490324295168192365625593614 y[1] (numeric) = 0.42581490324295168192365625593611 absolute error = 3e-32 relative error = 7.0453147063486618795282564845086e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.927 y[1] (analytic) = 0.42645730457255148444701749316503 y[1] (numeric) = 0.426457304572551484447017493165 absolute error = 3e-32 relative error = 7.0347018748030893121700975938606e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.928 y[1] (analytic) = 0.42709965433578955737085943909755 y[1] (numeric) = 0.42709965433578955737085943909752 absolute error = 3e-32 relative error = 7.0241218168754902437649414010741e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.929 y[1] (analytic) = 0.42774195175064129879676583621756 y[1] (numeric) = 0.42774195175064129879676583621753 absolute error = 3e-32 relative error = 7.0135743939114389267527741746698e-30 % Correct digits = 31 h = 0.001 memory used=259.4MB, alloc=4.5MB, time=12.36 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.93 y[1] (analytic) = 0.4283841960347597040071061729421 y[1] (numeric) = 0.42838419603475970400710617294208 absolute error = 2e-32 relative error = 4.6687063120267796959013886292577e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.931 y[1] (analytic) = 0.42902638640547628786160692553902 y[1] (numeric) = 0.429026386405476287861606925539 absolute error = 2e-32 relative error = 4.6617179347793865451151475844975e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.932 y[1] (analytic) = 0.42966852207980200789001431623161 y[1] (numeric) = 0.42966852207980200789001431623158 absolute error = 3e-32 relative error = 6.9821265599782808412749740981374e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.933 y[1] (analytic) = 0.43031060227442818807978507067332 y[1] (numeric) = 0.43031060227442818807978507067328 absolute error = 4e-32 relative error = 9.2956110745535902360032354864085e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.934 y[1] (analytic) = 0.430952626205727443357740588477 y[1] (numeric) = 0.43095262620572744335774058847697 absolute error = 3e-32 relative error = 6.9613220051891852759761318897403e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.935 y[1] (analytic) = 0.43159459308975460476461887218989 y[1] (numeric) = 0.43159459308975460476461887218985 absolute error = 4e-32 relative error = 9.2679566983550190341785473132048e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.936 y[1] (analytic) = 0.43223650214224764532145749301894 y[1] (numeric) = 0.43223650214224764532145749301891 absolute error = 3e-32 relative error = 6.9406447283638012376323143490176e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.937 y[1] (analytic) = 0.43287835257862860658673980573354 y[1] (numeric) = 0.43287835257862860658673980573352 absolute error = 2e-32 relative error = 4.6202356576302052622004643314618e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.938 y[1] (analytic) = 0.43352014361400452590323556050356 y[1] (numeric) = 0.43352014361400452590323556050354 absolute error = 2e-32 relative error = 4.6133957774768359790985456130389e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.939 y[1] (analytic) = 0.43416187446316836433346599597385 y[1] (numeric) = 0.43416187446316836433346599597383 absolute error = 2e-32 relative error = 4.6065767577426187771148929152111e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.94 y[1] (analytic) = 0.43480354434059993528272243563156 y[1] (numeric) = 0.43480354434059993528272243563153 absolute error = 3e-32 relative error = 6.8996677673123418814201991745205e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.941 y[1] (analytic) = 0.43544515246046683380856634849181 y[1] (numeric) = 0.43544515246046683380856634849178 absolute error = 3e-32 relative error = 6.8895014287071752508651484876774e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.942 y[1] (analytic) = 0.43608669803662536661573777531224 y[1] (numeric) = 0.43608669803662536661573777531222 absolute error = 2e-32 relative error = 4.5862439946105100695095367641251e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.943 y[1] (analytic) = 0.43672818028262148273539796294854 y[1] (numeric) = 0.43672818028262148273539796294852 absolute error = 2e-32 relative error = 4.5795075525140896227729445796348e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.944 y[1] (analytic) = 0.43736959841169170488763099208297 y[1] (numeric) = 0.43736959841169170488763099208295 absolute error = 2e-32 relative error = 4.5727915412113753144381818242002e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.945 y[1] (analytic) = 0.43801095163676406152612812739794 y[1] (numeric) = 0.43801095163676406152612812739792 absolute error = 2e-32 relative error = 4.5660958762021323173534661143141e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.946 y[1] (analytic) = 0.43865223917045901956397756432724 y[1] (numeric) = 0.43865223917045901956397756432721 absolute error = 3e-32 relative error = 6.8391307101802083460305604232353e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.947 y[1] (analytic) = 0.43929346022509041777948119280136 y[1] (numeric) = 0.43929346022509041777948119280133 absolute error = 3e-32 relative error = 6.8291478740949711656124065949284e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.948 y[1] (analytic) = 0.4399346140126664009009189459108 y[1] (numeric) = 0.43993461401266640090091894591078 absolute error = 2e-32 relative error = 4.5461301209238718673330739846343e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.949 y[1] (analytic) = 0.44057569974489035436918025014426 y[1] (numeric) = 0.44057569974489035436918025014424 absolute error = 2e-32 relative error = 4.5395150053851677801558255728231e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.95 y[1] (analytic) = 0.44121671663316183977718104381848 y[1] (numeric) = 0.44121671663316183977718104381845 absolute error = 3e-32 relative error = 6.7993797308778578104772019285323e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.951 y[1] (analytic) = 0.44185766388857753098498378150491 y[1] (numeric) = 0.44185766388857753098498378150489 absolute error = 2e-32 relative error = 4.5263444847803669149591348542461e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.952 y[1] (analytic) = 0.44249854072193215090953679467618 y[1] (numeric) = 0.44249854072193215090953679467617 absolute error = 1e-32 relative error = 2.2598944583376693917763971561641e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.953 y[1] (analytic) = 0.44313934634371940898794833244427 y[1] (numeric) = 0.44313934634371940898794833244425 absolute error = 2e-32 relative error = 4.5132530354203919731655672696980e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.954 y[1] (analytic) = 0.44378007996413293931320956114423 y[1] (numeric) = 0.44378007996413293931320956114422 absolute error = 1e-32 relative error = 2.2533683803040949932814957629069e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.955 y[1] (analytic) = 0.4444207407930672394412797576329 y[1] (numeric) = 0.44442074079306723944127975763288 absolute error = 2e-32 relative error = 4.5002400122708203866569988020457e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=263.2MB, alloc=4.5MB, time=12.55 x[1] = 1.956 y[1] (analytic) = 0.4450613280401186098684458885226 y[1] (numeric) = 0.44506132804011860986844588852259 absolute error = 1e-32 relative error = 2.2468813554384088016752639055956e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.957 y[1] (analytic) = 0.44570184091458609417786772615849 y[1] (numeric) = 0.44570184091458609417786772615848 absolute error = 1e-32 relative error = 2.2436523886641049656848017786208e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.958 y[1] (analytic) = 0.44634227862547241985421861197334 y[1] (numeric) = 0.44634227862547241985421861197333 absolute error = 1e-32 relative error = 2.2404330664787952450878975475016e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.959 y[1] (analytic) = 0.44698264038148493976533093891993 y[1] (numeric) = 0.44698264038148493976533093891992 absolute error = 1e-32 relative error = 2.2372233497626059597621517339280e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.96 y[1] (analytic) = 0.44762292539103657430975438698765 y[1] (numeric) = 0.44762292539103657430975438698762 absolute error = 3e-32 relative error = 6.7020695988241568800129077505780e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.961 y[1] (analytic) = 0.44826313286224675422913390935892 y[1] (numeric) = 0.4482631328622467542291339093589 absolute error = 2e-32 relative error = 4.4616651546372180836786547964990e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.962 y[1] (analytic) = 0.44890326200294236408431343155466 y[1] (numeric) = 0.44890326200294236408431343155464 absolute error = 2e-32 relative error = 4.4553028888145857955365316211691e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.963 y[1] (analytic) = 0.44954331202065868639407019195543 y[1] (numeric) = 0.44954331202065868639407019195542 absolute error = 1e-32 relative error = 2.2244797625952561612007451927776e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.964 y[1] (analytic) = 0.45018328212264034643538361937078 y[1] (numeric) = 0.45018328212264034643538361937076 absolute error = 2e-32 relative error = 4.4426349876207835412960334880911e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.965 y[1] (analytic) = 0.45082317151584225770414161186157 y[1] (numeric) = 0.45082317151584225770414161186155 absolute error = 2e-32 relative error = 4.4363292003718990951362398750579e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.966 y[1] (analytic) = 0.45146297940693056803518605080318 y[1] (numeric) = 0.45146297940693056803518605080317 absolute error = 1e-32 relative error = 2.2150210440591635495567704305331e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.967 y[1] (analytic) = 0.45210270500228360638059835521041 y[1] (numeric) = 0.45210270500228360638059835521039 absolute error = 2e-32 relative error = 4.4237735759397808567317939713962e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.968 y[1] (analytic) = 0.45274234750799283024512485363063 y[1] (numeric) = 0.45274234750799283024512485363062 absolute error = 1e-32 relative error = 2.2087617946592586900066184459230e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.969 y[1] (analytic) = 0.45338190612986377377764072445146 y[1] (numeric) = 0.45338190612986377377764072445146 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.97 y[1] (analytic) = 0.45402138007341699651755023026287 y[1] (numeric) = 0.45402138007341699651755023026287 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.971 y[1] (analytic) = 0.45466076854388903279501994796511 y[1] (numeric) = 0.4546607685438890327950199479651 absolute error = 1e-32 relative error = 2.1994420218015107168288889142980e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.972 y[1] (analytic) = 0.45530007074623334178394067362222 y[1] (numeric) = 0.45530007074623334178394067362221 absolute error = 1e-32 relative error = 2.1963537109954927757956944356853e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.973 y[1] (analytic) = 0.45593928588512125820651265962889 y[1] (numeric) = 0.45593928588512125820651265962889 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.974 y[1] (analytic) = 0.4565784131649429436883478215869 y[1] (numeric) = 0.45657841316494294368834782158689 absolute error = 1e-32 relative error = 2.1902042916749576087651777343343e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.975 y[1] (analytic) = 0.45721745178980833876298153337797 y[1] (numeric) = 0.45721745178980833876298153337798 absolute error = 1e-32 relative error = 2.1871431111945377883455789398824e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.976 y[1] (analytic) = 0.45785640096354811552468561127419 y[1] (numeric) = 0.45785640096354811552468561127419 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.977 y[1] (analytic) = 0.45849525988971463092847307154504 y[1] (numeric) = 0.45849525988971463092847307154504 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.978 y[1] (analytic) = 0.45913402777158288073618423090629 y[1] (numeric) = 0.45913402777158288073618423090629 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.979 y[1] (analytic) = 0.45977270381215145410754270530734 y[1] (numeric) = 0.45977270381215145410754270530734 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.98 y[1] (analytic) = 0.46041128721414348883506884997581 y[1] (numeric) = 0.4604112872141434888350688499758 absolute error = 1e-32 relative error = 2.1719710784042671300142200294739e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.981 y[1] (analytic) = 0.46104977718000762722173717232959 y[1] (numeric) = 0.46104977718000762722173717232959 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.982 y[1] (analytic) = 0.46168817291191897260026323933036 y[1] (numeric) = 0.46168817291191897260026323933035 absolute error = 1e-32 relative error = 2.1659640828416463285223049306678e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=267.0MB, alloc=4.5MB, time=12.72 x[1] = 1.983 y[1] (analytic) = 0.46232647361178004649290459208859 y[1] (numeric) = 0.46232647361178004649290459208858 absolute error = 1e-32 relative error = 2.1629736930005646757182018404911e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.984 y[1] (analytic) = 0.46296467848122174641065917304187 y[1] (numeric) = 0.46296467848122174641065917304186 absolute error = 1e-32 relative error = 2.1599919961076703985612075569904e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.985 y[1] (analytic) = 0.46360278672160430429074376481446 y[1] (numeric) = 0.46360278672160430429074376481445 absolute error = 1e-32 relative error = 2.1570189581291382389951346113513e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.986 y[1] (analytic) = 0.46424079753401824557123393493046 y[1] (numeric) = 0.46424079753401824557123393493045 absolute error = 1e-32 relative error = 2.1540545452098548997241426755296e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.987 y[1] (analytic) = 0.46487871011928534890174597689562 y[1] (numeric) = 0.4648787101192853489017459768956 absolute error = 2e-32 relative error = 4.3021974473445146077980397492589e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.988 y[1] (analytic) = 0.46551652367795960648904033578503 y[1] (numeric) = 0.46551652367795960648904033578503 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.989 y[1] (analytic) = 0.46615423741032818507642500537843 y[1] (numeric) = 0.46615423741032818507642500537842 absolute error = 1e-32 relative error = 2.1452127209127110382245176128738e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.99 y[1] (analytic) = 0.46679185051641238755583638407047 y[1] (numeric) = 0.46679185051641238755583638407046 absolute error = 1e-32 relative error = 2.1422824732130580111649820135389e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.991 y[1] (analytic) = 0.46742936219596861521147407825518 y[1] (numeric) = 0.46742936219596861521147407825516 absolute error = 2e-32 relative error = 4.2787213678748424423150015463818e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.992 y[1] (analytic) = 0.46806677164848933059386514463855 y[1] (numeric) = 0.46806677164848933059386514463853 absolute error = 2e-32 relative error = 4.2728946405577537031497334832156e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.993 y[1] (analytic) = 0.46870407807320402102323226697699 y[1] (numeric) = 0.46870407807320402102323226697697 absolute error = 2e-32 relative error = 4.2670846992025365778269690628938e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.994 y[1] (analytic) = 0.46934128066908016272103936806964 y[1] (numeric) = 0.46934128066908016272103936806963 absolute error = 1e-32 relative error = 2.1306457394381061089616125777346e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.995 y[1] (analytic) = 0.46997837863482418556858716445347 y[1] (numeric) = 0.46997837863482418556858716445345 absolute error = 2e-32 relative error = 4.2555149149829531304969339062647e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.996 y[1] (analytic) = 0.47061537116888243849153017916084 y[1] (numeric) = 0.47061537116888243849153017916082 absolute error = 2e-32 relative error = 4.2497549432619170065112322366868e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.997 y[1] (analytic) = 0.47125225746944215546918573710329 y[1] (numeric) = 0.47125225746944215546918573710327 absolute error = 2e-32 relative error = 4.2440114997850972493164573779321e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.998 y[1] (analytic) = 0.47188903673443242216750447814176 y[1] (numeric) = 0.47188903673443242216750447814174 absolute error = 2e-32 relative error = 4.2382845209551900532815905025587e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.999 y[1] (analytic) = 0.47252570816152514319457093469585 y[1] (numeric) = 0.47252570816152514319457093469584 absolute error = 1e-32 relative error = 2.1162869717517389421000464861485e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2 y[1] (analytic) = 0.47316227094813600997750173383288 y[1] (numeric) = 0.47316227094813600997750173383287 absolute error = 1e-32 relative error = 2.1134398522438646073070479532776e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.001 y[1] (analytic) = 0.47379872429142546925960799816313 y[1] (numeric) = 0.47379872429142546925960799816312 absolute error = 1e-32 relative error = 2.1106008706450571843509798278164e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.002 y[1] (analytic) = 0.47443506738829969221668753555289 y[1] (numeric) = 0.47443506738829969221668753555289 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.003 y[1] (analytic) = 0.47507129943541154419131142465188 y[1] (numeric) = 0.47507129943541154419131142465187 absolute error = 1e-32 relative error = 2.1049471967437916947801417040253e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.004 y[1] (analytic) = 0.47570741962916155504396862151823 y[1] (numeric) = 0.47570741962916155504396862151821 absolute error = 2e-32 relative error = 4.2042648852504824335713254371005e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.005 y[1] (analytic) = 0.47634342716569889011993123221467 y[1] (numeric) = 0.47634342716569889011993123221466 absolute error = 1e-32 relative error = 2.0993257027815439154760364571271e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.006 y[1] (analytic) = 0.47697932124092232183070211714319 y[1] (numeric) = 0.47697932124092232183070211714318 absolute error = 1e-32 relative error = 2.0965269466994353413919581115162e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.007 y[1] (analytic) = 0.47761510105048120184890551508554 y[1] (numeric) = 0.47761510105048120184890551508551 absolute error = 3e-32 relative error = 6.2812084320652940353447169738790e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.008 y[1] (analytic) = 0.47825076578977643391548039842399 y[1] (numeric) = 0.47825076578977643391548039842397 absolute error = 2e-32 relative error = 4.1819065290930141522827571476350e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.009 y[1] (analytic) = 0.47888631465396144725803529583226 y[1] (numeric) = 0.47888631465396144725803529583224 absolute error = 2e-32 relative error = 4.1763565564515669622526499773867e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=270.8MB, alloc=4.5MB, time=12.91 TOP MAIN SOLVE Loop x[1] = 2.01 y[1] (analytic) = 0.47952174683794317061922234485087 y[1] (numeric) = 0.47952174683794317061922234485085 absolute error = 2e-32 relative error = 4.1708223103297758037294048947573e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.011 y[1] (analytic) = 0.48015706153638300689398736419827 y[1] (numeric) = 0.48015706153638300689398736419824 absolute error = 3e-32 relative error = 6.2479555968639661221476618515291e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.012 y[1] (analytic) = 0.48079225794369780837455176441679 y[1] (numeric) = 0.48079225794369780837455176441677 absolute error = 2e-32 relative error = 4.1598007600076744570076610810750e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.013 y[1] (analytic) = 0.48142733525406085260198114551531 y[1] (numeric) = 0.48142733525406085260198114551529 absolute error = 2e-32 relative error = 4.1543133377429671944930997648378e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.014 y[1] (analytic) = 0.48206229266140281882319446164717 y[1] (numeric) = 0.48206229266140281882319446164714 absolute error = 3e-32 relative error = 6.2232621087979992821455235928011e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.015 y[1] (analytic) = 0.48269712935941276505226666555617 y[1] (numeric) = 0.48269712935941276505226666555615 absolute error = 2e-32 relative error = 4.1433849060884192129241667875070e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.016 y[1] (analytic) = 0.48333184454153910573487677953462 y[1] (numeric) = 0.4833318445415391057348767795346 absolute error = 2e-32 relative error = 4.1379437804208522738462403835182e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.017 y[1] (analytic) = 0.48396643740099059001475237496763 y[1] (numeric) = 0.48396643740099059001475237496761 absolute error = 2e-32 relative error = 4.1325179711643912623143809165895e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.018 y[1] (analytic) = 0.48460090713073728060096047918904 y[1] (numeric) = 0.48460090713073728060096047918902 absolute error = 2e-32 relative error = 4.1271074209120974654756657418572e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.019 y[1] (analytic) = 0.48523525292351153323489396634671 y[1] (numeric) = 0.48523525292351153323489396634668 absolute error = 3e-32 relative error = 6.1825681088197752097670979395851e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.02 y[1] (analytic) = 0.48586947397180897675580152827024 y[1] (numeric) = 0.48586947397180897675580152827022 absolute error = 2e-32 relative error = 4.1163318692378760296567219763710e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.021 y[1] (analytic) = 0.48650356946788949376370836195457 y[1] (numeric) = 0.48650356946788949376370836195454 absolute error = 3e-32 relative error = 6.1664501316634385668337017959272e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.022 y[1] (analytic) = 0.48713753860377820187857375221763 y[1] (numeric) = 0.48713753860377820187857375221761 absolute error = 2e-32 relative error = 4.1056166718999966457882080290465e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.023 y[1] (analytic) = 0.48777138057126643559453077136374 y[1] (numeric) = 0.48777138057126643559453077136372 absolute error = 2e-32 relative error = 4.1002815656335694912369575238130e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.024 y[1] (analytic) = 0.48840509456191272872805236228421 y[1] (numeric) = 0.48840509456191272872805236228419 absolute error = 2e-32 relative error = 4.0949613799461908907904328229934e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.025 y[1] (analytic) = 0.48903867976704379745888711735791 y[1] (numeric) = 0.48903867976704379745888711735789 absolute error = 2e-32 relative error = 4.0896560594199026246793247887519e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.026 y[1] (analytic) = 0.48967213537775552396260711277531 y[1] (numeric) = 0.4896721353777555239626071127753 absolute error = 1e-32 relative error = 2.0421827744569418392729396992243e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.027 y[1] (analytic) = 0.49030546058491394063360920650344 y[1] (numeric) = 0.49030546058491394063360920650342 absolute error = 2e-32 relative error = 4.0790897935627384501263419921768e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.028 y[1] (analytic) = 0.49093865457915621489741025803599 y[1] (numeric) = 0.49093865457915621489741025803597 absolute error = 2e-32 relative error = 4.0738287387747976501986692101790e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.029 y[1] (analytic) = 0.49157171655089163461107577933536 y[1] (numeric) = 0.49157171655089163461107577933535 absolute error = 1e-32 relative error = 2.0342911651152158941032499492238e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.03 y[1] (analytic) = 0.49220464569030259405062057897096 y[1] (numeric) = 0.49220464569030259405062057897094 absolute error = 2e-32 relative error = 4.0633505138803771340505197855093e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.031 y[1] (analytic) = 0.49283744118734558048421901539406 y[1] (numeric) = 0.49283744118734558048421901539405 absolute error = 1e-32 relative error = 2.0290666179720370243032685091331e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.032 y[1] (analytic) = 0.49347010223175216133006153056412 y[1] (numeric) = 0.4934701022317521613300615305641 absolute error = 2e-32 relative error = 4.0529304429080175765859536858914e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.033 y[1] (analytic) = 0.49410262801302997189769319175534 y[1] (numeric) = 0.49410262801302997189769319175532 absolute error = 2e-32 relative error = 4.0477420815241201963990172694945e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.034 y[1] (analytic) = 0.494735017720463703711669027329 y[1] (numeric) = 0.49473501772046370371166902732899 absolute error = 1e-32 relative error = 2.0212840494040433113572042937325e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.035 y[1] (analytic) = 0.4953672705431160934163600015549 y[1] (numeric) = 0.49536727054311609341636000155488 absolute error = 2e-32 relative error = 4.0374084420378005584305103911839e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.036 y[1] (analytic) = 0.49599938566982891226074253420811 y[1] (numeric) = 0.49599938566982891226074253420809 absolute error = 2e-32 relative error = 4.0322630587517232937842425338224e-30 % Correct digits = 31 h = 0.001 memory used=274.6MB, alloc=4.5MB, time=13.10 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.037 y[1] (analytic) = 0.49663136228922395616200353265549 y[1] (numeric) = 0.49663136228922395616200353265547 absolute error = 2e-32 relative error = 4.0271318967473040513227829461945e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.038 y[1] (analytic) = 0.49726319958970403634679196748 y[1] (numeric) = 0.49726319958970403634679196747998 absolute error = 2e-32 relative error = 4.0220149040794019764519540248550e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.039 y[1] (analytic) = 0.49789489675945397056894708737391 y[1] (numeric) = 0.49789489675945397056894708737389 absolute error = 2e-32 relative error = 4.0169120290587196742526751692219e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.04 y[1] (analytic) = 0.49852645298644157490253243506312 y[1] (numeric) = 0.49852645298644157490253243506311 absolute error = 1e-32 relative error = 2.0059116101251240971118980035426e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.041 y[1] (analytic) = 0.49915786745841865610900389340677 y[1] (numeric) = 0.49915786745841865610900389340676 absolute error = 1e-32 relative error = 2.0033742132358616827829807341958e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.042 y[1] (analytic) = 0.49978913936292200457733905955004 y[1] (numeric) = 0.49978913936292200457733905955002 absolute error = 2e-32 relative error = 4.0016875967920933865670477145902e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.043 y[1] (analytic) = 0.50042026788727438783595431509472 y[1] (numeric) = 0.50042026788727438783595431509471 absolute error = 1e-32 relative error = 1.9983203402649987862926368506781e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.044 y[1] (analytic) = 0.5010512522185855446352350316934 y[1] (numeric) = 0.50105125221858554463523503169339 absolute error = 1e-32 relative error = 1.9958038136261280840257309272963e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.045 y[1] (analytic) = 0.50168209154375317959950342426915 y[1] (numeric) = 0.50168209154375317959950342426914 absolute error = 1e-32 relative error = 1.9932941933861855644136081591865e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.046 y[1] (analytic) = 0.50231278504946395844724763821698 y[1] (numeric) = 0.50231278504946395844724763821697 absolute error = 1e-32 relative error = 1.9907914545745188910805650974231e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.047 y[1] (analytic) = 0.50294333192219450377843473245433 y[1] (numeric) = 0.50294333192219450377843473245432 absolute error = 1e-32 relative error = 1.9882955723423336361903221152700e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.048 y[1] (analytic) = 0.50357373134821239142772929705949 y[1] (numeric) = 0.50357373134821239142772929705948 absolute error = 1e-32 relative error = 1.9858065219619598506714885046630e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.049 y[1] (analytic) = 0.50420398251357714738243852246847 y[1] (numeric) = 0.50420398251357714738243852246845 absolute error = 2e-32 relative error = 3.9666485576522478735447478188061e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.05 y[1] (analytic) = 0.50483408460414124526400361679492 y[1] (numeric) = 0.50483408460414124526400361679491 absolute error = 1e-32 relative error = 1.9808488184472257783283166734254e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.051 y[1] (analytic) = 0.50546403680555110437185654879499 y[1] (numeric) = 0.50546403680555110437185654879498 absolute error = 1e-32 relative error = 1.9783801164566210845533760485349e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.052 y[1] (analytic) = 0.50609383830324808828846017632038 y[1] (numeric) = 0.50609383830324808828846017632036 absolute error = 2e-32 relative error = 3.9518362972078178071845682425343e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.053 y[1] (analytic) = 0.50672348828246950404434890379099 y[1] (numeric) = 0.50672348828246950404434890379098 absolute error = 1e-32 relative error = 1.9734628907562242624880302209023e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.054 y[1] (analytic) = 0.50735298592824960184198609727309 y[1] (numeric) = 0.50735298592824960184198609727307 absolute error = 2e-32 relative error = 3.9420286377950717812708203366403e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.055 y[1] (analytic) = 0.50798233042542057533725357217157 y[1] (numeric) = 0.50798233042542057533725357217156 absolute error = 1e-32 relative error = 1.9685724091279489842013690072912e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.056 y[1] (analytic) = 0.50861152095861356247738755633854 y[1] (numeric) = 0.50861152095861356247738755633853 absolute error = 1e-32 relative error = 1.9661371376630129693990521059703e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.057 y[1] (analytic) = 0.50924055671225964689417462056314 y[1] (numeric) = 0.50924055671225964689417462056314 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.058 y[1] (analytic) = 0.50986943687059085985122015894414 y[1] (numeric) = 0.50986943687059085985122015894412 absolute error = 2e-32 relative error = 3.9225728301647874162000240858038e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.059 y[1] (analytic) = 0.51049816061764118274410109355543 y[1] (numeric) = 0.51049816061764118274410109355542 absolute error = 1e-32 relative error = 1.9588709169688694862295401845738e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.06 y[1] (analytic) = 0.51112672713724755015221357109936 y[1] (numeric) = 0.51112672713724755015221357109935 absolute error = 1e-32 relative error = 1.9564619631629640619241045276620e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.061 y[1] (analytic) = 0.51175513561305085344112551390169 y[1] (numeric) = 0.51175513561305085344112551390167 absolute error = 2e-32 relative error = 3.9081190608944730459209038070260e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.062 y[1] (analytic) = 0.5123833852284969449142429836402 y[1] (numeric) = 0.51238338522849694491424298364018 absolute error = 2e-32 relative error = 3.9033271914312788689611008655414e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=278.4MB, alloc=4.5MB, time=13.28 x[1] = 2.063 y[1] (analytic) = 0.51301147516683764251259841361402 y[1] (numeric) = 0.51301147516683764251259841361401 absolute error = 1e-32 relative error = 1.9492741359728604482843307881459e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.064 y[1] (analytic) = 0.5136394046111317350615678641562 y[1] (numeric) = 0.5136394046111317350615678641562 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.065 y[1] (analytic) = 0.51426717274424598806332355596853 y[1] (numeric) = 0.51426717274424598806332355596852 absolute error = 1e-32 relative error = 1.9445145500222651727323754948563e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.066 y[1] (analytic) = 0.51489477874885615003382703771615 y[1] (numeric) = 0.51489477874885615003382703771614 absolute error = 1e-32 relative error = 1.9421443783716393371594339720587e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.067 y[1] (analytic) = 0.51552222180744795938316744716185 y[1] (numeric) = 0.51552222180744795938316744716184 absolute error = 1e-32 relative error = 1.9397805908229281163982100879621e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.068 y[1] (analytic) = 0.5161495011023181518380484294463 y[1] (numeric) = 0.51614950110231815183804842944628 absolute error = 2e-32 relative error = 3.8748463298495621036614114954216e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.069 y[1] (analytic) = 0.51677661581557546840522638183381 y[1] (numeric) = 0.51677661581557546840522638183379 absolute error = 2e-32 relative error = 3.8701441566654585688476224770672e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.07 y[1] (analytic) = 0.51740356512914166387470180134315 y[1] (numeric) = 0.51740356512914166387470180134313 absolute error = 2e-32 relative error = 3.8654546176171181948635706481997e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.071 y[1] (analytic) = 0.51803034822475251586146462017134 y[1] (numeric) = 0.51803034822475251586146462017132 absolute error = 2e-32 relative error = 3.8607776684393797442857342205820e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.072 y[1] (analytic) = 0.51865696428395883438459352369689 y[1] (numeric) = 0.51865696428395883438459352369687 absolute error = 2e-32 relative error = 3.8561132650771128409908594791286e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.073 y[1] (analytic) = 0.51928341248812747198250835711808 y[1] (numeric) = 0.51928341248812747198250835711807 absolute error = 1e-32 relative error = 1.9257306818419956587277133147550e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.074 y[1] (analytic) = 0.51990969201844233436317383944346 y[1] (numeric) = 0.51990969201844233436317383944345 absolute error = 1e-32 relative error = 1.9234109603106375865602404168916e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.075 y[1] (analytic) = 0.52053580205590539158805191760648 y[1] (numeric) = 0.52053580205590539158805191760646 absolute error = 2e-32 relative error = 3.8421948924566010734831274720446e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.076 y[1] (analytic) = 0.52116174178133768978859920892597 y[1] (numeric) = 0.52116174178133768978859920892596 absolute error = 1e-32 relative error = 1.9187901179813906601160627166675e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.077 y[1] (analytic) = 0.52178751037538036341410509697978 y[1] (numeric) = 0.52178751037538036341410509697976 absolute error = 2e-32 relative error = 3.8329779081166112233942704843019e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.078 y[1] (analytic) = 0.52241310701849564800966516420103 y[1] (numeric) = 0.52241310701849564800966516420101 absolute error = 2e-32 relative error = 3.8283878660976848071007224764019e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.079 y[1] (analytic) = 0.52303853089096789352308376414844 y[1] (numeric) = 0.52303853089096789352308376414843 absolute error = 1e-32 relative error = 1.9119050336436093906090871482094e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.08 y[1] (analytic) = 0.52366378117290457813949865744192 y[1] (numeric) = 0.52366378117290457813949865744191 absolute error = 1e-32 relative error = 1.9096222346334423558594324987700e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.081 y[1] (analytic) = 0.52428885704423732264251975779666 y[1] (numeric) = 0.52428885704423732264251975779664 absolute error = 2e-32 relative error = 3.8146910298176493232859814319021e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.082 y[1] (analytic) = 0.52491375768472290530067315843257 y[1] (numeric) = 0.52491375768472290530067315843255 absolute error = 2e-32 relative error = 3.8101497069186228682670479229993e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.083 y[1] (analytic) = 0.52553848227394427727794073438262 y[1] (numeric) = 0.52553848227394427727794073438261 absolute error = 1e-32 relative error = 1.9028102293729577483487735418286e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.084 y[1] (analytic) = 0.52616302999131157856718474287515 y[1] (numeric) = 0.52616302999131157856718474287514 absolute error = 1e-32 relative error = 1.9005516218357507813601604326390e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.085 y[1] (analytic) = 0.52678740001606315444524597202224 y[1] (numeric) = 0.52678740001606315444524597202222 absolute error = 2e-32 relative error = 3.7965980202620918033233424396479e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.086 y[1] (analytic) = 0.52741159152726657244850311751076 y[1] (numeric) = 0.52741159152726657244850311751074 absolute error = 2e-32 relative error = 3.7921047472780133259092987616875e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.087 y[1] (analytic) = 0.5280356037038196398676801978646 y[1] (numeric) = 0.52803560370381963986768019786457 absolute error = 3e-32 relative error = 5.6814350755081460126927278828120e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.088 y[1] (analytic) = 0.52865943572445142176068795112839 y[1] (numeric) = 0.52865943572445142176068795112836 absolute error = 3e-32 relative error = 5.6747308328828618749777875763342e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.089 y[1] (analytic) = 0.52928308676772325948228428951572 y[1] (numeric) = 0.5292830867677232594822842895157 absolute error = 2e-32 relative error = 3.7786962213619783428004550773847e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=282.2MB, alloc=4.5MB, time=13.46 TOP MAIN SOLVE Loop x[1] = 2.09 y[1] (analytic) = 0.52990655601202978972933802366849 y[1] (numeric) = 0.52990655601202978972933802366846 absolute error = 3e-32 relative error = 5.6613755122740826082712580153222e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.091 y[1] (analytic) = 0.53052984263559996410047920469161 y[1] (numeric) = 0.53052984263559996410047920469159 absolute error = 2e-32 relative error = 3.7698162087626824827038370349768e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.092 y[1] (analytic) = 0.53115294581649806916891857005883 y[1] (numeric) = 0.53115294581649806916891857005882 absolute error = 1e-32 relative error = 1.8826968915003975422928332388689e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.093 y[1] (analytic) = 0.53177586473262474706721771883199 y[1] (numeric) = 0.53177586473262474706721771883197 absolute error = 2e-32 relative error = 3.7609830243153171071466516515153e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.094 y[1] (analytic) = 0.53239859856171801658279078239997 y[1] (numeric) = 0.53239859856171801658279078239996 absolute error = 1e-32 relative error = 1.8782919464880513702166104944298e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.095 y[1] (analytic) = 0.53302114648135429476291749912527 y[1] (numeric) = 0.53302114648135429476291749912525 absolute error = 2e-32 relative error = 3.7521963494368836398937450838385e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.096 y[1] (analytic) = 0.53364350766894941902804674488602 y[1] (numeric) = 0.533643507668949419028046744886 absolute error = 2e-32 relative error = 3.7478203543342236362048209187488e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.097 y[1] (analytic) = 0.53426568130175966979216871652308 y[1] (numeric) = 0.53426568130175966979216871652307 absolute error = 1e-32 relative error = 1.8717279342432402964359257193429e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.098 y[1] (analytic) = 0.53488766655688279358903311164354 y[1] (numeric) = 0.53488766655688279358903311164353 absolute error = 1e-32 relative error = 1.8695514264463876773748113895851e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.099 y[1] (analytic) = 0.53550946261125902670298979609717 y[1] (numeric) = 0.53550946261125902670298979609715 absolute error = 2e-32 relative error = 3.7347612687319677311451017588543e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.1 y[1] (analytic) = 0.53613106864167211930322759973159 y[1] (numeric) = 0.53613106864167211930322759973159 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.101 y[1] (analytic) = 0.53675248382475036008018603174587 y[1] (numeric) = 0.53675248382475036008018603174585 absolute error = 2e-32 relative error = 3.7261122403170840815640833005499e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.102 y[1] (analytic) = 0.537373707336967601382913859102 y[1] (numeric) = 0.53737370733696760138291385910197 absolute error = 3e-32 relative error = 5.5827070789654555733178009056262e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.103 y[1] (analytic) = 0.53799473835464428485614764502279 y[1] (numeric) = 0.53799473835464428485614764502276 absolute error = 3e-32 relative error = 5.5762627143435189091043526442941e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.104 y[1] (analytic) = 0.53861557605394846757588249959986 y[1] (numeric) = 0.53861557605394846757588249959983 absolute error = 3e-32 relative error = 5.5698352097034711929428189830862e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.105 y[1] (analytic) = 0.53923621961089684868220645096253 y[1] (numeric) = 0.53923621961089684868220645096251 absolute error = 2e-32 relative error = 3.7089496722663844901923461225625e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.106 y[1] (analytic) = 0.53985666820135579650816900331564 y[1] (numeric) = 0.53985666820135579650816900331561 absolute error = 3e-32 relative error = 5.5570305540452446288391274805957e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.107 y[1] (analytic) = 0.54047692100104237620345360744372 y[1] (numeric) = 0.5404769210010423762034536074437 absolute error = 2e-32 relative error = 3.7004355270077161242269452016336e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.108 y[1] (analytic) = 0.54109697718552537785162293000248 y[1] (numeric) = 0.54109697718552537785162293000245 absolute error = 3e-32 relative error = 5.5442926619259102032946955494172e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.109 y[1] (analytic) = 0.54171683593022634507970497007545 y[1] (numeric) = 0.54171683593022634507970497007541 absolute error = 4e-32 relative error = 7.3839314835605439578567122986583e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.11 y[1] (analytic) = 0.54233649641042060415888723506791 y[1] (numeric) = 0.54233649641042060415888723506786 absolute error = 5e-32 relative error = 9.2193684789676799086349585234698e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.111 y[1] (analytic) = 0.54295595780123829359508535303995 y[1] (numeric) = 0.54295595780123829359508535303992 absolute error = 3e-32 relative error = 5.5253100309440200491669071545489e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.112 y[1] (analytic) = 0.54357521927766539420815166504951 y[1] (numeric) = 0.54357521927766539420815166504947 absolute error = 4e-32 relative error = 7.3586871846649565936439995793231e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.113 y[1] (analytic) = 0.54419428001454475969848850898356 y[1] (numeric) = 0.54419428001454475969848850898351 absolute error = 5e-32 relative error = 9.1878951757198996515256503726547e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.114 y[1] (analytic) = 0.54481313918657714769983007570476 y[1] (numeric) = 0.54481313918657714769983007570472 absolute error = 4e-32 relative error = 7.3419668365049411356765450997859e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.115 y[1] (analytic) = 0.54543179596832225131695588913023 y[1] (numeric) = 0.54543179596832225131695588913018 absolute error = 5e-32 relative error = 9.1670490003673923593533754976255e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.116 y[1] (analytic) = 0.54605024953419973114709813409209 y[1] (numeric) = 0.54605024953419973114709813409204 absolute error = 5e-32 relative error = 9.1566664501393007223625166633093e-30 % Correct digits = 31 h = 0.001 memory used=286.1MB, alloc=4.5MB, time=13.65 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.117 y[1] (analytic) = 0.54666849905849024778380422950683 y[1] (numeric) = 0.54666849905849024778380422950678 absolute error = 5e-32 relative error = 9.1463108055637755243601272542736e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.118 y[1] (analytic) = 0.54728654371533649480201521950185 y[1] (numeric) = 0.54728654371533649480201521950179 absolute error = 6e-32 relative error = 1.0963178373193872612048192959131e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.119 y[1] (analytic) = 0.54790438267874423222311973171655 y[1] (numeric) = 0.5479043826787442322231197317165 absolute error = 5e-32 relative error = 9.1256798778550331393248694229941e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.12 y[1] (analytic) = 0.54852201512258332045874243001117 y[1] (numeric) = 0.54852201512258332045874243001112 absolute error = 5e-32 relative error = 9.1154044179659834785691132650338e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.121 y[1] (analytic) = 0.54913944022058875473202506828074 y[1] (numeric) = 0.5491394402205887547320250682807 absolute error = 4e-32 relative error = 7.2841244081707263049408186705029e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.122 y[1] (analytic) = 0.54975665714636169997515743298682 y[1] (numeric) = 0.54975665714636169997515743298679 absolute error = 3e-32 relative error = 5.4569598403267904058751712235728e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.123 y[1] (analytic) = 0.55037366507337052620191464438434 y[1] (numeric) = 0.5503736650733705262019146443843 absolute error = 4e-32 relative error = 7.2677896015732483359423950439224e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.124 y[1] (analytic) = 0.55099046317495184435395647023886 y[1] (numeric) = 0.55099046317495184435395647023882 absolute error = 4e-32 relative error = 7.2596537823013284740197156404883e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.125 y[1] (analytic) = 0.5516070506243115426196434911008 y[1] (numeric) = 0.55160705062431154261964349110077 absolute error = 3e-32 relative error = 5.4386541952366007823813021212958e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.126 y[1] (analytic) = 0.55222342659452582322412414292793 y[1] (numeric) = 0.5522234265945258232241241429279 absolute error = 3e-32 relative error = 5.4325837252152151338332488617345e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.127 y[1] (analytic) = 0.55283959025854223968944585102902 y[1] (numeric) = 0.55283959025854223968944585102898 absolute error = 4e-32 relative error = 7.2353718338611581002865642782767e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.128 y[1] (analytic) = 0.55345554078918073456344265893924 y[1] (numeric) = 0.55345554078918073456344265893921 absolute error = 3e-32 relative error = 5.4204895947418902698635872833936e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.129 y[1] (analytic) = 0.55407127735913467761615094693367 y[1] (numeric) = 0.55407127735913467761615094693363 absolute error = 4e-32 relative error = 7.2192877765928722050233614264980e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.13 y[1] (analytic) = 0.55468679914097190450250402743983 y[1] (numeric) = 0.5546867991409719045025040274398 absolute error = 3e-32 relative error = 5.4084575379223319869528118346943e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.131 y[1] (analytic) = 0.55530210530713575589005559862598 y[1] (numeric) = 0.55530210530713575589005559862593 absolute error = 5e-32 relative error = 9.0041077680310910302604551866042e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.132 y[1] (analytic) = 0.55591719502994611705048123291733 y[1] (numeric) = 0.5559171950299461170504812329173 absolute error = 3e-32 relative error = 5.3964871510016813998974895115393e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.133 y[1] (analytic) = 0.55653206748160045791360627413253 y[1] (numeric) = 0.55653206748160045791360627413249 absolute error = 4e-32 relative error = 7.1873666114167702554841620596389e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.134 y[1] (analytic) = 0.55714672183417487358270771533397 y[1] (numeric) = 0.55714672183417487358270771533393 absolute error = 4e-32 relative error = 7.1794373784192005187484481567101e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.135 y[1] (analytic) = 0.55776115725962512530983682935445 y[1] (numeric) = 0.55776115725962512530983682935442 absolute error = 3e-32 relative error = 5.3786463272908914187436122945731e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.136 y[1] (analytic) = 0.55837537292978768192990852529481 y[1] (numeric) = 0.55837537292978768192990852529478 absolute error = 3e-32 relative error = 5.3727297897452791366252666589134e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.137 y[1] (analytic) = 0.55898936801638076175230260708835 y[1] (numeric) = 0.55898936801638076175230260708832 absolute error = 3e-32 relative error = 5.3668283721490875709649056580419e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.138 y[1] (analytic) = 0.55960314169100537490872131449626 y[1] (numeric) = 0.55960314169100537490872131449623 absolute error = 3e-32 relative error = 5.3609420256909534495867006197301e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.139 y[1] (analytic) = 0.56021669312514636615604673263638 y[1] (numeric) = 0.56021669312514636615604673263635 absolute error = 3e-32 relative error = 5.3550707017754509524479508489781e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.14 y[1] (analytic) = 0.56083002149017345813294086335604 y[1] (numeric) = 0.56083002149017345813294086335601 absolute error = 3e-32 relative error = 5.3492143520219241308679069138571e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.141 y[1] (analytic) = 0.56144312595734229506893036043987 y[1] (numeric) = 0.56144312595734229506893036043984 absolute error = 3e-32 relative error = 5.3433729282633269352923247666842e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.142 y[1] (analytic) = 0.56205600569779548694471714079631 y[1] (numeric) = 0.56205600569779548694471714079628 absolute error = 3e-32 relative error = 5.3375463825450707939717659471148e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=289.9MB, alloc=4.5MB, time=13.83 x[1] = 2.143 y[1] (analytic) = 0.56266865988256365410245529539332 y[1] (numeric) = 0.56266865988256365410245529539331 absolute error = 1e-32 relative error = 1.7772448890412932284767677833236e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.144 y[1] (analytic) = 0.56328108768256647230473393681546 y[1] (numeric) = 0.56328108768256647230473393681543 absolute error = 3e-32 relative error = 5.3259377344666526480950888508746e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.145 y[1] (analytic) = 0.56389328826861371824100483489204 y[1] (numeric) = 0.56389328826861371824100483489202 absolute error = 2e-32 relative error = 3.5467703581662224472974938510822e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.146 y[1] (analytic) = 0.564505260811406315480192907902 y[1] (numeric) = 0.56450526081140631548019290790197 absolute error = 3e-32 relative error = 5.3143880283557889095307674740604e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.147 y[1] (analytic) = 0.56511700448153738086822685439317 y[1] (numeric) = 0.56511700448153738086822685439313 absolute error = 4e-32 relative error = 7.0781802145022548962184121975518e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.148 y[1] (analytic) = 0.56572851844949327136922642966797 y[1] (numeric) = 0.56572851844949327136922642966793 absolute error = 4e-32 relative error = 7.0705291841445488288205389065951e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.149 y[1] (analytic) = 0.56633980188565463134908209147996 y[1] (numeric) = 0.56633980188565463134908209147994 absolute error = 2e-32 relative error = 3.5314487757012790920342121159524e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.15 y[1] (analytic) = 0.56695085396029744030016196146151 y[1] (numeric) = 0.56695085396029744030016196146147 absolute error = 4e-32 relative error = 7.0552852545489117192830177477670e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.151 y[1] (analytic) = 0.5675616738435940610058802722603 y[1] (numeric) = 0.56756167384359406100588027226027 absolute error = 3e-32 relative error = 5.2857691740945948562771308999131e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.152 y[1] (analytic) = 0.56817226070561428814386069530533 y[1] (numeric) = 0.56817226070561428814386069530531 absolute error = 2e-32 relative error = 3.5200592114725839048751396464919e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.153 y[1] (analytic) = 0.56878261371632639732642717054874 y[1] (numeric) = 0.56878261371632639732642717054871 absolute error = 3e-32 relative error = 5.2744228245630140246648118713706e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.154 y[1] (analytic) = 0.56939273204559819457715408744401 y[1] (numeric) = 0.56939273204559819457715408744398 absolute error = 3e-32 relative error = 5.2687711506646936755938347021551e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.155 y[1] (analytic) = 0.57000261486319806624220689582118 y[1] (numeric) = 0.57000261486319806624220689582115 absolute error = 3e-32 relative error = 5.2631337502197369299015683446458e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.156 y[1] (analytic) = 0.57061226133879602933520345620823 y[1] (numeric) = 0.57061226133879602933520345620822 absolute error = 1e-32 relative error = 1.7525035260436837405785373217089e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.157 y[1] (analytic) = 0.57122167064196478231432567152653 y[1] (numeric) = 0.57122167064196478231432567152652 absolute error = 1e-32 relative error = 1.7506338631658611850643567668769e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.158 y[1] (analytic) = 0.57183084194218075629041017595648 y[1] (numeric) = 0.57183084194218075629041017595649 absolute error = 1e-32 relative error = 1.7487689132044271511754542745407e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.159 y[1] (analytic) = 0.57243977440882516666474609213081 y[1] (numeric) = 0.5724397744088251666647460921308 absolute error = 1e-32 relative error = 1.7469086613220201840603350753068e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.16 y[1] (analytic) = 0.57304846721118506519530710466508 y[1] (numeric) = 0.57304846721118506519530710466508 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.161 y[1] (analytic) = 0.57365691951845439249014433638359 y[1] (numeric) = 0.57365691951845439249014433638357 absolute error = 2e-32 relative error = 3.4864043855321447492625063825886e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.162 y[1] (analytic) = 0.57426513049973503092666575343918 y[1] (numeric) = 0.57426513049973503092666575343917 absolute error = 1e-32 relative error = 1.7413559467380222652601963151406e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.163 y[1] (analytic) = 0.57487309932403785799552706686553 y[1] (numeric) = 0.57487309932403785799552706686552 absolute error = 1e-32 relative error = 1.7395143400793076582771153945029e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.164 y[1] (analytic) = 0.57548082516028380006785834093395 y[1] (numeric) = 0.57548082516028380006785834093393 absolute error = 2e-32 relative error = 3.4753547165415232374579465657964e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.165 y[1] (analytic) = 0.57608830717730488658454976302167 y[1] (numeric) = 0.57608830717730488658454976302166 absolute error = 1e-32 relative error = 1.7358449868558540305126580654212e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.166 y[1] (analytic) = 0.57669554454384530466631927553077 y[1] (numeric) = 0.57669554454384530466631927553076 absolute error = 1e-32 relative error = 1.7340172114403625101489854423307e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.167 y[1] (analytic) = 0.57730253642856245414328401773007 y[1] (numeric) = 0.57730253642856245414328401773006 absolute error = 1e-32 relative error = 1.7321940176920454074111011450287e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.168 y[1] (analytic) = 0.57790928200002800300275677422758 y[1] (numeric) = 0.57790928200002800300275677422757 absolute error = 1e-32 relative error = 1.7303753913403168774388123477546e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.169 y[1] (analytic) = 0.5785157804267289432539878771179 y[1] (numeric) = 0.5785157804267289432539878771179 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=293.7MB, alloc=4.5MB, time=14.02 x[1] = 2.17 y[1] (analytic) = 0.57912203087706864720857226069039 y[1] (numeric) = 0.57912203087706864720857226069038 absolute error = 1e-32 relative error = 1.7267517840506259944863930599604e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.171 y[1] (analytic) = 0.57972803251936792417524062092914 y[1] (numeric) = 0.57972803251936792417524062092912 absolute error = 2e-32 relative error = 3.4498935497537506491299739777797e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.172 y[1] (analytic) = 0.58033378452186607756775288688801 y[1] (numeric) = 0.58033378452186607756775288688799 absolute error = 2e-32 relative error = 3.4462925532550019922359991082536e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.173 y[1] (analytic) = 0.58093928605272196242461146738182 y[1] (numeric) = 0.58093928605272196242461146738179 absolute error = 3e-32 relative error = 5.1640508260061811457394160583666e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.174 y[1] (analytic) = 0.58154453628001504333931099430138 y[1] (numeric) = 0.58154453628001504333931099430136 absolute error = 2e-32 relative error = 3.4391175141863861656437531803322e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.175 y[1] (analytic) = 0.58214953437174645279984054323576 y[1] (numeric) = 0.58214953437174645279984054323573 absolute error = 3e-32 relative error = 5.1533151241589302421981288229890e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.176 y[1] (analytic) = 0.58275427949584004993615357297009 y[1] (numeric) = 0.58275427949584004993615357297009 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.177 y[1] (analytic) = 0.58335877082014347967432008782496 y[1] (numeric) = 0.58335877082014347967432008782495 absolute error = 1e-32 relative error = 1.7142109624821463750926845751762e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.178 y[1] (analytic) = 0.5839630075124292322960747907109 y[1] (numeric) = 0.58396300751242923229607479071088 absolute error = 2e-32 relative error = 3.4248744771002150158273916799428e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.179 y[1] (analytic) = 0.58456698874039570340247426019558 y[1] (numeric) = 0.58456698874039570340247426019556 absolute error = 2e-32 relative error = 3.4213358580331902540062838550331e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.18 y[1] (analytic) = 0.58517071367166825428037545181639 y[1] (numeric) = 0.58517071367166825428037545181636 absolute error = 3e-32 relative error = 5.1267090609788468255227856088289e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.181 y[1] (analytic) = 0.58577418147380027267044709232396 y[1] (numeric) = 0.58577418147380027267044709232394 absolute error = 2e-32 relative error = 3.4142849979629109617423644883473e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.182 y[1] (analytic) = 0.58637739131427423393542480551088 y[1] (numeric) = 0.58637739131427423393542480551086 absolute error = 2e-32 relative error = 3.4107727030834345753460256986679e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.183 y[1] (analytic) = 0.58698034236050276262732007976527 y[1] (numeric) = 0.58698034236050276262732007976523 absolute error = 4e-32 relative error = 6.8145382584947625584760578766585e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.184 y[1] (analytic) = 0.58758303377982969445229246049446 y[1] (numeric) = 0.58758303377982969445229246049443 absolute error = 3e-32 relative error = 5.1056613747021753267493194075792e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.185 y[1] (analytic) = 0.58818546473953113863189362508807 y[1] (numeric) = 0.58818546473953113863189362508805 absolute error = 2e-32 relative error = 3.4002880382052099054078176034622e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.186 y[1] (analytic) = 0.5887876344068165406593912741346 y[1] (numeric) = 0.58878763440681654065939127413457 absolute error = 3e-32 relative error = 5.0952157020457769569602158509245e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.187 y[1] (analytic) = 0.58938954194882974544988005017311 y[1] (numeric) = 0.58938954194882974544988005017308 absolute error = 3e-32 relative error = 5.0900122694414167659095502381934e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.188 y[1] (analytic) = 0.58999118653265006088288597435109 y[1] (numeric) = 0.58999118653265006088288597435108 absolute error = 1e-32 relative error = 1.6949405733955995071220610729359e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.189 y[1] (analytic) = 0.5905925673252933217361701719731 y[1] (numeric) = 0.59059256732529332173617017197308 absolute error = 2e-32 relative error = 3.3864293434265608528255253650199e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.19 y[1] (analytic) = 0.59119368349371295400943694006314 y[1] (numeric) = 0.59119368349371295400943694006313 absolute error = 1e-32 relative error = 1.6914930384411566442681669850668e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.191 y[1] (analytic) = 0.59179453420480103963665049372894 y[1] (numeric) = 0.59179453420480103963665049372891 absolute error = 3e-32 relative error = 5.0693269819247714846985779260008e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.192 y[1] (analytic) = 0.59239511862538938158566401330656 y[1] (numeric) = 0.59239511862538938158566401330655 absolute error = 1e-32 relative error = 1.6880625254313855117599594793952e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.193 y[1] (analytic) = 0.59299543592225056934386390098477 y[1] (numeric) = 0.59299543592225056934386390098474 absolute error = 3e-32 relative error = 5.0590608599445259499694179460008e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.194 y[1] (analytic) = 0.59359548526209904478853144385549 y[1] (numeric) = 0.59359548526209904478853144385548 absolute error = 1e-32 relative error = 1.6846489315168142228127339410552e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.195 y[1] (analytic) = 0.59419526581159216844062337011734 y[1] (numeric) = 0.59419526581159216844062337011731 absolute error = 3e-32 relative error = 5.0488453419473086188386964115265e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.196 y[1] (analytic) = 0.59479477673733128610067207646697 y[1] (numeric) = 0.59479477673733128610067207646693 absolute error = 4e-32 relative error = 6.7250086188407289340955155327877e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=297.5MB, alloc=4.5MB, time=14.21 TOP MAIN SOLVE Loop x[1] = 2.197 y[1] (analytic) = 0.59539401720586279586550559755715 y[1] (numeric) = 0.59539401720586279586550559755712 absolute error = 3e-32 relative error = 5.0386801232547877993789430966200e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.198 y[1] (analytic) = 0.59599298638367921552448668277412 y[1] (numeric) = 0.59599298638367921552448668277409 absolute error = 3e-32 relative error = 5.0336162816330627988493522998948e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.199 y[1] (analytic) = 0.59659168343722025033396964149711 y[1] (numeric) = 0.5965916834372202503339696414971 absolute error = 1e-32 relative error = 1.6761883005786665175721604464516e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.2 y[1] (analytic) = 0.59719010753287386116867291544788 y[1] (numeric) = 0.59719010753287386116867291544785 absolute error = 3e-32 relative error = 5.0235259461910247826194776755851e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.201 y[1] (analytic) = 0.59778825783697733304866463571832 y[1] (numeric) = 0.5977882578369773330486646357183 absolute error = 2e-32 relative error = 3.3456662518543805775227843100244e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.202 y[1] (analytic) = 0.59838613351581834404065772258421 y[1] (numeric) = 0.59838613351581834404065772258419 absolute error = 2e-32 relative error = 3.3423234396308583209118842170987e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.203 y[1] (analytic) = 0.59898373373563603453231038826822 y[1] (numeric) = 0.59898373373563603453231038826819 absolute error = 3e-32 relative error = 5.0084832542782580704929778700256e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.204 y[1] (analytic) = 0.59958105766262207687822720641283 y[1] (numeric) = 0.59958105766262207687822720641281 absolute error = 2e-32 relative error = 3.3356624170161473955173890712627e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.205 y[1] (analytic) = 0.60017810446292174541635521715998 y[1] (numeric) = 0.60017810446292174541635521715996 absolute error = 2e-32 relative error = 3.3323441577225306876225061233313e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.206 y[1] (analytic) = 0.60077487330263498685346884341198 y[1] (numeric) = 0.60077487330263498685346884341194 absolute error = 4e-32 relative error = 6.6580680680116188177660403548268e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.207 y[1] (analytic) = 0.60137136334781749101843670206906 y[1] (numeric) = 0.60137136334781749101843670206903 absolute error = 3e-32 relative error = 4.9885980325020537245562621270180e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.208 y[1] (analytic) = 0.60196757376448176198196270380294 y[1] (numeric) = 0.60196757376448176198196270380292 absolute error = 2e-32 relative error = 3.3224380966116536477062437875084e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.209 y[1] (analytic) = 0.60256350371859818954149314623349 y[1] (numeric) = 0.60256350371859818954149314623346 absolute error = 3e-32 relative error = 4.9787283522584918652933189782367e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.21 y[1] (analytic) = 0.60315915237609612106998081823002 y[1] (numeric) = 0.60315915237609612106998081823 absolute error = 2e-32 relative error = 3.3158744124517777283460413981806e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.211 y[1] (analytic) = 0.60375451890286493372719644745905 y[1] (numeric) = 0.60375451890286493372719644745903 absolute error = 2e-32 relative error = 3.3126046056506122282216267706540e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.212 y[1] (analytic) = 0.60434960246475510703227713924754 y[1] (numeric) = 0.60434960246475510703227713924752 absolute error = 2e-32 relative error = 3.3093427907345027706094053788741e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.213 y[1] (analytic) = 0.60494440222757929579620077232761 y[1] (numeric) = 0.60494440222757929579620077232758 absolute error = 3e-32 relative error = 4.9591334161505372677091956274170e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.214 y[1] (analytic) = 0.6055389173571134034128746360741 y[1] (numeric) = 0.60553891735711340341287463607407 absolute error = 3e-32 relative error = 4.9542645633637544065055860950105e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.215 y[1] (analytic) = 0.60613314701909765550752591444285 y[1] (numeric) = 0.60613314701909765550752591444284 absolute error = 1e-32 relative error = 1.6498025308760958417109697116351e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.216 y[1] (analytic) = 0.60672709037923767394108094396511 y[1] (numeric) = 0.6067270903792376739410809439651 absolute error = 1e-32 relative error = 1.6481874896585633092517709197340e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.217 y[1] (analytic) = 0.6073207466032055511692194968539 y[1] (numeric) = 0.60732074660320555116921949685387 absolute error = 3e-32 relative error = 4.9397291575814667639797818311395e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.218 y[1] (analytic) = 0.60791411485664092495478966553199 y[1] (numeric) = 0.60791411485664092495478966553197 absolute error = 2e-32 relative error = 3.2899384158429065728321568051633e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.219 y[1] (analytic) = 0.60850719430515205343226825169944 y[1] (numeric) = 0.60850719430515205343226825169943 absolute error = 1e-32 relative error = 1.6433659443285456170752940593633e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.22 y[1] (analytic) = 0.60909998411431689052295089142194 y[1] (numeric) = 0.60909998411431689052295089142193 absolute error = 1e-32 relative error = 1.6417665836161282007134578612045e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.221 y[1] (analytic) = 0.60969248344968416169955547764202 y[1] (numeric) = 0.60969248344968416169955547764201 absolute error = 1e-32 relative error = 1.6401711143656022857553885924254e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.222 y[1] (analytic) = 0.61028469147677444009892177299255 y[1] (numeric) = 0.61028469147677444009892177299252 absolute error = 3e-32 relative error = 4.9157385756155261199862480302171e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.223 y[1] (analytic) = 0.61087660736108122298148943882792 y[1] (numeric) = 0.6108766073610812229814894388279 absolute error = 2e-32 memory used=301.3MB, alloc=4.5MB, time=14.39 relative error = 3.2739836096192598093993250220328e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.224 y[1] (analytic) = 0.61146823026807200853623604098444 y[1] (numeric) = 0.61146823026807200853623604098441 absolute error = 3e-32 relative error = 4.9062238257002800042713419348307e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.225 y[1] (analytic) = 0.61205955936318937302975592893649 y[1] (numeric) = 0.61205955936318937302975592893645 absolute error = 4e-32 relative error = 6.5353117009752383276947978075561e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.226 y[1] (analytic) = 0.61265059381185204829816022273346 y[1] (numeric) = 0.61265059381185204829816022273342 absolute error = 4e-32 relative error = 6.5290069746156473797868542797517e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.227 y[1] (analytic) = 0.61324133277945599958047748138141 y[1] (numeric) = 0.61324133277945599958047748138138 absolute error = 3e-32 relative error = 4.8920381579675903312980444702585e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.228 y[1] (analytic) = 0.61383177543137550369223396717692 y[1] (numeric) = 0.6138317754313755036922339671769 absolute error = 2e-32 relative error = 3.2582216823078000167937133033662e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.229 y[1] (analytic) = 0.61442192093296422753789176290793 y[1] (numeric) = 0.61442192093296422753789176290791 absolute error = 2e-32 relative error = 3.2550921961949460130139279077520e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.23 y[1] (analytic) = 0.6150117684495563069608223428092 y[1] (numeric) = 0.61501176844955630696082234280916 absolute error = 4e-32 relative error = 6.5039405832574450684302452556344e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.231 y[1] (analytic) = 0.61560131714646742592949254369893 y[1] (numeric) = 0.61560131714646742592949254369891 absolute error = 2e-32 relative error = 3.2488559466875676490356620028713e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.232 y[1] (analytic) = 0.61619056618899589605853922982989 y[1] (numeric) = 0.61619056618899589605853922982987 absolute error = 2e-32 relative error = 3.2457491395390281470028035020879e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.233 y[1] (analytic) = 0.61677951474242373646340829366188 y[1] (numeric) = 0.61677951474242373646340829366184 absolute error = 4e-32 relative error = 6.4852996968786475728477993254532e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.234 y[1] (analytic) = 0.61736816197201775394723298500741 y[1] (numeric) = 0.61736816197201775394723298500737 absolute error = 4e-32 relative error = 6.4791161034658282572913532840386e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.235 y[1] (analytic) = 0.6179565070430306235186259128155 y[1] (numeric) = 0.61795650704303062351862591281547 absolute error = 3e-32 relative error = 4.8547105917781019113588051996688e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.236 y[1] (analytic) = 0.61854454912070196923905841724369 y[1] (numeric) = 0.61854454912070196923905841724365 absolute error = 4e-32 relative error = 6.4667937106328703002826961288586e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.237 y[1] (analytic) = 0.61913228737025944539850036462547 y[1] (numeric) = 0.61913228737025944539850036462544 absolute error = 3e-32 relative error = 4.8454911190989319953831943536588e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.238 y[1] (analytic) = 0.61971972095691981801799277447093 y[1] (numeric) = 0.6197197209569198180179927744709 absolute error = 3e-32 relative error = 4.8408980681906470582271502358539e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.239 y[1] (analytic) = 0.62030684904589004667782504574168 y[1] (numeric) = 0.62030684904589004667782504574164 absolute error = 4e-32 relative error = 6.4484214645582313052828049969607e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.24 y[1] (analytic) = 0.62089367080236836666998790932111 y[1] (numeric) = 0.62089367080236836666998790932108 absolute error = 3e-32 relative error = 4.8317451780804280277136938706241e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.241 y[1] (analytic) = 0.62148018539154537147357259485567 y[1] (numeric) = 0.62148018539154537147357259485564 absolute error = 3e-32 relative error = 4.8271852756012453528071059634147e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.242 y[1] (analytic) = 0.62206639197860509555178606297465 y[1] (numeric) = 0.62206639197860509555178606297462 absolute error = 3e-32 relative error = 4.8226363595337583260738301928611e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.243 y[1] (analytic) = 0.62265228972872609746925151830605 y[1] (numeric) = 0.62265228972872609746925151830602 absolute error = 3e-32 relative error = 4.8180983985572820351367911581477e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.244 y[1] (analytic) = 0.62323787780708254332826278469437 y[1] (numeric) = 0.62323787780708254332826278469434 absolute error = 3e-32 relative error = 4.8135713614772013978330327312090e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.245 y[1] (analytic) = 0.62382315537884529052266049159437 y[1] (numeric) = 0.62382315537884529052266049159434 absolute error = 3e-32 relative error = 4.8090552172243623741268793996110e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.246 y[1] (analytic) = 0.62440812160918297180799738976388 y[1] (numeric) = 0.62440812160918297180799738976386 absolute error = 2e-32 relative error = 3.2030332899029778340390244920350e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.247 y[1] (analytic) = 0.62499277566326307968665948510924 y[1] (numeric) = 0.62499277566326307968665948510922 absolute error = 2e-32 relative error = 3.2000369890316469843089703581408e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.248 y[1] (analytic) = 0.62557711670625305110660905184971 y[1] (numeric) = 0.6255771167062530511066090518497 absolute error = 1e-32 relative error = 1.5985239442023285057954942991028e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.249 y[1] (analytic) = 0.62616114390332135247241496006434 y[1] (numeric) = 0.62616114390332135247241496006431 absolute error = 3e-32 relative error = 4.7910989514596852193018753870323e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=305.1MB, alloc=4.5MB, time=14.58 x[1] = 2.25 y[1] (analytic) = 0.62674485641963856496723512816485 y[1] (numeric) = 0.62674485641963856496723512816483 absolute error = 2e-32 relative error = 3.1910912064364754282904467619717e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.251 y[1] (analytic) = 0.62732825342037847018441528790569 y[1] (numeric) = 0.62732825342037847018441528790568 absolute error = 1e-32 relative error = 1.5940617922876984505569051122735e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.252 y[1] (analytic) = 0.62791133407071913606736762819362 y[1] (numeric) = 0.6279113340707191360673676281936 absolute error = 2e-32 relative error = 3.1851630819181040911312449309578e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.253 y[1] (analytic) = 0.6284940975358440031563922642002 y[1] (numeric) = 0.62849409753584400315639226420019 absolute error = 1e-32 relative error = 1.5911048392033123797498280643239e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.254 y[1] (analytic) = 0.62907654298094297114110386010833 y[1] (numeric) = 0.62907654298094297114110386010831 absolute error = 2e-32 relative error = 3.1792633540630799096389309338912e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.255 y[1] (analytic) = 0.62965866957121348571712511724046 y[1] (numeric) = 0.62965866957121348571712511724045 absolute error = 1e-32 relative error = 1.5881620444946505178356795108223e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.256 y[1] (analytic) = 0.63024047647186162574570822432455 y[1] (numeric) = 0.63024047647186162574570822432454 absolute error = 1e-32 relative error = 1.5866959316832247983257939080117e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.257 y[1] (analytic) = 0.63082196284810319071494475325052 y[1] (numeric) = 0.6308219628481031907149447532505 absolute error = 2e-32 relative error = 3.1704666574546387016204980110621e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.258 y[1] (analytic) = 0.63140312786516478850122387186118 y[1] (numeric) = 0.63140312786516478850122387186116 absolute error = 2e-32 relative error = 3.1675484515925569906316702001495e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.259 y[1] (analytic) = 0.63198397068828492342959813510368 y[1] (numeric) = 0.63198397068828492342959813510366 absolute error = 2e-32 relative error = 3.1646372261970946970134018478166e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.26 y[1] (analytic) = 0.63256449048271508463171550724418 y[1] (numeric) = 0.63256449048271508463171550724417 absolute error = 1e-32 relative error = 1.5808664808814859381212676836786e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.261 y[1] (analytic) = 0.63314468641372083469997566081978 y[1] (numeric) = 0.63314468641372083469997566081976 absolute error = 2e-32 relative error = 3.1588356388623687869186821391512e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.262 y[1] (analytic) = 0.63372455764658289863656799256812 y[1] (numeric) = 0.63372455764658289863656799256811 absolute error = 1e-32 relative error = 1.5779726190722792047193916424121e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.263 y[1] (analytic) = 0.63430410334659825309604819273868 y[1] (numeric) = 0.63430410334659825309604819273865 absolute error = 3e-32 relative error = 4.7295926105033116321235177552720e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.264 y[1] (analytic) = 0.63488332267908121592010960194963 y[1] (numeric) = 0.63488332267908121592010960194961 absolute error = 2e-32 relative error = 3.1501851262376812823271351164023e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.265 y[1] (analytic) = 0.63546221480936453596320498911388 y[1] (numeric) = 0.63546221480936453596320498911387 absolute error = 1e-32 relative error = 1.5736576883646732066618148645309e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.266 y[1] (analytic) = 0.63604077890280048320767378491491 y[1] (numeric) = 0.6360407789028004832076737849149 absolute error = 1e-32 relative error = 1.5722262363822738957820417938638e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.267 y[1] (analytic) = 0.63661901412476193916702920787197 y[1] (numeric) = 0.63661901412476193916702920787196 absolute error = 1e-32 relative error = 1.5707981976862918059443693302637e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.268 y[1] (analytic) = 0.63719691964064348757605912419302 y[1] (numeric) = 0.63719691964064348757605912419301 absolute error = 1e-32 relative error = 1.5693735628288420010387167552322e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.269 y[1] (analytic) = 0.63777449461586250536639388837468 y[1] (numeric) = 0.63777449461586250536639388837466 absolute error = 2e-32 relative error = 3.1359046447986581113797048436169e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.27 y[1] (analytic) = 0.63835173821586025392619381887266 y[1] (numeric) = 0.63835173821586025392619381887265 absolute error = 1e-32 relative error = 1.5665344670242716127202054114696e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.271 y[1] (analytic) = 0.6389286496061029706426083721336 y[1] (numeric) = 0.63892864960610297064260837213358 absolute error = 2e-32 relative error = 3.1302399747342558941809543544907e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.272 y[1] (analytic) = 0.63950522795208296072565848885112 y[1] (numeric) = 0.63950522795208296072565848885109 absolute error = 3e-32 relative error = 4.6911266223843675889475305138954e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.273 y[1] (analytic) = 0.64008147241931968931219299848729 y[1] (numeric) = 0.64008147241931968931219299848727 absolute error = 2e-32 relative error = 3.1246022360881471681457053824899e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.274 y[1] (analytic) = 0.64065738217336087384856938188419 y[1] (numeric) = 0.64065738217336087384856938188419 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.275 y[1] (analytic) = 0.64123295637978357675070860718192 y[1] (numeric) = 0.64123295637978357675070860718191 absolute error = 1e-32 relative error = 1.5594956404700590088434941084451e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.276 y[1] (analytic) = 0.64180819420419529834017317125886 y[1] (numeric) = 0.64180819420419529834017317125885 absolute error = 1e-32 relative error = 1.5580979006351603768034876999249e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=309.0MB, alloc=4.5MB, time=14.76 TOP MAIN SOLVE Loop x[1] = 2.277 y[1] (analytic) = 0.64238309481223507005491689751915 y[1] (numeric) = 0.64238309481223507005491689751913 absolute error = 2e-32 relative error = 3.1134069625300283473524233143806e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.278 y[1] (analytic) = 0.64295765736957454793335446107009 y[1] (numeric) = 0.64295765736957454793335446107007 absolute error = 2e-32 relative error = 3.1106247465537100921439174922458e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.279 y[1] (analytic) = 0.64353188104191910637039803416262 y[1] (numeric) = 0.6435318810419191063703980341626 absolute error = 2e-32 relative error = 3.1078491352469944554564060410098e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.28 y[1] (analytic) = 0.64410576499500893214410786820847 y[1] (numeric) = 0.64410576499500893214410786820845 absolute error = 2e-32 relative error = 3.1050801105863377352784871536659e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.281 y[1] (analytic) = 0.64467930839462011871160305374187 y[1] (numeric) = 0.64467930839462011871160305374184 absolute error = 3e-32 relative error = 4.6534764819280419006094471433176e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.282 y[1] (analytic) = 0.64525251040656576077287812636078 y[1] (numeric) = 0.64525251040656576077287812636076 absolute error = 2e-32 relative error = 3.0995617494611905024093560138496e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.283 y[1] (analytic) = 0.64582537019669704910117061496453 y[1] (numeric) = 0.6458253701966970491011706149645 absolute error = 3e-32 relative error = 4.6452185659511939204980886069083e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.284 y[1] (analytic) = 0.64639788693090436563852405850115 y[1] (numeric) = 0.64639788693090436563852405850113 absolute error = 2e-32 relative error = 3.0940695203940026126201294857636e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.285 y[1] (analytic) = 0.6469700597751183788551904489516 y[1] (numeric) = 0.64697005977511837885519044895158 absolute error = 2e-32 relative error = 3.0913331610665013041860754256218e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.286 y[1] (analytic) = 0.64754188789531113937151549140707 y[1] (numeric) = 0.64754188789531113937151549140703 absolute error = 4e-32 relative error = 6.1772065634257234599035472979073e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.287 y[1] (analytic) = 0.64811337045749717584094950684431 y[1] (numeric) = 0.64811337045749717584094950684426 absolute error = 5e-32 relative error = 7.7146996619905352240738412510227e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.288 y[1] (analytic) = 0.64868450662773459109282623957012 y[1] (numeric) = 0.64868450662773459109282623957008 absolute error = 4e-32 relative error = 6.1663257856958649238510650460714e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.289 y[1] (analytic) = 0.64925529557212615853355126929244 y[1] (numeric) = 0.6492552955721261585335512692924 absolute error = 4e-32 relative error = 6.1609046969346399595423731458278e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.29 y[1] (analytic) = 0.64982573645682041880484116738195 y[1] (numeric) = 0.64982573645682041880484116738192 absolute error = 3e-32 relative error = 4.6166223214819436724137998953190e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.291 y[1] (analytic) = 0.65039582844801277669765397811655 y[1] (numeric) = 0.65039582844801277669765397811651 absolute error = 4e-32 relative error = 6.1501009462881674543622208041316e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.292 y[1] (analytic) = 0.65096557071194659832045104855068 y[1] (numeric) = 0.65096557071194659832045104855065 absolute error = 3e-32 relative error = 4.6085386616053542995242954884253e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.293 y[1] (analytic) = 0.65153496241491430852042967512523 y[1] (numeric) = 0.65153496241491430852042967512519 absolute error = 4e-32 relative error = 6.1393482019353192991473936313818e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.294 y[1] (analytic) = 0.65210400272325848855636548123017 y[1] (numeric) = 0.65210400272325848855636548123014 absolute error = 3e-32 relative error = 4.6004931536559628031126254052749e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.295 y[1] (analytic) = 0.65267269080337297402170288765479 y[1] (numeric) = 0.65267269080337297402170288765475 absolute error = 4e-32 relative error = 6.1286461902924286342944613764063e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.296 y[1] (analytic) = 0.65324102582170395301653148720687 y[1] (numeric) = 0.65324102582170395301653148720683 absolute error = 4e-32 relative error = 6.1233141243210323149613066886693e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.297 y[1] (analytic) = 0.653809006944751064567085585757 y[1] (numeric) = 0.65380900694475106456708558575697 absolute error = 3e-32 relative error = 4.5884959799177399801845534546369e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.298 y[1] (analytic) = 0.65437663333906849729140362456474 y[1] (numeric) = 0.65437663333906849729140362456469 absolute error = 5e-32 relative error = 7.6408596292423314686089214762828e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.299 y[1] (analytic) = 0.65494390417126608830978365297288 y[1] (numeric) = 0.65494390417126608830978365297284 absolute error = 4e-32 relative error = 6.1073932813549947064365318781984e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.3 y[1] (analytic) = 0.65551081860801042239867047641487 y[1] (numeric) = 0.65551081860801042239867047641484 absolute error = 3e-32 relative error = 4.5765835053196475695505807959497e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.301 y[1] (analytic) = 0.65607737581602593138660956216782 y[1] (numeric) = 0.65607737581602593138660956216779 absolute error = 3e-32 relative error = 4.5726313855413993124300874864226e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.302 y[1] (analytic) = 0.65664357496209599379090224440309 y[1] (numeric) = 0.65664357496209599379090224440306 absolute error = 3e-32 relative error = 4.5686885768632878197047158348289e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.303 y[1] (analytic) = 0.65720941521306403469359623083665 y[1] (numeric) = 0.65720941521306403469359623083663 absolute error = 2e-32 relative error = 3.0431700363751026205113976212363e-30 % Correct digits = 31 memory used=312.8MB, alloc=4.5MB, time=14.94 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.304 y[1] (analytic) = 0.65777489573583462585544487566402 y[1] (numeric) = 0.65777489573583462585544487566398 absolute error = 4e-32 relative error = 6.0811077253492783000344796772193e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.305 y[1] (analytic) = 0.65834001569737458606646814748055 y[1] (numeric) = 0.65834001569737458606646814748052 absolute error = 3e-32 relative error = 4.5569157706783519010057798998773e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.306 y[1] (analytic) = 0.65890477426471408173174768653831 y[1] (numeric) = 0.65890477426471408173174768653829 absolute error = 2e-32 relative error = 3.0353399734154950381246589608390e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.307 y[1] (analytic) = 0.65946917060494772769108781297471 y[1] (numeric) = 0.65946917060494772769108781297469 absolute error = 2e-32 relative error = 3.0327422253345815727989708316715e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.308 y[1] (analytic) = 0.66003320388523568827117381656949 y[1] (numeric) = 0.66003320388523568827117381656945 absolute error = 4e-32 relative error = 6.0603011734171881041254725769652e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.309 y[1] (analytic) = 0.66059687327280477856885832914311 y[1] (numeric) = 0.66059687327280477856885832914309 absolute error = 2e-32 relative error = 3.0275650414319563230347576325081e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.31 y[1] (analytic) = 0.66116017793494956596420605290459 y[1] (numeric) = 0.66116017793494956596420605290455 absolute error = 4e-32 relative error = 6.0499711469216061119326527084333e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.311 y[1] (analytic) = 0.66172311703903347186192659188823 y[1] (numeric) = 0.6617231170390334718619265918882 absolute error = 3e-32 relative error = 4.5336182502190521773736941335441e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.312 y[1] (analytic) = 0.66228568975248987365982460909216 y[1] (numeric) = 0.66228568975248987365982460909212 absolute error = 4e-32 relative error = 6.0396896111327489783252171382123e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.313 y[1] (analytic) = 0.6628478952428232069428960090407 y[1] (numeric) = 0.66284789524282320694289600904068 absolute error = 2e-32 relative error = 3.0172834738614257055476760091389e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.314 y[1] (analytic) = 0.66340973267761006790169832424674 y[1] (numeric) = 0.66340973267761006790169832424671 absolute error = 3e-32 relative error = 4.5220922338470982429982276811961e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.315 y[1] (analytic) = 0.66397120122450031597362296444188 y[1] (numeric) = 0.66397120122450031597362296444185 absolute error = 3e-32 relative error = 4.5182682539052583838567416738861e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.316 y[1] (analytic) = 0.66453230005121817670569646947942 y[1] (numeric) = 0.66453230005121817670569646947939 absolute error = 3e-32 relative error = 4.5144532474475325516045299959875e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.317 y[1] (analytic) = 0.66509302832556334483753739049284 