|\^/| 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_0D1, > array_const_0D2, > #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, > 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_0D1, array_const_0D2, 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, 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_0D1, > array_const_0D2, > #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, > 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_0D1, array_const_0D2, 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, 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_0D1, > array_const_0D2, > #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, > 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_0D1, array_const_0D2, 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, 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_0D1, > array_const_0D2, > #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, > 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_0D1, array_const_0D2, 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, 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_0D1, > array_const_0D2, > #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, > 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_0D1, array_const_0D2, 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, 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_0D1, > array_const_0D2, > #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, > 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_0D1, array_const_0D2, 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, 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_0D1, > array_const_0D2, > #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, > 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_0D1, array_const_0D2, 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, 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_0D1, > array_const_0D2, > #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, > 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_0D1, array_const_0D2, 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, 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_0D1, > array_const_0D2, > #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, > 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_0D1[1] * array_x[1]; > #emit pre add LINEAR - CONST $eq_no = 1 i = 1 > array_tmp2[1] := array_tmp1[1] + array_const_0D2[1]; > #emit pre sqrt 1 $eq_no = 1 > array_tmp3[1] := sqrt(array_tmp2[1]); > #emit pre exp 1 $eq_no = 1 > array_tmp4[1] := exp(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_0D1[1] * array_x[2]; > #emit pre add LINEAR - CONST $eq_no = 1 i = 2 > array_tmp2[2] := array_tmp1[2]; > #emit pre sqrt 2 $eq_no = 1 > array_tmp3[2] := array_tmp2[2] / array_tmp3[1]/2.0; > #emit pre exp ID_FULL iii = 2 $eq_no = 1 > #emit pre exp 2 $eq_no = 1 > array_tmp4[2] := att(1,array_tmp4,array_tmp3,1); > #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 sqrt ID_LINEAR iii = 3 $eq_no = 1 > array_tmp3[3] := 0.0; > array_tmp3[3] := -ats(3,array_tmp3,array_tmp3,2) / array_tmp3[1] / 2.0; > #emit pre exp ID_FULL iii = 3 $eq_no = 1 > #emit pre exp 3 $eq_no = 1 > array_tmp4[3] := att(2,array_tmp4,array_tmp3,1); > #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 sqrt ID_LINEAR iii = 4 $eq_no = 1 > array_tmp3[4] := 0.0; > array_tmp3[4] := -ats(4,array_tmp3,array_tmp3,2) / array_tmp3[1] / 2.0; > #emit pre exp ID_FULL iii = 4 $eq_no = 1 > #emit pre exp 4 $eq_no = 1 > array_tmp4[4] := att(3,array_tmp4,array_tmp3,1); > #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 sqrt ID_LINEAR iii = 5 $eq_no = 1 > array_tmp3[5] := 0.0; > array_tmp3[5] := -ats(5,array_tmp3,array_tmp3,2) / array_tmp3[1] / 2.0; > #emit pre exp ID_FULL iii = 5 $eq_no = 1 > #emit pre exp 5 $eq_no = 1 > array_tmp4[5] := att(4,array_tmp4,array_tmp3,1); > #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 sqrt LINEAR $eq_no = 1 > array_tmp3[kkk] := 0.0; > array_tmp3[kkk] := -ats(kkk,array_tmp3,array_tmp3,2) /array_tmp3[1] / 2.0; > #emit exp FULL $eq_no = 1 > array_tmp4[kkk] := att(kkk-1,array_tmp4,array_tmp3,1); > #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_0D1, array_const_0D2, 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, 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_0D1[1]*array_x[1]; array_tmp2[1] := array_tmp1[1] + array_const_0D2[1]; array_tmp3[1] := sqrt(array_tmp2[1]); array_tmp4[1] := exp(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_0D1[1]*array_x[2]; array_tmp2[2] := array_tmp1[2]; array_tmp3[2] := array_tmp2[2]/(array_tmp3[1]*2.0); array_tmp4[2] := att(1, array_tmp4, array_tmp3, 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] := 0.; array_tmp3[3] := -ats(3, array_tmp3, array_tmp3, 2)/(array_tmp3[1]*2.0) ; array_tmp4[3] := att(2, array_tmp4, array_tmp3, 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] := 0.; array_tmp3[4] := -ats(4, array_tmp3, array_tmp3, 2)/(array_tmp3[1]*2.0) ; array_tmp4[4] := att(3, array_tmp4, array_tmp3, 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] := 0.; array_tmp3[5] := -ats(5, array_tmp3, array_tmp3, 2)/(array_tmp3[1]*2.0) ; array_tmp4[5] := att(4, array_tmp4, array_tmp3, 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] := 0.; array_tmp3[kkk] := -ats(kkk, array_tmp3, array_tmp3, 2)/(array_tmp3[1]*2.0); array_tmp4[kkk] := att(kkk - 1, array_tmp4, array_tmp3, 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(20.0 * exp(sqrt(0.1 * x + 0.2)) * sqrt( 0.1 * x + 0.2) - 20.0 * exp(sqrt(0.1 * x + 0.2))); > end; exact_soln_y := proc(x) return 20.0*exp(sqrt(0.1*x + 0.2))*sqrt(0.1*x + 0.2) - 20.0*exp(sqrt(0.1*x + 0.2)) 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_0D1, > array_const_0D2, > #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, > 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/exp_sqrtpostode.ode#################"); > omniout_str(ALWAYS,"diff ( y , x , 1 ) = exp(sqrt(0.1 * x + 0.2));"); > 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 := 0.0;"); > 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,"glob_display_interval := 0.1;"); > omniout_str(ALWAYS,"glob_max_minutes := 10;"); > 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(20.0 * exp(sqrt(0.1 * x + 0.2)) * sqrt( 0.1 * x + 0.2) - 20.0 * exp(sqrt(0.1 * x + 0.2)));"); > 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:= 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[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 := 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_0D1 := Array(1..(max_terms+1 + 1),[]); > term := 1; > while (term <= max_terms + 1) do # do number 2 > array_const_0D1[term] := 0.0; > term := term + 1; > od;# end do number 2; > array_const_0D1[1] := 0.1; > 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_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 := 0.0; > x_end := 5.0 ; > array_y_init[0 + 1] := exact_soln_y(x_start); > glob_look_poles := true; > glob_max_iter := 1000000; > glob_display_interval := 0.1; > glob_max_minutes := 10; > #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 ) = exp(sqrt(0.1 * x + 0.2));"); > 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,"2013-01-28T13:46:18-06:00") > ; > logitem_str(html_log_file,"Maple") > ; > logitem_str(html_log_file,"exp_sqrt") > ; > logitem_str(html_log_file,"diff ( y , x , 1 ) = exp(sqrt(0.1 * x + 0.2));") > ; > 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,"exp_sqrt diffeq.mxt") > ; > logitem_str(html_log_file,"exp_sqrt 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_0D1, array_const_0D2, 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, 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/exp_sqrtpostode.ode#################"); omniout_str(ALWAYS, "diff ( y , x , 1 ) = exp(sqrt(0.1 * x + 0.2));"); 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 := 0.0;"); 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, "glob_display_interval := 0.1;"); omniout_str(ALWAYS, "glob_max_minutes := 10;"); 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(20.0 * exp(sqrt(0.1 * x + 0.2)) * sqrt( 0\ .1 * x + 0.2) - 20.0 * exp(sqrt(0.1 * x + 0.2)));"); 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 := 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[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 := 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_0D1 := Array(1 .. max_terms + 2, []); term := 1; while term <= max_terms + 1 do array_const_0D1[term] := 0.; term := term + 1 end do; array_const_0D1[1] := 0.1; 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_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.; x_end := 5.0; array_y_init[1] := exact_soln_y(x_start); glob_look_poles := true; glob_max_iter := 1000000; glob_display_interval := 0.1; glob_max_minutes := 10; 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 ) = exp(sqrt(0.1 * x + 0.2));") ; 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, "2013-01-28T13:46:18-06:00"); logitem_str(html_log_file, "Maple"); logitem_str(html_log_file, "exp_sqrt"); logitem_str(html_log_file, "diff ( y , x , 1 ) = exp(sqrt(0.1 * x + 0.2));"); 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, "exp_sqrt diffeq.mxt"); logitem_str(html_log_file, "exp_sqrt 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/exp_sqrtpostode.ode################# diff ( y , x , 1 ) = exp(sqrt(0.1 * x + 0.2)); ! #BEGIN FIRST INPUT BLOCK Digits:=32; max_terms:=30; ! #END FIRST INPUT BLOCK #BEGIN SECOND INPUT BLOCK x_start := 0.0; x_end := 5.0 ; array_y_init[0 + 1] := exact_soln_y(x_start); glob_look_poles := true; glob_max_iter := 1000000; glob_display_interval := 0.1; glob_max_minutes := 10; #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(20.0 * exp(sqrt(0.1 * x + 0.2)) * sqrt( 0.1 * x + 0.2) - 20.0 * exp(sqrt(0.1 * x + 0.2))); 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 = 5 estimated_steps = 5000 step_error = 2.0000000000000000000000000000000e-14 est_needed_step_err = 2.0000000000000000000000000000000e-14 hn_div_ho = 0.5 hn_div_ho_2 = 0.25 hn_div_ho_3 = 0.125 value3 = 1.1718092041239411367873824030629e-90 max_value3 = 1.1718092041239411367873824030629e-90 value3 = 1.1718092041239411367873824030629e-90 best_h = 0.001 START of Soultion TOP MAIN SOLVE Loop x[1] = 0 y[1] (analytic) = -17.290587327796204449202978508691 y[1] (numeric) = -17.290587327796204449202978508691 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.001 y[1] (analytic) = -17.289023292056926926235952518651 y[1] (numeric) = -17.289023292056926926235952518651 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.002 y[1] (analytic) = -17.287459081487064506816998080551 y[1] (numeric) = -17.287459081487064506816998080551 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=3.8MB, alloc=2.8MB, time=0.13 x[1] = 0.003 y[1] (analytic) = -17.285894696110751090021901864967 y[1] (numeric) = -17.285894696110751090021901864967 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.004 y[1] (analytic) = -17.284330135952100317273092040908 y[1] (numeric) = -17.284330135952100317273092040908 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.005 y[1] (analytic) = -17.28276540103520559791517606772 y[1] (numeric) = -17.28276540103520559791517606772 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.006 y[1] (analytic) = -17.281200491384140134745575030008 y[1] (numeric) = -17.281200491384140134745575030007 absolute error = 1e-30 relative error = 5.7866350228305514103653488097904e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.007 y[1] (analytic) = -17.27963540702295694950035557695 y[1] (numeric) = -17.279635407022956949500355576949 absolute error = 1e-30 relative error = 5.7871591410636494385988337793843e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.008 y[1] (analytic) = -17.278070147975688908295360249872 y[1] (numeric) = -17.278070147975688908295360249871 absolute error = 1e-30 relative error = 5.7876834127633213555237101622587e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.009 y[1] (analytic) = -17.276504714266348747022736705264 y[1] (numeric) = -17.276504714266348747022736705263 absolute error = 1e-30 relative error = 5.7882078379791375487623458490105e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.01 y[1] (analytic) = -17.274939105918929096702966064715 y[1] (numeric) = -17.274939105918929096702966064714 absolute error = 1e-30 relative error = 5.7887324167606995074968116772733e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=7.6MB, alloc=3.9MB, time=0.27 x[1] = 0.011 y[1] (analytic) = -17.273373322957402508792490348357 y[1] (numeric) = -17.273373322957402508792490348357 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.012 y[1] (analytic) = -17.271807365405721480447038674476 y[1] (numeric) = -17.271807365405721480447038674475 absolute error = 1e-30 relative error = 5.7897820352196222552766426275516e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.013 y[1] (analytic) = -17.270241233287818479740751634828 y[1] (numeric) = -17.270241233287818479740751634827 absolute error = 1e-30 relative error = 5.7903070749963416345084491726411e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.014 y[1] (analytic) = -17.268674926627605970841202983069 y[1] (numeric) = -17.268674926627605970841202983068 absolute error = 1e-30 relative error = 5.7908322685375239828129671864681e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.015 y[1] (analytic) = -17.267108445448976439140417502324 y[1] (numeric) = -17.267108445448976439140417502323 absolute error = 1e-30 relative error = 5.7913576158929264708065401911802e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.016 y[1] (analytic) = -17.26554178977580241634198364753 y[1] (numeric) = -17.265541789775802416341983647529 absolute error = 1e-30 relative error = 5.7918831171123374402771200727113e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.017 y[1] (analytic) = -17.263974959631936505504359288605 y[1] (numeric) = -17.263974959631936505504359288605 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.018 y[1] (analytic) = -17.262407955041211406040468611813 y[1] (numeric) = -17.262407955041211406040468611813 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 memory used=11.4MB, alloc=4.1MB, time=0.42 TOP MAIN SOLVE Loop x[1] = 0.019 y[1] (analytic) = -17.260840776027439938673687968844 y[1] (numeric) = -17.260840776027439938673687968844 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.02 y[1] (analytic) = -17.259273422614415070350318196196 y[1] (numeric) = -17.259273422614415070350318196197 absolute error = 1e-30 relative error = 5.7939866616269246144449711495535e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.021 y[1] (analytic) = -17.257705894825909939108640661323 y[1] (numeric) = -17.257705894825909939108640661323 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.022 y[1] (analytic) = -17.256138192685677878904654026758 y[1] (numeric) = -17.256138192685677878904654026757 absolute error = 1e-30 relative error = 5.7950393583650590241278741776215e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.023 y[1] (analytic) = -17.25457031621745244439458845906 y[1] (numeric) = -17.254570316217452444394588459059 absolute error = 1e-30 relative error = 5.7955659380292237710294036692544e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.024 y[1] (analytic) = -17.253002265444947435674293745865 y[1] (numeric) = -17.253002265444947435674293745864 absolute error = 1e-30 relative error = 5.7960926719568273022934216963631e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.025 y[1] (analytic) = -17.251434040391856922975597521625 y[1] (numeric) = -17.251434040391856922975597521625 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.026 y[1] (analytic) = -17.249865641081855271319729540801 y[1] (numeric) = -17.249865641081855271319729540801 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=15.2MB, alloc=4.1MB, time=0.58 x[1] = 0.027 y[1] (analytic) = -17.248297067538597165127907676227 y[1] (numeric) = -17.248297067538597165127907676227 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.028 y[1] (analytic) = -17.246728319785717632789181060228 y[1] (numeric) = -17.246728319785717632789181060228 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.029 y[1] (analytic) = -17.245159397846832071185625526718 y[1] (numeric) = -17.245159397846832071185625526718 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.03 y[1] (analytic) = -17.243590301745536270174986254011 y[1] (numeric) = -17.24359030174553627017498625401 absolute error = 1e-30 relative error = 5.7992563178607408549443811530080e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.031 y[1] (analytic) = -17.242021031505406437030862250398 y[1] (numeric) = -17.242021031505406437030862250397 absolute error = 1e-30 relative error = 5.7997841330361123931849175838568e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.032 y[1] (analytic) = -17.240451587149999220840527067714 y[1] (numeric) = -17.240451587149999220840527067713 absolute error = 1e-30 relative error = 5.8003121028763547609929939189447e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.033 y[1] (analytic) = -17.238881968702851736860479872061 y[1] (numeric) = -17.23888196870285173686047987206 absolute error = 1e-30 relative error = 5.8008402274317880155288865723357e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.034 y[1] (analytic) = -17.237312176187481590829820745686 y[1] (numeric) = -17.237312176187481590829820745685 absolute error = 1e-30 relative error = 5.8013685067527635988069124010352e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=19.0MB, alloc=4.2MB, time=0.73 x[1] = 0.035 y[1] (analytic) = -17.235742209627386903241543839595 y[1] (numeric) = -17.235742209627386903241543839594 absolute error = 1e-30 relative error = 5.8018969408896643497790114200498e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.036 y[1] (analytic) = -17.234172069046046333571841742927 y[1] (numeric) = -17.234172069046046333571841742926 absolute error = 1e-30 relative error = 5.8024255298929045164406139791153e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.037 y[1] (analytic) = -17.232601754466919104467514182345 y[1] (numeric) = -17.232601754466919104467514182344 absolute error = 1e-30 relative error = 5.8029542738129297679587827575013e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.038 y[1] (analytic) = -17.231031265913445025891573912738 y[1] (numeric) = -17.231031265913445025891573912737 absolute error = 1e-30 relative error = 5.8034831727002172068226200027277e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.039 y[1] (analytic) = -17.229460603409044519227142409391 y[1] (numeric) = -17.22946060340904451922714240939 absolute error = 1e-30 relative error = 5.8040122266052753810159305082700e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.04 y[1] (analytic) = -17.227889766977118641339727721417 y[1] (numeric) = -17.227889766977118641339727721417 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.041 y[1] (analytic) = -17.226318756641049108597976596706 y[1] (numeric) = -17.226318756641049108597976596705 absolute error = 1e-30 relative error = 5.8050707996708954279913958252951e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.042 y[1] (analytic) = -17.224747572424198320852992739876 y[1] (numeric) = -17.224747572424198320852992739875 absolute error = 1e-30 relative error = 5.8056003189326317340800318639673e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=22.8MB, alloc=4.2MB, time=0.89 x[1] = 0.043 y[1] (analytic) = -17.22317621434990938537631281679 y[1] (numeric) = -17.223176214349909385376312816789 absolute error = 1e-30 relative error = 5.8061299934144876666120697357463e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.044 y[1] (analytic) = -17.221604682441506140756631571966 y[1] (numeric) = -17.221604682441506140756631571965 absolute error = 1e-30 relative error = 5.8066598231671291844130658386596e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.045 y[1] (analytic) = -17.220032976722293180755367178888 y[1] (numeric) = -17.220032976722293180755367178887 absolute error = 1e-30 relative error = 5.8071898082412537653061039078902e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.046 y[1] (analytic) = -17.218461097215555878121157697591 y[1] (numeric) = -17.21846109721555587812115769759 absolute error = 1e-30 relative error = 5.8077199486875904184399878092318e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.047 y[1] (analytic) = -17.216889043944560408363379269083 y[1] (numeric) = -17.216889043944560408363379269083 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.048 y[1] (analytic) = -17.215316816932553773484776432137 y[1] (numeric) = -17.215316816932553773484776432137 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.049 y[1] (analytic) = -17.213744416202763825673294704696 y[1] (numeric) = -17.213744416202763825673294704696 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.05 y[1] (analytic) = -17.212171841778399290953205329685 y[1] (numeric) = -17.212171841778399290953205329685 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=26.7MB, alloc=4.2MB, time=1.04 x[1] = 0.051 y[1] (analytic) = -17.210599093682649792795611843266 y[1] (numeric) = -17.210599093682649792795611843265 absolute error = 1e-30 