y[1] (numeric) = 0.66509302832556334483753739049281 absolute error = 3e-32 relative error = 4.5106471910445265005867741884539e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.318 y[1] (analytic) = 0.6656533852154120876030949092158 y[1] (numeric) = 0.66565338521541208760309490921578 absolute error = 2e-32 relative error = 3.0045667075707577347922980823448e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.319 y[1] (analytic) = 0.66621336988871834824979479233694 y[1] (numeric) = 0.6662133698887183482497947923369 absolute error = 4e-32 relative error = 6.0040824468415339847186488557727e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.32 y[1] (analytic) = 0.66677298151351484977371776637523 y[1] (numeric) = 0.66677298151351484977371776637519 absolute error = 4e-32 relative error = 5.9990433189424665233806677994923e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.321 y[1] (analytic) = 0.6673322192579141988694348888217 y[1] (numeric) = 0.66733221925791419886943488882166 absolute error = 4e-32 relative error = 5.9940160006781542270695006878725e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.322 y[1] (analytic) = 0.66789108229010999009312398319859 y[1] (numeric) = 0.66789108229010999009312398319855 absolute error = 4e-32 relative error = 5.9890004613993799897386725502453e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.323 y[1] (analytic) = 0.66844956977837791023759069924207 y[1] (numeric) = 0.66844956977837791023759069924203 absolute error = 4e-32 relative error = 5.9839966705733475859125241670253e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.324 y[1] (analytic) = 0.66900768089107684291781725461722 y[1] (numeric) = 0.66900768089107684291781725461718 absolute error = 4e-32 relative error = 5.9790045977831636539901376694991e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.325 y[1] (analytic) = 0.66956541479664997336566141142635 y[1] (numeric) = 0.66956541479664997336566141142631 absolute error = 4e-32 relative error = 5.9740242127273225167585524887057e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.326 y[1] (analytic) = 0.67012277066362589343232773927481 y[1] (numeric) = 0.67012277066362589343232773927477 absolute error = 4e-32 relative error = 5.9690554852191938212669238743983e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.327 y[1] (analytic) = 0.67067974766061970679723271681193 y[1] (numeric) = 0.67067974766061970679723271681189 absolute error = 4e-32 relative error = 5.9640983851865129803423699937746e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.328 y[1] (analytic) = 0.67123634495633413438188472547077 y[1] (numeric) = 0.67123634495633413438188472547072 absolute error = 5e-32 relative error = 7.4489411033385929976953770674762e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.329 y[1] (analytic) = 0.6717925617195606199673994925886 y[1] (numeric) = 0.67179256171956061996739949258855 absolute error = 5e-32 relative error = 7.4427736847840343279713004912775e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=316.6MB, alloc=4.5MB, time=15.13 x[1] = 2.33 y[1] (analytic) = 0.67234839711918043601427104620214 y[1] (numeric) = 0.6723483971191804360142710462021 absolute error = 4e-32 relative error = 5.9492965509233752855705153780944e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.331 y[1] (analytic) = 0.67290385032416578968301775057754 y[1] (numeric) = 0.6729038503241657896830177505775 absolute error = 4e-32 relative error = 5.9443856623394761786357964738192e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.332 y[1] (analytic) = 0.67345892050358092905432249995635 y[1] (numeric) = 0.67345892050358092905432249995632 absolute error = 3e-32 relative error = 4.4546146894256608793896343546034e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.333 y[1] (analytic) = 0.67401360682658324954728565807599 y[1] (numeric) = 0.67401360682658324954728565807595 absolute error = 4e-32 relative error = 5.9345982922109742379094955379938e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.334 y[1] (analytic) = 0.67456790846242440053440884275638 y[1] (numeric) = 0.67456790846242440053440884275634 absolute error = 4e-32 relative error = 5.9297217519840151860632943550120e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.335 y[1] (analytic) = 0.67512182458045139215192716823602 y[1] (numeric) = 0.67512182458045139215192716823598 absolute error = 4e-32 relative error = 5.9248566027113185673815182095988e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.336 y[1] (analytic) = 0.67567535435010770230410707298946 y[1] (numeric) = 0.67567535435010770230410707298941 absolute error = 5e-32 relative error = 7.4000035191592940222366512240865e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.337 y[1] (analytic) = 0.67622849694093438386012637746638 y[1] (numeric) = 0.67622849694093438386012637746635 absolute error = 3e-32 relative error = 4.4363702706572523273312874216813e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.338 y[1] (analytic) = 0.67678125152257117204215273456081 y[1] (numeric) = 0.67678125152257117204215273456075 absolute error = 6e-32 relative error = 8.8654938157664011675797662664109e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.339 y[1] (analytic) = 0.67733361726475759200323615564598 y[1] (numeric) = 0.67733361726475759200323615564593 absolute error = 5e-32 relative error = 7.3818866693657543074197272392002e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.34 y[1] (analytic) = 0.67788559333733406659363081670191 y[1] (numeric) = 0.67788559333733406659363081670187 absolute error = 4e-32 relative error = 5.9007007071907082626130471022266e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.341 y[1] (analytic) = 0.6784371789102430243141608724122 y[1] (numeric) = 0.67843717891024302431416087241215 absolute error = 5e-32 relative error = 7.3698791213526611004065038652440e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.342 y[1] (analytic) = 0.67898837315353000745524453112227 y[1] (numeric) = 0.67898837315353000745524453112223 absolute error = 4e-32 relative error = 5.8911170767507925371893407269258e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.343 y[1] (analytic) = 0.67953917523734478042019017022898 y[1] (numeric) = 0.67953917523734478042019017022893 absolute error = 5e-32 relative error = 7.3579275223590079377808164802811e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.344 y[1] (analytic) = 0.68008958433194243823137779991291 y[1] (numeric) = 0.68008958433194243823137779991285 absolute error = 6e-32 relative error = 8.8223671384319891908482781766671e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.345 y[1] (analytic) = 0.680639599607684515217938713133 y[1] (numeric) = 0.68063959960768451521793871313293 absolute error = 7e-32 relative error = 1.0284444225746998444019426201491e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.346 y[1] (analytic) = 0.6811892202350400938835456914753 y[1] (numeric) = 0.68118922023504009388354569147524 absolute error = 6e-32 relative error = 8.8081252928954709591849018308921e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.347 y[1] (analytic) = 0.68173844538458691395292566978797 y[1] (numeric) = 0.68173844538458691395292566978792 absolute error = 5e-32 relative error = 7.3341910432810725531598031018768e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.348 y[1] (analytic) = 0.6822872742270124815957062975409 y[1] (numeric) = 0.68228727422701248159570629754084 absolute error = 6e-32 relative error = 8.7939497432333226337747569138027e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.349 y[1] (analytic) = 0.68283570593311517882620737152404 y[1] (numeric) = 0.68283570593311517882620737152397 absolute error = 7e-32 relative error = 1.0251367846141398038104256826785e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.35 y[1] (analytic) = 0.683383739673805373077787652842 y[1] (numeric) = 0.68338373967380537307778765284195 absolute error = 5e-32 relative error = 7.3165334638875281165113384740785e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.351 y[1] (analytic) = 0.68393137462010652695035712117607 y[1] (numeric) = 0.683931374620106526950357121176 absolute error = 7e-32 relative error = 1.0234944995597239271044550442031e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.352 y[1] (analytic) = 0.6844786099431563081296642609681 y[1] (numeric) = 0.68447860994315630812966426096802 absolute error = 8e-32 relative error = 1.1687728270521665570343747613113e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.353 y[1] (analytic) = 0.68502544481420769947696751753658 y[1] (numeric) = 0.68502544481420769947696751753652 absolute error = 6e-32 relative error = 8.7587987357569139157079128987125e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.354 y[1] (analytic) = 0.68557187840463010928769960616066 y[1] (numeric) = 0.6855718784046301092876996061606 absolute error = 6e-32 relative error = 8.7518175540723552062467986114114e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.355 y[1] (analytic) = 0.6861179098859104817177329038676 y[1] (numeric) = 0.68611790988591048171773290386753 absolute error = 7e-32 relative error = 1.0202328053444893594127556972170e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.356 y[1] (analytic) = 0.68666353842965440737585370203177 y[1] (numeric) = 0.6866635384296544073758537020317 absolute error = 7e-32 relative error = 1.0194221198941843235180309720113e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=320.4MB, alloc=4.5MB, time=15.32 TOP MAIN SOLVE Loop x[1] = 2.357 y[1] (analytic) = 0.68720876320758723408105264793943 y[1] (numeric) = 0.68720876320758723408105264793937 absolute error = 6e-32 relative error = 8.7309713164812507106674514391022e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.358 y[1] (analytic) = 0.68775358339155517778323825519484 y[1] (numeric) = 0.68775358339155517778323825519477 absolute error = 7e-32 relative error = 1.0178064017464706300414034674666e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.359 y[1] (analytic) = 0.68829799815352643364597991623987 y[1] (numeric) = 0.6882979981535264336459799162398 absolute error = 7e-32 relative error = 1.0170013596986568719212703600062e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.36 y[1] (analytic) = 0.68884200666559228728988640533256 y[1] (numeric) = 0.68884200666559228728988640533249 absolute error = 7e-32 relative error = 1.0161981894635303682904719356307e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.361 y[1] (analytic) = 0.6893856080999682261952254170794 y[1] (numeric) = 0.68938560809996822619522541707935 absolute error = 5e-32 relative error = 7.2528349029226426204534334912750e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.362 y[1] (analytic) = 0.68992880162899505126238924404413 y[1] (numeric) = 0.68992880162899505126238924404405 absolute error = 8e-32 relative error = 1.1595399381952386665679988030285e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.363 y[1] (analytic) = 0.69047158642513998852881125706103 y[1] (numeric) = 0.69047158642513998852881125706095 absolute error = 8e-32 relative error = 1.1586284153152983311954842736854e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.364 y[1] (analytic) = 0.69101396166099780104093741366699 y[1] (numeric) = 0.69101396166099780104093741366692 absolute error = 7e-32 relative error = 1.0130041342687235443612046281209e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.365 y[1] (analytic) = 0.69155592650929190087985658352996 y[1] (numeric) = 0.69155592650929190087985658352987 absolute error = 9e-32 relative error = 1.3014131836637617155807249595970e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.366 y[1] (analytic) = 0.6920974801428754613391930448977 y[1] (numeric) = 0.69209748014287546133919304489761 absolute error = 9e-32 relative error = 1.3003948516243773718856129845497e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.367 y[1] (analytic) = 0.69263862173473252925386407291762 y[1] (numeric) = 0.69263862173473252925386407291755 absolute error = 7e-32 relative error = 1.0106280216468880927743603555655e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.368 y[1] (analytic) = 0.69317935045797913747830510918631 y[1] (numeric) = 0.69317935045797913747830510918625 absolute error = 6e-32 relative error = 8.6557685194110854561207644569969e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.369 y[1] (analytic) = 0.69371966548586441751276457207933 y[1] (numeric) = 0.69371966548586441751276457207925 absolute error = 8e-32 relative error = 1.1532035774705902499659071862009e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.37 y[1] (analytic) = 0.69425956599177171227626993928634 y[1] (numeric) = 0.69425956599177171227626993928627 absolute error = 7e-32 relative error = 1.0082684262333899518984817716443e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.371 y[1] (analytic) = 0.69479905114921968902486630753597 y[1] (numeric) = 0.6947990511492196890248663075359 absolute error = 7e-32 relative error = 1.0074855439744452391761902566100e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.372 y[1] (analytic) = 0.69533812013186345241372820973739 y[1] (numeric) = 0.69533812013186345241372820973731 absolute error = 8e-32 relative error = 1.1505194046434395675512927378669e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.373 y[1] (analytic) = 0.69587677211349565770174504669605 y[1] (numeric) = 0.69587677211349565770174504669599 absolute error = 6e-32 relative error = 8.6222162320161706703736085370905e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.374 y[1] (analytic) = 0.69641500626804762409718006917577 y[1] (numeric) = 0.69641500626804762409718006917571 absolute error = 6e-32 relative error = 8.6155524306588845109940110496969e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.375 y[1] (analytic) = 0.69695282176959044824300242638147 y[1] (numeric) = 0.69695282176959044824300242638141 absolute error = 6e-32 relative error = 8.6089040930572108842114620020900e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.376 y[1] (analytic) = 0.69749021779233611784049137892762 y[1] (numeric) = 0.69749021779233611784049137892757 absolute error = 5e-32 relative error = 7.1685593180443010277110426963549e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.377 y[1] (analytic) = 0.69802719351063862540971135803499 y[1] (numeric) = 0.69802719351063862540971135803492 absolute error = 7e-32 relative error = 1.0028262602198051859515409640066e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.378 y[1] (analytic) = 0.69856374809899508218545613806581 y[1] (numeric) = 0.69856374809899508218545613806575 absolute error = 6e-32 relative error = 8.5890514878961714200786213489419e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.379 y[1] (analytic) = 0.69909988073204683214725997656498 y[1] (numeric) = 0.69909988073204683214725997656492 absolute error = 6e-32 relative error = 8.5824646311157054622521829791550e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.38 y[1] (analytic) = 0.69963559058458056618207316472125 y[1] (numeric) = 0.69963559058458056618207316472117 absolute error = 8e-32 relative error = 1.1434524068902211572425299542057e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.381 y[1] (analytic) = 0.70017087683152943637819902160183 y[1] (numeric) = 0.70017087683152943637819902160178 absolute error = 5e-32 relative error = 7.1411139272550284724455160652932e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.382 y[1] (analytic) = 0.70070573864797417044908895764395 y[1] (numeric) = 0.70070573864797417044908895764387 absolute error = 8e-32 relative error = 1.1417060769954818778181162038909e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.383 y[1] (analytic) = 0.70124017520914418628559182670849 y[1] (numeric) = 0.70124017520914418628559182670843 absolute error = 6e-32 relative error = 8.5562696093538935570990941563269e-30 % Correct digits = 31 h = 0.001 memory used=324.2MB, alloc=4.5MB, time=15.50 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.384 y[1] (analytic) = 0.70177418569041870663525338151883 y[1] (numeric) = 0.70177418569041870663525338151877 absolute error = 6e-32 relative error = 8.5497587719005175527524318089277e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.385 y[1] (analytic) = 0.7023077692673278739072612445152 y[1] (numeric) = 0.70230776926732787390726124451512 absolute error = 8e-32 relative error = 1.1391017371694294249483498615707e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.386 y[1] (analytic) = 0.70284092511555386510163040506093 y[1] (numeric) = 0.70284092511555386510163040506085 absolute error = 8e-32 relative error = 1.1382376458349693291118308013479e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.387 y[1] (analytic) = 0.70337365241093200686122385453554 y[1] (numeric) = 0.70337365241093200686122385453546 absolute error = 8e-32 relative error = 1.1373755574407213928820597480985e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.388 y[1] (analytic) = 0.70390595032945189064520257314456 y[1] (numeric) = 0.70390595032945189064520257314447 absolute error = 9e-32 relative error = 1.2785799005943470635647236605377e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.389 y[1] (analytic) = 0.70443781804725848802249868626816 y[1] (numeric) = 0.70443781804725848802249868626807 absolute error = 9e-32 relative error = 1.2776145416139794307405648168888e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.39 y[1] (analytic) = 0.70496925474065326608390521385946 y[1] (numeric) = 0.70496925474065326608390521385938 absolute error = 8e-32 relative error = 1.1348012620696586278243131369455e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.391 y[1] (analytic) = 0.70550025958609530297137544378985 y[1] (numeric) = 0.70550025958609530297137544378976 absolute error = 9e-32 relative error = 1.2756905299057073377732097639365e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.392 y[1] (analytic) = 0.70603083176020240352312456912412 y[1] (numeric) = 0.70603083176020240352312456912404 absolute error = 8e-32 relative error = 1.1330949924743703767533728197278e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.393 y[1] (analytic) = 0.70656097043975221503312584009298 y[1] (numeric) = 0.70656097043975221503312584009289 absolute error = 9e-32 relative error = 1.2737754244192888770191449247222e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.394 y[1] (analytic) = 0.70709067480168334312359309401403 y[1] (numeric) = 0.70709067480168334312359309401394 absolute error = 9e-32 relative error = 1.2728211982889205049212124380675e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.395 y[1] (analytic) = 0.70761994402309646772904114059815 y[1] (numeric) = 0.70761994402309646772904114059808 absolute error = 7e-32 relative error = 9.8923158669076778392985559829988e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.396 y[1] (analytic) = 0.70814877728125545919051509596341 y[1] (numeric) = 0.70814877728125545919051509596333 absolute error = 8e-32 relative error = 1.1297061093170030137236487425915e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.397 y[1] (analytic) = 0.70867717375358849445857937626668 y[1] (numeric) = 0.7086771737535884944585793762666 absolute error = 8e-32 relative error = 1.1288637896472802522607845179689e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.398 y[1] (analytic) = 0.70920513261768917340365668115394 y[1] (numeric) = 0.70920513261768917340365668115386 absolute error = 8e-32 relative error = 1.1280234211605114913401370679979e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.399 y[1] (analytic) = 0.70973265305131763523230691822288 y[1] (numeric) = 0.70973265305131763523230691822281 absolute error = 7e-32 relative error = 9.8628687434701710130821281065263e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.4 y[1] (analytic) = 0.71025973423240167500803564238939 y[1] (numeric) = 0.71025973423240167500803564238931 absolute error = 8e-32 relative error = 1.1263485193407215133814631967781e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.401 y[1] (analytic) = 0.71078637533903786027522120845058 y[1] (numeric) = 0.71078637533903786027522120845051 absolute error = 7e-32 relative error = 9.8482472974542756377538503289406e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.402 y[1] (analytic) = 0.71131257554949264778474946124456 y[1] (numeric) = 0.71131257554949264778474946124448 absolute error = 8e-32 relative error = 1.1246813672343636798551147998287e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.403 y[1] (analytic) = 0.71183833404220350031994441561852 y[1] (numeric) = 0.71183833404220350031994441561844 absolute error = 8e-32 relative error = 1.1238506859516357083627788882508e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.404 y[1] (analytic) = 0.71236364999578000362138300793684 y[1] (numeric) = 0.71236364999578000362138300793676 absolute error = 8e-32 relative error = 1.1230219284837725064597400367434e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.405 y[1] (analytic) = 0.71288852258900498340918163208568 y[1] (numeric) = 0.71288852258900498340918163208561 absolute error = 7e-32 relative error = 9.8192070403630907668052176136839e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.406 y[1] (analytic) = 0.71341295100083562250134180586484 y[1] (numeric) = 0.71341295100083562250134180586475 absolute error = 9e-32 relative error = 1.2615414378690552080938344525712e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.407 y[1] (analytic) = 0.71393693441040457802674194829881 y[1] (numeric) = 0.71393693441040457802674194829873 absolute error = 8e-32 relative error = 1.1205471540153185548701092537873e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.408 y[1] (analytic) = 0.71446047199702109873136188475051 y[1] (numeric) = 0.71446047199702109873136188475043 absolute error = 8e-32 relative error = 1.1197260469342460045035767453923e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.409 y[1] (analytic) = 0.7149835629401721423763263347804 y[1] (numeric) = 0.71498356294017214237632633478031 absolute error = 9e-32 relative error = 1.2587701964769636586676993407623e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=328.0MB, alloc=4.5MB, time=15.69 x[1] = 2.41 y[1] (analytic) = 0.71550620641952349322635327746507 y[1] (numeric) = 0.71550620641952349322635327746499 absolute error = 8e-32 relative error = 1.1180895327285745072767228682347e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.411 y[1] (analytic) = 0.71602840161492087962719273037032 y[1] (numeric) = 0.71602840161492087962719273037025 absolute error = 7e-32 relative error = 9.7761485217797138072196921940464e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.412 y[1] (analytic) = 0.71655014770639109167064112156617 y[1] (numeric) = 0.71655014770639109167064112156609 absolute error = 8e-32 relative error = 1.1164605890609665671954384226119e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.413 y[1] (analytic) = 0.71707144387414309894571607897652 y[1] (numeric) = 0.71707144387414309894571607897644 absolute error = 8e-32 relative error = 1.1156489452122320449130757906704e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.414 y[1] (analytic) = 0.71759228929856916837457610797347 y[1] (numeric) = 0.7175922892985691683745761079734 absolute error = 7e-32 relative error = 9.7548428326095135727456001155119e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.415 y[1] (analytic) = 0.71811268316024598213176927645686 y[1] (numeric) = 0.71811268316024598213176927645677 absolute error = 9e-32 relative error = 1.2532852031512804818819904900775e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.416 y[1] (analytic) = 0.71863262463993575564539467670436 y[1] (numeric) = 0.71863262463993575564539467670429 absolute error = 7e-32 relative error = 9.7407211417757235797392364393473e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.417 y[1] (analytic) = 0.71915211291858735567876008503733 y[1] (numeric) = 0.71915211291858735567876008503726 absolute error = 7e-32 relative error = 9.7336848133441346360110612152533e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.418 y[1] (analytic) = 0.71967114717733741849111889382068 y[1] (numeric) = 0.7196711471773374184911188938206 absolute error = 8e-32 relative error = 1.1116188319313965577102303508538e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.419 y[1] (analytic) = 0.72018972659751146807606904550665 y[1] (numeric) = 0.72018972659751146807606904550659 absolute error = 6e-32 relative error = 8.3311380021298019761019100943185e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.42 y[1] (analytic) = 0.72070785036062503447619635533807 y[1] (numeric) = 0.720707850360625034476196355338 absolute error = 7e-32 relative error = 9.7126734452765663700500853683887e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.421 y[1] (analytic) = 0.72122551764838477217254426795004 y[1] (numeric) = 0.72122551764838477217254426794999 absolute error = 5e-32 relative error = 6.9326443361334634830492622129960e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.422 y[1] (analytic) = 0.72174272764268957854749175345121 y[1] (numeric) = 0.72174272764268957854749175345114 absolute error = 7e-32 relative error = 9.6987468413612659516092513746359e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.423 y[1] (analytic) = 0.72225947952563171241962071062351 y[1] (numeric) = 0.72225947952563171241962071062344 absolute error = 7e-32 relative error = 9.6918077206788427782446297604282e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.424 y[1] (analytic) = 0.72277577247949791264915390865909 y[1] (numeric) = 0.72277577247949791264915390865903 absolute error = 6e-32 relative error = 8.3013297186440966199096219369420e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.425 y[1] (analytic) = 0.72329160568677051681254416434922 y[1] (numeric) = 0.72329160568677051681254416434916 absolute error = 6e-32 relative error = 8.2954094210770735887571242855716e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.426 y[1] (analytic) = 0.72380697833012857994479511885842 y[1] (numeric) = 0.72380697833012857994479511885836 absolute error = 6e-32 relative error = 8.2895028365744744175612489260915e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.427 y[1] (analytic) = 0.72432188959244899334809364715484 y[1] (numeric) = 0.72432188959244899334809364715477 absolute error = 7e-32 relative error = 9.6642115895995620977826883025868e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.428 y[1] (analytic) = 0.72483633865680760346533360382723 y[1] (numeric) = 0.72483633865680760346533360382715 absolute error = 8e-32 relative error = 1.1036974242799112257087889084479e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.429 y[1] (analytic) = 0.72535032470648033081711028140006 y[1] (numeric) = 0.72535032470648033081711028139999 absolute error = 7e-32 relative error = 9.6505092250873593738226658077403e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.43 y[1] (analytic) = 0.72586384692494428900076463136181 y[1] (numeric) = 0.72586384692494428900076463136173 absolute error = 8e-32 relative error = 1.1021350676013507683569887445321e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.431 y[1] (analytic) = 0.72637690449587890375005597394757 y[1] (numeric) = 0.7263769044958789037500559739475 absolute error = 7e-32 relative error = 9.6368702758496287927543832818960e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.432 y[1] (analytic) = 0.72688949660316703205404160026784 y[1] (numeric) = 0.72688949660316703205404160026777 absolute error = 7e-32 relative error = 9.6300744923564785561105583881951e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.433 y[1] (analytic) = 0.72740162243089608133374134964852 y[1] (numeric) = 0.72740162243089608133374134964845 absolute error = 7e-32 relative error = 9.6232944554162131489451548825982e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.434 y[1] (analytic) = 0.72791328116335912867516492604692 y[1] (numeric) = 0.72791328116335912867516492604685 absolute error = 7e-32 relative error = 9.6165301295403236600100195621021e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.435 y[1] (analytic) = 0.72842447198505604011727940013198 y[1] (numeric) = 0.7284244719850560401172794001319 absolute error = 8e-32 relative error = 1.0982607404991362844366191363144e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.436 y[1] (analytic) = 0.72893519408069458999349402806732 y[1] (numeric) = 0.72893519408069458999349402806722 absolute error = 1.0e-31 relative error = 1.3718640670946915365688690898852e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=331.8MB, alloc=4.5MB, time=15.87 TOP MAIN SOLVE Loop x[1] = 2.437 y[1] (analytic) = 0.72944544663519158032523920421206 y[1] (numeric) = 0.72944544663519158032523920421199 absolute error = 7e-32 relative error = 9.5963310653179282516166656176362e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.438 y[1] (analytic) = 0.72995522883367396026621605285809 y[1] (numeric) = 0.72995522883367396026621605285802 absolute error = 7e-32 relative error = 9.5896292313497559075170835069413e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.439 y[1] (analytic) = 0.73046453986147994559589285375268 y[1] (numeric) = 0.73046453986147994559589285375261 absolute error = 7e-32 relative error = 9.5829429329005207787592731553639e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.44 y[1] (analytic) = 0.73097337890416013826082418751598 y[1] (numeric) = 0.7309733789041601382608241875159 absolute error = 8e-32 relative error = 1.0944311011699512594961164303932e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.441 y[1] (analytic) = 0.73148174514747864596236838014959 y[1] (numeric) = 0.73148174514747864596236838014952 absolute error = 7e-32 relative error = 9.5696168037504283465121324213077e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.442 y[1] (analytic) = 0.73198963777741420178937852065056 y[1] (numeric) = 0.73198963777741420178937852065048 absolute error = 8e-32 relative error = 1.0929116461663171946917833572056e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.443 y[1] (analytic) = 0.73249705598016128389444202229159 y[1] (numeric) = 0.73249705598016128389444202229152 absolute error = 7e-32 relative error = 9.5563524014894959008515350537194e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.444 y[1] (analytic) = 0.73300399894213123521224339640674 y[1] (numeric) = 0.73300399894213123521224339640665 absolute error = 9e-32 relative error = 1.2278241337003301478493508483868e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.445 y[1] (analytic) = 0.73351046584995338321862460752923 y[1] (numeric) = 0.73351046584995338321862460752917 absolute error = 6e-32 relative error = 8.1798423871805500264004833819404e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.446 y[1] (analytic) = 0.73401645589047615972891708046955 y[1] (numeric) = 0.73401645589047615972891708046948 absolute error = 7e-32 relative error = 9.5365709362849514534038249261100e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.447 y[1] (analytic) = 0.73452196825076822073411913339245 y[1] (numeric) = 0.73452196825076822073411913339236 absolute error = 9e-32 relative error = 1.2252867019666007237222054402278e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.448 y[1] (analytic) = 0.73502700211811956627349231615819 y[1] (numeric) = 0.73502700211811956627349231615811 absolute error = 8e-32 relative error = 1.0883953891416892582410391182302e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.449 y[1] (analytic) = 0.7355315566800426603421498401301 y[1] (numeric) = 0.73553155668004266034214984013002 absolute error = 8e-32 relative error = 1.0876487796267335542905564347562e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.45 y[1] (analytic) = 0.73603563112427355083220999432259 y[1] (numeric) = 0.73603563112427355083220999432251 absolute error = 8e-32 relative error = 1.0869039027064799701215535792567e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.451 y[1] (analytic) = 0.73653922463877298950608715317037 y[1] (numeric) = 0.7365392246387729895060871531703 absolute error = 7e-32 relative error = 9.5039066024393578902909475364920e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.452 y[1] (analytic) = 0.73704233641172755200049269334017 y[1] (numeric) = 0.73704233641172755200049269334009 absolute error = 8e-32 relative error = 1.0854193313979496501941927442149e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.453 y[1] (analytic) = 0.73754496563155075785971785088239 y[1] (numeric) = 0.73754496563155075785971785088232 absolute error = 7e-32 relative error = 9.4909467574034423549425549630267e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.454 y[1] (analytic) = 0.73804711148688419059677026563331 y[1] (numeric) = 0.73804711148688419059677026563322 absolute error = 9e-32 relative error = 1.2194343504533773499095900871055e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.455 y[1] (analytic) = 0.73854877316659861778093567712583 y[1] (numeric) = 0.73854877316659861778093567712575 absolute error = 8e-32 relative error = 1.0832053739253040258333253853215e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.456 y[1] (analytic) = 0.7390499498597951111503359553542 y[1] (numeric) = 0.73904994985979511115033595535412 absolute error = 8e-32 relative error = 1.0824708129021153441738905007631e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.457 y[1] (analytic) = 0.73955064075580616674805437055974 y[1] (numeric) = 0.73955064075580616674805437055966 absolute error = 8e-32 relative error = 1.0817379580422184213189825939904e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.458 y[1] (analytic) = 0.74005084504419682508039872876742 y[1] (numeric) = 0.74005084504419682508039872876736 absolute error = 6e-32 relative error = 8.1075510421742332917120322921721e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.459 y[1] (analytic) = 0.74055056191476579129587272410241 y[1] (numeric) = 0.74055056191476579129587272410233 absolute error = 8e-32 relative error = 1.0802773519359999962747377881310e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.46 y[1] (analytic) = 0.74104979055754655538342558495466 y[1] (numeric) = 0.74104979055754655538342558495459 absolute error = 7e-32 relative error = 9.4460589412398084282068775796188e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.461 y[1] (analytic) = 0.74154853016280851238854981883945 y[1] (numeric) = 0.74154853016280851238854981883938 absolute error = 7e-32 relative error = 9.4397058523777742945412984722589e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.462 y[1] (analytic) = 0.7420467799210580826457965903194 y[1] (numeric) = 0.74204677992105808264579659031933 absolute error = 7e-32 relative error = 9.4333675307433961508245761424854e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.463 y[1] (analytic) = 0.74254453902303983202627799761435 y[1] (numeric) = 0.74254453902303983202627799761428 absolute error = 7e-32 relative error = 9.4270439443401555889943210882546e-30 % Correct digits = 31 h = 0.001 memory used=335.7MB, alloc=4.5MB, time=16.06 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.464 y[1] (analytic) = 0.74304180665973759219872524652588 y[1] (numeric) = 0.74304180665973759219872524652581 absolute error = 7e-32 relative error = 9.4207350612850805516125570919010e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.465 y[1] (analytic) = 0.74353858202237558090267145504604 y[1] (numeric) = 0.74353858202237558090267145504598 absolute error = 6e-32 relative error = 8.0695207284071235809734243438474e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.466 y[1] (analytic) = 0.74403486430241952223232755850503 y[1] (numeric) = 0.74403486430241952223232755850495 absolute error = 8e-32 relative error = 1.0752184318003046636260305552726e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.467 y[1] (analytic) = 0.74453065269157776692971952333987 y[1] (numeric) = 0.74453065269157776692971952333981 absolute error = 6e-32 relative error = 8.0587682700627549657766421230077e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.468 y[1] (analytic) = 0.7450259463818024126856548175381 y[1] (numeric) = 0.74502594638180241268565481753804 absolute error = 6e-32 relative error = 8.0534107961458678214715591286779e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.469 y[1] (analytic) = 0.7455207445652904244470858275241 y[1] (numeric) = 0.74552074456529042444708582752402 absolute error = 8e-32 relative error = 1.0730754386539252753771527131797e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.47 y[1] (analytic) = 0.74601504643448475472943765471602 y[1] (numeric) = 0.74601504643448475472943765471596 absolute error = 6e-32 relative error = 8.0427332245864046923810659237528e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.471 y[1] (analytic) = 0.746508851182075463932467470185 y[1] (numeric) = 0.74650885118207546393246747018492 absolute error = 8e-32 relative error = 1.0716550764712606264542619832603e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.472 y[1] (analytic) = 0.74700215800100084065822235279681 y[1] (numeric) = 0.74700215800100084065822235279676 absolute error = 5e-32 relative error = 6.6934210918213986632535298405971e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.473 y[1] (analytic) = 0.74749496608444852202966228491316 y[1] (numeric) = 0.7474949660844485220296622849131 absolute error = 6e-32 relative error = 8.0268099080712040094867173034599e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.474 y[1] (analytic) = 0.74798727462585661400851473016906 y[1] (numeric) = 0.74798727462585661400851473016899 absolute error = 7e-32 relative error = 9.3584479809518168811340963138718e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.475 y[1] (analytic) = 0.7484790828189148117109269700332 y[1] (numeric) = 0.74847908281891481171092697003314 absolute error = 6e-32 relative error = 8.0162560821377358944943806545923e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.476 y[1] (analytic) = 0.74897038985756551971948212979251 y[1] (numeric) = 0.74897038985756551971948212979245 absolute error = 6e-32 relative error = 8.0109976058479992520364292627563e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.477 y[1] (analytic) = 0.7494611949360049723901445802861 y[1] (numeric) = 0.74946119493600497239014458028603 absolute error = 7e-32 relative error = 9.3400432834921043881455688862000e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.478 y[1] (analytic) = 0.74995149724868435415270015914566 y[1] (numeric) = 0.74995149724868435415270015914559 absolute error = 7e-32 relative error = 9.3339369621643623639065013348883e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.479 y[1] (analytic) = 0.75044129599031091980325641448 y[1] (numeric) = 0.75044129599031091980325641447992 absolute error = 8e-32 relative error = 1.0660394147743289188374277201414e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.48 y[1] (analytic) = 0.75093059035584911478736783487103 y[1] (numeric) = 0.75093059035584911478736783487096 absolute error = 7e-32 relative error = 9.3217670047012700110178754713411e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.481 y[1] (analytic) = 0.75141937954052169547235079222876 y[1] (numeric) = 0.75141937954052169547235079222869 absolute error = 7e-32 relative error = 9.3157033084246024658527555190371e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.482 y[1] (analytic) = 0.75190766273981084940735268848214 y[1] (numeric) = 0.75190766273981084940735268848209 absolute error = 5e-32 relative error = 6.6497526860957041517030211907235e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.483 y[1] (analytic) = 0.7523954391494593155697395632641 y[1] (numeric) = 0.75239543914945931556973956326404 absolute error = 6e-32 relative error = 7.9745299981917250889660274656830e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.484 y[1] (analytic) = 0.7528827079654715045963661876801 y[1] (numeric) = 0.75288270796547150459636618768004 absolute error = 6e-32 relative error = 7.9693688492513103590649027814877e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.485 y[1] (analytic) = 0.75336946838411461899829243893434 y[1] (numeric) = 0.75336946838411461899829243893427 absolute error = 7e-32 relative error = 9.2915897096469066872119693734911e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.486 y[1] (analytic) = 0.75385571960191977335750952202233 y[1] (numeric) = 0.75385571960191977335750952202227 absolute error = 6e-32 relative error = 7.9590826785374175267098793823390e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.487 y[1] (analytic) = 0.75434146081568311450423937788808 y[1] (numeric) = 0.75434146081568311450423937788803 absolute error = 5e-32 relative error = 6.6282980052473971657577536263447e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.488 y[1] (analytic) = 0.75482669122246694167337039238497 y[1] (numeric) = 0.75482669122246694167337039238491 absolute error = 6e-32 relative error = 7.9488445093042488506516274921384e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.489 y[1] (analytic) = 0.75531141001960082663859229707502 y[1] (numeric) = 0.75531141001960082663859229707496 absolute error = 6e-32 relative error = 7.9437433625480330867624888197573e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=339.5MB, alloc=4.5MB, time=16.24 x[1] = 2.49 y[1] (analytic) = 0.75579561640468273382279293135046 y[1] (numeric) = 0.75579561640468273382279293135042 absolute error = 4e-32 relative error = 5.2924360940699641381213605922110e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.491 y[1] (analytic) = 0.75627930957558014038327931556514 y[1] (numeric) = 0.75627930957558014038327931556508 absolute error = 6e-32 relative error = 7.9335768201395957272216220028516e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.492 y[1] (analytic) = 0.75676248873043115627038526682187 y[1] (numeric) = 0.75676248873043115627038526682183 absolute error = 4e-32 relative error = 5.2856742499361026017856360872378e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.493 y[1] (analytic) = 0.75724515306764564425802757277709 y[1] (numeric) = 0.75724515306764564425802757277702 absolute error = 7e-32 relative error = 9.2440340775277056930630188462324e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.494 y[1] (analytic) = 0.75772730178590633994477252429239 y[1] (numeric) = 0.75772730178590633994477252429233 absolute error = 6e-32 relative error = 7.9184160130675648613194050073330e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.495 y[1] (analytic) = 0.75820893408416997172397439499151 y[1] (numeric) = 0.75820893408416997172397439499144 absolute error = 7e-32 relative error = 9.2322837219732878275129890236535e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.496 y[1] (analytic) = 0.75869004916166838072154724476206 y[1] (numeric) = 0.758690049161668380721547244762 absolute error = 6e-32 relative error = 7.9083678593515689752091409779908e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.497 y[1] (analytic) = 0.75917064621790964069993121498409 y[1] (numeric) = 0.75917064621790964069993121498403 absolute error = 6e-32 relative error = 7.9033614245904093500024596403012e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.498 y[1] (analytic) = 0.75965072445267917792681427576437 y[1] (numeric) = 0.7596507244526791779268142757643 absolute error = 7e-32 relative error = 9.2147611720418362792848123995430e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.499 y[1] (analytic) = 0.76013028306604089100717017971268 y[1] (numeric) = 0.76013028306604089100717017971261 absolute error = 7e-32 relative error = 9.2089476711347295323581492817230e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.5 y[1] (analytic) = 0.76060932125833827067717317281111 y[1] (numeric) = 0.76060932125833827067717317281105 absolute error = 6e-32 relative error = 7.8884123981989975937474720925307e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.501 y[1] (analytic) = 0.76108783823019551955854981070163 y[1] (numeric) = 0.76108783823019551955854981070157 absolute error = 6e-32 relative error = 7.8834527351693990696937264622663e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.502 y[1] (analytic) = 0.76156583318251867187192802825084 y[1] (numeric) = 0.76156583318251867187192802825079 absolute error = 5e-32 relative error = 6.5654205876141086729504835815916e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.503 y[1] (analytic) = 0.76204330531649671310774341154479 y[1] (numeric) = 0.76204330531649671310774341154473 absolute error = 6e-32 relative error = 7.8735682842959187438710810408193e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.504 y[1] (analytic) = 0.76252025383360269965326242452015 y[1] (numeric) = 0.76252025383360269965326242452008 absolute error = 7e-32 relative error = 9.1800840237452121481712396146760e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.505 y[1] (analytic) = 0.76299667793559487837428214725365 y[1] (numeric) = 0.76299667793559487837428214725358 absolute error = 7e-32 relative error = 9.1743518712815093647196951346820e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.506 y[1] (analytic) = 0.76347257682451780615006588950718 y[1] (numeric) = 0.76347257682451780615006588950711 absolute error = 7e-32 relative error = 9.1686331801396605566046490326601e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.507 y[1] (analytic) = 0.76394794970270346936007385146403 y[1] (numeric) = 0.76394794970270346936007385146397 absolute error = 6e-32 relative error = 7.8539382196587458406883130694103e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.508 y[1] (analytic) = 0.76442279577277240332104781369181 y[1] (numeric) = 0.76442279577277240332104781369173 absolute error = 8e-32 relative error = 1.0465412654148569590349675674776e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.509 y[1] (analytic) = 0.76489711423763481167300865022962 y[1] (numeric) = 0.76489711423763481167300865022955 absolute error = 7e-32 relative error = 9.1515576012818781963722902585598e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.51 y[1] (analytic) = 0.76537090430049168571272527232329 y[1] (numeric) = 0.76537090430049168571272527232322 absolute error = 7e-32 relative error = 9.1458924825443003129537850860784e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.511 y[1] (analytic) = 0.76584416516483592367321342572029 y[1] (numeric) = 0.76584416516483592367321342572021 absolute error = 8e-32 relative error = 1.0445989359046857392092231426851e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.512 y[1] (analytic) = 0.76631689603445344994782258158954 y[1] (numeric) = 0.76631689603445344994782258158946 absolute error = 8e-32 relative error = 1.0439545364846453348060120924714e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.513 y[1] (analytic) = 0.76678909611342433425746898004789 y[1] (numeric) = 0.7667890961134243342574689800478 absolute error = 9e-32 relative error = 1.1737256105515498280145720177075e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.514 y[1] (analytic) = 0.76726076460612391075957270595633 y[1] (numeric) = 0.76726076460612391075957270595624 absolute error = 9e-32 relative error = 1.1730040704766367871585878083659e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.515 y[1] (analytic) = 0.76773190071722389709725649909628 y[1] (numeric) = 0.7677319007172238970972564990962 absolute error = 8e-32 relative error = 1.0420304265755153284077323088120e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.516 y[1] (analytic) = 0.76820250365169351338736382504787 y[1] (numeric) = 0.7682025036516935133873638250478 absolute error = 7e-32 relative error = 9.1121806642455719365150266548518e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=343.3MB, alloc=4.5MB, time=16.43 TOP MAIN SOLVE Loop x[1] = 2.517 y[1] (analytic) = 0.76867257261480060114585355907038 y[1] (numeric) = 0.7686725726148006011458535590703 absolute error = 8e-32 relative error = 1.0407552298615684950385047536876e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.518 y[1] (analytic) = 0.76914210681211274214912846302933 y[1] (numeric) = 0.76914210681211274214912846302925 absolute error = 8e-32 relative error = 1.0401198854081528956072360481536e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.519 y[1] (analytic) = 0.769611105449498377229854464926 y[1] (numeric) = 0.76961110544949837722985446492592 absolute error = 8e-32 relative error = 1.0394860395533828894889271106549e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.52 y[1] (analytic) = 0.77007956773312792500582758186272 y[1] (numeric) = 0.77007956773312792500582758186263 absolute error = 9e-32 relative error = 1.1687104004711058242763223570381e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.521 y[1] (analytic) = 0.77054749286947490054044516032366 y[1] (numeric) = 0.77054749286947490054044516032357 absolute error = 9e-32 relative error = 1.1680006856533285816085692730055e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.522 y[1] (analytic) = 0.77101488006531703393333794246405 y[1] (numeric) = 0.77101488006531703393333794246397 absolute error = 8e-32 relative error = 1.0375934637373373034254004118069e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.523 y[1] (analytic) = 0.77148172852773738883971930368279 y[1] (numeric) = 0.7714817285277373888397193036827 absolute error = 9e-32 relative error = 1.1665862802966459920875885734502e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.524 y[1] (analytic) = 0.77194803746412548091700784510406 y[1] (numeric) = 0.77194803746412548091700784510396 absolute error = 1.0e-31 relative error = 1.2954239812371732499358269862405e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.525 y[1] (analytic) = 0.7724138060821783961972793647135 y[1] (numeric) = 0.77241380608217839619727936471343 absolute error = 7e-32 relative error = 9.0624998477244440876499775072767e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.526 y[1] (analytic) = 0.77287903358990190938410407278361 y[1] (numeric) = 0.77287903358990190938410407278353 absolute error = 8e-32 relative error = 1.0350908295236389771205362786039e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.527 y[1] (analytic) = 0.77334371919561160207232476088188 y[1] (numeric) = 0.77334371919561160207232476088181 absolute error = 7e-32 relative error = 9.0516025749598174715247542172586e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.528 y[1] (analytic) = 0.77380786210793398088933147918566 y[1] (numeric) = 0.7738078621079339808893314791856 absolute error = 6e-32 relative error = 7.7538628047217937418897143890389e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.529 y[1] (analytic) = 0.77427146153580759555638812402664 y[1] (numeric) = 0.77427146153580759555638812402657 absolute error = 7e-32 relative error = 9.0407568246350407893728273583876e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.53 y[1] (analytic) = 0.77473451668848415686856618655977 y[1] (numeric) = 0.77473451668848415686856618655969 absolute error = 8e-32 relative error = 1.0326117950953189994200060528489e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.531 y[1] (analytic) = 0.77519702677552965459184076419405 y[1] (numeric) = 0.77519702677552965459184076419399 absolute error = 6e-32 relative error = 7.7399677665912839446619347133097e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.532 y[1] (analytic) = 0.77565899100682547527590378893676 y[1] (numeric) = 0.77565899100682547527590378893669 absolute error = 7e-32 relative error = 9.0245843613748595387146462042457e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.533 y[1] (analytic) = 0.77612040859256951998124928108927 y[1] (numeric) = 0.7761204085925695199812492810892 absolute error = 7e-32 relative error = 9.0192190831496414887370075400330e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.534 y[1] (analytic) = 0.77658127874327732191908529279242 y[1] (numeric) = 0.77658127874327732191908529279236 absolute error = 6e-32 relative error = 7.7261713155249566496870326135854e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.535 y[1] (analytic) = 0.77704160066978316400262706375084 y[1] (numeric) = 0.77704160066978316400262706375076 absolute error = 8e-32 relative error = 1.0295459075941719008681378623010e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.536 y[1] (analytic) = 0.77750137358324119630832577107128 y[1] (numeric) = 0.77750137358324119630832577107122 absolute error = 6e-32 relative error = 7.7170281672275725483524566363472e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.537 y[1] (analytic) = 0.77796059669512655344558711652978 y[1] (numeric) = 0.77796059669512655344558711652973 absolute error = 5e-32 relative error = 6.4270607293487900850215994170045e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.538 y[1] (analytic) = 0.77841926921723647183353385773447 y[1] (numeric) = 0.7784192692172364718335338577344 absolute error = 7e-32 relative error = 8.9925831448636492642374665290038e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.539 y[1] (analytic) = 0.77887739036169140688336625457956 y[1] (numeric) = 0.77887739036169140688336625457948 absolute error = 8e-32 relative error = 1.0271193000332180336290503870390e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.54 y[1] (analytic) = 0.77933495934093615008487426908811 y[1] (numeric) = 0.77933495934093615008487426908805 absolute error = 6e-32 relative error = 7.6988718754180463535426434174275e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.541 y[1] (analytic) = 0.77979197536774094599565522521837 y[1] (numeric) = 0.77979197536774094599565522521831 absolute error = 6e-32 relative error = 7.6943597645647338975860295799137e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.542 y[1] (analytic) = 0.78024843765520260913159050546177 y[1] (numeric) = 0.7802484376552026091315905054617 absolute error = 7e-32 relative error = 8.9715014630934131990492075141298e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.543 y[1] (analytic) = 0.78070434541674564075713473308985 y[1] (numeric) = 0.78070434541674564075713473308979 absolute error = 6e-32 relative error = 7.6853677518563784755141762438129e-30 % Correct digits = 31 h = 0.001 memory used=347.1MB, alloc=4.5MB, time=16.61 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.544 y[1] (analytic) = 0.78115969786612334557397076271205 y[1] (numeric) = 0.781159697866123345573970762712 absolute error = 5e-32 relative error = 6.4007398405964738284673406086571e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.545 y[1] (analytic) = 0.78161449421741894830658367738801 y[1] (numeric) = 0.78161449421741894830658367738796 absolute error = 5e-32 relative error = 6.3970154558177469356078041955775e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.546 y[1] (analytic) = 0.78206873368504671018330686789697 y[1] (numeric) = 0.78206873368504671018330686789691 absolute error = 6e-32 relative error = 7.6719599461910070738037683756074e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.547 y[1] (analytic) = 0.78252241548375304531139314890234 y[1] (numeric) = 0.78252241548375304531139314890228 absolute error = 6e-32 relative error = 7.6675119859548275391354051422802e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.548 y[1] (analytic) = 0.78297553882861763694466374766322 y[1] (numeric) = 0.78297553882861763694466374766315 absolute error = 7e-32 relative error = 8.9402537536133703081222302775730e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.549 y[1] (analytic) = 0.78342810293505455364228788363576 y[1] (numeric) = 0.78342810293505455364228788363568 absolute error = 8e-32 relative error = 1.0211530541256563027580486332751e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.55 y[1] (analytic) = 0.78388010701881336531724554177741 y[1] (numeric) = 0.78388010701881336531724554177733 absolute error = 8e-32 relative error = 1.0205642327657636963853494946948e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.551 y[1] (analytic) = 0.78433155029598025917302592861499 y[1] (numeric) = 0.78433155029598025917302592861491 absolute error = 8e-32 relative error = 1.0199768193668952838290231746124e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.552 y[1] (analytic) = 0.78478243198297915552711398816512 y[1] (numeric) = 0.78478243198297915552711398816506 absolute error = 6e-32 relative error = 7.6454310844335155726527669151619e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.553 y[1] (analytic) = 0.78523275129657282351981724460217 y[1] (numeric) = 0.78523275129657282351981724460211 absolute error = 6e-32 relative error = 7.6410465433246724728116470515885e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.554 y[1] (analytic) = 0.78568250745386399670698513015481 y[1] (numeric) = 0.78568250745386399670698513015475 absolute error = 6e-32 relative error = 7.6366725020313953568597129057393e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.555 y[1] (analytic) = 0.78613169967229648853517285007916 y[1] (numeric) = 0.7861316996722964885351728500791 absolute error = 6e-32 relative error = 7.6323089407298222937219782388798e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.556 y[1] (analytic) = 0.78658032716965630769780173170235 y[1] (numeric) = 0.78658032716965630769780173170229 absolute error = 6e-32 relative error = 7.6279558396657804752856713336316e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.557 y[1] (analytic) = 0.78702838916407277337086790145794 y[1] (numeric) = 0.78702838916407277337086790145787 absolute error = 7e-32 relative error = 8.8942153756803065160516291832618e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.558 y[1] (analytic) = 0.78747588487401963032675103254267 y[1] (numeric) = 0.78747588487401963032675103254259 absolute error = 8e-32 relative error = 1.0159041252774159265271056385035e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.559 y[1] (analytic) = 0.78792281351831616392467480631337 y[1] (numeric) = 0.7879228135183161639246748063133 absolute error = 7e-32 relative error = 8.8841189516303769531044653895045e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.56 y[1] (analytic) = 0.788369174316128314976370632814 y[1] (numeric) = 0.78836917431612831497637063281393 absolute error = 7e-32 relative error = 8.8790889193151894868628202425936e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.561 y[1] (analytic) = 0.78881496648696979448549607987541 y[1] (numeric) = 0.78881496648696979448549607987533 absolute error = 8e-32 relative error = 1.0141795401814488364390958404430e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.562 y[1] (analytic) = 0.78926018925070319825935936606607 y[1] (numeric) = 0.78926018925070319825935936606601 absolute error = 6e-32 relative error = 7.6020558007571572793519748598320e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.563 y[1] (analytic) = 0.78970484182754112139150118038943 y[1] (numeric) = 0.78970484182754112139150118038936 absolute error = 7e-32 relative error = 8.8640712697171075355787481008735e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.564 y[1] (analytic) = 0.79014892343804727261368500102383 y[1] (numeric) = 0.79014892343804727261368500102376 absolute error = 7e-32 relative error = 8.8590894606829705492203564888087e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.565 y[1] (analytic) = 0.79059243330313758851584699658557 y[1] (numeric) = 0.7905924333031375885158469965855 absolute error = 7e-32 relative error = 8.8541196514538149145522100181706e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.566 y[1] (analytic) = 0.79103537064408134763255650636194 y[1] (numeric) = 0.79103537064408134763255650636188 absolute error = 6e-32 relative error = 7.5849958455266616637203534380537e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.567 y[1] (analytic) = 0.79147773468250228439453801071275 y[1] (numeric) = 0.79147773468250228439453801071266 absolute error = 9e-32 relative error = 1.1371134784493096723584227584222e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.568 y[1] (analytic) = 0.79191952464037970294380541937343 y[1] (numeric) = 0.79191952464037970294380541937334 absolute error = 9e-32 relative error = 1.1364791143502882527120563048344e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.569 y[1] (analytic) = 0.79236073974004959081095942371322 y[1] (numeric) = 0.79236073974004959081095942371313 absolute error = 9e-32 relative error = 1.1358462817015185604780973895595e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=350.9MB, alloc=4.5MB, time=16.80 x[1] = 2.57 y[1] (analytic) = 0.79280137920420573245319857910483 y[1] (numeric) = 0.79280137920420573245319857910472 absolute error = 1.1e-31 relative error = 1.3874849727231208749919049399514e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.571 y[1] (analytic) = 0.79324144225590082265159470545221 y[1] (numeric) = 0.79324144225590082265159470545211 absolute error = 1.0e-31 relative error = 1.2606502216476463054037614265609e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.572 y[1] (analytic) = 0.79368092811854757976618311759741 y[1] (numeric) = 0.79368092811854757976618311759732 absolute error = 9e-32 relative error = 1.1339569443018947643075453411577e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.573 y[1] (analytic) = 0.7941198360159198588474181227868 y[1] (numeric) = 0.79411983601591985884741812278671 absolute error = 9e-32 relative error = 1.1333302093488539216386623726155e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.574 y[1] (analytic) = 0.79455816517215376460254414962374 y[1] (numeric) = 0.79455816517215376460254414962366 absolute error = 8e-32 relative error = 1.0068488816380952735412900950845e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.575 y[1] (analytic) = 0.7949959148117487642154328019666 y[1] (numeric) = 0.7949959148117487642154328019665 absolute error = 1.0e-31 relative error = 1.2578680989031185450462299058585e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.576 y[1] (analytic) = 0.79543308415956880001843606204904 y[1] (numeric) = 0.79543308415956880001843606204894 absolute error = 1.0e-31 relative error = 1.2571767756637512584230009461766e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.577 y[1] (analytic) = 0.79586967244084340201480579970573 y[1] (numeric) = 0.79586967244084340201480579970564 absolute error = 9e-32 relative error = 1.1308384163449783338514303615739e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.578 y[1] (analytic) = 0.79630567888116880025022967897792 y[1] (numeric) = 0.79630567888116880025022967897782 absolute error = 1.0e-31 relative error = 1.2557991566819255604395394658744e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.579 y[1] (analytic) = 0.79674110270650903703203348955341 y[1] (numeric) = 0.79674110270650903703203348955331 absolute error = 1.0e-31 relative error = 1.2551128548571496008352645755993e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.58 y[1] (analytic) = 0.79717594314319707899459986846283 y[1] (numeric) = 0.79717594314319707899459986846273 absolute error = 1.0e-31 relative error = 1.2544282207728006450602861486177e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.581 y[1] (analytic) = 0.79761019941793592900955331720833 y[1] (numeric) = 0.79761019941793592900955331720825 absolute error = 8e-32 relative error = 1.0029962011315904084709628575349e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.582 y[1] (analytic) = 0.79804387075779973793926136104485 y[1] (numeric) = 0.79804387075779973793926136104477 absolute error = 8e-32 relative error = 1.0024511550227718401330914731398e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.583 y[1] (analytic) = 0.79847695639023491623220164046472 y[1] (numeric) = 0.79847695639023491623220164046463 absolute error = 9e-32 relative error = 1.1271458653844336212005010187645e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.584 y[1] (analytic) = 0.79890945554306124535874467005744 y[1] (numeric) = 0.79890945554306124535874467005735 absolute error = 9e-32 relative error = 1.1265356715401773975404278162864e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.585 y[1] (analytic) = 0.7993413674444729890859019468249 y[1] (numeric) = 0.79934136744447298908590194682481 absolute error = 9e-32 relative error = 1.1259269651930273193132976779036e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.586 y[1] (analytic) = 0.79977269132304000458958903873089 y[1] (numeric) = 0.7997726913230400045895890387308 absolute error = 9e-32 relative error = 1.1253197436776153998957035663118e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.587 y[1] (analytic) = 0.80020342640770885340295323475153 y[1] (numeric) = 0.80020342640770885340295323475144 absolute error = 9e-32 relative error = 1.1247140043379971018583354966362e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.588 y[1] (analytic) = 0.80063357192780391219931528997082 y[1] (numeric) = 0.80063357192780391219931528997072 absolute error = 1.0e-31 relative error = 1.2490108272529117669179591446985e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.589 y[1] (analytic) = 0.80106312711302848340827475333268 y[1] (numeric) = 0.80106312711302848340827475333259 absolute error = 9e-32 relative error = 1.1235069616092961323267379548812e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.59 y[1] (analytic) = 0.80149209119346590566352832151917 y[1] (numeric) = 0.80149209119346590566352832151909 absolute error = 8e-32 relative error = 9.9813835818236946090680845876576e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.591 y[1] (analytic) = 0.80192046339958066408095062007201 y[1] (numeric) = 0.80192046339958066408095062007192 absolute error = 9e-32 relative error = 1.1223058159466723781085450501263e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.592 y[1] (analytic) = 0.80234824296221950036548677231426 y[1] (numeric) = 0.80234824296221950036548677231417 absolute error = 9e-32 relative error = 1.1217074479745307647270968410604e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.593 y[1] (analytic) = 0.80277542911261252274540607785856 y[1] (numeric) = 0.80277542911261252274540607785848 absolute error = 8e-32 relative error = 9.9654270794550789824275740963137e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.594 y[1] (analytic) = 0.80320202108237431573246608550969 y[1] (numeric) = 0.80320202108237431573246608550959 absolute error = 1.0e-31 relative error = 1.2450167874981512204815613340119e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.595 y[1] (analytic) = 0.8036280181035050497065363101817 y[1] (numeric) = 0.80362801810350504970653631018161 absolute error = 9e-32 relative error = 1.1199211323217983018750745428479e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.596 y[1] (analytic) = 0.80405341940839159032323081005507 y[1] (numeric) = 0.80405341940839159032323081005496 absolute error = 1.1e-31 relative error = 1.3680683067169351947610601838555e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=354.7MB, alloc=4.5MB, time=16.99 TOP MAIN SOLVE Loop x[1] = 2.597 y[1] (analytic) = 0.80447822422980860774309880859444 y[1] (numeric) = 0.80447822422980860774309880859434 absolute error = 1.0e-31 relative error = 1.2430417255325711733482305672056e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.598 y[1] (analytic) = 0.80490243180091968568092251623791 y[1] (numeric) = 0.8049024318009196856809225162378 absolute error = 1.1e-31 relative error = 1.3666252660447523502085556961853e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.599 y[1] (analytic) = 0.80532604135527843027367127854812 y[1] (numeric) = 0.80532604135527843027367127854801 absolute error = 1.1e-31 relative error = 1.3659064074828829677056621275294e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.6 y[1] (analytic) = 0.80574905212682957876566115139093 y[1] (numeric) = 0.80574905212682957876566115139083 absolute error = 1.0e-31 relative error = 1.2410811993640349877453878953522e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.601 y[1] (analytic) = 0.80617146334991010800946897927294 y[1] (numeric) = 0.80617146334991010800946897927282 absolute error = 1.2e-31 relative error = 1.4885170891730669267730105493660e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.602 y[1] (analytic) = 0.80659327425925034278115003032953 y[1] (numeric) = 0.80659327425925034278115003032941 absolute error = 1.2e-31 relative error = 1.4877386637051268561231218165613e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.603 y[1] (analytic) = 0.80701448408997506390830822060887 y[1] (numeric) = 0.80701448408997506390830822060876 absolute error = 1.1e-31 relative error = 1.3630486461967386584703669808971e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.604 y[1] (analytic) = 0.80743509207760461620956794124326 y[1] (numeric) = 0.80743509207760461620956794124314 absolute error = 1.2e-31 relative error = 1.4861875731859632672089438416980e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.605 y[1] (analytic) = 0.80785509745805601624399648484072 y[1] (numeric) = 0.8078550974580560162439964848406 absolute error = 1.2e-31 relative error = 1.4854149014790418135581084102428e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.606 y[1] (analytic) = 0.80827449946764405986902605196456 y[1] (numeric) = 0.80827449946764405986902605196445 absolute error = 1.1e-31 relative error = 1.3609237959684437240682399749056e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.607 y[1] (analytic) = 0.8086932973430824296054243048973 y[1] (numeric) = 0.80869329734308242960542430489717 absolute error = 1.3e-31 relative error = 1.6075315626716319448004675424593e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.608 y[1] (analytic) = 0.80911149032148480180786242400929 y[1] (numeric) = 0.80911149032148480180786242400918 absolute error = 1.1e-31 relative error = 1.3595159791426720128405246883271e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.609 y[1] (analytic) = 0.80952907764036595363962961197112 y[1] (numeric) = 0.80952907764036595363962961197101 absolute error = 1.1e-31 relative error = 1.3588146866895817966258072121656e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.61 y[1] (analytic) = 0.80994605853764286985004298276112 y[1] (numeric) = 0.80994605853764286985004298276099 absolute error = 1.3e-31 relative error = 1.6050451586209941337600673354874e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.611 y[1] (analytic) = 0.81036243225163584935310176592894 y[1] (numeric) = 0.8103624322516358493531017659288 absolute error = 1.4e-31 relative error = 1.7276220420411448196179909244374e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.612 y[1] (analytic) = 0.8107781980210696116059347518793 y[1] (numeric) = 0.81077819802106961160593475187917 absolute error = 1.3e-31 relative error = 1.6033978259072736321387043003534e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.613 y[1] (analytic) = 0.81119335508507440278558990103957 y[1] (numeric) = 0.81119335508507440278558990103942 absolute error = 1.5e-31 relative error = 1.8491275730959193767612869846843e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.614 y[1] (analytic) = 0.81160790268318710176271503866972 y[1] (numeric) = 0.81160790268318710176271503866958 absolute error = 1.4e-31 relative error = 1.7249708823331813029510406569533e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.615 y[1] (analytic) = 0.81202184005535232587067855776518 y[1] (numeric) = 0.81202184005535232587067855776504 absolute error = 1.4e-31 relative error = 1.7240915587991666852291341868830e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.616 y[1] (analytic) = 0.81243516644192353646867905498926 y[1] (numeric) = 0.81243516644192353646867905498913 absolute error = 1.3e-31 relative error = 1.6001276824258810035075750019334e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.617 y[1] (analytic) = 0.81284788108366414429739282885653 y[1] (numeric) = 0.81284788108366414429739282885639 absolute error = 1.4e-31 relative error = 1.7223394839063398393596389160012e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.618 y[1] (analytic) = 0.81325998322174861462570817546815 y[1] (numeric) = 0.81325998322174861462570817546803 absolute error = 1.2e-31 relative error = 1.4755429072584780118151254231881e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.619 y[1] (analytic) = 0.81367147209776357218709542497782 y[1] (numeric) = 0.81367147209776357218709542497769 absolute error = 1.3e-31 relative error = 1.5976964224251473947131023378526e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.62 y[1] (analytic) = 0.81408234695370890590416167164017 y[1] (numeric) = 0.81408234695370890590416167164003 absolute error = 1.4e-31 relative error = 1.7197277465096636949098502518799e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.621 y[1] (analytic) = 0.81449260703199887339993916176563 y[1] (numeric) = 0.81449260703199887339993916176549 absolute error = 1.4e-31 relative error = 1.7188615193225423197133708139911e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.622 y[1] (analytic) = 0.81490225157546320529445631717356 y[1] (numeric) = 0.81490225157546320529445631717344 absolute error = 1.2e-31 relative error = 1.4725692531589173111255840066903e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.623 memory used=358.5MB, alloc=4.5MB, time=17.17 y[1] (analytic) = 0.81531127982734820928514038680187 y[1] (numeric) = 0.81531127982734820928514038680173 absolute error = 1.4e-31 relative error = 1.7171355709643395725215234645496e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.624 y[1] (analytic) = 0.81571969103131787400960073599471 y[1] (numeric) = 0.81571969103131787400960073599459 absolute error = 1.2e-31 relative error = 1.4710935793186932845863648236856e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.625 y[1] (analytic) = 0.81612748443145497268934180165253 y[1] (numeric) = 0.8161274844314549726893418016524 absolute error = 1.3e-31 relative error = 1.5928883964808865331622254804959e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.626 y[1] (analytic) = 0.81653465927226216655295476188685 y[1] (numeric) = 0.81653465927226216655295476188673 absolute error = 1.2e-31 relative error = 1.4696253078460893962674652297640e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.627 y[1] (analytic) = 0.81694121479866310803733699108208 y[1] (numeric) = 0.81694121479866310803733699108195 absolute error = 1.3e-31 relative error = 1.5913017686595574104761061359543e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.628 y[1] (analytic) = 0.81734715025600354376548839532141 y[1] (numeric) = 0.81734715025600354376548839532127 absolute error = 1.4e-31 relative error = 1.7128584831567616750643712345392e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.629 y[1] (analytic) = 0.81775246489005241729943374899021 y[1] (numeric) = 0.81775246489005241729943374899007 absolute error = 1.4e-31 relative error = 1.7120095140137930463177359508379e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.63 y[1] (analytic) = 0.81815715794700297166682018102335 y[1] (numeric) = 0.8181571579470029716668201810232 absolute error = 1.5e-31 relative error = 1.8333885921916778575273566353650e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.631 y[1] (analytic) = 0.81856122867347385165973898871599 y[1] (numeric) = 0.81856122867347385165973898871586 absolute error = 1.3e-31 relative error = 1.5881524245983720958537522397079e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.632 y[1] (analytic) = 0.81896467631651020590432098826947 y[1] (numeric) = 0.81896467631651020590432098826934 absolute error = 1.3e-31 relative error = 1.5873700509856681270538384927697e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.633 y[1] (analytic) = 0.81936750012358478869965464429453 y[1] (numeric) = 0.8193675001235847886996546442944 absolute error = 1.3e-31 relative error = 1.5865896558063648517107556859115e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.634 y[1] (analytic) = 0.8197696993425990616245762553456 y[1] (numeric) = 0.81976969934259906162457625534548 absolute error = 1.2e-31 relative error = 1.4638257561389746726475449812892e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.635 y[1] (analytic) = 0.82017127322188429491088150920931 y[1] (numeric) = 0.82017127322188429491088150920918 absolute error = 1.3e-31 relative error = 1.5850347877867037580365589498189e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.636 y[1] (analytic) = 0.82057222101020266858150776012082 y[1] (numeric) = 0.82057222101020266858150776012068 absolute error = 1.4e-31 relative error = 1.7061264860714715285304306692156e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.637 y[1] (analytic) = 0.8209725419567483733522364203316 y[1] (numeric) = 0.82097254195674837335223642033145 absolute error = 1.5e-31 relative error = 1.8271013016157915587694881660796e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.638 y[1] (analytic) = 0.82137223531114871129546490050188 y[1] (numeric) = 0.82137223531114871129546490050174 absolute error = 1.4e-31 relative error = 1.7044647235606375199857185400994e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.639 y[1] (analytic) = 0.82177130032346519626459757724171 y[1] (numeric) = 0.82177130032346519626459757724159 absolute error = 1.2e-31 relative error = 1.4602602932563556522896748827180e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.64 y[1] (analytic) = 0.82216973624419465407760531177482 y[1] (numeric) = 0.82216973624419465407760531177468 absolute error = 1.4e-31 relative error = 1.7028114004723989975498683165054e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.641 y[1] (analytic) = 0.82256754232427032245830309115066 y[1] (numeric) = 0.82256754232427032245830309115052 absolute error = 1.4e-31 relative error = 1.7019878951752947193379271722535e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.642 y[1] (analytic) = 0.82296471781506295073389541268237 y[1] (numeric) = 0.82296471781506295073389541268224 absolute error = 1.3e-31 relative error = 1.5796545974066128313705124900221e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.643 y[1] (analytic) = 0.82336126196838189928733908334007 y[1] (numeric) = 0.82336126196838189928733908333995 absolute error = 1.2e-31 relative error = 1.4574404400945468559311626103203e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.644 y[1] (analytic) = 0.82375717403647623876307315868342 y[1] (numeric) = 0.82375717403647623876307315868328 absolute error = 1.4e-31 relative error = 1.6995299635933823615634705867318e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.645 y[1] (analytic) = 0.82415245327203584902466580057132 y[1] (numeric) = 0.8241524532720358490246658005712 absolute error = 1.2e-31 relative error = 1.4560412885210505729844713924063e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.646 y[1] (analytic) = 0.82454709892819251786292788934357 y[1] (numeric) = 0.82454709892819251786292788934344 absolute error = 1.3e-31 relative error = 1.5766230961091688163355656476663e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.647 y[1] (analytic) = 0.82494111025852103945304328442501 y[1] (numeric) = 0.82494111025852103945304328442489 absolute error = 1.2e-31 relative error = 1.4546492896007359284261960963146e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.648 y[1] (analytic) = 0.82533448651704031255926568736347 y[1] (numeric) = 0.82533448651704031255926568736332 absolute error = 1.5e-31 relative error = 1.8174449565655344390857006092552e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.649 y[1] (analytic) = 0.82572722695821443848573212317125 y[1] (numeric) = 0.82572722695821443848573212317112 absolute error = 1.3e-31 relative error = 1.5743697889058294618405860909286e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=362.4MB, alloc=4.5MB, time=17.35 x[1] = 2.65 y[1] (analytic) = 0.82611933083695381877194311950413 y[1] (numeric) = 0.82611933083695381877194311950399 absolute error = 1.4e-31 relative error = 1.6946704280380887754964384784147e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.651 y[1] (analytic) = 0.82651079740861625263145972867382 y[1] (numeric) = 0.82651079740861625263145972867367 absolute error = 1.5e-31 relative error = 1.8148583233310373716309206418028e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.652 y[1] (analytic) = 0.82690162592900803413236760475789 y[1] (numeric) = 0.82690162592900803413236760475775 absolute error = 1.4e-31 relative error = 1.6930671752242922389840986360878e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.653 y[1] (analytic) = 0.8272918156543850491180584171382 y[1] (numeric) = 0.82729181565438504911805841713804 absolute error = 1.6e-31 relative error = 1.9340213087136675840338575290196e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.654 y[1] (analytic) = 0.82768136584145387186687895266953 y[1] (numeric) = 0.82768136584145387186687895266937 absolute error = 1.6e-31 relative error = 1.9331110570229839792506807328960e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.655 y[1] (analytic) = 0.82807027574737286148919833135365 y[1] (numeric) = 0.82807027574737286148919833135351 absolute error = 1.4e-31 relative error = 1.6906777613004322896154485191350e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.656 y[1] (analytic) = 0.82845854462975325806044383486867 y[1] (numeric) = 0.82845854462975325806044383486853 absolute error = 1.4e-31 relative error = 1.6898854011164488188296557236299e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.657 y[1] (analytic) = 0.82884617174666027848865592358163 y[1] (numeric) = 0.82884617174666027848865592358149 absolute error = 1.4e-31 relative error = 1.6890950911309932188397730403838e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.658 y[1] (analytic) = 0.82923315635661421211511309575361 y[1] (numeric) = 0.82923315635661421211511309575346 absolute error = 1.5e-31 relative error = 1.8089001730110758981841331516565e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.659 y[1] (analytic) = 0.82961949771859151604657732252923 y[1] (numeric) = 0.82961949771859151604657732252908 absolute error = 1.5e-31 relative error = 1.8080577953205275354814737692628e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.66 y[1] (analytic) = 0.83000519509202591021771087398959 y[1] (numeric) = 0.83000519509202591021771087398942 absolute error = 1.7e-31 relative error = 2.0481799512249009184802293087429e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.661 y[1] (analytic) = 0.83039024773680947218221543503665 y[1] (numeric) = 0.83039024773680947218221543503648 absolute error = 1.7e-31 relative error = 2.0472302084872408076934328910620e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.662 y[1] (analytic) = 0.83077465491329373163124449517026 y[1] (numeric) = 0.83077465491329373163124449517008 absolute error = 1.8e-31 relative error = 2.1666525204573824593873994989340e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.663 y[1] (analytic) = 0.83115841588229076463764008331413 y[1] (numeric) = 0.83115841588229076463764008331397 absolute error = 1.6e-31 relative error = 1.9250241222686399622359591856780e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.664 y[1] (analytic) = 0.83154152990507428762454500774719 y[1] (numeric) = 0.83154152990507428762454500774703 absolute error = 1.6e-31 relative error = 1.9241372107808615348911007231834e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.665 y[1] (analytic) = 0.83192399624338075105694185189841 y[1] (numeric) = 0.83192399624338075105694185189823 absolute error = 1.8e-31 relative error = 2.1636591901760782979791479418240e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.666 y[1] (analytic) = 0.83230581415941043285467006927013 y[1] (numeric) = 0.83230581415941043285467006926997 absolute error = 1.6e-31 relative error = 1.9223703268442554867107820728719e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.667 y[1] (analytic) = 0.83268698291582853152547261506459 y[1] (numeric) = 0.83268698291582853152547261506442 absolute error = 1.7e-31 relative error = 2.0415834940124710472439151542436e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.668 y[1] (analytic) = 0.83306750177576625901662364820109 y[1] (numeric) = 0.83306750177576625901662364820092 absolute error = 1.7e-31 relative error = 2.0406509633088325650999529695971e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.669 y[1] (analytic) = 0.83344737000282193328368893532988 y[1] (numeric) = 0.8334473700028219332836889353297 absolute error = 1.8e-31 relative error = 2.1597044573959186626370218252830e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.67 y[1] (analytic) = 0.83382658686106207057497068816867 y[1] (numeric) = 0.83382658686106207057497068816849 absolute error = 1.8e-31 relative error = 2.1587222431658063676844736659720e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.671 y[1] (analytic) = 0.83420515161502247743018866701394 y[1] (numeric) = 0.83420515161502247743018866701376 absolute error = 1.8e-31 relative error = 2.1577426086559129807719951866999e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.672 y[1] (analytic) = 0.83458306352970934239194948660749 y[1] (numeric) = 0.83458306352970934239194948660734 absolute error = 1.5e-31 relative error = 1.7973046249657129083524222174674e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.673 y[1] (analytic) = 0.83496032187060032742855616567297 y[1] (numeric) = 0.8349603218706003274285561656728 absolute error = 1.7e-31 relative error = 2.0360248930049887502344746272723e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.674 y[1] (analytic) = 0.83533692590364565906671006837342 y[1] (numeric) = 0.83533692590364565906671006837324 absolute error = 1.8e-31 relative error = 2.1548191444461850337184158388679e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.675 y[1] (analytic) = 0.8357128748952692192326574946843 y[1] (numeric) = 0.83571287489526921923265749468413 absolute error = 1.7e-31 relative error = 2.0341914682277001663971658131443e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.676 y[1] (analytic) = 0.83608816811236963580033328722109 y[1] (numeric) = 0.83608816811236963580033328722092 absolute error = 1.7e-31 relative error = 2.0332783847881474246872322059085e-29 % Correct digits = 30 h = 0.001 memory used=366.2MB, alloc=4.5MB, time=17.53 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.677 y[1] (analytic) = 0.83646280482232137284505393441199 y[1] (numeric) = 0.83646280482232137284505393441182 absolute error = 1.7e-31 relative error = 2.0323677158138649161092597383947e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.678 y[1] (analytic) = 0.83683678429297582060131276406135 y[1] (numeric) = 0.83683678429297582060131276406118 absolute error = 1.7e-31 relative error = 2.0314594576961515333713774609607e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.679 y[1] (analytic) = 0.83721010579266238512322993730866 y[1] (numeric) = 0.83721010579266238512322993730851 absolute error = 1.5e-31 relative error = 1.7916649472115659540463791608891e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.68 y[1] (analytic) = 0.83758276859018957764621007075276 y[1] (numeric) = 0.83758276859018957764621007075259 absolute error = 1.7e-31 relative error = 2.0296501596629333108474009978828e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.681 y[1] (analytic) = 0.83795477195484610364836043407911 y[1] (numeric) = 0.83795477195484610364836043407894 absolute error = 1.7e-31 relative error = 2.0287491125972201363079004283539e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.682 y[1] (analytic) = 0.83832611515640195161022279190281 y[1] (numeric) = 0.83832611515640195161022279190264 absolute error = 1.7e-31 relative error = 2.0278504620875853666515083396157e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.683 y[1] (analytic) = 0.83869679746510948147137208171726 y[1] (numeric) = 0.83869679746510948147137208171708 absolute error = 1.8e-31 relative error = 2.1461868048624348902213967675981e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.684 y[1] (analytic) = 0.83906681815170451278243524482262 y[1] (numeric) = 0.83906681815170451278243524482244 absolute error = 1.8e-31 relative error = 2.1452403563819125510143391314190e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.685 y[1] (analytic) = 0.83943617648740741255108365389626 y[1] (numeric) = 0.83943617648740741255108365389608 absolute error = 1.8e-31 relative error = 2.1442964342233137486949331829560e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.686 y[1] (analytic) = 0.83980487174392418278055270946035 y[1] (numeric) = 0.83980487174392418278055270946017 absolute error = 1.8e-31 relative error = 2.1433550346786525812114516373247e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.687 y[1] (analytic) = 0.84017290319344754769924230790035 y[1] (numeric) = 0.84017290319344754769924230790017 absolute error = 1.8e-31 relative error = 2.1424161540538934148975192515165e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.688 y[1] (analytic) = 0.8405402701086580406799520158912 y[1] (numeric) = 0.84054027010865804067995201589103 absolute error = 1.7e-31 relative error = 2.0225086892984177528610926534513e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.689 y[1] (analytic) = 0.84090697176272509084730492009657 y[1] (numeric) = 0.84090697176272509084730492009639 absolute error = 1.8e-31 relative error = 2.1405459348574622618665541504338e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.69 y[1] (analytic) = 0.84127300742930810937191425681978 y[1] (numeric) = 0.84127300742930810937191425681962 absolute error = 1.6e-31 relative error = 1.9018796346374484945299688372761e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.691 y[1] (analytic) = 0.8416383763825575754498470639043 y[1] (numeric) = 0.84163837638255757544984706390413 absolute error = 1.7e-31 relative error = 2.0198698725060078282954981851501e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.692 y[1] (analytic) = 0.84200307789711612196593923660472 y[1] (numeric) = 0.84200307789711612196593923660456 absolute error = 1.6e-31 relative error = 1.9002305834747828458494206106561e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.693 y[1] (analytic) = 0.84236711124811962083951651037954 y[1] (numeric) = 0.84236711124811962083951651037937 absolute error = 1.7e-31 relative error = 2.0181224756996290380117911211157e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.694 y[1] (analytic) = 0.84273047571119826805107603659028 y[1] (numeric) = 0.84273047571119826805107603659009 absolute error = 1.9e-31 relative error = 2.2545761127204393236685738376542e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.695 y[1] (analytic) = 0.84309317056247766834848336193228 y[1] (numeric) = 0.8430931705624776683484833619321 absolute error = 1.8e-31 relative error = 2.1349953514617047517713487847754e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.696 y[1] (analytic) = 0.8434551950785799196312397690673 y[1] (numeric) = 0.84345519507857991963123976906711 absolute error = 1.9e-31 relative error = 2.2526389203435848358029241607354e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.697 y[1] (analytic) = 0.84381654853662469701137508437818 y[1] (numeric) = 0.84381654853662469701137508437799 absolute error = 1.9e-31 relative error = 2.2516742570349497152197434814872e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.698 y[1] (analytic) = 0.84417723021423033654952120902268 y[1] (numeric) = 0.84417723021423033654952120902251 absolute error = 1.7e-31 relative error = 2.0137951358491202022888655691216e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.699 y[1] (analytic) = 0.84453723938951491866472178152419 y[1] (numeric) = 0.84453723938951491866472178152402 absolute error = 1.7e-31 relative error = 2.0129366956380370181892194652640e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.7 y[1] (analytic) = 0.84489657534109735121653353400399 y[1] (numeric) = 0.8448965753410973512165335340038 absolute error = 1.9e-31 relative error = 2.2487959537922634574947836606225e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.701 y[1] (analytic) = 0.84525523734809845225797505983234 y[1] (numeric) = 0.84525523734809845225797505983217 absolute error = 1.7e-31 relative error = 2.0112268163325145515719732938496e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.702 y[1] (analytic) = 0.84561322469014203245787886795342 