relative error = 5.8103729832801788387401236224195e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.052 y[1] (analytic) = -17.209026171938685875688427882632 y[1] (numeric) = -17.209026171938685875688427882632 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.053 y[1] (analytic) = -17.207453076569659028665915410266 y[1] (numeric) = -17.207453076569659028665915410265 absolute error = 1e-30 relative error = 5.8114352865017490761360009527039e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.054 y[1] (analytic) = -17.205879807598701708797872292111 y[1] (numeric) = -17.20587980759870170879787229211 absolute error = 1e-30 relative error = 5.8119666717558144815037479205451e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.055 y[1] (analytic) = -17.204306365048927364638557928511 y[1] (numeric) = -17.20430636504892736463855792851 absolute error = 1e-30 relative error = 5.8124982128400739962339892572318e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.056 y[1] (analytic) = -17.202732748943430459635445398779 y[1] (numeric) = -17.202732748943430459635445398778 absolute error = 1e-30 relative error = 5.8130299098055726256590646715234e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.057 y[1] (analytic) = -17.201158959305286495497888343162 y[1] (numeric) = -17.201158959305286495497888343161 absolute error = 1e-30 relative error = 5.8135617627033870435092557074111e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.058 y[1] (analytic) = -17.199584996157552035525790569528 y[1] (numeric) = -17.199584996157552035525790569527 absolute error = 1e-30 relative error = 5.8140937715846256045065926767345e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=30.5MB, alloc=4.3MB, time=1.20 x[1] = 0.059 y[1] (analytic) = -17.198010859523264727898366136441 y[1] (numeric) = -17.19801085952326472789836613644 absolute error = 1e-30 relative error = 5.8146259365004283569807415123332e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.06 y[1] (analytic) = -17.196436549425443328923077429396 y[1] (numeric) = -17.196436549425443328923077429395 absolute error = 1e-30 relative error = 5.8151582575019670555069624519971e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.061 y[1] (analytic) = -17.19486206588708772624483851278 y[1] (numeric) = -17.194862065887087726244838512779 absolute error = 1e-30 relative error = 5.8156907346404451735661325290832e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.062 y[1] (analytic) = -17.193287408931178962015570806732 y[1] (numeric) = -17.19328740893117896201557080673 absolute error = 2e-30 relative error = 1.1632446735934195832453647822164e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.063 y[1] (analytic) = -17.19171257858067925602419790533 y[1] (numeric) = -17.191712578580679256024197905328 absolute error = 2e-30 relative error = 1.1633512315066384465698860385414e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.064 y[1] (analytic) = -17.190137574858532028787166120627 y[1] (numeric) = -17.190137574858532028787166120625 absolute error = 2e-30 relative error = 1.1634578206780053659624665630351e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.065 y[1] (analytic) = -17.188562397787661924599577105776 y[1] (numeric) = -17.188562397787661924599577105774 absolute error = 2e-30 relative error = 1.1635644411177864366520199696661e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.066 y[1] (analytic) = -17.186987047390974834547018680009 y[1] (numeric) = -17.186987047390974834547018680008 absolute error = 1e-30 relative error = 5.8183554641812705518737094370391e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=34.3MB, alloc=4.3MB, time=1.35 x[1] = 0.067 y[1] (analytic) = -17.185411523691357919478179748471 y[1] (numeric) = -17.18541152369135791947817974847 absolute error = 1e-30 relative error = 5.8188888792184359896627902779554e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.068 y[1] (analytic) = -17.183835826711679632938334980819 y[1] (numeric) = -17.183835826711679632938334980817 absolute error = 2e-30 relative error = 1.1638844901503708717559743114473e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.069 y[1] (analytic) = -17.182259956474789744063784684207 y[1] (numeric) = -17.182259956474789744063784684206 absolute error = 1e-30 relative error = 5.8199561788329833423566348441272e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.07 y[1] (analytic) = -17.180683913003519360437335078654 y[1] (numeric) = -17.180683913003519360437335078653 absolute error = 1e-30 relative error = 5.8204900635133124573621604995148e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.071 y[1] (analytic) = -17.179107696320680950904903955867 y[1] (numeric) = -17.179107696320680950904903955865 absolute error = 2e-30 relative error = 1.1642048209688726134966322445215e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.072 y[1] (analytic) = -17.177531306449068368353336476456 y[1] (numeric) = -17.177531306449068368353336476453 absolute error = 3e-30 relative error = 1.7464674908633065188078586268215e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.073 y[1] (analytic) = -17.175954743411456872449515634972 y[1] (numeric) = -17.17595474341145687244951563497 absolute error = 2e-30 relative error = 1.1644185315329747077683706334106e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.074 y[1] (analytic) = -17.174378007230603152340851697451 y[1] (numeric) = -17.174378007230603152340851697449 absolute error = 2e-30 relative error = 1.1645254338515070954541815036798e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.075 y[1] (analytic) = -17.172801097929245349317234692068 y[1] (numeric) = -17.172801097929245349317234692066 absolute error = 2e-30 relative error = 1.1646323675414646182224848282350e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=38.1MB, alloc=4.3MB, time=1.51 TOP MAIN SOLVE Loop x[1] = 0.076 y[1] (analytic) = -17.171224015530103079434533810182 y[1] (numeric) = -17.17122401553010307943453381018 absolute error = 2e-30 relative error = 1.1647393326131834343227644232329e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.077 y[1] (analytic) = -17.169646760055877456099727352372 y[1] (numeric) = -17.16964676005587745609972735237 absolute error = 2e-30 relative error = 1.1648463290770060868965757937031e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.078 y[1] (analytic) = -17.168069331529251112617746632111 y[1] (numeric) = -17.168069331529251112617746632108 absolute error = 3e-30 relative error = 1.7474300354149222598765018927998e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.079 y[1] (analytic) = -17.16649172997288822470011702847 y[1] (numeric) = -17.166491729972888224700117028467 absolute error = 3e-30 relative error = 1.7475906243335475212047367662577e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.08 y[1] (analytic) = -17.16491395540943453293547915868 y[1] (numeric) = -17.164913955409434532935479158677 absolute error = 3e-30 relative error = 1.7477512603869274845436347733675e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.081 y[1] (analytic) = -17.163336007861517365222072921473 y[1] (numeric) = -17.16333600786151736522207292147 absolute error = 3e-30 relative error = 1.7479119435906143131255672681905e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.082 y[1] (analytic) = -17.161757887351745659162266942976 y[1] (numeric) = -17.161757887351745659162266942973 absolute error = 3e-30 relative error = 1.7480726739601697671376975029693e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.083 y[1] (analytic) = -17.160179593902709984419215738381 y[1] (numeric) = -17.160179593902709984419215738378 absolute error = 3e-30 relative error = 1.7482334515111652076650387013423e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=41.9MB, alloc=4.3MB, time=1.67 x[1] = 0.084 y[1] (analytic) = -17.15860112753698256503572668483 y[1] (numeric) = -17.158601127536982565035726684827 absolute error = 3e-30 relative error = 1.7483942762591816006400812307909e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.085 y[1] (analytic) = -17.15702248827711730171541868379 y[1] (numeric) = -17.157022488277117301715418683787 absolute error = 3e-30 relative error = 1.7485551482198095207989869254864e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.086 y[1] (analytic) = -17.155443676145649794066254174725 y[1] (numeric) = -17.155443676145649794066254174722 absolute error = 3e-30 relative error = 1.7487160674086491556443486292489e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.087 y[1] (analytic) = -17.15386469116509736280652594611 y[1] (numeric) = -17.153864691165097362806525946107 absolute error = 3e-30 relative error = 1.7488770338413103094145130468281e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.088 y[1] (analytic) = -17.152285533357959071933379974683 y[1] (numeric) = -17.15228553335795907193337997468 absolute error = 3e-30 relative error = 1.7490380475334124070594650101772e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.089 y[1] (analytic) = -17.150706202746715750853955309416 y[1] (numeric) = -17.150706202746715750853955309414 absolute error = 2e-30 relative error = 1.1661327390003896654821808565370e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.09 y[1] (analytic) = -17.14912669935383001647922180289 y[1] (numeric) = -17.149126699353830016479221802887 absolute error = 3e-30 relative error = 1.7493602167584652612330820596676e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.091 y[1] (analytic) = -17.147547023201746295280596279645 y[1] (numeric) = -17.147547023201746295280596279642 absolute error = 3e-30 relative error = 1.7495213723227030070946882823836e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=45.7MB, alloc=4.3MB, time=1.82 x[1] = 0.092 y[1] (analytic) = -17.145967174312890845309417518671 y[1] (numeric) = -17.145967174312890845309417518668 absolute error = 3e-30 relative error = 1.7496825752089556834946330198626e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.093 y[1] (analytic) = -17.144387152709671778179360215345 y[1] (numeric) = -17.144387152709671778179360215343 absolute error = 2e-30 relative error = 1.1665625502885939192059166951087e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.094 y[1] (analytic) = -17.142806958414479081011867877078 y[1] (numeric) = -17.142806958414479081011867877075 absolute error = 3e-30 relative error = 1.7500051230101858261180028496163e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.095 y[1] (analytic) = -17.141226591449684638344684396381 y[1] (numeric) = -17.141226591449684638344684396378 absolute error = 3e-30 relative error = 1.7501664679565274072289973674130e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.096 y[1] (analytic) = -17.139646051837642254003563835328 y[1] (numeric) = -17.139646051837642254003563835326 absolute error = 2e-30 relative error = 1.1668852401917414378023610519780e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.097 y[1] (analytic) = -17.138065339600687672937237746149 y[1] (numeric) = -17.138065339600687672937237746146 absolute error = 3e-30 relative error = 1.7504893000191462658928753444581e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.098 y[1] (analytic) = -17.13648445476113860301571914422 y[1] (numeric) = -17.136484454761138603015719144217 absolute error = 3e-30 relative error = 1.7506507871668455869791937249936e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.099 y[1] (analytic) = -17.134903397341294736792022041847 y[1] (numeric) = -17.134903397341294736792022041845 absolute error = 2e-30 relative error = 1.1672082144976237580157247205503e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=49.5MB, alloc=4.3MB, time=1.97 x[1] = 0.1 y[1] (analytic) = -17.133322167363437773227375243985 y[1] (numeric) = -17.133322167363437773227375243983 absolute error = 2e-30 relative error = 1.1673159358491010680136808693482e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.101 y[1] (analytic) = -17.131740764849831439380008900486 y[1] (numeric) = -17.131740764849831439380008900483 absolute error = 3e-30 relative error = 1.7511355332642383409588565074126e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.102 y[1] (analytic) = -17.130159189822721512057592103505 y[1] (numeric) = -17.130159189822721512057592103502 absolute error = 3e-30 relative error = 1.7512972102339503898894025374896e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.103 y[1] (analytic) = -17.128577442304335839433399613415 y[1] (numeric) = -17.128577442304335839433399613413 absolute error = 2e-30 relative error = 1.1676392897990346439993397925416e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.104 y[1] (analytic) = -17.126995522316884362626285591886 y[1] (numeric) = -17.126995522316884362626285591883 absolute error = 3e-30 relative error = 1.7516207066738169716911930162284e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.105 y[1] (analytic) = -17.125413429882559137244542016753 y[1] (numeric) = -17.12541342988255913724454201675 absolute error = 3e-30 relative error = 1.7517825261755289986732886590068e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.106 y[1] (analytic) = -17.123831165023534354893719249931 y[1] (numeric) = -17.123831165023534354893719249929 absolute error = 2e-30 relative error = 1.1679629288129875547000937391223e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.107 y[1] (analytic) = -17.122248727761966364648486026807 y[1] (numeric) = -17.122248727761966364648486026806 absolute error = 1e-30 relative error = 5.8403543594049231814143879003401e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=53.4MB, alloc=4.3MB, time=2.13 x[1] = 0.108 y[1] (analytic) = -17.120666118119993694488605933423 y[1] (numeric) = -17.120666118119993694488605933422 absolute error = 1e-30 relative error = 5.8408942333244285000094999425738e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.109 y[1] (analytic) = -17.119083336119737072699107236235 y[1] (numeric) = -17.119083336119737072699107236233 absolute error = 2e-30 relative error = 1.1682868531752390058070072581771e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.11 y[1] (analytic) = -17.117500381783299449234722728327 y[1] (numeric) = -17.117500381783299449234722728325 absolute error = 2e-30 relative error = 1.1683948914225992868730647592890e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.111 y[1] (analytic) = -17.115917255132766017048676055689 y[1] (numeric) = -17.115917255132766017048676055688 absolute error = 1e-30 relative error = 5.8425148070876387617541716291473e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.112 y[1] (analytic) = -17.114333956190204233385890787476 y[1] (numeric) = -17.114333956190204233385890787475 absolute error = 1e-30 relative error = 5.8430553158529604506109962284536e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.113 y[1] (analytic) = -17.112750484977663841040698295145 y[1] (numeric) = -17.112750484977663841040698295144 absolute error = 1e-30 relative error = 5.8435959834618323477986794513652e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.114 y[1] (analytic) = -17.111166841517176889579120306928 y[1] (numeric) = -17.111166841517176889579120306926 absolute error = 2e-30 relative error = 1.1688273619934315442906310315992e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.115 y[1] (analytic) = -17.109583025830757756525801806249 y[1] (numeric) = -17.109583025830757756525801806246 absolute error = 3e-30 relative error = 1.7534033386265616824474158599293e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=57.2MB, alloc=4.3MB, time=2.28 x[1] = 0.116 y[1] (analytic) = -17.107999037940403168515669745515 y[1] (numeric) = -17.107999037940403168515669745513 absolute error = 2e-30 relative error = 1.1690437879757888320282120999292e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.117 y[1] (analytic) = -17.106414877868092222410392850077 y[1] (numeric) = -17.106414877868092222410392850075 absolute error = 2e-30 relative error = 1.1691520486782747984984003276500e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.118 y[1] (analytic) = -17.104830545635786406379717591146 y[1] (numeric) = -17.104830545635786406379717591144 absolute error = 2e-30 relative error = 1.1692603412024389727471912167312e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.119 y[1] (analytic) = -17.103246041265429620947755211083 y[1] (numeric) = -17.103246041265429620947755211081 absolute error = 2e-30 relative error = 1.1693686655588944712856171853984e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.12 y[1] (analytic) = -17.101661364778948200004294489649 y[1] (numeric) = -17.101661364778948200004294489647 absolute error = 2e-30 relative error = 1.1694770217582609115540325419374e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.121 y[1] (analytic) = -17.100076516198250931781214745599 y[1] (numeric) = -17.100076516198250931781214745597 absolute error = 2e-30 relative error = 1.1695854098111644147164249304232e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.122 y[1] (analytic) = -17.098491495545229079794073374423 y[1] (numeric) = -17.098491495545229079794073374421 absolute error = 2e-30 relative error = 1.1696938297282376084590652634081e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.123 y[1] (analytic) = -17.09690630284175640374894202999 y[1] (numeric) = -17.096906302841756403748942029988 absolute error = 2e-30 relative error = 1.1698022815201196297934952929642e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.124 y[1] (analytic) = -17.095320938109689180414565365465 y[1] (numeric) = -17.095320938109689180414565365462 absolute error = 3e-30 relative error = 1.7548661477961841917957779742368e-29 % Correct digits = 30 h = 0.001 memory used=61.0MB, alloc=4.3MB, time=2.43 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.125 y[1] (analytic) = -17.093735401370866224459916056997 y[1] (numeric) = -17.093735401370866224459916056994 absolute error = 3e-30 relative error = 1.7550289211563489001377917835506e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.126 y[1] (analytic) = -17.092149692647108909257219642483 y[1] (numeric) = -17.09214969264710890925721964248 absolute error = 3e-30 relative error = 1.7551917423766615924892497517309e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.127 y[1] (analytic) = -17.090563811960221187650522517001 y[1] (numeric) = -17.090563811960221187650522516998 absolute error = 3e-30 relative error = 1.7553546114731200724939886610340e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.128 y[1] (analytic) = -17.088977759331989612689876236473 y[1] (numeric) = -17.08897775933198961268987623647 absolute error = 3e-30 relative error = 1.7555175284617319289037118369672e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.129 y[1] (analytic) = -17.087391534784183358331211091609 y[1] (numeric) = -17.087391534784183358331211091606 absolute error = 3e-30 relative error = 1.7556804933585145398214834700556e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.13 y[1] (analytic) = -17.085805138338554240101971725266 y[1] (numeric) = -17.085805138338554240101971725264 absolute error = 2e-30 relative error = 1.1705623374529967179678139730487e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.131 y[1] (analytic) = -17.08421857001683673573258737803 y[1] (numeric) = -17.084218570016836735732587378027 absolute error = 3e-30 relative error = 1.7560065669407105098566841415536e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.132 y[1] (analytic) = -17.082631829840748005753849159054 y[1] (numeric) = -17.082631829840748005753849159051 absolute error = 3e-30 relative error = 1.7561696756582076102194602801377e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=64.8MB, alloc=4.3MB, time=2.59 x[1] = 0.133 y[1] (analytic) = -17.08104491783198791406026655203 y[1] (numeric) = -17.081044917831987914060266552027 absolute error = 3e-30 relative error = 1.7563328323480429561134437180134e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.134 y[1] (analytic) = -17.079457834012239048439475179508 y[1] (numeric) = -17.079457834012239048439475179506 absolute error = 2e-30 relative error = 1.1709973580175219575188727322574e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.135 y[1] (analytic) = -17.077870578403166741067767662775 y[1] (numeric) = -17.077870578403166741067767662772 absolute error = 3e-30 relative error = 1.7566592897090037544024770875404e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.136 y[1] (analytic) = -17.076283151026419088971819228991 y[1] (numeric) = -17.076283151026419088971819228988 absolute error = 3e-30 relative error = 1.7568225904122914334120715436625e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.137 y[1] (analytic) = -17.074695551903626974456679532408 y[1] (numeric) = -17.074695551903626974456679532406 absolute error = 2e-30 relative error = 1.1713239594348278798442447294346e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.138 y[1] (analytic) = -17.073107781056404085500101972094 y[1] (numeric) = -17.073107781056404085500101972092 absolute error = 2e-30 relative error = 1.1714328906299737251731507334574e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.139 y[1] (analytic) = -17.071519838506346936113281604838 y[1] (numeric) = -17.071519838506346936113281604836 absolute error = 2e-30 relative error = 