y[1] (numeric) = 0.84561322469014203245787886795324 absolute error = 1.8e-31 relative error = 2.1286327453778573722358567958923e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=370.0MB, alloc=4.5MB, time=17.71 x[1] = 2.703 y[1] (analytic) = 0.84597053664735597719120275842144 y[1] (numeric) = 0.84597053664735597719120275842126 absolute error = 1.8e-31 relative error = 2.1277336763210851196388873153110e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.704 y[1] (analytic) = 0.84632717250037332829585671477581 y[1] (numeric) = 0.84632717250037332829585671477563 absolute error = 1.8e-31 relative error = 2.1268370654839231119485035686893e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.705 y[1] (analytic) = 0.84668313153033336549460167177573 y[1] (numeric) = 0.84668313153033336549460167177555 absolute error = 1.8e-31 relative error = 2.1259429094171258999601239436386e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.706 y[1] (analytic) = 0.84703841301888268748057668171554 y[1] (numeric) = 0.84703841301888268748057668171536 absolute error = 1.8e-31 relative error = 2.1250512046847081092433474639406e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.707 y[1] (analytic) = 0.84739301624817629266501116904708 y[1] (numeric) = 0.84739301624817629266501116904691 absolute error = 1.7e-31 relative error = 2.0061529507603593444783846533701e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.708 y[1] (analytic) = 0.84774694050087865958567913134626 y[1] (numeric) = 0.84774694050087865958567913134608 absolute error = 1.8e-31 relative error = 2.1232751355451625648764214985813e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.709 y[1] (analytic) = 0.84810018506016482697465231477732 y[1] (numeric) = 0.84810018506016482697465231477715 absolute error = 1.7e-31 relative error = 2.0044801663136069208847296079175e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.71 y[1] (analytic) = 0.84845274920972147348390956413067 y[1] (numeric) = 0.84845274920972147348390956413048 absolute error = 1.9e-31 relative error = 2.2393704325547019156494335210521e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.711 y[1] (analytic) = 0.84880463223374799706735972123685 y[1] (numeric) = 0.84880463223374799706735972123669 absolute error = 1.6e-31 relative error = 1.8850038504023905061632371502881e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.712 y[1] (analytic) = 0.84915583341695759401783562109345 y[1] (numeric) = 0.84915583341695759401783562109327 absolute error = 1.8e-31 relative error = 2.1197522635590883308135287278486e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.713 y[1] (analytic) = 0.84950635204457833765761691237846 y[1] (numeric) = 0.84950635204457833765761691237828 absolute error = 1.8e-31 relative error = 2.1188776230663710891990817933636e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.714 y[1] (analytic) = 0.84985618740235425668103960816998 y[1] (numeric) = 0.84985618740235425668103960816979 absolute error = 1.9e-31 relative error = 2.2356723739430371456480484095550e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.715 y[1] (analytic) = 0.85020533877654641314775045363936 y[1] (numeric) = 0.85020533877654641314775045363918 absolute error = 1.8e-31 relative error = 2.1171356117220072482888913256074e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.716 y[1] (analytic) = 0.85055380545393398012516438024168 y[1] (numeric) = 0.85055380545393398012516438024151 absolute error = 1.7e-31 relative error = 1.9986977767887631319396182863695e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.717 y[1] (analytic) = 0.85090158672181531897868350048686 y[1] (numeric) = 0.85090158672181531897868350048669 absolute error = 1.7e-31 relative error = 1.9978808672215813504724686696702e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.718 y[1] (analytic) = 0.85124868186800905630823628374116 y[1] (numeric) = 0.85124868186800905630823628374099 absolute error = 1.7e-31 relative error = 1.9970662348274797762915496158213e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.719 y[1] (analytic) = 0.85159509018085516052969574168012 y[1] (numeric) = 0.85159509018085516052969574167995 absolute error = 1.7e-31 relative error = 1.9962538765212551715202127044299e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.72 y[1] (analytic) = 0.85194081094921601809973564199056 y[1] (numeric) = 0.85194081094921601809973564199039 absolute error = 1.7e-31 relative error = 1.9954437892297855669638067810812e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.721 y[1] (analytic) = 0.85228584346247750938268396070167 y[1] (numeric) = 0.8522858434624775093826839607015 absolute error = 1.7e-31 relative error = 1.9946359698919998657295938564038e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.722 y[1] (analytic) = 0.85263018701055008415793297711259 y[1] (numeric) = 0.85263018701055008415793297711242 absolute error = 1.7e-31 relative error = 1.9938304154588476015572536676904e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.723 y[1] (analytic) = 0.85297384088386983676646561067667 y[1] (numeric) = 0.8529738408838698367664656106765 absolute error = 1.7e-31 relative error = 1.9930271228932688512665146495977e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.724 y[1] (analytic) = 0.85331680437339958089505779640093 y[1] (numeric) = 0.85331680437339958089505779640075 absolute error = 1.8e-31 relative error = 2.1094158591213504360693446130478e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.725 y[1] (analytic) = 0.85365907677062992399671689432233 y[1] (numeric) = 0.85365907677062992399671689432217 absolute error = 1.6e-31 relative error = 1.8742845282601086718120830665028e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.726 y[1] (analytic) = 0.85400065736758034134591632943155 y[1] (numeric) = 0.85400065736758034134591632943138 absolute error = 1.7e-31 relative error = 1.9906307862106050535638124242980e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.727 y[1] (analytic) = 0.85434154545680024972718686102789 y[1] (numeric) = 0.85434154545680024972718686102773 absolute error = 1.6e-31 relative error = 1.8727873044550470639222272289170e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.728 y[1] (analytic) = 0.85468174033137008075562508490924 y[1] (numeric) = 0.85468174033137008075562508490907 absolute error = 1.7e-31 relative error = 1.9890444826174596513183046122874e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.729 y[1] (analytic) = 0.85502124128490235382787997802345 y[1] (numeric) = 0.85502124128490235382787997802329 absolute error = 1.6e-31 relative error = 1.8712985394322649832287310724929e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=373.8MB, alloc=4.5MB, time=17.90 TOP MAIN SOLVE Loop x[1] = 2.73 y[1] (analytic) = 0.8553600476115427487021785032382 y[1] (numeric) = 0.85536004761154274870217850323802 absolute error = 1.8e-31 relative error = 2.1043769872420561080010132661624e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.731 y[1] (analytic) = 0.85569815860597117770595150171902 y[1] (numeric) = 0.85569815860597117770595150171886 absolute error = 1.6e-31 relative error = 1.8698182109057947237527889608904e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.732 y[1] (analytic) = 0.85603557356340285756962131204584 y[1] (numeric) = 0.85603557356340285756962131204567 absolute error = 1.7e-31 relative error = 1.9858987786260360856266313910551e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.733 y[1] (analytic) = 0.85637229177958938088511276864059 y[1] (numeric) = 0.85637229177958938088511276864041 absolute error = 1.8e-31 relative error = 2.1018895838625273790271957391038e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.734 y[1] (analytic) = 0.85670831255081978718764944732918 y[1] (numeric) = 0.85670831255081978718764944732901 absolute error = 1.7e-31 relative error = 1.9843393312460199777482544752491e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.735 y[1] (analytic) = 0.8570436351739216336593972429134 y[1] (numeric) = 0.85704363517392163365939724291321 absolute error = 1.9e-31 relative error = 2.2169232954100745159430596865603e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.736 y[1] (analytic) = 0.85737825894626206545351758248709 y[1] (numeric) = 0.8573782589462620654535175824869 absolute error = 1.9e-31 relative error = 2.2160580585926501582819546772523e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.737 y[1] (analytic) = 0.85771218316574888563719279889473 y[1] (numeric) = 0.85771218316574888563719279889455 absolute error = 1.8e-31 relative error = 2.0986060771065885411681767415196e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.738 y[1] (analytic) = 0.85804540713083162475218641119725 y[1] (numeric) = 0.85804540713083162475218641119706 absolute error = 1.9e-31 relative error = 2.2143350272723911342331514399595e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.739 y[1] (analytic) = 0.85837793014050260999150128328274 y[1] (numeric) = 0.85837793014050260999150128328256 absolute error = 1.8e-31 relative error = 2.0969784249990782710265650480118e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.74 y[1] (analytic) = 0.85870975149429803399069885783689 y[1] (numeric) = 0.85870975149429803399069885783671 absolute error = 1.8e-31 relative error = 2.0961681136934803742403536885173e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.741 y[1] (analytic) = 0.8590408704922990232324428907682 y[1] (numeric) = 0.85904087049229902323244289076801 absolute error = 1.9e-31 relative error = 2.2117690383126337898485910544905e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.742 y[1] (analytic) = 0.85937128643513270606283134086959 y[1] (numeric) = 0.85937128643513270606283134086942 absolute error = 1.7e-31 relative error = 1.9781903664154129915323206082427e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.743 y[1] (analytic) = 0.8597009986239732803180803009875 y[1] (numeric) = 0.85970099862397328031808030098733 absolute error = 1.7e-31 relative error = 1.9774316916241796206130844193377e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.744 y[1] (analytic) = 0.86003000636054308056012409026326 y[1] (numeric) = 0.86003000636054308056012409026308 absolute error = 1.8e-31 relative error = 2.0929502304427751285425967423918e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.745 y[1] (analytic) = 0.86035830894711364491969586211054 y[1] (numeric) = 0.86035830894711364491969586211038 absolute error = 1.6e-31 relative error = 1.8596902980550539919785167334168e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.746 y[1] (analytic) = 0.86068590568650678154545331949449 y[1] (numeric) = 0.86068590568650678154545331949433 absolute error = 1.6e-31 relative error = 1.8589824573969245333731584079152e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.747 y[1] (analytic) = 0.86101279588209563465771436778401 y[1] (numeric) = 0.86101279588209563465771436778385 absolute error = 1.6e-31 relative error = 1.8582766802679421881871325427928e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.748 y[1] (analytic) = 0.8613389788378057502053677759598 y[1] (numeric) = 0.86133897883780575020536777595964 absolute error = 1.6e-31 relative error = 1.8575729640830380362343263507313e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.749 y[1] (analytic) = 0.86166445385811614112452415927374 y[1] (numeric) = 0.86166445385811614112452415927356 absolute error = 1.8e-31 relative error = 2.0889802195512089380728525058433e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.75 y[1] (analytic) = 0.86198922024806035219747284057325 y[1] (numeric) = 0.86198922024806035219747284057309 absolute error = 1.6e-31 relative error = 1.8561717042581546359741468264513e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.751 y[1] (analytic) = 0.86231327731322752451051039342589 y[1] (numeric) = 0.86231327731322752451051039342573 absolute error = 1.6e-31 relative error = 1.8554741555009298824459755037582e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.752 y[1] (analytic) = 0.86263662435976345950920691790323 y[1] (numeric) = 0.86263662435976345950920691790307 absolute error = 1.6e-31 relative error = 1.8547786574532435033395693885063e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.753 y[1] (analytic) = 0.86295926069437168264967634941271 y[1] (numeric) = 0.86295926069437168264967634941255 absolute error = 1.6e-31 relative error = 1.8540852075827724875851912225957e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.754 y[1] (analytic) = 0.86328118562431450664441735229655 y[1] (numeric) = 0.86328118562431450664441735229637 absolute error = 1.8e-31 relative error = 2.0850680287886290285439028433791e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.755 y[1] (analytic) = 0.86360239845741409430129160305224 y[1] (numeric) = 0.86360239845741409430129160305206 absolute error = 1.8e-31 relative error = 2.0842924975836105019231498071723e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=377.6MB, alloc=4.5MB, time=18.08 x[1] = 2.756 y[1] (analytic) = 0.86392289850205352095420652296728 y[1] (numeric) = 0.8639228985020535209542065229671 absolute error = 1.8e-31 relative error = 2.0835192621019773207652519201128e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.757 y[1] (analytic) = 0.86424268506717783648406977670113 y[1] (numeric) = 0.86424268506717783648406977670096 absolute error = 1.7e-31 relative error = 1.9670400795673017506387296757447e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.758 y[1] (analytic) = 0.86456175746229512692858311189223 y[1] (numeric) = 0.86456175746229512692858311189206 absolute error = 1.7e-31 relative error = 1.9663141300511891132220402487831e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.759 y[1] (analytic) = 0.86488011499747757567944337521394 y[1] (numeric) = 0.86488011499747757567944337521375 absolute error = 1.9e-31 relative error = 2.1968362632612282376485564801484e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.76 y[1] (analytic) = 0.86519775698336252426551880245332 y[1] (numeric) = 0.86519775698336252426551880245314 absolute error = 1.8e-31 relative error = 2.0804492215467144622293603089798e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.761 y[1] (analytic) = 0.86551468273115353272056894413866 y[1] (numeric) = 0.86551468273115353272056894413847 absolute error = 1.9e-31 relative error = 2.1952256130473740916872577643898e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.762 y[1] (analytic) = 0.86583089155262143953407685399582 y[1] (numeric) = 0.86583089155262143953407685399563 absolute error = 1.9e-31 relative error = 2.1944238979425767641859212406655e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.763 y[1] (analytic) = 0.86614638276010542118376243507135 y[1] (numeric) = 0.86614638276010542118376243507116 absolute error = 1.9e-31 relative error = 2.1936245856564855574268515370870e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.764 y[1] (analytic) = 0.86646115566651405124834610771867 y[1] (numeric) = 0.8664611556665140512483461077185 absolute error = 1.7e-31 relative error = 1.9620037077049310539643413170766e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.765 y[1] (analytic) = 0.86677520958532635909913223480571 y[1] (numeric) = 0.86677520958532635909913223480553 absolute error = 1.8e-31 relative error = 2.0766629918512983357646637911440e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.766 y[1] (analytic) = 0.86708854383059288816898201246515 y[1] (numeric) = 0.86708854383059288816898201246497 absolute error = 1.8e-31 relative error = 2.0759125614184960924171063250370e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.767 y[1] (analytic) = 0.86740115771693675379724580947457 y[1] (numeric) = 0.8674011577169367537972458094744 absolute error = 1.7e-31 relative error = 1.9598774856083017625346282447251e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.768 y[1] (analytic) = 0.86771305055955470064922521491993 y[1] (numeric) = 0.86771305055955470064922521491976 absolute error = 1.7e-31 relative error = 1.9591730225836012560006965985204e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.769 y[1] (analytic) = 0.86802422167421815970873533216515 y[1] (numeric) = 0.86802422167421815970873533216497 absolute error = 1.8e-31 relative error = 2.0736748526765945589830534907836e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.77 y[1] (analytic) = 0.8683346703772743048423381373205 y[1] (numeric) = 0.86833467037727430484233813732035 absolute error = 1.5e-31 relative error = 1.7274445570027505127753410372718e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.771 y[1] (analytic) = 0.86864439598564710893381800237444 y[1] (numeric) = 0.86864439598564710893381800237428 absolute error = 1.6e-31 relative error = 1.8419505235908265909245513947207e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.772 y[1] (analytic) = 0.86895339781683839958747076692541 y[1] (numeric) = 0.86895339781683839958747076692523 absolute error = 1.8e-31 relative error = 2.0714574619563332024836594029033e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.773 y[1] (analytic) = 0.86926167518892891439877802802539 y[1] (numeric) = 0.86926167518892891439877802802522 absolute error = 1.7e-31 relative error = 1.9556826770609839608014149561035e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.774 y[1] (analytic) = 0.86956922742057935579103860502089 y[1] (numeric) = 0.86956922742057935579103860502073 absolute error = 1.6e-31 relative error = 1.8399915148171837893674813515682e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.775 y[1] (analytic) = 0.86987605383103144541652942545274 y[1] (numeric) = 0.86987605383103144541652942545257 absolute error = 1.7e-31 relative error = 1.9543014116930910305920636950291e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.776 y[1] (analytic) = 0.870182153740108978120768369053 y[1] (numeric) = 0.87018215374010897812076836905281 absolute error = 1.9e-31 relative error = 2.1834508922455553870262633096105e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.777 y[1] (analytic) = 0.87048752646821887546845189965372 y[1] (numeric) = 0.87048752646821887546845189965353 absolute error = 1.9e-31 relative error = 2.1826849233656057234297599524545e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.778 y[1] (analytic) = 0.87079217133635223882964060939977 y[1] (numeric) = 0.87079217133635223882964060939961 absolute error = 1.6e-31 relative error = 1.8374074235699391691476854083098e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.779 y[1] (analytic) = 0.8710960876660854020247660960352 y[1] (numeric) = 0.87109608766608540202476609603503 absolute error = 1.7e-31 relative error = 1.9515642695110528363165077562348e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.78 y[1] (analytic) = 0.87139927477958098352703289221014 y[1] (numeric) = 0.87139927477958098352703289220996 absolute error = 1.8e-31 relative error = 2.0656432155687839491945050514202e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.781 y[1] (analytic) = 0.87170173199958893822078946573331 y[1] (numeric) = 0.87170173199958893822078946573315 absolute error = 1.6e-31 relative error = 1.8354902155921774626848451043262e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.782 y[1] (analytic) = 0.87200345864944760871444261147172 y[1] (numeric) = 0.87200345864944760871444261147155 absolute error = 1.7e-31 relative error = 1.9495335518885982406475458589012e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=381.4MB, alloc=4.5MB, time=18.26 TOP MAIN SOLVE Loop x[1] = 2.783 y[1] (analytic) = 0.87230445405308477620648985917593 y[1] (numeric) = 0.87230445405308477620648985917576 absolute error = 1.7e-31 relative error = 1.9488608502468395718028249046427e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.784 y[1] (analytic) = 0.87260471753501871090324482688646 y[1] (numeric) = 0.8726047175350187109032448268863 absolute error = 1.6e-31 relative error = 1.8335908205032022568018661701215e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.785 y[1] (analytic) = 0.87290424842035922198683075675134 y[1] (numeric) = 0.87290424842035922198683075675118 absolute error = 1.6e-31 relative error = 1.8329616368524049987221682343897e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.786 y[1] (analytic) = 0.8732030460348087071320177790601 y[1] (numeric) = 0.87320304603480870713201777905992 absolute error = 1.8e-31 relative error = 2.0613762264959462345290520889975e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.787 y[1] (analytic) = 0.87350110970466320157047976107287 y[1] (numeric) = 0.87350110970466320157047976107269 absolute error = 1.8e-31 relative error = 2.0606728257146605285450416732831e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.788 y[1] (analytic) = 0.87379843875681342670104690979589 y[1] (numeric) = 0.87379843875681342670104690979572 absolute error = 1.7e-31 relative error = 1.9455287679600975738693785501230e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.789 y[1] (analytic) = 0.87409503251874583824453061222518 y[1] (numeric) = 0.87409503251874583824453061222501 absolute error = 1.7e-31 relative error = 1.9448686204077493226515652607912e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.79 y[1] (analytic) = 0.87439089031854367394169731274994 y[1] (numeric) = 0.87439089031854367394169731274975 absolute error = 1.9e-31 relative error = 2.1729412108900440664743943808411e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.791 y[1] (analytic) = 0.87468601148488800079296854537471 y[1] (numeric) = 0.87468601148488800079296854537455 absolute error = 1.6e-31 relative error = 1.8292278360366156257063511973574e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.792 y[1] (analytic) = 0.8749803953470587618384245581853 y[1] (numeric) = 0.87498039534705876183842455818513 absolute error = 1.7e-31 relative error = 1.9429006741639043211358295817020e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.793 y[1] (analytic) = 0.87527404123493582247668928904611 y[1] (numeric) = 0.87527404123493582247668928904594 absolute error = 1.7e-31 relative error = 1.9422488499732578827584911293534e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.794 y[1] (analytic) = 0.87556694847900001632127477487936 y[1] (numeric) = 0.8755669484790000163212747748792 absolute error = 1.6e-31 relative error = 1.8273873891419224869778060996461e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.795 y[1] (analytic) = 0.87585911641033419059296340203399 y[1] (numeric) = 0.87585911641033419059296340203381 absolute error = 1.8e-31 relative error = 2.0551250381193862357607163289986e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.796 y[1] (analytic) = 0.87615054436062425104680673220886 y[1] (numeric) = 0.8761505443606242510468067322087 absolute error = 1.6e-31 relative error = 1.8261701830792206247184001403987e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.797 y[1] (analytic) = 0.87644123166216020643231996714846 y[1] (numeric) = 0.87644123166216020643231996714829 absolute error = 1.7e-31 relative error = 1.9396622826335663600499560959238e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.798 y[1] (analytic) = 0.87673117764783721248545144587842 y[1] (numeric) = 0.87673117764783721248545144587826 absolute error = 1.6e-31 relative error = 1.8249607642477193503459024099904e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.799 y[1] (analytic) = 0.87702038165115661545090690059659 y[1] (numeric) = 0.87702038165115661545090690059641 absolute error = 1.8e-31 relative error = 2.0524038410728378059307266099845e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.8 y[1] (analytic) = 0.87730884300622699513340853147736 y[1] (numeric) = 0.87730884300622699513340853147721 absolute error = 1.5e-31 relative error = 1.7097741712713515239880759859953e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.801 y[1] (analytic) = 0.87759656104776520747646929658852 y[1] (numeric) = 0.87759656104776520747646929658837 absolute error = 1.5e-31 relative error = 1.7092136256882609371886450281042e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.802 y[1] (analytic) = 0.87788353511109742666726315085402 y[1] (numeric) = 0.87788353511109742666726315085384 absolute error = 1.8e-31 relative error = 2.0503858746732360183163680682011e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.803 y[1] (analytic) = 0.87816976453216018676617230752977 y[1] (numeric) = 0.87816976453216018676617230752962 absolute error = 1.5e-31 relative error = 1.7080979789814515414018618923145e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.804 y[1] (analytic) = 0.87845524864750142285959293698662 y[1] (numeric) = 0.87845524864750142285959293698644 absolute error = 1.8e-31 relative error = 2.0490514488601885742852519972648e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.805 y[1] (analytic) = 0.878739986794281511734581060717 y[1] (numeric) = 0.87873998679428151173458106071683 absolute error = 1.7e-31 relative error = 1.9345881893934804604927586874095e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.806 y[1] (analytic) = 0.87902397831027431207392074340261 y[1] (numeric) = 0.87902397831027431207392074340243 absolute error = 1.8e-31 relative error = 2.0477257098948480721037794208196e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.807 y[1] (analytic) = 0.8793072225338682041701970325915 y[1] (numeric) = 0.87930722253386820417019703259134 absolute error = 1.6e-31 relative error = 1.8196143043034915265134630644004e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.808 y[1] (analytic) = 0.87958971880406712915745644404406 y[1] (numeric) = 0.87958971880406712915745644404388 absolute error = 1.8e-31 relative error = 2.0464086397546430618342774459016e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.809 y[1] (analytic) = 0.87987146646049162775903814110852 y[1] (numeric) = 0.87987146646049162775903814110836 absolute error = 1.6e-31 relative error = 1.8184474221404290732895832339194e-29 % Correct digits = 30 h = 0.001 memory used=385.2MB, alloc=4.5MB, time=18.45 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.81 y[1] (analytic) = 0.88015246484337987855015930858659 y[1] (numeric) = 0.88015246484337987855015930858642 absolute error = 1.7e-31 relative error = 1.9314835416640106630545945050880e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.811 y[1] (analytic) = 0.8804327132935887357338385754395 y[1] (numeric) = 0.88043271329358873573383857543933 absolute error = 1.7e-31 relative error = 1.9308687357157737606839816499143e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.812 y[1] (analytic) = 0.88071221115259476642874169637314 y[1] (numeric) = 0.88071221115259476642874169637298 absolute error = 1.6e-31 relative error = 1.8167114975118465041570432264694e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.813 y[1] (analytic) = 0.88099095776249528746753405981905 y[1] (numeric) = 0.88099095776249528746753405981887 absolute error = 1.8e-31 relative error = 2.0431537737590022458508079045313e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.814 y[1] (analytic) = 0.88126895246600940170432494910229 y[1] (numeric) = 0.88126895246600940170432494910212 absolute error = 1.7e-31 relative error = 1.9290365276604580095080457088911e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.815 y[1] (analytic) = 0.88154619460647903382978884465431 y[1] (numeric) = 0.88154619460647903382978884465413 absolute error = 1.8e-31 relative error = 2.0418669050049242595262027695878e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.816 y[1] (analytic) = 0.88182268352786996569254941798781 y[1] (numeric) = 0.88182268352786996569254941798763 absolute error = 1.8e-31 relative error = 2.0412266928752815214906521470753e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.817 y[1] (analytic) = 0.88209841857477287112541223280459 y[1] (numeric) = 0.88209841857477287112541223280442 absolute error = 1.7e-31 relative error = 1.9272225912690444683673998939281e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.818 y[1] (analytic) = 0.88237339909240435027503253505195 y[1] (numeric) = 0.88237339909240435027503253505177 absolute error = 1.8e-31 relative error = 2.0399527023949862930346503852475e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.819 y[1] (analytic) = 0.8826476244266079634336048819814 y[1] (numeric) = 0.8826476244266079634336048819812 absolute error = 2.0e-31 relative error = 2.2659099108766702889769321401479e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.82 y[1] (analytic) = 0.88292109392385526437116173029359 y[1] (numeric) = 0.8829210939238552643711617302934 absolute error = 1.9e-31 relative error = 2.1519476803482729875827510925411e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.821 y[1] (analytic) = 0.8831938069312468331670684752752 y[1] (numeric) = 0.88319380693124683316706847527501 absolute error = 1.9e-31 relative error = 2.1512832009111987951440997804362e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.822 y[1] (analytic) = 0.88346576279651330853930280644687 y[1] (numeric) = 0.88346576279651330853930280644668 absolute error = 1.9e-31 relative error = 2.1506209748137379113703435233394e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.823 y[1] (analytic) = 0.88373696086801641967010662064697 y[1] (numeric) = 0.88373696086801641967010662064677 absolute error = 2.0e-31 relative error = 2.2631168419566580326680725927578e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.824 y[1] (analytic) = 0.88400740049475001752659911067169 y[1] (numeric) = 0.8840074004947500175265991106715 absolute error = 1.9e-31 relative error = 2.1493032738601873328070505618980e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.825 y[1] (analytic) = 0.88427708102634110567494002657958 y[1] (numeric) = 0.88427708102634110567494002657938 absolute error = 2.0e-31 relative error = 2.2617345206761311638950079274043e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.826 y[1] (analytic) = 0.88454600181305087058663248754602 y[1] (numeric) = 0.88454600181305087058663248754583 absolute error = 1.9e-31 relative error = 2.1479945600404914983542249489449e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.827 y[1] (analytic) = 0.88481416220577571143555510472223 y[1] (numeric) = 0.88481416220577571143555510472204 absolute error = 1.9e-31 relative error = 2.1473435679006783908355601954661e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.828 y[1] (analytic) = 0.88508156155604826938431355991088 y[1] (numeric) = 0.8850815615560482693843135599107 absolute error = 1.8e-31 relative error = 2.0337108783911933576509394269597e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.829 y[1] (analytic) = 0.8853481992160384563585021710199 y[1] (numeric) = 0.88534819921603845635850217101971 absolute error = 1.9e-31 relative error = 2.1460483024446419385205927940101e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.83 y[1] (analytic) = 0.88561407453855448330746636319308 y[1] (numeric) = 0.88561407453855448330746636319288 absolute error = 2.0e-31 relative error = 2.2583200261830658589511926135006e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.831 y[1] (analytic) = 0.88587918687704388795015735424437 y[1] (numeric) = 0.8858791868770438879501573542442 absolute error = 1.7e-31 relative error = 1.9189975621765594988274128278058e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.832 y[1] (analytic) = 0.88614353558559456200467075453893 y[1] (numeric) = 0.88614353558559456200467075453875 absolute error = 1.8e-31 relative error = 2.0312736342544068843623113759274e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.833 y[1] (analytic) = 0.886407120018935777900061174769 y[1] (numeric) = 0.88640712001893577790006117476881 absolute error = 1.9e-31 relative error = 2.1434845874877578283883003688172e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.834 y[1] (analytic) = 0.88666993953243921496902533016789 y[1] (numeric) = 0.8866699395324392149690253301677 absolute error = 1.9e-31 relative error = 2.1428492331677695870268754484975e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.835 y[1] (analytic) = 0.88693199348211998512004652658638 y[1] (numeric) = 0.8869319934821199851200465265862 absolute error = 1.8e-31 relative error = 2.0294678884377023163993619913963e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=389.1MB, alloc=4.5MB, time=18.63 x[1] = 2.836 y[1] (analytic) = 0.88719328122463765798759381252691 y[1] (numeric) = 0.88719328122463765798759381252671 absolute error = 2.0e-31 relative error = 2.2543002098024221629210495718549e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.837 y[1] (analytic) = 0.8874538021172972855589694816887 y[1] (numeric) = 0.88745380211729728555896948168852 absolute error = 1.8e-31 relative error = 2.0282745937935470085233749293974e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.838 y[1] (analytic) = 0.88771355551805042627639901282329 y[1] (numeric) = 0.8877135555180504262763990128231 absolute error = 1.9e-31 relative error = 2.1403300515009045957935939385458e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.839 y[1] (analytic) = 0.88797254078549616861295793773122 y[1] (numeric) = 0.88797254078549616861295793773104 absolute error = 1.8e-31 relative error = 2.0270897097873418467729758358815e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.84 y[1] (analytic) = 0.88823075727888215412093053405232 y[1] (numeric) = 0.88823075727888215412093053405213 absolute error = 1.9e-31 relative error = 2.1390837734787512085748650185653e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.841 y[1] (analytic) = 0.88848820435810559995119564710648 y[1] (numeric) = 0.88848820435810559995119564710629 absolute error = 1.9e-31 relative error = 2.1384639556049796269485101202798e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.842 y[1] (analytic) = 0.88874488138371432084223535443599 y[1] (numeric) = 0.88874488138371432084223535443581 absolute error = 1.8e-31 relative error = 2.0253281202559777059951317361185e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.843 y[1] (analytic) = 0.88900078771690775057736259787816 y[1] (numeric) = 0.88900078771690775057736259787799 absolute error = 1.7e-31 relative error = 1.9122592729820457471493091168080e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.844 y[1] (analytic) = 0.88925592271953796290876432096216 y[1] (numeric) = 0.88925592271953796290876432096196 absolute error = 2.0e-31 relative error = 2.2490713290765217950831621072450e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.845 y[1] (analytic) = 0.88951028575411069194695706417343 y[1] (numeric) = 0.88951028575411069194695706417323 absolute error = 2.0e-31 relative error = 2.2484281879938423234295944153429e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.846 y[1] (analytic) = 0.88976387618378635201425238716493 y[1] (numeric) = 0.88976387618378635201425238716475 absolute error = 1.8e-31 relative error = 2.0230086297953937431334348477371e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.847 y[1] (analytic) = 0.89001669337238105696082990531343 y[1] (numeric) = 0.89001669337238105696082990531325 absolute error = 1.8e-31 relative error = 2.0224339761309217357958852621009e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.848 y[1] (analytic) = 0.89026873668436763894201614812441 y[1] (numeric) = 0.89026873668436763894201614812423 absolute error = 1.8e-31 relative error = 2.0218614063701137125571272792350e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.849 y[1] (analytic) = 0.890520005484876666655367868878 y[1] (numeric) = 0.8905200054848766666553678688778 absolute error = 2.0e-31 relative error = 2.2458787985465029215697509405960e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.85 y[1] (analytic) = 0.89077049913969746303615885858054 y[1] (numeric) = 0.89077049913969746303615885858034 absolute error = 2.0e-31 relative error = 2.2452472347609085529615749952404e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.851 y[1] (analytic) = 0.89102021701527912240986974274367 y[1] (numeric) = 0.89102021701527912240986974274349 absolute error = 1.8e-31 relative error = 2.0201561823474694361540596483827e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.852 y[1] (analytic) = 0.89126915847873152710028066675194 y[1] (numeric) = 0.89126915847873152710028066675176 absolute error = 1.8e-31 relative error = 2.0195919300880348326712230008637e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.853 y[1] (analytic) = 0.8915173228978263634917672046031 y[1] (numeric) = 0.89151732289782636349176720460292 absolute error = 1.8e-31 relative error = 2.0190297527244926143226265182479e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.854 y[1] (analytic) = 0.89176470964099813754440025661106 y[1] (numeric) = 0.89176470964099813754440025661088 absolute error = 1.8e-31 relative error = 2.0184696484845586265866657574740e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.855 y[1] (analytic) = 0.89201131807734518976045113424889 y[1] (numeric) = 0.89201131807734518976045113424871 absolute error = 1.8e-31 relative error = 2.0179116156056713208331296367216e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.856 y[1] (analytic) = 0.89225714757663070960090346467989 y[1] (numeric) = 0.8922571475766307096009034646797 absolute error = 1.9e-31 relative error = 2.1294309663535872028441072504541e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.857 y[1] (analytic) = 0.89250219750928374935057398367611 y[1] (numeric) = 0.89250219750928374935057398367592 absolute error = 1.9e-31 relative error = 2.1288462989809460100005678852042e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.858 y[1] (analytic) = 0.89274646724640023743044472355745 y[1] (numeric) = 0.89274646724640023743044472355725 absolute error = 2.0e-31 relative error = 2.2402776973946792930313786674567e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.859 y[1] (analytic) = 0.89298995615974399115580954249839 y[1] (numeric) = 0.8929899561597439911558095424982 absolute error = 1.9e-31 relative error = 2.1276835051660036196066689811260e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.86 y[1] (analytic) = 0.89323266362174772893883838304513 y[1] (numeric) = 0.89323266362174772893883838304495 absolute error = 1.8e-31 relative error = 2.0151524606160573576634359818981e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.861 y[1] (analytic) = 0.89347458900551408193416309096097 y[1] (numeric) = 0.89347458900551408193416309096079 absolute error = 1.8e-31 relative error = 2.0146068194323222022070584794740e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.862 y[1] (analytic) = 0.89371573168481660512608907057418 y[1] (numeric) = 0.89371573168481660512608907057398 absolute error = 2.0e-31 relative error = 2.2378480417141549691321768106251e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=392.9MB, alloc=4.5MB, time=18.82 TOP MAIN SOLVE Loop x[1] = 2.863 y[1] (analytic) = 0.8939560910341007878560374996377 y[1] (numeric) = 0.89395609103410078785603749963751 absolute error = 1.9e-31 relative error = 2.1253840306654644518302936392111e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.864 y[1] (analytic) = 0.89419566642848506378882327532564 y[1] (numeric) = 0.89419566642848506378882327532545 absolute error = 1.9e-31 relative error = 2.1248145918541598971135561328779e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.865 y[1] (analytic) = 0.89443445724376182031637431338493 y[1] (numeric) = 0.89443445724376182031637431338473 absolute error = 2.0e-31 relative error = 2.2360498120377493769782077829611e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.866 y[1] (analytic) = 0.89467246285639840739749827463436 y[1] (numeric) = 0.89467246285639840739749827463415 absolute error = 2.1e-31 relative error = 2.3472277142580006265021020730457e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.867 y[1] (analytic) = 0.89490968264353814583230324695408 y[1] (numeric) = 0.89490968264353814583230324695387 absolute error = 2.1e-31 relative error = 2.3466055186671562186954728042471e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.868 y[1] (analytic) = 0.8951461159830013349698793666384 y[1] (numeric) = 0.8951461159830013349698793666382 absolute error = 2.0e-31 relative error = 2.2342721085302454053870317804351e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.869 y[1] (analytic) = 0.89538176225328625984784882049201 y[1] (numeric) = 0.89538176225328625984784882049183 absolute error = 1.8e-31 relative error = 2.0103156841950670190630510819204e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.87 y[1] (analytic) = 0.89561662083357019776239212933439 y[1] (numeric) = 0.8956166208335701977623921293342 absolute error = 1.9e-31 relative error = 2.1214434343923050209272332967791e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.871 y[1] (analytic) = 0.89585069110371042426735907463891 y[1] (numeric) = 0.89585069110371042426735907463871 absolute error = 2.0e-31 relative error = 2.2325148820680710223368318464846e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.872 y[1] (analytic) = 0.89608397244424521860107309287189 y[1] (numeric) = 0.89608397244424521860107309287171 absolute error = 1.8e-31 relative error = 2.0087403138013350384784449129139e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.873 y[1] (analytic) = 0.89631646423639486853943842671138 y[1] (numeric) = 0.89631646423639486853943842671119 absolute error = 1.9e-31 relative error = 2.1197870125242876581174928649598e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.874 y[1] (analytic) = 0.89654816586206267467395978871607 y[1] (numeric) = 0.8965481658620626746739597887159 absolute error = 1.7e-31 relative error = 1.8961613717266267075298733850473e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.875 y[1] (analytic) = 0.89677907670383595411328476118213 y[1] (numeric) = 0.89677907670383595411328476118194 absolute error = 1.9e-31 relative error = 2.1186934991654369727302611344608e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.876 y[1] (analytic) = 0.89700919614498704360687962586597 y[1] (numeric) = 0.8970091961449870436068796258658 absolute error = 1.7e-31 relative error = 1.8951868133637533709828837151850e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.877 y[1] (analytic) = 0.89723852356947430208944978896951 y[1] (numeric) = 0.89723852356947430208944978896932 absolute error = 1.9e-31 relative error = 2.1176085846618027223861099726649e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.878 y[1] (analytic) = 0.89746705836194311264471644027347 y[1] (numeric) = 0.89746705836194311264471644027328 absolute error = 1.9e-31 relative error = 2.1170693478910301469133148928972e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.879 y[1] (analytic) = 0.89769479990772688388716156057187 y[1] (numeric) = 0.89769479990772688388716156057168 absolute error = 1.9e-31 relative error = 2.1165322559463405899304580708170e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.88 y[1] (analytic) = 0.89792174759284805076035386859813 y[1] (numeric) = 0.89792174759284805076035386859796 absolute error = 1.7e-31 relative error = 1.8932607485645228009300394234154e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.881 y[1] (analytic) = 0.89814790080401907475046877744721 y[1] (numeric) = 0.89814790080401907475046877744702 absolute error = 1.9e-31 relative error = 2.1154645001108683658375159169578e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.882 y[1] (analytic) = 0.89837325892864344351361591108268 y[1] (numeric) = 0.89837325892864344351361591108251 absolute error = 1.7e-31 relative error = 1.8923092190292238759495001560238e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.883 y[1] (analytic) = 0.8985978213548166699155882138775 y[1] (numeric) = 0.89859782135481666991558821387731 absolute error = 1.9e-31 relative error = 2.1144053044056666492171760549222e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.884 y[1] (analytic) = 0.89882158747132729048264717026589 y[1] (numeric) = 0.89882158747132729048264717026571 absolute error = 1.8e-31 relative error = 2.0026221277839753738035057657685e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.885 y[1] (analytic) = 0.89904455666765786326195913748858 y[1] (numeric) = 0.89904455666765786326195913748841 absolute error = 1.7e-31 relative error = 1.8908962713718142305350758122816e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.886 y[1] (analytic) = 0.89926672833398596509029828208577 y[1] (numeric) = 0.8992667283339859650902982820856 absolute error = 1.7e-31 relative error = 1.8904291090024885359652839040280e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.887 y[1] (analytic) = 0.89948810186118518826963210023878 y[1] (numeric) = 0.89948810186118518826963210023862 absolute error = 1.6e-31 relative error = 1.7787895100439275526344885032006e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.888 y[1] (analytic) = 0.89970867664082613664820599327707 y[1] (numeric) = 0.89970867664082613664820599327689 absolute error = 1.8e-31 relative error = 2.0006475948642877497255492460371e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=396.7MB, alloc=4.5MB, time=19.00 x[1] = 2.889 y[1] (analytic) = 0.8999284520651774211057438626532 y[1] (numeric) = 0.89992845206517742110574386265302 absolute error = 1.8e-31 relative error = 2.0001590080514920691203804414229e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.89 y[1] (analytic) = 0.90014742752720665444138218344586 y[1] (numeric) = 0.90014742752720665444138218344567 absolute error = 1.9e-31 relative error = 2.1107653500932469603854641280372e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.891 y[1] (analytic) = 0.90036560242058144566295551197579 y[1] (numeric) = 0.90036560242058144566295551197563 absolute error = 1.6e-31 relative error = 1.7770558934042920748188999232216e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.892 y[1] (analytic) = 0.90058297613967039367625188141601 y[1] (numeric) = 0.90058297613967039367625188141584 absolute error = 1.7e-31 relative error = 1.8876661507493885000947407179863e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.893 y[1] (analytic) = 0.90079954807954408037285703934031 y[1] (numeric) = 0.90079954807954408037285703934013 absolute error = 1.8e-31 relative error = 1.9982248035509150206892749765597e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.894 y[1] (analytic) = 0.90101531763597606311520698298801 y[1] (numeric) = 0.90101531763597606311520698298785 absolute error = 1.6e-31 relative error = 1.7757744720677705662953276816116e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.895 y[1] (analytic) = 0.9012302842054438666174687516222 y[1] (numeric) = 0.90123028420544386661746875162202 absolute error = 1.8e-31 relative error = 1.9972697672792286863853137976844e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.896 y[1] (analytic) = 0.90144444718512997422086994072686 y[1] (numeric) = 0.90144444718512997422086994072669 absolute error = 1.7e-31 relative error = 1.8858621907411565443299872897550e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.897 y[1] (analytic) = 0.9016578059729228185620979099246 y[1] (numeric) = 0.90165780597292281856209790992441 absolute error = 1.9e-31 relative error = 2.1072295802395103289057084722702e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.898 y[1] (analytic) = 0.90187035996741777163339016539676 y[1] (numeric) = 0.90187035996741777163339016539658 absolute error = 1.8e-31 relative error = 1.9958522642489651331481556830641e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.899 y[1] (analytic) = 0.90208210856791813423293790825827 y[1] (numeric) = 0.90208210856791813423293790825811 absolute error = 1.6e-31 relative error = 1.7736744635585856314525207599327e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.9 y[1] (analytic) = 0.902293051174436124804225252772 y[1] (numeric) = 0.90229305117443612480422525277181 absolute error = 1.9e-31 relative error = 2.1057460184658806872678499911136e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.901 y[1] (analytic) = 0.90250318718769386766292713248827 y[1] (numeric) = 0.9025031871876938676629271324881 absolute error = 1.7e-31 relative error = 1.8836498575671516968399353554367e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.902 y[1] (analytic) = 0.90271251600912438060998942836056 y[1] (numeric) = 0.90271251600912438060998942836039 absolute error = 1.7e-31 relative error = 1.8832130604720859406656876908154e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.903 y[1] (analytic) = 0.90292103704087256192951537061648 y[1] (numeric) = 0.90292103704087256192951537061632 absolute error = 1.6e-31 relative error = 1.7720264944137886305182303569042e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.904 y[1] (analytic) = 0.9031287496857961767700827856592 y[1] (numeric) = 0.90312874968579617677008278565904 absolute error = 1.6e-31 relative error = 1.7716189419909945784364758846764e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.905 y[1] (analytic) = 0.90333565334746684290811728053057 y[1] (numeric) = 0.90333565334746684290811728053041 absolute error = 1.6e-31 relative error = 1.7712131632034257304625679120033e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.906 y[1] (analytic) = 0.9035417474301710158919469804896 y[1] (numeric) = 0.90354174743017101589194698048944 absolute error = 1.6e-31 relative error = 1.7708091569102110630214990637576e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.907 y[1] (analytic) = 0.90374703133891097356516496004369 y[1] (numeric) = 0.90374703133891097356516496004353 absolute error = 1.6e-31 relative error = 1.7704069219785792762020511191296e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.908 y[1] (analytic) = 0.90395150447940579996792603431695 y[1] (numeric) = 0.90395150447940579996792603431679 absolute error = 1.6e-31 relative error = 1.7700064572838507478133924666092e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.909 y[1] (analytic) = 0.9041551662580923686148051059491 y[1] (numeric) = 0.90415516625809236861480510594894 absolute error = 1.6e-31 relative error = 1.7696077617094295751236903352505e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.91 y[1] (analytic) = 0.90435801608212632514784479278902 y[1] (numeric) = 0.90435801608212632514784479278886 absolute error = 1.6e-31 relative error = 1.7692108341467957041691888415973e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.911 y[1] (analytic) = 0.904560053359383069363420593479 y[1] (numeric) = 0.90456005335938306936342059347882 absolute error = 1.8e-31 relative error = 1.9899176326824342898394552644288e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.912 y[1] (analytic) = 0.90476127749845873661155238161854 y[1] (numeric) = 0.90476127749845873661155238161838 absolute error = 1.6e-31 relative error = 1.7684222786631422834222904871220e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.913 y[1] (analytic) = 0.90496168790867117856629155455009 y[1] (numeric) = 0.90496168790867117856629155454991 absolute error = 1.8e-31 relative error = 1.9890344796360662892683380596173e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.914 y[1] (analytic) = 0.90516128400006094336581369992132 y[1] (numeric) = 0.90516128400006094336581369992114 absolute error = 1.8e-31 relative error = 1.9885958798916976306222970798206e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.915 y[1] (analytic) = 0.9053600651833922551208471820527 y[1] (numeric) = 0.90536006518339225512084718205251 absolute error = 1.9e-31 relative error = 2.0986125554534269311188052833736e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=400.5MB, alloc=4.5MB, time=19.19 TOP MAIN SOLVE Loop x[1] = 2.916 y[1] (analytic) = 0.90555803087015399279006859076919 y[1] (numeric) = 0.90555803087015399279006859076901 absolute error = 1.8e-31 relative error = 1.9877246279516437819238636584715e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.917 y[1] (analytic) = 0.90575518047256066842109653774657 y[1] (numeric) = 0.9057551804725606684210965377464 absolute error = 1.7e-31 relative error = 1.8768868637472844363051920095313e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.918 y[1] (analytic) = 0.90595151340355340475571582957044 y[1] (numeric) = 0.90595151340355340475571582957027 absolute error = 1.7e-31 relative error = 1.8764801149382704995386038538526e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.919 y[1] (analytic) = 0.90614702907680091219796459261258 y[1] (numeric) = 0.90614702907680091219796459261242 absolute error = 1.6e-31 relative error = 1.7657178676953883794908400189809e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.92 y[1] (analytic) = 0.90634172690670046514371747249282 y[1] (numeric) = 0.90634172690670046514371747249266 absolute error = 1.6e-31 relative error = 1.7653385610532585206795053960100e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.921 y[1] (analytic) = 0.90653560630837887767039858031434 y[1] (numeric) = 0.90653560630837887767039858031415 absolute error = 1.9e-31 relative error = 2.0958912002775447784663696571229e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.922 y[1] (analytic) = 0.90672866669769347858545840903723 y[1] (numeric) = 0.90672866669769347858545840903707 absolute error = 1.6e-31 relative error = 1.7645852158035338903971087446165e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.923 y[1] (analytic) = 0.90692090749123308583224949628781 y[1] (numeric) = 0.90692090749123308583224949628763 absolute error = 1.8e-31 relative error = 1.9847375720769785252082838321409e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.924 y[1] (analytic) = 0.90711232810631898025193616458769 y[1] (numeric) = 0.9071123281063189802519361645875 absolute error = 1.9e-31 relative error = 2.0945586793715239389088949230827e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.925 y[1] (analytic) = 0.90730292796100587870007422643129 y[1] (numeric) = 0.90730292796100587870007422643111 absolute error = 1.8e-31 relative error = 1.9839018970710965359317601530856e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.926 y[1] (analytic) = 0.90749270647408290651649709983596 y[1] (numeric) = 0.90749270647408290651649709983579 absolute error = 1.7e-31 relative error = 1.8732932924663128599842563798331e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.927 y[1] (analytic) = 0.90768166306507456934714533994084 y[1] (numeric) = 0.90768166306507456934714533994067 absolute error = 1.7e-31 relative error = 1.8729033197160904010028861354121e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.928 y[1] (analytic) = 0.90786979715424172431647715393524 y[1] (numeric) = 0.90786979715424172431647715393505 absolute error = 1.9e-31 relative error = 2.0928111122934528081576584713881e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.929 y[1] (analytic) = 0.90805710816258255054909803005488 y[1] (numeric) = 0.90805710816258255054909803005471 absolute error = 1.7e-31 relative error = 1.8721289495105460926932933012980e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.93 y[1] (analytic) = 0.90824359551183351903924817659506 y[1] (numeric) = 0.90824359551183351903924817659486 absolute error = 2.0e-31 relative error = 2.2020524118013909748065224576012e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.931 y[1] (analytic) = 0.90842925862447036186678703385112 y[1] (numeric) = 0.90842925862447036186678703385095 absolute error = 1.7e-31 relative error = 1.8713620062987776322180562522664e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.932 y[1] (analytic) = 0.90861409692370904075831469061253 y[1] (numeric) = 0.90861409692370904075831469061236 absolute error = 1.7e-31 relative error = 1.8709813173223736142647541310641e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.933 y[1] (analytic) = 0.90879810983350671499207060729954 y[1] (numeric) = 0.90879810983350671499207060729937 absolute error = 1.7e-31 relative error = 1.8706024821194255698793758133029e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.934 y[1] (analytic) = 0.90898129677856270864525062004949 y[1] (numeric) = 0.9089812967785627086452506200493 absolute error = 1.9e-31 relative error = 2.0902520290941252970261850184685e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.935 y[1] (analytic) = 0.909163657184319477182383774024 y[1] (numeric) = 0.90916365718431947718238377402384 absolute error = 1.6e-31 relative error = 1.7598591709607060081746089017634e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.936 y[1] (analytic) = 0.9093451904769635733834111099251 y[1] (numeric) = 0.90934519047696357338341110992493 absolute error = 1.7e-31 relative error = 1.8694770894519467651844956404569e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.937 y[1] (analytic) = 0.90952589608342661261010910517167 y[1] (numeric) = 0.9095258960834266126101091051715 absolute error = 1.7e-31 relative error = 1.8691056596854355493821593672015e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.938 y[1] (analytic) = 0.90970577343138623740950105040272 y[1] (numeric) = 0.90970577343138623740950105040255 absolute error = 1.7e-31 relative error = 1.8687360789056496118437926508232e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.939 y[1] (analytic) = 0.90988482194926708145290022293393 y[1] (numeric) = 0.90988482194926708145290022293376 absolute error = 1.7e-31 relative error = 1.8683683461804001596179497103180e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.94 y[1] (analytic) = 0.91006304106624173280922930150416 y[1] (numeric) = 0.91006304106624173280922930150401 absolute error = 1.5e-31 relative error = 1.6482374652228272329351171898193e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.941 y[1] (analytic) = 0.91024043021223169655126105110474 y[1] (numeric) = 0.91024043021223169655126105110457 absolute error = 1.7e-31 relative error = 1.8676384212066123335380762848347e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=404.3MB, alloc=4.5MB, time=19.38 x[1] = 2.942 y[1] (analytic) = 0.91041698881790835669342589288698 y[1] (numeric) = 0.91041698881790835669342589288682 absolute error = 1.6e-31 relative error = 1.7574364490687404022266079109416e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.943 y[1] (analytic) = 0.9105927163146939374598325620938 y[1] (numeric) = 0.91059271631469393745983256209363 absolute error = 1.7e-31 relative error = 1.8669158774739121585631662980238e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.944 y[1] (analytic) = 0.91076761213476246388114864665449 y[1] (numeric) = 0.91076761213476246388114864665432 absolute error = 1.7e-31 relative error = 1.8665573713313579377302956986631e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.945 y[1] (analytic) = 0.91094167571104072171898839052352 y[1] (numeric) = 0.91094167571104072171898839052335 absolute error = 1.7e-31 relative error = 1.8662007078258389065743737304871e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.946 y[1] (analytic) = 0.91111490647720921671645573902748 y[1] (numeric) = 0.9111149064772092167164557390273 absolute error = 1.8e-31 relative error = 1.9756015264415230004183539144885e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.947 y[1] (analytic) = 0.91128730386770313317349119841401 y[1] (numeric) = 0.91128730386770313317349119841383 absolute error = 1.8e-31 relative error = 1.9752277820182562829051436098888e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.948 y[1] (analytic) = 0.91145886731771329184567167846852 y[1] (numeric) = 0.91145886731771329184567167846835 absolute error = 1.7e-31 relative error = 1.8651417644362218599845204278929e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.949 y[1] (analytic) = 0.91162959626318710716511308548014 y[1] (numeric) = 0.91162959626318710716511308547997 absolute error = 1.7e-31 relative error = 1.8647924628252313412669422366681e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.95 y[1] (analytic) = 0.91179949014082954378212603299622 y[1] (numeric) = 0.91179949014082954378212603299605 absolute error = 1.7e-31 relative error = 1.8644449995661119105300643347617e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.951 y[1] (analytic) = 0.91196854838810407242627563970519 y[1] (numeric) = 0.91196854838810407242627563970502 absolute error = 1.7e-31 relative error = 1.8640993738267993882729262518734e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.952 y[1] (analytic) = 0.91213677044323362508549698742877 y[1] (numeric) = 0.91213677044323362508549698742858 absolute error = 1.9e-31 relative error = 2.0830209476992524643231221833855e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.953 y[1] (analytic) = 0.91230415574520154950191841758731 y[1] (numeric) = 0.91230415574520154950191841758712 absolute error = 1.9e-31 relative error = 2.0826387647527642417166002404431e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.954 y[1] (analytic) = 0.91247070373375256298304545162536 y[1] (numeric) = 0.91247070373375256298304545162519 absolute error = 1.7e-31 relative error = 1.8630735135317161349127454388308e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.955 y[1] (analytic) = 0.91263641384939370552695872974712 y[1] (numeric) = 0.91263641384939370552695872974695 absolute error = 1.7e-31 relative error = 1.8627352297171649459650987801904e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.956 y[1] (analytic) = 0.91280128553339529226017997291404 y[1] (numeric) = 0.91280128553339529226017997291385 absolute error = 1.9e-31 relative error = 2.0815045181380691080061960502929e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.957 y[1] (analytic) = 0.91296531822779186518686058539835 y[1] (numeric) = 0.91296531822779186518686058539816 absolute error = 1.9e-31 relative error = 2.0811305337295796312214484146647e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.958 y[1] (analytic) = 0.91312851137538314424794812926563 y[1] (numeric) = 0.91312851137538314424794812926545 absolute error = 1.8e-31 relative error = 1.9712449864135584513767029201752e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.959 y[1] (analytic) = 0.91329086441973497768898651797684 y[1] (numeric) = 0.91329086441973497768898651797664 absolute error = 2.0e-31 relative error = 2.1898828488454359172242488565239e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.96 y[1] (analytic) = 0.913452376805180291735206393855 y[1] (numeric) = 0.91345237680518029173520639385481 absolute error = 1.9e-31 relative error = 2.0800208617829553882448761233704e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.961 y[1] (analytic) = 0.91361304797682003957256277345348 y[1] (numeric) = 0.91361304797682003957256277345329 absolute error = 1.9e-31 relative error = 2.0796550620719750513475020889990e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.962 y[1] (analytic) = 0.91377287738052414963337766588928 y[1] (numeric) = 0.91377287738052414963337766588908 absolute error = 2.0e-31 relative error = 2.1887276909917914499516517782723e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.963 y[1] (analytic) = 0.91393186446293247318524599196895 y[1] (numeric) = 0.91393186446293247318524599196876 absolute error = 1.9e-31 relative error = 2.0789295940748554330270376177444e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.964 y[1] (analytic) = 0.91409000867145573122186375643233 y[1] (numeric) = 0.91409000867145573122186375643214 absolute error = 1.9e-31 relative error = 2.0785699241603922134515991270836e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.965 y[1] (analytic) = 0.91424730945427646065443805187188 y[1] (numeric) = 0.91424730945427646065443805187169 absolute error = 1.9e-31 relative error = 2.0782122958985018721347910950419e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.966 y[1] (analytic) = 0.91440376626034995980233910085248 y[1] (numeric) = 0.91440376626034995980233910085231 absolute error = 1.7e-31 relative error = 1.8591349497088294916057711380966e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.967 y[1] (analytic) = 0.91455937853940523318165517245625 y[1] (numeric) = 0.91455937853940523318165517245607 absolute error = 1.8e-31 relative error = 1.9681608895364295487444975403893e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.968 y[1] (analytic) = 0.91471414574194593559031184090959 y[1] (numeric) = 0.91471414574194593559031184090941 absolute error = 1.8e-31 relative error = 1.9678278819444495428132071427771e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=408.1MB, alloc=4.5MB, time=19.56 TOP MAIN SOLVE Loop x[1] = 2.969 y[1] (analytic) = 0.91486806731925131548841768711551 y[1] (numeric) = 0.91486806731925131548841768711532 absolute error = 1.9e-31 relative error = 2.0768021836934201036515761959651e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.97 y[1] (analytic) = 0.91502114272337715767249917881028 y[1] (numeric) = 0.91502114272337715767249917881009 absolute error = 1.9e-31 relative error = 2.0764547520126481005982443992344e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.971 y[1] (analytic) = 0.91517337140715672524228810169214 y[1] (numeric) = 0.91517337140715672524228810169194 absolute error = 2.0e-31 relative error = 2.1853782709224048650729149693231e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.972 y[1] (analytic) = 0.91532475282420170085872555222774 y[1] (numeric) = 0.91532475282420170085872555222756 absolute error = 1.8e-31 relative error = 1.9665151569933671616056145748445e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.973 y[1] (analytic) = 0.91547528642890312729184714293146 y[1] (numeric) = 0.91547528642890312729184714293127 absolute error = 1.9e-31 relative error = 2.0754246763028880561992819885000e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.974 y[1] (analytic) = 0.91562497167643234725721471272946 y[1] (numeric) = 0.91562497167643234725721471272926 absolute error = 2.0e-31 relative error = 2.1843004088651799638570937448687e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.975 y[1] (analytic) = 0.91577380802274194253956047856872 y[1] (numeric) = 0.91577380802274194253956047856852 absolute error = 2.0e-31 relative error = 2.1839454049447249959907238612303e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.976 y[1] (analytic) = 0.91592179492456667240231020970536 y[1] (numeric) = 0.91592179492456667240231020970517 absolute error = 1.9e-31 relative error = 2.0744129144306254541602253372612e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.977 y[1] (analytic) = 0.91606893183942441128165265310991 y[1] (numeric) = 0.9160689318394244112816526531097 absolute error = 2.1e-31 relative error = 2.2924039087138303989791500819868e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.978 y[1] (analytic) = 0.91621521822561708576382308715702 y[1] (numeric) = 0.91621521822561708576382308715683 absolute error = 1.9e-31 relative error = 2.0737485715197178603148132827103e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.979 y[1] (analytic) = 0.91636065354223161084426953122437 y[1] (numeric) = 0.91636065354223161084426953122416 absolute error = 2.1e-31 relative error = 2.2916741262104166829768845639904e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.98 y[1] (analytic) = 0.91650523724914082546737079100655 y[1] (numeric) = 0.91650523724914082546737079100635 absolute error = 2.0e-31 relative error = 2.1822024781908848746126485434261e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.981 y[1] (analytic) = 0.91664896880700442734537617325972 y[1] (numeric) = 0.91664896880700442734537617325953 absolute error = 1.9e-31 relative error = 2.0727672911395975293277835051929e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.982 y[1] (analytic) = 0.91679184767726990705523735932358 y[1] (numeric) = 0.91679184767726990705523735932337 absolute error = 2.1e-31 relative error = 2.2905962845551440285204298696137e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.983 y[1] (analytic) = 0.9169338733221734814120035841253 y[1] (numeric) = 0.9169338733221734814120035841251 absolute error = 2.0e-31 relative error = 2.1811823711493324687028228405160e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.984 y[1] (analytic) = 0.9170750452047410261174519264506 y[1] (numeric) = 0.91707504520474102611745192645038 absolute error = 2.2e-31 relative error = 2.3989312668614162877341785379415e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.985 y[1] (analytic) = 0.91721536278878900768262517706964 y[1] (numeric) = 0.91721536278878900768262517706943 absolute error = 2.1e-31 relative error = 2.2895386244021903989945968193038e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.986 y[1] (analytic) = 0.91735482553892541462295041383302 y[1] (numeric) = 0.9173548255389254146229504138328 absolute error = 2.2e-31 relative error = 2.3981996265267905163364073319101e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.987 y[1] (analytic) = 0.91749343292055068792461207709917 y[1] (numeric) = 0.91749343292055068792461207709896 absolute error = 2.1e-31 relative error = 2.2888447204633530477685685736964e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.988 y[1] (analytic) = 0.91763118439985865078085400482509 y[1] (numeric) = 0.91763118439985865078085400482489 absolute error = 2.0e-31 relative error = 2.1795248832002401967850446782277e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.989 y[1] (analytic) = 0.91776807944383743759688555434072 y[1] (numeric) = 0.9177680794438374375968855543405 absolute error = 2.2e-31 relative error = 2.3971197618173735886733976138630e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.99 y[1] (analytic) = 0.91790411752027042226206760723744 y[1] (numeric) = 0.91790411752027042226206760723722 absolute error = 2.2e-31 relative error = 2.3967644964305507340690417005748e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.991 y[1] (analytic) = 0.91803929809773714568805492493053 y[1] (numeric) = 0.91803929809773714568805492493032 absolute error = 2.1e-31 relative error = 2.2874837758594816329308812075914e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.992 y[1] (analytic) = 0.91817362064561424261157199530244 y[1] (numeric) = 0.91817362064561424261157199530221 absolute error = 2.3e-31 relative error = 2.5049728594715603401562819900960e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.993 y[1] (analytic) = 0.91830708463407636766050018540017 y[1] (numeric) = 0.91830708463407636766050018539996 absolute error = 2.1e-31 relative error = 2.2868167251881763305524069005276e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.994 y[1] (analytic) = 0.91843968953409712068195469144426 y[1] (numeric) = 0.91843968953409712068195469144404 absolute error = 2.2e-31 relative error = 2.3953668652059323781210762097994e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=412.0MB, alloc=4.5MB, time=19.74 x[1] = 2.995 y[1] (analytic) = 0.91857143481744997133103045540573 y[1] (numeric) = 0.91857143481744997133103045540551 absolute error = 2.2e-31 relative error = 2.3950233118638307909537734507345e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.996 y[1] (analytic) = 0.9187023199567091829188968971262 y[1] (numeric) = 0.91870231995670918291889689712599 absolute error = 2.1e-31 relative error = 2.2858329127752236159640016034464e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.997 y[1] (analytic) = 0.91883234442525073551892199238748 y[1] (numeric) = 0.91883234442525073551892199238726 absolute error = 2.2e-31 relative error = 2.3943432263218237144706953866423e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.998 y[1] (analytic) = 0.91896150769725324832950691048512 y[1] (numeric) = 0.91896150769725324832950691048489 absolute error = 2.3e-31 relative error = 2.5028251790038219891823015405268e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.999 y[1] (analytic) = 0.91908980924769890129231310972276 y[1] (numeric) = 0.91908980924769890129231310972254 absolute error = 2.2e-31 relative error = 2.3936724984479617400270987224341e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3 y[1] (analytic) = 0.91921724855237435596456447581975 y[1] (numeric) = 0.91921724855237435596456447581954 absolute error = 2.1e-31 relative error = 2.2845524312203417468265170611924e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.001 y[1] (analytic) = 0.91934382508787167564410777651366 y[1] (numeric) = 0.91934382508787167564410777651345 absolute error = 2.1e-31 relative error = 2.2842378908666517545378462946360e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.002 y[1] (analytic) = 0.91946953833158924474591539564141 y[1] (numeric) = 0.9194695383315892447459153956412 absolute error = 2.1e-31 relative error = 2.2839255814940057768140296782719e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.003 y[1] (analytic) = 0.91959438776173268742871500169614 y[1] (numeric) = 0.9195943877617326874287150016959 absolute error = 2.4e-31 relative error = 2.6098462886898795009069581478269e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.004 y[1] (analytic) = 0.91971837285731578547043149928194 y[1] (numeric) = 0.91971837285731578547043149928174 absolute error = 2.0e-31 relative error = 2.1745787178161309345554531291346e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.005 y[1] (analytic) = 0.91984149309816139539112730702502 y[1] (numeric) = 0.9198414930981613953911273070248 absolute error = 2.2e-31 relative error = 2.3917164169123057586792520053747e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.006 y[1] (analytic) = 0.91996374796490236482212770234377 y[1] (numeric) = 0.91996374796490236482212770234355 absolute error = 2.2e-31 relative error = 2.3913985794187320899793985479849e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.007 y[1] (analytic) = 0.92008513693898244812001867203801 y[1] (numeric) = 0.92008513693898244812001867203778 absolute error = 2.3e-31 relative error = 2.4997686710295481760102570084958e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.008 y[1] (analytic) = 0.92020565950265722122420540791896 y[1] (numeric) = 0.92020565950265722122420540791874 absolute error = 2.2e-31 relative error = 2.3907699080975356633937455322742e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.009 y[1] (analytic) = 0.92032531513899499575672028867538 y[1] (numeric) = 0.92032531513899499575672028867516 absolute error = 2.2e-31 relative error = 2.3904590733416239357104584999037e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.01 y[1] (analytic) = 0.9204441033318777323629698928495 y[1] (numeric) = 0.92044410333187773236296989284929 absolute error = 2.1e-31 relative error = 2.2815073641064095226551178387776e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.011 y[1] (analytic) = 0.92056202356600195329211129318364 y[1] (numeric) = 0.92056202356600195329211129318342 absolute error = 2.2e-31 relative error = 2.3898444033980569711297762049337e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.012 y[1] (analytic) = 0.92067907532687965421574858968992 y[1] (numeric) = 0.92067907532687965421574858968969 absolute error = 2.3e-31 relative error = 2.4981560476797016538661726144354e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.013 y[1] (analytic) = 0.92079525810083921528364134759421 y[1] (numeric) = 0.92079525810083921528364134759399 absolute error = 2.2e-31 relative error = 2.3892390633478599079915977882843e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.014 y[1] (analytic) = 0.9209105713750263114151173168077 y[1] (numeric) = 0.92091057137502631141511731680745 absolute error = 2.5e-31 relative error = 2.7147044215891777554468978871515e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.015 y[1] (analytic) = 0.92102501463740482182488252178635 y[1] (numeric) = 0.9210250146374048218248825217861 absolute error = 2.5e-31 relative error = 2.7143671021619498825893339328913e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.016 y[1] (analytic) = 0.92113858737675773878192252454989 y[1] (numeric) = 0.92113858737675773878192252454965 absolute error = 2.4e-31 relative error = 2.6054711341914162879602295647212e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.017 y[1] (analytic) = 0.92125128908268807560018937924403 y[1] (numeric) = 0.9212512890826880756001893792438 absolute error = 2.3e-31 relative error = 2.4966043763044988136655621530708e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.018 y[1] (analytic) = 0.92136311924561977385976951394628 y[1] (numeric) = 0.92136311924561977385976951394605 absolute error = 2.3e-31 relative error = 2.4963013517223919036682313108413e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.019 y[1] (analytic) = 0.92147407735679860985722849443223 y[1] (numeric) = 0.92147407735679860985722849443202 absolute error = 2.1e-31 relative error = 2.2789572182255445397765966615306e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.02 y[1] (analytic) = 0.92158416290829310028382934533761 y[1] (numeric) = 0.92158416290829310028382934533738 absolute error = 2.3e-31 relative error = 2.4957026092351297804436245347302e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.021 y[1] (analytic) = 0.92169337539299540713032182656875 y[1] (numeric) = 0.92169337539299540713032182656852 absolute error = 2.3e-31 relative error = 2.4954068906259812847875054067649e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=415.8MB, alloc=4.5MB, time=19.93 TOP MAIN SOLVE Loop x[1] = 3.022 y[1] (analytic) = 0.92180171430462224181700078693319 y[1] (numeric) = 0.92180171430462224181700078693298 absolute error = 2.1e-31 relative error = 2.2781472060769304350585190736116e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.023 y[1] (analytic) = 0.92190917913771576854773244277724 y[1] (numeric) = 0.92190917913771576854773244277703 absolute error = 2.1e-31 relative error = 2.2778816476956888811135408992371e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.024 y[1] (analytic) = 0.92201576938764450688664815693286 y[1] (numeric) = 0.92201576938764450688664815693265 absolute error = 2.1e-31 relative error = 2.2776183116637062339647712473912e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.025 y[1] (analytic) = 0.92212148455060423355620602248854 y[1] (numeric) = 0.92212148455060423355620602248831 absolute error = 2.3e-31 relative error = 2.4942483593915010592882122389160e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.026 y[1] (analytic) = 0.92222632412361888345532128680723 y[1] (numeric) = 0.92222632412361888345532128680702 absolute error = 2.1e-31 relative error = 2.2770983055548820464479622201172e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.027 y[1] (analytic) = 0.92233028760454144989626738382048 y[1] (numeric) = 0.92233028760454144989626738382027 absolute error = 2.1e-31 relative error = 2.2768416349571255669053306945905e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.028 y[1] (analytic) = 0.92243337449205488405905007692737 y[1] (numeric) = 0.92243337449205488405905007692714 absolute error = 2.3e-31 relative error = 2.4934050128731659328258867533010e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.029 y[1] (analytic) = 0.92253558428567299366195795082341 y[1] (numeric) = 0.92253558428567299366195795082317 absolute error = 2.4e-31 relative error = 2.6015256656558565604377527726334e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.03 y[1] (analytic) = 0.9226369164857413408469932282733 y[1] (numeric) = 0.92263691648574134084699322827306 absolute error = 2.4e-31 relative error = 2.6012399429468202876983683882038e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.031 y[1] (analytic) = 0.92273737059343813927888762722431 y[1] (numeric) = 0.92273737059343813927888762722407 absolute error = 2.4e-31 relative error = 2.6009567581038720271251075013339e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.032 y[1] (analytic) = 0.92283694611077515045640871473277 y[1] (numeric) = 0.92283694611077515045640871473254 absolute error = 2.3e-31 relative error = 2.4923146062727244499652205103498e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.033 y[1] (analytic) = 0.92293564254059857923466295694356 y[1] (numeric) = 0.92293564254059857923466295694334 absolute error = 2.2e-31 relative error = 2.3836981676685275929934501107060e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.034 y[1] (analytic) = 0.92303345938658996855710240882124 y[1] (numeric) = 0.92303345938658996855710240882101 absolute error = 2.3e-31 relative error = 2.4917839939718819056583290290973e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.035 y[1] (analytic) = 0.92313039615326709339594273348075 y[1] (numeric) = 0.92313039615326709339594273348051 absolute error = 2.4e-31 relative error = 2.5998493928928418042082408051266e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.036 y[1] (analytic) = 0.92322645234598485389970098880514 y[1] (numeric) = 0.92322645234598485389970098880492 absolute error = 2.2e-31 relative error = 2.3829473195981784107049612176747e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.037 y[1] (analytic) = 0.92332162747093616774656236856608 y[1] (numeric) = 0.92332162747093616774656236856583 absolute error = 2.5e-31 relative error = 2.7076155541246581319485854281859e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.038 y[1] (analytic) = 0.92341592103515286170228583647931 y[1] (numeric) = 0.92341592103515286170228583647907 absolute error = 2.4e-31 relative error = 2.5990455062866910573437648966861e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.039 y[1] (analytic) = 0.92350933254650656238135934453334 y[1] (numeric) = 0.92350933254650656238135934453309 absolute error = 2.5e-31 relative error = 2.7070652259749672883763592645322e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.04 y[1] (analytic) = 0.92360186151370958621011608151939 y[1] (numeric) = 0.92360186151370958621011608151913 absolute error = 2.6e-31 relative error = 2.8150657857475600301430809311508e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.041 y[1] (analytic) = 0.92369350744631582859052395397061 y[1] (numeric) = 0.92369350744631582859052395397035 absolute error = 2.6e-31 relative error = 2.8147864838717722394311065381256e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.042 y[1] (analytic) = 0.92378426985472165226336125968112 y[1] (numeric) = 0.92378426985472165226336125968088 absolute error = 2.4e-31 relative error = 2.5980091654704560827434218337861e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.043 y[1] (analytic) = 0.92387414825016677486949227362454 y[1] (numeric) = 0.92387414825016677486949227362428 absolute error = 2.6e-31 relative error = 2.8142361217969394092070990830102e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.044 y[1] (analytic) = 0.92396314214473515570795722742417 y[1] (numeric) = 0.92396314214473515570795722742393 absolute error = 2.4e-31 relative error = 2.5975062105064462995321122574940e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.045 y[1] (analytic) = 0.92405125105135588168959192654423 y[1] (numeric) = 0.92405125105135588168959192654399 absolute error = 2.4e-31 relative error = 2.5972585365469252504478384586606e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.046 y[1] (analytic) = 0.92413847448380405248489301406902 y[1] (numeric) = 0.92413847448380405248489301406879 absolute error = 2.3e-31 relative error = 2.4888045065808030560077546316559e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.047 y[1] (analytic) = 0.9242248119567016648648456563198 y[1] (numeric) = 0.92422481195670166486484565631956 absolute error = 2.4e-31 relative error = 2.5967707953207772701139950560333e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=419.6MB, alloc=4.5MB, time=20.10 x[1] = 3.048 y[1] (analytic) = 0.92431026298551849623343119362001 y[1] (numeric) = 0.92431026298551849623343119361976 absolute error = 2.5e-31 relative error = 2.7047195082796223433761261621511e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.049 y[1] (analytic) = 0.9243948270865729873505330692636 y[1] (numeric) = 0.92439482708657298735053306926336 absolute error = 2.4e-31 relative error = 2.5962931960189681394471658989514e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.05 y[1] (analytic) = 0.92447850377703312424396012116335 y[1] (numeric) = 0.92447850377703312424396012116312 absolute error = 2.3e-31 relative error = 2.4878891078626062479086118633204e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.051 y[1] (analytic) = 0.92456129257491731930930709375819 y[1] (numeric) = 0.92456129257491731930930709375796 absolute error = 2.3e-31 relative error = 2.4876663326391967756130741755760e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.052 y[1] (analytic) = 0.92464319299909529159637300253891 y[1] (numeric) = 0.92464319299909529159637300253866 absolute error = 2.5e-31 relative error = 2.7037456382404213528884821942152e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.053 y[1] (analytic) = 0.92472420456928894628085876000949 y[1] (numeric) = 0.92472420456928894628085876000925 absolute error = 2.4e-31 relative error = 2.5953684224345072356099426428742e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.054 y[1] (analytic) = 0.92480432680607325332006625003631 y[1] (numeric) = 0.92480432680607325332006625003607 absolute error = 2.4e-31 relative error = 2.5951435676006171511264397547770e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.055 y[1] (analytic) = 0.92488355923087712529132181734791 y[1] (numeric) = 0.92488355923087712529132181734768 absolute error = 2.3e-31 relative error = 2.4867995295674348487771736789582e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.056 y[1] (analytic) = 0.92496190136598429441184792043527 y[1] (numeric) = 0.92496190136598429441184792043502 absolute error = 2.5e-31 relative error = 2.7028140254295863327420514627260e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.057 y[1] (analytic) = 0.92503935273453418873880747926258 y[1] (numeric) = 0.92503935273453418873880747926234 absolute error = 2.4e-31 relative error = 2.5944842161636628849975488004235e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.058 y[1] (analytic) = 0.9251159128605228075482462340347 y[1] (numeric) = 0.92511591286052280754824623403446 absolute error = 2.4e-31 relative error = 2.5942695035685127457330216257528e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.059 y[1] (analytic) = 0.92519158126880359589165921777413 y[1] (numeric) = 0.92519158126880359589165921777391 absolute error = 2.2e-31 relative error = 2.3778858828167565481541527855600e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.06 y[1] (analytic) = 0.9252663574850883183289082336425 y[1] (numeric) = 0.92526635748508831832890823364227 absolute error = 2.3e-31 relative error = 2.4857706987763974995356739519667e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.061 y[1] (analytic) = 0.92534024103594793183621801779227 y[1] (numeric) = 0.92534024103594793183621801779204 absolute error = 2.3e-31 relative error = 2.4855722230615158334515657820783e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.062 y[1] (analytic) = 0.92541323144881345788797956005885 y[1] (numeric) = 0.92541323144881345788797956005864 absolute error = 2.1e-31 relative error = 2.2692565101022714239388163028851e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.063 y[1] (analytic) = 0.92548532825197685371108984799557 y[1] (numeric) = 0.92548532825197685371108984799534 absolute error = 2.3e-31 relative error = 2.4851825629090810577393693042411e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.064 y[1] (analytic) = 0.92555653097459188271055809461683 y[1] (numeric) = 0.92555653097459188271055809461663 absolute error = 2.0e-31 relative error = 2.1608620684617085121965188037375e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.065 y[1] (analytic) = 0.92562683914667498406510930674701 y[1] (numeric) = 0.92562683914667498406510930674678 absolute error = 2.3e-31 relative error = 2.4848026253434313117651620314593e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.066 y[1] (analytic) = 0.92569625229910614149151684906974 y[1] (numeric) = 0.92569625229910614149151684906952 absolute error = 2.2e-31 relative error = 2.3765895071260885721013914839743e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.067 y[1] (analytic) = 0.92576476996362975117639645884118 y[1] (numeric) = 0.92576476996362975117639645884096 absolute error = 2.2e-31 relative error = 2.3764136110800919269619442923822e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.068 y[1] (analytic) = 0.92583239167285548887419496776076 y[1] (numeric) = 0.92583239167285548887419496776055 absolute error = 2.1e-31 relative error = 2.2682291296868328946441843322796e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.069 y[1] (analytic) = 0.92589911696025917617010779069304 y[1] (numeric) = 0.92589911696025917617010779069284 absolute error = 2.0e-31 relative error = 2.1600625417659218535941952765064e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.07 y[1] (analytic) = 0.92596494536018364590666004579603 y[1] (numeric) = 0.92596494536018364590666004579584 absolute error = 1.9e-31 relative error = 2.0519135303344926341233321294180e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.071 y[1] (analytic) = 0.92602987640783960677268697713882 y[1] (numeric) = 0.9260298764078396067726869771386 absolute error = 2.2e-31 relative error = 2.3757332846905706867010559052255e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.072 y[1] (analytic) = 0.92609390963930650705345015908108 y[1] (numeric) = 0.92609390963930650705345015908088 absolute error = 2.0e-31 relative error = 2.1596081986749665858142618254812e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.073 y[1] (analytic) = 0.92615704459153339754062677154038 y[1] (numeric) = 0.92615704459153339754062677154018 absolute error = 2.0e-31 relative error = 2.1594609809204309297459955258312e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.074 y[1] (analytic) = 0.92621928080233979360091004678616 y[1] (numeric) = 0.92621928080233979360091004678596 absolute error = 2.0e-31 relative error = 2.1593158784899132565381658213720e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=423.4MB, alloc=4.5MB, time=20.29 TOP MAIN SOLVE Loop x[1] = 3.075 y[1] (analytic) = 0.92628061781041653640195980157589 y[1] (numeric) = 0.92628061781041653640195980157569 absolute error = 2.0e-31 relative error = 2.1591728916099845190741286729945e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.076 y[1] (analytic) = 0.92634105515532665329444278328319 y[1] (numeric) = 0.92634105515532665329444278328297 absolute error = 2.2e-31 relative error = 2.3749352225688726060913757288475e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.077 y[1] (analytic) = 0.92640059237750621734890337516248 y[1] (numeric) = 0.92640059237750621734890337516225 absolute error = 2.3e-31 relative error = 2.4827272552765758866780977071449e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.078 y[1] (analytic) = 0.92645922901826520604620602404816 y[1] (numeric) = 0.92645922901826520604620602404796 absolute error = 2.0e-31 relative error = 2.1587566266886093758259921131296e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.079 y[1] (analytic) = 0.92651696461978835912029157359687 y[1] (numeric) = 0.92651696461978835912029157359665 absolute error = 2.2e-31 relative error = 2.3744843149232637932540225652380e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.08 y[1] (analytic) = 0.92657379872513603555199050764872 y[1] (numeric) = 0.9265737987251360355519905076485 absolute error = 2.2e-31 relative error = 2.3743386690050579980893032344159e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.081 y[1] (analytic) = 0.92662973087824506971263693140871 y[1] (numeric) = 0.9266297308782450697126369314085 absolute error = 2.1e-31 relative error = 2.2662773813761113224860212912085e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.082 y[1] (analytic) = 0.92668476062392962665622794292716 y[1] (numeric) = 0.92668476062392962665622794292693 absolute error = 2.3e-31 relative error = 2.4819659259869860452064202738387e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.083 y[1] (analytic) = 0.92673888750788205655887387379276 y[1] (numeric) = 0.92673888750788205655887387379253 absolute error = 2.3e-31 relative error = 2.4818209648944273386668509612078e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.084 y[1] (analytic) = 0.9267921110766737483042857060396 y[1] (numeric) = 0.92679211107667374830428570603937 absolute error = 2.3e-31 relative error = 2.4816784395456732712241467676578e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.085 