1.1715418538710421625533493358626e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.14 y[1] (analytic) = -17.069931724275034886668072568669 y[1] (numeric) = -17.069931724275034886668072568666 absolute error = 3e-30 relative error = 1.7574762737531751308735620691555e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=68.6MB, alloc=4.3MB, time=2.75 x[1] = 0.141 y[1] (analytic) = -17.068343438384030164190755749734 y[1] (numeric) = -17.068343438384030164190755749732 absolute error = 2e-30 relative error = 1.1717598765339542883776443641835e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.142 y[1] (analytic) = -17.066754980854877882622427243204 y[1] (numeric) = -17.066754980854877882622427243201 absolute error = 3e-30 relative error = 1.7578034039659771776925733015620e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.143 y[1] (analytic) = -17.065166351709106063046077977243 y[1] (numeric) = -17.065166351709106063046077977241 absolute error = 2e-30 relative error = 1.1719780275096448296518646508116e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.144 y[1] (analytic) = -17.063577550968225653880434688163 y[1] (numeric) = -17.06357755096822565388043468816 absolute error = 3e-30 relative error = 1.7581307267125663649309837496467e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.145 y[1] (analytic) = -17.061988578653730551040632254314 y[1] (numeric) = -17.061988578653730551040632254311 absolute error = 3e-30 relative error = 1.7582944603264491291912468014096e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.146 y[1] (analytic) = -17.060399434787097618065787216445 y[1] (numeric) = -17.060399434787097618065787216442 absolute error = 3e-30 relative error = 1.7584582421222999898817835814745e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.147 y[1] (analytic) = -17.058810119389786706213542132832 y[1] (numeric) = -17.058810119389786706213542132829 absolute error = 3e-30 relative error = 1.7586220721163132664701740147714e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.148 y[1] (analytic) = -17.057220632483240674521650238678 y[1] (numeric) = -17.057220632483240674521650238675 absolute error = 3e-30 relative error = 1.7587859503246931496351587822246e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=72.4MB, alloc=4.3MB, time=2.91 x[1] = 0.149 y[1] (analytic) = -17.055630974088885409836669701005 y[1] (numeric) = -17.055630974088885409836669701002 absolute error = 3e-30 relative error = 1.7589498767636537056398968366050e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.15 y[1] (analytic) = -17.054041144228129846809836582504 y[1] (numeric) = -17.054041144228129846809836582501 absolute error = 3e-30 relative error = 1.7591138514494188807117013276663e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.151 y[1] (analytic) = -17.052451142922365987860185450614 y[1] (numeric) = -17.052451142922365987860185450611 absolute error = 3e-30 relative error = 1.7592778743982225054282531271181e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.152 y[1] (analytic) = -17.050860970192968923104986391431 y[1] (numeric) = -17.050860970192968923104986391429 absolute error = 2e-30 relative error = 1.1729612970842055327401941067007e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.153 y[1] (analytic) = -17.049270626061296850257567011922 y[1] (numeric) = -17.049270626061296850257567011919 absolute error = 3e-30 relative error = 1.7596060651499298742207787654499e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.154 y[1] (analytic) = -17.047680110548691094492587838286 y[1] (numeric) = -17.047680110548691094492587838283 absolute error = 3e-30 relative error = 1.7597702329853507407705453244293e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.155 y[1] (analytic) = -17.046089423676476128278839343298 y[1] (numeric) = -17.046089423676476128278839343295 absolute error = 3e-30 relative error = 1.7599344491488443107304024107814e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.156 y[1] (analytic) = -17.04449856546595959117962866085 y[1] (numeric) = -17.044498565465959591179628660848 absolute error = 2e-30 relative error = 1.1733991424377959349664891562390e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=76.2MB, alloc=4.3MB, time=3.07 x[1] = 0.157 y[1] (analytic) = -17.042907535938432309620823871965 y[1] (numeric) = -17.042907535938432309620823871963 absolute error = 2e-30 relative error = 1.1735086843501284967210387758037e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.158 y[1] (analytic) = -17.041316335115168316626623573008 y[1] (numeric) = -17.041316335115168316626623573005 absolute error = 3e-30 relative error = 1.7604273877706439830140651302272e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.159 y[1] (analytic) = -17.039724963017424871523119263901 y[1] (numeric) = -17.039724963017424871523119263899 absolute error = 2e-30 relative error = 1.1737278649395737868724144879991e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.16 y[1] (analytic) = -17.038133419666442479609717921689 y[1] (numeric) = -17.038133419666442479609717921686 absolute error = 3e-30 relative error = 1.7607562554576658251442508711381e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.161 y[1] (analytic) = -17.03654170508344491179849195284 y[1] (numeric) = -17.036541705083444911798491952838 absolute error = 2e-30 relative error = 1.1739471746212615561790531829501e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.162 y[1] (analytic) = -17.034949819289639224221523546354 y[1] (numeric) = -17.034949819289639224221523546352 absolute error = 2e-30 relative error = 1.1740568778989220383035055083878e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.163 y[1] (analytic) = -17.033357762306215777806310278734 y[1] (numeric) = -17.033357762306215777806310278732 absolute error = 2e-30 relative error = 1.1741666134823271879785640995666e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.164 y[1] (analytic) = -17.031765534154348257819298651629 y[1] (numeric) = -17.031765534154348257819298651626 absolute error = 3e-30 relative error = 1.7614145720735782370301691671645e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=80.1MB, alloc=4.3MB, time=3.22 x[1] = 0.165 y[1] (analytic) = -17.030173134855193693377612072988 y[1] (numeric) = -17.030173134855193693377612072986 absolute error = 2e-30 relative error = 1.1743861816100120655354285545794e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.166 y[1] (analytic) = -17.028580564429892476929039623291 y[1] (numeric) = -17.028580564429892476929039623289 absolute error = 2e-30 relative error = 1.1744960141761286615787091163574e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.167 y[1] (analytic) = -17.026987822899568383700351779518 y[1] (numeric) = -17.026987822899568383700351779516 absolute error = 2e-30 relative error = 1.1746058790916636674775781893558e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.168 y[1] (analytic) = -17.025394910285328591114009101233 y[1] (numeric) = -17.02539491028532859111400910123 absolute error = 3e-30 relative error = 1.7620736645513281667458526195327e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.169 y[1] (analytic) = -17.023801826608263698173329715289 y[1] (numeric) = -17.023801826608263698173329715287 absolute error = 2e-30 relative error = 1.1748257060147356635089147117803e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.17 y[1] (analytic) = -17.022208571889447744816181268368 y[1] (numeric) = -17.022208571889447744816181268366 absolute error = 2e-30 relative error = 1.1749356680441626413293244897173e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.171 y[1] (analytic) = -17.020615146149938231237262849707 y[1] (numeric) = -17.020615146149938231237262849705 absolute error = 2e-30 relative error = 1.1750456624667880103977243189502e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.172 y[1] (analytic) = -17.019021549410776137179042220076 y[1] (numeric) = -17.019021549410776137179042220074 absolute error = 2e-30 relative error = 1.1751556892935733884573161357490e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.173 y[1] (analytic) = -17.01742778169298594119141351722 y[1] (numeric) = -17.017427781692985941191413517219 absolute error = 1e-30 relative error = 5.8763287426774352412047131770302e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=83.9MB, alloc=4.3MB, time=3.38 TOP MAIN SOLVE Loop x[1] = 0.174 y[1] (analytic) = -17.015833843017575639860140442668 y[1] (numeric) = -17.015833843017575639860140442666 absolute error = 2e-30 relative error = 1.1753758402035039204944282337668e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.175 y[1] (analytic) = -17.014239733405536767004149769949 y[1] (numeric) = -17.014239733405536767004149769947 absolute error = 2e-30 relative error = 1.1754859643086055970042286402279e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.176 y[1] (analytic) = -17.012645452877844412841739849962 y[1] (numeric) = -17.012645452877844412841739849961 absolute error = 1e-30 relative error = 5.8779806043089016681469438193997e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.177 y[1] (analytic) = -17.011051001455457243125768625348 y[1] (numeric) = -17.011051001455457243125768625347 absolute error = 1e-30 relative error = 5.8785315493701152666890434233207e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.178 y[1] (analytic) = -17.00945637915931751824788550238 y[1] (numeric) = -17.009456379159317518247885502379 absolute error = 1e-30 relative error = 5.8790826567816767462340871578893e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.179 y[1] (analytic) = -17.007861586010351112311871266028 y[1] (numeric) = -17.007861586010351112311871266027 absolute error = 1e-30 relative error = 5.8796339265986274383402716005540e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.18 y[1] (analytic) = -17.006266622029467532176150061431 y[1] (numeric) = -17.00626662202946753217615006143 absolute error = 1e-30 relative error = 5.8801853588760420557832880561371e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.181 y[1] (analytic) = -17.004671487237559936465537303162 y[1] (numeric) = -17.004671487237559936465537303161 absolute error = 1e-30 relative error = 5.8807369536690287078238013215769e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=87.7MB, alloc=4.3MB, time=3.53 x[1] = 0.182 y[1] (analytic) = -17.003076181655505154552287212208 y[1] (numeric) = -17.003076181655505154552287212207 absolute error = 1e-30 relative error = 5.8812887110327289154964628330745e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.183 y[1] (analytic) = -17.00148070530416370550650351969 y[1] (numeric) = -17.001480705304163705506503519688 absolute error = 2e-30 relative error = 1.1763681262044635253840914317120e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.184 y[1] (analytic) = -16.999885058204379817015976715867 y[1] (numeric) = -16.999885058204379817015976715866 absolute error = 1e-30 relative error = 5.8823927136930032326315808486644e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.185 y[1] (analytic) = -16.998289240376981444275511063022 y[1] (numeric) = -16.99828924037698144427551106302 absolute error = 2e-30 relative error = 1.1765889918200055161871705419070e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.186 y[1] (analytic) = -16.996693251842780288845804431283 y[1] (numeric) = -16.996693251842780288845804431282 absolute error = 1e-30 relative error = 5.8834973672986659932846546109300e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.187 y[1] (analytic) = -16.995097092622571817481943857478 y[1] (numeric) = -16.995097092622571817481943857477 absolute error = 1e-30 relative error = 5.8840499383442272796714019929622e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.188 y[1] (analytic) = -16.993500762737135280931579568485 y[1] (numeric) = -16.993500762737135280931579568484 absolute error = 1e-30 relative error = 5.8846026722920537540497432847953e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.189 y[1] (analytic) = -16.991904262207233732702840052547 y[1] (numeric) = -16.991904262207233732702840052546 absolute error = 1e-30 relative error = 5.8851555691975212497732874983378e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=91.5MB, alloc=4.3MB, time=3.69 x[1] = 0.19 y[1] (analytic) = -16.990307591053614047802050604347 y[1] (numeric) = -16.990307591053614047802050604346 absolute error = 1e-30 relative error = 5.8857086291160391350568593097089e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.191 y[1] (analytic) = -16.988710749297006941441317612535 y[1] (numeric) = -16.988710749297006941441317612534 absolute error = 1e-30 relative error = 5.8862618521030503284592809908373e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.192 y[1] (analytic) = -16.98711373695812698771604070171 y[1] (numeric) = -16.987113736958126987716040701709 absolute error = 1e-30 relative error = 5.8868152382140313143876806030714e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.193 y[1] (analytic) = -16.985516554057672638252414684662 y[1] (numeric) = -16.985516554057672638252414684661 absolute error = 1e-30 relative error = 5.8873687875044921586233259140937e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.194 y[1] (analytic) = -16.983919200616326240824983124926 y[1] (numeric) = -16.983919200616326240824983124925 absolute error = 1e-30 relative error = 5.8879225000299765238689835487653e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.195 y[1] (analytic) = -16.982321676654754057944305154426 y[1] (numeric) = -16.982321676654754057944305154425 absolute error = 1e-30 relative error = 5.8884763758460616853178029337570e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.196 y[1] (analytic) = -16.980723982193606285414797036159 y[1] (numeric) = -16.980723982193606285414797036158 absolute error = 1e-30 relative error = 5.8890304150083585462437246449742e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.197 y[1] (analytic) = -16.979126117253517070862809807517 y[1] (numeric) = -16.979126117253517070862809807516 absolute error = 1e-30 relative error = 5.8895846175725116536134128158318e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=95.3MB, alloc=4.4MB, time=3.85 x[1] = 0.198 y[1] (analytic) = -16.977528081855104532235004185929 y[1] (numeric) = -16.977528081855104532235004185928 absolute error = 1e-30 relative error = 5.8901389835941992137197113134075e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.199 y[1] (analytic) = -16.97592987601897077626708376506 y[1] (numeric) = -16.97592987601897077626708376506 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.2 y[1] (analytic) = -16.974331499765701916922947376822 y[1] (numeric) = -16.974331499765701916922947376822 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.201 y[1] (analytic) = -16.972732953115868093804321341878 y[1] (numeric) = -16.972732953115868093804321341879 absolute error = 1e-30 relative error = 5.8918030629617558921846402933362e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.202 y[1] (analytic) = -16.971134236090023490530932179279 y[1] (numeric) = -16.971134236090023490530932179281 absolute error = 2e-30 relative error = 1.1784716166742074122131383718854e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.203 y[1] (analytic) = -16.969535348708706353091280194181 y[1] (numeric) = -16.969535348708706353091280194182 absolute error = 1e-30 relative error = 5.8929132675167491527178723476154e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.204 y[1] (analytic) = -16.96793629099243900816407421143 y[1] (numeric) = -16.96793629099243900816407421143 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.205 y[1] (analytic) = -16.966337062961727881410387572052 y[1] (numeric) = -16.966337062961727881410387572053 absolute error = 1e-30 relative error = 5.8940241272410218407298775989416e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=99.1MB, alloc=4.4MB, time=4.01 x[1] = 0.206 y[1] (analytic) = -16.96473766463706351573659535938 y[1] (numeric) = -16.964737664637063515736595359381 absolute error = 1e-30 relative error = 5.8945798029314447445000329819840e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.207 y[1] (analytic) = -16.963138096038920589528152671676 y[1] (numeric) = -16.963138096038920589528152671676 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.208 y[1] (analytic) = -16.961538357187757934854273608727 y[1] (numeric) = -16.961538357187757934854273608728 absolute error = 1e-30 relative error = 5.8956916462487729238439818343655e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.209 y[1] (analytic) = -16.959938448104018555643570490902 y[1] (numeric) = -16.959938448104018555643570490902 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.21 y[1] (analytic) = -16.958338368808129645830712680589 y[1] (numeric) = -16.95833836880812964583071268059 absolute error = 1e-30 relative error = 5.8968041458550178725904937791039e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.211 y[1] (analytic) = -16.956738119320502607474164227912 y[1] (numeric) = -16.956738119320502607474164227912 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.212 y[1] (analytic) = -16.955137699661533068845059414865 y[1] (numeric) = -16.955137699661533068845059414865 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.213 y[1] (analytic) = -16.953537109851600902487275124872 y[1] (numeric) = -16.953537109851600902487275124873 absolute error = 1e-30 relative error = 5.8984741267880073810224194693656e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.214 y[1] (analytic) = -16.951936349911070243248758817913 y[1] (numeric) = -16.951936349911070243248758817913 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 memory used=102.9MB, alloc=4.4MB, time=4.16 TOP MAIN SOLVE Loop x[1] = 0.215 y[1] (analytic) = -16.950335419860289506284170745024 y[1] (numeric) = -16.950335419860289506284170745025 absolute error = 1e-30 relative error = 5.8995882690812400684513094185328e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.216 y[1] (analytic) = -16.948734319719591405028898890069 y[1] (numeric) = -16.948734319719591405028898890069 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.217 y[1] (analytic) = -16.947133049509292969144504981116 y[1] (numeric) = -16.947133049509292969144504981117 absolute error = 1e-30 relative error = 5.9007030692365701632976194634799e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.218 y[1] (analytic) = -16.945531609249695562435659768758 y[1] (numeric) = -16.945531609249695562435659768759 absolute error = 1e-30 relative error = 5.9012607161533448110309223294577e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.219 y[1] (analytic) = -16.943929998961084900738625623974 y[1] (numeric) = -16.943929998961084900738625623974 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.22 y[1] (analytic) = -16.942328218663731069781344363989 y[1] (numeric) = -16.94232821866373106978134436399 absolute error = 1e-30 relative error = 5.9023765039470568311701059877639e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.221 y[1] (analytic) = -16.940726268377888543015188070737 y[1] (numeric) = -16.940726268377888543015188070738 absolute error = 1e-30 relative error = 5.9029346449368736490058802891495e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.222 y[1] (analytic) = -16.939124148123796199418430523141 y[1] (numeric) = -16.939124148123796199418430523142 absolute error = 1e-30 relative error = 5.9034929507306406931829076978565e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=106.8MB, alloc=4.4MB, time=4.32 x[1] = 0.223 y[1] (analytic) = -16.937521857921677341271496721518 y[1] (numeric) = -16.937521857921677341271496721518 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.224 y[1] (analytic) = -16.935919397791739711904047839813 y[1] (numeric) = -16.935919397791739711904047839813 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.225 y[1] (analytic) = -16.934316767754175513413958799286 y[1] (numeric) = -16.934316767754175513413958799287 absolute error = 1e-30 relative error = 5.9051688575010618995053322031710e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.226 y[1] (analytic) = -16.932713967829161424358245515536 y[1] (numeric) = -16.932713967829161424358245515536 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.227 y[1] (analytic) = -16.931110998036858617415998729465 y[1] (numeric) = -16.931110998036858617415998729466 absolute error = 1e-30 relative error = 5.9062869537382913818413711005022e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.228 y[1] (analytic) = -16.929507858397412777023381191923 y[1] (numeric) = -16.929507858397412777023381191924 absolute error = 1e-30 relative error = 5.9068462495439744181439267114842e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.229 y[1] (analytic) = -16.927904548930954116980744831246 y[1] (numeric) = -16.927904548930954116980744831246 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.23 y[1] (analytic) = -16.926301069657597398031924392916 y[1] (numeric) = -16.926301069657597398031924392916 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=110.6MB, alloc=4.4MB, time=4.48 x[1] = 0.231 y[1] (analytic) = -16.924697420597441945415763900865 y[1] (numeric) = -16.924697420597441945415763900865 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.232 y[1] (analytic) = -16.923093601770571666389932150717 y[1] (numeric) = -16.923093601770571666389932150717 