y[1] (analytic) = 0.92684443087775598221404680200914 y[1] (numeric) = 0.92684443087775598221404680200894 absolute error = 2.0e-31 relative error = 2.1578594350574302659415206921648e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.086 y[1] (analytic) = 0.92689584645946078192141691530198 y[1] (numeric) = 0.92689584645946078192141691530175 absolute error = 2.3e-31 relative error = 2.4814006975923956133727764224062e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.087 y[1] (analytic) = 0.92694635737100176538741728399675 y[1] (numeric) = 0.92694635737100176538741728399654 absolute error = 2.1e-31 relative error = 2.2655032659667643408575053885413e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.088 y[1] (analytic) = 0.92699596316247499505794644201013 y[1] (numeric) = 0.9269959631624749950579464420099 absolute error = 2.3e-31 relative error = 2.4811327032681780689679157451476e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.089 y[1] (analytic) = 0.9270446633848598271606772208135 y[1] (numeric) = 0.92704466338485982716067722081327 absolute error = 2.3e-31 relative error = 2.4810023624990782775083759713318e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.09 y[1] (analytic) = 0.92709245759001976014048625171764 y[1] (numeric) = 0.92709245759001976014048625171743 absolute error = 2.1e-31 relative error = 2.2651462459946634591754701320415e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.091 y[1] (analytic) = 0.92713934533070328223216811857604 y[1] (numeric) = 0.92713934533070328223216811857583 absolute error = 2.1e-31 relative error = 2.2650316919199956778041561826892e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.092 y[1] (analytic) = 0.92718532616054471816918715204675 y[1] (numeric) = 0.92718532616054471816918715204654 absolute error = 2.1e-31 relative error = 2.2649193648221943051962045807671e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.093 y[1] (analytic) = 0.92723039963406507502722069948786 y[1] (numeric) = 0.92723039963406507502722069948766 absolute error = 2.0e-31 relative error = 2.1569612048842525403378864565533e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.094 y[1] (analytic) = 0.92727456530667288720124854914158 y[1] (numeric) = 0.92727456530667288720124854914138 absolute error = 2.0e-31 relative error = 2.1568584697872630484433411881162e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.095 y[1] (analytic) = 0.92731782273466506051494403348765 y[1] (numeric) = 0.92731782273466506051494403348744 absolute error = 2.1e-31 relative error = 2.2645957497151183043839499920938e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.096 y[1] (analytic) = 0.92736017147522771546112318451617 y[1] (numeric) = 0.92736017147522771546112318451596 absolute error = 2.1e-31 relative error = 2.2644923349030163179229474282035e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.097 y[1] (analytic) = 0.92740161108643702957200916318229 y[1] (numeric) = 0.92740161108643702957200916318206 absolute error = 2.3e-31 relative error = 2.4800474492443296664595528532461e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.098 y[1] (analytic) = 0.92744214112726007891807003645973 y[1] (numeric) = 0.92744214112726007891807003645951 absolute error = 2.2e-31 relative error = 2.3721156311983071487053723546156e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.099 y[1] (analytic) = 0.92748176115755567873418882820719 y[1] (numeric) = 0.92748176115755567873418882820698 absolute error = 2.1e-31 relative error = 2.2641954677136374936191372905865e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.1 y[1] (analytic) = 0.92752047073807522317192562449747 y[1] (numeric) = 0.92752047073807522317192562449727 absolute error = 2.0e-31 relative error = 2.1562866406695026972991927607799e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=427.2MB, alloc=4.6MB, time=20.47 x[1] = 3.101 y[1] (analytic) = 0.92755826943046352417663237013687 y[1] (numeric) = 0.92755826943046352417663237013667 absolute error = 2.0e-31 relative error = 2.1561987703780958676114433314594e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.102 y[1] (analytic) = 0.92759515679725964948818185081751 y[1] (numeric) = 0.92759515679725964948818185081731 absolute error = 2.0e-31 relative error = 2.1561130255417354561947418232988e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.103 y[1] (analytic) = 0.92763113240189775976407321469946 y[1] (numeric) = 0.92763113240189775976407321469925 absolute error = 2.1e-31 relative error = 2.2638308770022731859413804504972e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.104 y[1] (analytic) = 0.92766619580870794482367724821026 y[1] (numeric) = 0.92766619580870794482367724821007 absolute error = 1.9e-31 relative error = 2.0481505185641095862531350743672e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.105 y[1] (analytic) = 0.92770034658291705901238548347761 y[1] (numeric) = 0.92770034658291705901238548347741 absolute error = 2.0e-31 relative error = 2.1558685488981238839152124889670e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.106 y[1] (analytic) = 0.92773358429064955568442807907322 y[1] (numeric) = 0.92773358429064955568442807907301 absolute error = 2.1e-31 relative error = 2.2635808766216780872235202486560e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.107 y[1] (analytic) = 0.92776590849892832080312628164498 y[1] (numeric) = 0.92776590849892832080312628164477 absolute error = 2.1e-31 relative error = 2.2635020114046643135709746730106e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.108 y[1] (analytic) = 0.92779731877567550565734614354541 y[1] (numeric) = 0.92779731877567550565734614354521 absolute error = 2.0e-31 relative error = 2.1556432202662611653541532207794e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.109 y[1] (analytic) = 0.92782781468971335869292104072971 y[1] (numeric) = 0.9278278146897133586929210407295 absolute error = 2.1e-31 relative error = 2.2633509868447817290400266525591e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.11 y[1] (analytic) = 0.9278573958107650564578114059936 y[1] (numeric) = 0.92785739581076505645781140599338 absolute error = 2.2e-31 relative error = 2.3710540110289601786097581435903e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.111 y[1] (analytic) = 0.92788606170945553365977096504993 y[1] (numeric) = 0.92788606170945553365977096504971 absolute error = 2.2e-31 relative error = 2.3709807602313950262617278114465e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.112 y[1] (analytic) = 0.92791381195731231233528963700141 y[1] (numeric) = 0.92791381195731231233528963700121 absolute error = 2.0e-31 relative error = 2.1553725941219289363255576173125e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.113 y[1] (analytic) = 0.92794064612676633012858413645579 y[1] (numeric) = 0.92794064612676633012858413645559 absolute error = 2.0e-31 relative error = 2.1553102650994115709905887674133e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.114 y[1] (analytic) = 0.92796656379115276767940819184658 y[1] (numeric) = 0.92796656379115276767940819184637 absolute error = 2.1e-31 relative error = 2.2630125717251854694104148155669e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.115 y[1] (analytic) = 0.92799156452471187511845517346823 y[1] (numeric) = 0.92799156452471187511845517346802 absolute error = 2.1e-31 relative error = 2.2629516046038134245862779211230e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.116 y[1] (analytic) = 0.92801564790258979766912680530634 y[1] (numeric) = 0.92801564790258979766912680530613 absolute error = 2.1e-31 relative error = 2.2628928776645249553662625954112e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.117 y[1] (analytic) = 0.92803881350083940035444251694192 y[1] (numeric) = 0.92803881350083940035444251694171 absolute error = 2.1e-31 relative error = 2.2628363915924735989836397630337e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.118 y[1] (analytic) = 0.9280610608964210918078648756325 y[1] (numeric) = 0.9280610608964210918078648756323 absolute error = 2.0e-31 relative error = 2.1550306162702108222099973930133e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.119 y[1] (analytic) = 0.92808238966720364718681742412089 y[1] (numeric) = 0.9280823896672036471868174241207 absolute error = 1.9e-31 relative error = 2.0472320358123715232660152292252e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.12 y[1] (analytic) = 0.92810279939196503018767213679383 y[1] (numeric) = 0.92810279939196503018767213679363 absolute error = 2.0e-31 relative error = 2.1549337005666560294523566458737e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.121 y[1] (analytic) = 0.92812228965039321416098459550706 y[1] (numeric) = 0.92812228965039321416098459550687 absolute error = 1.9e-31 relative error = 2.0471440252940110325683302458861e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.122 y[1] (analytic) = 0.92814086002308700232575587670975 y[1] (numeric) = 0.92814086002308700232575587670955 absolute error = 2.0e-31 relative error = 2.1548453323671700875231319403779e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.123 y[1] (analytic) = 0.92815851009155684708150103343723 y[1] (numeric) = 0.92815851009155684708150103343703 absolute error = 2.0e-31 relative error = 2.1548043553495112673660799420489e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.124 y[1] (analytic) = 0.92817523943822566841690494929912 y[1] (numeric) = 0.92817523943822566841690494929892 absolute error = 2.0e-31 relative error = 2.1547655173504649383104201765243e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.125 y[1] (analytic) = 0.92819104764642967141384723676492 y[1] (numeric) = 0.92819104764642967141384723676472 absolute error = 2.0e-31 relative error = 2.1547288191060512970874714525768e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.126 y[1] (analytic) = 0.92820593430041916284557874884419 y[1] (numeric) = 0.92820593430041916284557874884401 absolute error = 1.8e-31 relative error = 1.9392248352265109505665972074561e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.127 y[1] (analytic) = 0.92821989898535936686783317166987 y[1] (numeric) = 0.92821989898535936686783317166966 memory used=431.0MB, alloc=4.6MB, time=20.65 absolute error = 2.1e-31 relative error = 2.2623949371215999909030920108610e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.128 y[1] (analytic) = 0.92823294128733123980165806552104 y[1] (numeric) = 0.92823294128733123980165806552086 absolute error = 1.8e-31 relative error = 1.9391684133765474022326282238537e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.129 y[1] (analytic) = 0.92824506079333228400675062346649 y[1] (numeric) = 0.9282450607933322840067506234663 absolute error = 1.9e-31 relative error = 2.0468732668247643097153144361511e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.13 y[1] (analytic) = 0.92825625709127736084408432006656 y[1] (numeric) = 0.92825625709127736084408432006638 absolute error = 1.8e-31 relative error = 1.9391197056299532930693083259562e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.131 y[1] (analytic) = 0.92826652976999950272661352744559 y[1] (numeric) = 0.9282665297699995027266135274454 absolute error = 1.9e-31 relative error = 2.0468259266772992245749061967118e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.132 y[1] (analytic) = 0.92827587841925072425684408253008 y[1] (numeric) = 0.92827587841925072425684408252988 absolute error = 2.0e-31 relative error = 2.1545319085590964121790076948143e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.133 y[1] (analytic) = 0.92828430262970283245005869734619 y[1] (numeric) = 0.92828430262970283245005869734601 absolute error = 1.8e-31 relative error = 1.9390611205003095270775897618870e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.134 y[1] (analytic) = 0.92829180199294823604198701397779 y[1] (numeric) = 0.92829180199294823604198701397759 absolute error = 2.0e-31 relative error = 2.1544949505168558946724122165509e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.135 y[1] (analytic) = 0.92829837610150075387971101710408 y[1] (numeric) = 0.9282983761015007538797110171039 absolute error = 1.8e-31 relative error = 1.9390317233552790555380266223667e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.136 y[1] (analytic) = 0.92830402454879642239459742996485 y[1] (numeric) = 0.92830402454879642239459742996466 absolute error = 1.9e-31 relative error = 2.0467432541009373288994049854379e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.137 y[1] (analytic) = 0.92830874692919430215604963413528 y[1] (numeric) = 0.92830874692919430215604963413509 absolute error = 1.9e-31 relative error = 2.0467328421552838682763556761902e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.138 y[1] (analytic) = 0.92831254283797728350487256963764 y[1] (numeric) = 0.92831254283797728350487256963745 absolute error = 1.9e-31 relative error = 2.0467244729791568258807217573975e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.139 y[1] (analytic) = 0.92831541187135289126504498966561 y[1] (numeric) = 0.92831541187135289126504498966539 absolute error = 2.2e-31 relative error = 2.3698841706883982516448827948425e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.14 y[1] (analytic) = 0.9283173536264540885326943635531 y[1] (numeric) = 0.92831735362645408853269436355289 absolute error = 2.1e-31 relative error = 2.2621574311806085869131550871060e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.141 y[1] (analytic) = 0.92831836770134007954107064258004 y[1] (numeric) = 0.92831836770134007954107064257982 absolute error = 2.2e-31 relative error = 2.3698766248130373784267701950587e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.142 y[1] (analytic) = 0.92831845369499711160031602577042 y[1] (numeric) = 0.92831845369499711160031602577023 absolute error = 1.9e-31 relative error = 2.0467114409256943428197926686650e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.143 y[1] (analytic) = 0.92831761120733927611082878700637 y[1] (numeric) = 0.92831761120733927611082878700618 absolute error = 1.9e-31 relative error = 2.0467132984032508527974734930702e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.144 y[1] (analytic) = 0.92831583983920930864902015054907 y[1] (numeric) = 0.92831583983920930864902015054887 absolute error = 2.0e-31 relative error = 2.1544391619412782640035138969532e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.145 y[1] (analytic) = 0.92831313919237938812426412942877 y[1] (numeric) = 0.92831313919237938812426412942854 absolute error = 2.3e-31 relative error = 2.4776122440763584543807746393487e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.146 y[1] (analytic) = 0.92830950886955193500584117013483 y[1] (numeric) = 0.92830950886955193500584117013464 absolute error = 1.9e-31 relative error = 2.0467311622324361213415805561098e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.147 y[1] (analytic) = 0.92830494847436040861867737760682 y[1] (numeric) = 0.92830494847436040861867737760661 absolute error = 2.1e-31 relative error = 2.2621876609095783218843754847862e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.148 y[1] (analytic) = 0.92829945761137010350668202669335 y[1] (numeric) = 0.92829945761137010350668202669313 absolute error = 2.2e-31 relative error = 2.3699249008082730873446831580829e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.149 y[1] (analytic) = 0.92829303588607894486248700001233 y[1] (numeric) = 0.92829303588607894486248700001211 absolute error = 2.2e-31 relative error = 2.3699412954229963791181044216070e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.15 y[1] (analytic) = 0.9282856829049182830223927275049 y[1] (numeric) = 0.92828568290491828302239272750466 absolute error = 2.4e-31 relative error = 2.5854109830602927820466408600291e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.151 y[1] (analytic) = 0.92827739827525368702532613993288 y[1] (numeric) = 0.92827739827525368702532613993265 absolute error = 2.3e-31 relative error = 2.4777076381191841075472162456012e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.152 y[1] (analytic) = 0.92826818160538573723461708712047 y[1] (numeric) = 0.92826818160538573723461708712026 absolute error = 2.1e-31 relative error = 2.2622772616941069232881551396092e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.153 y[1] (analytic) = 0.92825803250455081702140061188458 y[1] (numeric) = 0.92825803250455081702140061188437 absolute error = 2.1e-31 relative error = 2.2623019962821648705396691951838e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=434.8MB, alloc=4.6MB, time=20.84 TOP MAIN SOLVE Loop x[1] = 3.154 y[1] (analytic) = 0.92824695058292190350845341233565 y[1] (numeric) = 0.92824695058292190350845341233543 absolute error = 2.2e-31 relative error = 2.3700589574987999918206451679422e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.155 y[1] (analytic) = 0.92823493545160935737327376855953 y[1] (numeric) = 0.92823493545160935737327376855932 absolute error = 2.1e-31 relative error = 2.2623582886139680006020743938136e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.156 y[1] (analytic) = 0.92822198672266171170921515460997 y[1] (numeric) = 0.92822198672266171170921515460976 absolute error = 2.1e-31 relative error = 2.2623898485906554248155083517222e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.157 y[1] (analytic) = 0.9282081040090664599434847032503 y[1] (numeric) = 0.9282081040090664599434847032501 absolute error = 2.0e-31 relative error = 2.1546892247134103845892275836267e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.158 y[1] (analytic) = 0.92819328692475084281081863898133 y[1] (numeric) = 0.92819328692475084281081863898111 absolute error = 2.2e-31 relative error = 2.3701959828743679010086177485788e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.159 y[1] (analytic) = 0.92817753508458263438164774457735 y[1] (numeric) = 0.92817753508458263438164774457714 absolute error = 2.1e-31 relative error = 2.2624981974042626900895830932761e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.16 y[1] (analytic) = 0.92816084810437092714356687762585 y[1] (numeric) = 0.92816084810437092714356687762564 absolute error = 2.1e-31 relative error = 2.2625388738265942456994875091963e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.161 y[1] (analytic) = 0.92814322560086691613492350642378 y[1] (numeric) = 0.92814322560086691613492350642358 absolute error = 2.0e-31 relative error = 2.1548398402684327415235247333909e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.162 y[1] (analytic) = 0.92812466719176468212934118902812 y[1] (numeric) = 0.92812466719176468212934118902792 absolute error = 2.0e-31 relative error = 2.1548829275827980556906592615217e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.163 y[1] (analytic) = 0.92810517249570197386999487528489 y[1] (numeric) = 0.92810517249570197386999487528469 absolute error = 2.0e-31 relative error = 2.1549281905432564946417638661553e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.164 y[1] (analytic) = 0.92808474113226098935245586927231 y[1] (numeric) = 0.92808474113226098935245586927209 absolute error = 2.2e-31 relative error = 2.3704731933379334271542015620358e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.165 y[1] (analytic) = 0.92806337272196915615492524878565 y[1] (numeric) = 0.92806337272196915615492524878545 absolute error = 2.0e-31 relative error = 2.1550252480432319444858657333530e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.166 y[1] (analytic) = 0.92804106688629991081467549926625 y[1] (numeric) = 0.92804106688629991081467549926601 absolute error = 2.4e-31 relative error = 2.5860924539172779329730773568130e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.167 y[1] (analytic) = 0.92801782324767347724952108192942 y[1] (numeric) = 0.92801782324767347724952108192921 absolute error = 2.1e-31 relative error = 2.2628875732697460985116786591151e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.168 y[1] (analytic) = 0.92799364142945764422313961978173 y[1] (numeric) = 0.92799364142945764422313961978152 absolute error = 2.1e-31 relative error = 2.2629465399840604187238612602764e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.169 y[1] (analytic) = 0.92796852105596854185306635072642 y[1] (numeric) = 0.92796852105596854185306635072618 absolute error = 2.4e-31 relative error = 2.5862946269653136875386866878133e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.17 y[1] (analytic) = 0.92794246175247141716018546404701 y[1] (numeric) = 0.92794246175247141716018546404678 absolute error = 2.3e-31 relative error = 2.4786019551862309641685965301715e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.171 y[1] (analytic) = 0.9279154631451814086585429052228 y[1] (numeric) = 0.92791546314518140865854290522256 absolute error = 2.4e-31 relative error = 2.5864425104687544504426564597972e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.172 y[1] (analytic) = 0.9278875248612643199843062042697 y[1] (numeric) = 0.92788752486126431998430620426948 absolute error = 2.2e-31 relative error = 2.3709770215187871066398841724614e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.173 y[1] (analytic) = 0.92785864652883739256269785461566 y[1] (numeric) = 0.92785864652883739256269785461543 absolute error = 2.3e-31 relative error = 2.4788258519812340034187019773857e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.174 y[1] (analytic) = 0.92782882777697007731172974290617 y[1] (numeric) = 0.92782882777697007731172974290594 absolute error = 2.3e-31 relative error = 2.4789055169914057744777464944677e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.175 y[1] (analytic) = 0.9277980682356848053815671050969 y[1] (numeric) = 0.92779806823568480538156710509665 absolute error = 2.5e-31 relative error = 2.6945518487164332745137011591109e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.176 y[1] (analytic) = 0.92776636753595775792835146072064 y[1] (numeric) = 0.92776636753595775792835146072041 absolute error = 2.3e-31 relative error = 2.4790724049509782586249189923298e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.177 y[1] (analytic) = 0.92773372530971963492131295531881 y[1] (numeric) = 0.92773372530971963492131295531857 absolute error = 2.4e-31 relative error = 2.5869491800557008363506009690607e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.178 y[1] (analytic) = 0.92770014118985642298200352069755 y[1] (numeric) = 0.9277001411898564229820035206973 absolute error = 2.5e-31 relative error = 2.6948362827600001656495030827602e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.179 y[1] (analytic) = 0.92766561481021016225448324390949 y[1] (numeric) = 0.92766561481021016225448324390924 absolute error = 2.5e-31 relative error = 2.6949365806896610869677955054810e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=438.7MB, alloc=4.6MB, time=21.02 x[1] = 3.18 y[1] (analytic) = 0.92763014580557971230529331866802 y[1] (numeric) = 0.92763014580557971230529331866778 absolute error = 2.4e-31 relative error = 2.5872380396992958053489413404092e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.181 y[1] (analytic) = 0.92759373381172151705204993727473 y[1] (numeric) = 0.92759373381172151705204993727449 absolute error = 2.4e-31 relative error = 2.5873395997812339412783991428461e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.182 y[1] (analytic) = 0.92755637846535036871949446707931 y[1] (numeric) = 0.92755637846535036871949446707906 absolute error = 2.5e-31 relative error = 2.6952539576475884865469794371591e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.183 y[1] (analytic) = 0.92751807940414017082183624299424 y[1] (numeric) = 0.92751807940414017082183624299399 absolute error = 2.5e-31 relative error = 2.6953652500294763822343198329090e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.184 y[1] (analytic) = 0.92747883626672470017022529665319 y[1] (numeric) = 0.92747883626672470017022529665295 absolute error = 2.4e-31 relative error = 2.5876601235025993945335923709552e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.185 y[1] (analytic) = 0.92743864869269836790419333343058 y[1] (numeric) = 0.92743864869269836790419333343034 absolute error = 2.4e-31 relative error = 2.5877722514400266667771361963970e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.186 y[1] (analytic) = 0.92739751632261697954590226073025 y[1] (numeric) = 0.92739751632261697954590226073001 absolute error = 2.4e-31 relative error = 2.5878870255299494509509754351770e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.187 y[1] (analytic) = 0.92735543879799849407604056470168 y[1] (numeric) = 0.92735543879799849407604056470144 absolute error = 2.4e-31 relative error = 2.5880044474757006258611010370022e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.188 y[1] (analytic) = 0.92731241576132378203020882785205 y[1] (numeric) = 0.92731241576132378203020882785179 absolute error = 2.6e-31 relative error = 2.8038015622441539193348045189460e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.189 y[1] (analytic) = 0.92726844685603738261463667689061 y[1] (numeric) = 0.92726844685603738261463667689035 absolute error = 2.6e-31 relative error = 2.8039345119695006200510569672812e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.19 y[1] (analytic) = 0.92722353172654825984007444856789 y[1] (numeric) = 0.92722353172654825984007444856763 absolute error = 2.6e-31 relative error = 2.8040703358322207819722888737113e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.191 y[1] (analytic) = 0.92717767001823055767270386125331 y[1] (numeric) = 0.92717767001823055767270386125307 absolute error = 2.4e-31 relative error = 2.5885006483739089506372474593190e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.192 y[1] (analytic) = 0.92713086137742435420091298153291 y[1] (numeric) = 0.92713086137742435420091298153266 absolute error = 2.5e-31 relative error = 2.6964909746244318311973258563604e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.193 y[1] (analytic) = 0.92708310545143641481678177819939 y[1] (numeric) = 0.92708310545143641481678177819914 absolute error = 2.5e-31 relative error = 2.6966298763287710615137549739188e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.194 y[1] (analytic) = 0.92703440188854094441112556065243 y[1] (numeric) = 0.92703440188854094441112556065218 absolute error = 2.5e-31 relative error = 2.6967715490461157772606868692529e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.195 y[1] (analytic) = 0.9269847503379803385809446049231 y[1] (numeric) = 0.92698475033798033858094460492283 absolute error = 2.7e-31 relative error = 2.9126692742416475055468752658579e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.196 y[1] (analytic) = 0.92693415044996593384812927828498 y[1] (numeric) = 0.92693415044996593384812927828473 absolute error = 2.5e-31 relative error = 2.6970632151015403108941422064969e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.197 y[1] (analytic) = 0.92688260187567875688827098271302 y[1] (numeric) = 0.92688260187567875688827098271276 absolute error = 2.6e-31 relative error = 2.8051017407582473270611031828242e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.198 y[1] (analytic) = 0.92683010426727027276843024829758 y[1] (numeric) = 0.92683010426727027276843024829732 absolute error = 2.6e-31 relative error = 2.8052606276265679290750674133726e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.199 y[1] (analytic) = 0.92677665727786313219271432011818 y[1] (numeric) = 0.92677665727786313219271432011793 absolute error = 2.5e-31 relative error = 2.6975215445574803838331136517350e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.2 y[1] (analytic) = 0.92672226056155191775451759602275 y[1] (numeric) = 0.92672226056155191775451759602249 absolute error = 2.6e-31 relative error = 2.8055870789426350839921209158356e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.201 y[1] (analytic) = 0.92666691377340388919427928824747 y[1] (numeric) = 0.9266669137734038891942792882472 absolute error = 2.7e-31 relative error = 2.9136682877837439464141263018455e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.202 y[1] (analytic) = 0.92661061656945972766161369884597 y[1] (numeric) = 0.92661061656945972766161369884571 absolute error = 2.6e-31 relative error = 2.8059251140741718511677830231933e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.203 y[1] (analytic) = 0.92655336860673427898066951747412 y[1] (numeric) = 0.92655336860673427898066951747386 absolute error = 2.6e-31 relative error = 2.8060984807703422664813563745112e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.204 y[1] (analytic) = 0.92649516954321729591757557019704 y[1] (numeric) = 0.92649516954321729591757557019678 absolute error = 2.6e-31 relative error = 2.8062747496912021339109367098505e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.205 y[1] (analytic) = 0.92643601903787417944883146964774 y[1] (numeric) = 0.9264360190378741794488314696475 absolute error = 2.4e-31 relative error = 2.5905728519627907288106963619918e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.206 y[1] (analytic) = 0.92637591675064671902950264006993 y[1] (numeric) = 0.92637591675064671902950264006968 absolute error = 2.5e-31 relative error = 2.6986884641485415718688974487792e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=442.5MB, alloc=4.6MB, time=21.20 TOP MAIN SOLVE Loop x[1] = 3.207 y[1] (analytic) = 0.92631486234245383186008021552014 y[1] (numeric) = 0.92631486234245383186008021551988 absolute error = 2.6e-31 relative error = 2.8068209911100329471439065302981e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.208 y[1] (analytic) = 0.92625285547519230115086733578691 y[1] (numeric) = 0.92625285547519230115086733578665 absolute error = 2.6e-31 relative error = 2.8070088903165982533565449627496e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.209 y[1] (analytic) = 0.9261898958117375133827543924035 y[1] (numeric) = 0.92618989581173751338275439240325 absolute error = 2.5e-31 relative error = 2.6992304831925782989959374021932e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.21 y[1] (analytic) = 0.92612598301594419456324680648703 y[1] (numeric) = 0.92612598301594419456324680648676 absolute error = 2.7e-31 relative error = 2.9153701003047193114944375742210e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.211 y[1] (analytic) = 0.92606111675264714547660995102833 y[1] (numeric) = 0.92606111675264714547660995102809 absolute error = 2.4e-31 relative error = 2.5916216074549267599240674851378e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.212 y[1] (analytic) = 0.92599529668766197592699686268378 y[1] (numeric) = 0.92599529668766197592699686268353 absolute error = 2.5e-31 relative error = 2.6997977300129306038894687212198e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.213 y[1] (analytic) = 0.92592852248778583797342542207843 y[1] (numeric) = 0.92592852248778583797342542207819 absolute error = 2.4e-31 relative error = 2.5919927313089753309677436894777e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.214 y[1] (analytic) = 0.92586079382079815815547271712388 y[1] (numeric) = 0.92586079382079815815547271712364 absolute error = 2.4e-31 relative error = 2.5921823410361664476210012022508e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.215 y[1] (analytic) = 0.92579211035546136870855534087575 y[1] (numeric) = 0.9257921103554613687085553408755 absolute error = 2.5e-31 relative error = 2.7003902626045447516368802673730e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.216 y[1] (analytic) = 0.92572247176152163776766541401052 y[1] (numeric) = 0.92572247176152163776766541401026 absolute error = 2.6e-31 relative error = 2.8086171388413636948078256135708e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.217 y[1] (analytic) = 0.92565187770970959855843316208393 y[1] (numeric) = 0.92565187770970959855843316208368 absolute error = 2.5e-31 relative error = 2.7007993611870748354621965383929e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.218 y[1] (analytic) = 0.9255803278717410775743879193441 y[1] (numeric) = 0.92558032787174107757438791934384 absolute error = 2.6e-31 relative error = 2.8090484658186096725979829665811e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.219 y[1] (analytic) = 0.92550782192031782173929047401044 y[1] (numeric) = 0.92550782192031782173929047401017 absolute error = 2.7e-31 relative error = 2.9173173214223339096194370573249e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.22 y[1] (analytic) = 0.925434359529128224553410714594 y[1] (numeric) = 0.92543435952912822455341071459375 absolute error = 2.5e-31 relative error = 2.7014341690014936374415737511832e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.221 y[1] (analytic) = 0.92535994037284805122262558302331 y[1] (numeric) = 0.92535994037284805122262558302306 absolute error = 2.5e-31 relative error = 2.7016514233290610481029975571564e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.222 y[1] (analytic) = 0.92528456412714116276921338805264 y[1] (numeric) = 0.92528456412714116276921338805239 absolute error = 2.5e-31 relative error = 2.7018715073436380323138326892240e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.223 y[1] (analytic) = 0.92520823046866023912322158166565 y[1] (numeric) = 0.92520823046866023912322158166537 absolute error = 2.8e-31 relative error = 3.0263457541678721072143280671161e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.224 y[1] (analytic) = 0.92513093907504750119328615194391 y[1] (numeric) = 0.92513093907504750119328615194366 absolute error = 2.5e-31 relative error = 2.7023201737253731858358093614798e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.225 y[1] (analytic) = 0.92505268962493543191578183814868 y[1] (numeric) = 0.92505268962493543191578183814841 absolute error = 2.7e-31 relative error = 2.9187526616399771848484222000662e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.226 y[1] (analytic) = 0.92497348179794749628118342755995 y[1] (numeric) = 0.92497348179794749628118342755969 absolute error = 2.6e-31 relative error = 2.8108913943631820181335277841034e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.227 y[1] (analytic) = 0.92489331527469886033651944893505 y[1] (numeric) = 0.92489331527469886033651944893478 absolute error = 2.7e-31 relative error = 2.9192556107923472348638958736709e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.228 y[1] (analytic) = 0.9248121897367971091628006342796 y[1] (numeric) = 0.92481218973679710916280063427934 absolute error = 2.6e-31 relative error = 2.8113816284579507671246480883085e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.229 y[1] (analytic) = 0.92473010486684296382630657897524 y[1] (numeric) = 0.92473010486684296382630657897497 absolute error = 2.7e-31 relative error = 2.9197708453417205791867919193574e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.23 y[1] (analytic) = 0.92464706034843099730261509017142 y[1] (numeric) = 0.92464706034843099730261509017116 absolute error = 2.6e-31 relative error = 2.8118837029777097404846626409196e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.231 y[1] (analytic) = 0.92456305586615034937225977472858 y[1] (numeric) = 0.92456305586615034937225977472831 absolute error = 2.7e-31 relative error = 2.9202983862150781403530813377334e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.232 y[1] (analytic) = 0.92447809110558544048690248089031 y[1] (numeric) = 0.92447809110558544048690248089005 absolute error = 2.6e-31 relative error = 2.8123976382075794985449022609859e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=446.3MB, alloc=4.6MB, time=21.39 x[1] = 3.233 y[1] (analytic) = 0.92439216575331668460490827226688 y[1] (numeric) = 0.92439216575331668460490827226664 absolute error = 2.4e-31 relative error = 2.5963006707701415734716201003509e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.234 y[1] (analytic) = 0.9243052794969212009952116786257 y[1] (numeric) = 0.92430527949692120099521167862543 absolute error = 2.7e-31 relative error = 2.9211128183423878400967057900317e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.235 y[1] (analytic) = 0.92421743202497352500836403540855 y[1] (numeric) = 0.9242174320249735250083640354083 absolute error = 2.5e-31 relative error = 2.7049911778037603982065052659712e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.236 y[1] (analytic) = 0.92412862302704631781365279282887 y[1] (numeric) = 0.92412862302704631781365279282862 absolute error = 2.5e-31 relative error = 2.7052511281504078228537904626949e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.237 y[1] (analytic) = 0.92403885219371107510118474584025 y[1] (numeric) = 0.92403885219371107510118474583999 absolute error = 2.6e-31 relative error = 2.8137345024264720683905518040757e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.238 y[1] (analytic) = 0.9239481192165388347478262082159 y[1] (numeric) = 0.92394811921653883474782620821565 absolute error = 2.5e-31 relative error = 2.7057796298344903409790208444953e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.239 y[1] (analytic) = 0.92385642378810088344589422742907 y[1] (numeric) = 0.92385642378810088344589422742883 absolute error = 2.4e-31 relative error = 2.5978062588548638497426005516558e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.24 y[1] (analytic) = 0.92376376560196946229349401198032 y[1] (numeric) = 0.92376376560196946229349401198009 absolute error = 2.3e-31 relative error = 2.4898140473189138098793530807197e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.241 y[1] (analytic) = 0.92367014435271847134539881927674 y[1] (numeric) = 0.92367014435271847134539881927651 absolute error = 2.3e-31 relative error = 2.4900664095966574648303683338486e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.242 y[1] (analytic) = 0.92357555973592417312336963012842 y[1] (numeric) = 0.92357555973592417312336963012817 absolute error = 2.5e-31 relative error = 2.7068711094031323506049618336632e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.243 y[1] (analytic) = 0.92348001144816589508481301538909 y[1] (numeric) = 0.92348001144816589508481301538885 absolute error = 2.4e-31 relative error = 2.5988651299949764508883262066831e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.244 y[1] (analytic) = 0.92338349918702673104867668122939 y[1] (numeric) = 0.92338349918702673104867668122913 absolute error = 2.6e-31 relative error = 2.8157314943239882859394468685667e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.245 y[1] (analytic) = 0.92328602265109424157748326198976 y[1] (numeric) = 0.92328602265109424157748326198954 absolute error = 2.2e-31 relative error = 2.3827935721186265574436701208323e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.246 y[1] (analytic) = 0.92318758153996115331440401351903 y[1] (numeric) = 0.92318758153996115331440401351878 absolute error = 2.5e-31 relative error = 2.7080086972463080616868120228317e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.247 y[1] (analytic) = 0.92308817555422605727427514535561 y[1] (numeric) = 0.92308817555422605727427514535536 absolute error = 2.5e-31 relative error = 2.7083003186548125724579672145913e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.248 y[1] (analytic) = 0.92298780439549410608746061705989 y[1] (numeric) = 0.92298780439549410608746061705965 absolute error = 2.4e-31 relative error = 2.6002510418562540817690724879725e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.249 y[1] (analytic) = 0.92288646776637771019546631244629 y[1] (numeric) = 0.92288646776637771019546631244606 absolute error = 2.3e-31 relative error = 2.4921808698382919635773403643004e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.25 y[1] (analytic) = 0.92278416537049723299721159540085 y[1] (numeric) = 0.92278416537049723299721159540062 absolute error = 2.3e-31 relative error = 2.4924571598782815252372780552778e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.251 y[1] (analytic) = 0.92268089691248168494486534239705 y[1] (numeric) = 0.92268089691248168494486534239681 absolute error = 2.4e-31 relative error = 2.6011159524717517647093537225045e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.252 y[1] (analytic) = 0.92257666209796941658815463974056 y[1] (numeric) = 0.92257666209796941658815463974033 absolute error = 2.3e-31 relative error = 2.4930177561284988421787983481989e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.253 y[1] (analytic) = 0.92247146063360881056605542798154 y[1] (numeric) = 0.92247146063360881056605542798132 absolute error = 2.2e-31 relative error = 2.3848976297748093469217771064762e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.254 y[1] (analytic) = 0.92236529222705897254477547182871 y[1] (numeric) = 0.92236529222705897254477547182849 absolute error = 2.2e-31 relative error = 2.3851721422518848031825833189948e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.255 y[1] (analytic) = 0.92225815658699042110094113128299 y[1] (numeric) = 0.92225815658699042110094113128275 absolute error = 2.4e-31 relative error = 2.6023082396817209503266000671755e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.256 y[1] (analytic) = 0.92215005342308577654890050857767 y[1] (numeric) = 0.92215005342308577654890050857744 absolute error = 2.3e-31 relative error = 2.4941710857817970426622033215514e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.257 y[1] (analytic) = 0.92204098244604044871105664586681 y[1] (numeric) = 0.9220409824460404487110566458666 absolute error = 2.1e-31 relative error = 2.2775560305671075758770061816220e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.258 y[1] (analytic) = 0.9219309433675633236301455504409 y[1] (numeric) = 0.92193094336756332363014555044069 absolute error = 2.1e-31 relative error = 2.2778278732344858678385269440205e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.259 y[1] (analytic) = 0.92181993590037744922237492757046 y[1] (numeric) = 0.92181993590037744922237492757022 absolute error = 2.4e-31 relative error = 2.6035453417004118991036862369968e-29 % Correct digits = 30 h = 0.001 memory used=450.1MB, alloc=4.6MB, time=21.57 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.26 y[1] (analytic) = 0.9217079597582207198703406058802 y[1] (numeric) = 0.92170795975822071987034060587998 absolute error = 2.2e-31 relative error = 2.3868731703012486480818000208399e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.261 y[1] (analytic) = 0.92159501465584655995463874643947 y[1] (numeric) = 0.92159501465584655995463874643926 absolute error = 2.1e-31 relative error = 2.2786581596084349960559137219995e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.262 y[1] (analytic) = 0.92148110030902460632309303451586 y[1] (numeric) = 0.92148110030902460632309303451562 absolute error = 2.4e-31 relative error = 2.6045026850742186498209250575578e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.263 y[1] (analytic) = 0.92136621643454138969651716217969 y[1] (numeric) = 0.92136621643454138969651716217947 absolute error = 2.2e-31 relative error = 2.3877584838235702253919596724131e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.264 y[1] (analytic) = 0.92125036275020101500993402066421 y[1] (numeric) = 0.92125036275020101500993402066397 absolute error = 2.4e-31 relative error = 2.6051550121894118350395678925939e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.265 y[1] (analytic) = 0.92113353897482584068817413357751 y[1] (numeric) = 0.92113353897482584068817413357729 absolute error = 2.2e-31 relative error = 2.3883616293555944402016282857129e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.266 y[1] (analytic) = 0.92101574482825715685477697573185 y[1] (numeric) = 0.92101574482825715685477697573162 absolute error = 2.3e-31 relative error = 2.4972428679043739802276971943717e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.267 y[1] (analytic) = 0.92089698003135586247311993749422 y[1] (numeric) = 0.92089698003135586247311993749399 absolute error = 2.3e-31 relative error = 2.4975649284045721352971084704198e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.268 y[1] (analytic) = 0.92077724430600314141870081117732 y[1] (numeric) = 0.9207772443060031414187008111771 absolute error = 2.2e-31 relative error = 2.3892858056653613799770315760110e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.269 y[1] (analytic) = 0.92065653737510113748150079407252 y[1] (numeric) = 0.9206565373751011374815007940723 absolute error = 2.2e-31 relative error = 2.3895990640249575211124675809596e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.27 y[1] (analytic) = 0.92053485896257362829735612228127 y[1] (numeric) = 0.92053485896257362829735612228103 absolute error = 2.4e-31 relative error = 2.6071799200572993018874191638515e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.271 y[1] (analytic) = 0.92041220879336669820726757052401 y[1] (numeric) = 0.92041220879336669820726757052378 absolute error = 2.3e-31 relative error = 2.4988803690633702811352060034590e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.272 y[1] (analytic) = 0.92028858659344941004357817559631 y[1] (numeric) = 0.92028858659344941004357817559608 absolute error = 2.3e-31 relative error = 2.4992160432128207592307417147674e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.273 y[1] (analytic) = 0.92016399208981447584195066509804 y[1] (numeric) = 0.92016399208981447584195066509783 absolute error = 2.1e-31 relative error = 2.2822018879815340933982431994935e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.274 y[1] (analytic) = 0.92003842501047892647807719848466 y[1] (numeric) = 0.92003842501047892647807719848444 absolute error = 2.2e-31 relative error = 2.3912044760249472668510399079634e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.275 y[1] (analytic) = 0.91991188508448478022805515437455 y[1] (numeric) = 0.91991188508448478022805515437432 absolute error = 2.3e-31 relative error = 2.5002394656405247098507159884055e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.276 y[1] (analytic) = 0.91978437204189971025136382639657 y[1] (numeric) = 0.91978437204189971025136382639636 absolute error = 2.1e-31 relative error = 2.2831438148248260687958789556483e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.277 y[1] (analytic) = 0.91965588561381771099537801967213 y[1] (numeric) = 0.91965588561381771099537801967191 absolute error = 2.2e-31 relative error = 2.3921991197083741948712125747386e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.278 y[1] (analytic) = 0.91952642553235976352035567129708 y[1] (numeric) = 0.91952642553235976352035567129685 absolute error = 2.3e-31 relative error = 2.5012875499128969038948069072155e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.279 y[1] (analytic) = 0.91939599153067449974383775092045 y[1] (numeric) = 0.91939599153067449974383775092022 absolute error = 2.3e-31 relative error = 2.5016424056524324868873879625846e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.28 y[1] (analytic) = 0.91926458334293886560339983170486 y[1] (numeric) = 0.91926458334293886560339983170464 absolute error = 2.2e-31 relative error = 2.3932174042859570694804640027934e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.281 y[1] (analytic) = 0.9191322007043587831366958575996 y[1] (numeric) = 0.91913220070435878313669585759937 absolute error = 2.3e-31 relative error = 2.5023603767090745924163165835251e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.282 y[1] (analytic) = 0.91899884335116981147773576995903 y[1] (numeric) = 0.91899884335116981147773576995878 absolute error = 2.5e-31 relative error = 2.7203516283912172798075053877312e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.283 y[1] (analytic) = 0.91886451102063780676833979509501 y[1] (numeric) = 0.91886451102063780676833979509477 absolute error = 2.4e-31 relative error = 2.6119193539580458484793161593931e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.284 y[1] (analytic) = 0.91872920345105958098371333436184 y[1] (numeric) = 0.91872920345105958098371333436162 absolute error = 2.2e-31 relative error = 2.3946120268475751309622540168417e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.285 y[1] (analytic) = 0.9185929203817635596710875398335 y[1] (numeric) = 0.91859292038176355967108753983326 absolute error = 2.4e-31 relative error = 2.6126915924875292499851167993576e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=453.9MB, alloc=4.6MB, time=21.75 x[1] = 3.286 y[1] (analytic) = 0.91845566155311043860037180154611 y[1] (numeric) = 0.91845566155311043860037180154588 absolute error = 2.3e-31 relative error = 2.5042036281976804461799039138701e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.287 y[1] (analytic) = 0.91831742670649383932576551664159 y[1] (numeric) = 0.91831742670649383932576551664138 absolute error = 2.1e-31 relative error = 2.2867909711041422261861105613678e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.288 y[1] (analytic) = 0.91817821558434096365727765655846 y[1] (numeric) = 0.91817821558434096365727765655824 absolute error = 2.2e-31 relative error = 2.3960490051486251123496662013706e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.289 y[1] (analytic) = 0.91803802793011324704110379567549 y[1] (numeric) = 0.91803802793011324704110379567526 absolute error = 2.3e-31 relative error = 2.5053428398666403349983006867826e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.29 y[1] (analytic) = 0.9178968634883070108478114135183 y[1] (numeric) = 0.91789686348830701084781141351808 absolute error = 2.2e-31 relative error = 2.3967834377811070521629685824364e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.291 y[1] (analytic) = 0.91775472200445411356728543278876 y[1] (numeric) = 0.91775472200445411356728543278856 absolute error = 2.0e-31 relative error = 2.1792315005820187492394093481637e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.292 y[1] (analytic) = 0.91761160322512260090938710707065 y[1] (numeric) = 0.91761160322512260090938710707042 absolute error = 2.3e-31 relative error = 2.5065071016061777088149656452719e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.293 y[1] (analytic) = 0.91746750689791735480928052510102 y[1] (numeric) = 0.91746750689791735480928052510082 absolute error = 2.0e-31 relative error = 2.1799137135246048099707970697103e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.294 y[1] (analytic) = 0.91732243277148074133638215297538 y[1] (numeric) = 0.91732243277148074133638215297516 absolute error = 2.2e-31 relative error = 2.3982843124780031986332745710503e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.295 y[1] (analytic) = 0.91717638059549325750588999157012 y[1] (numeric) = 0.91717638059549325750588999156991 absolute error = 2.1e-31 relative error = 2.2896359352783782312389394953727e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.296 y[1] (analytic) = 0.91702935012067417699185008382527 y[1] (numeric) = 0.91702935012067417699185008382504 absolute error = 2.3e-31 relative error = 2.5080985681617903172593530879973e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.297 y[1] (analytic) = 0.91688134109878219474071926532216 y[1] (numeric) = 0.91688134109878219474071926532193 absolute error = 2.3e-31 relative error = 2.5085034419434264880412479471094e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.298 y[1] (analytic) = 0.91673235328261607048438421182366 y[1] (numeric) = 0.91673235328261607048438421182346 absolute error = 2.0e-31 relative error = 2.1816618480175176073311217891996e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.299 y[1] (analytic) = 0.91658238642601527115159799910931 y[1] (numeric) = 0.9165823864260152711515979991091 absolute error = 2.1e-31 relative error = 2.2911197412252563210407835481335e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.3 y[1] (analytic) = 0.91643144028386061217679655353824 y[1] (numeric) = 0.91643144028386061217679655353802 absolute error = 2.2e-31 relative error = 2.4006160235167833896697158659359e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.301 y[1] (analytic) = 0.91627951461207489770525853630654 y[1] (numeric) = 0.91627951461207489770525853630632 absolute error = 2.2e-31 relative error = 2.4010140627572729549740374928122e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.302 y[1] (analytic) = 0.91612660916762355969357337032911 y[1] (numeric) = 0.91612660916762355969357337032888 absolute error = 2.3e-31 relative error = 2.5105700205452381050709548353800e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.303 y[1] (analytic) = 0.91597272370851529590438328607183 y[1] (numeric) = 0.91597272370851529590438328607162 absolute error = 2.1e-31 relative error = 2.2926446886951961887030017704151e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.304 y[1] (analytic) = 0.91581785799380270679436643148408 y[1] (numeric) = 0.91581785799380270679436643148386 absolute error = 2.2e-31 relative error = 2.4022243951644883615302466533964e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.305 y[1] (analytic) = 0.91566201178358293129442926143284 y[1] (numeric) = 0.91566201178358293129442926143262 absolute error = 2.2e-31 relative error = 2.4026332551622452218283537305422e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.306 y[1] (analytic) = 0.91550518483899828148107759371968 y[1] (numeric) = 0.91550518483899828148107759371947 absolute error = 2.1e-31 relative error = 2.2938155182259379999030246873226e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.307 y[1] (analytic) = 0.91534737692223687613793689186489 y[1] (numeric) = 0.91534737692223687613793689186465 absolute error = 2.4e-31 relative error = 2.6219554024066334793442605329719e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.308 y[1] (analytic) = 0.91518858779653327320639350937182 y[1] (numeric) = 0.91518858779653327320639350937159 absolute error = 2.3e-31 relative error = 2.5131432260728113735751254187257e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.309 y[1] (analytic) = 0.91502881722616910112432980613659 y[1] (numeric) = 0.91502881722616910112432980613636 absolute error = 2.3e-31 relative error = 2.5135820388392264258858548146956e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.31 y[1] (analytic) = 0.91486806497647368905192722503989 y[1] (numeric) = 0.91486806497647368905192722503966 absolute error = 2.3e-31 relative error = 2.5140237024877960991627280051346e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.311 y[1] (analytic) = 0.91470633081382469598351259555265 y[1] (numeric) = 0.91470633081382469598351259555242 absolute error = 2.3e-31 relative error = 2.5144682205857957327370423908731e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.312 y[1] (analytic) = 0.91454361450564873874442411139932 y[1] (numeric) = 0.91454361450564873874442411139909 absolute error = 2.3e-31 relative error = 2.5149155967189729898112552549233e-29 % Correct digits = 30 h = 0.001 memory used=457.7MB, alloc=4.6MB, time=21.93 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.313 y[1] (analytic) = 0.91437991582042201887187461095356 y[1] (numeric) = 0.91437991582042201887187461095332 absolute error = 2.4e-31 relative error = 2.6247295664260233342068343866115e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.314 y[1] (analytic) = 0.91421523452767094837879097208864 y[1] (numeric) = 0.91421523452767094837879097208841 absolute error = 2.3e-31 relative error = 2.5158189375265600040154633942116e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.315 y[1] (analytic) = 0.9140495703979727743996096176681 y[1] (numeric) = 0.91404957039797277439960961766787 absolute error = 2.3e-31 relative error = 2.5162749094653489012942138207612e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.316 y[1] (analytic) = 0.91388292320295620271700931373902 y[1] (numeric) = 0.91388292320295620271700931373882 absolute error = 2.0e-31 relative error = 2.1884641338853835105574610814828e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.317 y[1] (analytic) = 0.91371529271530202016856362978131 y[1] (numeric) = 0.9137152927153020201685636297811 absolute error = 2.1e-31 relative error = 2.2983089116954551226804115186169e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.318 y[1] (analytic) = 0.91354667870874371593229661906736 y[1] (numeric) = 0.91354667870874371593229661906716 absolute error = 2.0e-31 relative error = 2.1892696307832985264283539624661e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.319 y[1] (analytic) = 0.91337708095806810169012646730027 y[1] (numeric) = 0.91337708095806810169012646730007 absolute error = 2.0e-31 relative error = 2.1896761389087419823141783877788e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.32 y[1] (analytic) = 0.9132064992391159306681830492192 y[1] (numeric) = 0.91320649923911593066818304921897 absolute error = 2.3e-31 relative error = 2.5185979314824862099832740957886e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.321 y[1] (analytic) = 0.91303493332878251555298652579087 y[1] (numeric) = 0.91303493332878251555298652579066 absolute error = 2.1e-31 relative error = 2.3000215252922783153669189488483e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.322 y[1] (analytic) = 0.91286238300501834528247530894285 y[1] (numeric) = 0.91286238300501834528247530894264 absolute error = 2.1e-31 relative error = 2.3004562780723713051602377266154e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.323 y[1] (analytic) = 0.91268884804682970071087291653473 y[1] (numeric) = 0.91268884804682970071087291653453 absolute error = 2.0e-31 relative error = 2.1913273119092398484348837287104e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.324 y[1] (analytic) = 0.91251432823427926914638443741109 y[1] (numeric) = 0.91251432823427926914638443741089 absolute error = 2.0e-31 relative error = 2.1917464067331546093557254208492e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.325 y[1] (analytic) = 0.9123388233484867577607145249274 y[1] (numeric) = 0.91233882334848675776071452492719 absolute error = 2.1e-31 relative error = 2.3017764302658217524155851536331e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.326 y[1] (analytic) = 0.91216233317162950586940003729142 y[1] (numeric) = 0.91216233317162950586940003729122 absolute error = 2.0e-31 relative error = 2.1925921815318880168126523522763e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.327 y[1] (analytic) = 0.91198485748694309608195164441332 y[1] (numeric) = 0.91198485748694309608195164441311 absolute error = 2.1e-31 relative error = 2.3026698116312372417712643550805e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.328 y[1] (analytic) = 0.9118063960787219643207999237071 y[1] (numeric) = 0.91180639607872196432079992370689 absolute error = 2.1e-31 relative error = 2.3031204968852772013431831819885e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.329 y[1] (analytic) = 0.91162694873232000870804267143462 y[1] (numeric) = 0.91162694873232000870804267143442 absolute error = 2.0e-31 relative error = 2.1938798570853325454293940626590e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.33 y[1] (analytic) = 0.91144651523415119731899136172685 y[1] (numeric) = 0.91144651523415119731899136172665 absolute error = 2.0e-31 relative error = 2.1943141660772038946454237633047e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.331 y[1] (analytic) = 0.91126509537169017480151589235684 y[1] (numeric) = 0.91126509537169017480151589235663 absolute error = 2.1e-31 relative error = 2.3044885738144554293180833422512e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.332 y[1] (analytic) = 0.91108268893347286786018796467251 y[1] (numeric) = 0.9110826889334728678601879646723 absolute error = 2.1e-31 relative error = 2.3049499518625380336067525235513e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.333 y[1] (analytic) = 0.91089929570909708960422465482332 y[1] (numeric) = 0.91089929570909708960422465482311 absolute error = 2.1e-31 relative error = 2.3054140121661172584837796826383e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.334 y[1] (analytic) = 0.91071491548922314275823494453224 y[1] (numeric) = 0.91071491548922314275823494453204 absolute error = 2.0e-31 relative error = 2.1960769127467604404032712595901e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.335 y[1] (analytic) = 0.91052954806557442173477319217262 y[1] (numeric) = 0.91052954806557442173477319217241 absolute error = 2.1e-31 relative error = 2.3063501941935468300671515497336e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.336 y[1] (analytic) = 0.91034319323093801356770473880546 y[1] (numeric) = 0.91034319323093801356770473880525 absolute error = 2.1e-31 relative error = 2.3068223232897475348133109141892e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.337 y[1] (analytic) = 0.91015585077916529770539005911718 y[1] (numeric) = 0.91015585077916529770539005911698 absolute error = 2.0e-31 relative error = 2.1974258565583488017894873753333e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.338 y[1] (analytic) = 0.9099675205051725446626950838678 y[1] (numeric) = 0.9099675205051725446626950838676 absolute error = 2.0e-31 relative error = 2.1978806440142951939629838950541e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=461.5MB, alloc=4.6MB, time=22.12 x[1] = 3.339 y[1] (analytic) = 0.90977820220494151353083653851481 y[1] (numeric) = 0.90977820220494151353083653851461 absolute error = 2.0e-31 relative error = 2.1983380071678935230838262248734e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.34 y[1] (analytic) = 0.90958789567552004834407236211712 y[1] (numeric) = 0.90958789567552004834407236211693 absolute error = 1.9e-31 relative error = 2.0888580521280293727332076817742e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.341 y[1] (analytic) = 0.9093966007150226733022484914445 y[1] (numeric) = 0.9093966007150226733022484914443 absolute error = 2.0e-31 relative error = 2.1992604749429224783975868023032e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.342 y[1] (analytic) = 0.90920431712263118684821451742009 y[1] (numeric) = 0.90920431712263118684821451741989 absolute error = 2.0e-31 relative error = 2.1997255867959600114292311556733e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.343 y[1] (analytic) = 0.90901104469859525459912194460619 y[1] (numeric) = 0.90901104469859525459912194460599 absolute error = 2.0e-31 relative error = 2.2001932888099821691896969593673e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.344 y[1] (analytic) = 0.90881678324423300113062000940334 y[1] (numeric) = 0.90881678324423300113062000940315 absolute error = 1.9e-31 relative error = 2.0906304054129676672476966120224e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.345 y[1] (analytic) = 0.90862153256193160061296523897113 y[1] (numeric) = 0.90862153256193160061296523897093 absolute error = 2.0e-31 relative error = 2.2011364779798238985175322058677e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.346 y[1] (analytic) = 0.908425292455147866298062160592 y[1] (numeric) = 0.90842529245514786629806216059179 absolute error = 2.1e-31 relative error = 2.3116925711353246412151586263371e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.347 y[1] (analytic) = 0.9082280627284088388564538002881 y[1] (numeric) = 0.90822806272840883885645380028791 absolute error = 1.9e-31 relative error = 2.0919855683518609682117071459135e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.348 y[1] (analytic) = 0.90802984318731237356328183996219 y[1] (numeric) = 0.908029843187312373563281839962 absolute error = 1.9e-31 relative error = 2.0924422410289214220118975222613e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.349 y[1] (analytic) = 0.90783063363852772633223753416649 y[1] (numeric) = 0.9078306336385277263322375341663 absolute error = 1.9e-31 relative error = 2.0929013954782735674746623114525e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.35 y[1] (analytic) = 0.9076304338897961385965257208083 y[1] (numeric) = 0.90763043388979613859652572080809 absolute error = 2.1e-31 relative error = 2.3137170389936269500325179255159e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.351 y[1] (analytic) = 0.90742924374993142103586549467309 y[1] (numeric) = 0.9074292437499314210358654946729 absolute error = 1.9e-31 relative error = 2.0938271640313152432475658315702e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.352 y[1] (analytic) = 0.90722706302882053614855234858814 y[1] (numeric) = 0.90722706302882053614855234858794 absolute error = 2.0e-31 relative error = 2.2045197740496246176926540141971e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.353 y[1] (analytic) = 0.90702389153742417966760782435621 y[1] (numeric) = 0.90702389153742417966760782435602 absolute error = 1.9e-31 relative error = 2.0947629028596599175274760347888e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.354 y[1] (analytic) = 0.90681972908777736082004395426354 y[1] (numeric) = 0.90681972908777736082004395426337 absolute error = 1.7e-31 relative error = 1.8746835180903361536912428222533e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.355 y[1] (analytic) = 0.90661457549298998142827101400215 y[1] (numeric) = 0.90661457549298998142827101400195 absolute error = 2.0e-31 relative error = 2.2060090958856023429678041193788e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.356 y[1] (analytic) = 0.9064084305672474138526783492469 y[1] (numeric) = 0.90640843056724741385267834924669 absolute error = 2.1e-31 relative error = 2.3168363501272605905380127750342e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.357 y[1] (analytic) = 0.90620129412581107777441928088958 y[1] (numeric) = 0.9062012941258110777744192808894 absolute error = 1.8e-31 relative error = 1.9863136498126648436666524992505e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.358 y[1] (analytic) = 0.90599316598501901581743233805245 y[1] (numeric) = 0.90599316598501901581743233805227 absolute error = 1.8e-31 relative error = 1.9867699532181281036766247206083e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.359 y[1] (analytic) = 0.90578404596228646800873231348423 y[1] (numeric) = 0.90578404596228646800873231348405 absolute error = 1.8e-31 relative error = 1.9872286424384045852145249927297e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.36 y[1] (analytic) = 0.90557393387610644507600588277941 y[1] (numeric) = 0.90557393387610644507600588277923 absolute error = 1.8e-31 relative error = 1.9876897210319460736869331706038e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.361 y[1] (analytic) = 0.90536282954605030058154777705433 y[1] (numeric) = 0.90536282954605030058154777705415 absolute error = 1.8e-31 relative error = 1.9881531925742097719727445450120e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.362 y[1] (analytic) = 0.90515073279276830189157474826213 y[1] (numeric) = 0.90515073279276830189157474826195 absolute error = 1.8e-31 relative error = 1.9886190606577179945021161675051e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.363 y[1] (analytic) = 0.90493764343799019997995581723031 y[1] (numeric) = 0.90493764343799019997995581723011 absolute error = 2.0e-31 relative error = 2.2100970321023535529225225695855e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.364 y[1] (analytic) = 0.9047235613045257980653985467579 y[1] (numeric) = 0.9047235613045257980653985467577 absolute error = 2.0e-31 relative error = 2.2106200010047148313126633370969e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.365 y[1] (analytic) = 0.90450848621626551908113233571403 y[1] (numeric) = 0.90450848621626551908113233571385 absolute error = 1.8e-31 relative error = 1.9900310803381726320509927537889e-29 % Correct digits = 30 h = 0.001 memory used=465.4MB, alloc=4.6MB, time=22.31 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.366 y[1] (analytic) = 0.90429241799818097197613098503297 y[1] (numeric) = 0.90429241799818097197613098503279 absolute error = 1.8e-31 relative error = 1.9905065708552925047681658126499e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.367 y[1] (analytic) = 0.90407535647632551684691804280254 y[1] (numeric) = 0.90407535647632551684691804280234 absolute error = 2.0e-31 relative error = 2.2122049734826200954808111809301e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.368 y[1] (analytic) = 0.90385730147783482889899969329144 y[1] (numeric) = 0.90385730147783482889899969329126 absolute error = 1.8e-31 relative error = 1.9914647998715548994553011839211e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.369 y[1] (analytic) = 0.90363825283092746123697121375474 y[1] (numeric) = 0.90363825283092746123697121375457 absolute error = 1.7e-31 relative error = 1.8812837932371964636786505445287e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.37 y[1] (analytic) = 0.9034182103649054064823442831939 y[1] (numeric) = 0.9034182103649054064823442831937 absolute error = 2.0e-31 relative error = 2.2138141306584546870886285932828e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.371 y[1] (analytic) = 0.90319717391015465721814368892901 y[1] (numeric) = 0.90319717391015465721814368892882 absolute error = 1.9e-31 relative error = 2.1036381145596920207941144921041e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.372 y[1] (analytic) = 0.9029751432981457652593232398623 y[1] (numeric) = 0.90297514329814576525932323986209 absolute error = 2.1e-31 relative error = 2.3256454129287351475194788011001e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.373 y[1] (analytic) = 0.90275211836143439974805195967276 y[1] (numeric) = 0.90275211836143439974805195967255 absolute error = 2.1e-31 relative error = 2.3262199636946452267864861220592e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.374 y[1] (analytic) = 0.90252809893366190407292289888343 y[1] (numeric) = 0.90252809893366190407292289888324 absolute error = 1.9e-31 relative error = 2.1051976135090446654674369193092e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.375 y[1] (analytic) = 0.90230308484955585161113817177896 y[1] (numeric) = 0.90230308484955585161113817177877 absolute error = 1.9e-31 relative error = 2.1057226024188908139043854743175e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.376 y[1] (analytic) = 0.90207707594493060029272509252496 y[1] (numeric) = 0.90207707594493060029272509252476 absolute error = 2.0e-31 relative error = 2.2171054484507204860329581296202e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.377 y[1] (analytic) = 0.90185007205668784598583955454857 y[1] (numeric) = 0.90185007205668784598583955454837 absolute error = 2.0e-31 relative error = 2.2176635141126710829420049968380e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.378 y[1] (analytic) = 0.90162207302281717470221406828029 y[1] (numeric) = 0.90162207302281717470221406828009 absolute error = 2.0e-31 relative error = 2.2182243090996136120666779820836e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.379 y[1] (analytic) = 0.90139307868239661362180914472991 y[1] (numeric) = 0.90139307868239661362180914472974 absolute error = 1.7e-31 relative error = 1.8859696620756840216229012260337e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.38 y[1] (analytic) = 0.90116308887559318093572798607285 y[1] (numeric) = 0.90116308887559318093572798607269 absolute error = 1.6e-31 relative error = 1.7754832834935189268512281278422e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.381 y[1] (analytic) = 0.90093210344366343450645571945475 y[1] (numeric) = 0.90093210344366343450645571945457 absolute error = 1.8e-31 relative error = 1.9979308020213718130421206205773e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.382 y[1] (analytic) = 0.90070012222895401934448568658285 y[1] (numeric) = 0.90070012222895401934448568658265 absolute error = 2.0e-31 relative error = 2.2204948690920781009814953019242e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.383 y[1] (analytic) = 0.90046714507490221390039657935838 y[1] (numeric) = 0.90046714507490221390039657935819 absolute error = 1.9e-31 relative error = 2.1100159071788845079819629157765e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.384 y[1] (analytic) = 0.90023317182603647517144549081546 y[1] (numeric) = 0.90023317182603647517144549081528 absolute error = 1.8e-31 relative error = 1.9994819745965070171086370997136e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.385 y[1] (analytic) = 0.89999820232797698262174323096655 y[1] (numeric) = 0.89999820232797698262174323096637 absolute error = 1.8e-31 relative error = 2.0000039948346971525868487160778e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.386 y[1] (analytic) = 0.89976223642743618091507953881175 y[1] (numeric) = 0.89976223642743618091507953881157 absolute error = 1.8e-31 relative error = 2.0005285031154627574484753103300e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.387 y[1] (analytic) = 0.89952527397221932145946710474682 y[1] (numeric) = 0.89952527397221932145946710474664 absolute error = 1.8e-31 relative error = 2.0010555034783721704343094000586e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.388 y[1] (analytic) = 0.89928731481122500276247460190174 y[1] (numeric) = 0.89928731481122500276247460190157 absolute error = 1.7e-31 relative error = 1.8903858333160827254214084673939e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.389 y[1] (analytic) = 0.89904835879444570959642021055724 y[1] (numeric) = 0.89904835879444570959642021055705 absolute error = 1.9e-31 relative error = 2.1133457187417070627158498699335e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.39 y[1] (analytic) = 0.89880840577296835097249840671811 y[1] (numeric) = 0.89880840577296835097249840671791 absolute error = 2.0e-31 relative error = 2.2251683308190863042614115902558e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.391 y[1] (analytic) = 0.89856745559897479692291407417003 y[1] (numeric) = 0.89856745559897479692291407416985 absolute error = 1.8e-31 relative error = 2.0031885072002085482847135690252e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=469.2MB, alloc=4.6MB, time=22.49 x[1] = 3.392 y[1] (analytic) = 0.89832550812574241409009928890706 y[1] (numeric) = 0.89832550812574241409009928890688 absolute error = 1.8e-31 relative error = 2.0037280292257340647897523323750e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.393 y[1] (analytic) = 0.89808256320764460012208941569067 y[1] (numeric) = 0.89808256320764460012208941569047 absolute error = 2.0e-31 relative error = 2.2269667421853533763952280454017e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.394 y[1] (analytic) = 0.89783862070015131687313644868642 y[1] (numeric) = 0.89783862070015131687313644868625 absolute error = 1.7e-31 relative error = 1.8934360371737052981278275795342e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.395 y[1] (analytic) = 0.89759368045982962240863882161863 y[1] (numeric) = 0.89759368045982962240863882161843 absolute error = 2.0e-31 relative error = 2.2281796803375631821870412129084e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.396 y[1] (analytic) = 0.89734774234434420181346820768534 y[1] (numeric) = 0.89734774234434420181346820768515 absolute error = 1.9e-31 relative error = 2.1173508444298314326351052414028e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.397 y[1] (analytic) = 0.89710080621245789680277512558775 y[1] (numeric) = 0.89710080621245789680277512558754 absolute error = 2.1e-31 relative error = 2.3408740527902979300901273639543e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.398 y[1] (analytic) = 0.89685287192403223413435646544107 y[1] (numeric) = 0.89685287192403223413435646544088 absolute error = 1.9e-31 relative error = 2.1185191679476933961722634978478e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.399 y[1] (analytic) = 0.89660393934002795282166934705568 y[1] (numeric) = 0.89660393934002795282166934705549 absolute error = 1.9e-31 relative error = 2.1191073523484088387120309066242e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.4 y[1] (analytic) = 0.89635400832250553014657702309764 y[1] (numeric) = 0.89635400832250553014657702309745 absolute error = 1.9e-31 relative error = 2.1196982245394116655125828134941e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.401 y[1] (analytic) = 0.89610307873462570647091384096304 y[1] (numeric) = 0.89610307873462570647091384096286 absolute error = 1.8e-31 relative error = 2.0086974843806520118330807645818e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.402 y[1] (analytic) = 0.89585115044065000884595757982298 y[1] (numeric) = 0.89585115044065000884595757982282 absolute error = 1.6e-31 relative error = 1.7860109898982595953606293362091e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.403 y[1] (analytic) = 0.89559822330594127341889878321883 y[1] (numeric) = 0.89559822330594127341889878321864 absolute error = 1.9e-31 relative error = 2.1214870134361014264403053610065e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.404 y[1] (analytic) = 0.89534429719696416663539801280618 y[1] (numeric) = 0.89534429719696416663539801280598 absolute error = 2.0e-31 relative error = 2.2337775604997524928081536482440e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.405 y[1] (analytic) = 0.89508937198128570523732325536183 y[1] (numeric) = 0.89508937198128570523732325536167 absolute error = 1.6e-31 relative error = 1.7875309997909933646575695373564e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.406 y[1] (analytic) = 0.89483344752757577505476102297658 y[1] (numeric) = 0.8948334475275757750547610229764 absolute error = 1.8e-31 relative error = 2.0115475175558075215375966397539e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.407 y[1] (analytic) = 0.89457652370560764859139599545885 y[1] (numeric) = 0.89457652370560764859139599545868 absolute error = 1.7e-31 relative error = 1.9003405018478281784376321513452e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.408 y[1] (analytic) = 0.89431860038625850140235536436958 y[1] (numeric) = 0.89431860038625850140235536436941 absolute error = 1.7e-31 relative error = 1.9008885639477537780793838712387e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.409 y[1] (analytic) = 0.8940596774415099272636153497903 y[1] (numeric) = 0.89405967744150992726361534979013 absolute error = 1.7e-31 relative error = 1.9014390682116578391418433266619e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.41 y[1] (analytic) = 0.89379975474444845213206867390098 y[1] (numeric) = 0.89379975474444845213206867390081 absolute error = 1.7e-31 relative error = 1.9019920188790575406423050715522e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.411 y[1] (analytic) = 0.89353883216926604689535308970283 y[1] (numeric) = 0.89353883216926604689535308970265 absolute error = 1.8e-31 relative error = 2.0144619743387044929040971695684e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.412 y[1] (analytic) = 0.89327690959126063891054237876748 y[1] (numeric) = 0.89327690959126063891054237876732 absolute error = 1.6e-31 relative error = 1.7911579072743711002556378859406e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.413 y[1] (analytic) = 0.89301398688683662233080254872409 y[1] (numeric) = 0.89301398688683662233080254872392 absolute error = 1.7e-31 relative error = 1.9036655919874469204052139861511e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.414 y[1] (analytic) = 0.89275006393350536721911727930846 y[1] (numeric) = 0.8927500639335053672191172793083 absolute error = 1.6e-31 relative error = 1.7922149374600018781189530287534e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.415 y[1] (analytic) = 0.89248514060988572744818798519401 y[1] (numeric) = 0.89248514060988572744818798519383 absolute error = 1.8e-31 relative error = 2.0168403014194251857481808016620e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.416 y[1] (analytic) = 0.89221921679570454738561518449794 y[1] (numeric) = 0.89221921679570454738561518449776 absolute error = 1.8e-31 relative error = 2.0174414158714024954457504346237e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.417 y[1] (analytic) = 0.89195229237179716736346918381087 y[1] (numeric) = 0.89195229237179716736346918381072 absolute error = 1.5e-31 relative error = 1.6817042938600880989718181735793e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.418 y[1] (analytic) = 0.89168436722010792793135941382799 y[1] (numeric) = 0.89168436722010792793135941382785 absolute error = 1.4e-31 relative error = 1.5700622904992757852342613934802e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=473.0MB, alloc=4.6MB, time=22.68 TOP MAIN SOLVE Loop x[1] = 3.419 y[1] (analytic) = 0.89141544122369067289211307416686 y[1] (numeric) = 0.89141544122369067289211307416672 absolute error = 1.4e-31 relative error = 1.5705359535595993291157234692771e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.42 y[1] (analytic) = 0.89114551426670925111917507173854 y[1] (numeric) = 0.89114551426670925111917507173839 absolute error = 1.5e-31 relative error = 1.6832267861823830539908444102648e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.421 y[1] (analytic) = 0.89087458623443801715484256409221 y[1] (numeric) = 0.89087458623443801715484256409205 absolute error = 1.6e-31 relative error = 1.7959879254866881474996545645559e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.422 y[1] (analytic) = 0.89060265701326233058844874747955 y[1] (numeric) = 0.8906026570132623305884487474794 absolute error = 1.5e-31 relative error = 1.6842527789333362418334584067579e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.423 y[1] (analytic) = 0.89032972649067905421361185898098 y[1] (numeric) = 0.89032972649067905421361185898082 absolute error = 1.6e-31 relative error = 1.7970870256197725087855116289812e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.424 y[1] (analytic) = 0.89005579455529705096366669289988 y[1] (numeric) = 0.89005579455529705096366669289972 absolute error = 1.6e-31 relative error = 1.7976401140103984829472793133712e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.425 y[1] (analytic) = 0.8897808610968376796243972637636 y[1] (numeric) = 0.88978086109683767962439726376346 absolute error = 1.4e-31 relative error = 1.5734211210996519170585890337348e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.426 y[1] (analytic) = 0.8895049260061352893231905816666 y[1] (numeric) = 0.88950492600613528932319058166646 absolute error = 1.4e-31 relative error = 1.5739092151922985658612973470770e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.427 y[1] (analytic) = 0.88922798917513771279373284035353 y[1] (numeric) = 0.88922798917513771279373284035338 absolute error = 1.5e-31 relative error = 1.6868564847935390542930643051368e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.428 y[1] (analytic) = 0.88895005049690675841537065436487 y[1] (numeric) = 0.88895005049690675841537065436473 absolute error = 1.4e-31 relative error = 1.5748916367319240287303680854489e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.429 y[1] (analytic) = 0.88867110986561870102626131875396 y[1] (numeric) = 0.88867110986561870102626131875381 absolute error = 1.5e-31 relative error = 1.6879135411826586938552428423377e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.43 y[1] (analytic) = 0.88839116717656477150943740333013 y[1] (numeric) = 0.88839116717656477150943740332997 absolute error = 1.6e-31 relative error = 1.8010084511364860906350283139856e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.431 y[1] (analytic) = 0.88811022232615164515091233308838 y[1] (numeric) = 0.88811022232615164515091233308822 absolute error = 1.6e-31 relative error = 1.8015781822770330775253203304726e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.432 y[1] (analytic) = 0.88782827521190192876895494744716 y[1] (numeric) = 0.88782827521190192876895494744699 absolute error = 1.7e-31 relative error = 1.9147847026996897889072588483303e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.433 y[1] (analytic) = 0.8875453257324546466136623731338 y[1] (numeric) = 0.88754532573245464661366237313364 absolute error = 1.6e-31 relative error = 1.8027248340016728934599835987782e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.434 y[1] (analytic) = 0.88726137378756572503596188902916 y[1] (numeric) = 0.88726137378756572503596188902899 absolute error = 1.7e-31 relative error = 1.9160081236749812536954885029683e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.435 y[1] (analytic) = 0.88697641927810847592517380600702 y[1] (numeric) = 0.88697641927810847592517380600685 absolute error = 1.7e-31 relative error = 1.9166236700898930123520980842236e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.436 y[1] (analytic) = 0.88669046210607407891426873078039 y[1] (numeric) = 0.88669046210607407891426873078024 absolute error = 1.5e-31 relative error = 1.6916839236515393869034161918109e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.437 y[1] (analytic) = 0.88640350217457206235195392999192 y[1] (numeric) = 0.88640350217457206235195392999174 absolute error = 1.8e-31 relative error = 2.0306778973505232964287067368143e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.438 y[1] (analytic) = 0.88611553938783078304072485925963 y[1] (numeric) = 0.88611553938783078304072485925947 absolute error = 1.6e-31 relative error = 1.8056336097043883385321115528946e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.439 y[1] (analytic) = 0.88582657365119790474001927161125 y[1] (numeric) = 0.8858265736511979047400192716111 absolute error = 1.5e-31 relative error = 1.6933337118317680393513246662738e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.44 y[1] (analytic) = 0.88553660487114087543361267070477 y[1] (numeric) = 0.88553660487114087543361267070459 absolute error = 1.8e-31 relative error = 2.0326658323310390310631876586019e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.441 y[1] (analytic) = 0.885245632955247403360395226445 y[1] (numeric) = 0.88524563295524740336039522644485 absolute error = 1.5e-31 relative error = 1.6944449587313929305383173626663e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.442 y[1] (analytic) = 0.88495365781222593180767162405836 y[1] (numeric) = 0.88495365781222593180767162405821 absolute error = 1.5e-31 relative error = 1.6950040115188470115857864850874e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.443 y[1] (analytic) = 0.88466067935190611266612667238066 y[1] (numeric) = 0.8846606793519061126661266723805 absolute error = 1.6e-31 relative error = 1.8086030467321601534280156311419e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.444 y[1] (analytic) = 0.88436669748523927874560085304812 y[1] (numeric) = 0.88436669748523927874560085304794 absolute error = 1.8e-31 relative error = 2.0353547969619732371387264485436e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=476.8MB, alloc=4.6MB, time=22.86 x[1] = 3.445 y[1] (analytic) = 0.88407171212429891485082134945174 y[1] (numeric) = 0.88407171212429891485082134945157 absolute error = 1.7e-31 relative error = 1.9229209312841162537926035829995e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.446 y[1] (analytic) = 0.88377572318228112761623545272414 y[1] (numeric) = 0.88377572318228112761623545272398 absolute error = 1.6e-31 relative error = 1.8104140655038061989033308759494e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.447 y[1] (analytic) = 0.88347873057350511409909460167058 y[1] (numeric) = 0.8834787305735051140990946016704 absolute error = 1.8e-31 relative error = 2.0374004916128998358477656226220e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.448 y[1] (analytic) = 0.88318073421341362912993867443328 y[1] (numeric) = 0.88318073421341362912993867443309 absolute error = 1.9e-31 relative error = 2.1513150439045696495894037882223e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.449 y[1] (analytic) = 0.88288173401857345141963151178712 y[1] (numeric) = 0.88288173401857345141963151178696 absolute error = 1.6e-31 relative error = 1.8122472561725241374481976988631e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.45 y[1] (analytic) = 0.88258172990667584842210001530429 y[1] (numeric) = 0.88258172990667584842210001530412 absolute error = 1.7e-31 relative error = 1.9261672232664026728816338461004e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.451 y[1] (analytic) = 0.88228072179653703995193052819428 y[1] (numeric) = 0.88228072179653703995193052819412 absolute error = 1.6e-31 relative error = 1.8134817643323463297481577734580e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.452 y[1] (analytic) = 0.88197870960809866055597757242328 y[1] (numeric) = 0.8819787096080986605559775724231 absolute error = 1.8e-31 relative error = 2.0408655905082084788026036220184e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.453 y[1] (analytic) = 0.88167569326242822063814138273831 y[1] (numeric) = 0.88167569326242822063814138273815 absolute error = 1.6e-31 relative error = 1.8147262221549807731565669133955e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.454 y[1] (analytic) = 0.88137167268171956633647204647094 y[1] (numeric) = 0.88137167268171956633647204647079 absolute error = 1.5e-31 relative error = 1.7018926821598442056199597845447e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.455 y[1] (analytic) = 0.88106664778929333815175942746452 y[1] (numeric) = 0.88106664778929333815175942746434 absolute error = 1.8e-31 relative error = 2.0429782520044603115068923043634e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.456 y[1] (analytic) = 0.88076061850959742832676942316287 y[1] (numeric) = 0.88076061850959742832676942316268 absolute error = 1.9e-31 relative error = 2.1572263337740232704069116354035e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.457 y[1] (analytic) = 0.88045358476820743697528847581105 y[1] (numeric) = 0.88045358476820743697528847581086 absolute error = 1.9e-31 relative error = 2.1579786065613025951474090319969e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.458 y[1] (analytic) = 0.88014554649182712696013963184983 y[1] (numeric) = 0.88014554649182712696013963184967 absolute error = 1.6e-31 relative error = 1.8178811520179149277295099332776e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.459 y[1] (analytic) = 0.87983650360828887751933481793553 y[1] (numeric) = 0.87983650360828887751933481793537 absolute error = 1.6e-31 relative error = 1.8185196834164707337992532748265e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.46 y[1] (analytic) = 0.8795264560465541366395293775808 y[1] (numeric) = 0.87952645604655413663952937758062 absolute error = 1.8e-31 relative error = 2.0465558342507941114756671901221e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.461 y[1] (analytic) = 0.87921540373671387217594628919171 y[1] (numeric) = 0.87921540373671387217594628919153 absolute error = 1.8e-31 relative error = 2.0472798728842794368327773616019e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.462 y[1] (analytic) = 0.87890334660998902171793886426806 y[1] (numeric) = 0.87890334660998902171793886426789 absolute error = 1.7e-31 relative error = 1.9342286117774567913899171447414e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.463 y[1] (analytic) = 0.87859028459873094119936210373672 y[1] (numeric) = 0.87859028459873094119936210373656 absolute error = 1.6e-31 relative error = 1.8210991266887850149049535595245e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.464 y[1] (analytic) = 0.87827621763642185225292427080123 y[1] (numeric) = 0.87827621763642185225292427080108 absolute error = 1.5e-31 relative error = 1.7078909457855225981112716857860e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.465 y[1] (analytic) = 0.87796114565767528830769162031181 y[1] (numeric) = 0.87796114565767528830769162031166 absolute error = 1.5e-31 relative error = 1.7085038528400470797698229573582e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.466 y[1] (analytic) = 0.87764506859823653942892060748796 y[1] (numeric) = 0.87764506859823653942892060748778 absolute error = 1.8e-31 relative error = 2.0509429886901056041484225228935e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.467 y[1] (analytic) = 0.87732798639498309589939328285891 y[1] (numeric) = 0.87732798639498309589939328285872 absolute error = 1.9e-31 relative error = 2.1656666941713156115482781622789e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.468 y[1] (analytic) = 0.87700989898592509054143296552464 y[1] (numeric) = 0.87700989898592509054143296552446 absolute error = 1.8e-31 relative error = 2.0524283729081235188188860982579e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.469 y[1] (analytic) = 0.87669080631020573977877867327865 y[1] (numeric) = 0.87669080631020573977877867327847 absolute error = 1.8e-31 relative error = 2.0531754035106114766970629731629e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.47 y[1] (analytic) = 0.87637070830810178343749817577408 y[1] (numeric) = 0.8763707083081017834374981757739 absolute error = 1.8e-31 relative error = 2.0539253342629771480976029642317e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.471 y[1] (analytic) = 0.87604960492102392328512092575399 y[1] (numeric) = 0.87604960492102392328512092575382 absolute error = 1.7e-31 relative error = 1.9405293837821608257914310117716e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=480.6MB, alloc=4.6MB, time=23.04 TOP MAIN SOLVE Loop x[1] = 3.472 y[1] (analytic) = 0.87572749609151726030717351340307 y[1] (numeric) = 0.87572749609151726030717351340291 absolute error = 1.6e-31 relative error = 1.8270523731880095864525804510660e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.473 y[1] (analytic) = 0.87540438176326173072030168011131 y[1] (numeric) = 0.87540438176326173072030168011112 absolute error = 1.9e-31 relative error = 2.1704255080069073476103130285104e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.474 y[1] (analytic) = 0.87508026188107254072116432036739 y[1] (numeric) = 0.87508026188107254072116432036724 absolute error = 1.5e-31 relative error = 1.7141284809413938593850378487634e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.475 y[1] (analytic) = 0.87475513639090059997028629412154 y[1] (numeric) = 0.87475513639090059997028629412139 absolute error = 1.5e-31 relative error = 1.7147655813588696728022652841158e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.476 y[1] (analytic) = 0.87442900523983295381005826676775 y[1] (numeric) = 0.87442900523983295381005826676758 absolute error = 1.7e-31 relative error = 1.9441258121735504003415793294780e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.477 y[1] (analytic) = 0.87410186837609321421607318990017 y[1] (numeric) = 0.87410186837609321421607318989999 absolute error = 1.8e-31 relative error = 2.0592565524931787290006461427831e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.478 y[1] (analytic) = 0.87377372574904198948099043318791 y[1] (numeric) = 0.87377372574904198948099043318775 absolute error = 1.6e-31 relative error = 1.8311376879962841445817590703557e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.479 y[1] (analytic) = 0.8734445773091773126301199760911 y[1] (numeric) = 0.87344457730917731263011997609094 absolute error = 1.6e-31 relative error = 1.8318277330533365075701244162667e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.48 y[1] (analytic) = 0.87311442300813506856792046770421 y[1] (numeric) = 0.87311442300813506856792046770404 absolute error = 1.7e-31 relative error = 1.9470529351044297098589501409023e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.481 y[1] (analytic) = 0.87278326279868941995460636376092 y[1] (numeric) = 0.87278326279868941995460636376074 absolute error = 1.8e-31 relative error = 2.0623676882025365277644309667576e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.482 y[1] (analytic) = 0.87245109663475323181206075176388 y[1] (numeric) = 0.87245109663475323181206075176372 absolute error = 1.6e-31 relative error = 1.8339136785678556424951856071675e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.483 y[1] (analytic) = 0.87211792447137849485825187831426 y[1] (numeric) = 0.87211792447137849485825187831411 absolute error = 1.5e-31 relative error = 1.7199508895648521706644898481438e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.484 y[1] (analytic) = 0.87178374626475674756935279700547 y[1] (numeric) = 0.8717837462647567475693527970053 absolute error = 1.7e-31 relative error = 1.9500248855106754349064154440952e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.485 y[1] (analytic) = 0.87144856197221949696876496071425 y[1] (numeric) = 0.87144856197221949696876496071409 absolute error = 1.6e-31 relative error = 1.8360234554509548380774927275543e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.486 y[1] (analytic) = 0.87111237155223863814224798876635 y[1] (numeric) = 0.87111237155223863814224798876619 absolute error = 1.6e-31 relative error = 1.8367320362457412531355426922405e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.487 y[1] (analytic) = 0.87077517496442687247835924727259 y[1] (numeric) = 0.87077517496442687247835924727243 absolute error = 1.6e-31 relative error = 1.8374432873162278706136551983029e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.488 y[1] (analytic) = 0.87043697216953812463340828992436 y[1] (numeric) = 0.87043697216953812463340828992419 absolute error = 1.7e-31 relative error = 1.9530420402097590532639184181827e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.489 y[1] (analytic) = 0.87009776312946795822013261670067 y[1] (numeric) = 0.87009776312946795822013261670053 absolute error = 1.4e-31 relative error = 1.6090145950549744898399870520519e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.49 y[1] (analytic) = 0.86975754780725399021930261927372 y[1] (numeric) = 0.86975754780725399021930261927358 absolute error = 1.4e-31 relative error = 1.6096439789795908205396118751513e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.491 y[1] (analytic) = 0.86941632616707630411346499440161 y[1] (numeric) = 0.86941632616707630411346499440147 absolute error = 1.4e-31 relative error = 1.6102757193116719598083030470008e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.492 y[1] (analytic) = 0.86907409817425786174203532026773 y[1] (numeric) = 0.86907409817425786174203532026756 absolute error = 1.7e-31 relative error = 1.9561047827467680013806828062587e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.493 y[1] (analytic) = 0.86873086379526491387695190556032 y[1] (numeric) = 0.86873086379526491387695190556014 absolute error = 1.8e-31 relative error = 2.0719880863173852417635750955553e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.494 y[1] (analytic) = 0.86838662299770740951810443708581 y[1] (numeric) = 0.86838662299770740951810443708566 absolute error = 1.5e-31 relative error = 1.7273412098656430892726037989223e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.495 y[1] (analytic) = 0.86804137575033940390775236887014 y[1] (numeric) = 0.86804137575033940390775236886998 absolute error = 1.6e-31 relative error = 1.8432301094137958786096241348946e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.496 y[1] (analytic) = 0.86769512202305946526314941402479 y[1] (numeric) = 0.86769512202305946526314941402463 absolute error = 1.6e-31 relative error = 1.8439656503652433096644306758116e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.497 y[1] (analytic) = 0.86734786178691108022659192013642 y[1] (numeric) = 0.86734786178691108022659192013625 absolute error = 1.7e-31 relative error = 1.9599979142136328207123844575720e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=484.4MB, alloc=4.6MB, time=23.22 x[1] = 3.498 y[1] (analytic) = 0.86699959501408305803211032957709 y[1] (numeric) = 0.86699959501408305803211032957693 absolute error = 1.6e-31 relative error = 1.8454449220060021966542281372743e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.499 y[1] (analytic) = 0.86665032167790993338802434792855 y[1] (numeric) = 0.86665032167790993338802434792839 absolute error = 1.6e-31 relative error = 1.8461886645380361722629469490489e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.5 y[1] (analytic) = 0.86630004175287236807458386666302 y[1] (numeric) = 0.86630004175287236807458386666288 absolute error = 1.4e-31 relative error = 1.6160682587146580350806264700296e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.501 y[1] (analytic) = 0.865948755214597551255919110327 y[1] (numeric) = 0.86594875521459755125591911032684 absolute error = 1.6e-31 relative error = 1.8476843928293325553716461278066e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.502 y[1] (analytic) = 0.86559646203985959850552490372778 y[1] (numeric) = 0.86559646203985959850552490372762 absolute error = 1.6e-31 relative error = 1.8484363905895008933251634327634e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.503 y[1] (analytic) = 0.86524316220657994954450538102823 y[1] (numeric) = 0.86524316220657994954450538102807 absolute error = 1.6e-31 relative error = 1.8491911521376394132003098987241e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.504 y[1] (analytic) = 0.86488885569382776469180688620654 y[1] (numeric) = 0.86488885569382776469180688620636 absolute error = 1.8e-31 relative error = 2.0811922689835227673471323691480e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.505 y[1] (analytic) = 0.86453354248182032002566824303813 y[1] (numeric) = 0.86453354248182032002566824303797 absolute error = 1.6e-31 relative error = 1.8507089908933698742869307818269e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.506 y[1] (analytic) = 0.86417722255192340125551900260149 y[1] (numeric) = 0.86417722255192340125551900260131 absolute error = 1.8e-31 relative error = 2.0829060903556138698077073440993e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.507 y[1] (analytic) = 0.86381989588665169630355770729695 y[1] (numeric) = 0.86381989588665169630355770729679 absolute error = 1.6e-31 relative error = 1.8522379579573240468365235213353e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.508 y[1] (analytic) = 0.86346156246966918659524364249953 y[1] (numeric) = 0.86346156246966918659524364249939 absolute error = 1.4e-31 relative error = 1.6213808012434575494384785259482e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.509 y[1] (analytic) = 0.86310222228578953705793698023581 y[1] (numeric) = 0.86310222228578953705793698023562 absolute error = 1.9e-31 relative error = 2.2013614968666757955737316316607e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.51 y[1] (analytic) = 0.86274187532097648482692365368564 y[1] (numeric) = 0.86274187532097648482692365368546 absolute error = 1.8e-31 relative error = 2.0863714298443249116721569087923e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.511 y[1] (analytic) = 0.86238052156234422665806273685694 y[1] (numeric) = 0.86238052156234422665806273685677 absolute error = 1.7e-31 relative error = 1.9712875667926384178282472536191e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.512 y[1] (analytic) = 0.86201816099815780504629554046281 y[1] (numeric) = 0.86201816099815780504629554046265 absolute error = 1.6e-31 relative error = 1.8561093865439098508104571949958e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.513 y[1] (analytic) = 0.861654793617833493049257072849 y[1] (numeric) = 0.86165479361783349304925707284884 absolute error = 1.6e-31 relative error = 1.8568921241441406950130791511595e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.514 y[1] (analytic) = 0.86129041941193917781523195376826 y[1] (numeric) = 0.86129041941193917781523195376809 absolute error = 1.7e-31 relative error = 1.9737825496314056168768162189215e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.515 y[1] (analytic) = 0.86092503837219474281469830887878 y[1] (numeric) = 0.86092503837219474281469830887861 absolute error = 1.7e-31 relative error = 1.9746202331556034152231852924540e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.516 y[1] (analytic) = 0.86055865049147244877470461405411 y[1] (numeric) = 0.86055865049147244877470461405394 absolute error = 1.7e-31 relative error = 1.9754609392737094383007735449276e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.517 y[1] (analytic) = 0.86019125576379731331532590092925 y[1] (numeric) = 0.86019125576379731331532590092909 absolute error = 1.6e-31 relative error = 1.8600514586483417495986326410372e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.518 y[1] (analytic) = 0.85982285418434748928744717857212 y[1] (numeric) = 0.85982285418434748928744717857196 absolute error = 1.6e-31 relative error = 1.8608484203618961560677152507588e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.519 y[1] (analytic) = 0.85945344574945464181112337075777 y[1] (numeric) = 0.85945344574945464181112337075759 absolute error = 1.8e-31 relative error = 2.0943542770142441694380495308559e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.52 y[1] (analytic) = 0.85908303045660432401376651403474 y[1] (numeric) = 0.85908303045660432401376651403457 absolute error = 1.7e-31 relative error = 1.9788541267034999505864946878539e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.521 y[1] (analytic) = 0.85871160830443635146741240860629 y[1] (numeric) = 0.85871160830443635146741240860612 absolute error = 1.7e-31 relative error = 1.9797100488215413710506135984831e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.522 y[1] (analytic) = 0.85833917929274517532432036200157 y[1] (numeric) = 0.85833917929274517532432036200138 absolute error = 1.9e-31 relative error = 2.2135771567197516532822344015565e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.523 y[1] (analytic) = 0.857965743422480254150161114584 y[1] (numeric) = 0.85796574342248025415016111458382 absolute error = 1.8e-31 relative error = 2.0979858622556243480583803647810e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.524 y[1] (analytic) = 0.85759130069574642445404948613183 y[1] (numeric) = 0.85759130069574642445404948613168 absolute error = 1.5e-31 relative error = 1.7490849065085903159583158777261e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=488.2MB, alloc=4.6MB, time=23.41 TOP MAIN SOLVE Loop x[1] = 3.525 y[1] (analytic) = 0.85721585111580426991467973402871 y[1] (numeric) = 0.85721585111580426991467973402856 absolute error = 1.5e-31 relative error = 1.7498509833287716286246405199268e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.526 y[1] (analytic) = 0.85683939468707048930182306601889 y[1] (numeric) = 0.85683939468707048930182306601873 absolute error = 1.6e-31 relative error = 1.8673277745175826874684056947737e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.527 y[1] (analytic) = 0.85646193141511826309244820401057 y[1] (numeric) = 0.85646193141511826309244820401041 absolute error = 1.6e-31 relative error = 1.8681507505609102259471022414837e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.528 y[1] (analytic) = 0.85608346130667761878072735004907 y[1] (numeric) = 0.85608346130667761878072735004891 absolute error = 1.6e-31 relative error = 1.8689766504282772159406033379486e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.529 y[1] (analytic) = 0.85570398436963579488119136132917 y[1] (numeric) = 0.85570398436963579488119136132901 absolute error = 1.6e-31 relative error = 1.8698054808972970316278430954784e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.53 y[1] (analytic) = 0.85532350061303760362429939797077 y[1] (numeric) = 0.85532350061303760362429939797063 absolute error = 1.4e-31 relative error = 1.6368075926787646963869831085228e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.531 y[1] (analytic) = 0.85494201004708579234368976524175 y[1] (numeric) = 0.8549420100470857923436897652416 absolute error = 1.5e-31 relative error = 1.7545049633452773523551044677721e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.532 y[1] (analytic) = 0.85455951268314140355438013097564 y[1] (numeric) = 0.85455951268314140355438013097548 absolute error = 1.6e-31 relative error = 1.8723096241434707422392549170965e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.533 y[1] (analytic) = 0.85417600853372413372118675909846 y[1] (numeric) = 0.8541760085337241337211867590983 absolute error = 1.6e-31 relative error = 1.8731502454003068978075216650771e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.534 y[1] (analytic) = 0.85379149761251269071663386144511 y[1] (numeric) = 0.85379149761251269071663386144495 absolute error = 1.6e-31 relative error = 1.8739938316019033811239088915903e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.535 y[1] (analytic) = 0.85340597993434514996762563241187 y[1] (numeric) = 0.85340597993434514996762563241172 absolute error = 1.5e-31 relative error = 1.7576628653520790794460617358787e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.536 y[1] (analytic) = 0.85301945551521930929015499445485 y[1] (numeric) = 0.85301945551521930929015499445468 absolute error = 1.7e-31 relative error = 1.9929205471324318766402234832096e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.537 y[1] (analytic) = 0.85263192437229304241132454700274 y[1] (numeric) = 0.85263192437229304241132454700258 absolute error = 1.6e-31 relative error = 1.8765424496366574027209061524666e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.538 y[1] (analytic) = 0.85224338652388465117795667700634 y[1] (numeric) = 0.85224338652388465117795667700617 absolute error = 1.7e-31 relative error = 1.9947353383801898734364021811438e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.539 y[1] (analytic) = 0.8518538419894732164510712560917 y[1] (numeric) = 0.85185384198947321645107125609154 absolute error = 1.6e-31 relative error = 1.8782564814913072839437067178093e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.54 y[1] (analytic) = 0.85146329078969894768551081712189 y[1] (numeric) = 0.85146329078969894768551081712174 absolute error = 1.5e-31 relative error = 1.7616731293357445669768355129025e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.541 y[1] (analytic) = 0.85107173294636353119399457189723 y[1] (numeric) = 0.85107173294636353119399457189708 absolute error = 1.5e-31 relative error = 1.7624836332033758174569851209348e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.542 y[1] (analytic) = 0.85067916848243047709488410173812 y[1] (numeric) = 0.85067916848243047709488410173795 absolute error = 1.7e-31 relative error = 1.9984032323639896342009423081770e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.543 y[1] (analytic) = 0.85028559742202546494294502379425 y[1] (numeric) = 0.85028559742202546494294502379407 absolute error = 1.8e-31 relative error = 2.1169357748236669183233129562833e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.544 y[1] (analytic) = 0.84989101979043668804239040810823 y[1] (numeric) = 0.84989101979043668804239040810806 absolute error = 1.7e-31 relative error = 2.0002564569033572891183873550020e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.545 y[1] (analytic) = 0.84949543561411519644149319372852 y[1] (numeric) = 0.84949543561411519644149319372837 absolute error = 1.5e-31 relative error = 1.7657540430639554984499924201744e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.546 y[1] (analytic) = 0.84909884492067523860805632651502 y[1] (numeric) = 0.84909884492067523860805632651484 absolute error = 1.8e-31 relative error = 2.1198945337961920417751464582439e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.547 y[1] (analytic) = 0.84870124773889460178503081670806 y[1] (numeric) = 0.84870124773889460178503081670789 absolute error = 1.7e-31 relative error = 2.0030605640431554145931795274559e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.548 y[1] (analytic) = 0.84830264409871495102557339083828 y[1] (numeric) = 0.84830264409871495102557339083811 absolute error = 1.7e-31 relative error = 2.0040017696823011003731461207290e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.549 y[1] (analytic) = 0.84790303403124216690683689013511 y[1] (numeric) = 0.84790303403124216690683689013495 absolute error = 1.6e-31 relative error = 1.8870082259206136701372081818055e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.55 y[1] (analytic) = 0.84750241756874668192178804625017 y[1] (numeric) = 0.84750241756874668192178804625003 absolute error = 1.4e-31 relative error = 1.6519126919026593615671936664108e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.551 y[1] (analytic) = 0.84710079474466381554834874484026 y[1] (numeric) = 0.84710079474466381554834874484011 memory used=492.1MB, alloc=4.6MB, time=23.59 absolute error = 1.5e-31 relative error = 1.7707455940377619685933298682321e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.552 y[1] (analytic) = 0.84669816559359410799515836835612 y[1] (numeric) = 0.84669816559359410799515836835596 absolute error = 1.6e-31 relative error = 1.8896934763975649888098169633189e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.553 y[1] (analytic) = 0.84629453015130365262325629125431 y[1] (numeric) = 0.84629453015130365262325629125413 absolute error = 1.8e-31 relative error = 2.1269190995222306014528054967434e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.554 y[1] (analytic) = 0.84588988845472442704298508378784 y[1] (numeric) = 0.84588988845472442704298508378767 absolute error = 1.7e-31 relative error = 2.0097178405874645074617560255006e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.555 y[1] (analytic) = 0.84548424054195462288541646453721 y[1] (numeric) = 0.84548424054195462288541646453706 absolute error = 1.5e-31 relative error = 1.7741312351824575411215862715432e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.556 y[1] (analytic) = 0.84507758645225897424760352691322 y[1] (numeric) = 0.84507758645225897424760352691304 absolute error = 1.8e-31 relative error = 2.1299819435001516547933912452467e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.557 y[1] (analytic) = 0.84466992622606908481096425099654 y[1] (numeric) = 0.84466992622606908481096425099636 absolute error = 1.8e-31 relative error = 2.1310099295736551836204553004343e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.558 y[1] (analytic) = 0.84426125990498375363210279927442 y[1] (numeric) = 0.84426125990498375363210279927426 absolute error = 1.6e-31 relative error = 1.8951479547694393142876051741245e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.559 y[1] (analytic) = 0.84385158753176929960537658308882 y[1] (numeric) = 0.84385158753176929960537658308864 absolute error = 1.8e-31 relative error = 2.1330765108411123931741105947598e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.56 y[1] (analytic) = 0.84344090915035988459651857592372 y[1] (numeric) = 0.84344090915035988459651857592355 absolute error = 1.7e-31 relative error = 2.0155531721985062709711246222527e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.561 y[1] (analytic) = 0.8430292248058578352466258400298 y[1] (numeric) = 0.84302922480585783524662584002962 absolute error = 1.8e-31 relative error = 2.1351572958986375110717213217050e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.562 y[1] (analytic) = 0.84261653454453396344582672430752 y[1] (numeric) = 0.84261653454453396344582672430733 absolute error = 1.9e-31 relative error = 2.2548809833491123033651327122032e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.563 y[1] (analytic) = 0.8422028384138278854759406838493 y[1] (numeric) = 0.84220283841382788547594068384915 absolute error = 1.5e-31 relative error = 1.7810436293767921035129629102336e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.564 y[1] (analytic) = 0.84178813646234833982144616506999 y[1] (numeric) = 0.8417881364623483398214461650698 absolute error = 1.9e-31 relative error = 2.2570999966628581276796895427337e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.565 y[1] (analytic) = 0.84137242873987350364807349493371 y[1] (numeric) = 0.84137242873987350364807349493353 absolute error = 1.8e-31 relative error = 2.1393617600422995071414377067250e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.566 y[1] (analytic) = 0.84095571529735130794834120841517 y[1] (numeric) = 0.84095571529735130794834120841498 absolute error = 1.9e-31 relative error = 2.2593341901816839706679084614228e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.567 y[1] (analytic) = 0.84053799618689975135335574500478 y[1] (numeric) = 0.8405379961868997513533557450046 absolute error = 1.8e-31 relative error = 2.1414855820506618444265248880301e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.568 y[1] (analytic) = 0.84011927146180721261019594278928 y[1] (numeric) = 0.8401192714618072126101959427891 absolute error = 1.8e-31 relative error = 2.1425529221202135799665925500500e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.569 y[1] (analytic) = 0.83969954117653276172420525740017 y[1] (numeric) = 0.83969954117653276172420525739998 absolute error = 1.9e-31 relative error = 2.2627141100230240916200623826047e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.57 y[1] (analytic) = 0.839278805386706469765516132928 y[1] (numeric) = 0.83927880538670646976551613292781 absolute error = 1.9e-31 relative error = 2.2638484229618489749329394430633e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.571 y[1] (analytic) = 0.83885706414912971733913245274429 y[1] (numeric) = 0.83885706414912971733913245274411 absolute error = 1.8e-31 relative error = 2.1457767680907326985348625066124e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.572 y[1] (analytic) = 0.83843431752177550171789750005583 y[1] (numeric) = 0.83843431752177550171789750005563 absolute error = 2.0e-31 relative error = 2.3853985436945771842335264857226e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.573 y[1] (analytic) = 0.83801056556378874263767636093525 y[1] (numeric) = 0.83801056556378874263767636093508 absolute error = 1.7e-31 relative error = 2.0286140412278575991449592395898e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.574 y[1] (analytic) = 0.83758580833548658675408320652716 y[1] (numeric) = 0.83758580833548658675408320652697 absolute error = 1.9e-31 relative error = 2.2684242988498368571555880959902e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.575 y[1] (analytic) = 0.83716004589835871076008539611492 y[1] (numeric) = 0.83716004589835871076008539611474 absolute error = 1.8e-31 relative error = 2.1501265006841256128919949159240e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.576 y[1] (analytic) = 0.83673327831506762316381784875514 y[1] (numeric) = 0.83673327831506762316381784875494 absolute error = 2.0e-31 relative error = 2.3902479461883076446999550595808e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.577 y[1] (analytic) = 0.8363055056494489647259426382338 y[1] (numeric) = 0.83630550564944896472594263823362 absolute error = 1.8e-31 relative error = 2.1523235083836686280391251149208e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=495.9MB, alloc=4.6MB, time=23.78 x[1] = 3.578 y[1] (analytic) = 0.83587672796651180755589027417783 y[1] (numeric) = 0.83587672796651180755589027417764 absolute error = 1.9e-31 relative error = 2.2730624462081216748937845657672e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.579 y[1] (analytic) = 0.83544694533243895286632064125837 y[1] (numeric) = 0.83544694533243895286632064125819 absolute error = 1.8e-31 relative error = 2.1545353778075620530136854391215e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.58 y[1] (analytic) = 0.83501615781458722738514307855304 y[1] (numeric) = 0.83501615781458722738514307855286 absolute error = 1.8e-31 relative error = 2.1556469095292458643350768708067e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.581 y[1] (analytic) = 0.83458436548148777842443659228564 y[1] (numeric) = 0.83458436548148777842443659228545 absolute error = 1.9e-31 relative error = 2.2765823068155050360798735881753e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.582 y[1] (analytic) = 0.83415156840284636760561270733688 y[1] (numeric) = 0.83415156840284636760561270733668 absolute error = 2.0e-31 relative error = 2.3976457945519525785508956210474e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.583 y[1] (analytic) = 0.83371776664954366324016497611339 y[1] (numeric) = 0.8337177666495436632401649761132 absolute error = 1.9e-31 relative error = 2.2789486754438711685266715500141e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.584 y[1] (analytic) = 0.83328296029363553136535067757478 y[1] (numeric) = 0.83328296029363553136535067757458 absolute error = 2.0e-31 relative error = 2.4001450831242632432599764084752e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.585 y[1] (analytic) = 0.83284714940835332543415175444715 y[1] (numeric) = 0.83284714940835332543415175444696 absolute error = 1.9e-31 relative error = 2.2813309757375550668321147311719e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.586 y[1] (analytic) = 0.83241033406810417465886355289584 y[1] (numeric) = 0.83241033406810417465886355289564 absolute error = 2.0e-31 relative error = 2.4026611854104741844576053998084e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.587 y[1] (analytic) = 0.83197251434847127100766144618621 y[1] (numeric) = 0.831972514348471271007661446186 absolute error = 2.1e-31 relative error = 2.5241218475162462538008882479582e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.588 y[1] (analytic) = 0.83153369032621415485349694213077 y[1] (numeric) = 0.83153369032621415485349694213055 absolute error = 2.2e-31 relative error = 2.6457136079921557614634264493395e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.589 y[1] (analytic) = 0.83109386207926899927467639339823 y[1] (numeric) = 0.83109386207926899927467639339803 absolute error = 2.0e-31 relative error = 2.4064670565564130765284090817488e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.59 y[1] (analytic) = 0.8306530296867488930064769500473 y[1] (numeric) = 0.83065302968674889300647695004709 absolute error = 2.1e-31 relative error = 2.5281313917460097112864484755517e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.591 y[1] (analytic) = 0.83021119322894412204315591493974 y[1] (numeric) = 0.83021119322894412204315591493956 absolute error = 1.8e-31 relative error = 2.1681230206006400814292938727739e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.592 y[1] (analytic) = 0.8297683527873224498897111849863 y[1] (numeric) = 0.8297683527873224498897111849861 absolute error = 2.0e-31 relative error = 2.4103112552818932258996481428898e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.593 y[1] (analytic) = 0.82932450844452939646275198447757 y[1] (numeric) = 0.82932450844452939646275198447739 absolute error = 1.8e-31 relative error = 2.1704411019711178327830493262347e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.594 y[1] (analytic) = 0.82887966028438851563984062105617 y[1] (numeric) = 0.82887966028438851563984062105597 absolute error = 2.0e-31 relative error = 2.4128954971748253916188462846793e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.595 y[1] (analytic) = 0.82843380839190167145666752018551 y[1] (numeric) = 0.8284338083919016714566675201853 absolute error = 2.1e-31 relative error = 2.5349037892072204856562907184973e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.596 y[1] (analytic) = 0.82798695285324931295142332027234 y[1] (numeric) = 0.82798695285324931295142332027214 absolute error = 2.0e-31 relative error = 2.4154969992075175177276959766354e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.597 y[1] (analytic) = 0.82753909375579074765573333789418 y[1] (numeric) = 0.82753909375579074765573333789398 absolute error = 2.0e-31 relative error = 2.4168042514136570317730200899864e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.598 y[1] (analytic) = 0.82709023118806441373152124087371 y[1] (numeric) = 0.82709023118806441373152124087349 absolute error = 2.2e-31 relative error = 2.6599274384365958080358883494591e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.599 y[1] (analytic) = 0.82664036523978815075317029622526 y[1] (numeric) = 0.82664036523978815075317029622504 absolute error = 2.2e-31 relative error = 2.6613749975321297198946333253986e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.6 y[1] (analytic) = 0.82618949600185946913435209027272 y[1] (numeric) = 0.82618949600185946913435209027251 absolute error = 2.1e-31 relative error = 2.5417897590836395968861019465149e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.601 y[1] (analytic) = 0.82573762356635581819889414950144 y[1] (numeric) = 0.82573762356635581819889414950122 absolute error = 2.2e-31 relative error = 2.6642845586933695267104682708547e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.602 y[1] (analytic) = 0.82528474802653485289505942295842 y[1] (numeric) = 0.82528474802653485289505942295821 absolute error = 2.1e-31 relative error = 2.5445762871804339252606794875846e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.603 y[1] (analytic) = 0.8248308694768346991526121202525 y[1] (numeric) = 0.82483086947683469915261212025231 absolute error = 1.9e-31 relative error = 2.3035025364716436928408226821480e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.604 y[1] (analytic) = 0.82437598801287421788204593342738 y[1] (numeric) = 0.82437598801287421788204593342716 absolute error = 2.2e-31 relative error = 2.6686852018858690547550610882595e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=499.7MB, alloc=4.6MB, time=23.96 TOP MAIN SOLVE Loop x[1] = 3.605 y[1] (analytic) = 0.82392010373145326761535220618481 y[1] (numeric) = 0.82392010373145326761535220618461 absolute error = 2.0e-31 relative error = 2.4274198322655271245579379001311e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.606 y[1] (analytic) = 0.82346321673055296578770715012107 y[1] (numeric) = 0.82346321673055296578770715012086 absolute error = 2.1e-31 relative error = 2.5502049846716409796276054062593e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.607 y[1] (analytic) = 0.82300532710933594865945874480236 y[1] (numeric) = 0.82300532710933594865945874480213 absolute error = 2.3e-31 relative error = 2.7946356168536025328470318561932e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.608 y[1] (analytic) = 0.82254643496814662987779549664847 y[1] (numeric) = 0.82254643496814662987779549664825 absolute error = 2.2e-31 relative error = 2.6746210383675125816717633818338e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.609 y[1] (analytic) = 0.82208654040851145767748077071023 y[1] (numeric) = 0.82208654040851145767748077071 absolute error = 2.3e-31 relative error = 2.7977589790693853243602613754627e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.61 y[1] (analytic) = 0.82162564353313917072003794951773 y[1] (numeric) = 0.82162564353313917072003794951754 absolute error = 1.9e-31 relative error = 2.3124886801605359617040783902069e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.611 y[1] (analytic) = 0.82116374444592105257077321424103 y[1] (numeric) = 0.82116374444592105257077321424083 absolute error = 2.0e-31 relative error = 2.4355678310535943841781037575783e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.612 y[1] (analytic) = 0.82070084325193118481302428543766 y[1] (numeric) = 0.82070084325193118481302428543745 absolute error = 2.1e-31 relative error = 2.5587886466388841574105108879060e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.613 y[1] (analytic) = 0.82023694005742669879902500366645 y[1] (numeric) = 0.82023694005742669879902500366624 absolute error = 2.1e-31 relative error = 2.5602358263125458704016384999473e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.614 y[1] (analytic) = 0.81977203496984802603677717421566 y[1] (numeric) = 0.81977203496984802603677717421544 absolute error = 2.2e-31 relative error = 2.6836729067989225024144762738700e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.615 y[1] (analytic) = 0.81930612809781914721232264513003 y[1] (numeric) = 0.81930612809781914721232264512982 absolute error = 2.1e-31 relative error = 2.5631445048208834956455618839891e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.616 y[1] (analytic) = 0.81883921955114783984681013362068 y[1] (numeric) = 0.81883921955114783984681013362046 absolute error = 2.2e-31 relative error = 2.6867301265881531921098574391426e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.617 y[1] (analytic) = 0.81837130944082592458775286280252 y[1] (numeric) = 0.81837130944082592458775286280228 absolute error = 2.4e-31 relative error = 2.9326541293827421214234690313605e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.618 y[1] (analytic) = 0.81790239787902951013387461852604 y[1] (numeric) = 0.81790239787902951013387461852582 absolute error = 2.2e-31 relative error = 2.6898074950079646670955097106569e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.619 y[1] (analytic) = 0.81743248497911923679294338485012 y[1] (numeric) = 0.81743248497911923679294338484991 absolute error = 2.1e-31 relative error = 2.5690195075299008798396861597305e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.62 y[1] (analytic) = 0.81696157085564051867199326643866 y[1] (numeric) = 0.81696157085564051867199326643844 absolute error = 2.2e-31 relative error = 2.6929051236716572399447320723173e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.621 y[1] (analytic) = 0.81648965562432378449933695685667 y[1] (numeric) = 0.81648965562432378449933695685647 absolute error = 2.0e-31 relative error = 2.4495105188696019947593770208603e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.622 y[1] (analytic) = 0.81601673940208471707777256338594 y[1] (numeric) = 0.81601673940208471707777256338571 absolute error = 2.3e-31 relative error = 2.8185696309186817151652326917112e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.623 y[1] (analytic) = 0.81554282230702449136839015157654 y[1] (numeric) = 0.81554282230702449136839015157632 absolute error = 2.2e-31 relative error = 2.6975898013259368290134342009722e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.624 y[1] (analytic) = 0.81506790445843001120438492629849 y[1] (numeric) = 0.81506790445843001120438492629827 absolute error = 2.2e-31 relative error = 2.6991616133649440223113766695715e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.625 y[1] (analytic) = 0.81459198597677414463428552055021 y[1] (numeric) = 0.81459198597677414463428552054998 absolute error = 2.3e-31 relative error = 2.8234994200711154420266423264111e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.626 y[1] (analytic) = 0.81411506698371595789400741872333 y[1] (numeric) = 0.81411506698371595789400741872311 absolute error = 2.2e-31 relative error = 2.7023207028350019520138185055695e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.627 y[1] (analytic) = 0.81363714760210094800714309740772 y[1] (numeric) = 0.8136371476021009480071430974075 absolute error = 2.2e-31 relative error = 2.7039080092197098571320584954124e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.628 y[1] (analytic) = 0.81315822795596127401290202414912 y[1] (numeric) = 0.8131582279559612740129020241489 absolute error = 2.2e-31 relative error = 2.7055005094520752922808940955827e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.629 y[1] (analytic) = 0.81267830817051598682111521284167 y[1] (numeric) = 0.81267830817051598682111521284146 absolute error = 2.1e-31 relative error = 2.5840482991695386242223679128395e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.63 y[1] (analytic) = 0.81219738837217125769372059364597 y[1] (numeric) = 0.81219738837217125769372059364577 absolute error = 2.0e-31 relative error = 2.4624555910090476746020127242133e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=503.5MB, alloc=4.6MB, time=24.14 x[1] = 3.631 y[1] (analytic) = 0.81171546868852060535214701547002 y[1] (numeric) = 0.81171546868852060535214701546979 absolute error = 2.3e-31 relative error = 2.8335051982144478311911792478708e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.632 y[1] (analytic) = 0.81123254924834512171001626013254 y[1] (numeric) = 0.81123254924834512171001626013232 absolute error = 2.2e-31 relative error = 2.7119227427923472241904255830453e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.633 y[1] (analytic) = 0.81074863018161369623058400934535 y[1] (numeric) = 0.81074863018161369623058400934513 absolute error = 2.2e-31 relative error = 2.7135414333135335799717507712632e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.634 y[1] (analytic) = 0.81026371161948323890834226859895 y[1] (numeric) = 0.81026371161948323890834226859875 absolute error = 2.0e-31 relative error = 2.4683321878041130507909337660713e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.635 y[1] (analytic) = 0.80977779369429890187420731591668 y[1] (numeric) = 0.80977779369429890187420731591648 absolute error = 2.0e-31 relative error = 2.4698133433318432676387763664999e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.636 y[1] (analytic) = 0.80929087653959429962371880824971 y[1] (numeric) = 0.80929087653959429962371880824951 absolute error = 2.0e-31 relative error = 2.4712993288046175495411195185672e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.637 y[1] (analytic) = 0.80880296029009172786767724402169 y[1] (numeric) = 0.80880296029009172786767724402147 absolute error = 2.2e-31 relative error = 2.7200691738454201916367574881982e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.638 y[1] (analytic) = 0.80831404508170238100464854699211 y[1] (numeric) = 0.8083140450817023810046485469919 absolute error = 2.1e-31 relative error = 2.5980001371716078531614233018495e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.639 y[1] (analytic) = 0.80782413105152656821476610419251 y[1] (numeric) = 0.80782413105152656821476610419231 absolute error = 2.0e-31 relative error = 2.4757864034052124929649457157088e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.64 y[1] (analytic) = 0.80733321833785392817426215919527 y[1] (numeric) = 0.80733321833785392817426215919506 absolute error = 2.1e-31 relative error = 2.6011564398694035639127424846014e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.641 y[1] (analytic) = 0.80684130708016364239016203140201 y[1] (numeric) = 0.8068413070801636423901620314018 absolute error = 2.1e-31 relative error = 2.6027423008368046988972155640803e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.642 y[1] (analytic) = 0.80634839741912464715457620238307 y[1] (numeric) = 0.80634839741912464715457620238286 absolute error = 2.1e-31 relative error = 2.6043333213304071535526194849620e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.643 y[1] (analytic) = 0.80585448949659584411802688156072 y[1] (numeric) = 0.80585448949659584411802688156052 absolute error = 2.0e-31 relative error = 2.4818376345453723034470230867326e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.644 y[1] (analytic) = 0.80535958345562630948124723570555 y[1] (numeric) = 0.80535958345562630948124723570533 absolute error = 2.2e-31 relative error = 2.7316990387824888505064999518563e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.645 y[1] (analytic) = 0.80486367944045550180489303980403 y[1] (numeric) = 0.8048636794404555018048930398038 absolute error = 2.3e-31 relative error = 2.8576267742619089725023771104212e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.646 y[1] (analytic) = 0.80436677759651346843660808085668 y[1] (numeric) = 0.80436677759651346843660808085645 absolute error = 2.3e-31 relative error = 2.8593920883611209961143280612199e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.647 y[1] (analytic) = 0.80386887807042105055488622107559 y[1] (numeric) = 0.80386887807042105055488622107536 absolute error = 2.3e-31 relative error = 2.8611631358597190102486414883390e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.648 y[1] (analytic) = 0.80336998100999008682917460276825 y[1] (numeric) = 0.80336998100999008682917460276805 absolute error = 2.0e-31 relative error = 2.4895129856428249453237542274516e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.649 y[1] (analytic) = 0.80287008656422361569566405391883 y[1] (numeric) = 0.80287008656422361569566405391861 absolute error = 2.2e-31 relative error = 2.7401693459705406734983006230130e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.65 y[1] (analytic) = 0.80236919488331607624821433110504 y[1] (numeric) = 0.80236919488331607624821433110483 absolute error = 2.1e-31 relative error = 2.6172490337261650314114296961451e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.651 y[1] (analytic) = 0.80186730611865350774386341492102 y[1] (numeric) = 0.80186730611865350774386341492079 absolute error = 2.3e-31 relative error = 2.8683049956642895613768608989394e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.652 y[1] (analytic) = 0.8013644204228137477223716525057 y[1] (numeric) = 0.80136442042281374772237165250548 absolute error = 2.2e-31 relative error = 2.7453177904245385593007740249733e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.653 y[1] (analytic) = 0.80086053794956662873925312210844 y[1] (numeric) = 0.80086053794956662873925312210821 absolute error = 2.3e-31 relative error = 2.8719107647489557561722682520350e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.654 y[1] (analytic) = 0.80035565885387417371174817584888 y[1] (numeric) = 0.80035565885387417371174817584867 absolute error = 2.1e-31 relative error = 2.6238335129750233203839716918204e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.655 y[1] (analytic) = 0.79984978329189078987719269895249 y[1] (numeric) = 0.79984978329189078987719269895225 absolute error = 2.4e-31 relative error = 3.0005634184489904071303782680427e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.656 y[1] (analytic) = 0.79934291142096346136324120675761 y[1] (numeric) = 0.79934291142096346136324120675737 absolute error = 2.4e-31 relative error = 3.0024661077354215438358702882026e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.657 y[1] (analytic) = 0.79883504339963194036940248469963 y[1] (numeric) = 0.79883504339963194036940248469939 absolute error = 2.4e-31 relative error = 3.0043749580466962638224630150909e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=507.3MB, alloc=4.6MB, time=24.33 TOP MAIN SOLVE Loop x[1] = 3.658 y[1] (analytic) = 0.7983261793876289369593480612741 y[1] (numeric) = 0.79832617938762893695934806127389 absolute error = 2.1e-31 relative error = 2.6305037392245414914507029515586e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.659 y[1] (analytic) = 0.79781631954588030746345538966843 y[1] (numeric) = 0.7978163195458803074634553896682 absolute error = 2.3e-31 relative error = 2.8828690810801759742433451455020e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.66 y[1] (analytic) = 0.79730546403650524149104920032299 y[1] (numeric) = 0.79730546403650524149104920032276 absolute error = 2.3e-31 relative error = 2.8847162144804926834883002062446e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.661 y[1] (analytic) = 0.79679361302281644755180607414147 y[1] (numeric) = 0.79679361302281644755180607414126 absolute error = 2.1e-31 relative error = 2.6355632947824166460972018097956e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.662 y[1] (analytic) = 0.79628076666932033728578887440899 y[1] (numeric) = 0.79628076666932033728578887440879 absolute error = 2.0e-31 relative error = 2.5116768905088479513665616736647e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.663 y[1] (analytic) = 0.79576692514171720830157926469875 y[1] (numeric) = 0.79576692514171720830157926469853 absolute error = 2.2e-31 relative error = 2.7646285997727344006531862152090e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.664 y[1] (analytic) = 0.79525208860690142562197813014842 y[1] (numeric) = 0.79525208860690142562197813014821 absolute error = 2.1e-31 relative error = 2.6406720964150078912908858989704e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.665 y[1] (analytic) = 0.79473625723296160173674531046588 y[1] (numeric) = 0.79473625723296160173674531046569 absolute error = 1.9e-31 relative error = 2.3907302362361601112228564604939e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.666 y[1] (analytic) = 0.79421943118918077526185164487732 y[1] (numeric) = 0.79421943118918077526185164487711 absolute error = 2.1e-31 relative error = 2.6441055425396486724689444300077e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.667 y[1] (analytic) = 0.7937016106460365882047179219589 y[1] (numeric) = 0.79370161064603658820471792195869 absolute error = 2.1e-31 relative error = 2.6458305890178257712029141878074e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.668 y[1] (analytic) = 0.79318279577520146183491692089372 y[1] (numeric) = 0.79318279577520146183491692089352 absolute error = 2.0e-31 relative error = 2.5214868636243423526614315995110e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.669 y[1] (analytic) = 0.79266298674954277115981632516516 y[1] (numeric) = 0.79266298674954277115981632516496 absolute error = 2.0e-31 relative error = 2.5231403931213691838949328423479e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.67 y[1] (analytic) = 0.79214218374312301800464188503733 y[1] (numeric) = 0.79214218374312301800464188503714 absolute error = 1.9e-31 relative error = 2.3985592978042117165633124471051e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.671 y[1] (analytic) = 0.79162038693120000269644180137928 y[1] (numeric) = 0.79162038693120000269644180137908 absolute error = 2.0e-31 relative error = 2.5264634830252554888024578279867e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.672 y[1] (analytic) = 0.79109759649022699435143490045945 y[1] (numeric) = 0.79109759649022699435143490045926 absolute error = 1.9e-31 relative error = 2.4017264221627199519498278604151e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.673 y[1] (analytic) = 0.7905738125978528997652267672719 y[1] (numeric) = 0.79057381259785289976522676727171 absolute error = 1.9e-31 relative error = 2.4033176532328262499514657664785e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.674 y[1] (analytic) = 0.79004903543292243090537960374989 y[1] (numeric) = 0.79004903543292243090537960374969 absolute error = 2.0e-31 relative error = 2.5314884397068618289917142786959e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.675 y[1] (analytic) = 0.78952326517547627100582317787823 y[1] (numeric) = 0.78952326517547627100582317787803 absolute error = 2.0e-31 relative error = 2.5331742435170520655140297283250e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.676 y[1] (analytic) = 0.7889965020067512392625958302279 y[1] (numeric) = 0.78899650200675123926259583022772 absolute error = 1.8e-31 relative error = 2.2813789356756842313055112043928e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.677 y[1] (analytic) = 0.78846874610918045413040610580517 y[1] (numeric) = 0.78846874610918045413040610580499 absolute error = 1.8e-31 relative error = 2.2829059602963023350044604816096e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.678 y[1] (analytic) = 0.78793999766639349521950718133002 y[1] (numeric) = 0.78793999766639349521950718132984 absolute error = 1.8e-31 relative error = 2.2844379081287650863979846905836e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.679 y[1] (analytic) = 0.78741025686321656379237786113425 y[1] (numeric) = 0.78741025686321656379237786113404 absolute error = 2.1e-31 relative error = 2.6669705934054112810860593538281e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.68 y[1] (analytic) = 0.78687952388567264185970551879465 y[1] (numeric) = 0.78687952388567264185970551879446 absolute error = 1.9e-31 relative error = 2.4146008916557535698516940066584e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.681 y[1] (analytic) = 0.78634779892098164987516796639196 y[1] (numeric) = 0.78634779892098164987516796639177 absolute error = 1.9e-31 relative error = 2.4162336342864575059329983038511e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.682 y[1] (analytic) = 0.78581508215756060302851283890641 y[1] (numeric) = 0.7858150821575606030285128389062 absolute error = 2.1e-31 relative error = 2.6723844421949354947144550386860e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.683 y[1] (analytic) = 0.78528137378502376613643468772844 y[1] (numeric) = 0.78528137378502376613643468772825 absolute error = 1.9e-31 relative error = 2.4195149196549493165543078588494e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.684 y[1] (analytic) = 0.78474667399418280713075158457247 y[1] (numeric) = 0.78474667399418280713075158457227 absolute error = 2.0e-31 relative error = 2.5485931527692281215261378620240e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=511.1MB, alloc=4.6MB, time=24.52 TOP MAIN SOLVE Loop x[1] = 3.685 y[1] (analytic) = 0.78421098297704694914338464523225 y[1] (numeric) = 0.78421098297704694914338464523206 absolute error = 1.9e-31 relative error = 2.4228173810919593440130324824368e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.686 y[1] (analytic) = 0.78367430092682312118764549160884 y[1] (numeric) = 0.78367430092682312118764549160865 absolute error = 1.9e-31 relative error = 2.4244765941066831409472680448420e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.687 y[1] (analytic) = 0.78313662803791610743533828026947 y[1] (numeric) = 0.78313662803791610743533828026929 absolute error = 1.8e-31 relative error = 2.2984495113065401678474429057834e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.688 y[1] (analytic) = 0.78259796450592869508918453646194 y[1] (numeric) = 0.78259796450592869508918453646175 absolute error = 1.9e-31 relative error = 2.4278110679721889928885004380363e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.689 y[1] (analytic) = 0.78205831052766182085008064400715 y[1] (numeric) = 0.78205831052766182085008064400699 absolute error = 1.6e-31 relative error = 2.0458832525166384559360864271054e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.69 y[1] (analytic) = 0.78151766630111471597869945382537 y[1] (numeric) = 0.7815176663011147159786994538252 absolute error = 1.7e-31 relative error = 2.1752547297440091263040112173793e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.691 y[1] (analytic) = 0.78097603202548504995094908701229 y[1] (numeric) = 0.78097603202548504995094908701213 absolute error = 1.6e-31 relative error = 2.0487184425498327049250429443207e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.692 y[1] (analytic) = 0.78043340790116907270680362237407 y[1] (numeric) = 0.78043340790116907270680362237388 absolute error = 1.9e-31 relative error = 2.4345446783341805737978909825832e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.693 y[1] (analytic) = 0.77988979412976175549202197314631 y[1] (numeric) = 0.77988979412976175549202197314613 absolute error = 1.8e-31 relative error = 2.3080184066372171038397449393960e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.694 y[1] (analytic) = 0.77934519091405693029227287326723 y[1] (numeric) = 0.77934519091405693029227287326704 absolute error = 1.9e-31 relative error = 2.4379440871016093799458817586408e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.695 y[1] (analytic) = 0.77879959845804742785918551003961 y[1] (numeric) = 0.77879959845804742785918551003943 absolute error = 1.8e-31 relative error = 2.3112492656183140694714377565610e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.696 y[1] (analytic) = 0.77825301696692521432784695730597 y[1] (numeric) = 0.77825301696692521432784695730579 absolute error = 1.8e-31 relative error = 2.3128724987345571217781254502490e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.697 y[1] (analytic) = 0.77770544664708152642526918136744 y[1] (numeric) = 0.77770544664708152642526918136727 absolute error = 1.7e-31 relative error = 2.1859175698578470829643249418761e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.698 y[1] (analytic) = 0.77715688770610700526935001080338 y[1] (numeric) = 0.77715688770610700526935001080322 absolute error = 1.6e-31 relative error = 2.0587863600136590294944775227617e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.699 y[1] (analytic) = 0.77660734035279182875785408108952 y[1] (numeric) = 0.77660734035279182875785408108936 absolute error = 1.6e-31 relative error = 2.0602432102601078045005143619176e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.7 y[1] (analytic) = 0.77605680479712584254694138546834 y[1] (numeric) = 0.77605680479712584254694138546817 absolute error = 1.7e-31 relative error = 2.1905612958891691920062416449281e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.701 y[1] (analytic) = 0.77550528125029868961877268489334 y[1] (numeric) = 0.77550528125029868961877268489316 absolute error = 1.8e-31 relative error = 2.3210673653930151378623961372267e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.702 y[1] (analytic) = 0.77495276992469993843772265204735 y[1] (numeric) = 0.77495276992469993843772265204718 absolute error = 1.7e-31 relative error = 2.1936820745413741733719201512153e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.703 y[1] (analytic) = 0.77439927103391920969473324742211 y[1] (numeric) = 0.77439927103391920969473324742197 absolute error = 1.4e-31 relative error = 1.8078529414559315319674622333138e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.704 y[1] (analytic) = 0.77384478479274630163934144924048 y[1] (numeric) = 0.77384478479274630163934144924033 absolute error = 1.5e-31 relative error = 1.9383732105938208483226943497826e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.705 y[1] (analytic) = 0.7732893114171713139989170836014 y[1] (numeric) = 0.77328931141717131399891708360122 absolute error = 1.8e-31 relative error = 2.3277187120318834024097771550427e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.706 y[1] (analytic) = 0.77273285112438477048464812663047 y[1] (numeric) = 0.7727328511243847704846481266303 absolute error = 1.7e-31 relative error = 2.1999841180899341374080037934796e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.707 y[1] (analytic) = 0.77217540413277773988381247662223 y[1] (numeric) = 0.77217540413277773988381247662205 absolute error = 1.8e-31 relative error = 2.3310765797073807342487771591687e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.708 y[1] (analytic) = 0.77161697066194195573787682116274 y[1] (numeric) = 0.77161697066194195573787682116258 absolute error = 1.6e-31 relative error = 2.0735676648317086190917710553932e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.709 y[1] (analytic) = 0.77105755093266993460596485202307 y[1] (numeric) = 0.77105755093266993460596485202291 absolute error = 1.6e-31 relative error = 2.0750720851700922376309614566740e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.71 y[1] (analytic) = 0.77049714516695509291323870920928 y[1] (numeric) = 0.77049714516695509291323870920911 absolute error = 1.7e-31 relative error = 2.2063676817798405712297345630467e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=515.0MB, alloc=4.6MB, time=24.70 x[1] = 3.711 y[1] (analytic) = 0.76993575358799186238373916494625 y[1] (numeric) = 0.76993575358799186238373916494609 absolute error = 1.6e-31 relative error = 2.0780954677631352647403899702388e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.712 y[1] (analytic) = 0.76937337642017580405723168855471 y[1] (numeric) = 0.76937337642017580405723168855455 absolute error = 1.6e-31 relative error = 2.0796144616345501426002761661361e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.713 y[1] (analytic) = 0.7688100138891037208896071641535 y[1] (numeric) = 0.76881001388910372088960716415332 absolute error = 1.8e-31 relative error = 2.3412806382353382185959725856486e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.714 y[1] (analytic) = 0.76824566622157376893638766488107 y[1] (numeric) = 0.76824566622157376893638766488091 absolute error = 1.6e-31 relative error = 2.0826671341593166809279141136366e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.715 y[1] (analytic) = 0.76768033364558556711888931987795 y[1] (numeric) = 0.76768033364558556711888931987779 absolute error = 1.6e-31 relative error = 2.0842008449035909007105526397393e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.716 y[1] (analytic) = 0.76711401639034030557259594360394 y[1] (numeric) = 0.76711401639034030557259594360377 absolute error = 1.7e-31 relative error = 2.2160982118399561960441458555256e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.717 y[1] (analytic) = 0.76654671468624085257729873118054 y[1] (numeric) = 0.76654671468624085257729873118037 absolute error = 1.7e-31 relative error = 2.2177382896955414843589183925984e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.718 y[1] (analytic) = 0.76597842876489186006855895834476 y[1] (numeric) = 0.76597842876489186006855895834458 absolute error = 1.8e-31 relative error = 2.3499356279555086458541021155190e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.719 y[1] (analytic) = 0.76540915885909986773005226027661 y[1] (numeric) = 0.76540915885909986773005226027644 absolute error = 1.7e-31 relative error = 2.2210343060618432284793253980719e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.72 y[1] (analytic) = 0.76483890520287340566635470001596 y[1] (numeric) = 0.76483890520287340566635470001579 absolute error = 1.7e-31 relative error = 2.2226902795289620541079268941260e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.721 y[1] (analytic) = 0.76426766803142309565573247441252 y[1] (numeric) = 0.76426766803142309565573247441235 absolute error = 1.7e-31 relative error = 2.2243515866356183306725578569726e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.722 y[1] (analytic) = 0.76369544758116175098249874355567 y[1] (numeric) = 0.7636954475811617509824987435555 absolute error = 1.7e-31 relative error = 2.2260182450797344336799123513231e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.723 y[1] (analytic) = 0.76312224408970447484850270840424 y[1] (numeric) = 0.76312224408970447484850270840407 absolute error = 1.7e-31 relative error = 2.2276902726480689691008235846725e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.724 y[1] (analytic) = 0.76254805779586875736331770088083 y[1] (numeric) = 0.76254805779586875736331770088062 absolute error = 2.1e-31 relative error = 2.7539247900912785349055300428748e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.725 y[1] (analytic) = 0.76197288893967457111269669100672 y[1] (numeric) = 0.76197288893967457111269669100652 absolute error = 2.0e-31 relative error = 2.6247653020609504816323446092328e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.726 y[1] (analytic) = 0.76139673776234446530486525673262 y[1] (numeric) = 0.76139673776234446530486525673244 absolute error = 1.8e-31 relative error = 2.3640763227985300648277700195305e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.727 y[1] (analytic) = 0.76081960450630365849422370396172 y[1] (numeric) = 0.76081960450630365849422370396151 absolute error = 2.1e-31 relative error = 2.7601812408115999856254506317972e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.728 y[1] (analytic) = 0.76024148941518012988203166686738 y[1] (numeric) = 0.76024148941518012988203166686721 absolute error = 1.7e-31 relative error = 2.2361315761755309854841806158442e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.729 y[1] (analytic) = 0.75966239273380470919365016197415 y[1] (numeric) = 0.75966239273380470919365016197396 absolute error = 1.9e-31 relative error = 2.5011110437657060399384352522257e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.73 y[1] (analytic) = 0.75908231470821116513191771359289 y[1] (numeric) = 0.75908231470821116513191771359269 absolute error = 2.0e-31 relative error = 2.6347603695243429013098611782319e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.731 y[1] (analytic) = 0.75850125558563629240623881308506 y[1] (numeric) = 0.75850125558563629240623881308489 absolute error = 1.7e-31 relative error = 2.2412619458189764811125884263485e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.732 y[1] (analytic) = 0.75791921561451999733696462006527 y[1] (numeric) = 0.7579192156145199973369646200651 absolute error = 1.7e-31 relative error = 2.2429831108341039020938001299157e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.733 y[1] (analytic) = 0.75733619504450538203464746004132 y[1] (numeric) = 0.75733619504450538203464746004113 absolute error = 1.9e-31 relative error = 2.5087933370045058972661889115509e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.734 y[1] (analytic) = 0.75675219412643882715375232013242 y[1] (numeric) = 0.75675219412643882715375232013223 absolute error = 1.9e-31 relative error = 2.5107294233791759795116235088903e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.735 y[1] (analytic) = 0.75616721311237007322041019239561 y[1] (numeric) = 0.75616721311237007322041019239541 absolute error = 2.0e-31 relative error = 2.6449176390074326209152635439127e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.736 y[1] (analytic) = 0.75558125225555230053379976292816 y[1] (numeric) = 0.75558125225555230053379976292796 absolute error = 2.0e-31 relative error = 2.6469687992252632466280336475501e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.737 y[1] (analytic) = 0.75499431181044220764074559429784 y[1] (numeric) = 0.75499431181044220764074559429765 absolute error = 1.9e-31 relative error = 2.5165752513338622992815113269444e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=518.8MB, alloc=4.6MB, time=24.89 x[1] = 3.738 y[1] (analytic) = 0.75440639203270008838312259897931 y[1] (numeric) = 0.75440639203270008838312259897913 absolute error = 1.8e-31 relative error = 2.3859819044613532129822974365540e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.739 y[1] (analytic) = 0.75381749317918990751765825234457 y[1] (numeric) = 0.7538174931791899075176582523444 absolute error = 1.7e-31 relative error = 2.2551877813691080130207546627755e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.74 y[1] (analytic) = 0.75322761550797937490772564536437 y[1] (numeric) = 0.75322761550797937490772564536418 absolute error = 1.9e-31 relative error = 2.5224778816940125893266825622792e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.741 y[1] (analytic) = 0.75263675927834001828672212952476 y[1] (numeric) = 0.75263675927834001828672212952459 absolute error = 1.7e-31 relative error = 2.2587257120287772763557256312749e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.742 y[1] (analytic) = 0.75204492475074725459262995954726 y[1] (numeric) = 0.75204492475074725459262995954709 absolute error = 1.7e-31 relative error = 2.2605032545940478784693103229670e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.743 y[1] (analytic) = 0.75145211218688045987335699331791 y[1] (numeric) = 0.75145211218688045987335699331773 absolute error = 1.8e-31 relative error = 2.3953622204369472936972432947889e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.744 y[1] (analytic) = 0.75085832184962303776245716298267 y[1] (numeric) = 0.75085832184962303776245716298249 absolute error = 1.8e-31 relative error = 2.3972565098113038582658183281929e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.745 y[1] (analytic) = 0.75026355400306248652483208644689 y[1] (numeric) = 0.7502635540030624865248320864467 absolute error = 1.9e-31 relative error = 2.5324434191991210946570956543203e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.746 y[1] (analytic) = 0.74966780891249046467201684452693 y[1] (numeric) = 0.74966780891249046467201684452673 absolute error = 2.0e-31 relative error = 2.6678483139102777804826774262768e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.747 y[1] (analytic) = 0.74907108684440285514665460573917 y[1] (numeric) = 0.74907108684440285514665460573899 absolute error = 1.8e-31 relative error = 2.4029762082832817136344717273086e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.748 y[1] (analytic) = 0.74847338806649982807576643817369 y[1] (numeric) = 0.74847338806649982807576643817349 absolute error = 2.0e-31 relative error = 2.6721056912477767759082248203729e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.749 y[1] (analytic) = 0.74787471284768590209242430608441 y[1] (numeric) = 0.74787471284768590209242430608421 absolute error = 2.0e-31 relative error = 2.6742447172529620903126921826038e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.75 y[1] (analytic) = 0.74727506145807000422543690773517 y[1] (numeric) = 0.747275061458070004225436907735 absolute error = 1.7e-31 relative error = 2.2749320667586441220300351620452e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.751 y[1] (analytic) = 0.74667443416896552835665967066569 y[1] (numeric) = 0.74667443416896552835665967066551 absolute error = 1.8e-31 relative error = 2.4106892075438016461451047256453e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.752 y[1] (analytic) = 0.74607283125289039224554188088511 y[1] (numeric) = 0.74607283125289039224554188088493 absolute error = 1.8e-31 relative error = 2.4126330896907681009007658522466e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.753 y[1] (analytic) = 0.74547025298356709312052558356023 y[1] (numeric) = 0.74547025298356709312052558356003 absolute error = 2.0e-31 relative error = 2.6828702983056352186621244735362e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.754 y[1] (analytic) = 0.74486669963592276183691255453692 y[1] (numeric) = 0.74486669963592276183691255453672 absolute error = 2.0e-31 relative error = 2.6850441843856940725058634271311e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.755 y[1] (analytic) = 0.74426217148608921560081730451874 y[1] (numeric) = 0.74426217148608921560081730451854 absolute error = 2.0e-31 relative error = 2.6872251158574185430285049617930e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.756 y[1] (analytic) = 0.74365666881140300925882574092006 y[1] (numeric) = 0.74365666881140300925882574091986 absolute error = 2.0e-31 relative error = 2.6894131174761443856773118007893e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.757 y[1] (analytic) = 0.74305019189040548515298077631401 y[1] (numeric) = 0.74305019189040548515298077631383 absolute error = 1.8e-31 relative error = 2.4224473927132596000282526502827e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.758 y[1] (analytic) = 0.74244274100284282154071783700373 y[1] (numeric) = 0.74244274100284282154071783700352 absolute error = 2.1e-31 relative error = 2.8285009523609297118371144967691e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.759 y[1] (analytic) = 0.74183431642966607957937489055761 y[1] (numeric) = 0.74183431642966607957937489055742 absolute error = 1.9e-31 relative error = 2.5612188030669791203636258359036e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.76 y[1] (analytic) = 0.74122491845303124887490327716559 y[1] (numeric) = 0.74122491845303124887490327716539 absolute error = 2.0e-31 relative error = 2.6982363250470414270453726978550e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.761 y[1] (analytic) = 0.74061454735629929159440729638695 y[1] (numeric) = 0.74061454735629929159440729638674 absolute error = 2.1e-31 relative error = 2.8354830559245272235331151057202e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.762 y[1] (analytic) = 0.74000320342403618514214216827618 y[1] (numeric) = 0.74000320342403618514214216827597 absolute error = 2.1e-31 relative error = 2.8378255530289363874479337116623e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.763 y[1] (analytic) = 0.73939088694201296339860165598261 y[1] (numeric) = 0.73939088694201296339860165598242 absolute error = 1.9e-31 relative error = 2.5696827396102439210557389307812e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.764 y[1] (analytic) = 0.73877759819720575652232830572573 y[1] (numeric) = 0.73877759819720575652232830572552 absolute error = 2.1e-31 relative error = 2.8425334026430997030472754923814e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=522.6MB, alloc=4.6MB, time=25.08 TOP MAIN SOLVE Loop x[1] = 3.765 y[1] (analytic) = 0.73816333747779582931408092954576 y[1] (numeric) = 0.73816333747779582931408092954555 absolute error = 2.1e-31 relative error = 2.8448988094903434820753225866848e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.766 y[1] (analytic) = 0.73754810507316961814299562641911 y[1] (numeric) = 0.73754810507316961814299562641892 absolute error = 1.9e-31 relative error = 2.5761031543990035956985590831917e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.767 y[1] (analytic) = 0.73693190127391876643437830820565 y[1] (numeric) = 0.73693190127391876643437830820544 absolute error = 2.1e-31 relative error = 2.8496527241794986983829677156799e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.768 y[1] (analytic) = 0.7363147263718401587187683684604 y[1] (numeric) = 0.7363147263718401587187683684602 absolute error = 2.0e-31 relative error = 2.7162297973516241763119701953613e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.769 y[1] (analytic) = 0.73569658065993595324191480439362 y[1] (numeric) = 0.73569658065993595324191480439344 absolute error = 1.8e-31 relative error = 2.4466608209397419774242875352761e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.77 y[1] (analytic) = 0.73507746443241361313530777519592 y[1] (numeric) = 0.73507746443241361313530777519574 absolute error = 1.8e-31 relative error = 2.4487215118067331792360557096369e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.771 y[1] (analytic) = 0.73445737798468593614691025356131 y[1] (numeric) = 0.73445737798468593614691025356112 absolute error = 1.9e-31 relative error = 2.5869438539966802857339711279253e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.772 y[1] (analytic) = 0.7338363216133710829317361015359 y[1] (numeric) = 0.7338363216133710829317361015357 absolute error = 2.0e-31 relative error = 2.7254033918666126776586042690290e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.773 y[1] (analytic) = 0.73321429561629260390192257679206 y[1] (numeric) = 0.73321429561629260390192257679186 absolute error = 2.0e-31 relative error = 2.7277155013991224911116830643071e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.774 y[1] (analytic) = 0.73259130029247946463594695107644 y[1] (numeric) = 0.73259130029247946463594695107625 absolute error = 1.9e-31 relative error = 2.5935333920037608172405111786470e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.775 y[1] (analytic) = 0.73196733594216606984663859890199 y[1] (numeric) = 0.73196733594216606984663859890179 absolute error = 2.0e-31 relative error = 2.7323623634457142689782442944935e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.776 y[1] (analytic) = 0.73134240286679228590763959154801 y[1] (numeric) = 0.7313424028667922859076395915478 absolute error = 2.1e-31 relative error = 2.8714320293315426656573096058494e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.777 y[1] (analytic) = 0.73071650136900346193796850909631 y[1] (numeric) = 0.73071650136900346193796850909613 absolute error = 1.8e-31 relative error = 2.4633356392358527308072815644654e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.778 y[1] (analytic) = 0.73008963175265044944434386156318 y[1] (numeric) = 0.73008963175265044944434386156299 absolute error = 1.9e-31 relative error = 2.6024201924890606650460327180352e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.779 y[1] (analytic) = 0.72946179432278962052092518918456 y[1] (numeric) = 0.72946179432278962052092518918436 absolute error = 2.0e-31 relative error = 2.7417474301813706605825795101585e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.78 y[1] (analytic) = 0.72883298938568288460613159157497 y[1] (numeric) = 0.7288329893856828846061315915748 absolute error = 1.7e-31 relative error = 2.3324959555314478658134613450503e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.781 y[1] (analytic) = 0.72820321724879770379619911580447 y[1] (numeric) = 0.72820321724879770379619911580428 absolute error = 1.9e-31 relative error = 2.6091617765413504636628107901502e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.782 y[1] (analytic) = 0.72757247822080710671514011442248 y[1] (numeric) = 0.7275724782208071067151401144223 absolute error = 1.8e-31 relative error = 2.4739803303193768706462969878386e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.783 y[1] (analytic) = 0.72694077261158970094076936610232 y[1] (numeric) = 0.72694077261158970094076936610212 absolute error = 2.0e-31 relative error = 2.7512557767462247973734677891570e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.784 y[1] (analytic) = 0.7263081007322296839864634338779 y[1] (numeric) = 0.7263081007322296839864634338777 absolute error = 2.0e-31 relative error = 2.7536523384273065637362260655233e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.785 y[1] (analytic) = 0.72567446289501685283832141890075 y[1] (numeric) = 0.72567446289501685283832141890056 absolute error = 1.9e-31 relative error = 2.6182539101901296140279511976924e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.786 y[1] (analytic) = 0.72503985941344661204739695125121 y[1] (numeric) = 0.725039859413446612047396951251 absolute error = 2.1e-31 relative error = 2.8963924848199226244079656694143e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.787 y[1] (analytic) = 0.72440429060221998037667294359625 y[1] (numeric) = 0.72440429060221998037667294359604 absolute error = 2.1e-31 relative error = 2.8989336855724642557835685963378e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.788 y[1] (analytic) = 0.72376775677724359600245231839363 y[1] (numeric) = 0.72376775677724359600245231839344 absolute error = 1.9e-31 relative error = 2.6251514829290320324204506604943e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.789 y[1] (analytic) = 0.72313025825562972026983960489507 y[1] (numeric) = 0.72313025825562972026983960489487 absolute error = 2.0e-31 relative error = 2.7657534409146397820399935095548e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.79 y[1] (analytic) = 0.72249179535569624000198998840034 y[1] (numeric) = 0.72249179535569624000198998840015 absolute error = 1.9e-31 relative error = 2.6297876490965470704240808203920e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=526.4MB, alloc=4.6MB, time=25.26 x[1] = 3.791 y[1] (analytic) = 0.72185236839696666836280408105653 y[1] (numeric) = 0.72185236839696666836280408105634 absolute error = 1.9e-31 relative error = 2.6321171519037494152380142824390e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.792 y[1] (analytic) = 0.72121197770017014427274837097877 y[1] (numeric) = 0.72121197770017014427274837097855 absolute error = 2.2e-31 relative error = 3.0504207750617908080475444237299e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.793 y[1] (analytic) = 0.72057062358724143037748299459172 y[1] (numeric) = 0.7205706235872414303774829945915 absolute error = 2.2e-31 relative error = 3.0531358453771881552600213019200e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.794 y[1] (analytic) = 0.7199283063813209095689801658507 y[1] (numeric) = 0.71992830638132090956898016585051 absolute error = 1.9e-31 relative error = 2.6391516810197990471887727375410e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.795 y[1] (analytic) = 0.71928502640675458005881828539573 y[1] (numeric) = 0.71928502640675458005881828539554 absolute error = 1.9e-31 relative error = 2.6415119601357486231537894151240e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.796 y[1] (analytic) = 0.71864078398909404900333844272031 y[1] (numeric) = 0.71864078398909404900333844272013 absolute error = 1.8e-31 relative error = 2.5047284263612242267032825781498e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.797 y[1] (analytic) = 0.71799557945509652468035171509728 y[1] (numeric) = 0.71799557945509652468035171509707 absolute error = 2.1e-31 relative error = 2.9248090936628588156258600610412e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.798 y[1] (analytic) = 0.71734941313272480721708735829218 y[1] (numeric) = 0.71734941313272480721708735829197 absolute error = 2.1e-31 relative error = 2.9274436718768955109067005011668e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.799 y[1] (analytic) = 0.71670228535114727786907367601318 y[1] (numeric) = 0.71670228535114727786907367601299 absolute error = 1.9e-31 relative error = 2.6510310331563930609774665031043e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.8 y[1] (analytic) = 0.71605419644073788684964504758801 y[1] (numeric) = 0.71605419644073788684964504758779 absolute error = 2.2e-31 relative error = 3.0723931385856719992300726336743e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.801 y[1] (analytic) = 0.71540514673307613970977028652532 y[1] (numeric) = 0.7154051467330761397097702865251 absolute error = 2.2e-31 relative error = 3.0751805603389642180686575496484e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.802 y[1] (analytic) = 0.71475513656094708226789919640715 y[1] (numeric) = 0.71475513656094708226789919640694 absolute error = 2.1e-31 relative error = 2.9380691268679441791125968982353e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.803 y[1] (analytic) = 0.71410416625834128408952588496565 y[1] (numeric) = 0.71410416625834128408952588496542 absolute error = 2.3e-31 relative error = 3.2208186265754533914748709225514e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.804 y[1] (analytic) = 0.71345223616045482051616909222468 y[1] (numeric) = 0.71345223616045482051616909222448 absolute error = 2.0e-31 relative error = 2.8032710511404181045009599557702e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.805 y[1] (analytic) = 0.71279934660368925324347148422917 y[1] (numeric) = 0.71279934660368925324347148422897 absolute error = 2.0e-31 relative error = 2.8058387111737688431182749968265e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.806 y[1] (analytic) = 0.71214549792565160944812156014004 y[1] (numeric) = 0.71214549792565160944812156013984 absolute error = 2.0e-31 relative error = 2.8084148616057123834578550446943e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.807 y[1] (analytic) = 0.71149069046515435946330351734261 y[1] (numeric) = 0.71149069046515435946330351734241 absolute error = 2.0e-31 relative error = 2.8109995349235719611186785854597e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.808 y[1] (analytic) = 0.71083492456221539300238211669366 y[1] (numeric) = 0.71083492456221539300238211669345 absolute error = 2.1e-31 relative error = 2.9542724019832522754367291342326e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.809 y[1] (analytic) = 0.7101782005580579939305312881197 y[1] (numeric) = 0.71017820055805799393053128811948 absolute error = 2.2e-31 relative error = 3.0978140391682539843266491480165e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.81 y[1] (analytic) = 0.70952051879511081358401691547202 y[1] (numeric) = 0.70952051879511081358401691547181 absolute error = 2.1e-31 relative error = 2.9597452707444811761975136469941e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.811 y[1] (analytic) = 0.70886187961700784263684593884159 y[1] (numeric) = 0.70886187961700784263684593884137 absolute error = 2.2e-31 relative error = 3.1035665243963205338374419450057e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.812 y[1] (analytic) = 0.7082022833685883815144956124363 y[1] (numeric) = 0.7082022833685883815144956124361 absolute error = 2.0e-31 relative error = 2.8240518944487605992540779966365e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.813 y[1] (analytic) = 0.7075417303958970093544384566243 y[1] (numeric) = 0.70754173039589700935443845662409 absolute error = 2.1e-31 relative error = 2.9680228172901810935435319036401e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.814 y[1] (analytic) = 0.70688022104618355151318014384462 y[1] (numeric) = 0.70688022104618355151318014384443 absolute error = 1.9e-31 relative error = 2.6878669729759842257532737656097e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.815 y[1] (analytic) = 0.70621775566790304561952925978338 y[1] (numeric) = 0.70621775566790304561952925978316 absolute error = 2.2e-31 relative error = 3.1151864737801125751780355343907e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.816 y[1] (analytic) = 0.70555433461071570617381958350175 y[1] (numeric) = 0.70555433461071570617381958350155 absolute error = 2.0e-31 relative error = 2.8346505745776261826361364138700e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.817 y[1] (analytic) = 0.70488995822548688769280723308706 y[1] (numeric) = 0.70488995822548688769280723308685 absolute error = 2.1e-31 relative error = 2.9791884186953221932804664979691e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=530.2MB, alloc=4.6MB, time=25.45 TOP MAIN SOLVE Loop x[1] = 3.818 y[1] (analytic) = 0.70422462686428704639996672686892 y[1] (numeric) = 0.70422462686428704639996672686871 absolute error = 2.1e-31 relative error = 2.9820030710239510615879529522460e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.819 y[1] (analytic) = 0.703558340880391700460911714307 y[1] (numeric) = 0.7035583408803917004609117143068 absolute error = 2.0e-31 relative error = 2.8426924730894628293786316377648e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.82 y[1] (analytic) = 0.70289110062828138876366783530422 y[1] (numeric) = 0.702891100628281388763667835304 absolute error = 2.2e-31 relative error = 3.1299300816776925779119397135400e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.821 y[1] (analytic) = 0.70222290646364162824352687193345 y[1] (numeric) = 0.70222290646364162824352687193325 absolute error = 2.0e-31 relative error = 2.8480984906514897684018470151785e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.822 y[1] (analytic) = 0.70155375874336286975221306238306 y[1] (numeric) = 0.70155375874336286975221306238284 absolute error = 2.2e-31 relative error = 3.1358965333471864229184543729805e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.823 y[1] (analytic) = 0.70088365782554045247109415332274 y[1] (numeric) = 0.70088365782554045247109415332254 absolute error = 2.0e-31 relative error = 2.8535406378355413282187468661214e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.824 y[1] (analytic) = 0.70021260406947455686817147386962 y[1] (numeric) = 0.70021260406947455686817147386944 absolute error = 1.8e-31 relative error = 2.5706478140193622996493092651212e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.825 y[1] (analytic) = 0.6995405978356701561985850218863 y[1] (numeric) = 0.69954059783567015619858502188607 absolute error = 2.3e-31 relative error = 3.2878720793561369618173718325634e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.826 y[1] (analytic) = 0.69886763948583696654837126147216 y[1] (numeric) = 0.69886763948583696654837126147194 absolute error = 2.2e-31 relative error = 3.1479494480794091959629000639232e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.827 y[1] (analytic) = 0.69819372938288939542121303921155 y[1] (numeric) = 0.69819372938288939542121303921135 absolute error = 2.0e-31 relative error = 2.8645344634758243884435013816856e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.828 y[1] (analytic) = 0.6975188678909464888679227360136 y[1] (numeric) = 0.69751886789094648886792273601339 absolute error = 2.1e-31 relative error = 3.0106712472877855834304448756396e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.829 y[1] (analytic) = 0.69684305537533187715840148122205 y[1] (numeric) = 0.69684305537533187715840148122186 absolute error = 1.9e-31 relative error = 2.7265823851493026864634255542189e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.83 y[1] (analytic) = 0.69616629220257371899581896608258 y[1] (numeric) = 0.69616629220257371899581896608238 absolute error = 2.0e-31 relative error = 2.8728768146361654916815333538918e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.831 y[1] (analytic) = 0.69548857874040464427276010462851 y[1] (numeric) = 0.6954885787404046442727601046283 absolute error = 2.1e-31 relative error = 3.0194600805714134001906255566957e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.832 y[1] (analytic) = 0.69480991535776169536908650158516 y[1] (numeric) = 0.69480991535776169536908650158498 absolute error = 1.8e-31 relative error = 2.5906366046505963522915310800572e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.833 y[1] (analytic) = 0.69413030242478626699126239899128 y[1] (numeric) = 0.69413030242478626699126239899109 absolute error = 1.9e-31 relative error = 2.7372382294257754369819345447027e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.834 y[1] (analytic) = 0.69344974031282404455289648589432 y[1] (numeric) = 0.69344974031282404455289648589413 absolute error = 1.9e-31 relative error = 2.7399245966158783272694824948197e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.835 y[1] (analytic) = 0.69276822939442494109625266869349 y[1] (numeric) = 0.69276822939442494109625266869328 absolute error = 2.1e-31 relative error = 3.0313168400284318378112385961345e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.836 y[1] (analytic) = 0.69208577004334303275448461347414 y[1] (numeric) = 0.69208577004334303275448461347396 absolute error = 1.8e-31 relative error = 2.6008337086417366728655228895652e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.837 y[1] (analytic) = 0.69140236263453649275435058600355 y[1] (numeric) = 0.69140236263453649275435058600336 absolute error = 1.9e-31 relative error = 2.7480380494509643780272165523586e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.838 y[1] (analytic) = 0.69071800754416752395916682993258 y[1] (numeric) = 0.6907180075441675239591668299324 absolute error = 1.8e-31 relative error = 2.6059838897205820193033890516172e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.839 y[1] (analytic) = 0.69003270514960228995175943917553 y[1] (numeric) = 0.69003270514960228995175943917535 absolute error = 1.8e-31 relative error = 2.6085720090756446883749107921799e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.84 y[1] (analytic) = 0.68934645582941084465717639641198 y[1] (numeric) = 0.68934645582941084465717639641178 absolute error = 2.0e-31 relative error = 2.9012987346016472456237563547009e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.841 y[1] (analytic) = 0.68865925996336706050492316617448 y[1] (numeric) = 0.68865925996336706050492316617429 absolute error = 1.9e-31 relative error = 2.7589841747006635768459483168144e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.842 y[1] (analytic) = 0.68797111793244855513048694804824 y[1] (numeric) = 0.68797111793244855513048694804805 absolute error = 1.9e-31 relative error = 2.7617438442910909917607132332950e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.843 y[1] (analytic) = 0.68728203011883661661591641311249 y[1] (numeric) = 0.68728203011883661661591641311228 absolute error = 2.1e-31 relative error = 3.0555141964600660821450332748603e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.844 y[1] (analytic) = 0.68659199690591612726922546489783 y[1] (numeric) = 0.68659199690591612726922546489764 absolute error = 1.9e-31 relative error = 2.7672912130671943650680283006032e-29 % Correct digits = 30 h = 0.001 memory used=534.0MB, alloc=4.6MB, time=25.64 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.845 y[1] (analytic) = 0.68590101867827548594239128481505 y[1] (numeric) = 0.68590101867827548594239128481486 absolute error = 1.9e-31 relative error = 2.7700789884541669072248588553088e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.846 y[1] (analytic) = 0.6852090958217065288877186412274 y[1] (numeric) = 0.68520909582170652888771864122719 absolute error = 2.1e-31 relative error = 3.0647579152195409951524211436949e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.847 y[1] (analytic) = 0.68451622872320444915234416109035 y[1] (numeric) = 0.68451622872320444915234416109015 absolute error = 2.0e-31 relative error = 2.9217714877710128745662689675127e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.848 y[1] (analytic) = 0.68382241777096771451065598336473 y[1] (numeric) = 0.68382241777096771451065598336455 absolute error = 1.8e-31 relative error = 2.6322623435882633794546889058375e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.849 y[1] (analytic) = 0.68312766335439798393440593422153 y[1] (numeric) = 0.68312766335439798393440593422134 absolute error = 1.9e-31 relative error = 2.7813249293262832665879922688386e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.85 y[1] (analytic) = 0.6824319658641000226002930853971 y[1] (numeric) = 0.68243196586410002260029308539689 absolute error = 2.1e-31 relative error = 