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.233 y[1] (analytic) = -16.921489613197055067727083306435 y[1] (numeric) = -16.921489613197055067727083306434 absolute error = 1e-30 relative error = 5.9096452077132787862292219435296e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.234 y[1] (analytic) = -16.919885454896945273183418533398 y[1] (numeric) = -16.919885454896945273183418533398 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.235 y[1] (analytic) = -16.918281126890280040939704462914 y[1] (numeric) = -16.918281126890280040939704462914 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.236 y[1] (analytic) = -16.916676629197081781014804145524 y[1] (numeric) = -16.916676629197081781014804145524 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.237 y[1] (analytic) = -16.915071961837357572651776013263 y[1] (numeric) = -16.915071961837357572651776013262 absolute error = 1e-30 relative error = 5.9118873526292553238409266130289e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.238 y[1] (analytic) = -16.913467124831099181676596234182 y[1] (numeric) = -16.913467124831099181676596234182 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=114.4MB, alloc=4.4MB, time=4.64 x[1] = 0.239 y[1] (analytic) = -16.911862118198283077829559706044 y[1] (numeric) = -16.911862118198283077829559706044 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.24 y[1] (analytic) = -16.910256941958870452069414800018 y[1] (numeric) = -16.910256941958870452069414800017 absolute error = 1e-30 relative error = 5.9135707010975837418231759825607e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.241 y[1] (analytic) = -16.908651596132807233850286829631 y[1] (numeric) = -16.908651596132807233850286829631 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.242 y[1] (analytic) = -16.907046080740024108371445084946 y[1] (numeric) = -16.907046080740024108371445084945 absolute error = 1e-30 relative error = 5.9146937627334475226049086942686e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.243 y[1] (analytic) = -16.905440395800436533799968137079 y[1] (numeric) = -16.905440395800436533799968137078 absolute error = 1e-30 relative error = 5.9152555425199979451351194926935e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.244 y[1] (analytic) = -16.903834541333944758466361983766 y[1] (numeric) = -16.903834541333944758466361983765 absolute error = 1e-30 relative error = 5.9158174883619409983503039198037e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.245 y[1] (analytic) = -16.902228517360433838033185472547 y[1] (numeric) = -16.902228517360433838033185472547 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) = -16.900622323899773652636737304527 y[1] (numeric) = -16.900622323899773652636737304526 absolute error = 1e-30 relative error = 5.9169418784411523349320233593027e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.247 y[1] (analytic) = -16.899015960971818924001858788313 y[1] (numeric) = -16.899015960971818924001858788313 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 memory used=118.2MB, alloc=4.4MB, time=4.79 TOP MAIN SOLVE Loop x[1] = 0.248 y[1] (analytic) = -16.897409428596409232529906380903 y[1] (numeric) = -16.897409428596409232529906380902 absolute error = 1e-30 relative error = 5.9180669334297206592000064392969e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.249 y[1] (analytic) = -16.895802726793369034359947919681 y[1] (numeric) = -16.895802726793369034359947919681 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.25 y[1] (analytic) = -16.894195855582507678403236317647 y[1] (numeric) = -16.894195855582507678403236317646 absolute error = 1e-30 relative error = 5.9191926537868365933668843724836e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.251 y[1] (analytic) = -16.892588814983619423351014362145 y[1] (numeric) = -16.892588814983619423351014362143 absolute error = 2e-30 relative error = 1.1839511527244495829874882174768e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.252 y[1] (analytic) = -16.890981605016483454655704126077 y[1] (numeric) = -16.890981605016483454655704126075 absolute error = 2e-30 relative error = 1.1840638079944485581547978454800e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.253 y[1] (analytic) = -16.889374225700863901485534369536 y[1] (numeric) = -16.889374225700863901485534369535 absolute error = 1e-30 relative error = 5.9208824828943753955337140589588e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.254 y[1] (analytic) = -16.88776667705650985365265917919 y[1] (numeric) = -16.887766677056509853652659179189 absolute error = 1e-30 relative error = 5.9214460924462344730382345708915e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.255 y[1] (analytic) = -16.886158959103155378514820962517 y[1] (numeric) = -16.886158959103155378514820962516 absolute error = 1e-30 relative error = 5.9220098686854433531349802750118e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=122.0MB, alloc=4.4MB, time=4.94 x[1] = 0.256 y[1] (analytic) = -16.88455107186051953785061078414 y[1] (numeric) = -16.884551071860519537850610784139 absolute error = 1e-30 relative error = 5.9225738116696599685801556750681e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.257 y[1] (analytic) = -16.882943015348306404708378901996 y[1] (numeric) = -16.882943015348306404708378901995 absolute error = 1e-30 relative error = 5.9231379214565768719432948539400e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.258 y[1] (analytic) = -16.881334789586205080228848231987 y[1] (numeric) = -16.881334789586205080228848231985 absolute error = 2e-30 relative error = 1.1847404396207842505066817346323e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.259 y[1] (analytic) = -16.879726394593889710441483340996 y[1] (numeric) = -16.879726394593889710441483340995 absolute error = 1e-30 relative error = 5.9242666416694549533467271230216e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.26 y[1] (analytic) = -16.878117830391019503034667439814 y[1] (numeric) = -16.878117830391019503034667439812 absolute error = 2e-30 relative error = 1.1849662504421948976072078811136e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.261 y[1] (analytic) = -16.876509096997238744099739719473 y[1] (numeric) = -16.876509096997238744099739719472 absolute error = 1e-30 relative error = 5.9253960297863110579016343768661e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.262 y[1] (analytic) = -16.874900194432176814848945246917 y[1] (numeric) = -16.874900194432176814848945246916 absolute error = 1e-30 relative error = 5.9259609744533305689038440188101e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.263 y[1] (analytic) = -16.873291122715448208307349508601 y[1] (numeric) = -16.8732911227154482083073495086 absolute error = 1e-30 relative error = 5.9265260862699336486971926546740e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=125.8MB, alloc=4.4MB, time=5.10 x[1] = 0.264 y[1] (analytic) = -16.871681881866652545978769563784 y[1] (numeric) = -16.871681881866652545978769563783 absolute error = 1e-30 relative error = 5.9270913652940556636861546663949e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.265 y[1] (analytic) = -16.870072471905374594485773642691 y[1] (numeric) = -16.870072471905374594485773642691 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.266 y[1] (analytic) = -16.86846289285118428218380089859 y[1] (numeric) = -16.868462892851184282183800898589 absolute error = 1e-30 relative error = 5.9282224251967717611043949119898e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.267 y[1] (analytic) = -16.866853144723636715749452896984 y[1] (numeric) = -16.866853144723636715749452896984 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.268 y[1] (analytic) = -16.865243227542272196743008299735 y[1] (numeric) = -16.865243227542272196743008299735 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) = -16.863633141326616238145212076762 y[1] (numeric) = -16.863633141326616238145212076762 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.27 y[1] (analytic) = -16.862022886096179580868390453317 y[1] (numeric) = -16.862022886096179580868390453317 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) = -16.86041246187045821024194267642 y[1] (numeric) = -16.86041246187045821024194267642 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=129.7MB, alloc=4.4MB, time=5.26 x[1] = 0.272 y[1] (analytic) = -16.85880186866893337247226056004 y[1] (numeric) = -16.85880186866893337247226056004 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) = -16.857191106511071591077126644947 y[1] (numeric) = -16.857191106511071591077126644947 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) = -16.855580175416324683294641685866 y[1] (numeric) = -16.855580175416324683294641685866 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) = -16.85396907540412977646673205561 y[1] (numeric) = -16.853969075404129776466732055609 absolute error = 1e-30 relative error = 5.9333204868599872233917571462390e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.276 y[1] (analytic) = -16.852357806493909324397287533256 y[1] (numeric) = -16.852357806493909324397287533255 absolute error = 1e-30 relative error = 5.9338877769059633207896448342924e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.277 y[1] (analytic) = -16.850746368705071123684979821221 y[1] (numeric) = -16.850746368705071123684979821221 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) = -16.849134762057008330030812014152 y[1] (numeric) = -16.849134762057008330030812014151 absolute error = 1e-30 relative error = 5.9350228609478822006944945705288e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.279 y[1] (analytic) = -16.847522986569099474520449121011 y[1] (numeric) = -16.847522986569099474520449121011 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.28 y[1] (analytic) = -16.845911042260708479881379620574 y[1] (numeric) = -16.845911042260708479881379620574 memory used=133.5MB, alloc=4.4MB, time=5.42 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.281 y[1] (analytic) = -16.844298929151184676714957909624 y[1] (numeric) = -16.844298929151184676714957909624 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.282 y[1] (analytic) = -16.842686647259862819703377382693 y[1] (numeric) = -16.842686647259862819703377382694 absolute error = 1e-30 relative error = 5.9372950464686703001281429878618e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.283 y[1] (analytic) = -16.841074196606063103791623761992 y[1] (numeric) = -16.841074196606063103791623761993 absolute error = 1e-30 relative error = 5.9378635134896997284818206718192e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.284 y[1] (analytic) = -16.839461577209091180344458176346 y[1] (numeric) = -16.839461577209091180344458176348 absolute error = 2e-30 relative error = 1.1876864297768554029890442657725e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.285 y[1] (analytic) = -16.837848789088238173278479368502 y[1] (numeric) = -16.837848789088238173278479368503 absolute error = 1e-30 relative error = 5.9390009527110710178520790410020e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.286 y[1] (analytic) = -16.836235832262780695169314290985 y[1] (numeric) = -16.836235832262780695169314290986 absolute error = 1e-30 relative error = 5.9395699250287857149858307903154e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.287 y[1] (analytic) = -16.83462270675198086333398623193 y[1] (numeric) = -16.834622706751980863333986231931 absolute error = 1e-30 relative error = 5.9401390658961602211332307184982e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.288 y[1] (analytic) = -16.833009412575086315888509493808 y[1] (numeric) = -16.833009412575086315888509493808 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=137.3MB, alloc=4.4MB, time=5.57 x[1] = 0.289 y[1] (analytic) = -16.831395949751330227780759529853 y[1] (numeric) = -16.831395949751330227780759529853 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.29 y[1] (analytic) = -16.82978231829993132679866732523 y[1] (numeric) = -16.829782318299931326798667325231 absolute error = 1e-30 relative error = 5.9418475003841611658078032653782e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.291 y[1] (analytic) = -16.828168518240093909553786692478 y[1] (numeric) = -16.828168518240093909553786692478 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.292 y[1] (analytic) = -16.826554549591007857440283033676 y[1] (numeric) = -16.826554549591007857440283033677 absolute error = 1e-30 relative error = 5.9429873005362607111538181082760e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.293 y[1] (analytic) = -16.824940412371848652569392005005 y[1] (numeric) = -16.824940412371848652569392005005 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.294 y[1] (analytic) = -16.823326106601777393679396402843 y[1] (numeric) = -16.823326106601777393679396402844 absolute error = 1e-30 relative error = 5.9441277762997289591433806384008e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.295 y[1] (analytic) = -16.821711632299940812021169474524 y[1] (numeric) = -16.821711632299940812021169474525 absolute error = 1e-30 relative error = 5.9446982676832123199940880902768e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.296 y[1] (analytic) = -16.820096989485471287219332740966 y[1] (numeric) = -16.820096989485471287219332740967 absolute error = 1e-30 relative error = 5.9452689281465915951733262341319e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=141.1MB, alloc=4.4MB, time=5.73 x[1] = 0.297 y[1] (analytic) = -16.818482178177486863109076303002 y[1] (numeric) = -16.818482178177486863109076303002 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.298 y[1] (analytic) = -16.816867198395091263548689488046 y[1] (numeric) = -16.816867198395091263548689488047 absolute error = 1e-30 relative error = 5.9464107565494390402104288255520e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.299 y[1] (analytic) = -16.815252050157373908207849578954 y[1] (numeric) = -16.815252050157373908207849578955 absolute error = 1e-30 relative error = 5.9469819246071961325422491356960e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.3 y[1] (analytic) = -16.81363673348340992833171625239 y[1] (numeric) = -16.813636733483409928331716252391 absolute error = 1e-30 relative error = 5.9475532619814270198005052348163e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.301 y[1] (analytic) = -16.812021248392260182480879239913 y[1] (numeric) = -16.812021248392260182480879239914 absolute error = 1e-30 relative error = 5.9481247687313645901001419730708e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.302 y[1] (analytic) = -16.810405594902971272247206611098 y[1] (numeric) = -16.810405594902971272247206611099 absolute error = 1e-30 relative error = 5.9486964449162771344683781467234e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.303 y[1] (analytic) = -16.808789773034575557945640964512 y[1] (numeric) = -16.808789773034575557945640964513 absolute error = 1e-30 relative error = 5.9492682905954683647458068553686e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.304 y[1] (analytic) = -16.807173782806091174281990699155 y[1] (numeric) = -16.807173782806091174281990699156 absolute error = 1e-30 relative error = 5.9498403058282774315092498741402e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=144.9MB, alloc=4.4MB, time=5.89 x[1] = 0.305 y[1] (analytic) = -16.805557624236522045996763426096 y[1] (numeric) = -16.805557624236522045996763426097 absolute error = 1e-30 relative error = 5.9504124906740789420163705410680e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.306 y[1] (analytic) = -16.803941297344857903485088467482 y[1] (numeric) = -16.803941297344857903485088467482 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.307 y[1] (analytic) = -16.802324802150074298392775277828 y[1] (numeric) = -16.802324802150074298392775277828 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.308 y[1] (analytic) = -16.800708138671132619188554510607 y[1] (numeric) = -16.800708138671132619188554510609 absolute error = 2e-30 relative error = 1.1904260126967432872470656350034e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.309 y[1] (analytic) = -16.799091306926980106712548341515 y[1] (numeric) = -16.799091306926980106712548341516 absolute error = 1e-30 relative error = 5.9527029273759435571909349405064e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.31 y[1] (analytic) = -16.79747430693654986970101654848 y[1] (numeric) = -16.797474306936549869701016548481 absolute error = 1e-30 relative error = 5.9532759611785686379762822832349e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.311 y[1] (analytic) = -16.79585713871876090028742473757 y[1] (numeric) = -16.795857138718760900287424737571 absolute error = 1e-30 relative error = 5.9538491649511794039900078067549e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.312 y[1] (analytic) = -16.794239802292518089479880993183 y[1] (numeric) = -16.794239802292518089479880993184 absolute error = 1e-30 relative error = 5.9544225387533991635335059765929e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=148.7MB, alloc=4.4MB, time=6.05 x[1] = 0.313 y[1] (analytic) = -16.792622297676712242614987120623 y[1] (numeric) = -16.792622297676712242614987120624 absolute error = 1e-30 relative error = 5.9549960826448868259297760737339e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.314 y[1] (analytic) = -16.791004624890220094788150539088 y[1] (numeric) = -16.791004624890220094788150539089 absolute error = 1e-30 relative error = 5.9555697966853369196640710146184e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.315 y[1] (analytic) = -16.789386783951904326260402773348 y[1] (numeric) = -16.789386783951904326260402773349 absolute error = 1e-30 relative error = 5.9561436809344796105463519479148e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.316 y[1] (analytic) = -16.787768774880613577841770382986 y[1] (numeric) = -16.787768774880613577841770382987 absolute error = 1e-30 relative error = 5.9567177354520807198955535790398e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.317 y[1] (analytic) = -16.786150597695182466251244058923 y[1] (numeric) = -16.786150597695182466251244058924 absolute error = 1e-30 relative error = 5.9572919602979417427456652140662e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.318 y[1] (analytic) = -16.784532252414431599453391508166 y[1] (numeric) = -16.784532252414431599453391508167 absolute error = 1e-30 relative error = 5.9578663555318998660736325552630e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.319 y[1] (analytic) = -16.782913739057167591971659639176 y[1] (numeric) = -16.782913739057167591971659639176 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.32 y[1] (analytic) = -16.781295057642183080178411452064 y[1] (numeric) = -16.781295057642183080178411452064 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.321 y[1] (analytic) = -16.779676208188256737561742929931 y[1] (numeric) = -16.779676208188256737561742929931 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 memory used=152.5MB, alloc=4.4MB, time=6.20 TOP MAIN SOLVE Loop x[1] = 0.322 y[1] (analytic) = -16.778057190714153289969125120042 y[1] (numeric) = -16.778057190714153289969125120042 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.323 y[1] (analytic) = -16.776438005238623530827916486248 y[1] (numeric) = -16.776438005238623530827916486248 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.324 y[1] (analytic) = -16.774818651780404336342790507072 y[1] (numeric) = -16.774818651780404336342790507073 absolute error = 1e-30 relative error = 5.9613163084410719751143491148759e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.325 y[1] (analytic) = -16.773199130358218680670123387169 y[1] (numeric) = -16.773199130358218680670123387169 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.326 y[1] (analytic) = -16.771579440990775651069386643473 y[1] (numeric) = -16.771579440990775651069386643473 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.327 y[1] (analytic) = -16.769959583696770463031589221262 y[1] (numeric) = -16.769959583696770463031589221262 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.328 y[1] (analytic) = -16.768339558494884475384813689538 y[1] (numeric) = -16.768339558494884475384813689538 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.329 y[1] (analytic) = -16.766719365403785205376890959641 y[1] (numeric) = -16.766719365403785205376890959641 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=156.4MB, alloc=4.4MB, time=6.36 x[1] = 0.33 y[1] (analytic) = -16.765099004442126343735257865785 y[1] (numeric) = -16.765099004442126343735257865785 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) = -16.763478475628547769704041841292 y[1] (numeric) = -16.763478475628547769704041841292 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.332 y[1] (analytic) = -16.761857778981675566058416819679 y[1] (numeric) = -16.76185777898167556605841681968 absolute error = 1e-30 relative error = 5.9659258131514374432673963946648e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.333 y[1] (analytic) = -16.760236914520122034096274385417 y[1] (numeric) = -16.760236914520122034096274385417 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.334 y[1] (analytic) = -16.758615882262485708607254095121 y[1] (numeric) = -16.758615882262485708607254095121 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) = -16.756994682227351372819176786226 y[1] (numeric) = -16.756994682227351372819176786225 absolute error = 1e-30 relative error = 5.9676572020435785289939584746343e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.336 y[1] (analytic) = -16.755373314433290073321924586679 y[1] (numeric) = -16.755373314433290073321924586678 absolute error = 1e-30 relative error = 5.9682346745362419180932454763067e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.337 y[1] (analytic) = -16.753751778898859134968811236059 y[1] (numeric) = -16.753751778898859134968811236058 absolute error = 1e-30 relative error = 5.9688123185607148322970295889071e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=160.2MB, alloc=4.4MB, time=6.52 x[1] = 0.338 y[1] (analytic) = -16.752130075642602175755486225613 y[1] (numeric) = -16.752130075642602175755486225612 absolute error = 1e-30 relative error = 5.9693901341775521589509966316806e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.339 y[1] (analytic) = -16.750508204683049121676416162112 y[1] (numeric) = -16.750508204683049121676416162112 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) = -16.748886166038716221558986658123 y[1] (numeric) = -16.748886166038716221558986658123 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) = -16.747263959728106061875267949241 y[1] (numeric) = -16.74726395972810606187526794924 absolute error = 1e-30 relative error = 5.9711246111883407960311092783905e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.342 y[1] (analytic) = -16.745641585769707581531487337099 y[1] (numeric) = -16.745641585769707581531487337099 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) = -16.744019044181996086635251455519 y[1] (numeric) = -16.744019044181996086635251455519 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.344 y[1] (analytic) = -16.742396334983433265240561255941 y[1] (numeric) = -16.742396334983433265240561255941 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) = -16.740773458192467202070662507427 y[1] (numeric) = -16.740773458192467202070662507427 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=164.0MB, alloc=4.4MB, time=6.67 x[1] = 0.346 y[1] (analytic) = -16.739150413827532393218774505876 y[1] (numeric) = -16.739150413827532393218774505877 absolute error = 1e-30 relative error = 5.9740188437158710827294690592372e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.347 y[1] (analytic) = -16.73752720190704976082673958676 y[1] (numeric) = -16.73752720190704976082673958676 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) = -16.735903822449426667741635935615 y[1] (numeric) = -16.735903822449426667741635935617 absolute error = 2e-30 relative error = 1.1950355482547728969444754283532e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.349 y[1] (analytic) = -16.734280275473056932150396090784 y[1] (numeric) = -16.734280275473056932150396090786 absolute error = 2e-30 relative error = 1.1951514896827330270608671605329e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.35 y[1] (analytic) = -16.73265656099632084219247343331 y[1] (numeric) = -16.732656560996320842192473433312 absolute error = 2e-30 relative error = 1.1952674655750616871594352076288e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.351 y[1] (analytic) = -16.731032679037585170550598859754 y[1] (numeric) = -16.731032679037585170550598859755 absolute error = 1e-30 relative error = 5.9769173797198197762791179906715e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.352 y[1] (analytic) = -16.729408629615203189019669734663 y[1] (numeric) = -16.729408629615203189019669734665 absolute error = 2e-30 relative error = 1.1954995208016521743083867012842e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.353 y[1] (analytic) = -16.727784412747514683053813120796 y[1] (numeric) = -16.727784412747514683053813120798 absolute error = 2e-30 relative error = 1.1956156001603459560172112790140e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.354 y[1] (analytic) = -16.726160028452845966291665186748 y[1] (numeric) = -16.726160028452845966291665186751 absolute error = 3e-30 relative error = 1.7935975710484082769413163688616e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=167.8MB, alloc=4.4MB, time=6.82 TOP MAIN SOLVE Loop x[1] = 0.355 y[1] (analytic) = -16.724535476749509895059908593535 y[1] (numeric) = -16.724535476749509895059908593537 absolute error = 2e-30 relative error = 1.1958478624296650207376274372227e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.356 y[1] (analytic) = -16.722910757655805882855109563773 y[1] (numeric) = -16.722910757655805882855109563775 absolute error = 2e-30 relative error = 1.1959640453647659051109406928443e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.357 y[1] (analytic) = -16.721285871190019914803896239551 y[1] (numeric) = -16.721285871190019914803896239553 absolute error = 2e-30 relative error = 1.1960802628498235624928545727770e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.358 y[1] (analytic) = -16.719660817370424562101519837709 y[1] (numeric) = -16.71966081737042456210151983771 absolute error = 1e-30 relative error = 5.9809825744854700271584701376137e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.359 y[1] (analytic) = -16.718035596215278996428840014222 y[1] (numeric) = -16.718035596215278996428840014224 absolute error = 2e-30 relative error = 1.1963128015188405381042143544348e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.36 y[1] (analytic) = -16.716410207742829004347775752587 y[1] (numeric) = -16.716410207742829004347775752588 absolute error = 1e-30 relative error = 5.9821456136366688007274538943127e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.361 y[1] (analytic) = -16.714784651971307001675262994558 y[1] (numeric) = -16.714784651971307001675262994559 absolute error = 1e-30 relative error = 5.9827273926742578524161150331214e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.362 y[1] (analytic) = -16.713158928918932047835760135376 y[1] (numeric) = -16.713158928918932047835760135377 absolute error = 1e-30 relative error = 5.9833093447683958558822805102729e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=171.6MB, alloc=4.4MB, time=6.98 x[1] = 0.363 y[1] (analytic) = -16.711533038603909860192342409588 y[1] (numeric) = -16.711533038603909860192342409589 absolute error = 1e-30 relative error = 5.9838914699805453562935952678878e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.364 y[1] (analytic) = -16.709906981044432828356426097863 y[1] (numeric) = -16.709906981044432828356426097864 absolute error = 1e-30 relative error = 5.9844737683722054529279119822591e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.365 y[1] (analytic) = -16.708280756258680028476163389734 y[1] (numeric) = -16.708280756258680028476163389734 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.366 y[1] (analytic) = -16.706654364264817237503548641989 y[1] (numeric) = -16.706654364264817237503548641989 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.367 y[1] (analytic) = -16.705027805080996947440276677524 y[1] (numeric) = -16.705027805080996947440276677524 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.368 y[1] (analytic) = -16.703401078725358379562393674744 y[1] (numeric) = -16.703401078725358379562393674744 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.369 y[1] (analytic) = -16.701774185216027498623781103234 y[1] (numeric) = -16.701774185216027498623781103234 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.37 y[1] (analytic) = -16.700147124571117027038513067224 y[1] (numeric) = -16.700147124571117027038513067224 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=175.4MB, alloc=4.4MB, time=7.13 x[1] = 0.371 y[1] (analytic) = -16.698519896808726459042127324504 y[1] (numeric) = -16.698519896808726459042127324504 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.372 y[1] (analytic) = -16.696892501946942074831850154774 y[1] (numeric) = -16.696892501946942074831850154774 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.373 y[1] (analytic) = -16.695264940003836954685815158058 y[1] (numeric) = -16.695264940003836954685815158058 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.374 y[1] (analytic) = -16.693637210997470993061315970669 y[1] (numeric) = -16.693637210997470993061315970669 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.375 y[1] (analytic) = -16.692009314945890912672132793332 y[1] (numeric) = -16.692009314945890912672132793331 absolute error = 1e-30 relative error = 5.9908904981535568725589511619117e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.376 y[1] (analytic) = -16.690381251867130278544972533476 y[1] (numeric) = -16.690381251867130278544972533476 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.377 y[1] (analytic) = -16.688753021779209512055062271333 y[1] (numeric) = -16.688753021779209512055062271333 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.378 y[1] (analytic) = -16.687124624700135904940935667349 y[1] (numeric) = -16.687124624700135904940935667348 absolute error = 1e-30 relative error = 5.9926441642307192165119955480307e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=179.2MB, alloc=4.4MB, time=7.29 x[1] = 0.379 y[1] (analytic) = -16.685496060647903633298451836591 y[1] (numeric) = -16.685496060647903633298451836591 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.38 y[1] (analytic) = -16.683867329640493771554086124214 y[1] (numeric) = -16.683867329640493771554086124214 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.381 y[1] (analytic) = -16.682238431695874306417532124666 y[1] (numeric) = -16.682238431695874306417532124666 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.382 y[1] (analytic) = -16.680609366832000150813654196253 y[1] (numeric) = -16.680609366832000150813654196252 absolute error = 1e-30 relative error = 5.9949848234466575136009820082501e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.383 y[1] (analytic) = -16.678980135066813157793829631784 y[1] (numeric) = -16.678980135066813157793829631783 absolute error = 1e-30 relative error = 5.9955704239826062366851324331429e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.384 y[1] (analytic) = -16.67735073641824213442671955544 y[1] (numeric) = -16.67735073641824213442671955544 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.385 y[1] (analytic) = -16.675721170904202855668507525622 y[1] (numeric) = -16.675721170904202855668507525622 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.386 y[1] (analytic) = -16.674091438542598078212644733434 y[1] (numeric) = -16.674091438542598078212644733434 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.387 y[1] (analytic) = -16.67246153935131755431914059659 y[1] (numeric) = -16.672461539351317554319140596589 absolute error = 1e-30 relative error = 5.9979145709212859214578870271928e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=183.1MB, alloc=4.4MB, time=7.44 x[1] = 0.388 y[1] (analytic) = -16.670831473348238045623437458888 y[1] (numeric) = -16.670831473348238045623437458888 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.389 y[1] (analytic) = -16.669201240551223336924908016061 y[1] (numeric) = -16.66920124055122333692490801606 absolute error = 1e-30 relative error = 5.9990876921402601570507706295355e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.39 y[1] (analytic) = -16.667570840978124249955013999601 y[1] (numeric) = -16.6675708409781242499550139996 absolute error = 1e-30 relative error = 5.9996745149055909376374221789981e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.391 y[1] (analytic) = -16.665940274646778657125164561358 y[1] (numeric) = -16.665940274646778657125164561357 absolute error = 1e-30 relative error = 6.0002615125247963502049811460381e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.392 y[1] (analytic) = -16.664309541575011495254312712968 y[1] (numeric) = -16.664309541575011495254312712968 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.393 y[1] (analytic) = -16.662678641780634779276328085836 y[1] (numeric) = -16.662678641780634779276328085836 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.394 y[1] (analytic) = -16.661047575281447615927184189157 y[1] (numeric) = -16.661047575281447615927184189157 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.395 y[1] (analytic) = -16.659416342095236217411998255603 y[1] (numeric) = -16.659416342095236217411998255603 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=186.9MB, alloc=4.4MB, time=7.60 x[1] = 0.396 y[1] (analytic) = -16.657784942239773915051961676545 y[1] (numeric) = -16.657784942239773915051961676545 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) = -16.656153375732821172911198941276 y[1] (numeric) = -16.656153375732821172911198941276 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) = -16.65452164259212560140359290746 y[1] (numeric) = -16.654521642592125601403592907461 absolute error = 1e-30 relative error = 6.0043753970249670174816093026998e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.399 y[1] (analytic) = -16.652889742835421970879614143072 y[1] (numeric) = -16.652889742835421970879614143072 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) = -16.651257676480432225193191993324 y[1] (numeric) = -16.651257676480432225193191993324 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) = -16.649625443544865495248664939612 y[1] (numeric) = -16.649625443544865495248664939613 absolute error = 1e-30 relative error = 6.0061411194550594998880389021475e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.402 y[1] (analytic) = -16.647993044046418112527847731199 y[1] (numeric) = -16.6479930440464181125278477312 absolute error = 1e-30 relative error = 6.0067300446020764765082428870765e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.403 y[1] (analytic) = -16.646360478002773622597252684339 y[1] (numeric) = -16.646360478002773622597252684339 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=190.7MB, alloc=4.4MB, time=7.76 x[1] = 0.404 y[1] (analytic) = -16.644727745431602798595502457734 y[1] (numeric) = -16.644727745431602798595502457735 absolute error = 1e-30 relative error = 6.0079084217791734094509588740253e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.405 y[1] (analytic) = -16.643094846350563654700971527664 y[1] (numeric) = -16.643094846350563654700971527665 absolute error = 1e-30 relative error = 6.0084978739352453141725154781720e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.406 y[1] (analytic) = -16.641461780777301459579693500732 y[1] (numeric) = -16.641461780777301459579693500733 absolute error = 1e-30 relative error = 6.0090875018870564334547957487714e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.407 y[1] (analytic) = -16.639828548729448749813571317139 y[1] (numeric) = -16.639828548729448749813571317139 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.408 y[1] (analytic) = -16.638195150224625343308927312448 y[1] (numeric) = -16.638195150224625343308927312449 absolute error = 1e-30 relative error = 6.0102672854302914969495237679266e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.409 y[1] (analytic) = -16.63656158528043835268543002121 y[1] (numeric) = -16.636561585280438352685430021211 absolute error = 1e-30 relative error = 6.0108574411480066084206722753086e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.41 y[1] (analytic) = -16.634927853914482198645434521336 y[1] (numeric) = -16.634927853914482198645434521336 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) = -16.633293956144338623323773033979 y[1] (numeric) = -16.633293956144338623323773033979 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=194.5MB, alloc=4.4MB, time=7.91 x[1] = 0.412 y[1] (analytic) = -16.631659891987576703618032409673 y[1] (numeric) = -16.631659891987576703618032409674 absolute error = 1e-30 relative error = 6.0126289648440759896982783338832e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.413 y[1] (analytic) = -16.630025661461752864499355047754 y[1] (numeric) = -16.630025661461752864499355047756 absolute error = 2e-30 relative error = 1.2026439650269326006048399025347e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.414 y[1] (analytic) = -16.628391264584410892303799712577 y[1] (numeric) = -16.628391264584410892303799712578 absolute error = 1e-30 relative error = 6.0138108617267537149137883787239e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.415 y[1] (analytic) = -16.626756701373081948004298626745 y[1] (numeric) = -16.626756701373081948004298626746 absolute error = 1e-30 relative error = 6.0144020746837375134750217726746e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.416 y[1] (analytic) = -16.625121971845284580463247138533 y[1] (numeric) = -16.625121971845284580463247138534 absolute error = 1e-30 relative error = 6.0149934640690413719212061450210e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.417 y[1] (analytic) = -16.623487076018524739665762177802 y[1] (numeric) = -16.623487076018524739665762177802 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.418 y[1] (analytic) = -16.621852013910295789933645632123 y[1] (numeric) = -16.621852013910295789933645632124 absolute error = 1e-30 relative error = 6.0161767723785052093886222970891e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.419 y[1] (analytic) = -16.620216785538078523120088692433 y[1] (numeric) = -16.620216785538078523120088692433 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.42 y[1] (analytic) = -16.618581390919341171785153135328 y[1] (numeric) = -16.618581390919341171785153135329 absolute error = 1e-30 relative error = 6.0173607871633134916382443350007e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=198.3MB, alloc=4.4MB, time=8.07 TOP MAIN SOLVE Loop x[1] = 0.421 y[1] (analytic) = -16.616945830071539422352065427242 y[1] (numeric) = -16.616945830071539422352065427243 absolute error = 1e-30 relative error = 6.0179530596429391570310787605943e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.422 y[1] (analytic) = -16.615310103012116428244359453904 y[1] (numeric) = -16.615310103012116428244359453906 absolute error = 2e-30 relative error = 1.2037091017864474307754135655423e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.423 y[1] (analytic) = -16.613674209758502823003903597083 y[1] (numeric) = -16.613674209758502823003903597085 absolute error = 2e-30 relative error = 1.2038276270189796248276733992127e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.424 y[1] (analytic) = -16.612038150328116733389847799235 y[1] (numeric) = -16.612038150328116733389847799237 absolute error = 2e-30 relative error = 1.2039461876389300917741242668061e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.425 y[1] (analytic) = -16.610401924738363792458526175667 y[1] (numeric) = -16.610401924738363792458526175669 absolute error = 2e-30 relative error = 1.2040647836590520637646039095668e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.426 y[1] (analytic) = -16.608765533006637152624350652931 y[1] (numeric) = -16.608765533006637152624350652933 absolute error = 2e-30 relative error = 1.2041834150921063310121882912621e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.427 y[1] (analytic) = -16.607128975150317498701731031548 y[1] (numeric) = -16.607128975150317498701731031549 absolute error = 1e-30 relative error = 6.0215104097543062296112081095899e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.428 y[1] (analytic) = -16.605492251186773060928056790723 y[1] (numeric) = -16.605492251186773060928056790725 absolute error = 2e-30 relative error = 1.2044207842480927272259887572581e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=202.1MB, alloc=4.4MB, time=8.23 x[1] = 0.429 y[1] (analytic) = -16.603855361133359627967775872533 y[1] (numeric) = -16.603855361133359627967775872535 absolute error = 2e-30 relative error = 1.2045395219965842641186118280088e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.43 y[1] (analytic) = -16.602218305007420559897605603032 y[1] (numeric) = -16.602218305007420559897605603034 absolute error = 2e-30 relative error = 1.2046582952091269204018729604839e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.431 y[1] (analytic) = -16.600581082826286801172910828 y[1] (numeric) = -16.600581082826286801172910828002 absolute error = 2e-30 relative error = 1.2047771038985193386312649570935e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.432 y[1] (analytic) = -16.598943694607276893575284261441 y[1] (numeric) = -16.598943694607276893575284261444 absolute error = 3e-30 relative error = 1.8073439221163516164015377189876e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.433 y[1] (analytic) = -16.597306140367696989141363965636 y[1] (numeric) = -16.597306140367696989141363965639 absolute error = 3e-30 relative error = 1.8075222416386289247505214244501e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.434 y[1] (analytic) = -16.595668420124840863072922802369 y[1] (numeric) = -16.595668420124840863072922802372 absolute error = 3e-30 relative error = 1.8077006144338430386111935938525e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.435 y[1] (analytic) = -16.594030533895989926628264616074 