3.0772298266259635673223614439049e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.851 y[1] (analytic) = 0.68173532569188161543479927892358 y[1] (numeric) = 0.68173532569188161543479927892338 absolute error = 2.0e-31 relative error = 2.9336898421249242627202076427756e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.852 y[1] (analytic) = 0.68103774323075347919605892384895 y[1] (numeric) = 0.68103774323075347919605892384875 absolute error = 2.0e-31 relative error = 2.9366948012488457005749974821182e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.853 y[1] (analytic) = 0.68033921887492917309254709347252 y[1] (numeric) = 0.6803392188749291730925470934723 absolute error = 2.2e-31 relative error = 3.2336809917236877028983889865827e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.854 y[1] (analytic) = 0.6796397530198250079383716750539 y[1] (numeric) = 0.67963975301982500793837167505369 absolute error = 2.1e-31 relative error = 3.0898722310887886784487583757316e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.855 y[1] (analytic) = 0.67893934606205995384495704790247 y[1] (numeric) = 0.67893934606205995384495704790229 absolute error = 1.8e-31 relative error = 2.6511941168828165328810251999213e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.856 y[1] (analytic) = 0.67823799839945554644890849021946 y[1] (numeric) = 0.67823799839945554644890849021927 absolute error = 1.9e-31 relative error = 2.8013765145623330492998485747914e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.857 y[1] (analytic) = 0.67753571043103579167584824004423 y[1] (numeric) = 0.67753571043103579167584824004401 absolute error = 2.2e-31 relative error = 3.2470613225691090912483376418853e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.858 y[1] (analytic) = 0.67683248255702706904001586114766 y[1] (numeric) = 0.67683248255702706904001586114745 absolute error = 2.1e-31 relative error = 3.1026879680276911045528290444554e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.859 y[1] (analytic) = 0.67612831517885803347942729071635 y[1] (numeric) = 0.67612831517885803347942729071615 absolute error = 2.0e-31 relative error = 2.9580184043481963112317344839928e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.86 y[1] (analytic) = 0.67542320869915951572638867217997 y[1] (numeric) = 0.67542320869915951572638867217976 absolute error = 2.1e-31 relative error = 3.1091617417833826970004191050820e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.861 y[1] (analytic) = 0.67471716352176442121316280354979 y[1] (numeric) = 0.6747171635217644212131628035496 absolute error = 1.9e-31 relative error = 2.8159947645065523871340175234835e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.862 y[1] (analytic) = 0.67401018005170762751258775915525 y[1] (numeric) = 0.67401018005170762751258775915505 absolute error = 2.0e-31 relative error = 2.9673142323259378974989518818744e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.863 y[1] (analytic) = 0.67330225869522588031344897068534 y[1] (numeric) = 0.67330225869522588031344897068514 absolute error = 2.0e-31 relative error = 2.9704341165819725000628114040526e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.864 y[1] (analytic) = 0.67259339985975768793040778196414 y[1] (numeric) = 0.67259339985975768793040778196396 absolute error = 1.8e-31 relative error = 2.6762082416736733238714711799675e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.865 y[1] (analytic) = 0.6718836039539432143482912209072 y[1] (numeric) = 0.671883603953943214348291220907 absolute error = 2.0e-31 relative error = 2.9767060666911251390824746013302e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.866 y[1] (analytic) = 0.6711728713876241708005494616211 y[1] (numeric) = 0.67117287138762417080054946162088 absolute error = 2.2e-31 relative error = 3.2778440455311973118136521745291e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.867 y[1] (analytic) = 0.67046120257184370588168917961759 y[1] (numeric) = 0.67046120257184370588168917961738 absolute error = 2.1e-31 relative error = 3.1321722896784219743864545097211e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.868 y[1] (analytic) = 0.66974859791884629419349273361417 y[1] (numeric) = 0.66974859791884629419349273361395 absolute error = 2.2e-31 relative error = 3.2848146406520359464438672990899e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.869 y[1] (analytic) = 0.66903505784207762352483483838386 y[1] (numeric) = 0.66903505784207762352483483838368 absolute error = 1.8e-31 relative error = 2.6904419714652397033315392413259e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.87 y[1] (analytic) = 0.66832058275618448056491012459681 y[1] (numeric) = 0.6683205827561844805649101245966 absolute error = 2.1e-31 relative error = 3.1422045859181898685992811269312e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=537.8MB, alloc=4.6MB, time=25.82 x[1] = 3.871 y[1] (analytic) = 0.66760517307701463514968671355958 y[1] (numeric) = 0.66760517307701463514968671355939 absolute error = 1.9e-31 relative error = 2.8459935252491173357258700071674e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.872 y[1] (analytic) = 0.66688882922161672304140266720955 y[1] (numeric) = 0.66688882922161672304140266720934 absolute error = 2.1e-31 relative error = 3.1489506316234004273603852376288e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.873 y[1] (analytic) = 0.66617155160824012724092390664993 y[1] (numeric) = 0.66617155160824012724092390664974 absolute error = 1.9e-31 relative error = 2.8521181899964192094573915449793e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.874 y[1] (analytic) = 0.66545334065633485783278392592486 y[1] (numeric) = 0.66545334065633485783278392592467 absolute error = 1.9e-31 relative error = 2.8551964261326497505738788145306e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.875 y[1] (analytic) = 0.66473419678655143036272736162081 y[1] (numeric) = 0.6647341967865514303627273616206 absolute error = 2.1e-31 relative error = 3.1591574649713976459632286169542e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.876 y[1] (analytic) = 0.66401412042074074274758121324729 y[1] (numeric) = 0.66401412042074074274758121324708 absolute error = 2.1e-31 relative error = 3.1625833478802714815939795880676e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.877 y[1] (analytic) = 0.66329311198195395071727924418841 y[1] (numeric) = 0.66329311198195395071727924418822 absolute error = 1.9e-31 relative error = 2.8644952972942870290278162071668e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.878 y[1] (analytic) = 0.66257117189444234178886682832799 y[1] (numeric) = 0.66257117189444234178886682832777 absolute error = 2.2e-31 relative error = 3.3203980090315390874903296835124e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.879 y[1] (analytic) = 0.66184830058365720777231524323201 y[1] (numeric) = 0.66184830058365720777231524323181 absolute error = 2.0e-31 relative error = 3.0218405006650028579790403752423e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.88 y[1] (analytic) = 0.66112449847624971580797614702272 y[1] (numeric) = 0.66112449847624971580797614702252 absolute error = 2.0e-31 relative error = 3.0251488253870055978966396238305e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.881 y[1] (analytic) = 0.66039976600007077793550871279182 y[1] (numeric) = 0.66039976600007077793550871279161 absolute error = 2.1e-31 relative error = 3.1798921018996468478486515418148e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.882 y[1] (analytic) = 0.65967410358417091919411363158155 y[1] (numeric) = 0.65967410358417091919411363158137 absolute error = 1.8e-31 relative error = 2.7286200719721439548833163336998e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.883 y[1] (analytic) = 0.65894751165880014425390993260284 y[1] (numeric) = 0.65894751165880014425390993260266 absolute error = 1.8e-31 relative error = 2.7316287991873188106590474704233e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.884 y[1] (analytic) = 0.65821999065540780257829230746058 y[1] (numeric) = 0.65821999065540780257829230746038 absolute error = 2.0e-31 relative error = 3.0384978098409694717919100562061e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.885 y[1] (analytic) = 0.6574915410066424521171083637166 y[1] (numeric) = 0.65749154100664245211710836371642 absolute error = 1.8e-31 relative error = 2.7376778068416474216753217773461e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.886 y[1] (analytic) = 0.65676216314635172153049697213541 y[1] (numeric) = 0.65676216314635172153049697213521 absolute error = 2.0e-31 relative error = 3.0452424214248218333289979261332e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.887 y[1] (analytic) = 0.65603185750958217094323061142666 y[1] (numeric) = 0.65603185750958217094323061142647 absolute error = 1.9e-31 relative error = 2.8962008144128093790176534915603e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.888 y[1] (analytic) = 0.65530062453257915122940635422103 y[1] (numeric) = 0.65530062453257915122940635422084 absolute error = 1.9e-31 relative error = 2.8994326098121076130997323658403e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.889 y[1] (analytic) = 0.65456846465278666182733187838556 y[1] (numeric) = 0.65456846465278666182733187838538 absolute error = 1.8e-31 relative error = 2.7499033289891273856439871843116e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.89 y[1] (analytic) = 0.65383537830884720708445462860523 y[1] (numeric) = 0.65383537830884720708445462860504 absolute error = 1.9e-31 relative error = 2.9059302433502023813080368560195e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.891 y[1] (analytic) = 0.65310136594060165113218399442152 y[1] (numeric) = 0.65310136594060165113218399442132 absolute error = 2.0e-31 relative error = 3.0623117701179272420377755136114e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.892 y[1] (analytic) = 0.65236642798908907129045811262849 y[1] (numeric) = 0.6523664279890890712904581126283 absolute error = 1.9e-31 relative error = 2.9124736014646323765667526265010e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.893 y[1] (analytic) = 0.65163056489654661000190864407746 y[1] (numeric) = 0.65163056489654661000190864407726 absolute error = 2.0e-31 relative error = 3.0692237407825116377814076691257e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.894 y[1] (analytic) = 0.65089377710640932529547861753189 y[1] (numeric) = 0.65089377710640932529547861753172 absolute error = 1.7e-31 relative error = 2.6117932906924701449805939663748e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.895 y[1] (analytic) = 0.65015606506331003977935017624383 y[1] (numeric) = 0.65015606506331003977935017624365 absolute error = 1.8e-31 relative error = 2.7685660362558057104533618373554e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.896 y[1] (analytic) = 0.64941742921307918816304080638624 y[1] (numeric) = 0.64941742921307918816304080638607 absolute error = 1.7e-31 relative error = 2.6177307899788689663299860783314e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.897 y[1] (analytic) = 0.64867787000274466330852837037578 y[1] (numeric) = 0.64867787000274466330852837037559 absolute error = 1.9e-31 relative error = 2.9290347148607995304182578419522e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=541.7MB, alloc=4.6MB, time=26.01 TOP MAIN SOLVE Loop x[1] = 3.898 y[1] (analytic) = 0.64793738788053166081026701244902 y[1] (numeric) = 0.64793738788053166081026701244881 absolute error = 2.1e-31 relative error = 3.2410539031700441509884391007507e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.899 y[1] (analytic) = 0.64719598329586252210395774861675 y[1] (numeric) = 0.64719598329586252210395774861655 absolute error = 2.0e-31 relative error = 3.0902540368296903454693276079678e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.9 y[1] (analytic) = 0.64645365669935657610393929830775 y[1] (numeric) = 0.64645365669935657610393929830757 absolute error = 1.8e-31 relative error = 2.7844223346038218239176203979265e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.901 y[1] (analytic) = 0.64571040854282997936906646062755 y[1] (numeric) = 0.64571040854282997936906646062735 absolute error = 2.0e-31 relative error = 3.0973637307680784819077428196030e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.902 y[1] (analytic) = 0.64496623927929555479694508419477 y[1] (numeric) = 0.64496623927929555479694508419459 absolute error = 1.8e-31 relative error = 2.7908437533278850361076028279081e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.903 y[1] (analytic) = 0.64422114936296262884639442597759 y[1] (numeric) = 0.64422114936296262884639442597739 absolute error = 2.0e-31 relative error = 3.1045239697232818083601807036692e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.904 y[1] (analytic) = 0.64347513924923686728800944143014 y[1] (numeric) = 0.64347513924923686728800944142994 absolute error = 2.0e-31 relative error = 3.1081231861318905032992439190984e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.905 y[1] (analytic) = 0.6427282093947201094826972955271 y[1] (numeric) = 0.64272820939472010948269729552691 absolute error = 1.9e-31 relative error = 2.9561484500412658255561420936901e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.906 y[1] (analytic) = 0.64198036025721020118806413200526 y[1] (numeric) = 0.64198036025721020118806413200507 absolute error = 1.9e-31 relative error = 2.9595920959930343064623148795586e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.907 y[1] (analytic) = 0.64123159229570082589252988624768 y[1] (numeric) = 0.64123159229570082589252988624747 absolute error = 2.1e-31 relative error = 3.2749478117285201183864052772604e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.908 y[1] (analytic) = 0.64048190597038133467705067578318 y[1] (numeric) = 0.64048190597038133467705067578299 absolute error = 1.9e-31 relative error = 2.9665162782722924460277075119858e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.909 y[1] (analytic) = 0.63973130174263657460433005132131 y[1] (numeric) = 0.63973130174263657460433005132114 absolute error = 1.7e-31 relative error = 2.6573656711328293447357502116089e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.91 y[1] (analytic) = 0.6389797800750467156354021405968 y[1] (numeric) = 0.6389797800750467156354021405966 absolute error = 2.0e-31 relative error = 3.1299894963266358261405069628892e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.911 y[1] (analytic) = 0.63822734143138707607347146705841 y[1] (numeric) = 0.63822734143138707607347146705823 absolute error = 1.8e-31 relative error = 2.8203116399918599037391199111481e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.912 y[1] (analytic) = 0.63747398627662794653489597560111 y[1] (numeric) = 0.63747398627662794653489597560091 absolute error = 2.0e-31 relative error = 3.1373829255082923553573785817136e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.913 y[1] (analytic) = 0.63671971507693441244720154810407 y[1] (numeric) = 0.63671971507693441244720154810388 absolute error = 1.9e-31 relative error = 2.9840445568273699288614243138236e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.914 y[1] (analytic) = 0.63596452829966617507401804250394 y[1] (numeric) = 0.63596452829966617507401804250377 absolute error = 1.7e-31 relative error = 2.6731050622354220838381666949067e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.915 y[1] (analytic) = 0.63520842641337737106682864049294 y[1] (numeric) = 0.63520842641337737106682864049275 absolute error = 1.9e-31 relative error = 2.9911441992797631346595791560477e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.916 y[1] (analytic) = 0.63445140988781639054342604068975 y[1] (numeric) = 0.63445140988781639054342604068958 absolute error = 1.7e-31 relative error = 2.6794802147269146457654513289336e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.917 y[1] (analytic) = 0.63369347919392569369297078628258 y[1] (numeric) = 0.63369347919392569369297078628241 absolute error = 1.7e-31 relative error = 2.6826850138373578683012665855653e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.918 y[1] (analytic) = 0.63293463480384162590754876868431 y[1] (numeric) = 0.63293463480384162590754876868411 absolute error = 2.0e-31 relative error = 3.1598839596127295195947838360061e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.919 y[1] (analytic) = 0.63217487719089423144012670167301 y[1] (numeric) = 0.63217487719089423144012670167282 absolute error = 1.9e-31 relative error = 3.0054974794992808114324145024668e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.92 y[1] (analytic) = 0.63141420682960706558880611380905 y[1] (numeric) = 0.63141420682960706558880611380885 absolute error = 2.0e-31 relative error = 3.1674928729307454517652508256533e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.921 y[1] (analytic) = 0.63065262419569700540727816062349 y[1] (numeric) = 0.63065262419569700540727816062332 absolute error = 1.7e-31 relative error = 2.6956202745815819907684067751912e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.922 y[1] (analytic) = 0.62989012976607405894138331216141 y[1] (numeric) = 0.62989012976607405894138331216121 absolute error = 2.0e-31 relative error = 3.1751569130679211768220369476400e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.923 y[1] (analytic) = 0.62912672401884117299168172593005 y[1] (numeric) = 0.62912672401884117299168172592984 absolute error = 2.1e-31 relative error = 3.3379602547882052986834770252772e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.924 y[1] (analytic) = 0.6283624074332940394019418701516 y[1] (numeric) = 0.6283624074332940394019418701514 absolute error = 2.0e-31 relative error = 3.1828765953226074250090641555848e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=545.5MB, alloc=4.6MB, time=26.20 TOP MAIN SOLVE Loop x[1] = 3.925 y[1] (analytic) = 0.62759718048992089987345671744315 y[1] (numeric) = 0.62759718048992089987345671744295 absolute error = 2.0e-31 relative error = 3.1867574650968650225950474336064e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.926 y[1] (analytic) = 0.62683104367040234930509858464718 y[1] (numeric) = 0.626831043670402349305098584647 absolute error = 1.8e-31 relative error = 2.8715871975008123465911551604323e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.927 y[1] (analytic) = 0.62606399745761113765902545050872 y[1] (numeric) = 0.62606399745761113765902545050852 absolute error = 2.0e-31 relative error = 3.1945615913418082015411731164361e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.928 y[1] (analytic) = 0.62529604233561197035195333923838 y[1] (numeric) = 0.62529604233561197035195333923819 absolute error = 1.9e-31 relative error = 3.0385607318144877139037872044538e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.929 y[1] (analytic) = 0.62452717878966130717191111471456 y[1] (numeric) = 0.62452717878966130717191111471435 absolute error = 2.1e-31 relative error = 3.3625438112554474908395473681760e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.93 y[1] (analytic) = 0.62375740730620715972039578715595 y[1] (numeric) = 0.62375740730620715972039578715576 absolute error = 1.9e-31 relative error = 3.0460560111108641961000455464444e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.931 y[1] (analytic) = 0.62298672837288888737984819154219 y[1] (numeric) = 0.62298672837288888737984819154197 absolute error = 2.2e-31 relative error = 3.5313753885992726323772312916548e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.932 y[1] (analytic) = 0.62221514247853699180637065486551 y[1] (numeric) = 0.6222151424785369918063706548653 absolute error = 2.1e-31 relative error = 3.3750384017252336106076723748589e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.933 y[1] (analytic) = 0.62144265011317290994761002746707 y[1] (numeric) = 0.62144265011317290994761002746687 absolute error = 2.0e-31 relative error = 3.2183178924648535129883554680385e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.934 y[1] (analytic) = 0.62066925176800880558573121223599 y[1] (numeric) = 0.62066925176800880558573121223579 absolute error = 2.0e-31 relative error = 3.2223281470813890997070514582038e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.935 y[1] (analytic) = 0.61989494793544735940540808433477 y[1] (numeric) = 0.61989494793544735940540808433459 absolute error = 1.8e-31 relative error = 2.9037178089527560597403726115037e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.936 y[1] (analytic) = 0.61911973910908155758676045335218 y[1] (numeric) = 0.61911973910908155758676045335198 absolute error = 2.0e-31 relative error = 3.2303928847075956538334617414237e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.937 y[1] (analytic) = 0.61834362578369447892316747937548 y[1] (numeric) = 0.61834362578369447892316747937529 absolute error = 1.9e-31 relative error = 3.0727251333624120047092330303698e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.938 y[1] (analytic) = 0.61756660845525908046388971441651 y[1] (numeric) = 0.61756660845525908046388971441633 absolute error = 1.8e-31 relative error = 2.9146653581261507085880764198734e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.939 y[1] (analytic) = 0.61678868762093798168143370091468 y[1] (numeric) = 0.61678868762093798168143370091449 absolute error = 1.9e-31 relative error = 3.0804715425774633537091079059066e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.94 y[1] (analytic) = 0.61600986377908324716359481967777 y[1] (numeric) = 0.61600986377908324716359481967758 absolute error = 1.9e-31 relative error = 3.0843661956059004998199705361714e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.941 y[1] (analytic) = 0.61523013742923616783011584060204 y[1] (numeric) = 0.61523013742923616783011584060184 absolute error = 2.0e-31 relative error = 3.2508160415500454913579629205322e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.942 y[1] (analytic) = 0.61444950907212704067390039083627 y[1] (numeric) = 0.61444950907212704067390039083608 absolute error = 1.9e-31 relative error = 3.0921987436675921494530869458823e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.943 y[1] (analytic) = 0.61366797920967494702672231671872 y[1] (numeric) = 0.61366797920967494702672231671855 absolute error = 1.7e-31 relative error = 2.7702276436019691123166707331231e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.944 y[1] (analytic) = 0.6128855483449875293493736778176 y[1] (numeric) = 0.61288554834498752934937367781743 absolute error = 1.7e-31 relative error = 2.7737642119162613009326440419785e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.945 y[1] (analytic) = 0.6121022169823607665461958737442 y[1] (numeric) = 0.612102216982360766546195873744 absolute error = 2.0e-31 relative error = 3.2674281264000632226350791544403e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.946 y[1] (analytic) = 0.61131798562727874780394016708039 y[1] (numeric) = 0.61131798562727874780394016708019 absolute error = 2.0e-31 relative error = 3.2716197576745308010450406603025e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.947 y[1] (analytic) = 0.61053285478641344495490562876713 y[1] (numeric) = 0.61053285478641344495490562876694 absolute error = 1.9e-31 relative error = 3.1120356342898024223537225710871e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.948 y[1] (analytic) = 0.60974682496762448336430429563479 y[1] (numeric) = 0.60974682496762448336430429563459 absolute error = 2.0e-31 relative error = 3.2800498798926805554951059833050e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.949 y[1] (analytic) = 0.60895989667995891134180509341957 y[1] (numeric) = 0.60895989667995891134180509341937 absolute error = 2.0e-31 relative error = 3.2842885236022484327260703764069e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.95 y[1] (analytic) = 0.60817207043365096807720984259931 y[1] (numeric) = 0.60817207043365096807720984259909 absolute error = 2.2e-31 relative error = 3.6173972909201702782447603564945e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=549.3MB, alloc=4.6MB, time=26.38 x[1] = 3.951 y[1] (analytic) = 0.60738334674012185010021642869395 y[1] (numeric) = 0.60738334674012185010021642869375 absolute error = 2.0e-31 relative error = 3.2928133619964563244453348186012e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.952 y[1] (analytic) = 0.60659372611197947626422598331196 y[1] (numeric) = 0.60659372611197947626422598331177 absolute error = 1.9e-31 relative error = 3.1322447269249416469361265699937e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.953 y[1] (analytic) = 0.6058032090630182512541526871771 y[1] (numeric) = 0.60580320906301825125415268717691 absolute error = 1.9e-31 relative error = 3.1363320160332030215395844459785e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.954 y[1] (analytic) = 0.60501179610821882761819657164372 y[1] (numeric) = 0.60501179610821882761819657164353 absolute error = 1.9e-31 relative error = 3.1404346365176421211868131560744e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.955 y[1] (analytic) = 0.60421948776374786632354146079601 y[1] (numeric) = 0.60421948776374786632354146079583 absolute error = 1.8e-31 relative error = 2.9790498923858061549394628288588e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.956 y[1] (analytic) = 0.60342628454695779583594196212874 y[1] (numeric) = 0.60342628454695779583594196212854 absolute error = 2.0e-31 relative error = 3.3144065003757103925724642430452e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.957 y[1] (analytic) = 0.60263218697638656972316518002023 y[1] (numeric) = 0.60263218697638656972316518002005 absolute error = 1.8e-31 relative error = 2.9868965496702400222438777643230e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.958 y[1] (analytic) = 0.60183719557175742278225459273203 y[1] (numeric) = 0.60183719557175742278225459273182 absolute error = 2.1e-31 relative error = 3.4893157409537604678599580902234e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.959 y[1] (analytic) = 0.60104131085397862569058530049882 y[1] (numeric) = 0.60104131085397862569058530049865 absolute error = 1.7e-31 relative error = 2.8284245513583515395330890837850e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.96 y[1] (analytic) = 0.6002445333451432381806816194103 y[1] (numeric) = 0.60024453334514323818068161941012 absolute error = 1.8e-31 relative error = 2.9987778313759204345714095677685e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.961 y[1] (analytic) = 0.59944686356852886073876976322325 y[1] (numeric) = 0.59944686356852886073876976322308 absolute error = 1.7e-31 relative error = 2.8359477767217573067618710912626e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.962 y[1] (analytic) = 0.59864830204859738482704012298594 y[1] (numeric) = 0.59864830204859738482704012298575 absolute error = 1.9e-31 relative error = 3.1738167359668896324902908846726e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.963 y[1] (analytic) = 0.59784884931099474162959542239407 y[1] (numeric) = 0.59784884931099474162959542239389 absolute error = 1.8e-31 relative error = 3.0107944542746100638441622125429e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.964 y[1] (analytic) = 0.59704850588255064932206279513707 y[1] (numeric) = 0.59704850588255064932206279513689 absolute error = 1.8e-31 relative error = 3.0148304237680981244690584420961e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.965 y[1] (analytic) = 0.59624727229127835886484959912401 y[1] (numeric) = 0.59624727229127835886484959912384 absolute error = 1.7e-31 relative error = 2.8511660832714334371219995384323e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.966 y[1] (analytic) = 0.59544514906637439832002455140547 y[1] (numeric) = 0.59544514906637439832002455140529 absolute error = 1.8e-31 relative error = 3.0229484660716475404723689215185e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.967 y[1] (analytic) = 0.59464213673821831569180753682298 y[1] (numeric) = 0.59464213673821831569180753682281 absolute error = 1.7e-31 relative error = 2.8588623223456460064969695591154e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.968 y[1] (analytic) = 0.59383823583837242029065321292422 y[1] (numeric) = 0.59383823583837242029065321292404 absolute error = 1.8e-31 relative error = 3.0311284982496714188678840653574e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.969 y[1] (analytic) = 0.59303344689958152262091530347345 y[1] (numeric) = 0.59303344689958152262091530347327 absolute error = 1.8e-31 relative error = 3.0352419571113910136846615012963e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.97 y[1] (analytic) = 0.59222777045577267279208024296509 y[1] (numeric) = 0.59222777045577267279208024296492 absolute error = 1.7e-31 relative error = 2.8705171976175597178535089868379e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.971 y[1] (analytic) = 0.59142120704205489745356060490747 y[1] (numeric) = 0.59142120704205489745356060490732 absolute error = 1.5e-31 relative error = 2.5362634652587588054706510187427e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.972 y[1] (analytic) = 0.59061375719471893525304051728516 y[1] (numeric) = 0.59061375719471893525304051728499 absolute error = 1.7e-31 relative error = 2.8783616691805715600762659807591e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.973 y[1] (analytic) = 0.58980542145123697081836703952712 y[1] (numeric) = 0.58980542145123697081836703952694 absolute error = 1.8e-31 relative error = 3.0518539412049430318657357378633e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.974 y[1] (analytic) = 0.58899620035026236726298324650494 y[1] (numeric) = 0.58899620035026236726298324650478 absolute error = 1.6e-31 relative error = 2.7164861149333682335241111193119e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.975 y[1] (analytic) = 0.58818609443162939721490053655488 y[1] (numeric) = 0.58818609443162939721490053655469 absolute error = 1.9e-31 relative error = 3.2302701780734728322170729613493e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.976 y[1] (analytic) = 0.58737510423635297236920945226079 y[1] (numeric) = 0.58737510423635297236920945226059 absolute error = 2.0e-31 relative error = 3.4049791786803804511667258964317e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.977 y[1] (analytic) = 0.58656323030662837156413007474923 y[1] (numeric) = 0.58656323030662837156413007474906 absolute error = 1.7e-31 relative error = 2.8982382668468971705435563086256e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=553.1MB, alloc=4.6MB, time=26.57 x[1] = 3.978 y[1] (analytic) = 0.5857504731858309673806048245286 y[1] (numeric) = 0.58575047318583096738060482452842 absolute error = 1.8e-31 relative error = 3.0729808722304608224726413030985e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.979 y[1] (analytic) = 0.58493683341851595126543827445245 y[1] (numeric) = 0.58493683341851595126543827445227 absolute error = 1.8e-31 relative error = 3.0772553499159105782338100158385e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.98 y[1] (analytic) = 0.58412231155041805717799035320031 y[1] (numeric) = 0.58412231155041805717799035320013 absolute error = 1.8e-31 relative error = 3.0815463891839961294707222794426e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.981 y[1] (analytic) = 0.58330690812845128376043109074211 y[1] (numeric) = 0.58330690812845128376043109074195 absolute error = 1.6e-31 relative error = 2.7429814008780100333154874040661e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.982 y[1] (analytic) = 0.58249062370070861503156683058786 y[1] (numeric) = 0.58249062370070861503156683058768 absolute error = 1.8e-31 relative error = 3.0901784968900440226380233154598e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.983 y[1] (analytic) = 0.58167345881646173960424960721569 y[1] (numeric) = 0.5816734588164617396042496072155 absolute error = 1.9e-31 relative error = 3.2664375023504661175761921534905e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.984 y[1] (analytic) = 0.58085541402616076842638316092063 y[1] (numeric) = 0.58085541402616076842638316092045 absolute error = 1.8e-31 relative error = 3.0988778903228591980200168802094e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.985 y[1] (analytic) = 0.58003648988143395104554083642751 y[1] (numeric) = 0.58003648988143395104554083642732 absolute error = 1.9e-31 relative error = 3.2756559856921787592321063322183e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.986 y[1] (analytic) = 0.57921668693508739039721238596568 y[1] (numeric) = 0.57921668693508739039721238596549 absolute error = 1.9e-31 relative error = 3.2802922340753147693301641934343e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.987 y[1] (analytic) = 0.57839600574110475611669847210721 y[1] (numeric) = 0.57839600574110475611669847210702 absolute error = 1.9e-31 relative error = 3.2849466129447253729859780243154e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.988 y[1] (analytic) = 0.57757444685464699637467344052051 y[1] (numeric) = 0.57757444685464699637467344052035 absolute error = 1.6e-31 relative error = 2.7702056569733558744176027230998e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.989 y[1] (analytic) = 0.57675201083205204823643870788894 y[1] (numeric) = 0.57675201083205204823643870788877 absolute error = 1.7e-31 relative error = 2.9475406553806249594698006842576e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.99 y[1] (analytic) = 0.57592869823083454654489088558312 y[1] (numeric) = 0.57592869823083454654489088558293 absolute error = 1.9e-31 relative error = 3.2990194894550511391757141293148e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.991 y[1] (analytic) = 0.57510450960968553132723053525851 y[1] (numeric) = 0.57510450960968553132723053525833 absolute error = 1.8e-31 relative error = 3.1298659111917448711084170756086e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.992 y[1] (analytic) = 0.57427944552847215372543922836972 y[1] (numeric) = 0.57427944552847215372543922836953 absolute error = 1.9e-31 relative error = 3.3084938261224953682988358092710e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.993 y[1] (analytic) = 0.57345350654823738045055435765125 y[1] (numeric) = 0.57345350654823738045055435765109 absolute error = 1.6e-31 relative error = 2.7901128543633942619271276319686e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.994 y[1] (analytic) = 0.57262669323119969676077292490867 y[1] (numeric) = 0.57262669323119969676077292490849 absolute error = 1.8e-31 relative error = 3.1434091726374424401678934641693e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.995 y[1] (analytic) = 0.57179900614075280796341730598896 y[1] (numeric) = 0.57179900614075280796341730598879 absolute error = 1.7e-31 relative error = 2.9730726736896980070980925992080e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.996 y[1] (analytic) = 0.57097044584146533944079777055829 y[1] (numeric) = 0.57097044584146533944079777055813 absolute error = 1.6e-31 relative error = 2.8022466165337272398076929220025e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.997 y[1] (analytic) = 0.57014101289908053520000831129988 y[1] (numeric) = 0.5701410128990805352000083112997 absolute error = 1.8e-31 relative error = 3.1571136951668730844819348904773e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.998 y[1] (analytic) = 0.56931070788051595494669411435912 y[1] (numeric) = 0.56931070788051595494669411435893 absolute error = 1.9e-31 relative error = 3.3373691618650572918712749879865e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.999 y[1] (analytic) = 0.568479531353863169682830780301 y[1] (numeric) = 0.56847953135386316968283078030083 absolute error = 1.7e-31 relative error = 2.9904330872764456122729661099478e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4 y[1] (analytic) = 0.56764748388838745582855718250515 y[1] (numeric) = 0.56764748388838745582855718250498 absolute error = 1.7e-31 relative error = 2.9948164102745482773550526913702e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.001 y[1] (analytic) = 0.56681456605452748786810562780539 y[1] (numeric) = 0.56681456605452748786810562780522 absolute error = 1.7e-31 relative error = 2.9992172075487210046425897189610e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.002 y[1] (analytic) = 0.56598077842389502951987476228119 y[1] (numeric) = 0.56598077842389502951987476228099 absolute error = 2.0e-31 relative error = 3.5336889100182247446816480916835e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.003 y[1] (analytic) = 0.56514612156927462343069244342374 y[1] (numeric) = 0.56514612156927462343069244342353 absolute error = 2.1e-31 relative error = 3.7158531570008937446543431681031e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.004 y[1] (analytic) = 0.56431059606462327939431757843127 y[1] (numeric) = 0.56431059606462327939431757843109 absolute error = 1.8e-31 relative error = 3.1897327687142507742210972053753e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=556.9MB, alloc=4.6MB, time=26.75 TOP MAIN SOLVE Loop x[1] = 4.005 y[1] (analytic) = 0.56347420248507016109423170713047 y[1] (numeric) = 0.56347420248507016109423170713029 absolute error = 1.8e-31 relative error = 3.1944674522125844518165921859481e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.006 y[1] (analytic) = 0.56263694140691627137077288697441 y[1] (numeric) = 0.56263694140691627137077288697421 absolute error = 2.0e-31 relative error = 3.5546901612945082709876090915765e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.007 y[1] (analytic) = 0.56179881340763413601266621672918 y[1] (numeric) = 0.561798813407634136012666216729 absolute error = 1.8e-31 relative error = 3.2039939512900727575514877855613e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.008 y[1] (analytic) = 0.56095981906586748607300711482884 y[1] (numeric) = 0.56095981906586748607300711482863 absolute error = 2.1e-31 relative error = 3.7435836375892362388400472365859e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.009 y[1] (analytic) = 0.56011995896143093870975524794881 y[1] (numeric) = 0.56011995896143093870975524794863 absolute error = 1.8e-31 relative error = 3.2135973217907513130884769533554e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.01 y[1] (analytic) = 0.55927923367530967655079878512338 y[1] (numeric) = 0.55927923367530967655079878512317 absolute error = 2.1e-31 relative error = 3.7548327803981326972800374359870e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.011 y[1] (analytic) = 0.55843764378965912558365043270327 y[1] (numeric) = 0.55843764378965912558365043270309 absolute error = 1.8e-31 relative error = 3.2232784089999262281759510460832e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.012 y[1] (analytic) = 0.55759518988780463156983848562338 y[1] (numeric) = 0.5575951898878046315698384856232 absolute error = 1.8e-31 relative error = 3.2281483639810151429822648360058e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.013 y[1] (analytic) = 0.55675187255424113498405791081418 y[1] (numeric) = 0.55675187255424113498405791081399 absolute error = 1.9e-31 relative error = 3.4126512970369828802756235057579e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.014 y[1] (analytic) = 0.55590769237463284447814825915292 y[1] (numeric) = 0.55590769237463284447814825915274 absolute error = 1.8e-31 relative error = 3.2379476389525447792291097521395e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.015 y[1] (analytic) = 0.55506264993581290886996698310099 y[1] (numeric) = 0.5550626499358129088699669831008 absolute error = 1.9e-31 relative error = 3.4230370215321005462042126740958e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.016 y[1] (analytic) = 0.5542167458257830876572285181149 y[1] (numeric) = 0.5542167458257830876572285181147 absolute error = 2.0e-31 relative error = 3.6086964442404198881747690214452e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.017 y[1] (analytic) = 0.55336998063371342005638126704715 y[1] (numeric) = 0.55336998063371342005638126704696 absolute error = 1.9e-31 relative error = 3.4335075383455752245281879533276e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.018 y[1] (analytic) = 0.55252235494994189256659640806618 y[1] (numeric) = 0.552522354949941892566596408066 absolute error = 1.8e-31 relative error = 3.2577867372679945927061695715161e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.019 y[1] (analytic) = 0.55167386936597410505894422812123 y[1] (numeric) = 0.55167386936597410505894422812107 absolute error = 1.6e-31 relative error = 2.9002642482212228676772549499481e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.02 y[1] (analytic) = 0.55082452447448293539083546565604 y[1] (numeric) = 0.55082452447448293539083546565587 absolute error = 1.7e-31 relative error = 3.0862823357799728210253659435996e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.021 y[1] (analytic) = 0.54997432086930820254580692813101 y[1] (numeric) = 0.54997432086930820254580692813083 absolute error = 1.8e-31 relative error = 3.2728800813006296355374832896691e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.022 y[1] (analytic) = 0.54912325914545632829873243194793 y[1] (numeric) = 0.54912325914545632829873243194776 absolute error = 1.7e-31 relative error = 3.0958440963610501240087053950490e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.023 y[1] (analytic) = 0.54827133989909999740654189457866 y[1] (numeric) = 0.54827133989909999740654189457846 absolute error = 2.0e-31 relative error = 3.6478288293677104083968591626923e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.024 y[1] (analytic) = 0.54741856372757781632453319108015 y[1] (numeric) = 0.54741856372757781632453319107996 absolute error = 1.9e-31 relative error = 3.4708358939495751068627153610826e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.025 y[1] (analytic) = 0.54656493122939397044836316973055 y[1] (numeric) = 0.54656493122939397044836316973035 absolute error = 2.0e-31 relative error = 3.6592175709139991505851348107109e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.026 y[1] (analytic) = 0.54571044300421787988180600423932 y[1] (numeric) = 0.54571044300421787988180600423912 absolute error = 2.0e-31 relative error = 3.6649472731174061344265649640054e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.027 y[1] (analytic) = 0.54485509965288385373036884287256 y[1] (numeric) = 0.54485509965288385373036884287237 absolute error = 1.9e-31 relative error = 3.4871656725071519191881093652207e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.028 y[1] (analytic) = 0.54399890177739074292085649788392 y[1] (numeric) = 0.54399890177739074292085649788373 absolute error = 1.9e-31 relative error = 3.4926541097641721648346630095970e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.029 y[1] (analytic) = 0.54314184998090159154697870185501 y[1] (numeric) = 0.54314184998090159154697870185483 absolute error = 1.8e-31 relative error = 3.3140513846673628757914310983164e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.03 y[1] (analytic) = 0.54228394486774328674109524092231 y[1] (numeric) = 0.54228394486774328674109524092213 absolute error = 1.8e-31 relative error = 3.3192942867578330254745998622052e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=560.7MB, alloc=4.6MB, time=26.93 x[1] = 4.031 y[1] (analytic) = 0.54142518704340620707219605839798 y[1] (numeric) = 0.54142518704340620707219605839781 absolute error = 1.7e-31 relative error = 3.1398613154354611315195989729493e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.032 y[1] (analytic) = 0.5405655771145438694702152059798 y[1] (numeric) = 0.54056557711454386947021520597963 absolute error = 1.7e-31 relative error = 3.1448543377000422933694245648863e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.033 y[1] (analytic) = 0.53970511568897257467677930358548 y[1] (numeric) = 0.53970511568897257467677930358531 absolute error = 1.7e-31 relative error = 3.1498682346744613907610170663192e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.034 y[1] (analytic) = 0.53884380337567105122249295283972 y[1] (numeric) = 0.53884380337567105122249295283955 absolute error = 1.7e-31 relative error = 3.1549031265648502334882618675587e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.035 y[1] (analytic) = 0.53798164078478009793086533338434 y[1] (numeric) = 0.53798164078478009793086533338416 absolute error = 1.8e-31 relative error = 3.3458390836056265345915144695767e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.036 y[1] (analytic) = 0.53711862852760222494898399547165 y[1] (numeric) = 0.53711862852760222494898399547146 absolute error = 1.9e-31 relative error = 3.5373936018723656427195062929363e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.037 y[1] (analytic) = 0.53625476721660129330504364673654 y[1] (numeric) = 0.53625476721660129330504364673639 absolute error = 1.5e-31 relative error = 2.7971779305304108236352283713675e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.038 y[1] (analytic) = 0.5353900574654021529928395156216 y[1] (numeric) = 0.53539005746540215299283951562143 absolute error = 1.7e-31 relative error = 3.1752550804697320877737832165569e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.039 y[1] (analytic) = 0.53452449988879027958333665864853 y[1] (numeric) = 0.53452449988879027958333665864835 absolute error = 1.8e-31 relative error = 3.3674789469416208091460307927789e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.04 y[1] (analytic) = 0.53365809510271140936342836359004 y[1] (numeric) = 0.53365809510271140936342836358986 absolute error = 1.8e-31 relative error = 3.3729461175953115647105129538034e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.041 y[1] (analytic) = 0.53279084372427117300199858559062 y[1] (numeric) = 0.53279084372427117300199858559047 absolute error = 1.5e-31 relative error = 2.8153636979097128215615520654049e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.042 y[1] (analytic) = 0.53192274637173472774340513841708 y[1] (numeric) = 0.53192274637173472774340513841693 absolute error = 1.5e-31 relative error = 2.8199583684502251829938075016689e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.043 y[1] (analytic) = 0.53105380366452638812850214828304 y[1] (numeric) = 0.53105380366452638812850214828287 absolute error = 1.7e-31 relative error = 3.2011822310078248969572480921646e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.044 y[1] (analytic) = 0.53018401622322925524332206308705 y[1] (numeric) = 0.53018401622322925524332206308688 absolute error = 1.7e-31 relative error = 3.2064338946126021077909753648194e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.045 y[1] (analytic) = 0.52931338466958484449553929542709 y[1] (numeric) = 0.52931338466958484449553929542694 absolute error = 1.5e-31 relative error = 2.8338599465727666700223411190770e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.046 y[1] (analytic) = 0.52844190962649271191883936340444 y[1] (numeric) = 0.52844190962649271191883936340426 absolute error = 1.8e-31 relative error = 3.4062400563048746190169769681895e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.047 y[1] (analytic) = 0.5275695917180100790053191790043 y[1] (numeric) = 0.52756959171801007900531917900415 absolute error = 1.5e-31 relative error = 2.8432267961375630224207290353961e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.048 y[1] (analytic) = 0.52669643156935145606604591973875 y[1] (numeric) = 0.52669643156935145606604591973859 absolute error = 1.6e-31 relative error = 3.0378030001696032730695181726116e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.049 y[1] (analytic) = 0.52582242980688826411990370525269 y[1] (numeric) = 0.52582242980688826411990370525252 absolute error = 1.7e-31 relative error = 3.2330305890989400151955226315964e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.05 y[1] (analytic) = 0.52494758705814845531085908673153 y[1] (numeric) = 0.52494758705814845531085908673139 absolute error = 1.4e-31 relative error = 2.6669329177141678535179906951975e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.051 y[1] (analytic) = 0.52407190395181613185377814319919 y[1] (numeric) = 0.52407190395181613185377814319903 absolute error = 1.6e-31 relative error = 3.0530161757099387050115363309108e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.052 y[1] (analytic) = 0.52319538111773116350892976516083 y[1] (numeric) = 0.52319538111773116350892976516068 absolute error = 1.5e-31 relative error = 2.8669977873188926618628148867964e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.053 y[1] (analytic) = 0.52231801918688880358531149252349 y[1] (numeric) = 0.52231801918688880358531149252332 absolute error = 1.7e-31 relative error = 3.2547220994719863969062252100071e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.054 y[1] (analytic) = 0.52143981879143930347293606031312 y[1] (numeric) = 0.52143981879143930347293606031296 absolute error = 1.6e-31 relative error = 3.0684269638409667843588601546025e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.055 y[1] (analytic) = 0.52056078056468752570421859240347 y[1] (numeric) = 0.52056078056468752570421859240329 absolute error = 1.8e-31 relative error = 3.4578094762487064863021719147480e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.056 y[1] (analytic) = 0.51968090514109255554460617027099 y[1] (numeric) = 0.51968090514109255554460617027083 absolute error = 1.6e-31 relative error = 3.0788123715371117868136398162101e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.057 y[1] (analytic) = 0.51880019315626731111259329069595 y[1] (numeric) = 0.51880019315626731111259329069579 absolute error = 1.6e-31 relative error = 3.0840389442917295268026442965008e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=564.5MB, alloc=4.6MB, time=27.12 x[1] = 4.058 y[1] (analytic) = 0.51791864524697815202926851333329 y[1] (numeric) = 0.5179186452469781520292685133331 absolute error = 1.9e-31 relative error = 3.6685298307689874376552524566310e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.059 y[1] (analytic) = 0.51703626205114448659753938618317 y[1] (numeric) = 0.51703626205114448659753938618299 absolute error = 1.8e-31 relative error = 3.4813805764013251700502748910986e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.06 y[1] (analytic) = 0.51615304420783837751118452419248 y[1] (numeric) = 0.51615304420783837751118452419231 absolute error = 1.7e-31 relative error = 3.2935967714945108234923154061998e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.061 y[1] (analytic) = 0.51526899235728414609388350351484 y[1] (numeric) = 0.51526899235728414609388350351466 absolute error = 1.8e-31 relative error = 3.4933210162040796425291355923466e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.062 y[1] (analytic) = 0.51438410714085797506837702134769 y[1] (numeric) = 0.5143841071408579750683770213475 absolute error = 1.9e-31 relative error = 3.6937377606025210623545321114527e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.063 y[1] (analytic) = 0.51349838920108750985591155874517 y[1] (numeric) = 0.51349838920108750985591155874502 absolute error = 1.5e-31 relative error = 2.9211386667322056575390799224030e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.064 y[1] (analytic) = 0.51261183918165145840612457137533 y[1] (numeric) = 0.51261183918165145840612457137517 absolute error = 1.6e-31 relative error = 3.1212700872345961104000642329681e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.065 y[1] (analytic) = 0.51172445772737918955752802084568 y[1] (numeric) = 0.51172445772737918955752802084552 absolute error = 1.6e-31 relative error = 3.1266826821328105579809687666798e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.066 y[1] (analytic) = 0.51083624548425032992874984696333 y[1] (numeric) = 0.51083624548425032992874984696316 absolute error = 1.7e-31 relative error = 3.3278766239237285265511265453158e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.067 y[1] (analytic) = 0.50994720309939435934069476911739 y[1] (numeric) = 0.50994720309939435934069476911725 absolute error = 1.4e-31 relative error = 2.7453822503407759451561570217099e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.068 y[1] (analytic) = 0.50905733122109020476978759287629 y[1] (numeric) = 0.50905733122109020476978759287614 absolute error = 1.5e-31 relative error = 2.9466229204516269605358070329306e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.069 y[1] (analytic) = 0.50816663049876583283246398587308 y[1] (numeric) = 0.50816663049876583283246398587291 absolute error = 1.7e-31 relative error = 3.3453593722426225558721151325177e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.07 y[1] (analytic) = 0.50727510158299784080107547511097 y[1] (numeric) = 0.50727510158299784080107547511083 absolute error = 1.4e-31 relative error = 2.7598437132655897380970384401481e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.071 y[1] (analytic) = 0.50638274512551104615137720595237 y[1] (numeric) = 0.50638274512551104615137720595223 absolute error = 1.4e-31 relative error = 2.7647071577310532418141042229320e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.072 y[1] (analytic) = 0.50548956177917807464176879125823 y[1] (numeric) = 0.50548956177917807464176879125808 absolute error = 1.5e-31 relative error = 2.9674203255957072950305419495650e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.073 y[1] (analytic) = 0.50459555219801894692446036741914 y[1] (numeric) = 0.50459555219801894692446036741897 absolute error = 1.7e-31 relative error = 3.3690348489890518635633545776748e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.074 y[1] (analytic) = 0.50370071703720066368873776235978 y[1] (numeric) = 0.50370071703720066368873776235961 absolute error = 1.7e-31 relative error = 3.3750200118822682072839058790578e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.075 y[1] (analytic) = 0.50280505695303678933650246900582 y[1] (numeric) = 0.50280505695303678933650246900566 absolute error = 1.6e-31 relative error = 3.1821477884408864983848643473348e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.076 y[1] (analytic) = 0.50190857260298703419026390617232 y[1] (numeric) = 0.50190857260298703419026390617215 absolute error = 1.7e-31 relative error = 3.3870710579488570045297796212572e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.077 y[1] (analytic) = 0.50101126464565683523376323736437 y[1] (numeric) = 0.50101126464565683523376323736419 absolute error = 1.8e-31 relative error = 3.5927335910761619118961206045458e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.078 y[1] (analytic) = 0.50011313374079693538540980657204 y[1] (numeric) = 0.50011313374079693538540980657187 absolute error = 1.7e-31 relative error = 3.3992308645929124057657441222780e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.079 y[1] (analytic) = 0.49921418054930296130471303878913 y[1] (numeric) = 0.49921418054930296130471303878896 absolute error = 1.7e-31 relative error = 3.4053519836504445268280081334276e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.08 y[1] (analytic) = 0.49831440573321499973189444168865 y[1] (numeric) = 0.49831440573321499973189444168849 absolute error = 1.6e-31 relative error = 3.2108242940433870582244512841207e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.081 y[1] (analytic) = 0.49741380995571717236086613364402 y[1] (numeric) = 0.49741380995571717236086613364385 absolute error = 1.7e-31 relative error = 3.4176775271907798958431221562467e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.082 y[1] (analytic) = 0.49651239388113720924576411209153 y[1] (numeric) = 0.49651239388113720924576411209135 absolute error = 1.8e-31 relative error = 3.6252871472749414340109344911564e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.083 y[1] (analytic) = 0.49561015817494602074122626508536 y[1] (numeric) = 0.49561015817494602074122626508521 absolute error = 1.5e-31 relative error = 3.0265723477574751631188295329988e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.084 y[1] (analytic) = 0.49470710350375726797660691779864 y[1] (numeric) = 0.49470710350375726797660691779847 absolute error = 1.7e-31 relative error = 3.4363767731649089037077707403138e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=568.4MB, alloc=4.6MB, time=27.30 TOP MAIN SOLVE Loop x[1] = 4.085 y[1] (analytic) = 0.4938032305353269318643214946697 y[1] (numeric) = 0.49380323053532693186432149466953 absolute error = 1.7e-31 relative error = 3.4426668253203765616724677709476e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.086 y[1] (analytic) = 0.49289853993855288064251666688347 y[1] (numeric) = 0.49289853993855288064251666688331 absolute error = 1.6e-31 relative error = 3.2461041580676293941702577725244e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.087 y[1] (analytic) = 0.49199303238347443595226314390506 y[1] (numeric) = 0.49199303238347443595226314390488 absolute error = 1.8e-31 relative error = 3.6585883976442676079035815659175e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.088 y[1] (analytic) = 0.4910867085412719374494700568512 y[1] (numeric) = 0.491086708541271937449470056851 absolute error = 2.0e-31 relative error = 4.0726005514195582933092857840438e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.089 y[1] (analytic) = 0.49017956908426630595172167058839 y[1] (numeric) = 0.49017956908426630595172167058823 absolute error = 1.6e-31 relative error = 3.2641099321806811450250576434907e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.09 y[1] (analytic) = 0.48927161468591860512023895058378 y[1] (numeric) = 0.48927161468591860512023895058359 absolute error = 1.9e-31 relative error = 3.8833235834040355842940359262390e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.091 y[1] (analytic) = 0.48836284602082960167717029970305 y[1] (numeric) = 0.48836284602082960167717029970286 absolute error = 1.9e-31 relative error = 3.8905498554633318608466097676362e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.092 y[1] (analytic) = 0.48745326376473932415841756935043 y[1] (numeric) = 0.48745326376473932415841756935025 absolute error = 1.8e-31 relative error = 3.6926617048331798396438347873922e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.093 y[1] (analytic) = 0.48654286859452662020220523856982 y[1] (numeric) = 0.48654286859452662020220523856966 absolute error = 1.6e-31 relative error = 3.2885077621667955364012399353979e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.094 y[1] (analytic) = 0.48563166118820871237360244397962 y[1] (numeric) = 0.48563166118820871237360244397944 absolute error = 1.8e-31 relative error = 3.7065128653183137213581476916235e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.095 y[1] (analytic) = 0.4847196422249407525252093326879 y[1] (numeric) = 0.48471964222494075252520933268774 absolute error = 1.6e-31 relative error = 3.3008771682033430074844337341413e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.096 y[1] (analytic) = 0.48380681238501537469422099963211 y[1] (numeric) = 0.48380681238501537469422099963193 absolute error = 1.8e-31 relative error = 3.7204932917884440230137489743558e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.097 y[1] (analytic) = 0.48289317234986224653608406010117 y[1] (numeric) = 0.48289317234986224653608406010099 absolute error = 1.8e-31 relative error = 3.7275325125033598552088880541232e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.098 y[1] (analytic) = 0.48197872280204761929496269753256 y[1] (numeric) = 0.48197872280204761929496269753238 absolute error = 1.8e-31 relative error = 3.7346046927869757643417514593036e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.099 y[1] (analytic) = 0.48106346442527387631123281602229 y[1] (numeric) = 0.48106346442527387631123281602212 absolute error = 1.7e-31 relative error = 3.5338372703713606605885691777569e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.1 y[1] (analytic) = 0.48014739790437908006622471634729 y[1] (numeric) = 0.48014739790437908006622471634711 absolute error = 1.8e-31 relative error = 3.7488488073790798126000131974821e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.101 y[1] (analytic) = 0.47923052392533651776443650366961 y[1] (numeric) = 0.47923052392533651776443650366945 absolute error = 1.6e-31 relative error = 3.3386854971059353583731709159012e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.102 y[1] (analytic) = 0.47831284317525424545344222447198 y[1] (numeric) = 0.47831284317525424545344222447182 absolute error = 1.6e-31 relative error = 3.3450910274089349426445722341667e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.103 y[1] (analytic) = 0.47739435634237463068172051965902 y[1] (numeric) = 0.47739435634237463068172051965884 absolute error = 1.8e-31 relative error = 3.7704676984264294784706135620060e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.104 y[1] (analytic) = 0.47647506411607389369463137014948 y[1] (numeric) = 0.47647506411607389369463137014932 absolute error = 1.6e-31 relative error = 3.3579931469618831100723577932638e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.105 y[1] (analytic) = 0.47555496718686164716877030067678 y[1] (numeric) = 0.47555496718686164716877030067662 absolute error = 1.6e-31 relative error = 3.3644901439359917984434121087589e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.106 y[1] (analytic) = 0.47463406624638043448493119690678 y[1] (numeric) = 0.47463406624638043448493119690662 absolute error = 1.6e-31 relative error = 3.3710180406002444639116365812072e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.107 y[1] (analytic) = 0.47371236198740526653991068037337 y[1] (numeric) = 0.47371236198740526653991068037319 absolute error = 1.8e-31 relative error = 3.7997741761441664529689142066757e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.108 y[1] (analytic) = 0.47278985510384315709738877511718 y[1] (numeric) = 0.47278985510384315709738877511701 absolute error = 1.7e-31 relative error = 3.5956778294801047756866517194470e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.109 y[1] (analytic) = 0.47186654629073265667812238929375 y[1] (numeric) = 0.4718665462907326566781223892936 absolute error = 1.5e-31 relative error = 3.1788648968469151939389042027309e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.11 y[1] (analytic) = 0.47094243624424338498968992438793 y[1] (numeric) = 0.47094243624424338498968992438778 absolute error = 1.5e-31 relative error = 3.1851026464348176686611877122607e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=572.2MB, alloc=4.6MB, time=27.49 x[1] = 4.111 y[1] (analytic) = 0.47001752566167556189602711403291 y[1] (numeric) = 0.47001752566167556189602711403274 absolute error = 1.7e-31 relative error = 3.6168864078138249287527828179033e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.112 y[1] (analytic) = 0.46909181524145953692699598378032 y[1] (numeric) = 0.46909181524145953692699598378014 absolute error = 1.8e-31 relative error = 3.8372018899401836899662157557304e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.113 y[1] (analytic) = 0.46816530568315531732823061250151 y[1] (numeric) = 0.46816530568315531732823061250134 absolute error = 1.7e-31 relative error = 3.6311960313234427376890345377651e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.114 y[1] (analytic) = 0.46723799768745209465150516541656 y[1] (numeric) = 0.4672379976874520946515051654164 absolute error = 1.6e-31 relative error = 3.4243790272174792001316200871646e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.115 y[1] (analytic) = 0.4663098919561677698858714580454 y[1] (numeric) = 0.46630989195616776988587145804526 absolute error = 1.4e-31 relative error = 3.0022953065117419785415805803953e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.116 y[1] (analytic) = 0.46538098919224847712981509965218 y[1] (numeric) = 0.465380989192248477129815099652 absolute error = 1.8e-31 relative error = 3.8677987322262998239596425835948e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.117 y[1] (analytic) = 0.46445129009976810580468105400673 y[1] (numeric) = 0.46445129009976810580468105400657 absolute error = 1.6e-31 relative error = 3.4449253002533512785702479186900e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.118 y[1] (analytic) = 0.46352079538392782140962124451639 y[1] (numeric) = 0.46352079538392782140962124451622 absolute error = 1.7e-31 relative error = 3.6675808656910714618350925030958e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.119 y[1] (analytic) = 0.4625895057510555848183186199797 y[1] (numeric) = 0.46258950575105558481831861997955 absolute error = 1.5e-31 relative error = 3.2426157129626521884878604736834e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.12 y[1] (analytic) = 0.46165742190860567011774388638701 y[1] (numeric) = 0.46165742190860567011774388638685 absolute error = 1.6e-31 relative error = 3.4657733723530432808464049515844e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.121 y[1] (analytic) = 0.46072454456515818098920289933003 y[1] (numeric) = 0.46072454456515818098920289932987 absolute error = 1.6e-31 relative error = 3.4727908874707656535900602364209e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.122 y[1] (analytic) = 0.45979087443041856563193450068957 y[1] (numeric) = 0.45979087443041856563193450068941 absolute error = 1.6e-31 relative error = 3.4798428785304925812825143251950e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.123 y[1] (analytic) = 0.45885641221521713022952037233874 y[1] (numeric) = 0.45885641221521713022952037233859 absolute error = 1.5e-31 relative error = 3.2689964879393598996614000836321e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.124 y[1] (analytic) = 0.4579211586315085509593702686313 y[1] (numeric) = 0.45792115863150855095937026863116 absolute error = 1.4e-31 relative error = 3.0572948500215230487501578364326e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.125 y[1] (analytic) = 0.45698511439237138454554777843543 y[1] (numeric) = 0.45698511439237138454554777843526 absolute error = 1.7e-31 relative error = 3.7200336432410908877996293614698e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.126 y[1] (analytic) = 0.45604828021200757735520355642223 y[1] (numeric) = 0.45604828021200757735520355642209 absolute error = 1.4e-31 relative error = 3.0698504100249395781686409762053e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.127 y[1] (analytic) = 0.45511065680574197303888475222343 y[1] (numeric) = 0.45511065680574197303888475222327 absolute error = 1.6e-31 relative error = 3.5156285094043382459513211298002e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.128 y[1] (analytic) = 0.45417224489002181871499115492887 y[1] (numeric) = 0.45417224489002181871499115492872 absolute error = 1.5e-31 relative error = 3.3027117285936885668110379841193e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.129 y[1] (analytic) = 0.45323304518241626969865035920603 y[1] (numeric) = 0.4532330451824162696986503592059 absolute error = 1.3e-31 relative error = 2.8682815911553376954148035128433e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.13 y[1] (analytic) = 0.45229305840161589277528604808012 y[1] (numeric) = 0.45229305840161589277528604807998 absolute error = 1.4e-31 relative error = 3.0953382414214789224777994313743e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.131 y[1] (analytic) = 0.45135228526743216801915527611994 y[1] (numeric) = 0.45135228526743216801915527611977 absolute error = 1.7e-31 relative error = 3.7664592724787637466046148629266e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.132 y[1] (analytic) = 0.45041072650079698915713242542497 y[1] (numeric) = 0.45041072650079698915713242542482 absolute error = 1.5e-31 relative error = 3.3302936891698244047917120509800e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.133 y[1] (analytic) = 0.44946838282376216247801929540259 y[1] (numeric) = 0.44946838282376216247801929540243 absolute error = 1.6e-31 relative error = 3.5597609557052304898800171289919e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.134 y[1] (analytic) = 0.4485252549594989042876625758574 y[1] (numeric) = 0.44852525495949890428766257585727 absolute error = 1.3e-31 relative error = 2.8983875169245216085645033644117e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.135 y[1] (analytic) = 0.44758134363229733691016174138914 y[1] (numeric) = 0.44758134363229733691016174138899 absolute error = 1.5e-31 relative error = 3.3513461214154155937747234224153e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.136 y[1] (analytic) = 0.44663664956756598323545219350241 y[1] (numeric) = 0.44663664956756598323545219350226 absolute error = 1.5e-31 relative error = 3.3584346502963905578928813934184e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.137 y[1] (analytic) = 0.44569117349183125981355026517717 y[1] (numeric) = 0.44569117349183125981355026517703 absolute error = 1.4e-31 relative error = 3.1411885252999284558185945433467e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=576.0MB, alloc=4.6MB, time=27.68 TOP MAIN SOLVE Loop x[1] = 4.138 y[1] (analytic) = 0.44474491613273696849574849092276 y[1] (numeric) = 0.44474491613273696849574849092262 absolute error = 1.4e-31 relative error = 3.1478718456720054647963223822740e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.139 y[1] (analytic) = 0.44379787821904378662305133354505 y[1] (numeric) = 0.44379787821904378662305133354489 absolute error = 1.6e-31 relative error = 3.6052448164483867218986966589296e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.14 y[1] (analytic) = 0.44285006048062875576214334698957 y[1] (numeric) = 0.44285006048062875576214334698942 absolute error = 1.5e-31 relative error = 3.3871509430800073881640337298770e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.141 y[1] (analytic) = 0.44190146364848476898918354268357 y[1] (numeric) = 0.44190146364848476898918354268341 absolute error = 1.6e-31 relative error = 3.6207166792114023408569479622630e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.142 y[1] (analytic) = 0.4409520884547200567217215147822 y[1] (numeric) = 0.44095208845472005672172151478203 absolute error = 1.7e-31 relative error = 3.8552941340124018932028741954793e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.143 y[1] (analytic) = 0.4400019356325576710990326676304 y[1] (numeric) = 0.44000193563255767109903266763023 absolute error = 1.7e-31 relative error = 3.8636193669376429702219505646278e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.144 y[1] (analytic) = 0.43905100591633496891117167657519 y[1] (numeric) = 0.43905100591633496891117167657501 absolute error = 1.8e-31 relative error = 4.0997514542604324037858330457317e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.145 y[1] (analytic) = 0.43809930004150309307704510100544 y[1] (numeric) = 0.43809930004150309307704510100528 absolute error = 1.6e-31 relative error = 3.6521400510076708443328359440847e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.146 y[1] (analytic) = 0.43714681874462645267180585615334 y[1] (numeric) = 0.43714681874462645267180585615319 absolute error = 1.5e-31 relative error = 3.4313414525298738107181152077972e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.147 y[1] (analytic) = 0.43619356276338220150387403776112 y[1] (numeric) = 0.43619356276338220150387403776095 absolute error = 1.7e-31 relative error = 3.8973523342025634827691126066393e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.148 y[1] (analytic) = 0.43523953283655971524189038119849 y[1] (numeric) = 0.43523953283655971524189038119837 absolute error = 1.2e-31 relative error = 2.7571024906200825653726623880663e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.149 y[1] (analytic) = 0.43428472970406006709191042400623 y[1] (numeric) = 0.43428472970406006709191042400608 absolute error = 1.5e-31 relative error = 3.4539551989823894334355147837545e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.15 y[1] (analytic) = 0.43332915410689550202514922813642 y[1] (numeric) = 0.43332915410689550202514922813628 absolute error = 1.4e-31 relative error = 3.2308003897993947815229295176078e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.151 y[1] (analytic) = 0.43237280678718890955658830536414 y[1] (numeric) = 0.432372806787188909556588305364 absolute error = 1.4e-31 relative error = 3.2379464619963274364172151686561e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.152 y[1] (analytic) = 0.43141568848817329507475817644581 y[1] (numeric) = 0.43141568848817329507475817644566 absolute error = 1.5e-31 relative error = 3.4769250169285871165587104790463e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.153 y[1] (analytic) = 0.43045779995419124972301178160615 y[1] (numeric) = 0.43045779995419124972301178160598 absolute error = 1.7e-31 relative error = 3.9492837629633189447851822179710e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.154 y[1] (analytic) = 0.42949914193069441883260574683653 y[1] (numeric) = 0.42949914193069441883260574683639 absolute error = 1.4e-31 relative error = 3.2596107030777472755842242459029e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.155 y[1] (analytic) = 0.42853971516424296890790829728704 y[1] (numeric) = 0.42853971516424296890790829728688 absolute error = 1.6e-31 relative error = 3.7336096127911525596923384176227e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.156 y[1] (analytic) = 0.42757952040250505316405439572561 y[1] (numeric) = 0.42757952040250505316405439572544 absolute error = 1.7e-31 relative error = 3.9758686253253962855613512570058e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.157 y[1] (analytic) = 0.42661855839425627561737047062382 y[1] (numeric) = 0.42661855839425627561737047062367 absolute error = 1.5e-31 relative error = 3.5160214446502969058401051795132e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.158 y[1] (analytic) = 0.42565682988937915372889288490142 y[1] (numeric) = 0.42565682988937915372889288490126 absolute error = 1.6e-31 relative error = 3.7588965750081170321476198781247e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.159 y[1] (analytic) = 0.42469433563886257960130608272367 y[1] (numeric) = 0.4246943356388625796013060827235 absolute error = 1.7e-31 relative error = 4.0028789115887558347363852217958e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.16 y[1] (analytic) = 0.42373107639480127972962813799347 y[1] (numeric) = 0.42373107639480127972962813799333 absolute error = 1.4e-31 relative error = 3.3039823557703460431062551043697e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.161 y[1] (analytic) = 0.42276705291039527330597321431001 y[1] (numeric) = 0.42276705291039527330597321430985 absolute error = 1.6e-31 relative error = 3.7845900927835953217309853456044e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.162 y[1] (analytic) = 0.42180226593994932907872223217707 y[1] (numeric) = 0.42180226593994932907872223217692 absolute error = 1.5e-31 relative error = 3.5561686627201531300108481293754e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.163 y[1] (analytic) = 0.42083671623887242076643482513645 y[1] (numeric) = 0.42083671623887242076643482513629 absolute error = 1.6e-31 relative error = 3.8019496357152903143665429785781e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.164 y[1] (analytic) = 0.41987040456367718102683745226784 y[1] (numeric) = 0.41987040456367718102683745226766 absolute error = 1.8e-31 relative error = 4.2870370962929195042862045359163e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=579.8MB, alloc=4.6MB, time=27.86 TOP MAIN SOLVE Loop x[1] = 4.165 y[1] (analytic) = 0.41890333167197935398122432014069 y[1] (numeric) = 0.41890333167197935398122432014054 absolute error = 1.5e-31 relative error = 3.5807783958485420752306502028084e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.166 y[1] (analytic) = 0.41793549832249724629460955281839 y[1] (numeric) = 0.41793549832249724629460955281826 absolute error = 1.3e-31 relative error = 3.1105278331654501845674847154734e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.167 y[1] (analytic) = 0.41696690527505117681197083390063 y[1] (numeric) = 0.41696690527505117681197083390046 absolute error = 1.7e-31 relative error = 4.0770621804591403946774472088204e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.168 y[1] (analytic) = 0.41599755329056292475092652984503 y[1] (numeric) = 0.41599755329056292475092652984487 absolute error = 1.6e-31 relative error = 3.8461764674910088148947010443828e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.169 y[1] (analytic) = 0.41502744313105517645119008893006 y[1] (numeric) = 0.41502744313105517645119008892989 absolute error = 1.7e-31 relative error = 4.0961146741883836549332290270560e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.17 y[1] (analytic) = 0.41405657555965097068114729520476 y[1] (numeric) = 0.41405657555965097068114729520459 absolute error = 1.7e-31 relative error = 4.1057191223258085150470394860340e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.171 y[1] (analytic) = 0.41308495134057314250190374162006 y[1] (numeric) = 0.41308495134057314250190374161991 absolute error = 1.5e-31 relative error = 3.6312143425513119703538057983707e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.172 y[1] (analytic) = 0.41211257123914376568915167124185 y[1] (numeric) = 0.41211257123914376568915167124172 absolute error = 1.3e-31 relative error = 3.1544779041589252447633094382533e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.173 y[1] (analytic) = 0.41113943602178359371320712001168 y[1] (numeric) = 0.41113943602178359371320712001153 absolute error = 1.5e-31 relative error = 3.6483972797990723418526238620018e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.174 y[1] (analytic) = 0.4101655464560114992775700789413 y[1] (numeric) = 0.41016554645601149927757007894114 absolute error = 1.6e-31 relative error = 3.9008639653540309177530508052485e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.175 y[1] (analytic) = 0.40919090331044391241636217790191 y[1] (numeric) = 0.40919090331044391241636217790175 absolute error = 1.6e-31 relative error = 3.9101553506093366762874128234805e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.176 y[1] (analytic) = 0.40821550735479425715099817729391 y[1] (numeric) = 0.40821550735479425715099817729375 absolute error = 1.6e-31 relative error = 3.9194983315746123800348639293319e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.177 y[1] (analytic) = 0.40723935935987238670644933785855 y[1] (numeric) = 0.40723935935987238670644933785837 absolute error = 1.8e-31 relative error = 4.4200049887844024806839562922348e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.178 y[1] (analytic) = 0.40626246009758401728745852271479 y[1] (numeric) = 0.40626246009758401728745852271462 absolute error = 1.7e-31 relative error = 4.1844870421738226666016926803547e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.179 y[1] (analytic) = 0.40528481034093016041506866937226 y[1] (numeric) = 0.40528481034093016041506866937211 absolute error = 1.5e-31 relative error = 3.7011009584548284859766417632706e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.18 y[1] (analytic) = 0.40430641086400655382382805298088 y[1] (numeric) = 0.40430641086400655382382805298073 absolute error = 1.5e-31 relative error = 3.7100574210398644759523541487327e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.181 y[1] (analytic) = 0.40332726244200309092003754542923 y[1] (numeric) = 0.40332726244200309092003754542907 absolute error = 1.6e-31 relative error = 3.9670018592657714184442936279915e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.182 y[1] (analytic) = 0.40234736585120324880140685809346 y[1] (numeric) = 0.40234736585120324880140685809327 absolute error = 1.9e-31 relative error = 4.7222876580299547971691463179363e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.183 y[1] (analytic) = 0.40136672186898351483848853906446 y[1] (numeric) = 0.40136672186898351483848853906428 absolute error = 1.8e-31 relative error = 4.4846767355754186889980692032117e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.184 y[1] (analytic) = 0.40038533127381281181826027854241 y[1] (numeric) = 0.40038533127381281181826027854223 absolute error = 1.8e-31 relative error = 4.4956691951559738252988286815874e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.185 y[1] (analytic) = 0.39940319484525192165022785877987 y[1] (numeric) = 0.39940319484525192165022785877972 absolute error = 1.5e-31 relative error = 3.7556034086837297596922356517772e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.186 y[1] (analytic) = 0.39842031336395290763542286747917 y[1] (numeric) = 0.39842031336395290763542286747899 absolute error = 1.8e-31 relative error = 4.5178419363264701090597562598694e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.187 y[1] (analytic) = 0.3974366876116585352986710758995 y[1] (numeric) = 0.39743668761165853529867107589932 absolute error = 1.8e-31 relative error = 4.5290232535321639051678558363155e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.188 y[1] (analytic) = 0.3964523183712016917845091651083 y[1] (numeric) = 0.39645231837120169178450916510815 absolute error = 1.5e-31 relative error = 3.7835571403962309246015290479639e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.189 y[1] (analytic) = 0.39546720642650480381712926581064 y[1] (numeric) = 0.39546720642650480381712926581047 absolute error = 1.7e-31 relative error = 4.2987129460402799575824666814417e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.19 y[1] (analytic) = 0.3944813525625792542247325590139 y[1] (numeric) = 0.39448135256257925422473255901373 absolute error = 1.7e-31 relative error = 4.3094559196694030358069454616590e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=583.6MB, alloc=4.6MB, time=28.05 x[1] = 4.191 y[1] (analytic) = 0.39349475756552479702867496642793 y[1] (numeric) = 0.39349475756552479702867496642776 absolute error = 1.7e-31 relative error = 4.3202608606975298368285522683233e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.192 y[1] (analytic) = 0.39250742222252897109778974095899 y[1] (numeric) = 0.39250742222252897109778974095882 absolute error = 1.7e-31 relative error = 4.3311282889223900539989532452436e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.193 y[1] (analytic) = 0.39151934732186651236827354893207 y[1] (numeric) = 0.3915193473218665123682735489319 absolute error = 1.7e-31 relative error = 4.3420587299928161661931794582919e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.194 y[1] (analytic) = 0.39053053365289876462952441676357 y[1] (numeric) = 0.3905305336528987646295244167634 absolute error = 1.7e-31 relative error = 4.3530527154912552245654063602038e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.195 y[1] (analytic) = 0.38954098200607308887632169570584 y[1] (numeric) = 0.38954098200607308887632169570568 absolute error = 1.6e-31 relative error = 4.1073983840166409103610228858182e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.196 y[1] (analytic) = 0.38855069317292227122773997899286 y[1] (numeric) = 0.38855069317292227122773997899269 absolute error = 1.7e-31 relative error = 4.3752334762749340666621799097957e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.197 y[1] (analytic) = 0.38755966794606392941319068623125 y[1] (numeric) = 0.38755966794606392941319068623108 absolute error = 1.7e-31 relative error = 4.3864213451555189465581726379206e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.198 y[1] (analytic) = 0.38656790711919991782598681020056 y[1] (numeric) = 0.3865679071191999178259868102004 absolute error = 1.6e-31 relative error = 4.1389881843104811816348228129104e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.199 y[1] (analytic) = 0.38557541148711573114482810134837 y[1] (numeric) = 0.38557541148711573114482810134819 absolute error = 1.8e-31 relative error = 4.6683474785324796159175629664294e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.2 y[1] (analytic) = 0.38458218184567990652360574518817 y[1] (numeric) = 0.384582181845679906523605745188 absolute error = 1.7e-31 relative error = 4.4203815991718350112890323656341e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.201 y[1] (analytic) = 0.38358821899184342434992736752935 y[1] (numeric) = 0.38358821899184342434992736752918 absolute error = 1.7e-31 relative error = 4.4318357963859901649949322884818e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.202 y[1] (analytic) = 0.38259352372363910757276498198425 y[1] (numeric) = 0.38259352372363910757276498198409 absolute error = 1.6e-31 relative error = 4.1819840138113180247487048016461e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.203 y[1] (analytic) = 0.38159809684018101959963027350924 y[1] (numeric) = 0.38159809684018101959963027350907 absolute error = 1.7e-31 relative error = 4.4549488429759789442037698871353e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.204 y[1] (analytic) = 0.38060193914166386076368339083857 y[1] (numeric) = 0.3806019391416638607636833908384 absolute error = 1.7e-31 relative error = 4.4666088770694437842919189454633e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.205 y[1] (analytic) = 0.37960505142936236336118319956291 y[1] (numeric) = 0.37960505142936236336118319956275 absolute error = 1.6e-31 relative error = 4.2149070302815268812918336430229e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.206 y[1] (analytic) = 0.37860743450563068525968872628411 y[1] (numeric) = 0.37860743450563068525968872628395 absolute error = 1.6e-31 relative error = 4.2260131581652938989053794658620e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.207 y[1] (analytic) = 0.3776090891739018020774233027434 y[1] (numeric) = 0.37760908917390180207742330274324 absolute error = 1.6e-31 relative error = 4.2371861426861621279708930416566e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.208 y[1] (analytic) = 0.37661001623868689793421469706956 y[1] (numeric) = 0.3766100162386868979342146970694 absolute error = 1.6e-31 relative error = 4.2484265712836385121499702077791e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.209 y[1] (analytic) = 0.37561021650557475477442629732324 y[1] (numeric) = 0.37561021650557475477442629732309 absolute error = 1.5e-31 relative error = 3.9935015984256040807066221366358e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.21 y[1] (analytic) = 0.37460969078123114026229619032355 y[1] (numeric) = 0.37460969078123114026229619032339 absolute error = 1.6e-31 relative error = 4.2711121451857643848678429373021e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.211 y[1] (analytic) = 0.37360843987339819425010275632871 y[1] (numeric) = 0.37360843987339819425010275632855 absolute error = 1.6e-31 relative error = 4.2825585003973133995042293713625e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.212 y[1] (analytic) = 0.37260646459089381381957717750449 y[1] (numeric) = 0.37260646459089381381957717750434 absolute error = 1.5e-31 relative error = 4.0256950497274295777970366604728e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.213 y[1] (analytic) = 0.37160376574361103689698503524741 y[1] (numeric) = 0.37160376574361103689698503524726 absolute error = 1.5e-31 relative error = 4.0365575870803441057083836456615e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.214 y[1] (analytic) = 0.37060034414251742444230094833456 y[1] (numeric) = 0.37060034414251742444230094833441 absolute error = 1.5e-31 relative error = 4.0474867973224617572977358169535e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.215 y[1] (analytic) = 0.36959620059965444121290198054496 y[1] (numeric) = 0.36959620059965444121290198054481 absolute error = 1.5e-31 relative error = 4.0584832786871522957945707995438e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.216 y[1] (analytic) = 0.36859133592813683510220732283653 y[1] (numeric) = 0.36859133592813683510220732283639 absolute error = 1.4e-31 relative error = 3.7982444608327794986775100777238e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.217 y[1] (analytic) = 0.36758575094215201505369353136649 y[1] (numeric) = 0.36758575094215201505369353136634 absolute error = 1.5e-31 relative error = 4.0806804838201117953527867414025e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=587.4MB, alloc=4.6MB, time=28.24 TOP MAIN SOLVE Loop x[1] = 4.218 y[1] (analytic) = 0.36657944645695942755071637860856 y[1] (numeric) = 0.36657944645695942755071637860842 absolute error = 1.4e-31 relative error = 3.8190902777861437787713208092728e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.219 y[1] (analytic) = 0.36557242328888993168257215054638 y[1] (numeric) = 0.36557242328888993168257215054623 absolute error = 1.5e-31 relative error = 4.1031541342893910858863507155218e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.22 y[1] (analytic) = 0.36456468225534517278723299840531 y[1] (numeric) = 0.36456468225534517278723299840517 absolute error = 1.4e-31 relative error = 3.8401964538611679695069876019059e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.221 y[1] (analytic) = 0.36355622417479695467119272862509 y[1] (numeric) = 0.36355622417479695467119272862495 absolute error = 1.4e-31 relative error = 3.8508486635808038888269538340529e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.222 y[1] (analytic) = 0.3625470498667866104068611897674 y[1] (numeric) = 0.36254704986678661040686118976727 absolute error = 1.3e-31 relative error = 3.5857414933528455921356854987265e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.223 y[1] (analytic) = 0.36153716015192437170794718979786 y[1] (numeric) = 0.36153716015192437170794718979773 absolute error = 1.3e-31 relative error = 3.5957576240675143383586957353389e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.224 y[1] (analytic) = 0.36052655585188873688327165167464 y[1] (numeric) = 0.3605265558518887368832716516745 absolute error = 1.4e-31 relative error = 3.8832090931330645272363886499194e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.225 y[1] (analytic) = 0.35951523778942583736945448941723 y[1] (numeric) = 0.3595152377894258373694544894171 absolute error = 1.3e-31 relative error = 3.6159802516115659430594003416820e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.226 y[1] (analytic) = 0.35850320678834880284292046081484 y[1] (numeric) = 0.35850320678834880284292046081472 absolute error = 1.2e-31 relative error = 3.3472503935186542221719337570753e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.227 y[1] (analytic) = 0.35749046367353712491167102666227 y[1] (numeric) = 0.35749046367353712491167102666214 absolute error = 1.3e-31 relative error = 3.6364606390932133937533860269554e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.228 y[1] (analytic) = 0.3564770092709360193872710198813 y[1] (numeric) = 0.35647700927093601938727101988118 absolute error = 1.2e-31 relative error = 3.3662759975860170579896494515727e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.229 y[1] (analytic) = 0.35546284440755578713750070109396 y[1] (numeric) = 0.35546284440755578713750070109383 absolute error = 1.3e-31 relative error = 3.6572036162223624741729153372926e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.23 y[1] (analytic) = 0.35444796991147117352012555015853 y[1] (numeric) = 0.35444796991147117352012555015841 absolute error = 1.2e-31 relative error = 3.3855462631080054927843880383898e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.231 y[1] (analytic) = 0.35343238661182072639823791585936 y[1] (numeric) = 0.35343238661182072639823791585925 absolute error = 1.1e-31 relative error = 3.1123350368231645782912630297888e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.232 y[1] (analytic) = 0.35241609533880615273762641835242 y[1] (numeric) = 0.3524160953388061527376264183523 absolute error = 1.2e-31 relative error = 3.4050658181384784663087076201992e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.233 y[1] (analytic) = 0.35139909692369167378663077111114 y[1] (numeric) = 0.35139909692369167378663077111103 absolute error = 1.1e-31 relative error = 