y[1] (numeric) = -16.594030533895989926628264616076 absolute error = 2e-30 relative error = 1.2052526936808249711215834693462e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.436 y[1] (analytic) = -16.59239248169841323999496183088 y[1] (numeric) = -16.592392481698413239994961830882 absolute error = 2e-30 relative error = 1.2053716799467113846660608739530e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=205.9MB, alloc=4.4MB, time=8.39 x[1] = 0.437 y[1] (analytic) = -16.590754263549367525143969065075 y[1] (numeric) = -16.590754263549367525143969065077 absolute error = 2e-30 relative error = 1.2054907017663988021294054527352e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.438 y[1] (analytic) = -16.58911587946609717866514728817 y[1] (numeric) = -16.589115879466097178665147288172 absolute error = 2e-30 relative error = 1.2056097591527390338441881833010e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.439 y[1] (analytic) = -16.587477329465834284584232967704 y[1] (numeric) = -16.587477329465834284584232967706 absolute error = 2e-30 relative error = 1.2057288521185915022371493424181e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.44 y[1] (analytic) = -16.585838613565798627161286575017 y[1] (numeric) = -16.585838613565798627161286575019 absolute error = 2e-30 relative error = 1.2058479806768232460171861064453e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.441 y[1] (analytic) = -16.584199731783197703670654741565 y[1] (numeric) = -16.584199731783197703670654741567 absolute error = 2e-30 relative error = 1.2059671448403089243678871950246e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.442 y[1] (analytic) = -16.58256068413522673716248027989 y[1] (numeric) = -16.582560684135226737162480279891 absolute error = 1e-30 relative error = 6.0304317231096541057230825296738e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.443 y[1] (analytic) = -16.580921470639068689205794206094 y[1] (numeric) = -16.580921470639068689205794206095 absolute error = 1e-30 relative error = 6.0310279001728942453807384809128e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.444 y[1] (analytic) = -16.57928209131189427261322382363 y[1] (numeric) = -16.579282091311894272613223823631 absolute error = 1e-30 relative error = 6.0316242554557527698542583578871e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=209.8MB, alloc=4.4MB, time=8.55 x[1] = 0.445 y[1] (analytic) = -16.577642546170861964147350851358 y[1] (numeric) = -16.577642546170861964147350851359 absolute error = 1e-30 relative error = 6.0322207890227555946371947709848e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.446 y[1] (analytic) = -16.576002835233118017208753502192 y[1] (numeric) = -16.576002835233118017208753502193 absolute error = 1e-30 relative error = 6.0328175009384668427512945215535e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.447 y[1] (analytic) = -16.574362958515796474505766342227 y[1] (numeric) = -16.574362958515796474505766342228 absolute error = 1e-30 relative error = 6.0334143912674888658457889024076e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.448 y[1] (analytic) = -16.572722916036019180705991683986 y[1] (numeric) = -16.572722916036019180705991683987 absolute error = 1e-30 relative error = 6.0340114600744622653194881435725e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.449 y[1] (analytic) = -16.571082707810895795069596191423 y[1] (numeric) = -16.571082707810895795069596191423 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.45 y[1] (analytic) = -16.569442333857523804064426298462 y[1] (numeric) = -16.569442333857523804064426298462 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.451 y[1] (analytic) = -16.56780179419298853396297596726 y[1] (numeric) = -16.56780179419298853396297596726 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) = -16.566161088834363163421240236917 y[1] (numeric) = -16.566161088834363163421240236917 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=213.6MB, alloc=4.4MB, time=8.70 x[1] = 0.453 y[1] (analytic) = -16.564520217798708736039487938169 y[1] (numeric) = -16.564520217798708736039487938169 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.454 y[1] (analytic) = -16.562879181103074172904986874551 y[1] (numeric) = -16.562879181103074172904986874551 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) = -16.561237978764496285116714695698 y[1] (numeric) = -16.561237978764496285116714695698 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) = -16.559596610799999786292088613834 y[1] (numeric) = -16.559596610799999786292088613834 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.457 y[1] (analytic) = -16.557955077226597305055747040047 y[1] (numeric) = -16.557955077226597305055747040046 absolute error = 1e-30 relative error = 6.0393931215296949071731773346420e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.458 y[1] (analytic) = -16.556313378061289397510416142739 y[1] (numeric) = -16.556313378061289397510416142738 absolute error = 1e-30 relative error = 6.0399919786798452402825112810109e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.459 y[1] (analytic) = -16.554671513321064559689894256597 y[1] (numeric) = -16.554671513321064559689894256596 absolute error = 1e-30 relative error = 6.0405910150215241124063119873049e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.46 y[1] (analytic) = -16.553029483022899239994186996582 y[1] (numeric) = -16.553029483022899239994186996581 absolute error = 1e-30 relative error = 6.0411902306198327777761560675111e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.461 y[1] (analytic) = -16.551387287183757851606825857799 y[1] (numeric) = -16.551387287183757851606825857798 absolute error = 1e-30 relative error = 6.0417896255399110170401982126381e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=217.4MB, alloc=4.4MB, time=8.86 x[1] = 0.462 y[1] (analytic) = -16.549744925820592784894403008661 y[1] (numeric) = -16.549744925820592784894403008659 absolute error = 2e-30 relative error = 1.2084778399693874317411177669038e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.463 y[1] (analytic) = -16.548102398950344419788354911499 y[1] (numeric) = -16.548102398950344419788354911498 absolute error = 1e-30 relative error = 6.0429889536061281006038494428757e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.464 y[1] (analytic) = -16.546459706589941138149027331726 y[1] (numeric) = -16.546459706589941138149027331725 absolute error = 1e-30 relative error = 6.0435888868827393313792162786431e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.465 y[1] (analytic) = -16.544816848756299336112054223757 y[1] (numeric) = -16.544816848756299336112054223755 absolute error = 2e-30 relative error = 1.2088377999484129903999925523857e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.466 y[1] (analytic) = -16.543173825466323436417082909256 y[1] (numeric) = -16.543173825466323436417082909255 absolute error = 1e-30 relative error = 6.0447892922494376972927113482760e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.467 y[1] (analytic) = -16.541530636736905900718877890781 y[1] (numeric) = -16.54153063673690590071887789078 absolute error = 1e-30 relative error = 6.0453897644702289574997454222311e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.468 y[1] (analytic) = -16.539887282584927241880835571575 y[1] (numeric) = -16.539887282584927241880835571574 absolute error = 1e-30 relative error = 6.0459904164698487998593318924882e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.469 y[1] (analytic) = -16.538243763027256036250942080207 y[1] (numeric) = -16.538243763027256036250942080206 absolute error = 1e-30 relative error = 6.0465912483137459902090651881500e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=221.2MB, alloc=4.4MB, time=9.02 x[1] = 0.47 y[1] (analytic) = -16.536600078080748935920206326802 y[1] (numeric) = -16.536600078080748935920206326802 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.471 y[1] (analytic) = -16.534956227762250680963600345918 y[1] (numeric) = -16.534956227762250680963600345918 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.472 y[1] (analytic) = -16.533312212088594111663538909551 y[1] (numeric) = -16.53331221208859411166353890955 absolute error = 1e-30 relative error = 6.0483948235661702408802130465733e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.473 y[1] (analytic) = -16.531668031076600180715930322458 y[1] (numeric) = -16.531668031076600180715930322457 absolute error = 1e-30 relative error = 6.0489963754424392109601696641512e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.474 y[1] (analytic) = -16.53002368474307796541883024079 y[1] (numeric) = -16.530023684743077965418830240789 absolute error = 1e-30 relative error = 6.0495981074908105949380515464039e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.475 y[1] (analytic) = -16.528379173104824679843730284065 y[1] (numeric) = -16.528379173104824679843730284064 absolute error = 1e-30 relative error = 6.0502000197769658052081976475443e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.476 y[1] (analytic) = -16.526734496178625686989513139744 y[1] (numeric) = -16.526734496178625686989513139742 absolute error = 2e-30 relative error = 1.2101604224733250209266375608507e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.477 y[1] (analytic) = -16.525089653981254510919105789062 y[1] (numeric) = -16.525089653981254510919105789061 absolute error = 1e-30 relative error = 6.0514043853255476283317473490364e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=225.0MB, alloc=4.4MB, time=9.18 x[1] = 0.478 y[1] (analytic) = -16.523444646529472848878862412369 y[1] (numeric) = -16.523444646529472848878862412368 absolute error = 1e-30 relative error = 6.0520068387195314054897710039848e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.479 y[1] (analytic) = -16.521799473840030583400708461982 y[1] (numeric) = -16.521799473840030583400708461981 absolute error = 1e-30 relative error = 6.0526094726144133811944771060013e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.48 y[1] (analytic) = -16.520154135929665794387077320544 y[1] (numeric) = -16.520154135929665794387077320543 absolute error = 1e-30 relative error = 6.0532122870760694382917032495645e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.481 y[1] (analytic) = -16.518508632815104771178670893004 y[1] (numeric) = -16.518508632815104771178670893003 absolute error = 1e-30 relative error = 6.0538152821704144192663544681473e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.482 y[1] (analytic) = -16.516862964513062024605075410666 y[1] (numeric) = -16.516862964513062024605075410666 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.483 y[1] (analytic) = -16.515217131040240299018263656266 y[1] (numeric) = -16.515217131040240299018263656266 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.484 y[1] (analytic) = -16.51357113241333058430901474971 y[1] (numeric) = -16.513571132413330584309014749709 absolute error = 1e-30 relative error = 6.0556253519093161850280053205964e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.485 y[1] (analytic) = -16.511924968649012127906282565012 y[1] (numeric) = -16.511924968649012127906282565012 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=228.8MB, alloc=4.4MB, time=9.33 x[1] = 0.486 y[1] (analytic) = -16.510278639763952446759543779996 y[1] (numeric) = -16.510278639763952446759543779996 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.487 y[1] (analytic) = -16.508632145774807339304156491557 y[1] (numeric) = -16.508632145774807339304156491557 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.488 y[1] (analytic) = -16.506985486698220897409760260725 y[1] (numeric) = -16.506985486698220897409760260725 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.489 y[1] (analytic) = -16.505338662550825518311748383334 y[1] (numeric) = -16.505338662550825518311748383334 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.49 y[1] (analytic) = -16.503691673349241916525843113885 y[1] (numeric) = -16.503691673349241916525843113884 absolute error = 1e-30 relative error = 6.0592503773857830836059543099577e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.491 y[1] (analytic) = -16.502044519110079135745804502143 y[1] (numeric) = -16.502044519110079135745804502142 absolute error = 1e-30 relative error = 6.0598551824409204515473631422634e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.492 y[1] (analytic) = -16.500397199849934560724303434147 y[1] (numeric) = -16.500397199849934560724303434146 absolute error = 1e-30 relative error = 6.0604601688563876278961512510364e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.493 y[1] (analytic) = -16.498749715585393929136989401592 y[1] (numeric) = -16.498749715585393929136989401591 absolute error = 1e-30 relative error = 6.0610653366985686859238482165669e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.494 y[1] (analytic) = -16.497102066333031343429783456055 y[1] (numeric) = -16.497102066333031343429783456054 absolute error = 1e-30 relative error = 6.0616706860338869450988821632870e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=232.7MB, alloc=4.4MB, time=9.49 TOP MAIN SOLVE Loop x[1] = 0.495 y[1] (analytic) = -16.495454252109409282649426737178 y[1] (numeric) = -16.495454252109409282649426737177 absolute error = 1e-30 relative error = 6.0622762169288049932923507669120e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.496 y[1] (analytic) = -16.493806272931078614257314896762 y[1] (numeric) = -16.493806272931078614257314896761 absolute error = 1e-30 relative error = 6.0628819294498247090071158069704e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.497 y[1] (analytic) = -16.49215812881457860592664867374 y[1] (numeric) = -16.49215812881457860592664867374 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.498 y[1] (analytic) = -16.490509819776436937322930808178 y[1] (numeric) = -16.490509819776436937322930808178 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.499 y[1] (analytic) = -16.488861345833169711867839415807 y[1] (numeric) = -16.488861345833169711867839415807 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.5 y[1] (analytic) = -16.487212707001281468486507878142 y[1] (numeric) = -16.487212707001281468486507878141 absolute error = 1e-30 relative error = 6.0653065971263342360379953499117e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.501 y[1] (analytic) = -16.485563903297265193338241236922 y[1] (numeric) = -16.485563903297265193338241236921 absolute error = 1e-30 relative error = 6.0659132187767671979917550464147e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.502 y[1] (analytic) = -16.483914934737602331530699015517 y[1] (numeric) = -16.483914934737602331530699015516 absolute error = 1e-30 relative error = 6.0665200224531394495220400899112e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=236.5MB, alloc=4.4MB, time=9.64 x[1] = 0.503 y[1] (analytic) = -16.482265801338762798817574323959 y[1] (numeric) = -16.482265801338762798817574323957 absolute error = 2e-30 relative error = 1.2134254016444457055860695204664e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.504 y[1] (analytic) = -16.480616503117204993279799038517 y[1] (numeric) = -16.480616503117204993279799038517 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.505 y[1] (analytic) = -16.478967040089375806990304781114 y[1] (numeric) = -16.478967040089375806990304781113 absolute error = 1e-30 relative error = 6.0683415263058646835544393148108e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.506 y[1] (analytic) = -16.477317412271710637662369358413 y[1] (numeric) = -16.477317412271710637662369358412 absolute error = 1e-30 relative error = 6.0689490587541642716826889821797e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.507 y[1] (analytic) = -16.475667619680633400281578255215 y[1] (numeric) = -16.475667619680633400281578255214 absolute error = 1e-30 relative error = 6.0695567735626857534633021220007e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.508 y[1] (analytic) = -16.474017662332556538721430711626 y[1] (numeric) = -16.474017662332556538721430711626 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.509 y[1] (analytic) = -16.472367540243881037342619848588 y[1] (numeric) = -16.472367540243881037342619848587 absolute error = 1e-30 relative error = 6.0707727505283344135563065674979e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.51 y[1] (analytic) = -16.470717253430996432576016241565 y[1] (numeric) = -16.470717253430996432576016241564 absolute error = 1e-30 relative error = 6.0713810128195305765574009996318e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=240.3MB, alloc=4.4MB, time=9.80 x[1] = 0.511 y[1] (analytic) = -16.469066801910280824489384277632 y[1] (numeric) = -16.469066801910280824489384277631 absolute error = 1e-30 relative error = 6.0719894577390866477255000390800e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.512 y[1] (analytic) = -16.467416185698100888337860566737 y[1] (numeric) = -16.467416185698100888337860566736 absolute error = 1e-30 relative error = 6.0725980853541361979062343285936e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.513 y[1] (analytic) = -16.465765404810811886098223613699 y[1] (numeric) = -16.465765404810811886098223613698 absolute error = 1e-30 relative error = 6.0732068957318524700515597738467e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.514 y[1] (analytic) = -16.464114459264757677986983893382 y[1] (numeric) = -16.464114459264757677986983893381 absolute error = 1e-30 relative error = 6.0738158889394484018707066007350e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.515 y[1] (analytic) = -16.462463349076270733962323407579 y[1] (numeric) = -16.462463349076270733962323407577 absolute error = 2e-30 relative error = 1.2148850130088353297009359561060e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.516 y[1] (analytic) = -16.460812074261672145209913738371 y[1] (numeric) = -16.46081207426167214520991373837 absolute error = 1e-30 relative error = 6.0750344241133296052243231588946e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.517 y[1] (analytic) = -16.459160634837271635612641549156 y[1] (numeric) = -16.459160634837271635612641549154 absolute error = 2e-30 relative error = 1.2151287932428478860303919318375e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.518 y[1] (analytic) = -16.457509030819367573204270421062 y[1] (numeric) = -16.457509030819367573204270421061 absolute error = 1e-30 relative error = 6.0762536914142780670066199649331e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=244.1MB, alloc=4.4MB, time=9.96 x[1] = 0.519 y[1] (analytic) = -16.455857262224246981607067849274 y[1] (numeric) = -16.455857262224246981607067849273 absolute error = 1e-30 relative error = 6.0768635997808572678728721207011e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.52 y[1] (analytic) = -16.454205329068185551453426160611 y[1] (numeric) = -16.45420532906818555145342616061 absolute error = 1e-30 relative error = 6.0774736913814286159932645250725e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.521 y[1] (analytic) = -16.452553231367447651791506050841 y[1] (numeric) = -16.452553231367447651791506050839 absolute error = 2e-30 relative error = 1.2156167932566967097168789647436e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.522 y[1] (analytic) = -16.450900969138286341474931377367 y[1] (numeric) = -16.450900969138286341474931377366 absolute error = 1e-30 relative error = 6.0786944245545533796766172450107e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.523 y[1] (analytic) = -16.44924854239694338053656378038 y[1] (numeric) = -16.449248542396943380536563780379 absolute error = 1e-30 relative error = 6.0793050662622093229774009549179e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.524 y[1] (analytic) = -16.447595951159649241546385643039 y[1] (numeric) = -16.447595951159649241546385643038 absolute error = 1e-30 relative error = 6.0799158914740625147583520422988e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.525 y[1] (analytic) = -16.445943195442623120953519839037 y[1] (numeric) = -16.445943195442623120953519839036 absolute error = 1e-30 relative error = 6.0805269002577640367659117800224e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.526 y[1] (analytic) = -16.444290275262072950412414653703 y[1] (numeric) = -16.444290275262072950412414653702 absolute error = 1e-30 relative error = 6.0811380926810049391557438416732e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=247.9MB, alloc=4.4MB, time=10.12 x[1] = 0.527 y[1] (analytic) = -16.44263719063419540809322220288 y[1] (numeric) = -16.442637190634195408093222202879 absolute error = 1e-30 relative error = 6.0817494688115162634508231878925e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.528 y[1] (analytic) = -16.440983941575175929976398611967 y[1] (numeric) = -16.440983941575175929976398611966 absolute error = 1e-30 relative error = 6.0823610287170690655232393707110e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.529 y[1] (analytic) = -16.439330528101188721131554155891 y[1] (numeric) = -16.43933052810118872113155415589 absolute error = 1e-30 relative error = 6.0829727724654744385997270385018e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.53 