3.1303438444489551412883204179886e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.234 y[1] (analytic) = 0.35038139219880337883894146098685 y[1] (numeric) = 0.35038139219880337883894146098673 absolute error = 1.2e-31 relative error = 3.4248394084784341333221419394065e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.235 y[1] (analytic) = 0.34936298199752857757980549659377 y[1] (numeric) = 0.34936298199752857757980549659364 absolute error = 1.3e-31 relative error = 3.7210582316623239343101885354911e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.236 y[1] (analytic) = 0.3483438671543151510161012065489 y[1] (numeric) = 0.34834386715431515101610120654878 absolute error = 1.2e-31 relative error = 3.4448719014433059396956528933435e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.237 y[1] (analytic) = 0.34732404850467090099074684013802 y[1] (numeric) = 0.3473240485046709009907468401379 absolute error = 1.2e-31 relative error = 3.4549867916326044402075027102295e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.238 y[1] (analytic) = 0.34630352688516289828190949374022 y[1] (numeric) = 0.3463035268851628982819094937401 absolute error = 1.2e-31 relative error = 3.4651682897758355298624762305198e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.239 y[1] (analytic) = 0.34528230313341682928748265682208 y[1] (numeric) = 0.34528230313341682928748265682197 absolute error = 1.1e-31 relative error = 3.1857989535448644319041857496947e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.24 y[1] (analytic) = 0.34426037808811634129530244150598 y[1] (numeric) = 0.34426037808811634129530244150586 absolute error = 1.2e-31 relative error = 3.4857336957111279881421100917953e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.241 y[1] (analytic) = 0.34323775258900238633957432962418 y[1] (numeric) = 0.34323775258900238633957432962406 absolute error = 1.2e-31 relative error = 3.4961189174225148016678817253970e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.242 y[1] (analytic) = 0.34221442747687256364398404078849 y[1] (numeric) = 0.34221442747687256364398404078837 absolute error = 1.2e-31 relative error = 3.5065733752008396915488242845349e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.243 y[1] (analytic) = 0.34119040359358046065196789433185 y[1] (numeric) = 0.34119040359358046065196789433174 absolute error = 1.1e-31 relative error = 3.2240062686824543358877435455568e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.244 y[1] (analytic) = 0.34016568178203499264461980701246 y[1] (numeric) = 0.34016568178203499264461980701234 absolute error = 1.2e-31 relative error = 3.5276927223038142047629367847898e-29 % Correct digits = 30 h = 0.001 memory used=591.2MB, alloc=4.6MB, time=28.43 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.245 y[1] (analytic) = 0.33914026288619974094671383710893 y[1] (numeric) = 0.33914026288619974094671383710882 absolute error = 1.1e-31 relative error = 3.2434957460922611130472909824428e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.246 y[1] (analytic) = 0.33811414775109228972132295397676 y[1] (numeric) = 0.33811414775109228972132295397665 absolute error = 1.1e-31 relative error = 3.2533391676049628156006309088437e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.247 y[1] (analytic) = 0.33708733722278356135351648027679 y[1] (numeric) = 0.33708733722278356135351648027668 absolute error = 1.1e-31 relative error = 3.2632492488823503647358972934772e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.248 y[1] (analytic) = 0.33605983214839715042362042192719 y[1] (numeric) = 0.33605983214839715042362042192709 absolute error = 1.0e-31 relative error = 2.9756605947432017019881545643711e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.249 y[1] (analytic) = 0.33503163337610865627052666836568 y[1] (numeric) = 0.33503163337610865627052666836558 absolute error = 1.0e-31 relative error = 2.9847927788878180308619739778586e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.25 y[1] (analytic) = 0.3340027417551450141455388129389 y[1] (numeric) = 0.3340027417551450141455388129388 absolute error = 1.0e-31 relative error = 2.9939873988612127687161241821264e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.251 y[1] (analytic) = 0.33297315813578382495724411015806 y[1] (numeric) = 0.33297315813578382495724411015796 absolute error = 1.0e-31 relative error = 3.0032450831733646690003877822121e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.252 y[1] (analytic) = 0.33194288336935268360790285317133 y[1] (numeric) = 0.33194288336935268360790285317123 absolute error = 1.0e-31 relative error = 3.0125664688141558684850849772081e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.253 y[1] (analytic) = 0.33091191830822850592184822110317 y[1] (numeric) = 0.33091191830822850592184822110307 absolute error = 1.0e-31 relative error = 3.0219522013968327003447910991261e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.254 y[1] (analytic) = 0.32988026380583685416639141189573 y[1] (numeric) = 0.32988026380583685416639141189562 absolute error = 1.1e-31 relative error = 3.3345432288348277883903012818278e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.255 y[1] (analytic) = 0.32884792071665126116572864195574 y[1] (numeric) = 0.32884792071665126116572864195563 absolute error = 1.1e-31 relative error = 3.3450112672228349710443148777183e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.256 y[1] (analytic) = 0.32781488989619255300834835926045 y[1] (numeric) = 0.32781488989619255300834835926036 absolute error = 9e-32 relative error = 2.7454518624367500471928965853148e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.257 y[1] (analytic) = 0.32678117220102817034843878160474 y[1] (numeric) = 0.32678117220102817034843878160463 absolute error = 1.1e-31 relative error = 3.3661670058619705474472245850571e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.258 y[1] (analytic) = 0.32574676848877148830179763637752 y[1] (numeric) = 0.32574676848877148830179763637741 absolute error = 1.1e-31 relative error = 3.3768562159594134838640698332921e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.259 y[1] (analytic) = 0.32471167961808113493674774263729 y[1] (numeric) = 0.32471167961808113493674774263718 absolute error = 1.1e-31 relative error = 3.3876206771921362492966890448097e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.26 y[1] (analytic) = 0.32367590644866030836056384030922 y[1] (numeric) = 0.32367590644866030836056384030912 absolute error = 1.0e-31 relative error = 3.0895101553028770112988197538380e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.261 y[1] (analytic) = 0.32263944984125609240191783505184 y[1] (numeric) = 0.32263944984125609240191783505173 absolute error = 1.1e-31 relative error = 3.4093784890261189815097044704736e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.262 y[1] (analytic) = 0.32160231065765877088985139073362 y[1] (numeric) = 0.32160231065765877088985139073351 absolute error = 1.1e-31 relative error = 3.4203734349748962026115755343053e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.263 y[1] (analytic) = 0.3205644897607011405297865645199 y[1] (numeric) = 0.3205644897607011405297865645198 absolute error = 1.0e-31 relative error = 3.1194971119430355527169997361174e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.264 y[1] (analytic) = 0.319525988014257822377086942294 y[1] (numeric) = 0.31952598801425782237708694229389 absolute error = 1.1e-31 relative error = 3.4425994794229883677159150444643e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.265 y[1] (analytic) = 0.31848680628324457190868349452249 y[1] (numeric) = 0.31848680628324457190868349452239 absolute error = 1.0e-31 relative error = 3.1398474921772905130006858156737e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.266 y[1] (analytic) = 0.31744694543361758769328113472125 y[1] (numeric) = 0.31744694543361758769328113472113 absolute error = 1.2e-31 relative error = 3.7801592274288746886689807796231e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.267 y[1] (analytic) = 0.31640640633237281866066372438201 y[1] (numeric) = 0.3164064063323728186606637243819 absolute error = 1.1e-31 relative error = 3.4765414921608512093770570627482e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.268 y[1] (analytic) = 0.31536518984754526997061702958046 y[1] (numeric) = 0.31536518984754526997061702958034 absolute error = 1.2e-31 relative error = 3.8051124177024971791347261039911e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.269 y[1] (analytic) = 0.31432329684820830748199089549906 y[1] (numeric) = 0.31432329684820830748199089549895 absolute error = 1.1e-31 relative error = 3.4995815169602506478039972656016e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.27 y[1] (analytic) = 0.31328072820447296082242366576454 y[1] (numeric) = 0.31328072820447296082242366576443 absolute error = 1.1e-31 relative error = 3.5112277933740273259542074748379e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=595.1MB, alloc=4.6MB, time=28.61 x[1] = 4.271 y[1] (analytic) = 0.31223748478748722505925363381354 y[1] (numeric) = 0.31223748478748722505925363381343 absolute error = 1.1e-31 relative error = 3.5229594574420617380541570530649e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.272 y[1] (analytic) = 0.31119356746943536097214407346276 y[1] (numeric) = 0.31119356746943536097214407346264 absolute error = 1.2e-31 relative error = 3.8561208374522745925476826297731e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.273 y[1] (analytic) = 0.31014897712353719392795015546702 y[1] (numeric) = 0.3101489771235371939279501554669 absolute error = 1.2e-31 relative error = 3.8691083592451159698511050405459e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.274 y[1] (analytic) = 0.30910371462404741135835781609909 y[1] (numeric) = 0.30910371462404741135835781609898 absolute error = 1.1e-31 relative error = 3.5586760946496339907162214249980e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.275 y[1] (analytic) = 0.30805778084625485884082640267666 y[1] (numeric) = 0.30805778084625485884082640267655 absolute error = 1.1e-31 relative error = 3.5707586965608468102550349631560e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.276 y[1] (analytic) = 0.30701117666648183478336867949208 y[1] (numeric) = 0.30701117666648183478336867949197 absolute error = 1.1e-31 relative error = 3.5829314487627684085531687694076e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.277 y[1] (analytic) = 0.30596390296208338371370353576766 y[1] (numeric) = 0.30596390296208338371370353576755 absolute error = 1.1e-31 relative error = 3.5951953460873377681153204678046e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.278 y[1] (analytic) = 0.30491596061144658817331849506094 y[1] (numeric) = 0.30491596061144658817331849506084 absolute error = 1.0e-31 relative error = 3.2795921800705497701595113705702e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.279 y[1] (analytic) = 0.30386735049398985921698088297867 y[1] (numeric) = 0.30386735049398985921698088297857 absolute error = 1.0e-31 relative error = 3.2909096629641980255414535679522e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.28 y[1] (analytic) = 0.30281807349016222551823826712258 y[1] (numeric) = 0.30281807349016222551823826712247 absolute error = 1.1e-31 relative error = 3.6325440794264089704290909556319e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.281 y[1] (analytic) = 0.30176813048144262108145053988329 y[1] (numeric) = 0.30176813048144262108145053988319 absolute error = 1.0e-31 relative error = 3.3138025490120319036249964272222e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.282 y[1] (analytic) = 0.30071752235033917156089777101755 y[1] (numeric) = 0.30071752235033917156089777101745 absolute error = 1.0e-31 relative error = 3.3253798853629459138622202697354e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.283 y[1] (analytic) = 0.29966624998038847918750971288682 y[1] (numeric) = 0.29966624998038847918750971288672 absolute error = 1.0e-31 relative error = 3.3370457970006450279272737176542e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.284 y[1] (analytic) = 0.29861431425615490630376459680076 y[1] (numeric) = 0.29861431425615490630376459680066 absolute error = 1.0e-31 relative error = 3.3488012873428033996078899706777e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.285 y[1] (analytic) = 0.29756171606322985750730661409342 y[1] (numeric) = 0.29756171606322985750730661409331 absolute error = 1.1e-31 relative error = 3.6967121125429234313139145224710e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.286 y[1] (analytic) = 0.29650845628823106040383323036264 y[1] (numeric) = 0.29650845628823106040383323036254 absolute error = 1.0e-31 relative error = 3.3725850942609077630454380889795e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.287 y[1] (analytic) = 0.29545453581880184496980523572137 y[1] (numeric) = 0.29545453581880184496980523572127 absolute error = 1.0e-31 relative error = 3.3846154949988179676496664446684e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.288 y[1] (analytic) = 0.29439995554361042152553418794049 y[1] (numeric) = 0.29439995554361042152553418794039 absolute error = 1.0e-31 relative error = 3.3967396433654241919215955317133e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.289 y[1] (analytic) = 0.29334471635234915731920365900626 y[1] (numeric) = 0.29334471635234915731920365900615 absolute error = 1.1e-31 relative error = 3.7498544840969350627703406537050e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.29 y[1] (analytic) = 0.29228881913573385172238244886678 y[1] (numeric) = 0.29228881913573385172238244886666 absolute error = 1.2e-31 relative error = 4.1055282359012878942390204714371e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.291 y[1] (analytic) = 0.29123226478550301003758968300158 y[1] (numeric) = 0.29123226478550301003758968300148 absolute error = 1.0e-31 relative error = 3.4336854837719138047657535774739e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.292 y[1] (analytic) = 0.29017505419441711591847346291206 y[1] (numeric) = 0.29017505419441711591847346291195 absolute error = 1.1e-31 relative error = 3.7908151789746910701833409822548e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.293 y[1] (analytic) = 0.2891171882562579024031664906973 y[1] (numeric) = 0.28911718825625790240316649069718 absolute error = 1.2e-31 relative error = 4.1505660982576540481391184184468e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.294 y[1] (analytic) = 0.28805866786582762156138384054811 y[1] (numeric) = 0.288058667865827621561383840548 absolute error = 1.1e-31 relative error = 3.8186665520246020638723859914880e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.295 y[1] (analytic) = 0.28699949391894831275582980125767 y[1] (numeric) = 0.28699949391894831275582980125755 absolute error = 1.2e-31 relative error = 4.1811920418887312382752104259794e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.296 y[1] (analytic) = 0.28593966731246106951848246471009 y[1] (numeric) = 0.28593966731246106951848246470998 absolute error = 1.1e-31 relative error = 3.8469653767833935540314138312632e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.297 y[1] (analytic) = 0.28487918894422530504232648576585 y[1] (numeric) = 0.28487918894422530504232648576575 absolute error = 1.0e-31 relative error = 3.5102599235347573123612670924447e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=598.9MB, alloc=4.6MB, time=28.80 TOP MAIN SOLVE Loop x[1] = 4.298 y[1] (analytic) = 0.28381805971311801628910618901172 y[1] (numeric) = 0.28381805971311801628910618901161 absolute error = 1.1e-31 relative error = 3.8757223592884643026075935635803e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.299 y[1] (analytic) = 0.28275628051903304671367294748291 y[1] (numeric) = 0.28275628051903304671367294748281 absolute error = 1.0e-31 relative error = 3.5366146356303037040119397082184e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.3 y[1] (analytic) = 0.28169385226288034760550250769287 y[1] (numeric) = 0.28169385226288034760550250769277 absolute error = 1.0e-31 relative error = 3.5499532274733033988208677264785e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.301 y[1] (analytic) = 0.28063077584658523804795968411905 y[1] (numeric) = 0.28063077584658523804795968411895 absolute error = 1.0e-31 relative error = 3.5634010453175610472140277798893e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.302 y[1] (analytic) = 0.27956705217308766349588959469118 y[1] (numeric) = 0.27956705217308766349588959469109 absolute error = 9e-32 relative error = 3.2192634754498366526279020891917e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.303 y[1] (analytic) = 0.27850268214634145297211635680711 y[1] (numeric) = 0.27850268214634145297211635680701 absolute error = 1.0e-31 relative error = 3.5906296926596277219742051960388e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.304 y[1] (analytic) = 0.27743766667131357488343191095987 y[1] (numeric) = 0.27743766667131357488343191095977 absolute error = 1.0e-31 relative error = 3.6044132435150620829498964666732e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.305 y[1] (analytic) = 0.27637200665398339145665938619632 y[1] (numeric) = 0.27637200665398339145665938619622 absolute error = 1.0e-31 relative error = 3.6183114639826596527222441729659e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.306 y[1] (analytic) = 0.2753057030013419117953771683384 y[1] (numeric) = 0.2753057030013419117953771683383 absolute error = 1.0e-31 relative error = 3.6323257713085796090567311864303e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.307 y[1] (analytic) = 0.27423875662139104355789157818336 y[1] (numeric) = 0.27423875662139104355789157818327 absolute error = 9e-32 relative error = 3.2818118455901671042734598850575e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.308 y[1] (analytic) = 0.27317116842314284325704781275495 y[1] (numeric) = 0.27317116842314284325704781275485 absolute error = 1.0e-31 relative error = 3.6607084333695034212723912242940e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.309 y[1] (analytic) = 0.2721029393166187651824705481022 y[1] (numeric) = 0.27210293931661876518247054810211 absolute error = 9e-32 relative error = 3.3075717677300086462826606059908e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.31 y[1] (analytic) = 0.27103407021284890894582734713482 y[1] (numeric) = 0.27103407021284890894582734713473 absolute error = 9e-32 relative error = 3.3206157413834008485287607662667e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.311 y[1] (analytic) = 0.26996456202387126564970976053982 y[1] (numeric) = 0.26996456202387126564970976053973 absolute error = 9e-32 relative error = 3.3337708966424217905718219721125e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.312 y[1] (analytic) = 0.26889441566273096268072875294424 y[1] (numeric) = 0.26889441566273096268072875294415 absolute error = 9e-32 relative error = 3.3470386425906758169978420799255e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.313 y[1] (analytic) = 0.26782363204347950712742283016785 y[1] (numeric) = 0.26782363204347950712742283016776 absolute error = 9e-32 relative error = 3.3604204122431234026978543507643e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.314 y[1] (analytic) = 0.26675221208117402782357898664839 y[1] (numeric) = 0.2667522120811740278235789866483 absolute error = 9e-32 relative error = 3.3739176630562505466481654728796e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.315 y[1] (analytic) = 0.2656801566918765160175683349164 y[1] (numeric) = 0.26568015669187651601756833491631 absolute error = 9e-32 relative error = 3.3875318774513450930468104021515e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.316 y[1] (analytic) = 0.26460746679265306466830002134538 y[1] (numeric) = 0.2646074667926530646683000213453 absolute error = 8e-32 relative error = 3.0233462785344662450535523392022e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.317 y[1] (analytic) = 0.2635341433015731063683987743043 y[1] (numeric) = 0.2635341433015731063683987743042 absolute error = 1.0e-31 relative error = 3.7945747274790815704176636504076e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.318 y[1] (analytic) = 0.26246018713770864989521317228989 y[1] (numeric) = 0.26246018713770864989521317228979 absolute error = 1.0e-31 relative error = 3.8101016802038476092971955751882e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.319 y[1] (analytic) = 0.26138559922113351539026346061585 y[1] (numeric) = 0.26138559922113351539026346061576 absolute error = 9e-32 relative error = 3.4431889234976389391450375288182e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.32 y[1] (analytic) = 0.26031038047292256816773948577981 y[1] (numeric) = 0.26031038047292256816773948577972 absolute error = 9e-32 relative error = 3.4574111042552827181303012527530e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.321 y[1] (analytic) = 0.25923453181515095115266105671787 y[1] (numeric) = 0.25923453181515095115266105671778 absolute error = 9e-32 relative error = 3.4717596984407597290445036640292e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.322 y[1] (analytic) = 0.25815805417089331594931478178637 y[1] (numeric) = 0.25815805417089331594931478178628 absolute error = 9e-32 relative error = 3.4862363790680940947824198502828e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.323 y[1] (analytic) = 0.25708094846422305254058316947961 y[1] (numeric) = 0.25708094846422305254058316947951 absolute error = 1.0e-31 relative error = 3.8898253875827989584294516763401e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.324 y[1] (analytic) = 0.2560032156202115176187835195993 y[1] (numeric) = 0.25600321562021151761878351959921 absolute error = 9e-32 relative error = 3.5155808407312239084910271317670e-29 % Correct digits = 30 h = 0.001 memory used=602.7MB, alloc=4.6MB, time=28.99 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.325 y[1] (analytic) = 0.25492485656492726154863586983344 y[1] (numeric) = 0.25492485656492726154863586983335 absolute error = 9e-32 relative error = 3.5304521188218356882602344140344e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.326 y[1] (analytic) = 0.25384587222543525396298100047711 y[1] (numeric) = 0.25384587222543525396298100047703 absolute error = 8e-32 relative error = 3.1515186478570610486479486817337e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.327 y[1] (analytic) = 0.25276626352979610799187123733448 y[1] (numeric) = 0.2527662635297961079918712373344 absolute error = 8e-32 relative error = 3.1649793324008840049168299183581e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.328 y[1] (analytic) = 0.25168603140706530312565852967558 y[1] (numeric) = 0.2516860314070653031256585296755 absolute error = 8e-32 relative error = 3.1785633693199172367403790742044e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.329 y[1] (analytic) = 0.25060517678729240671270601648409 y[1] (numeric) = 0.250605176787292406712706016484 absolute error = 9e-32 relative error = 3.5913064986837768403006478588546e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.33 y[1] (analytic) = 0.2495237006015202940923510301183 y[1] (numeric) = 0.24952370060152029409235103011821 absolute error = 9e-32 relative error = 3.6068718034815667289975238065026e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.331 y[1] (analytic) = 0.24844160378178436736374922191719 y[1] (numeric) = 0.2484416037817843673637492219171 absolute error = 9e-32 relative error = 3.6225816703006954944677957551835e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.332 y[1] (analytic) = 0.24735888726111177279123122921278 y[1] (numeric) = 0.24735888726111177279123122921269 absolute error = 9e-32 relative error = 3.6384381008714717304266065090002e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.333 y[1] (analytic) = 0.24627555197352061684680503765834 y[1] (numeric) = 0.24627555197352061684680503765825 absolute error = 9e-32 relative error = 3.6544431340743371877965255892354e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.334 y[1] (analytic) = 0.24519159885401918089043892674632 y[1] (numeric) = 0.24519159885401918089043892674622 absolute error = 1.0e-31 relative error = 4.0784431631174054770272453537317e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.335 y[1] (analytic) = 0.24410702883860513448876161986833 y[1] (numeric) = 0.24410702883860513448876161986824 absolute error = 9e-32 relative error = 3.6869073548678842701055438203195e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.336 y[1] (analytic) = 0.24302184286426474737281799326043 y[1] (numeric) = 0.24302184286426474737281799326035 absolute error = 8e-32 relative error = 3.2918851678975410654105120594121e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.337 y[1] (analytic) = 0.24193604186897210003552043067714 y[1] (numeric) = 0.24193604186897210003552043067705 absolute error = 9e-32 relative error = 3.7199914202424732718420394190516e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.338 y[1] (analytic) = 0.24084962679168829296943764264644 y[1] (numeric) = 0.24084962679168829296943764264636 absolute error = 8e-32 relative error = 3.3215745884959285096128655409441e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.339 y[1] (analytic) = 0.23976259857236065454556450067236 y[1] (numeric) = 0.23976259857236065454556450067228 absolute error = 8e-32 relative error = 3.3366338401548437979058483827081e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.34 y[1] (analytic) = 0.23867495815192194753371816776908 y[1] (numeric) = 0.238674958151921947533718167769 absolute error = 8e-32 relative error = 3.3518388614979126228317445942010e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.341 y[1] (analytic) = 0.23758670647228957426520753723067 y[1] (numeric) = 0.23758670647228957426520753723059 absolute error = 8e-32 relative error = 3.3671917586571970817023615140818e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.342 y[1] (analytic) = 0.23649784447636478043842472155898 y[1] (numeric) = 0.2364978444763647804384247215589 absolute error = 8e-32 relative error = 3.3826946785553080651330292176195e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.343 y[1] (analytic) = 0.23540837310803185756800906298874 y[1] (numeric) = 0.23540837310803185756800906298867 absolute error = 7e-32 relative error = 2.9735560836604618676817673861252e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.344 y[1] (analytic) = 0.23431829331215734407823586606036 y[1] (numeric) = 0.23431829331215734407823586606028 absolute error = 8e-32 relative error = 3.4141593841938967794129837060471e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.345 y[1] (analytic) = 0.23322760603458922504128378119547 y[1] (numeric) = 0.23322760603458922504128378119539 absolute error = 8e-32 relative error = 3.4301256768092650706407306280570e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.346 y[1] (analytic) = 0.23213631222215613056103649622647 y[1] (numeric) = 0.23213631222215613056103649622639 absolute error = 8e-32 relative error = 3.4462510080473502616433796813615e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.347 y[1] (analytic) = 0.23104441282266653280307612031526 y[1] (numeric) = 0.23104441282266653280307612031519 absolute error = 7e-32 relative error = 3.0297205262317719215065757975289e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.348 y[1] (analytic) = 0.22995190878490794167152737166852 y[1] (numeric) = 0.22995190878490794167152737166845 absolute error = 7e-32 relative error = 3.0441147616424654681591085831761e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.349 y[1] (analytic) = 0.22885880105864609913341340691278 y[1] (numeric) = 0.22885880105864609913341340691271 absolute error = 7e-32 relative error = 3.0586544924729455583382671114937e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.35 y[1] (analytic) = 0.22776509059462417219118585593169 y[1] (numeric) = 0.22776509059462417219118585593161 absolute error = 8e-32 relative error = 3.5123907615141879338166226417545e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=606.5MB, alloc=4.6MB, time=29.17 x[1] = 4.351 y[1] (analytic) = 0.22667077834456194450409335138709 y[1] (numeric) = 0.22667077834456194450409335138702 absolute error = 7e-32 relative error = 3.0881792753008989271880490926360e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.352 y[1] (analytic) = 0.22557586526115500665905456704375 y[1] (numeric) = 0.22557586526115500665905456704368 absolute error = 7e-32 relative error = 3.1031688571363426510650316448500e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.353 y[1] (analytic) = 0.22448035229807394509170350339147 y[1] (numeric) = 0.22448035229807394509170350339139 absolute error = 8e-32 relative error = 3.5637862815616404752930420186621e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.354 y[1] (analytic) = 0.2233842404099635296582764829071 y[1] (numeric) = 0.22338424040996352965827648290703 absolute error = 7e-32 relative error = 3.1336140755289294939038809123670e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.355 y[1] (analytic) = 0.22228753055244189985901204061979 y[1] (numeric) = 0.22228753055244189985901204061971 absolute error = 8e-32 relative error = 3.5989423158905651141403368390260e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.356 y[1] (analytic) = 0.22119022368209974971373661843283 y[1] (numeric) = 0.22119022368209974971373661843274 absolute error = 9e-32 relative error = 4.0688959259497066798402860153310e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.357 y[1] (analytic) = 0.2200923207564995112903106939151 y[1] (numeric) = 0.22009232075649951129031069391501 absolute error = 9e-32 relative error = 4.0891931027240178858470446138094e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.358 y[1] (analytic) = 0.21899382273417453688661169599899 y[1] (numeric) = 0.2189938227341745368866116959989 absolute error = 9e-32 relative error = 4.1097049622831792148690701998584e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.359 y[1] (analytic) = 0.21789473057462827986673178121007 y[1] (numeric) = 0.21789473057462827986673178120998 absolute error = 9e-32 relative error = 4.1304349014156299121966957189707e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.36 y[1] (analytic) = 0.21679504523833347415207026470415 y[1] (numeric) = 0.21679504523833347415207026470406 absolute error = 9e-32 relative error = 4.1513863889766745331636681386463e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.361 y[1] (analytic) = 0.2156947676867313123680022204964 y[1] (numeric) = 0.21569476768673131236800222049632 absolute error = 8e-32 relative error = 3.7089448602754068141231875733146e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.362 y[1] (analytic) = 0.21459389888223062264680648483482 y[1] (numeric) = 0.21459389888223062264680648483473 absolute error = 9e-32 relative error = 4.1939682567299876043267618175153e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.363 y[1] (analytic) = 0.21349243978820704408753801569205 y[1] (numeric) = 0.21349243978820704408753801569195 absolute error = 1.0e-31 relative error = 4.6840066139674060884108082639450e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.364 y[1] (analytic) = 0.21239039136900220087353127982608 y[1] (numeric) = 0.21239039136900220087353127982599 absolute error = 9e-32 relative error = 4.2374798322978774295155424052779e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.365 y[1] (analytic) = 0.21128775458992287504822305678669 y[1] (numeric) = 0.2112877545899228750482230567866 absolute error = 9e-32 relative error = 4.2595937551930634153035259130159e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.366 y[1] (analytic) = 0.21018453041724017794998476662055 y[1] (numeric) = 0.21018453041724017794998476662048 absolute error = 7e-32 relative error = 3.3304068506393903157067384871108e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.367 y[1] (analytic) = 0.20908071981818872030665614485149 y[1] (numeric) = 0.2090807198181887203066561448514 absolute error = 9e-32 relative error = 4.3045575927929515665499251322425e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.368 y[1] (analytic) = 0.20797632376096578099047380457932 y[1] (numeric) = 0.20797632376096578099047380457924 absolute error = 8e-32 relative error = 3.8465916962714806035651537059050e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.369 y[1] (analytic) = 0.20687134321473047443408994125288 y[1] (numeric) = 0.2068713432147304744340899412528 absolute error = 8e-32 relative error = 3.8671378431067064530425253324156e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.37 y[1] (analytic) = 0.20576577914960291670837815082275 y[1] (numeric) = 0.20576577914960291670837815082267 absolute error = 8e-32 relative error = 3.8879156840669627273023524183685e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.371 y[1] (analytic) = 0.20465963253666339026272504657077 y[1] (numeric) = 0.20465963253666339026272504657069 absolute error = 8e-32 relative error = 3.9089291331385802507116527714677e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.372 y[1] (analytic) = 0.20355290434795150732850807393913 y[1] (numeric) = 0.20355290434795150732850807393905 absolute error = 8e-32 relative error = 3.9301821929913963883953343459743e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.373 y[1] (analytic) = 0.2024455955564653719864616361436 y[1] (numeric) = 0.20244559555646537198646163614352 absolute error = 8e-32 relative error = 3.9516789575047434296658814592474e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.374 y[1] (analytic) = 0.20133770713616074089863535624862 y[1] (numeric) = 0.20133770713616074089863535624855 absolute error = 7e-32 relative error = 3.4767456625827358541766734126454e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.375 y[1] (analytic) = 0.20022924006195018270565001370607 y[1] (numeric) = 0.200229240061950182705650013706 absolute error = 7e-32 relative error = 3.4959928918644579663357014070157e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.376 y[1] (analytic) = 0.19912019530970223608995840511123 y[1] (numeric) = 0.19912019530970223608995840511115 absolute error = 8e-32 relative error = 4.0176738414489671799644523923881e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.377 y[1] (analytic) = 0.19801057385624056650582009010789 y[1] (numeric) = 0.19801057385624056650582009010782 absolute error = 7e-32 relative error = 3.5351647458393473530886339439768e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=610.3MB, alloc=4.6MB, time=29.36 TOP MAIN SOLVE Loop x[1] = 4.378 y[1] (analytic) = 0.19690037667934312157670069397658 y[1] (numeric) = 0.19690037667934312157670069397651 absolute error = 7e-32 relative error = 3.5550973126880625869884147673262e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.379 y[1] (analytic) = 0.19578960475774128516080814846359 y[1] (numeric) = 0.19578960475774128516080814846351 absolute error = 8e-32 relative error = 4.0860187699437549609203695268976e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.38 y[1] (analytic) = 0.194678259071119030085479961853 y[1] (numeric) = 0.19467825907111903008547996185293 absolute error = 7e-32 relative error = 3.5956762883536933103091227197030e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.381 y[1] (analytic) = 0.19356634060011206955113731814512 y[1] (numeric) = 0.19356634060011206955113731814505 absolute error = 7e-32 relative error = 3.6163312166247292241458481907445e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.382 y[1] (analytic) = 0.19245385032630700720552351348198 y[1] (numeric) = 0.19245385032630700720552351348191 absolute error = 7e-32 relative error = 3.6372356220109108218946979962528e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.383 y[1] (analytic) = 0.19134078923224048588894594565187 y[1] (numeric) = 0.19134078923224048588894594565181 absolute error = 6e-32 relative error = 3.1357663068471412504922531187988e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.384 y[1] (analytic) = 0.1902271583013983350512425796069 y[1] (numeric) = 0.19022715830139833505124257960682 absolute error = 8e-32 relative error = 4.2054983480984865463971509000144e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.385 y[1] (analytic) = 0.18911295851821471684119551843922 y[1] (numeric) = 0.18911295851821471684119551843916 absolute error = 6e-32 relative error = 3.1727069614968243494337038370701e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.386 y[1] (analytic) = 0.18799819086807127086911601518159 y[1] (numeric) = 0.18799819086807127086911601518151 absolute error = 8e-32 relative error = 4.2553600984458635018580372064829e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.387 y[1] (analytic) = 0.18688285633729625764332696612066 y[1] (numeric) = 0.18688285633729625764332696612059 absolute error = 7e-32 relative error = 3.7456619281150232916480806240000e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.388 y[1] (analytic) = 0.18576695591316370068127063104089 y[1] (numeric) = 0.18576695591316370068127063104082 absolute error = 7e-32 relative error = 3.7681620854422206860780350319618e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.389 y[1] (analytic) = 0.1846504905838925272959710299437 y[1] (numeric) = 0.18465049058389252729597102994363 absolute error = 7e-32 relative error = 3.7909457905391698745021542017465e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.39 y[1] (analytic) = 0.18353346133864570805858216931543 y[1] (numeric) = 0.18353346133864570805858216931537 absolute error = 6e-32 relative error = 3.2691586352905613172967934838597e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.391 y[1] (analytic) = 0.18241586916752939493775495394141 y[1] (numeric) = 0.18241586916752939493775495394135 absolute error = 6e-32 relative error = 3.2891875182688431850608615768339e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.392 y[1] (analytic) = 0.18129771506159205811655734258292 y[1] (numeric) = 0.18129771506159205811655734258286 absolute error = 6e-32 relative error = 3.3094735904209422070409527010391e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.393 y[1] (analytic) = 0.18017900001282362148768400754606 y[1] (numeric) = 0.180179000012823621487684007546 absolute error = 6e-32 relative error = 3.3300218114058633955388771634632e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.394 y[1] (analytic) = 0.17905972501415459682769345927404 y[1] (numeric) = 0.17905972501415459682769345927398 absolute error = 6e-32 relative error = 3.3508372692551060793737098705763e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.395 y[1] (analytic) = 0.17793989105945521665101229758571 y[1] (numeric) = 0.17793989105945521665101229758566 absolute error = 5e-32 relative error = 2.8099376537941936134929352693309e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.396 y[1] (analytic) = 0.17681949914353456574444795106119 y[1] (numeric) = 0.17681949914353456574444795106114 absolute error = 5e-32 relative error = 2.8277424289847197136246144825436e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.397 y[1] (analytic) = 0.17569855026213971138295296533728 y[1] (numeric) = 0.17569855026213971138295296533723 absolute error = 5e-32 relative error = 2.8457832990312508972528239803591e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.398 y[1] (analytic) = 0.17457704541195483222738559972034 y[1] (numeric) = 0.17457704541195483222738559972029 absolute error = 5e-32 relative error = 2.8640649681069730363184886901016e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.399 y[1] (analytic) = 0.17345498559060034590501318954883 y[1] (numeric) = 0.17345498559060034590501318954878 absolute error = 5e-32 relative error = 2.8825922662155833138491847290977e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.4 y[1] (analytic) = 0.17233237179663203527350642914081 y[1] (numeric) = 0.17233237179663203527350642914077 absolute error = 4e-32 relative error = 2.3210961227414463628254560074231e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.401 y[1] (analytic) = 0.17120920502954017336917442694099 y[1] (numeric) = 0.17120920502954017336917442694094 absolute error = 5e-32 relative error = 2.9204037242841631539417705252670e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.402 y[1] (analytic) = 0.17008548628974864704019208063473 y[1] (numeric) = 0.17008548628974864704019208063467 absolute error = 6e-32 relative error = 3.5276378548718243031220397291015e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.403 y[1] (analytic) = 0.16896121657861407926557301552197 y[1] (numeric) = 0.16896121657861407926557301552191 absolute error = 6e-32 relative error = 3.5511107942385860754079966472129e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=614.1MB, alloc=4.6MB, time=29.54 x[1] = 4.404 y[1] (analytic) = 0.16783639689842495016064302433866 y[1] (numeric) = 0.1678363968984249501606430243386 absolute error = 6e-32 relative error = 3.5749099187533300847049350084273e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.405 y[1] (analytic) = 0.16671102825240071666977064097625 y[1] (numeric) = 0.16671102825240071666977064097619 absolute error = 6e-32 relative error = 3.5990420447266344526791637484023e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.406 y[1] (analytic) = 0.16558511164469093094711317417832 y[1] (numeric) = 0.16558511164469093094711317417827 absolute error = 5e-32 relative error = 3.0195951497915437082836634600464e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.407 y[1] (analytic) = 0.16445864808037435742613822028571 y[1] (numeric) = 0.16445864808037435742613822028565 absolute error = 6e-32 relative error = 3.6483335294521425038958676513477e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.408 y[1] (analytic) = 0.16333163856545808857868236645486 y[1] (numeric) = 0.1633316385654580885786823664548 absolute error = 6e-32 relative error = 3.6735075045459684185619406695183e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.409 y[1] (analytic) = 0.16220408410687665936431048748814 y[1] (numeric) = 0.16220408410687665936431048748808 absolute error = 6e-32 relative error = 3.6990437281755406571026511588859e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.41 y[1] (analytic) = 0.1610759857124911603707407304847 y[1] (numeric) = 0.16107598571249116037074073048464 absolute error = 6e-32 relative error = 3.7249500435835051458735277116166e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.411 y[1] (analytic) = 0.15994734439108834964610197194726 y[1] (numeric) = 0.1599473443910883496461019719472 absolute error = 6e-32 relative error = 3.7512345221120763443980917090699e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.412 y[1] (analytic) = 0.1588181611523797632237922217591 y[1] (numeric) = 0.15881816115237976322379222175904 absolute error = 6e-32 relative error = 3.7779054715557602934494635416666e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.413 y[1] (analytic) = 0.15768843700700082434070813757639 y[1] (numeric) = 0.15768843700700082434070813757633 absolute error = 6e-32 relative error = 3.8049714448838253326904236096993e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.414 y[1] (analytic) = 0.15655817296650995134961750166052 y[1] (numeric) = 0.15655817296650995134961750166047 absolute error = 5e-32 relative error = 3.1937010411264648779601084442294e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.415 y[1] (analytic) = 0.15542737004338766432644820000213 y[1] (numeric) = 0.15542737004338766432644820000208 absolute error = 5e-32 relative error = 3.2169366300184107428267344965421e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.416 y[1] (analytic) = 0.15429602925103569037326893076006 y[1] (numeric) = 0.15429602925103569037326893076001 absolute error = 5e-32 relative error = 3.2405240914302000444652381966957e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.417 y[1] (analytic) = 0.15316415160377606761773855555348 y[1] (numeric) = 0.15316415160377606761773855555343 absolute error = 5e-32 relative error = 3.2644714495168668114794514059101e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.418 y[1] (analytic) = 0.15203173811685024790980269300093 y[1] (numeric) = 0.15203173811685024790980269300088 absolute error = 5e-32 relative error = 3.2887869743073280312671214723943e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.419 y[1] (analytic) = 0.15089878980641819821641783909447 y[1] (numeric) = 0.15089878980641819821641783909441 absolute error = 6e-32 relative error = 3.9761750294334045117565639634976e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.42 y[1] (analytic) = 0.1497653076895575007150849835282 y[1] (numeric) = 0.14976530768955750071508498352813 absolute error = 7e-32 relative error = 4.6739796472157752534284552072101e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.421 y[1] (analytic) = 0.14863129278426245158697637496644 y[1] (numeric) = 0.14863129278426245158697637496639 absolute error = 5e-32 relative error = 3.3640291397165427296149529798453e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.422 y[1] (analytic) = 0.14749674610944315851044077143525 y[1] (numeric) = 0.14749674610944315851044077143518 absolute error = 7e-32 relative error = 4.7458674070043367675764850032706e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.423 y[1] (analytic) = 0.14636166868492463685567419454942 y[1] (numeric) = 0.14636166868492463685567419454935 absolute error = 7e-32 relative error = 4.7826729927963750536752719526104e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.424 y[1] (analytic) = 0.1452260615314459045813448881456 y[1] (numeric) = 0.14522606153144590458134488814554 absolute error = 6e-32 relative error = 4.1314898556970200849174522665737e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.425 y[1] (analytic) = 0.14408992567065907583396286307489 y[1] (numeric) = 0.14408992567065907583396286307482 absolute error = 7e-32 relative error = 4.8580773204086708627600861478321e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.426 y[1] (analytic) = 0.14295326212512845325078609041692 y[1] (numeric) = 0.14295326212512845325078609041686 absolute error = 6e-32 relative error = 4.1971759936112116133320402939712e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.427 y[1] (analytic) = 0.14181607191832961896705708520834 y[1] (numeric) = 0.14181607191832961896705708520827 absolute error = 7e-32 relative error = 4.9359708707989220134771114168273e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.428 y[1] (analytic) = 0.14067835607464852432836530192815 y[1] (numeric) = 0.14067835607464852432836530192808 absolute error = 7e-32 relative error = 4.9758898208090885541487809985234e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.429 y[1] (analytic) = 0.13954011561938057830893244145248 y[1] (numeric) = 0.13954011561938057830893244145242 absolute error = 6e-32 relative error = 4.2998387763745455710278118137714e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.43 y[1] (analytic) = 0.1384013515787297346366194469752 y[1] (numeric) = 0.13840135157872973463661944697514 absolute error = 6e-32 relative error = 4.3352177789874360776626117215884e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=618.0MB, alloc=4.6MB, time=29.73 TOP MAIN SOLVE Loop x[1] = 4.431 y[1] (analytic) = 0.1372620649798075776254556434903 y[1] (numeric) = 0.13726206497980757762545564349024 absolute error = 6e-32 relative error = 4.3712004484870974783866845729899e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.432 y[1] (analytic) = 0.13612225685063240671649215184274 y[1] (numeric) = 0.13612225685063240671649215184267 absolute error = 7e-32 relative error = 5.1424360438580833660835150791378e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.433 y[1] (analytic) = 0.13498192822012831972778338407515 y[1] (numeric) = 0.13498192822012831972778338407508 absolute error = 7e-32 relative error = 5.1858793931172851737764109483196e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.434 y[1] (analytic) = 0.13384108011812429481430210182659 y[1] (numeric) = 0.13384108011812429481430210182652 absolute error = 7e-32 relative error = 5.2300833150942901580324934275919e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.435 y[1] (analytic) = 0.13269971357535327113859519387379 y[1] (numeric) = 0.13269971357535327113859519387372 absolute error = 7e-32 relative error = 5.2750679043666991634292788104590e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.436 y[1] (analytic) = 0.13155782962345122825298900254369 y[1] (numeric) = 0.13155782962345122825298900254362 absolute error = 7e-32 relative error = 5.3208539697223724877809781654183e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.437 y[1] (analytic) = 0.13041542929495626419415470166576 y[1] (numeric) = 0.13041542929495626419415470166569 absolute error = 7e-32 relative error = 5.3674630661747326368952702667363e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.438 y[1] (analytic) = 0.1292725136233076722908459009721 y[1] (numeric) = 0.12927251362330767229084590097203 absolute error = 7e-32 relative error = 5.4149175287157940491901684795039e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.439 y[1] (analytic) = 0.12812908364284501668562232339031 y[1] (numeric) = 0.12812908364284501668562232339024 absolute error = 7e-32 relative error = 5.4632405079179647647201858445927e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.44 y[1] (analytic) = 0.12698514038880720657137507250654 y[1] (numeric) = 0.12698514038880720657137507250647 absolute error = 7e-32 relative error = 5.5124560075038494927424838331922e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.441 y[1] (analytic) = 0.12584068489733156914347067760223 y[1] (numeric) = 0.12584068489733156914347067760215 absolute error = 8e-32 relative error = 6.3572444845853176641854744857119e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.442 y[1] (analytic) = 0.12469571820545292126833277308521 y[1] (numeric) = 0.12469571820545292126833277308515 absolute error = 6e-32 relative error = 4.8117129331692008989095328312392e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.443 y[1] (analytic) = 0.12355024135110263986928193784273 y[1] (numeric) = 0.12355024135110263986928193784266 absolute error = 7e-32 relative error = 5.6657113118116362208122454700492e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.444 y[1] (analytic) = 0.12240425537310773103045588803741 y[1] (numeric) = 0.12240425537310773103045588803735 absolute error = 6e-32 relative error = 4.9017903680807837748649796726869e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.445 y[1] (analytic) = 0.12125776131118989781963388414721 y[1] (numeric) = 0.12125776131118989781963388414713 absolute error = 8e-32 relative error = 6.5975158319715281761252651931899e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.446 y[1] (analytic) = 0.12011076020596460683079087961163 y[1] (numeric) = 0.12011076020596460683079087961156 absolute error = 7e-32 relative error = 5.8279541216760906408476376342471e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.447 y[1] (analytic) = 0.11896325309894015344720860429119 y[1] (numeric) = 0.11896325309894015344720860429112 absolute error = 7e-32 relative error = 5.8841699580778891565643268561959e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.448 y[1] (analytic) = 0.11781524103251672582597244106842 y[1] (numeric) = 0.11781524103251672582597244106834 absolute error = 8e-32 relative error = 6.7902929450290892841992671166364e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.449 y[1] (analytic) = 0.11666672504998546760468461831924 y[1] (numeric) = 0.11666672504998546760468461831916 absolute error = 8e-32 relative error = 6.8571394256352244342086811698384e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.45 y[1] (analytic) = 0.11551770619552753933122590465757 y[1] (numeric) = 0.11551770619552753933122590465749 absolute error = 8e-32 relative error = 6.9253452682474864994325663832775e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.451 y[1] (analytic) = 0.11436818551421317861739965530357 y[1] (numeric) = 0.11436818551421317861739965530349 absolute error = 8e-32 relative error = 6.9949522798066905925242695627094e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.452 y[1] (analytic) = 0.11321816405200075901729372164426 y[1] (numeric) = 0.11321816405200075901729372164419 absolute error = 7e-32 relative error = 6.1827534995046565603106663769429e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.453 y[1] (analytic) = 0.11206764285573584763119739704251 y[1] (numeric) = 0.11206764285573584763119739704244 absolute error = 7e-32 relative error = 6.2462275654455115579761609862604e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.454 y[1] (analytic) = 0.11091662297315026143591223270402 y[1] (numeric) = 0.11091662297315026143591223270396 absolute error = 6e-32 relative error = 5.4094686974489190885041628585373e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.455 y[1] (analytic) = 0.10976510545286112234229721743104 y[1] (numeric) = 0.10976510545286112234229721743097 absolute error = 7e-32 relative error = 6.3772543843691437459314038866793e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.456 y[1] (analytic) = 0.10861309134436991098089047437227 y[1] (numeric) = 0.10861309134436991098089047437221 absolute error = 6e-32 relative error = 5.5241959562465000679006330991359e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=621.8MB, alloc=4.6MB, time=29.92 x[1] = 4.457 y[1] (analytic) = 0.1074605816980615192164512864211 y[1] (numeric) = 0.10746058169806151921645128642104 absolute error = 6e-32 relative error = 5.5834426960934959872120500718158e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.458 y[1] (analytic) = 0.10630757756520330139226791971413 y[1] (numeric) = 0.10630757756520330139226791971406 absolute error = 7e-32 relative error = 6.5846670202851529723609818016463e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.459 y[1] (analytic) = 0.10515407999794412430507837173963 y[1] (numeric) = 0.10515407999794412430507837173957 absolute error = 6e-32 relative error = 5.7059126950825935353831736035622e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.46 y[1] (analytic) = 0.104000090049313415911452826877 y[1] (numeric) = 0.10400009004931341591145282687694 absolute error = 6e-32 relative error = 5.7692257738959626854630133950665e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.461 y[1] (analytic) = 0.10284560877322021276648825775211 y[1] (numeric) = 0.10284560877322021276648825775204 absolute error = 7e-32 relative error = 6.8063187952296099313838757715066e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.462 y[1] (analytic) = 0.1016906372244522061956672656083 y[1] (numeric) = 0.10169063722445220619566726560823 absolute error = 7e-32 relative error = 6.8836229087143553985213666712215e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.463 y[1] (analytic) = 0.10053517645867478720073490695549 y[1] (numeric) = 0.10053517645867478720073490695542 absolute error = 7e-32 relative error = 6.9627370703202235995111108248878e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.464 y[1] (analytic) = 0.099379227532430090100448907068861 y[1] (numeric) = 0.099379227532430090100448907068793 absolute error = 6.8e-32 relative error = 6.8424762084017797386415815129679e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.465 y[1] (analytic) = 0.09822279150313603490706031346243 y[1] (numeric) = 0.09822279150313603490706031346236 absolute error = 7.0e-32 relative error = 7.1266555275783478368655401810260e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.466 y[1] (analytic) = 0.097065869429085368439383294258234 y[1] (numeric) = 0.097065869429085368439383294258161 absolute error = 7.3e-32 relative error = 7.5206661650862280710058033044398e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.467 y[1] (analytic) = 0.095908462369444704173314437408028 y[1] (numeric) = 0.095908462369444704173314437407955 absolute error = 7.3e-32 relative error = 7.6114242890059023698100197478902e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.468 y[1] (analytic) = 0.094750571384253560830663556998388 y[1] (numeric) = 0.094750571384253560830663556998325 absolute error = 6.3e-32 relative error = 6.6490364205307436017276607008419e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.469 y[1] (analytic) = 0.093592197534423399707159662380474 y[1] (numeric) = 0.09359219753442339970715966238041 absolute error = 6.4e-32 relative error = 6.8381768658077154826934019680243e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.47 y[1] (analytic) = 0.092433341881736660740497394609888 y[1] (numeric) = 0.092433341881736660740497394609824 absolute error = 6.4e-32 relative error = 6.9239084833570611129586147318940e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.471 y[1] (analytic) = 0.09127400548884579731929088265883 y[1] (numeric) = 0.091274005488845797319290882658764 absolute error = 6.6e-32 relative error = 7.2309744320430393995805690516065e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.472 y[1] (analytic) = 0.09011418941927230983380361906882 y[1] (numeric) = 0.09011418941927230983380361906875 absolute error = 7.0e-32 relative error = 7.7679220610100078121035259541274e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.473 y[1] (analytic) = 0.088953894737405777969324601146956 y[1] (numeric) = 0.088953894737405777969324601146895 absolute error = 6.1e-32 relative error = 6.8574850128905085274455845452088e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.474 y[1] (analytic) = 0.087793122508502891743062629469059 y[1] (numeric) = 0.087793122508502891743062629468999 absolute error = 6.0e-32 relative error = 6.8342483198714013889974788510793e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.475 y[1] (analytic) = 0.086631873798686481285432300337151 y[1] (numeric) = 0.086631873798686481285432300337091 absolute error = 6.0e-32 relative error = 6.9258573512362056659713509978338e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.476 y[1] (analytic) = 0.085470149674944545366606872945311 y[1] (numeric) = 0.08547014967494454536660687294525 absolute error = 6.1e-32 relative error = 7.1369946387121005052951370394079e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.477 y[1] (analytic) = 0.084307951205129278669214835333704 y[1] (numeric) = 0.084307951205129278669214835333629 absolute error = 7.5e-32 relative error = 8.8959580831845686218228500665392e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.478 y[1] (analytic) = 0.08314527945795609780805863575455 y[1] (numeric) = 0.083145279457956097808058635754475 absolute error = 7.5e-32 relative error = 9.0203557542824900248193702972128e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.479 y[1] (analytic) = 0.081982135503002666097735687833719 y[1] (numeric) = 0.081982135503002666097735687833652 absolute error = 6.7e-32 relative error = 8.1725121685255524330448303027895e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.48 y[1] (analytic) = 0.080818520410707917069043398884685 y[1] (numeric) = 0.080818520410707917069043398884624 absolute error = 6.1e-32 relative error = 7.5477749023375965231103374317298e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.481 y[1] (analytic) = 0.079654435252371076735051610917105 y[1] (numeric) = 0.079654435252371076735051610917042 absolute error = 6.3e-32 relative error = 7.9091641037182140463417373418141e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.482 y[1] (analytic) = 0.078489881100150684607727483277027 y[1] (numeric) = 0.078489881100150684607727483276964 absolute error = 6.3e-32 relative error = 8.0265123499950177416579269196035e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.483 y[1] (analytic) = 0.077324859027063613465999484458398 y[1] (numeric) = 0.077324859027063613465999484458331 absolute error = 6.7e-32 relative error = 8.6647425993431265811813246725517e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=625.6MB, alloc=4.6MB, time=30.10 TOP MAIN SOLVE Loop x[1] = 4.484 y[1] (analytic) = 0.076159370106984087876148798433577 y[1] (numeric) = 0.076159370106984087876148798433511 absolute error = 6.6e-32 relative error = 8.6660380603577973742775356573957e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.485 y[1] (analytic) = 0.074993415414642701465418087862649 y[1] (numeric) = 0.074993415414642701465418087862584 absolute error = 6.5e-32 relative error = 8.6674276188931307814982959949237e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.486 y[1] (analytic) = 0.073826996025625432949729192754536 y[1] (numeric) = 0.07382699602562543294972919275446 absolute error = 7.6e-32 relative error = 1.0294337314445289760764300120300e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.487 y[1] (analytic) = 0.072660113016372660916402978566005 y[1] (numeric) = 0.072660113016372660916402978565941 absolute error = 6.4e-32 relative error = 8.8081338361775932194596020449118e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.488 y[1] (analytic) = 0.071492767464178177362776182335437 y[1] (numeric) = 0.071492767464178177362776182335366 absolute error = 7.1e-32 relative error = 9.9310745014277030104786352048994e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.489 y[1] (analytic) = 0.070324960447188199991611739253633 y[1] (numeric) = 0.070324960447188199991611739253561 absolute error = 7.2e-32 relative error = 1.0238185637383998421588545627940e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.49 y[1] (analytic) = 0.06915669304440038326420070507445 y[1] (numeric) = 0.069156693044400383264200705074377 absolute error = 7.3e-32 relative error = 1.0555738972818164454017678804917e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.491 y[1] (analytic) = 0.067987966335662828212055521958204 y[1] (numeric) = 0.067987966335662828212055521958132 absolute error = 7.2e-32 relative error = 1.0590109379728964601252502484319e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.492 y[1] (analytic) = 0.066818781401673091008096006721827 y[1] (numeric) = 0.066818781401673091008096006721764 absolute error = 6.3e-32 relative error = 9.4284868233802492464469102501362e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.493 y[1] (analytic) = 0.065649139323977190298231071037495 y[1] (numeric) = 0.065649139323977190298231071037428 absolute error = 6.7e-32 relative error = 1.0205769746554686614862120383777e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.494 y[1] (analytic) = 0.064479041184968613294240812874659 y[1] (numeric) = 0.064479041184968613294240812874591 absolute error = 6.8e-32 relative error = 1.0546062526725691201226014768926e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.495 y[1] (analytic) = 0.063308488067887320628865247417477 y[1] (numeric) = 0.063308488067887320628865247417409 absolute error = 6.8e-32 relative error = 1.0741055753389948345901086880765e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.496 y[1] (analytic) = 0.06213748105681874997400757380731 y[1] (numeric) = 0.062137481056818749974007573807243 absolute error = 6.7e-32 relative error = 1.0782542011758562297523094247542e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.497 y[1] (analytic) = 0.060966021236692818422961501357701 y[1] (numeric) = 0.060966021236692818422961501357635 absolute error = 6.6e-32 relative error = 1.0825702360297287515829979728528e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.498 y[1] (analytic) = 0.059794109693282923637573785363901 y[1] (numeric) = 0.059794109693282923637573785363826 absolute error = 7.5e-32 relative error = 1.2543041511064635312178635066838e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.499 y[1] (analytic) = 0.058621747513204943761254748279063 y[1] (numeric) = 0.058621747513204943761254748278994 absolute error = 6.9e-32 relative error = 1.1770375829287123334653770201204e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.5 y[1] (analytic) = 0.057448935783916236098751186852869 y[1] (numeric) = 0.0574489357839162360987511868528 absolute error = 6.9e-32 relative error = 1.2010666352381356416847238054791e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.501 y[1] (analytic) = 0.056275675593714634563597689822552 y[1] (numeric) = 0.056275675593714634563597689822484 absolute error = 6.8e-32 relative error = 1.2083373372703648489862563678845e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.502 y[1] (analytic) = 0.055101968031737445894164013910803 y[1] (numeric) = 0.055101968031737445894164013910738 absolute error = 6.5e-32 relative error = 1.1796311878109602002197312157874e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.503 y[1] (analytic) = 0.053927814187960444639217788215832 y[1] (numeric) = 0.053927814187960444639217788215765 absolute error = 6.7e-32 relative error = 1.2424015512009749183568028453404e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.504 y[1] (analytic) = 0.052753215153196866913923438575473 y[1] (numeric) = 0.052753215153196866913923438575399 absolute error = 7.4e-32 relative error = 1.4027581027071402876042054195366e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.505 y[1] (analytic) = 0.051578172019096402927199844146932 y[1] (numeric) = 0.05157817201909640292719984414685 absolute error = 8.2e-32 relative error = 1.5898198169884764468415231518900e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.506 y[1] (analytic) = 0.050402685878144188281360858264606 y[1] (numeric) = 0.050402685878144188281360858264532 absolute error = 7.4e-32 relative error = 1.4681757273591678229798076233564e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.507 y[1] (analytic) = 0.049226757823659794044964444618616 y[1] (numeric) = 0.04922675782365979404496444461854 absolute error = 7.6e-32 relative error = 1.5438757976352490270432720450394e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.508 y[1] (analytic) = 0.04805038894979621559979779793375 y[1] (numeric) = 0.048050388949796215599797797933679 absolute error = 7.1e-32 relative error = 1.4776155105462703021584207649815e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.509 y[1] (analytic) = 0.046873580351538860262927435621476 y[1] (numeric) = 0.046873580351538860262927435621411 absolute error = 6.5e-32 relative error = 1.3867086642948547270564849607780e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.51 y[1] (analytic) = 0.045696333124704533684744863322871 y[1] (numeric) = 0.045696333124704533684744863322798 memory used=629.4MB, alloc=4.6MB, time=30.28 absolute error = 7.3e-32 relative error = 1.5975023597798145676892433908061e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.511 y[1] (analytic) = 0.044518648365940425023940032857412 y[1] (numeric) = 0.044518648365940425023940032857348 absolute error = 6.4e-32 relative error = 1.4375998002887266043661540942286e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.512 y[1] (analytic) = 0.043340527172723090900336425838766 y[1] (numeric) = 0.043340527172723090900336425838698 absolute error = 6.8e-32 relative error = 1.5689703018378756662494741258153e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.513 y[1] (analytic) = 0.042161970643357438126523210111324 y[1] (numeric) = 0.042161970643357438126523210111247 absolute error = 7.7e-32 relative error = 1.8262903470839365671215002978706e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.514 y[1] (analytic) = 0.040982979876975705219221529200236 y[1] (numeric) = 0.040982979876975705219221529200169 absolute error = 6.7e-32 relative error = 1.6348249981119770324830812551099e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.515 y[1] (analytic) = 0.039803555973536442691323597148777 y[1] (numeric) = 0.039803555973536442691323597148714 absolute error = 6.3e-32 relative error = 1.5827731583048963811533917672273e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.516 y[1] (analytic) = 0.038623700033823492125544882439403 y[1] (numeric) = 0.038623700033823492125544882439337 absolute error = 6.6e-32 relative error = 1.7087953754353563504996857742707e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.517 y[1] (analytic) = 0.037443413159444964030631275157014 y[1] (numeric) = 0.037443413159444964030631275156942 absolute error = 7.2e-32 relative error = 1.9229016247371205079341293589233e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.518 y[1] (analytic) = 0.036262696452832214481064741151494 y[1] (numeric) = 0.036262696452832214481064741151427 absolute error = 6.7e-32 relative error = 1.8476287356939535901262589491196e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.519 y[1] (analytic) = 0.035081551017238820541212575690822 y[1] (numeric) = 0.035081551017238820541212575690757 absolute error = 6.5e-32 relative error = 1.8528257193662694653865727524500e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.52 y[1] (analytic) = 0.033899977956739554474866976963034 y[1] (numeric) = 0.033899977956739554474866976962964 absolute error = 7.0e-32 relative error = 2.0648980978491611905162427056818e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.521 y[1] (analytic) = 0.032717978376229356741123266783837 y[1] (numeric) = 0.032717978376229356741123266783766 absolute error = 7.1e-32 relative error = 2.1700607288005220834309023509661e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.522 y[1] (analytic) = 0.031535553381422307777546691994019 y[1] (numeric) = 0.031535553381422307777546691993946 absolute error = 7.3e-32 relative error = 2.3148475981082521995488557924093e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.523 y[1] (analytic) = 0.030352704078850598571579345285281 y[1] (numeric) = 0.030352704078850598571579345285212 absolute error = 6.9e-32 relative error = 2.2732735713019511601302240788114e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.524 y[1] (analytic) = 0.029169431575863500021140348573038 y[1] (numeric) = 0.029169431575863500021140348572975 absolute error = 6.3e-32 relative error = 2.1597952581335146140551038669812e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.525 y[1] (analytic) = 0.027985736980626331085374045537391 y[1] (numeric) = 0.027985736980626331085374045537328 absolute error = 6.3e-32 relative error = 2.2511467196169595685153933560825e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.526 y[1] (analytic) = 0.026801621402119425726502552577611 y[1] (numeric) = 0.026801621402119425726502552577542 absolute error = 6.9e-32 relative error = 2.5744711099658918283727680290311e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.527 y[1] (analytic) = 0.025617085950137098643740619168598 y[1] (numeric) = 0.025617085950137098643740619168524 absolute error = 7.4e-32 relative error = 2.8886970260410889379692387164202e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.528 y[1] (analytic) = 0.024432131735286609800232349468085 y[1] (numeric) = 0.02443213173528660980023234946801 absolute error = 7.5e-32 relative error = 3.0697280455343855347832074543375e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.529 y[1] (analytic) = 0.023246759868987127743970936998822 y[1] (numeric) = 0.023246759868987127743970936998742 absolute error = 8.0e-32 relative error = 3.4413398017986081433554363441073e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.53 y[1] (analytic) = 0.02206097146346869172366416331858 y[1] (numeric) = 0.022060971463468691723664163318511 absolute error = 6.9e-32 relative error = 3.1276954468781579525814611036575e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.531 y[1] (analytic) = 0.020874767631771172600510009790855 y[1] (numeric) = 0.020874767631771172600510009790779 absolute error = 7.6e-32 relative error = 3.6407590896642516185617972098990e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.532 y[1] (analytic) = 0.01968814948774323255684832887766 y[1] (numeric) = 0.019688149487743232556848328877598 absolute error = 6.2e-32 relative error = 3.1491024607771195823356487454892e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.533 y[1] (analytic) = 0.018501118146041283602656117792823 y[1] (numeric) = 0.018501118146041283602656117792752 absolute error = 7.1e-32 relative error = 3.8376058916845516912692720205200e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.534 y[1] (analytic) = 0.017313674722128444880855532874515 y[1] (numeric) = 0.017313674722128444880855532874439 absolute error = 7.6e-32 relative error = 4.3895938453126368687437928380457e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.535 y[1] (analytic) = 0.01612582033227349877240537766154 y[1] (numeric) = 0.016125820332273498772405377661465 absolute error = 7.5e-32 relative error = 4.6509261826450056344642747485080e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.536 y[1] (analytic) = 0.014937556093549845802148391382816 y[1] (numeric) = 0.014937556093549845802148391382741 absolute error = 7.5e-32 relative error = 5.0209016475182034522193090033176e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=633.2MB, alloc=4.6MB, time=30.47 x[1] = 4.537 y[1] (analytic) = 0.013748883123834458346388257395066 y[1] (numeric) = 0.013748883123834458346388257395002 absolute error = 6.4e-32 relative error = 4.6549235616857065475653624003962e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.538 y[1] (analytic) = 0.01255980254180683314317184302607 y[1] (numeric) = 0.012559802541806833143171843025995 absolute error = 7.5e-32 relative error = 5.9714314576485865461816077348620e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.539 y[1] (analytic) = 0.011370315466947942606253773298084 y[1] (numeric) = 0.011370315466947942606253773298015 absolute error = 6.9e-32 relative error = 6.0684332110726569357278755399156e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.54 y[1] (analytic) = 0.01018042301953918494372203111763 y[1] (numeric) = 0.010180423019539184943722031117566 absolute error = 6.4e-32 relative error = 6.2865757029118961636559830512617e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.541 y[1] (analytic) = 0.008990126320661333082264865719197 y[1] (numeric) = 0.0089901263206613330822648657191339 absolute error = 6.31e-32 relative error = 7.0188112768762772962269137177420e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.542 y[1] (analytic) = 0.007799426492193482398060879442646 y[1] (numeric) = 0.0077994264921934823980608794425849 absolute error = 6.11e-32 relative error = 7.8339093343793355974093047805790e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.543 y[1] (analytic) = 0.006608324656811997255275750302621 y[1] (numeric) = 0.0066083246568119972552757503025495 absolute error = 7.15e-32 relative error = 1.0819686337034958833200382158510e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.544 y[1] (analytic) = 0.005416821937989456353150634272457 y[1] (numeric) = 0.0054168219379894563531506342723805 absolute error = 7.65e-32 relative error = 1.4122672089973525813741835177914e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.545 y[1] (analytic) = 0.00422491945999359688266887675292 y[1] (numeric) = 0.0042249194599935968826688767528508 absolute error = 6.92e-32 relative error = 1.6379010453398057610712607983240e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.546 y[1] (analytic) = 0.003032618347886257493789247324807 y[1] (numeric) = 0.0030326183478862574937892473247408 absolute error = 6.62e-32 relative error = 2.1829321202300831592287529545812e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.547 y[1] (analytic) = 0.001839919727522320074235495592932 y[1] (numeric) = 0.0018399197275223200742354955928602 absolute error = 7.18e-32 relative error = 3.9023441580621344735810495355560e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.548 y[1] (analytic) = 0.000646824725548650340833608714952 y[1] (numeric) = 0.0006468247255486503408336087148834 absolute error = 6.860e-32 relative error = 1.0605655178350214846277602330474e-26 % Correct digits = 27 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.549 y[1] (analytic) = -0.000546665530596962755610266930259 y[1] (numeric) = -0.0005466655305969627556102669303297 absolute error = 7.070e-32 relative error = 1.2932953706226014135830558022060e-26 % Correct digits = 27 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.55 y[1] (analytic) = -0.001740549912686868810896696545408 y[1] (numeric) = -0.0017405499126868688108966965454806 absolute error = 7.26e-32 relative error = 4.1710955526651996162948040978107e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.551 y[1] (analytic) = -0.002934827291704618932488496792852 y[1] (numeric) = -0.0029348272917046189324884967929115 absolute error = 5.95e-32 relative error = 2.0273765399476354081204688051734e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.552 y[1] (analytic) = -0.004129496537846029888037242276396 y[1] (numeric) = -0.0041294965378460298880372422764646 absolute error = 6.86e-32 relative error = 1.6612194578998768362516437414333e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.553 y[1] (analytic) = -0.005324556520520249436381458012127 y[1] (numeric) = -0.0053245565205202494363814580121908 absolute error = 6.38e-32 relative error = 1.1982218566771126610942216040975e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.554 y[1] (analytic) = -0.006520006108350822840015640063934 y[1] (numeric) = -0.0065200061083508228400156400640084 absolute error = 7.44e-32 relative error = 1.1411032254204254689797905961660e-27 % Correct digits = 28 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.555 y[1] (analytic) = -0.007715844169176760558027670247766 y[1] (numeric) = -0.0077158441691767605580276702478326 absolute error = 6.66e-32 relative error = 8.6315895629480895769743845042549e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.556 y[1] (analytic) = -0.008912069570053607118500615473409 y[1] (numeric) = -0.00891206957005360711850061547347 absolute error = 6.10e-32 relative error = 6.8446503385669910135368435518476e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.557 y[1] (analytic) = -0.010108681177254511169373327899605 y[1] (numeric) = -0.010108681177254511169373327899672 absolute error = 6.7e-32 relative error = 6.6279664800148547113095086771103e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.558 y[1] (analytic) = -0.011305677856271296706752688626066 y[1] (numeric) = -0.011305677856271296706752688626135 absolute error = 6.9e-32 relative error = 6.1031280810575610877125656878856e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.559 y[1] (analytic) = -0.012503058471815535479668765138839 y[1] (numeric) = -0.012503058471815535479668765138901 absolute error = 6.2e-32 relative error = 4.9587866952522654897782052422456e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.56 y[1] (analytic) = -0.01370082188781962057026258116442 y[1] (numeric) = -0.01370082188781962057026258116449 absolute error = 7.0e-32 relative error = 5.1091825419781408834373712737012e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.561 y[1] (analytic) = -0.01489896696743784114839462697512 y[1] (numeric) = -0.014898966967437841148394626975195 absolute error = 7.5e-32 relative error = 5.0339060529441301896986934999739e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.562 y[1] (analytic) = -0.016097492573047458399660668525138 y[1] (numeric) = -0.016097492573047458399660668525215 absolute error = 7.7e-32 relative error = 4.7833536589992616914334197339243e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.563 y[1] (analytic) = -0.017296397566249782625799845086622 y[1] (numeric) = -0.017296397566249782625799845086692 absolute error = 7.0e-32 relative error = 4.0470855119906595903912898419628e-28 % Correct digits = 29 h = 0.001 memory used=637.0MB, alloc=4.6MB, time=30.65 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.564 y[1] (analytic) = -0.018495680807871251516478477298108 y[1] (numeric) = -0.018495680807871251516478477298175 absolute error = 6.7e-32 relative error = 3.6224673585135967696255910475210e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.565 y[1] (analytic) = -0.019695341157964509591431440737506 y[1] (numeric) = -0.019695341157964509591431440737576 absolute error = 7.0e-32 relative error = 3.5541400089783678516887006218233e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.566 y[1] (analytic) = -0.020895377475809488811941394289165 y[1] (numeric) = -0.020895377475809488811941394289227 absolute error = 6.2e-32 relative error = 2.9671634346772246762882270694939e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.567 y[1] (analytic) = -0.02209578861991449036063458769211 y[1] (numeric) = -0.022095788619914490360634587692172 absolute error = 6.2e-32 relative error = 2.8059645693804585743905368450029e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.568 y[1] (analytic) = -0.023296573448017267588570408736225 y[1] (numeric) = -0.023296573448017267588570408736294 absolute error = 6.9e-32 relative error = 2.9618089610458346020636858926862e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.569 y[1] (analytic) = -0.024497730817086110128600267616163 y[1] (numeric) = -0.024497730817086110128600267616239 absolute error = 7.6e-32 relative error = 3.1023281530627840649515261978044e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.57 y[1] (analytic) = -0.025699259583320929173969853962253 y[1] (numeric) = -0.02569925958332092917396985396233 absolute error = 7.7e-32 relative error = 2.9961952697646492941384616910787e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.571 y[1] (analytic) = -0.026901158602154343921137241044636 y[1] (numeric) = -0.026901158602154343921137241044701 absolute error = 6.5e-32 relative error = 2.4162528075944863003791973014219e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.572 y[1] (analytic) = -0.028103426728252769175777751593606 y[1] (numeric) = -0.02810342672825276917577775159368 absolute error = 7.4e-32 relative error = 2.6331308532424183629437342584165e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.573 y[1] (analytic) = -0.029306062815517504120944940597955 y[1] (numeric) = -0.02930606281551750412094494059801 absolute error = 5.5e-32 relative error = 1.8767447659628165868876164943183e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.574 y[1] (analytic) = -0.030509065717085822246355492334642 y[1] (numeric) = -0.030509065717085822246355492334706 absolute error = 6.4e-32 relative error = 2.0977371314310171174068425324046e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.575 y[1] (analytic) = -0.03171243428533206243776427175213 y[1] (numeric) = -0.0317124342853320624377642717522 absolute error = 7.0e-32 relative error = 2.2073360679339923022978630464596e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.576 y[1] (analytic) = -0.032916167371868721225394214173832 y[1] (numeric) = -0.032916167371868721225394214173906 absolute error = 7.4e-32 relative error = 2.2481353665506915218655762014518e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.577 y[1] (analytic) = -0.034120263827547546190384182114217 y[1] (numeric) = -0.034120263827547546190384182114286 absolute error = 6.9e-32 relative error = 2.0222586891104791327206359541590e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.578 y[1] (analytic) = -0.035324722502460630528216363805969 y[1] (numeric) = -0.035324722502460630528216363806032 absolute error = 6.3e-32 relative error = 1.7834535004659011792972829878015e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.579 y[1] (analytic) = -0.0365295422459415087680832348268 y[1] (numeric) = -0.036529542245941508768083234826871 absolute error = 7.1e-32 relative error = 1.9436323489076355684722938413106e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.58 y[1] (analytic) = -0.03773472190656625364715255198978 y[1] (numeric) = -0.037734721906566253647152551989857 absolute error = 7.7e-32 relative error = 2.0405609504863254131106260438419e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.581 y[1] (analytic) = -0.038940260332154574138687297423593 y[1] (numeric) = -0.038940260332154574138687297423653 absolute error = 6.0e-32 relative error = 1.5408217481909213858874294197054e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.582 y[1] (analytic) = -0.040146156369770914632975940521226 y[1] (numeric) = -0.040146156369770914632975940521293 absolute error = 6.7e-32 relative error = 1.6689019836142864359456352036939e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.583 y[1] (analytic) = -0.041352408865725555270026836179007 y[1] (numeric) = -0.041352408865725555270026836179083 absolute error = 7.6e-32 relative error = 1.8378614954881547964296364064979e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.584 y[1] (analytic) = -0.042559016665575713422979029483618 y[1] (numeric) = -0.042559016665575713422979029483692 absolute error = 7.4e-32 relative error = 1.7387619780194696232389706487854e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.585 y[1] (analytic) = -0.043765978614126646331180189736911 y[1] (numeric) = -0.043765978614126646331180189736981 absolute error = 7.0e-32 relative error = 1.5994158526003030562609765042268e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.586 y[1] (analytic) = -0.044973293555432754881880850436634 y[1] (numeric) = -0.044973293555432754881880850436697 absolute error = 6.3e-32 relative error = 1.4008313605573062724297740598242e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.587 y[1] (analytic) = -0.046180960332798688539492586558663 y[1] (numeric) = -0.046180960332798688539492586558737 absolute error = 7.4e-32 relative error = 1.6023919699098081522731831487329e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.588 y[1] (analytic) = -0.047388977788780451421356216215171 y[1] (numeric) = -0.047388977788780451421356216215244 absolute error = 7.3e-32 relative error = 1.5404425967019501852667036142770e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.589 y[1] (analytic) = -0.04859734476518650951896457049416 y[1] (numeric) = -0.048597344765186509518964570494229 absolute error = 6.9e-32 relative error = 1.4198306581027295363787373859452e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=640.8MB, alloc=4.6MB, time=30.83 x[1] = 4.59 y[1] (analytic) = -0.04980606010307889906358283302262 y[1] (numeric) = -0.049806060103078899063582833022689 absolute error = 6.9e-32 relative error = 1.3853735842023483919156053955810e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.591 y[1] (analytic) = -0.051015122642774336035207909538171 y[1] (numeric) = -0.051015122642774336035207909538249 absolute error = 7.8e-32 relative error = 1.5289583942820872464026204752774e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.592 y[1] (analytic) = -0.052224531223845326813806747506051 y[1] (numeric) = -0.05222453122384532681380674750612 absolute error = 6.9e-32 relative error = 1.3212181781824232200843147542627e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.593 y[1] (analytic) = -0.053434284685121279971771986580505 y[1] (numeric) = -0.053434284685121279971771986580577 absolute error = 7.2e-32 relative error = 1.3474494965972347677379319602921e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.594 y[1] (analytic) = -0.054644381864689619206531782485105 y[1] (numeric) = -0.054644381864689619206531782485174 absolute error = 6.9e-32 relative error = 1.2627098641331098327275365138227e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.595 y[1] (analytic) = -0.055854821599896897412249109675363 y[1] (numeric) = -0.05585482159989689741224910967544 absolute error = 7.7e-32 relative error = 1.3785739134854229762303317267971e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.596 y[1] (analytic) = -0.057065602727349911889544311953695 y[1] (numeric) = -0.05706560272734991188954431195377 absolute error = 7.5e-32 relative error = 1.3142768395584586411387781576163e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.597 y[1] (analytic) = -0.058276724082916820692173135030541 y[1] (numeric) = -0.058276724082916820692173135030614 absolute error = 7.3e-32 relative error = 1.2526441928364869320980545437908e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.598 y[1] (analytic) = -0.059488184501728260109590940870681 y[1] (numeric) = -0.059488184501728260109590940870762 absolute error = 8.1e-32 relative error = 1.3616149270389446031417383840721e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.599 y[1] (analytic) = -0.060699982818178463284332270530396 y[1] (numeric) = -0.060699982818178463284332270530458 absolute error = 6.2e-32 relative error = 1.0214170930775322538559382023199e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.6 y[1] (analytic) = -0.061912117865926379963133390082163 y[1] (numeric) = -0.061912117865926379963133390082224 absolute error = 6.1e-32 relative error = 9.8526753893475887304965951834346e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.601 y[1] (analytic) = -0.063124588477896797380723923141457 y[1] (numeric) = -0.06312458847789679738072392314152 absolute error = 6.3e-32 relative error = 9.9802630827541280068985380486791e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.602 y[1] (analytic) = -0.064337393486281462275212143454572 y[1] (numeric) = -0.064337393486281462275212143454646 absolute error = 7.4e-32 relative error = 1.1501864777251020681341820347196e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.603 y[1] (analytic) = -0.065550531722540204033986971982479 y[1] (numeric) = -0.065550531722540204033986971982561 absolute error = 8.2e-32 relative error = 1.2509433233445989311000356403309e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.604 y[1] (analytic) = -0.066764002017402058969058194922368 y[1] (numeric) = -0.066764002017402058969058194922439 absolute error = 7.1e-32 relative error = 1.0634473347103103072054220516415e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.605 y[1] (analytic) = -0.067977803200866395720754892149697 y[1] (numeric) = -0.067977803200866395720754892149767 absolute error = 7.0e-32 relative error = 1.0297478986362394074418283016190e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.606 y[1] (analytic) = -0.069191934102204041788700539640432 y[1] (numeric) = -0.069191934102204041788700539640496 absolute error = 6.4e-32 relative error = 9.2496330432771270407726883433265e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.607 y[1] (analytic) = -0.070406393549958411188981724547098 y[1] (numeric) = -0.070406393549958411188981724547166 absolute error = 6.8e-32 relative error = 9.6582137745415263302808884233945e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.608 y[1] (analytic) = -0.071621180371946633236425887756813 y[1] (numeric) = -0.071621180371946633236425887756885 absolute error = 7.2e-32 relative error = 1.0052892122984578312824505836402e-28 % Correct digits = 29 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.609 y[1] (analytic) = -0.07283629339526068245090198595449 y[1] (numeric) = -0.072836293395260682450901985954557 absolute error = 6.7e-32 relative error = 9.1987108180273711128874505349059e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.61 y[1] (analytic) = -0.074051731446268509586556443453603 y[1] (numeric) = -0.074051731446268509586556443453672 absolute error = 6.9e-32 relative error = 9.3178104890182054009765527376700e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.611 y[1] (analytic) = -0.075267493350615173782895243341187 y[1] (numeric) = -0.07526749335061517378289524334125 absolute error = 6.3e-32 relative error = 8.3701472170103948980934360035579e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.612 y[1] (analytic) = -0.076483577933223975836621487815034 y[1] (numeric) = -0.076483577933223975836621487815098 absolute error = 6.4e-32 relative error = 8.3678093689441286417740319861566e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.613 y[1] (analytic) = -0.077699984018297592593136238972192 y[1] (numeric) = -0.07769998401829759259313623897226 absolute error = 6.8e-32 relative error = 8.7516105516812795687518245156841e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.614 y[1] (analytic) = -0.078916710429319212456608933739341 y[1] (numeric) = -0.078916710429319212456608933739416 absolute error = 7.5e-32 relative error = 9.5036906115306001888119078498413e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.615 y[1] (analytic) = -0.080133755989053672017522150120757 y[1] (numeric) = -0.080133755989053672017522150120828 absolute error = 7.1e-32 relative