y[1] (analytic) = -16.437676950228396766980581499264 y[1] (numeric) = -16.437676950228396766980581499263 absolute error = 1e-30 relative error = 6.0835847001245835362909364584554e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.531 y[1] (analytic) = -16.436023207972951844545090114659 y[1] (numeric) = -16.436023207972951844545090114657 absolute error = 2e-30 relative error = 1.2168393623524575191288913815468e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.532 y[1] (analytic) = -16.434369301350994533678174895752 y[1] (numeric) = -16.43436930135099453367817489575 absolute error = 2e-30 relative error = 1.2169618214893035920443211637424e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.533 y[1] (analytic) = -16.432715230378654228280546921071 y[1] (numeric) = -16.43271523037865422828054692107 absolute error = 1e-30 relative error = 6.0854215872452461031979965979367e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.534 y[1] (analytic) = -16.431060995072049147501054263225 y[1] (numeric) = -16.431060995072049147501054263223 absolute error = 2e-30 relative error = 1.2172068502452967300975796145350e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.535 y[1] (analytic) = -16.42940659544728634692162067776 y[1] (numeric) = -16.429406595447286346921620677758 absolute error = 2e-30 relative error = 1.2173294198916564807784797106245e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=251.7MB, alloc=4.4MB, time=10.28 TOP MAIN SOLVE Loop x[1] = 0.536 y[1] (analytic) = -16.4277520315204617297266299453 y[1] (numeric) = -16.427752031520461729726629945298 absolute error = 2e-30 relative error = 1.2174520264017468728542775065086e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.537 y[1] (analytic) = -16.426097303307660057856783580151 y[1] (numeric) = -16.42609730330766005785678358015 absolute error = 1e-30 relative error = 6.0878733489459717547393680818135e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.538 y[1] (analytic) = -16.424442410824954963147459558392 y[1] (numeric) = -16.424442410824954963147459558391 absolute error = 1e-30 relative error = 6.0884867503381670438851130290117e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.539 y[1] (analytic) = -16.422787354088408958451599658322 y[1] (numeric) = -16.422787354088408958451599658321 absolute error = 1e-30 relative error = 6.0891003362535329690151780488706e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.54 y[1] (analytic) = -16.421132133114073448747152946261 y[1] (numeric) = -16.42113213311407344874715294626 absolute error = 1e-30 relative error = 6.0897141067603225594212848210629e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.541 y[1] (analytic) = -16.419476747917988742229102880881 y[1] (numeric) = -16.41947674791798874222910288088 absolute error = 1e-30 relative error = 6.0903280619268291596715874504455e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.542 y[1] (analytic) = -16.41782119851618406138610544964 y[1] (numeric) = -16.417821198516184061386105449639 absolute error = 1e-30 relative error = 6.0909422018213864529258353765215e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.543 y[1] (analytic) = -16.41616548492467755406176569143 y[1] (numeric) = -16.416165484924677554061765691429 absolute error = 1e-30 relative error = 6.0915565265123684842744460335065e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=255.5MB, alloc=4.4MB, time=10.43 x[1] = 0.544 y[1] (analytic) = -16.414509607159476304500579900205 y[1] (numeric) = -16.414509607159476304500579900204 absolute error = 1e-30 relative error = 6.0921710360681896841015005565095e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.545 y[1] (analytic) = -16.412853565236576344378570745217 y[1] (numeric) = -16.412853565236576344378570745216 absolute error = 1e-30 relative error = 6.0927857305573048914716758634420e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.546 y[1] (analytic) = -16.411197359171962663818642484458 y[1] (numeric) = -16.411197359171962663818642484456 absolute error = 2e-30 relative error = 1.2186801220096418755082252952735e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.547 y[1] (analytic) = -16.409540988981609222390683389031 y[1] (numeric) = -16.40954098898160922239068338903 absolute error = 1e-30 relative error = 6.0940156746094388689923294801052e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.548 y[1] (analytic) = -16.407884454681478960096442437501 y[1] (numeric) = -16.407884454681478960096442437499 absolute error = 2e-30 relative error = 1.2189261848619139142985812099913e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.549 y[1] (analytic) = -16.406227756287523808339207280646 y[1] (numeric) = -16.406227756287523808339207280643 absolute error = 3e-30 relative error = 1.8285739077651654579535299043587e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.55 y[1] (analytic) = -16.404570893815684700878310418689 y[1] (numeric) = -16.404570893815684700878310418687 absolute error = 2e-30 relative error = 1.2191723958802083936318515907323e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.551 y[1] (analytic) = -16.40291386728189158476849047478 y[1] (numeric) = -16.402913867281891584768490474777 absolute error = 3e-30 relative error = 1.8289433354789216040153994096569e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=259.4MB, alloc=4.4MB, time=10.59 x[1] = 0.552 y[1] (analytic) = -16.401256676702063431284135390368 y[1] (numeric) = -16.401256676702063431284135390365 absolute error = 3e-30 relative error = 1.8291281327616140056593208413034e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.553 y[1] (analytic) = -16.399599322092108246828434310204 y[1] (numeric) = -16.399599322092108246828434310201 absolute error = 3e-30 relative error = 1.8293129856890234813742783772770e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.554 y[1] (analytic) = -16.397941803467923083827464866812 y[1] (numeric) = -16.397941803467923083827464866809 absolute error = 3e-30 relative error = 1.8294978942817959032277100196244e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.555 y[1] (analytic) = -16.396284120845394051609242516657 y[1] (numeric) = -16.396284120845394051609242516654 absolute error = 3e-30 relative error = 1.8296828585605893364478660157835e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.556 y[1] (analytic) = -16.394626274240396327267758522675 y[1] (numeric) = -16.394626274240396327267758522672 absolute error = 3e-30 relative error = 1.8298678785460740465191453731760e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.557 y[1] (analytic) = -16.392968263668794166512033120472 y[1] (numeric) = -16.392968263668794166512033120468 absolute error = 4e-30 relative error = 2.4400706056785766750462160936929e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.558 y[1] (analytic) = -16.391310089146440914500210348255 y[1] (numeric) = -16.391310089146440914500210348251 absolute error = 4e-30 relative error = 2.4403174476264792040747267943668e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.559 y[1] (analytic) = -16.389651750689179016658720963481 y[1] (numeric) = -16.389651750689179016658720963478 absolute error = 3e-30 relative error = 1.8304232729495616457304764578313e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=263.2MB, alloc=4.4MB, time=10.75 x[1] = 0.56 y[1] (analytic) = -16.387993248312840029486539812259 y[1] (numeric) = -16.387993248312840029486539812256 absolute error = 3e-30 relative error = 1.8306085159687583719149713152333e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.561 y[1] (analytic) = -16.386334582033244631344563960737 y[1] (numeric) = -16.386334582033244631344563960733 absolute error = 4e-30 relative error = 2.4410584197309079400772058572595e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.562 y[1] (analytic) = -16.384675751866202633230137841083 y[1] (numeric) = -16.384675751866202633230137841079 absolute error = 4e-30 relative error = 2.4413055592780973487837158057665e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.563 y[1] (analytic) = -16.383016757827512989536751608126 y[1] (numeric) = -16.383016757827512989536751608123 absolute error = 3e-30 relative error = 1.8311645799706904080592978126923e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.564 y[1] (analytic) = -16.381357599932963808798938846377 y[1] (numeric) = -16.381357599932963808798938846373 absolute error = 4e-30 relative error = 2.4418000618070683577420995667003e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.565 y[1] (analytic) = -16.379698278198332364422399710917 y[1] (numeric) = -16.379698278198332364422399710913 absolute error = 4e-30 relative error = 2.4420474248442479741383553610527e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.566 y[1] (analytic) = -16.378038792639385105399375529582 y[1] (numeric) = -16.378038792639385105399375529579 absolute error = 3e-30 relative error = 1.8317211468251372048328547290565e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.567 y[1] (analytic) = -16.376379143271877667009300837913 y[1] (numeric) = -16.37637914327187766700930083791 absolute error = 3e-30 relative error = 1.8319067809519598796587450772603e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=267.0MB, alloc=4.4MB, time=10.91 x[1] = 0.568 y[1] (analytic) = -16.374719330111554881504758762548 y[1] (numeric) = -16.374719330111554881504758762545 absolute error = 3e-30 relative error = 1.8320924710344712297116355451156e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.569 y[1] (analytic) = -16.373059353174150788782765613102 y[1] (numeric) = -16.3730593531741507887827656131 absolute error = 2e-30 relative error = 1.2215188113956671818511093782619e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.57 y[1] (analytic) = -16.371399212475388647041410487045 y[1] (numeric) = -16.371399212475388647041410487044 absolute error = 1e-30 relative error = 6.1082133971663010899694682980707e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.571 y[1] (analytic) = -16.369738908030980943421875636719 y[1] (numeric) = -16.369738908030980943421875636718 absolute error = 1e-30 relative error = 6.1088329240816467268242232978658e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.572 y[1] (analytic) = -16.368078439856629404635863292418 y[1] (numeric) = -16.368078439856629404635863292416 absolute error = 2e-30 relative error = 1.2218905275587855242711008276316e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.573 y[1] (analytic) = -16.366417807968025007578454580348 y[1] (numeric) = -16.366417807968025007578454580347 absolute error = 1e-30 relative error = 6.1100725383727396483870553486953e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.574 y[1] (analytic) = -16.364757012380847989926426119354 y[1] (numeric) = -16.364757012380847989926426119353 absolute error = 1e-30 relative error = 6.1106926258877197801177121031842e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.575 y[1] (analytic) = -16.363096053110767860722049825441 y[1] (numeric) = -16.36309605311076786072204982544 absolute error = 1e-30 relative error = 6.1113129004085461102327906629873e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.576 y[1] (analytic) = -16.361434930173443410942401398509 y[1] (numeric) = -16.361434930173443410942401398508 absolute error = 1e-30 relative error = 6.1119333620049378780398452857244e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=270.8MB, alloc=4.4MB, time=11.06 TOP MAIN SOLVE Loop x[1] = 0.577 y[1] (analytic) = -16.359773643584522724054202911131 y[1] (numeric) = -16.35977364358452272405420291113 absolute error = 1e-30 relative error = 6.1125540107466554926288060155486e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.578 y[1] (analytic) = -16.358112193359643186554224864823 y[1] (numeric) = -16.358112193359643186554224864821 absolute error = 2e-30 relative error = 1.2226349693407001114113023611447e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.579 y[1] (analytic) = -16.356450579514431498495273025002 y[1] (numeric) = -16.356450579514431498495273025 absolute error = 2e-30 relative error = 1.2227591739890631785111306915967e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.58 y[1] (analytic) = -16.354788802064503683997785291696 y[1] (numeric) = -16.354788802064503683997785291695 absolute error = 1e-30 relative error = 6.1144170805419855627681408970119e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.581 y[1] (analytic) = -16.353126861025465101747063809087 y[1] (numeric) = -16.353126861025465101747063809086 absolute error = 1e-30 relative error = 6.1150384785634348980029093322219e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.582 y[1] (analytic) = -16.351464756412910455476167463096 y[1] (numeric) = -16.351464756412910455476167463094 absolute error = 2e-30 relative error = 1.2231320128159261039036357785742e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.583 y[1] (analytic) = -16.349802488242423804434489862546 y[1] (numeric) = -16.349802488242423804434489862545 absolute error = 1e-30 relative error = 6.1162818371605803638281823563661e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.584 y[1] (analytic) = -16.348140056529578573842047845831 y[1] (numeric) = -16.348140056529578573842047845829 absolute error = 2e-30 relative error = 1.2233807595752667414068751246916e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=274.6MB, alloc=4.4MB, time=11.22 x[1] = 0.585 y[1] (analytic) = -16.346477461289937565329505501546 y[1] (numeric) = -16.346477461289937565329505501545 absolute error = 1e-30 relative error = 6.1175259462969811891811456278619e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.586 y[1] (analytic) = -16.344814702539052967363958638314 y[1] (numeric) = -16.344814702539052967363958638312 absolute error = 2e-30 relative error = 1.2236296564985309677272060803278e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.587 y[1] (analytic) = -16.343151780292466365660504585746 y[1] (numeric) = -16.343151780292466365660504585745 absolute error = 1e-30 relative error = 6.1187708065335280964944660515261e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.588 y[1] (analytic) = -16.34148869456570875357962215555 y[1] (numeric) = -16.341488694565708753579622155549 absolute error = 1e-30 relative error = 6.1193935184898158410090754351892e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.589 y[1] (analytic) = -16.339825445374300542510386538795 y[1] (numeric) = -16.339825445374300542510386538794 absolute error = 1e-30 relative error = 6.1200164184317744120435133602113e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.59 y[1] (analytic) = -16.338162032733751572239543862635 y[1] (numeric) = -16.338162032733751572239543862635 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.591 y[1] (analytic) = -16.336498456659561121306470077118 y[1] (numeric) = -16.336498456659561121306470077118 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.592 y[1] (analytic) = -16.334834717167217917344038790184 y[1] (numeric) = -16.334834717167217917344038790184 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=278.4MB, alloc=4.4MB, time=11.37 x[1] = 0.593 y[1] (analytic) = -16.333170814272200147405422616626 y[1] (numeric) = -16.333170814272200147405422616626 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.594 y[1] (analytic) = -16.331506747989975468276852554488 y[1] (numeric) = -16.331506747989975468276852554488 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.595 y[1] (analytic) = -16.329842518336001016776359850289 y[1] (numeric) = -16.329842518336001016776359850288 absolute error = 1e-30 relative error = 6.1237577697221985642471220051818e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.596 y[1] (analytic) = -16.328178125325723420038524762462 y[1] (numeric) = -16.328178125325723420038524762461 absolute error = 1e-30 relative error = 6.1243819875345183590957376912328e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.597 y[1] (analytic) = -16.326513568974578805785256580568 y[1] (numeric) = -16.326513568974578805785256580567 absolute error = 1e-30 relative error = 6.1250063938960552599474446223495e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.598 y[1] (analytic) = -16.324848849297992812582629206075 y[1] (numeric) = -16.324848849297992812582629206073 absolute error = 2e-30 relative error = 1.2251261977754879731294852303268e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.599 y[1] (analytic) = -16.323183966311380600083796548941 y[1] (numeric) = -16.323183966311380600083796548939 absolute error = 2e-30 relative error = 1.2252511545098688965088487013349e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.6 y[1] (analytic) = -16.321518920030146859258011942759 y[1] (numeric) = -16.321518920030146859258011942757 absolute error = 2e-30 relative error = 1.2253761489964966298429581420228e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=282.2MB, alloc=4.4MB, time=11.53 x[1] = 0.601 y[1] (analytic) = -16.31985371046968582260577572987 y[1] (numeric) = -16.319853710469685822605775729868 absolute error = 2e-30 relative error = 1.2255011812495223322427973065296e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.602 y[1] (analytic) = -16.318188337645381274360135116668 y[1] (numeric) = -16.318188337645381274360135116666 absolute error = 2e-30 relative error = 1.2256262512831055191698437481004e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.603 y[1] (analytic) = -16.31652280157260656067416034822 y[1] (numeric) = -16.316522801572606560674160348218 absolute error = 2e-30 relative error = 1.2257513591114140673959111866437e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.604 y[1] (analytic) = -16.314857102266724599794621200385 y[1] (numeric) = -16.314857102266724599794621200384 absolute error = 1e-30 relative error = 6.1293825237431210998397423013482e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.605 y[1] (analytic) = -16.313191239743087892221887736788 y[1] (numeric) = -16.313191239743087892221887736787 absolute error = 1e-30 relative error = 6.1300084410446029558889906674046e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.606 y[1] (analytic) = -16.311525214017038530856079227294 y[1] (numeric) = -16.311525214017038530856079227294 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.607 y[1] (analytic) = -16.309859025103908211129485074085 y[1] (numeric) = -16.309859025103908211129485074085 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.608 y[1] (analytic) = -16.308192673019018241125281540966 y[1] (numeric) = -16.308192673019018241125281540965 absolute error = 1e-30 relative error = 6.1318873283514941636498258495747e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.609 y[1] (analytic) = -16.306526157777679551682568031226 y[1] (numeric) = -16.306526157777679551682568031226 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 memory used=286.1MB, alloc=4.4MB, time=11.68 TOP MAIN SOLVE Loop x[1] = 0.61 y[1] (analytic) = -16.304859479395192706487746609198 y[1] (numeric) = -16.304859479395192706487746609197 absolute error = 1e-30 relative error = 6.1331408667687192069170647600013e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.611 y[1] (analytic) = -16.303192637886847912152268410544 y[1] (numeric) = -16.303192637886847912152268410544 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.612 y[1] (analytic) = -16.301525633267925028276770536433 y[1] (numeric) = -16.301525633267925028276770536432 absolute error = 1e-30 relative error = 6.1343951633533858703222185508890e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.613 y[1] (analytic) = -16.299858465553693577501626976853 y[1] (numeric) = -16.299858465553693577501626976852 absolute error = 1e-30 relative error = 6.1350225961365780111202836080981e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.614 y[1] (analytic) = -16.298191134759412755543937058723 y[1] (numeric) = -16.298191134759412755543937058722 absolute error = 1e-30 relative error = 6.1356502186753965306872905112302e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.615 y[1] (analytic) = -16.296523640900331441220974864788 y[1] (numeric) = -16.296523640900331441220974864787 absolute error = 1e-30 relative error = 6.1362780310411844348774303670564e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.616 y[1] (analytic) = -16.294855983991688206460123019921 y[1] (numeric) = -16.29485598399168820646012301992 absolute error = 1e-30 relative error = 6.1369060333053268607472007761780e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.617 y[1] (analytic) = -16.293188164048711326295314192073 y[1] (numeric) = -16.293188164048711326295314192071 absolute error = 2e-30 relative error = 1.2275068451078502203405977807825e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=289.9MB, alloc=4.4MB, time=11.84 x[1] = 0.618 y[1] (analytic) = -16.291520181086618788850003605945 y[1] (numeric) = -16.291520181086618788850003605944 absolute error = 1e-30 relative error = 6.1381626078144266326736556301507e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.619 y[1] (analytic) = -16.289852035120618305306695818372 y[1] (numeric) = -16.289852035120618305306695818371 absolute error = 1e-30 relative error = 6.1387911802023651353081366141188e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.62 y[1] (analytic) = -16.28818372616590731986304895542 y[1] (numeric) = -16.288183726165907319863048955419 absolute error = 1e-30 