error = 8.8601862128737170921071516596523e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.616 y[1] (analytic) = -0.081351119519548593796593986479188 y[1] (numeric) = -0.081351119519548593796593986479255 absolute error = 6.7e-32 relative error = 8.2359038690180491089218428399774e-29 % Correct digits = 30 h = 0.001 memory used=644.7MB, alloc=4.6MB, time=31.02 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.617 y[1] (analytic) = -0.082568799842135525103979801161833 y[1] (numeric) = -0.082568799842135525103979801161899 absolute error = 6.6e-32 relative error = 7.9933340591344852282428614544828e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.618 y[1] (analytic) = -0.083786795777431078012653546438805 y[1] (numeric) = -0.083786795777431078012653546438878 absolute error = 7.3e-32 relative error = 8.7125900116666564814624251070361e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.619 y[1] (analytic) = -0.085005106145338070444867418437716 y[1] (numeric) = -0.085005106145338070444867418437787 absolute error = 7.1e-32 relative error = 8.3524394262395551895754065159337e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.62 y[1] (analytic) = -0.086223729765046668370587033536524 y[1] (numeric) = -0.086223729765046668370587033536597 absolute error = 7.3e-32 relative error = 8.4663468164645207445608448754503e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.621 y[1] (analytic) = -0.087442665455035529116797831520231 y[1] (numeric) = -0.087442665455035529116797831520303 absolute error = 7.2e-32 relative error = 8.2339667512792820598675829446511e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.622 y[1] (analytic) = -0.088661912033072945786576896716224 y[1] (numeric) = -0.088661912033072945786576896716287 absolute error = 6.3e-32 relative error = 7.1056441887356931234151508783954e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.623 y[1] (analytic) = -0.08988146831621799278682288030118 y[1] (numeric) = -0.08988146831621799278682288030125 absolute error = 7.0e-32 relative error = 7.7880347652675552514685050508747e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.624 y[1] (analytic) = -0.091101333120821672463535200020576 y[1] (numeric) = -0.091101333120821672463535200020648 absolute error = 7.2e-32 relative error = 7.9032872004750097617008338734488e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.625 y[1] (analytic) = -0.092321505262528062843532187681696 y[1] (numeric) = -0.092321505262528062843532187681764 absolute error = 6.8e-32 relative error = 7.3655644810635682882038697080494e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.626 y[1] (analytic) = -0.093541983556275466481496349975743 y[1] (numeric) = -0.09354198355627546648149634997581 absolute error = 6.7e-32 relative error = 7.1625592544434728258123247789541e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.627 y[1] (analytic) = -0.094762766816297560411233404454509 y[1] (numeric) = -0.094762766816297560411233404454573 absolute error = 6.4e-32 relative error = 6.7537074053638865002123138613570e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.628 y[1] (analytic) = -0.095983853856124547200030249835068 y[1] (numeric) = -0.095983853856124547200030249835135 absolute error = 6.7e-32 relative error = 6.9803406831767734236854926102610e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.629 y[1] (analytic) = -0.097205243488584307104995528233843 y[1] (numeric) = -0.097205243488584307104995528233912 absolute error = 6.9e-32 relative error = 7.0983825073287631315376211059694e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.63 y[1] (analytic) = -0.098426934525803551330264936440523 y[1] (numeric) = -0.098426934525803551330264936440593 absolute error = 7.0e-32 relative error = 7.1118744414059586788896902317064e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.631 y[1] (analytic) = -0.099648925779208976383951943935385 y[1] (numeric) = -0.099648925779208976383951943935449 absolute error = 6.4e-32 relative error = 6.4225479100300682345402185390319e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.632 y[1] (analytic) = -0.10087121605952841953372307703173 y[1] (numeric) = -0.10087121605952841953372307703179 absolute error = 6e-32 relative error = 5.9481785135406153325689752563714e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.633 y[1] (analytic) = -0.1020938041767920153598754312909 y[1] (numeric) = -0.10209380417679201535987543129097 absolute error = 7e-32 relative error = 6.8564395816599823057343473237122e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.634 y[1] (analytic) = -0.10331668894033335340479257821214 y[1] (numeric) = -0.1033166889403333534047925782122 absolute error = 6e-32 relative error = 5.8073870364400402915046653264572e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.635 y[1] (analytic) = -0.10453986915879063691765353714529 y[1] (numeric) = -0.10453986915879063691765353714536 absolute error = 7e-32 relative error = 6.6960099111730886270567698059521e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.636 y[1] (analytic) = -0.105763343640107842693267989414 y[1] (numeric) = -0.10576334364010784269326798941407 absolute error = 7e-32 relative error = 6.6185502075460502878640725207673e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.637 y[1] (analytic) = -0.10698711119153588200390941876994 y[1] (numeric) = -0.10698711119153588200390941877001 absolute error = 7e-32 relative error = 6.5428442006141334653032016831519e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.638 y[1] (analytic) = -0.10821117061963376262301637053021 y[1] (numeric) = -0.10821117061963376262301637053028 absolute error = 7e-32 relative error = 6.4688330788003920445798869379391e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.639 y[1] (analytic) = -0.10943552073026975193963053107879 y[1] (numeric) = -0.10943552073026975193963053107886 absolute error = 7e-32 relative error = 6.3964606311447899329420805133098e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.64 y[1] (analytic) = -0.11066016032862254116243883984314 y[1] (numeric) = -0.11066016032862254116243883984321 absolute error = 7e-32 relative error = 6.3256731051287222938201440093473e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.641 y[1] (analytic) = -0.11188508821918241061228535738928 y[1] (numeric) = -0.11188508821918241061228535738936 absolute error = 8e-32 relative error = 7.1501932271153365150611007179186e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.642 y[1] (analytic) = -0.11311030320575239610201712591564 y[1] (numeric) = -0.1131103032057523961020171259157 absolute error = 6e-32 relative error = 5.3045565522760095436271280199796e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=648.5MB, alloc=4.6MB, time=31.21 x[1] = 4.643 y[1] (analytic) = -0.11433580409144945640252677216843 y[1] (numeric) = -0.1143358040914494564025267721685 absolute error = 7e-32 relative error = 6.1223166755368901599539765981235e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.644 y[1] (analytic) = -0.11556158967870564179385311765334 y[1] (numeric) = -0.1155615896787056417938531176534 absolute error = 6e-32 relative error = 5.1920365726031638918898232871796e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.645 y[1] (analytic) = -0.11678765876926926370019957697806 y[1] (numeric) = -0.11678765876926926370019957697812 absolute error = 6e-32 relative error = 5.1375291389767978909295225572610e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.646 y[1] (analytic) = -0.11801401016420606540772864223462 y[1] (numeric) = -0.11801401016420606540772864223468 absolute error = 6e-32 relative error = 5.0841421214748403707230531536353e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.647 y[1] (analytic) = -0.11924064266390039386398926951611 y[1] (numeric) = -0.11924064266390039386398926951617 absolute error = 6e-32 relative error = 5.0318413805534402069845575837779e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.648 y[1] (analytic) = -0.1204675550680563725578325029654 y[1] (numeric) = -0.12046755506805637255783250296545 absolute error = 5e-32 relative error = 4.1504951247456824162392965317839e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.649 y[1] (analytic) = -0.12169474617569907547866919217305 y[1] (numeric) = -0.12169474617569907547866919217311 absolute error = 6e-32 relative error = 4.9303689670689540756119707675426e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.65 y[1] (analytic) = -0.12292221478517570215392218028141 y[1] (numeric) = -0.12292221478517570215392218028146 absolute error = 5e-32 relative error = 4.0676130093638656661545189806060e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.651 y[1] (analytic) = -0.12414995969415675376352386281173 y[1] (numeric) = -0.12414995969415675376352386281179 absolute error = 6e-32 relative error = 4.8328650406178071474636740901070e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.652 y[1] (analytic) = -0.12537797969963721033030854101594 y[1] (numeric) = -0.12537797969963721033030854101599 absolute error = 5e-32 relative error = 3.9879411137253058149205238211739e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.653 y[1] (analytic) = -0.1266062735979377089851475184625 y[1] (numeric) = -0.12660627359793770898514751846254 absolute error = 4e-32 relative error = 3.1594010994295278310732033651696e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.654 y[1] (analytic) = -0.12783484018470572330567341560238 y[1] (numeric) = -0.12783484018470572330567341560243 absolute error = 5e-32 relative error = 3.9112967894946408775043963211887e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.655 y[1] (analytic) = -0.12906367825491674372743870422518 y[1] (numeric) = -0.12906367825491674372743870422523 absolute error = 5e-32 relative error = 3.8740566421207839418222251585352e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.656 y[1] (analytic) = -0.13029278660287545902635199201067 y[1] (numeric) = -0.13029278660287545902635199201073 absolute error = 6e-32 relative error = 4.6050131833373381337712730323236e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.657 y[1] (analytic) = -0.13152216402221693887123411680904 y[1] (numeric) = -0.1315221640222169388712341168091 absolute error = 6e-32 relative error = 4.5619687332596429870230022494403e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.658 y[1] (analytic) = -0.13275180930590781744533464084483 y[1] (numeric) = -0.1327518093059078174453346408449 absolute error = 7e-32 relative error = 5.2729978119315025526922116279704e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.659 y[1] (analytic) = -0.13398172124624747813564786673827 y[1] (numeric) = -0.13398172124624747813564786673833 absolute error = 6e-32 relative error = 4.4782228084474965573122135563822e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.66 y[1] (analytic) = -0.13521189863486923928886603007388 y[1] (numeric) = -0.13521189863486923928886603007394 absolute error = 6e-32 relative error = 4.4374792903416006968612398992121e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.661 y[1] (analytic) = -0.13644234026274154103280585722317 y[1] (numeric) = -0.13644234026274154103280585722323 absolute error = 6e-32 relative error = 4.3974619523866570303382263530231e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.662 y[1] (analytic) = -0.13767304492016913316214321224613 y[1] (numeric) = -0.13767304492016913316214321224618 absolute error = 5e-32 relative error = 3.6317929939729972768781250167456e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.663 y[1] (analytic) = -0.13890401139679426408728909295867 y[1] (numeric) = -0.13890401139679426408728909295873 absolute error = 6e-32 relative error = 4.3195296807234414500394753499673e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.664 y[1] (analytic) = -0.14013523848159787084523877366091 y[1] (numeric) = -0.14013523848159787084523877366097 absolute error = 6e-32 relative error = 4.2815783274867738378925880986562e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.665 y[1] (analytic) = -0.1413667249629007701712244305759 y[1] (numeric) = -0.14136672496290077017122443057596 absolute error = 6e-32 relative error = 4.2442802587204275176920465241962e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.666 y[1] (analytic) = -0.14259846962836485063000012575347 y[1] (numeric) = -0.14259846962836485063000012575353 absolute error = 6e-32 relative error = 4.2076187883621685204966952776509e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.667 y[1] (analytic) = -0.14383047126499426580558656604911 y[1] (numeric) = -0.14383047126499426580558656604917 absolute error = 6e-32 relative error = 4.1715777937941662256158942137214e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.668 y[1] (analytic) = -0.1450627286591366285483015957966 y[1] (numeric) = -0.14506272865913662854830159579665 absolute error = 5e-32 relative error = 3.4467847435496864832497657545631e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.669 memory used=652.3MB, alloc=4.6MB, time=31.39 y[1] (analytic) = -0.14629524059648420627790092495673 y[1] (numeric) = -0.14629524059648420627790092495678 absolute error = 5e-32 relative error = 3.4177461820450780308608492613722e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.67 y[1] (analytic) = -0.14752800586207511734165213884477 y[1] (numeric) = -0.14752800586207511734165213884482 absolute error = 5e-32 relative error = 3.3891870026864812343002224371542e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.671 y[1] (analytic) = -0.14876102324029452842616358101815 y[1] (numeric) = -0.14876102324029452842616358101821 absolute error = 6e-32 relative error = 4.0333145533075325881469895812456e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.672 y[1] (analytic) = -0.14999429151487585302178824754551 y[1] (numeric) = -0.14999429151487585302178824754556 absolute error = 5e-32 relative error = 3.3334601933861725405010194616524e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.673 y[1] (analytic) = -0.15122780946890195093842137867948 y[1] (numeric) = -0.15122780946890195093842137867952 absolute error = 4e-32 relative error = 2.6450161607495534234770354036032e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.674 y[1] (analytic) = -0.15246157588480632887150898292207 y[1] (numeric) = -0.15246157588480632887150898292212 absolute error = 5e-32 relative error = 3.2795148357759292312010445067764e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.675 y[1] (analytic) = -0.15369558954437434201708307860292 y[1] (numeric) = -0.15369558954437434201708307860297 absolute error = 5e-32 relative error = 3.2531837867451759895981927278965e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.676 y[1] (analytic) = -0.15492984922874439673463798939042 y[1] (numeric) = -0.15492984922874439673463798939047 absolute error = 5e-32 relative error = 3.2272670662822419830907058022923e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.677 y[1] (analytic) = -0.15616435371840915425666058262566 y[1] (numeric) = -0.15616435371840915425666058262571 absolute error = 5e-32 relative error = 3.2017549978248230559738093685940e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.678 y[1] (analytic) = -0.15739910179321673544362589300957 y[1] (numeric) = -0.15739910179321673544362589300962 absolute error = 5e-32 relative error = 3.1766382037991272535727680181781e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.679 y[1] (analytic) = -0.15863409223237192658326812898843 y[1] (numeric) = -0.15863409223237192658326812898848 absolute error = 5e-32 relative error = 3.1519075941606874765132292773990e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.68 y[1] (analytic) = -0.15986932381443738623293561517245 y[1] (numeric) = -0.1598693238144373862329356151725 absolute error = 5e-32 relative error = 3.1275543554581938489799883094615e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.681 y[1] (analytic) = -0.16110479531733485310383678128897 y[1] (numeric) = -0.16110479531733485310383678128902 absolute error = 5e-32 relative error = 3.1035699403927058090853051685152e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.682 y[1] (analytic) = -0.16234050551834635498598286651743 y[1] (numeric) = -0.16234050551834635498598286651748 absolute error = 5e-32 relative error = 3.0799460578462607798463087779550e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.683 y[1] (analytic) = -0.1635764531941154187126315675798 y[1] (numeric) = -0.16357645319411541871263156757984 absolute error = 4e-32 relative error = 2.4453397306843537821643128181324e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.684 y[1] (analytic) = -0.16481263712064828116303441966928 y[1] (numeric) = -0.16481263712064828116303441966933 absolute error = 5e-32 relative error = 3.0337479500069131492009720952427e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.685 y[1] (analytic) = -0.16604905607331510130228926119371 y[1] (numeric) = -0.16604905607331510130228926119375 absolute error = 4e-32 relative error = 2.4089266717866152580125344887626e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.686 y[1] (analytic) = -0.16728570882685117325709769638959 y[1] (numeric) = -0.16728570882685117325709769638963 absolute error = 4e-32 relative error = 2.3911187799910595552329691375259e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.687 y[1] (analytic) = -0.1685225941553581404262260341313 y[1] (numeric) = -0.16852259415535814042622603413135 absolute error = 5e-32 relative error = 2.9669612107861241654963114414479e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.688 y[1] (analytic) = -0.16975971083230521062446674671739 y[1] (numeric) = -0.16975971083230521062446674671743 absolute error = 4e-32 relative error = 2.3562716856600591411132663575878e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.689 y[1] (analytic) = -0.17099705763053037225889605906576 y[1] (numeric) = -0.1709970576305303722588960590658 absolute error = 4e-32 relative error = 2.3392215371580914014191575741634e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.69 y[1] (analytic) = -0.17223463332224161153622184659338 y[1] (numeric) = -0.17223463332224161153622184659342 absolute error = 4e-32 relative error = 2.3224132817214630778987995174188e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.691 y[1] (analytic) = -0.17347243667901813070001458909425 y[1] (numeric) = -0.1734724366790181307000145890943 absolute error = 5e-32 relative error = 2.8823022814002824792936715449042e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.692 y[1] (analytic) = -0.17471046647181156729661269816623 y[1] (numeric) = -0.17471046647181156729661269816628 absolute error = 5e-32 relative error = 2.8618777689582315258462165590529e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.693 y[1] (analytic) = -0.1759487214709472144684921071721 y[1] (numeric) = -0.17594872147094721446849210717214 absolute error = 4e-32 relative error = 2.2733896367985163310633087988476e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.694 y[1] (analytic) = -0.17718720044612524227388858535676 y[1] (numeric) = -0.17718720044612524227388858535679 absolute error = 3e-32 relative error = 1.6931245555246338192979109724568e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.695 y[1] (analytic) = -0.17842590216642192003145981158143 y[1] (numeric) = -0.17842590216642192003145981158147 absolute error = 4e-32 relative error = 2.2418269721114306090093455711442e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=656.1MB, alloc=4.6MB, time=31.57 TOP MAIN SOLVE Loop x[1] = 4.696 y[1] (analytic) = -0.17966482540029083968877281817931 y[1] (numeric) = -0.17966482540029083968877281817935 absolute error = 4e-32 relative error = 2.2263678998312848601299966881098e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.697 y[1] (analytic) = -0.18090396891556414021340099168705 y[1] (numeric) = -0.18090396891556414021340099168709 absolute error = 4e-32 relative error = 2.2111178787166225146721848334163e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.698 y[1] (analytic) = -0.18214333147945373300541339466523 y[1] (numeric) = -0.18214333147945373300541339466527 absolute error = 4e-32 relative error = 2.1960727123579657171672670042067e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.699 y[1] (analytic) = -0.18338291185855252833003775148884 y[1] (numeric) = -0.18338291185855252833003775148887 absolute error = 3e-32 relative error = 1.6359212369328987578480365514065e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.7 y[1] (analytic) = -0.18462270881883566276927702086938 y[1] (numeric) = -0.18462270881883566276927702086941 absolute error = 3e-32 relative error = 1.6249355343084060645845745096725e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.701 y[1] (analytic) = -0.18586272112566172769125805896432 y[1] (numeric) = -0.18586272112566172769125805896435 absolute error = 3e-32 relative error = 1.6140945219303557582008942798463e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.702 y[1] (analytic) = -0.18710294754377399873608945923887 y[1] (numeric) = -0.1871029475437739987360894592389 absolute error = 3e-32 relative error = 1.6033953710419926605087614867557e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.703 y[1] (analytic) = -0.18834338683730166631700423877234 y[1] (numeric) = -0.18834338683730166631700423877238 absolute error = 4e-32 relative error = 2.1237804348582492989784944614415e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.704 y[1] (analytic) = -0.18958403776976106713556162544719 y[1] (numeric) = -0.18958403776976106713556162544722 absolute error = 3e-32 relative error = 1.5824117026367630262590319086021e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.705 y[1] (analytic) = -0.190824899104056916709680786426 y[1] (numeric) = -0.19082489910405691670968078642603 absolute error = 3e-32 relative error = 1.5721218845576847075973802026571e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.706 y[1] (analytic) = -0.19206596960248354291327792551174 y[1] (numeric) = -0.19206596960248354291327792551177 absolute error = 3e-32 relative error = 1.5619633223985806856846594719251e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.707 y[1] (analytic) = -0.19330724802672612052627676540082 y[1] (numeric) = -0.19330724802672612052627676540086 absolute error = 4e-32 relative error = 2.0692447080137270203922449832276e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.708 y[1] (analytic) = -0.19454873313786190679376102047971 y[1] (numeric) = -0.19454873313786190679376102047975 absolute error = 4e-32 relative error = 2.0560401167791228383705950079473e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.709 y[1] (analytic) = -0.19579042369636147799303605668479 y[1] (numeric) = -0.19579042369636147799303605668482 absolute error = 3e-32 relative error = 1.5322506297103188077752004739091e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.71 y[1] (analytic) = -0.19703231846208996700736552704464 y[1] (numeric) = -0.19703231846208996700736552704468 absolute error = 4e-32 relative error = 2.0301238046740137223443598805809e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.711 y[1] (analytic) = -0.19827441619430830190514736485486 y[1] (numeric) = -0.19827441619430830190514736485489 absolute error = 3e-32 relative error = 1.5130545118135712835466540015019e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.712 y[1] (analytic) = -0.19951671565167444552329211100008 y[1] (numeric) = -0.19951671565167444552329211100011 absolute error = 3e-32 relative error = 1.5036334124693288462510749638972e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.713 y[1] (analytic) = -0.20075921559224463605356514773863 y[1] (numeric) = -0.20075921559224463605356514773866 absolute error = 3e-32 relative error = 1.4943274166268910893825853528839e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.714 y[1] (analytic) = -0.20200191477347462863065300830207 y[1] (numeric) = -0.2020019147734746286306530083021 absolute error = 3e-32 relative error = 1.4851344371483836175931486473946e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.715 y[1] (analytic) = -0.20324481195222093792071252993891 y[1] (numeric) = -0.20324481195222093792071252993894 absolute error = 3e-32 relative error = 1.4760524370507641839444936114941e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.716 y[1] (analytic) = -0.20448790588474208170916021754908 y[1] (numeric) = -0.20448790588474208170916021754911 absolute error = 3e-32 relative error = 1.4670794280082877900835426380179e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.717 y[1] (analytic) = -0.20573119532669982548645778581575 y[1] (numeric) = -0.20573119532669982548645778581576 absolute error = 1e-32 relative error = 4.8607115630276992296615163639986e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.718 y[1] (analytic) = -0.20697467903316042803064844974575 y[1] (numeric) = -0.20697467903316042803064844974577 absolute error = 2e-32 relative error = 9.6630177630548237009675127666612e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.719 y[1] (analytic) = -0.208218355758595887985397136781 y[1] (numeric) = -0.20821835575859588798539713678103 absolute error = 3e-32 relative error = 1.4407951638414332553950019590495e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.72 y[1] (analytic) = -0.20946222425688519143228639814157 y[1] (numeric) = -0.20946222425688519143228639814159 absolute error = 2e-32 relative error = 9.5482610628023940442671926720635e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.721 y[1] (analytic) = -0.21070628328131556045611840281058 y[1] (numeric) = -0.2107062832813155604561184028106 absolute error = 2e-32 relative error = 9.4918859032304451849079301822081e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=659.9MB, alloc=4.6MB, time=31.76 x[1] = 4.722 y[1] (analytic) = -0.21195053158458370270197200457126 y[1] (numeric) = -0.21195053158458370270197200457128 absolute error = 2e-32 relative error = 9.4361641136146634289850796028551e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.723 y[1] (analytic) = -0.21319496791879706192276248076021 y[1] (numeric) = -0.21319496791879706192276248076022 absolute error = 1e-32 relative error = 4.6905422288432521078894613416985e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.724 y[1] (analytic) = -0.2144395910354750695160501509105 y[1] (numeric) = -0.21443959103547506951605015091051 absolute error = 1e-32 relative error = 4.6633179776703102859709303271025e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.725 y[1] (analytic) = -0.21568439968555039704884269422416 y[1] (numeric) = -0.21568439968555039704884269422417 absolute error = 1e-32 relative error = 4.6364039376881933849978704434424e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.726 y[1] (analytic) = -0.21692939261937020976913459683862 y[1] (numeric) = -0.21692939261937020976913459683862 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.727 y[1] (analytic) = -0.21817456858669742110292577313745 y[1] (numeric) = -0.21817456858669742110292577313745 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.728 y[1] (analytic) = -0.21941992633671194813546001990379 y[1] (numeric) = -0.2194199263367119481354600199038 absolute error = 1e-32 relative error = 4.5574712228525908170345791046836e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.729 y[1] (analytic) = -0.22066546461801196807542257792685 y[1] (numeric) = -0.22066546461801196807542257792687 absolute error = 2e-32 relative error = 9.0634934807861576213873889114977e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.73 y[1] (analytic) = -0.22191118217861517570083469275032 y[1] (numeric) = -0.22191118217861517570083469275034 absolute error = 2e-32 relative error = 9.0126147784216219795011621236619e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.731 y[1] (analytic) = -0.22315707776596004178538168459732 y[1] (numeric) = -0.22315707776596004178538168459734 absolute error = 2e-32 relative error = 8.9622969615041097032890102988431e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.732 y[1] (analytic) = -0.2244031501269070725039096571221 y[1] (numeric) = -0.22440315012690707250390965712212 absolute error = 2e-32 relative error = 8.9125308573829591977152223446440e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.733 y[1] (analytic) = -0.22564939800774006981582459552541 y[1] (numeric) = -0.22564939800774006981582459552543 absolute error = 2e-32 relative error = 8.8633074923222147537495528245639e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.734 y[1] (analytic) = -0.22689582015416739282512622673032 y[1] (numeric) = -0.22689582015416739282512622673034 absolute error = 2e-32 relative error = 8.8146180861378288542773816261135e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.735 y[1] (analytic) = -0.22814241531132322011580763775018 y[1] (numeric) = -0.22814241531132322011580763775019 absolute error = 1e-32 relative error = 4.3832270235037165208591139155085e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.736 y[1] (analytic) = -0.22938918222376881306135027309164 y[1] (numeric) = -0.22938918222376881306135027309166 absolute error = 2e-32 relative error = 8.7188069664462333442005750202398e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.737 y[1] (analytic) = -0.2306361196354937801070425580257 y[1] (numeric) = -0.23063611963549378010704255802571 absolute error = 1e-32 relative error = 4.3358343072214299018188622020107e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.738 y[1] (analytic) = -0.23188322628991734202384902182932 y[1] (numeric) = -0.23188322628991734202384902182933 absolute error = 1e-32 relative error = 4.3125154673746301005058910449497e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.739 y[1] (analytic) = -0.2331305009298895981325554236529 y[1] (numeric) = -0.23313050092988959813255542365292 absolute error = 2e-32 relative error = 8.5788860403189763138791254261926e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.74 y[1] (analytic) = -0.23437794229769279349691401350386 y[1] (numeric) = -0.23437794229769279349691401350388 absolute error = 2e-32 relative error = 8.5332262088883776116394850841267e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.741 y[1] (analytic) = -0.2356255491350425870845116919582 y[1] (numeric) = -0.23562554913504258708451169195822 absolute error = 2e-32 relative error = 8.4880438786956528017854545577699e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.742 y[1] (analytic) = -0.23687332018308932089408246462057 y[1] (numeric) = -0.23687332018308932089408246462059 absolute error = 2e-32 relative error = 8.4433316443325746570176509791127e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.743 y[1] (analytic) = -0.23812125418241929004798422105064 y[1] (numeric) = -0.23812125418241929004798422105066 absolute error = 2e-32 relative error = 8.3990822527242586182727592961570e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.744 y[1] (analytic) = -0.23936934987305601384855850286208 y[1] (numeric) = -0.2393693498730560138485585028621 absolute error = 2e-32 relative error = 8.3552885992323312915051408574378e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.745 y[1] (analytic) = -0.24061760599446150779709056198152 y[1] (numeric) = -0.24061760599446150779709056198153 absolute error = 1e-32 relative error = 4.1559718619385558085589867882063e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.746 y[1] (analytic) = -0.24186602128553755657408564762995 y[1] (numeric) = -0.24186602128553755657408564762996 absolute error = 1e-32 relative error = 4.1345204038372928220562141808979e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.747 y[1] (analytic) = -0.24311459448462698797957609946076 y[1] (numeric) = -0.24311459448462698797957609946078 absolute error = 2e-32 relative error = 8.2265731690841259150125888838202e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.748 y[1] (analytic) = -0.24436332432951494783217246445749 y[1] (numeric) = -0.2443633243295149478321724644575 absolute error = 1e-32 relative error = 4.0922671302815344337432816348563e-30 % Correct digits = 31 h = 0.001 memory used=663.7MB, alloc=4.6MB, time=31.94 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.749 y[1] (analytic) = -0.24561220955743017582557049666347 y[1] (numeric) = -0.24561220955743017582557049666348 absolute error = 1e-32 relative error = 4.0714588326122093835750816670216e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.75 y[1] (analytic) = -0.24686124890504628234122454158609 y[1] (numeric) = -0.24686124890504628234122454158609 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.751 y[1] (analytic) = -0.24811044110848302621589645119112 y[1] (numeric) = -0.24811044110848302621589645119113 absolute error = 1e-32 relative error = 4.0304631902321400334451910763746e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.752 y[1] (analytic) = -0.24935978490330759346278782078174 y[1] (numeric) = -0.24935978490330759346278782078175 absolute error = 1e-32 relative error = 4.0102697409197823623119347667904e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.753 y[1] (analytic) = -0.25060927902453587694496198574107 y[1] (numeric) = -0.25060927902453587694496198574108 absolute error = 1e-32 relative error = 3.9902752359863542715563603024050e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.754 y[1] (analytic) = -0.25185892220663375699976086411094 y[1] (numeric) = -0.25185892220663375699976086411095 absolute error = 1e-32 relative error = 3.9704767702434836431338043031236e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.755 y[1] (analytic) = -0.25310871318351838301292038028294 y[1] (numeric) = -0.25310871318351838301292038028295 absolute error = 1e-32 relative error = 3.9508714947910246447506193598341e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.756 y[1] (analytic) = -0.25435865068855945594108685569316 y[1] (numeric) = -0.25435865068855945594108685569317 absolute error = 1e-32 relative error = 3.9314566156604399797878343737519e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.757 y[1] (analytic) = -0.25560873345458051178143540434128 y[1] (numeric) = -0.25560873345458051178143540434128 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.758 y[1] (analytic) = -0.25685896021386020598709002419895 y[1] (numeric) = -0.25685896021386020598709002419895 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.759 y[1] (analytic) = -0.25810932969813359882704373013433 y[1] (numeric) = -0.25810932969813359882704373013434 absolute error = 1e-32 relative error = 3.8743272130826468488361420442492e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.76 y[1] (analytic) = -0.25935984063859344168927572985987 y[1] (numeric) = -0.25935984063859344168927572985988 absolute error = 1e-32 relative error = 3.8556470328552373079422397468947e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.761 y[1] (analytic) = -0.26061049176589146432576130161169 y[1] (numeric) = -0.26061049176589146432576130161171 absolute error = 2e-32 relative error = 7.6742881165222478966857358173468e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.762 y[1] (analytic) = -0.2618612818101396630380686907927 y[1] (numeric) = -0.26186128181013966303806869079272 absolute error = 2e-32 relative error = 7.6376315970609328514976195872387e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.763 y[1] (analytic) = -0.26311220950091158980223600265876 y[1] (numeric) = -0.26311220950091158980223600265877 absolute error = 1e-32 relative error = 3.8006598093523111753429526921569e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.764 y[1] (analytic) = -0.26436327356724364233161972930124 y[1] (numeric) = -0.26436327356724364233161972930125 absolute error = 1e-32 relative error = 3.7826736917964485835117791007020e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.765 y[1] (analytic) = -0.26561447273763635507640521168012 y[1] (numeric) = -0.26561447273763635507640521168013 absolute error = 1e-32 relative error = 3.7648550912651552099477622673804e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.766 y[1] (analytic) = -0.26686580574005569115846800129233 y[1] (numeric) = -0.26686580574005569115846800129235 absolute error = 2e-32 relative error = 7.4944033929477181132731067520980e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.767 y[1] (analytic) = -0.26811727130193433524027375122158 y[1] (numeric) = -0.26811727130193433524027375122161 absolute error = 3e-32 relative error = 1.1189133715379403327331290989275e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.768 y[1] (analytic) = -0.26936886815017298732650293281027 y[1] (numeric) = -0.26936886815017298732650293281029 absolute error = 2e-32 relative error = 7.4247629792356003189535772011450e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.769 y[1] (analytic) = -0.2706205950111416574970853420228 y[1] (numeric) = -0.27062059501114165749708534202282 absolute error = 2e-32 relative error = 7.3904205255245206513021535969614e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.77 y[1] (analytic) = -0.27187245061068096157032802873513 y[1] (numeric) = -0.27187245061068096157032802873514 absolute error = 1e-32 relative error = 3.6781954102145917692159906034694e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.771 y[1] (analytic) = -0.27312443367410341769481895268801 y[1] (numeric) = -0.27312443367410341769481895268803 absolute error = 2e-32 relative error = 7.3226696458304898891837967082243e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.772 y[1] (analytic) = -0.27437654292619474386878734168476 y[1] (numeric) = -0.27437654292619474386878734168479 absolute error = 3e-32 relative error = 1.0933879288678762023066590280792e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.773 y[1] (analytic) = -0.27562877709121515638560040079834 y[1] (numeric) = -0.27562877709121515638560040079836 absolute error = 2e-32 relative error = 7.2561363915137583195561120888341e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.774 y[1] (analytic) = -0.27688113489290066920407469588021 y[1] (numeric) = -0.27688113489290066920407469588023 absolute error = 2e-32 relative error = 7.2233162464232615057694934104866e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=667.5MB, alloc=4.6MB, time=32.13 x[1] = 4.775 y[1] (analytic) = -0.27813361505446439424227921053602 y[1] (numeric) = -0.27813361505446439424227921053604 absolute error = 2e-32 relative error = 7.1907884978532999700164654885079e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.776 y[1] (analytic) = -0.27938621629859784259350575295184 y[1] (numeric) = -0.27938621629859784259350575295186 absolute error = 2e-32 relative error = 7.1585492888542240260301670269895e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.777 y[1] (analytic) = -0.28063893734747222666308106752238 y[1] (numeric) = -0.28063893734747222666308106752241 absolute error = 3e-32 relative error = 1.0689892245015022056031475494179e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.778 y[1] (analytic) = -0.28189177692273976322469368615005 y[1] (numeric) = -0.28189177692273976322469368615008 absolute error = 3e-32 relative error = 1.0642382096950039662432724948546e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.779 y[1] (analytic) = -0.28314473374553497739490723535282 y[1] (numeric) = -0.28314473374553497739490723535284 absolute error = 2e-32 relative error = 7.0635253339990428138695733261108e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.78 y[1] (analytic) = -0.28439780653647600752453059794193 y[1] (numeric) = -0.28439780653647600752453059794196 absolute error = 3e-32 relative error = 1.0548604563921729897565483415349e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.781 y[1] (analytic) = -0.28565099401566591100551401200832 y[1] (numeric) = -0.28565099401566591100551401200835 absolute error = 3e-32 relative error = 1.0502326485289498022648581997888e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.782 y[1] (analytic) = -0.28690429490269397099203887529144 y[1] (numeric) = -0.28690429490269397099203887529146 absolute error = 2e-32 relative error = 6.9709657036619719860730351895916e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.783 y[1] (analytic) = -0.28815770791663700403446770969818 y[1] (numeric) = -0.28815770791663700403446770969821 absolute error = 3e-32 relative error = 1.0410965653807495192166261485677e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.784 y[1] (analytic) = -0.28941123177606066862481942879326 y[1] (numeric) = -0.28941123177606066862481942879329 absolute error = 3e-32 relative error = 1.0365872746505313974727168355151e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.785 y[1] (analytic) = -0.29066486519902077465243374049847 y[1] (numeric) = -0.29066486519902077465243374049851 absolute error = 4e-32 relative error = 1.3761553180021138866204313996385e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.786 y[1] (analytic) = -0.29191860690306459376848720801843 y[1] (numeric) = -0.29191860690306459376848720801846 absolute error = 3e-32 relative error = 1.0276837204132689593019763955780e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.787 y[1] (analytic) = -0.29317245560523217065802218415522 y[1] (numeric) = -0.29317245560523217065802218415525 absolute error = 3e-32 relative error = 1.0232884920265544208830745769811e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.788 y[1] (analytic) = -0.29442641002205763521814852768754 y[1] (numeric) = -0.29442641002205763521814852768758 absolute error = 4e-32 relative error = 1.3585737772981475242095819680794e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.789 y[1] (analytic) = -0.29568046886957051564107670537094 y[1] (numeric) = -0.29568046886957051564107670537097 absolute error = 3e-32 relative error = 1.0146087807116367232705338307084e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.79 y[1] (analytic) = -0.29693463086329705240063957936783 y[1] (numeric) = -0.29693463086329705240063957936786 absolute error = 3e-32 relative error = 1.0103233803608248851373436848354e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.791 y[1] (analytic) = -0.29818889471826151314095887754089 y[1] (numeric) = -0.29818889471826151314095887754093 absolute error = 4e-32 relative error = 1.3414315793951109527526578254909e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.792 y[1] (analytic) = -0.29944325914898750846591104304123 y[1] (numeric) = -0.29944325914898750846591104304126 absolute error = 3e-32 relative error = 1.0018592532441529633019237369686e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.793 y[1] (analytic) = -0.30069772286949930862804585999703 y[1] (numeric) = -0.30069772286949930862804585999707 absolute error = 4e-32 relative error = 1.3302395381743452025476795207544e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.794 y[1] (analytic) = -0.30195228459332316111560995386043 y[1] (numeric) = -0.30195228459332316111560995386046 absolute error = 3e-32 relative error = 9.9353445993643483601940282376024e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.795 y[1] (analytic) = -0.30320694303348860913632596810012 y[1] (numeric) = -0.30320694303348860913632596810015 absolute error = 3e-32 relative error = 9.8942325330216990248726458225215e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.796 y[1] (analytic) = -0.3044616969025298109965769234396 y[1] (numeric) = -0.30446169690252981099657692343965 absolute error = 5e-32 relative error = 1.6422427027333743942999645742709e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.797 y[1] (analytic) = -0.3057165449124868603746439717344 y[1] (numeric) = -0.30571654491248686037464397173443 absolute error = 3e-32 relative error = 9.8130115949686905360510752595458e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.798 y[1] (analytic) = -0.30697148577490710748664446385964 y[1] (numeric) = -0.30697148577490710748664446385968 absolute error = 4e-32 relative error = 1.3030526238951974979516097077626e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.799 y[1] (analytic) = -0.30822651820084648114381595964435 y[1] (numeric) = -0.30822651820084648114381595964438 absolute error = 3e-32 relative error = 9.7331015433433303892562799470930e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.8 y[1] (analytic) = -0.30948164090087081169979051793909 y[1] (numeric) = -0.30948164090087081169979051793912 absolute error = 3e-32 relative error = 9.6936283240171959261510593729869e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.801 y[1] (analytic) = -0.31073685258505715488650231634577 y[1] (numeric) = -0.3107368525850571548865023163458 absolute error = 3e-32 relative error = 9.6544712191123778798289772614997e-30 % Correct digits = 31 h = 0.001 memory used=671.4MB, alloc=4.6MB, time=32.32 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.802 y[1] (analytic) = -0.3119921519629951165373703629695 y[1] (numeric) = -0.31199215196299511653737036296953 absolute error = 3e-32 relative error = 9.6156264865143952004076053281105e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.803 y[1] (analytic) = -0.31324753774378817819639677677718 y[1] (numeric) = -0.31324753774378817819639677677722 absolute error = 4e-32 relative error = 1.2769453923917783683535751026073e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.804 y[1] (analytic) = -0.31450300863605502361181982876638 y[1] (numeric) = -0.31450300863605502361181982876642 absolute error = 4e-32 relative error = 1.2718479283703217741236066323728e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.805 y[1] (analytic) = -0.31575856334793086611295965316266 y[1] (numeric) = -0.3157585633479308661129596531627 absolute error = 4e-32 relative error = 1.2667906635971244498944644014256e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.806 y[1] (analytic) = -0.31701420058706877686889325627633 y[1] (numeric) = -0.31701420058706877686889325627638 absolute error = 5e-32 relative error = 1.5772164119905843023913226789316e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.807 y[1] (analytic) = -0.3182699190606410140275941704613 y[1] (numeric) = -0.31826991906064101402759417046134 absolute error = 4e-32 relative error = 1.2567948651276298749238286425200e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.808 y[1] (analytic) = -0.31952571747534035273417082183152 y[1] (numeric) = -0.31952571747534035273417082183156 absolute error = 4e-32 relative error = 1.2518554160851553771676539619531e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.809 y[1] (analytic) = -0.3207815945373814160268364030067 y[1] (numeric) = -0.32078159453738141602683640300674 absolute error = 4e-32 relative error = 1.2469543353223374579393096704578e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.81 y[1] (analytic) = -0.32203754895250200660924176617827 y[1] (numeric) = -0.3220375489525020066092417661783 absolute error = 3e-32 relative error = 9.3156838690337824265385887965644e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.811 y[1] (analytic) = -0.32329357942596443949780157721329 y[1] (numeric) = -0.32329357942596443949780157721333 absolute error = 4e-32 relative error = 1.2372655241413529109997415730171e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.812 y[1] (analytic) = -0.32454968466255687554264269834784 y[1] (numeric) = -0.32454968466255687554264269834788 absolute error = 4e-32 relative error = 1.2324769331262511228003305249531e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.813 y[1] (analytic) = -0.32580586336659465582080249526416 y[1] (numeric) = -0.3258058633665946558208024952642 absolute error = 4e-32 relative error = 1.2277249889450963632139236560072e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.814 y[1] (analytic) = -0.32706211424192163690030349400106 y[1] (numeric) = -0.32706211424192163690030349400111 absolute error = 5e-32 relative error = 1.5287615967349843891963314072385e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.815 y[1] (analytic) = -0.32831843599191152697372954421351 y[1] (numeric) = -0.32831843599191152697372954421356 absolute error = 5e-32 relative error = 1.5229117380795455254752951531391e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.816 y[1] (analytic) = -0.32957482731946922285992737777925 y[1] (numeric) = -0.3295748273194692228599273777793 absolute error = 5e-32 relative error = 1.5171061578538923870978977690127e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.817 y[1] (analytic) = -0.33083128692703214787245618564792 y[1] (numeric) = -0.33083128692703214787245618564797 absolute error = 5e-32 relative error = 1.5113443611827425253784401780920e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.818 y[1] (analytic) = -0.33208781351657159055340657114343 y[1] (numeric) = -0.33208781351657159055340657114348 absolute error = 5e-32 relative error = 1.5056258605377862946257959601783e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.819 y[1] (analytic) = -0.33334440578959404427120897466526 y[1] (numeric) = -0.33334440578959404427120897466532 absolute error = 6e-32 relative error = 1.7999402107222346496844866594655e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.82 y[1] (analytic) = -0.33460106244714254768105040289026 y[1] (numeric) = -0.33460106244714254768105040289032 absolute error = 6e-32 relative error = 1.7931801997633612921007278125889e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.821 y[1] (analytic) = -0.33585778218979802604651703515498 y[1] (numeric) = -0.33585778218979802604651703515503 absolute error = 5e-32 relative error = 1.4887253668501951342204005729553e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.822 y[1] (analytic) = -0.3371145637176806334210790207019 y[1] (numeric) = -0.33711456371768063342107902070196 absolute error = 6e-32 relative error = 1.7798103807300207276665971559118e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.823 y[1] (analytic) = -0.33837140573045109568803252290179 y[1] (numeric) = -0.33837140573045109568803252290184 absolute error = 5e-32 relative error = 1.4776662316386843682559905837400e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.824 y[1] (analytic) = -0.33962830692731205445751281042105 y[1] (numeric) = -0.3396283069273120544575128104211 absolute error = 5e-32 relative error = 1.4721976637448274404584918304120e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.825 y[1] (analytic) = -0.34088526600700941181919094058956 y[1] (numeric) = -0.34088526600700941181919094058962 absolute error = 6e-32 relative error = 1.7601230086244401451487725239183e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.826 y[1] (analytic) = -0.34214228166783367594926532694115 y[1] (numeric) = -0.3421422816678336759492653269412 absolute error = 5e-32 relative error = 1.4613803285658255233703185194390e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.827 y[1] (analytic) = -0.34339935260762130757035823104882 y[1] (numeric) = -0.34339935260762130757035823104886 absolute error = 4e-32 relative error = 1.1648245605665201645997954046724e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=675.2MB, alloc=4.6MB, time=32.50 x[1] = 4.828 y[1] (analytic) = -0.34465647752375606726292596836127 y[1] (numeric) = -0.34465647752375606726292596836131 absolute error = 4e-32 relative error = 1.1605758953781139394534286498987e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.829 y[1] (analytic) = -0.3459136551131703636267903687669 y[1] (numeric) = -0.34591365511317036362679036876694 absolute error = 4e-32 relative error = 1.1563579352458189370567234762726e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.83 y[1] (analytic) = -0.34717088407234660229139778506942 y[1] (numeric) = -0.34717088407234660229139778506946 absolute error = 4e-32 relative error = 1.1521703528474593788533412864327e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.831 y[1] (analytic) = -0.34842816309731853577341069645616 y[1] (numeric) = -0.34842816309731853577341069645619 absolute error = 3e-32 relative error = 8.6100961912257306416464720385991e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.832 y[1] (analytic) = -0.34968549088367261418023570937787 y[1] (numeric) = -0.34968549088367261418023570937792 absolute error = 5e-32 relative error = 1.4298562938269905077612458864882e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.833 y[1] (analytic) = -0.35094286612654933675809051503954 y[1] (numeric) = -0.35094286612654933675809051503958 absolute error = 4e-32 relative error = 1.1397866678838849886567586402905e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.834 y[1] (analytic) = -0.35220028752064460428321112092556 y[1] (numeric) = -0.3522002875206446042832111209256 absolute error = 4e-32 relative error = 1.1357174147012970947558926712125e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.835 y[1] (analytic) = -0.35345775376021107229479943345407 y[1] (numeric) = -0.35345775376021107229479943345411 absolute error = 4e-32 relative error = 1.1316769705704733451165528033681e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.836 y[1] (analytic) = -0.35471526353905950516831002997208 y[1] (numeric) = -0.3547152635390595051683100299721 absolute error = 2e-32 relative error = 5.6383251739596196111451282078221e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.837 y[1] (analytic) = -0.35597281555056013102767372087039 y[1] (numeric) = -0.35597281555056013102767372087043 absolute error = 4e-32 relative error = 1.1236813108364633694641220419817e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.838 y[1] (analytic) = -0.35723040848764399749505426661535 y[1] (numeric) = -0.35723040848764399749505426661538 absolute error = 3e-32 relative error = 8.3979412970488064811613658419518e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.839 y[1] (analytic) = -0.35848804104280432827673337996328 y[1] (numeric) = -0.35848804104280432827673337996332 absolute error = 4e-32 relative error = 1.1157973326988585504330800428288e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.84 y[1] (analytic) = -0.35974571190809788058371791054913 y[1] (numeric) = -0.35974571190809788058371791054918 absolute error = 5e-32 relative error = 1.3898706320861777410238245613945e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.841 y[1] (analytic) = -0.36100341977514630338566187741886 y[1] (numeric) = -0.3610034197751463033856618774189 absolute error = 4e-32 relative error = 1.1080227446297960558456050294376e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.842 y[1] (analytic) = -0.36226116333513749649669478491295 y[1] (numeric) = -0.362261163335137496496694784913 absolute error = 5e-32 relative error = 1.3802197160655519116257351204825e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.843 y[1] (analytic) = -0.36351894127882697049174642860409 y[1] (numeric) = -0.36351894127882697049174642860414 absolute error = 5e-32 relative error = 1.3754441467095082550110713383061e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.844 y[1] (analytic) = -0.3647767522965392074519571707477 y[1] (numeric) = -0.36477675229653920745195717074774 absolute error = 4e-32 relative error = 1.0965611089021008604285497719524e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.845 y[1] (analytic) = -0.36603459507816902253776143892306 y[1] (numeric) = -0.36603459507816902253776143892309 absolute error = 3e-32 relative error = 8.1959466136235862198800316805588e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.846 y[1] (analytic) = -0.36729246831318292638823097722454 y[1] (numeric) = -0.36729246831318292638823097722458 absolute error = 4e-32 relative error = 1.0890503740439567545738947198428e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.847 y[1] (analytic) = -0.36855037069062048834526315651005 y[1] (numeric) = -0.36855037069062048834526315651007 absolute error = 2e-32 relative error = 5.4266666351528363364383602788519e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.848 y[1] (analytic) = -0.36980830089909570050119842882786 y[1] (numeric) = -0.36980830089909570050119842882789 absolute error = 3e-32 relative error = 8.1123111425737495090942450038994e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.849 y[1] (analytic) = -0.37106625762679834256844979122711 y[1] (numeric) = -0.37106625762679834256844979122715 absolute error = 4e-32 relative error = 1.0779745982786230774631404053092e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.85 y[1] (analytic) = -0.37232423956149534756972590570914 y[1] (numeric) = -0.37232423956149534756972590570919 absolute error = 5e-32 relative error = 1.3429155205926820762481503941940e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.851 y[1] (analytic) = -0.37358224539053216834742830510313 y[1] (numeric) = -0.37358224539053216834742830510318 absolute error = 5e-32 relative error = 1.3383933689817468052041357800341e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.852 y[1] (analytic) = -0.37484027380083414489080189914754 y[1] (numeric) = -0.37484027380083414489080189914759 absolute error = 5e-32 relative error = 1.3339014907071261799048808979451e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.853 y[1] (analytic) = -0.37609832347890787247941678103258 y[1] (numeric) = -0.37609832347890787247941678103262 absolute error = 4e-32 relative error = 1.0635516699463101101731893465991e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.854 y[1] (analytic) = -0.37735639311084257064155812210929 y[1] (numeric) = -0.37735639311084257064155812210933 absolute error = 4e-32 relative error = 1.0600058917843912665855399904888e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=679.0MB, alloc=4.6MB, time=32.68 TOP MAIN SOLVE Loop x[1] = 4.855 y[1] (analytic) = -0.37861448138231145292609973139951 y[1] (numeric) = -0.37861448138231145292609973139955 absolute error = 4e-32 relative error = 1.0564836256120225103055001309396e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.856 y[1] (analytic) = -0.37987258697857309748643564694921 y[1] (numeric) = -0.37987258697857309748643564694925 absolute error = 4e-32 relative error = 1.0529846419861883828751204947238e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.857 y[1] (analytic) = -0.381130708584472818475042917958 y[1] (numeric) = -0.38113070858447281847504291795803 absolute error = 3e-32 relative error = 7.8713153582981041963945207487771e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.858 y[1] (analytic) = -0.38238884488444403824724752999041 y[1] (numeric) = -0.38238884488444403824724752999044 absolute error = 3e-32 relative error = 7.8454171457501191584934681343626e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.859 y[1] (analytic) = -0.38364699456250966037276422043262 y[1] (numeric) = -0.38364699456250966037276422043265 absolute error = 3e-32 relative error = 7.8196885223121275520626198905315e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.86 y[1] (analytic) = -0.38490515630228344345357972770201 y[1] (numeric) = -0.38490515630228344345357972770205 absolute error = 4e-32 relative error = 1.0392170472402346630673880414570e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.861 y[1] (analytic) = -0.38616332878697137574674781554929 y[1] (numeric) = -0.38616332878697137574674781554932 absolute error = 3e-32 relative error = 7.7687335289544352769531781262679e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.862 y[1] (analytic) = -0.38742151069937305059066321311408 y[1] (numeric) = -0.38742151069937305059066321311412 absolute error = 4e-32 relative error = 1.0324671938786265867951503364146e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.863 y[1] (analytic) = -0.38867970072188304263338041220788 y[1] (numeric) = -0.3886797007218830426333804122079 absolute error = 2e-32 relative error = 5.1456250385226204016849490484164e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.864 y[1] (analytic) = -0.38993789753649228486154206560283 y[1] (numeric) = -0.38993789753649228486154206560286 absolute error = 3e-32 relative error = 7.6935327880492698453524695142300e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.865 y[1] (analytic) = -0.39119609982478944642848053390539 y[1] (numeric) = -0.39119609982478944642848053390543 absolute error = 4e-32 relative error = 1.0225050816691518176918016600199e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.866 y[1] (analytic) = -0.3924543062679623112800549338882 y[1] (numeric) = -0.39245430626796231128005493388823 absolute error = 3e-32 relative error = 7.6442020181367100590009242192793e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.867 y[1] (analytic) = -0.39371251554679915757678484794719 y[1] (numeric) = -0.39371251554679915757678484794723 absolute error = 4e-32 relative error = 1.0159697347808936297041455097676e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.868 y[1] (analytic) = -0.39497072634169013791084066264286 y[1] (numeric) = -0.3949707263416901379108406626429 absolute error = 4e-32 relative error = 1.0127332820457155227015512260675e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.869 y[1] (analytic) = -0.3962289373326286603164493140766 y[1] (numeric) = -0.39622893733262866031644931407663 absolute error = 3e-32 relative error = 7.5713803746785457247521002703720e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.87 y[1] (analytic) = -0.39748714719921277007227302914862 y[1] (numeric) = -0.39748714719921277007227302914865 absolute error = 3e-32 relative error = 7.5474138500796826520878352752702e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.871 y[1] (analytic) = -0.39874535462064653229431746454208 y[1] (numeric) = -0.3987453546206465322943174645421 absolute error = 2e-32 relative error = 5.0157324137424384147045104125674e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.872 y[1] (analytic) = -0.40000355827574141531792445958221 y[1] (numeric) = -0.40000355827574141531792445958224 absolute error = 3e-32 relative error = 7.4999332829233428513071122976721e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.873 y[1] (analytic) = -0.4012617568429176748674034349304 y[1] (numeric) = -0.40126175684291767486740343493042 absolute error = 2e-32 relative error = 4.9842776339708394384828867078313e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.874 y[1] (analytic) = -0.40251994900020573901185428639229 y[1] (numeric) = -0.40251994900020573901185428639232 absolute error = 3e-32 relative error = 7.4530467556987259220913265819040e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.875 y[1] (analytic) = -0.40377813342524759390573344194938 y[1] (numeric) = -0.40377813342524759390573344194941 absolute error = 3e-32 relative error = 7.4298228449148971424217484356531e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.876 y[1] (analytic) = -0.40503630879529817031271357046412 y[1] (numeric) = -0.40503630879529817031271357046416 absolute error = 4e-32 relative error = 9.8756578438541055093471568884528e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.877 y[1] (analytic) = -0.40629447378722673091138625236404 y[1] (numeric) = -0.40629447378722673091138625236407 absolute error = 3e-32 relative error = 7.3838070501817279562279257478967e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.878 y[1] (analytic) = -0.40755262707751825838135574597915 y[1] (numeric) = -0.40755262707751825838135574597917 absolute error = 2e-32 relative error = 4.9073416955783514517170734366515e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.879 y[1] (analytic) = -0.40881076734227484426827080809362 y[1] (numeric) = -0.40881076734227484426827080809363 absolute error = 1e-32 relative error = 2.4461195249359829618698860250204e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.88 y[1] (analytic) = -0.41006889325721707862634035367603 y[1] (numeric) = -0.41006889325721707862634035367605 absolute error = 2e-32 relative error = 4.8772292482704688867217439654627e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=682.8MB, alloc=4.6MB, time=32.87 x[1] = 4.881 y[1] (analytic) = -0.41132700349768544043687756767648 y[1] (numeric) = -0.4113270034976854404368775676765 absolute error = 2e-32 relative error = 4.8623114529149898359936490725433e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.882 y[1] (analytic) = -0.41258509673864168880141591122307 y[1] (numeric) = -0.41258509673864168880141591122309 absolute error = 2e-32 relative error = 4.8474848359996154933768847715200e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.883 y[1] (analytic) = -0.41384317165467025490793929551812 y[1] (numeric) = -0.41384317165467025490793929551813 absolute error = 1e-32 relative error = 2.4163742898105515138166565473443e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.884 y[1] (analytic) = -0.41510122691997963476876752922558 y[1] (numeric) = -0.41510122691997963476876752922559 absolute error = 1e-32 relative error = 2.4090509378156406555373797257831e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.885 y[1] (analytic) = -0.41635926120840378272863697915905 y[1] (numeric) = -0.41635926120840378272863697915906 absolute error = 1e-32 relative error = 2.4017719627460421439074027084368e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.886 y[1] (analytic) = -0.41761727319340350574151521962401 y[1] (numeric) = -0.41761727319340350574151521962402 absolute error = 1e-32 relative error = 2.3945369700665809274643138575485e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.887 y[1] (analytic) = -0.4188752615480678584146872828423 y[1] (numeric) = -0.41887526154806785841468728284232 absolute error = 2e-32 relative error = 4.7746911398120149483157152826764e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.888 y[1] (analytic) = -0.42013322494511553881864996149063 y[1] (numeric) = -0.42013322494511553881864996149065 absolute error = 2e-32 relative error = 4.7603947539766027813737683379368e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.889 y[1] (analytic) = -0.4213911620568962850613494545214 y[1] (numeric) = -0.42139116205689628506134945452141 absolute error = 1e-32 relative error = 2.3730920105651857038474676949649e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.89 y[1] (analytic) = -0.42264907155539227262529648910407 y[1] (numeric) = -0.42264907155539227262529648910408 absolute error = 1e-32 relative error = 2.3660290943498269849301941142033e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.891 y[1] (analytic) = -0.42390695211221951246609189473036 y[1] (numeric) = -0.42390695211221951246609189473037 absolute error = 1e-32 relative error = 2.3590082564516970779887211531321e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.892 y[1] (analytic) = -0.42516480239862924987089445026825 y[1] (numeric) = -0.42516480239862924987089445026826 absolute error = 1e-32 relative error = 2.3520291293125727573931111067725e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.893 y[1] (analytic) = -0.42642262108550936407536167102988 y[1] (numeric) = -0.4264226210855093640753616710299 absolute error = 2e-32 relative error = 4.6901826992873003798423716493900e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.894 y[1] (analytic) = -0.42768040684338576863759305073849 y[1] (numeric) = -0.4276804068433857686375930507385 absolute error = 1e-32 relative error = 2.3381945583637516121562742847122e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.895 y[1] (analytic) = -0.42893815834242381256760412264014 y[1] (numeric) = -0.42893815834242381256760412264015 absolute error = 1e-32 relative error = 2.3313384005386021555636738415925e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.896 y[1] (analytic) = -0.43019587425242968221085855491105 y[1] (numeric) = -0.43019587425242968221085855491105 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.897 y[1] (analytic) = -0.43145355324285180388438434795877 y[1] (numeric) = -0.43145355324285180388438434795879 absolute error = 2e-32 relative error = 4.6354931717858912181401134075621e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.898 y[1] (analytic) = -0.43271119398278224726399905521107 y[1] (numeric) = -0.43271119398278224726399905521109 absolute error = 2e-32 relative error = 4.6220204788128980221041685641855e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.899 y[1] (analytic) = -0.43396879514095812952116780452737 y[1] (numeric) = -0.43396879514095812952116780452739 absolute error = 2e-32 relative error = 4.6086262938568582055672123293299e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.9 y[1] (analytic) = -0.43522635538576302020801675445973 y[1] (numeric) = -0.43522635538576302020801675445973 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.901 y[1] (analytic) = -0.43648387338522834688902347823114 y[1] (numeric) = -0.43648387338522834688902347823116 absolute error = 2e-32 relative error = 4.5820707750062886058010688584851e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.902 y[1] (analytic) = -0.43774134780703480151790462849361 y[1] (numeric) = -0.43774134780703480151790462849361 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.903 y[1] (analytic) = -0.43899877731851374755822009767485 y[1] (numeric) = -0.43899877731851374755822009767486 absolute error = 1e-32 relative error = 2.2779106723444337412099660962912e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.904 y[1] (analytic) = -0.44025616058664862784621175202668 y[1] (numeric) = -0.44025616058664862784621175202668 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.905 y[1] (analytic) = -0.4415134962780763731943936823458 y[1] (numeric) = -0.4415134962780763731943936823458 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.906 y[1] (analytic) = -0.44277078305908881173440978075692 y[1] (numeric) = -0.44277078305908881173440978075693 absolute error = 1e-32 relative error = 2.2585049381330737599942767571769e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.907 y[1] (analytic) = -0.4440280195956340789976733209246 y[1] (numeric) = -0.44402801959563407899767332092462 absolute error = 2e-32 relative error = 4.5042202557878063013432615145152e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=686.6MB, alloc=4.6MB, time=33.06 x[1] = 4.908 y[1] (analytic) = -0.44528520455331802873230208859924 y[1] (numeric) = -0.44528520455331802873230208859926 absolute error = 2e-32 relative error = 4.4915033770463439997171771499178e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.909 y[1] (analytic) = -0.44654233659740564445486148050432 y[1] (numeric) = -0.44654233659740564445486148050434 absolute error = 2e-32 relative error = 4.4788586346363910519624858778144e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.91 y[1] (analytic) = -0.44779941439282245173542686223781 y[1] (numeric) = -0.44779941439282245173542686223782 absolute error = 1e-32 relative error = 2.2331427149272048927852950420984e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.911 y[1] (analytic) = -0.44905643660415593121447535009231 y[1] (numeric) = -0.44905643660415593121447535009233 absolute error = 2e-32 relative error = 4.4537831706062453164239367937497e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.912 y[1] (analytic) = -0.45031340189565693235011605749799 y[1] (numeric) = -0.45031340189565693235011605749802 absolute error = 3e-32 relative error = 6.6620269069743039187622643139382e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.913 y[1] (analytic) = -0.45157030893124108789416672416 y[1] (numeric) = -0.45157030893124108789416672416004 absolute error = 4e-32 relative error = 8.8579783056752408222554371830623e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.914 y[1] (analytic) = -0.45282715637449022909558352490097 y[1] (numeric) = -0.45282715637449022909558352490101 absolute error = 4e-32 relative error = 8.8333924847298266376549233032528e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.915 y[1] (analytic) = -0.45408394288865380162974973572928 y[1] (numeric) = -0.45408394288865380162974973572931 absolute error = 3e-32 relative error = 6.6067079600205810736865519872894e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.916 y[1] (analytic) = -0.45534066713665028225212781673785 y[1] (numeric) = -0.45534066713665028225212781673787 absolute error = 2e-32 relative error = 4.3923157854024683637235420160800e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.917 y[1] (analytic) = -0.45659732778106859617477835509687 y[1] (numeric) = -0.45659732778106859617477835509691 absolute error = 4e-32 relative error = 8.7604542484706317571010894744002e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.918 y[1] (analytic) = -0.45785392348416953516424819663936 y[1] (numeric) = -0.4578539234841695351642481966394 absolute error = 4e-32 relative error = 8.7364108831062609541571243577319e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.919 y[1] (analytic) = -0.45911045290788717635932898135118 y[1] (numeric) = -0.4591104529078871763593289813512 absolute error = 2e-32 relative error = 4.3562501949857946404573917186361e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.92 y[1] (analytic) = -0.46036691471383030180718618647054 y[1] (numeric) = -0.46036691471383030180718618647058 absolute error = 4e-32 relative error = 8.6887216960116451144822295750743e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.921 y[1] (analytic) = -0.46162330756328381871635767087535 y[1] (numeric) = -0.46162330756328381871635767087538 absolute error = 3e-32 relative error = 6.4988053047748911231474641855947e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.922 y[1] (analytic) = -0.46287963011721018042511960599245 y[1] (numeric) = -0.46287963011721018042511960599249 absolute error = 4e-32 relative error = 8.6415554708836976129281005231947e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.923 y[1] (analytic) = -0.46413588103625080808371657160404 y[1] (numeric) = -0.46413588103625080808371657160408 absolute error = 4e-32 relative error = 8.6181658506328333700084462560175e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.924 y[1] (analytic) = -0.46539205898072751304895148965097 y[1] (numeric) = -0.46539205898072751304895148965101 absolute error = 4e-32 relative error = 8.5949038510896576606942964967576e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.925 y[1] (analytic) = -0.46664816261064391998962996544608 y[1] (numeric) = -0.46664816261064391998962996544613 absolute error = 5e-32 relative error = 1.0714710569152798112806487814399e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.926 y[1] (analytic) = -0.46790419058568689070135250361131 y[1] (numeric) = -0.46790419058568689070135250361136 absolute error = 5e-32 relative error = 1.0685948321474488513129728544806e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.927 y[1] (analytic) = -0.46916014156522794862914696554342 y[1] (numeric) = -0.46916014156522794862914696554346 absolute error = 4e-32 relative error = 8.5258734611492454839272606422938e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.928 y[1] (analytic) = -0.47041601420832470409643253629568 y[1] (numeric) = -0.47041601420832470409643253629573 absolute error = 5e-32 relative error = 1.0628889852771337981167955368286e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.929 y[1] (analytic) = -0.4716718071737222802388053714384 y[1] (numeric) = -0.47167180717372228023880537143845 absolute error = 5e-32 relative error = 1.0600591182161627752229652733195e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.93 y[1] (analytic) = -0.47292751911985473964113499873053 y[1] (numeric) = -0.47292751911985473964113499873057 absolute error = 4e-32 relative error = 8.4579556872567483712183502461118e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.931 y[1] (analytic) = -0.47418314870484651167645945530088 y[1] (numeric) = -0.47418314870484651167645945530092 absolute error = 4e-32 relative error = 8.4355591524611194266805727130515e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.932 y[1] (analytic) = -0.47543869458651382054516604850036 y[1] (numeric) = -0.47543869458651382054516604850042 absolute error = 6e-32 relative error = 1.2619923595445179304331841797307e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.933 y[1] (analytic) = -0.47669415542236611401294353764865 y[1] (numeric) = -0.4766941554223661140129435376487 absolute error = 5e-32 relative error = 1.0488905607768238102685268954713e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.934 y[1] (analytic) = -0.47794952986960749284599044456104 y[1] (numeric) = -0.47794952986960749284599044456108 absolute error = 4e-32 relative error = 8.3690844953676717914854725230248e-30 % Correct digits = 31 h = 0.001 memory used=690.4MB, alloc=4.6MB, time=33.24 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.935 y[1] (analytic) = -0.47920481658513814094196311300585 y[1] (numeric) = -0.47920481658513814094196311300591 absolute error = 6e-32 relative error = 1.2520742263728910747399914155192e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.936 y[1] (analytic) = -0.48046001422555575615514605110995 y[1] (numeric) = -0.48046001422555575615514605111 absolute error = 5e-32 relative error = 1.0406693277190618465886726483654e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.937 y[1] (analytic) = -0.48171512144715698181432600620216 y[1] (numeric) = -0.48171512144715698181432600620221 absolute error = 5e-32 relative error = 1.0379578670852432986086962639357e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.938 y[1] (analytic) = -0.48297013690593883893185013866372 y[1] (numeric) = -0.48297013690593883893185013866378 absolute error = 6e-32 relative error = 1.2423128350000931582856304944130e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.939 y[1] (analytic) = -0.48422505925760015910234758004051 y[1] (numeric) = -0.48422505925760015910234758004056 absolute error = 5e-32 relative error = 1.0325777041910749586275383055896e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.94 y[1] (analytic) = -0.48547988715754301808959258096779 y[1] (numeric) = -0.48547988715754301808959258096784 absolute error = 5e-32 relative error = 1.0299087835079459468712807508608e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.941 y[1] (analytic) = -0.48673461926087417009998637636461 y[1] (numeric) = -0.48673461926087417009998637636466 absolute error = 5e-32 relative error = 1.0272538262416382809154098947159e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.942 y[1] (analytic) = -0.48798925422240648274113381887312 y[1] (numeric) = -0.48798925422240648274113381887318 absolute error = 6e-32 relative error = 1.2295352711323093703643251649721e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.943 y[1] (analytic) = -0.48924379069666037266398975665052 y[1] (numeric) = -0.48924379069666037266398975665059 absolute error = 7e-32 relative error = 1.4307795281432853766497299628241e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.944 y[1] (analytic) = -0.49049822733786524188704905836818 y[1] (numeric) = -0.49049822733786524188704905836823 absolute error = 5e-32 relative error = 1.0193716758441814758447619465732e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.945 y[1] (analytic) = -0.49175256279996091480105311663642 y[1] (numeric) = -0.49175256279996091480105311663648 absolute error = 6e-32 relative error = 1.2201258221893046916328150117571e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.946 y[1] (analytic) = -0.49300679573659907585268459105538 y[1] (numeric) = -0.49300679573659907585268459105544 absolute error = 6e-32 relative error = 1.2170217635713172952530264395419e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.947 y[1] (analytic) = -0.49426092480114470790572108369289 y[1] (numeric) = -0.49426092480114470790572108369295 absolute error = 6e-32 relative error = 1.2139337137391493030299558911836e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.948 y[1] (analytic) = -0.4955149486466775312781173730133 y[1] (numeric) = -0.49551494864667753127811737301336 absolute error = 6e-32 relative error = 1.2108615524893570728699672452221e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.949 y[1] (analytic) = -0.49676886592599344345348476712518 y[1] (numeric) = -0.49676886592599344345348476712524 absolute error = 6e-32 relative error = 1.2078051608197714647668385513260e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.95 y[1] (analytic) = -0.49802267529160595946543507368428 y[1] (numeric) = -0.49802267529160595946543507368434 absolute error = 6e-32 relative error = 1.2047644209145367027904848925233e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.951 y[1] (analytic) = -0.49927637539574765295325562188195 y[1] (numeric) = -0.49927637539574765295325562188201 absolute error = 6e-32 relative error = 1.2017392161293722855500938251852e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.952 y[1] (analytic) = -0.50052996489037159788738071166952 y[1] (numeric) = -0.50052996489037159788738071166957 absolute error = 5e-32 relative error = 9.9894119248087839603399800508393e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.953 y[1] (analytic) = -0.50178344242715281096312380671766 y[1] (numeric) = -0.5017834424271528109631238067177 absolute error = 4e-32 relative error = 7.9715663407540718128516392667042e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.954 y[1] (analytic) = -0.50303680665748969466113373058825 y[1] (numeric) = -0.5030368066574896946611337305883 absolute error = 5e-32 relative error = 9.9396305276811004547259106941060e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.955 y[1] (analytic) = -0.50429005623250548097303707020542 y[1] (numeric) = -0.50429005623250548097303707020547 absolute error = 5e-32 relative error = 9.9149287958490395287661666483801e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.956 y[1] (analytic) = -0.50554318980304967579072793695414 y[1] (numeric) = -0.50554318980304967579072793695418 absolute error = 4e-32 relative error = 7.9122814443575560689507618545672e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.957 y[1] (analytic) = -0.50679620601969950395776518361101 y[1] (numeric) = -0.50679620601969950395776518361105 absolute error = 4e-32 relative error = 7.8927189124310795502424022344637e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.958 y[1] (analytic) = -0.50804910353276135498133612482286 y[1] (numeric) = -0.5080491035327613549813361248229 absolute error = 4e-32 relative error = 7.8732547153132837039110000508148e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.959 y[1] (analytic) = -0.50930188099227222940324475999675 y[1] (numeric) = -0.5093018809922722294032447599968 absolute error = 5e-32 relative error = 9.8173601681158258028207077414791e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.96 y[1] (analytic) = -0.51055453704800118582838145025179 y[1] (numeric) = -0.51055453704800118582838145025182 absolute error = 3e-32 relative error = 5.8759638438350549171815957613399e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=694.3MB, alloc=4.6MB, time=33.43 x[1] = 4.961 y[1] (analytic) = -0.51180707034945078860912995550875 y[1] (numeric) = -0.51180707034945078860912995550878 absolute error = 3e-32 relative error = 5.8615837369180244826151882041550e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.962 y[1] (analytic) = -0.5130594795458585561841666938614 y[1] (numeric) = -0.51305947954585855618416669386144 absolute error = 4e-32 relative error = 7.7963670090272055201041115427830e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.963 y[1] (analytic) = -0.51431176328619841007010604308273 y[1] (numeric) = -0.51431176328619841007010604308277 absolute error = 4e-32 relative error = 7.7773838467974630176631617995416e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.964 y[1] (analytic) = -0.51556392021918212450444446347339 y[1] (numeric) = -0.51556392021918212450444446347342 absolute error = 3e-32 relative error = 5.8188711086000887498091421269932e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.965 y[1] (analytic) = -0.51681594899326077673825518225917 y[1] (numeric) = -0.5168159489932607767382551822592 absolute error = 3e-32 relative error = 5.8047744189084994178325743125934e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.966 y[1] (analytic) = -0.5180678482566261979770841423904 y[1] (numeric) = -0.51806784825662619797708414239044 absolute error = 4e-32 relative error = 7.7209964167060026565980757581173e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.967 y[1] (analytic) = -0.51931961665721242496849688289056 y[1] (numeric) = -0.51931961665721242496849688289059 absolute error = 3e-32 relative error = 5.7767892907850842700906015507963e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.968 y[1] (analytic) = -0.52057125284269715223472498384577 y[1] (numeric) = -0.5205712528426971522347249838458 absolute error = 3e-32 relative error = 5.7628998597556453224390149273410e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.969 y[1] (analytic) = -0.52182275546050318494885967672244 y[1] (numeric) = -0.52182275546050318494885967672247 absolute error = 3e-32 relative error = 5.7490785302234108712085778375620e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.97 y[1] (analytic) = -0.5230741231577998924530391899478 y[1] (numeric) = -0.52307412315779989245303918994785 absolute error = 5e-32 relative error = 9.5588746960277570469582228977648e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.971 y[1] (analytic) = -0.52432535458150466241707537059054 y[1] (numeric) = -0.52432535458150466241707537059058 absolute error = 4e-32 relative error = 7.6288509892729459366419730559848e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.972 y[1] (analytic) = -0.5255764483782843556359640955355 y[1] (numeric) = -0.52557644837828435563596409553554 absolute error = 4e-32 relative error = 7.6106911037250181725856504114880e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.973 y[1] (analytic) = -0.5268274031945567614647229597614 y[1] (numeric) = -0.52682740319455676146472295976144 absolute error = 4e-32 relative error = 7.5926194722312205624746131339926e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.974 y[1] (analytic) = -0.52807821767649205388899870520192 y[1] (numeric) = -0.52807821767649205388899870520195 absolute error = 3e-32 relative error = 5.6809766045639872865332716894237e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.975 y[1] (analytic) = -0.5293288904700142482298858312033 y[1] (numeric) = -0.52932889047001424822988583120333 absolute error = 3e-32 relative error = 5.6675538668145789850744084104903e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.976 y[1] (analytic) = -0.53057942022080265848139680678441 y[1] (numeric) = -0.53057942022080265848139680678445 absolute error = 4e-32 relative error = 7.5389279108024669995591094556624e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.977 y[1] (analytic) = -0.5318298055742933552790232857606 y[1] (numeric) = -0.53182980557429335527902328576064 absolute error = 4e-32 relative error = 7.5212031331726942549132815353699e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.978 y[1] (analytic) = -0.53308004517568062449782670831222 y[1] (numeric) = -0.53308004517568062449782670831226 absolute error = 4e-32 relative error = 7.5035635571047670117321697002544e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.979 y[1] (analytic) = -0.53433013766991842647849565676345 y[1] (numeric) = -0.53433013766991842647849565676349 absolute error = 4e-32 relative error = 7.4860085890775517035840768502897e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.98 y[1] (analytic) = -0.53558008170172185587980631918807 y[1] (numeric) = -0.53558008170172185587980631918812 absolute error = 5e-32 relative error = 9.3356720513453055066936548554354e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.981 y[1] (analytic) = -0.53682987591556860215592140197855 y[1] (numeric) = -0.53682987591556860215592140197859 absolute error = 4e-32 relative error = 7.4511501305287096597183940280578e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.982 y[1] (analytic) = -0.53807951895570041065696182170326 y[1] (numeric) = -0.5380795189557004106569618217033 absolute error = 4e-32 relative error = 7.4338454802427005254856244859433e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.983 y[1] (analytic) = -0.5393290094661245443512844974369 y[1] (numeric) = -0.53932900946612454435128449743693 absolute error = 3e-32 relative error = 5.5624673387579592371834465529232e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.984 y[1] (analytic) = -0.54057834609061524616789855728048 y[1] (numeric) = -0.54057834609061524616789855728053 absolute error = 5e-32 relative error = 9.2493530977688617815110550092868e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.985 y[1] (analytic) = -0.54182752747271520195745126699367 y[1] (numeric) = -0.54182752747271520195745126699371 absolute error = 4e-32 relative error = 7.3824229984354715543258899899558e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.986 y[1] (analytic) = -0.54307655225573700407021398454192 y[1] (numeric) = -0.54307655225573700407021398454195 absolute error = 3e-32 relative error = 5.5240830920412994369280630493880e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.987 y[1] (analytic) = -0.54432541908276461554949744191905 y[1] (numeric) = -0.54432541908276461554949744191908 absolute error = 3e-32 relative error = 5.5114089749019241650667657882072e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=698.1MB, alloc=4.6MB, time=33.62 TOP MAIN SOLVE Loop x[1] = 4.988 y[1] (analytic) = -0.54557412659665483493892465483991 y[1] (numeric) = -0.54557412659665483493892465483996 absolute error = 5e-32 relative error = 9.1646574796178343769675759616114e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.989 y[1] (analytic) = -0.54682267344003876170198876181247 y[1] (numeric) = -0.54682267344003876170198876181252 absolute error = 5e-32 relative error = 9.1437320412213475925972808823916e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.99 y[1] (analytic) = -0.54807105825532326225232209669286 y[1] (numeric) = -0.5480710582553232622523220966929 absolute error = 4e-32 relative error = 7.2983237114056261314758944811022e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.991 y[1] (analytic) = -0.54931927968469243659310180310422 y[1] (numeric) = -0.54931927968469243659310180310427 absolute error = 5e-32 relative error = 9.1021746094001734251783480289748e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.992 y[1] (analytic) = -0.55056733637010908556401630505974 y[1] (numeric) = -0.55056733637010908556401630505979 absolute error = 5e-32 relative error = 9.0815412933230006518519112706337e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.993 y[1] (analytic) = -0.55181522695331617869421595577503 y[1] (numeric) = -0.55181522695331617869421595577507 absolute error = 4e-32 relative error = 7.2488032309017848735663993580849e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.994 y[1] (analytic) = -0.55306295007583832265967019598626 y[1] (numeric) = -0.55306295007583832265967019598629 absolute error = 3e-32 relative error = 5.4243373192665090947903417087643e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.995 y[1] (analytic) = -0.55431050437898323034335256410838 y[1] (numeric) = -0.55431050437898323034335256410842 absolute error = 4e-32 relative error = 7.2161721064286232331474732559986e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.996 y[1] (analytic) = -0.55555788850384319049667391327531 y[1] (numeric) = -0.55555788850384319049667391327536 absolute error = 5e-32 relative error = 8.9999622063964472547993579421454e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.997 y[1] (analytic) = -0.55680510109129653800058320470115 y[1] (numeric) = -0.55680510109129653800058320470119 absolute error = 4e-32 relative error = 7.1838422316180254870023011590174e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.998 y[1] (analytic) = -0.55805214078200912472475426289059 y[1] (numeric) = -0.55805214078200912472475426289063 absolute error = 4e-32 relative error = 7.1677890069460599012601154850505e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.999 y[1] (analytic) = -0.55929900621643579098327589600906 y[1] (numeric) = -0.55929900621643579098327589600911 absolute error = 5e-32 relative error = 8.9397619956884306375129610630694e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 Finished! diff ( y , x , 1 ) = (0.2 * x + 0.3) * sin(x); Iterations = 4900 Total Elapsed Time = 33 Seconds Elapsed Time(since restart) = 33 Seconds Time to Timeout = 2 Minutes 26 Seconds Percent Done = 100 % > quit memory used=699.8MB, alloc=4.6MB, time=33.70