relative error = 6.1394199427746205231980761437574e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.621 y[1] (analytic) = -16.286515254237673019674579562419 y[1] (numeric) = -16.286515254237673019674579562418 absolute error = 1e-30 relative error = 6.1400488956027889671255096731411e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.622 y[1] (analytic) = -16.284846619351092344783991169394 y[1] (numeric) = -16.284846619351092344783991169393 absolute error = 1e-30 relative error = 6.1406780387585089203356109851449e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.623 y[1] (analytic) = -16.283177821521331998037149625777 y[1] (numeric) = -16.283177821521331998037149625776 absolute error = 1e-30 relative error = 6.1413073723134611438345199503012e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.624 y[1] (analytic) = -16.281508860763548454985728209823 y[1] (numeric) = -16.281508860763548454985728209821 absolute error = 2e-30 relative error = 1.2283873792678737463424533773081e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.625 y[1] (analytic) = -16.279839737092887973776545469781 y[1] (numeric) = -16.27983973709288797377654546978 absolute error = 1e-30 relative error = 6.1425666109079971364908095582669e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=293.7MB, alloc=4.4MB, time=12.00 x[1] = 0.626 y[1] (analytic) = -16.278170450524486605027618705666 y[1] (numeric) = -16.278170450524486605027618705665 absolute error = 1e-30 relative error = 6.1431965160911541944971988869652e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.627 y[1] (analytic) = -16.276501001073470201690955952324 y[1] (numeric) = -16.276501001073470201690955952323 absolute error = 1e-30 relative error = 6.1438266119606901512618894792957e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.628 y[1] (analytic) = -16.27483138875495442890210927654 y[1] (numeric) = -16.274831388754954428902109276539 absolute error = 1e-30 relative error = 6.1444568985884976869422111123784e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.629 y[1] (analytic) = -16.273161613584044773816512153025 y[1] (numeric) = -16.273161613584044773816512153024 absolute error = 1e-30 relative error = 6.1450873760465119417710173497301e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.63 y[1] (analytic) = -16.271491675575836555432623636382 y[1] (numeric) = -16.27149167557583655543262363638 absolute error = 2e-30 relative error = 1.2291436088813421083061054990133e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.631 y[1] (analytic) = -16.269821574745414934401901998501 y[1] (numeric) = -16.269821574745414934401901998499 absolute error = 2e-30 relative error = 1.2292697807482227246102756249893e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.632 y[1] (analytic) = -16.268151311107854922825630453337 y[1] (numeric) = -16.268151311107854922825630453336 absolute error = 1e-30 relative error = 6.1469799541217838597369004749806e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.633 y[1] (analytic) = -16.266480884678221394038617543596 y[1] (numeric) = -16.266480884678221394038617543595 absolute error = 1e-30 relative error = 6.1476111956208264871126399880949e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=297.5MB, alloc=4.4MB, time=12.16 x[1] = 0.634 y[1] (analytic) = -16.264810295471569092379794716575 y[1] (numeric) = -16.264810295471569092379794716575 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.635 y[1] (analytic) = -16.263139543502942642949733569268 y[1] (numeric) = -16.263139543502942642949733569267 absolute error = 1e-30 relative error = 6.1488742522626628201219665076025e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.636 y[1] (analytic) = -16.261468628787376561355105195732 y[1] (numeric) = -16.261468628787376561355105195731 absolute error = 1e-30 relative error = 6.1495060675498800377171087209238e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.637 y[1] (analytic) = -16.259797551339895263440104022856 y[1] (numeric) = -16.259797551339895263440104022854 absolute error = 2e-30 relative error = 1.2300276148488633442403149381524e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.638 y[1] (analytic) = -16.258126311175513075004858473772 y[1] (numeric) = -16.25812631117551307500485847377 absolute error = 2e-30 relative error = 1.2301540544836582601678791281412e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.639 y[1] (analytic) = -16.256454908309234241510850751522 y[1] (numeric) = -16.256454908309234241510850751521 absolute error = 1e-30 relative error = 6.1514026621441649228449372237901e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.64 y[1] (analytic) = -16.254783342756052937773367988941 y[1] (numeric) = -16.25478334275605293777336798894 absolute error = 1e-30 relative error = 6.1520352434943414751095736789124e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.641 y[1] (analytic) = -16.253111614530953277641006964288 y[1] (numeric) = -16.253111614530953277641006964287 absolute error = 1e-30 relative error = 6.1526680165412676129537358327289e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=301.3MB, alloc=4.4MB, time=12.32 x[1] = 0.642 y[1] (analytic) = -16.251439723648909323662254535779 y[1] (numeric) = -16.251439723648909323662254535779 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.643 y[1] (analytic) = -16.249767670124885096739165901941 y[1] (numeric) = -16.24976767012488509673916590194 absolute error = 1e-30 relative error = 6.1539341380153692584976813445768e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.644 y[1] (analytic) = -16.248095453973834585768162748551 y[1] (numeric) = -16.248095453973834585768162748551 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.645 y[1] (analytic) = -16.246423075210701757267973296961 y[1] (numeric) = -16.246423075210701757267973296961 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.646 y[1] (analytic) = -16.244750533850420564994736222635 y[1] (numeric) = -16.244750533850420564994736222635 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.647 y[1] (analytic) = -16.243077829907914959544290366997 y[1] (numeric) = -16.243077829907914959544290366997 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.648 y[1] (analytic) = -16.241404963398098897941672119978 y[1] (numeric) = -16.241404963398098897941672119978 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.649 y[1] (analytic) = -16.239731934335876353217842305088 y[1] (numeric) = -16.239731934335876353217842305088 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.65 y[1] (analytic) = -16.238058742736141323973664353399 y[1] (numeric) = -16.238058742736141323973664353399 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=305.1MB, alloc=4.4MB, time=12.47 x[1] = 0.651 y[1] (analytic) = -16.236385388613777843931155507463 y[1] (numeric) = -16.236385388613777843931155507464 absolute error = 1e-30 relative error = 6.1590063063006507633261899401755e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.652 y[1] (analytic) = -16.234711871983659991472032750986 y[1] (numeric) = -16.234711871983659991472032750987 absolute error = 1e-30 relative error = 6.1596411928055589325348798645363e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.653 y[1] (analytic) = -16.233038192860651899163575114922 y[1] (numeric) = -16.233038192860651899163575114924 absolute error = 2e-30 relative error = 1.2320552543759843638176569022059e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.654 y[1] (analytic) = -16.231364351259607763271823965695 y[1] (numeric) = -16.231364351259607763271823965696 absolute error = 1e-30 relative error = 6.1609115435967444098964203456927e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.655 y[1] (analytic) = -16.229690347195371853262142836292 y[1] (numeric) = -16.229690347195371853262142836293 absolute error = 1e-30 relative error = 6.1615470080290748225006506567713e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.656 y[1] (analytic) = -16.228016180682778521287158316257 y[1] (numeric) = -16.228016180682778521287158316258 absolute error = 1e-30 relative error = 6.1621826652500043312083536478747e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.657 y[1] (analytic) = -16.226341851736652211662103471874 y[1] (numeric) = -16.226341851736652211662103471875 absolute error = 1e-30 relative error = 6.1628185153326673932532342300830e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.658 y[1] (analytic) = -16.224667360371807470327585223291 y[1] (numeric) = -16.224667360371807470327585223293 absolute error = 2e-30 relative error = 1.2326909116700483349962593332477e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=308.9MB, alloc=4.4MB, time=12.63 x[1] = 0.659 y[1] (analytic) = -16.222992706603048954299797060882 y[1] (numeric) = -16.222992706603048954299797060884 absolute error = 2e-30 relative error = 1.2328181588751896156124990508962e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.66 y[1] (analytic) = -16.221317890445171441108198438766 y[1] (numeric) = -16.221317890445171441108198438768 absolute error = 2e-30 relative error = 1.2329454446966101531456160543876e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.661 y[1] (analytic) = -16.219642911912959838220682139193 y[1] (numeric) = -16.219642911912959838220682139195 absolute error = 2e-30 relative error = 1.2330727691489714378067312866625e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.662 y[1] (analytic) = -16.21796777102118919245625085735 y[1] (numeric) = -16.217967771021189192456250857352 absolute error = 2e-30 relative error = 1.2332001322469436226295942305918e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.663 y[1] (analytic) = -16.216292467784624699385224212123 y[1] (numeric) = -16.216292467784624699385224212125 absolute error = 2e-30 relative error = 1.2333275340052055287334899865806e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.664 y[1] (analytic) = -16.214617002218021712716997344437 y[1] (numeric) = -16.214617002218021712716997344439 absolute error = 2e-30 relative error = 1.2334549744384446505912992466195e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.665 y[1] (analytic) = -16.212941374336125753675372220973 y[1] (numeric) = -16.212941374336125753675372220975 absolute error = 2e-30 relative error = 1.2335824535613571613027146428168e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.666 y[1] (analytic) = -16.211265584153672520361482717375 y[1] (numeric) = -16.211265584153672520361482717378 absolute error = 3e-30 relative error = 1.8505649570829718768089254328286e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=312.8MB, alloc=4.4MB, time=12.79 x[1] = 0.667 y[1] (analytic) = -16.209589631685387897104334511455 y[1] (numeric) = -16.209589631685387897104334511458 absolute error = 3e-30 relative error = 1.8507562919025456997419220057471e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.668 y[1] (analytic) = -16.207913516945987963798980773393 y[1] (numeric) = -16.207913516945987963798980773396 absolute error = 3e-30 relative error = 1.8509476848228405717596255847962e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.669 y[1] (analytic) = -16.206237239950179005232354596596 y[1] (numeric) = -16.206237239950179005232354596599 absolute error = 3e-30 relative error = 1.8511391358659529035255663870017e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.67 y[1] (analytic) = -16.20456080071265752039677906955 y[1] (numeric) = -16.204560800712657520396779069552 absolute error = 2e-30 relative error = 1.2342204300359947755392112582701e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.671 y[1] (analytic) = -16.202884199248110231791175845845 y[1] (numeric) = -16.202884199248110231791175845848 absolute error = 3e-30 relative error = 1.8515222124090808849403338393035e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.672 y[1] (analytic) = -16.20120743557121409470999302651 y[1] (numeric) = -16.201207435571214094709993026513 absolute error = 3e-30 relative error = 1.8517138379533546757770716601269e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.673 y[1] (analytic) = -16.19953050969663630651987312578 y[1] (numeric) = -16.199530509696636306519873125783 absolute error = 3e-30 relative error = 1.8519055217089622246738724813305e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.674 y[1] (analytic) = -16.197853421639034315924081848617 y[1] (numeric) = -16.19785342163903431592408184862 absolute error = 3e-30 relative error = 1.8520972636980653099631381708480e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=316.6MB, alloc=4.4MB, time=12.95 x[1] = 0.675 y[1] (analytic) = -16.196176171413055832214718365511 y[1] (numeric) = -16.196176171413055832214718365513 absolute error = 2e-30 relative error = 1.2348593759618925382948597645541e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.676 y[1] (analytic) = -16.194498759033338834512727727453 y[1] (numeric) = -16.194498759033338834512727727455 absolute error = 2e-30 relative error = 1.2349872816436471322460125410513e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.677 y[1] (analytic) = -16.192821184514511580995736021444 y[1] (numeric) = -16.192821184514511580995736021446 absolute error = 2e-30 relative error = 1.2351152261921080516428922964796e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.678 y[1] (analytic) = -16.19114344787119261811372882442 y[1] (numeric) = -16.191143447871192618113728824423 absolute error = 3e-30 relative error = 1.8528648144331271609234354049506e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.679 y[1] (analytic) = -16.189465549117990789792593471181 y[1] (numeric) = -16.189465549117990789792593471183 absolute error = 2e-30 relative error = 1.2353712319483955296228883331403e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.68 y[1] (analytic) = -16.187787488269505246625545609635 y[1] (numeric) = -16.187787488269505246625545609637 absolute error = 2e-30 relative error = 1.2354992931858673074695762616511e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.681 y[1] (analytic) = -16.18610926534032545505246047458 y[1] (numeric) = -16.186109265340325455052460474583 absolute error = 3e-30 relative error = 1.8534410900240037899944729274667e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.682 y[1] (analytic) = -16.184430880345031206527129269166 y[1] (numeric) = -16.184430880345031206527129269167 absolute error = 1e-30 relative error = 6.1787776622682285438710908725246e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.683 y[1] (analytic) = -16.182752333298192626672461001279 y[1] (numeric) = -16.18275233329819262667246100128 absolute error = 1e-30 relative error = 6.1794185525682507490242473500592e-30 % Correct digits = 31 h = 0.001 memory used=320.4MB, alloc=4.4MB, time=13.10 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.684 y[1] (analytic) = -16.181073624214370184423650080285 y[1] (numeric) = -16.181073624214370184423650080286 absolute error = 1e-30 relative error = 6.1800596377210562944604139241259e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.685 y[1] (analytic) = -16.179394753108114701159329937776 y[1] (numeric) = -16.179394753108114701159329937777 absolute error = 1e-30 relative error = 6.1807009178009994850959273501399e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.686 y[1] (analytic) = -16.177715719993967359820732894416 y[1] (numeric) = -16.177715719993967359820732894417 absolute error = 1e-30 relative error = 6.1813423928824785786556712912105e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.687 y[1] (analytic) = -16.176036524886459714018876453407 y[1] (numeric) = -16.176036524886459714018876453407 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.688 y[1] (analytic) = -16.174357167800113697129796159689 y[1] (numeric) = -16.17435716780011369712979615969 absolute error = 1e-30 relative error = 6.1826259283478574311428186348054e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.689 y[1] (analytic) = -16.17267764874944163137784512269 y[1] (numeric) = -16.172677648749441631377845122691 absolute error = 1e-30 relative error = 6.1832679888807737121334594124567e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.69 y[1] (analytic) = -16.17099796774894623690708025916 y[1] (numeric) = -16.17099796774894623690708025916 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.691 y[1] (analytic) = -16.169318124813120640840755271564 y[1] (numeric) = -16.169318124813120640840755271565 absolute error = 1e-30 relative error = 6.1845526959199317036444352947420e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=324.2MB, alloc=4.4MB, time=13.26 x[1] = 0.692 y[1] (analytic) = -16.167638119956448386328940336466 y[1] (numeric) = -16.167638119956448386328940336466 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.693 y[1] (analytic) = -16.165957953193403441584288436371 y[1] (numeric) = -16.165957953193403441584288436371 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.694 y[1] (analytic) = -16.164277624538450208905968227744 y[1] (numeric) = -16.164277624538450208905968227744 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.695 y[1] (analytic) = -16.162597134006043533691783297126 y[1] (numeric) = -16.162597134006043533691783297126 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.696 y[1] (analytic) = -16.160916481610628713438497616689 y[1] (numeric) = -16.160916481610628713438497616689 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.697 y[1] (analytic) = -16.159235667366641506730386970014 y[1] (numeric) = -16.159235667366641506730386970015 absolute error = 1e-30 relative error = 6.1884115102020976967556118633075e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.698 y[1] (analytic) = -16.157554691288508142216036078466 y[1] (numeric) = -16.157554691288508142216036078466 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.699 y[1] (analytic) = -16.155873553390645327573401118176 y[1] (numeric) = -16.155873553390645327573401118177 absolute error = 1e-30 relative error = 6.1896993480128423527167386633482e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=328.0MB, alloc=4.4MB, time=13.42 x[1] = 0.7 y[1] (analytic) = -16.154192253687460258463157277453 y[1] (numeric) = -16.154192253687460258463157277453 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.701 y[1] (analytic) = -16.152510792193350627470350964238 y[1] (numeric) = -16.152510792193350627470350964239 absolute error = 1e-30 relative error = 6.1909879700145981237451373864613e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.702 y[1] (analytic) = -16.150829168922704633034376233256 y[1] (numeric) = -16.150829168922704633034376233257 absolute error = 1e-30 relative error = 6.1916325752747849222218576374793e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.703 y[1] (analytic) = -16.149147383889900988367294962487 y[1] (numeric) = -16.149147383889900988367294962488 absolute error = 1e-30 relative error = 6.1922773768080289890641896824576e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.704 y[1] (analytic) = -16.1474654371093089303605202688 y[1] (numeric) = -16.147465437109308930360520268801 absolute error = 1e-30 relative error = 6.1929223746895243643565604722801e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.705 y[1] (analytic) = -16.145783328595288228479882612794 y[1] (numeric) = -16.145783328595288228479882612795 absolute error = 1e-30 relative error = 6.1935675689945095573056859788164e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.706 y[1] (analytic) = -16.144101058362189193649098003258 y[1] (numeric) = -16.144101058362189193649098003259 absolute error = 1e-30 relative error = 6.1942129597982675736791013316470e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.707 y[1] (analytic) = -16.142418626424352687121657672077 y[1] (numeric) = -16.142418626424352687121657672077 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=331.8MB, alloc=4.4MB, time=13.58 x[1] = 0.708 y[1] (analytic) = -16.140736032796110129341158550961 y[1] (numeric) = -16.140736032796110129341158550962 absolute error = 1e-30 relative error = 6.1955043312034567473900379838319e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.709 y[1] (analytic) = -16.139053277491783508790093842007 y[1] (numeric) = -16.139053277491783508790093842007 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.71 y[1] (analytic) = -16.137370360525685390827122934783 y[1] (numeric) = -16.137370360525685390827122934783 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.711 y[1] (analytic) = -16.135687281912118926512839883509 y[1] (numeric) = -16.135687281912118926512839883509 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.712 y[1] (analytic) = -16.134004041665377861424059618752 y[1] (numeric) = -16.134004041665377861424059618752 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.713 y[1] (analytic) = -16.1323206397997465444566410291 y[1] (numeric) = -16.1323206397997465444566410291 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.714 y[1] (analytic) = -16.130637076329499936616866009362 y[1] (numeric) = -16.130637076329499936616866009361 absolute error = 1e-30 relative error = 6.1993831692328196820113070647308e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.715 y[1] (analytic) = -16.128953351268903619801393533032 y[1] (numeric) = -16.128953351268903619801393533032 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.716 memory used=335.7MB, alloc=4.4MB, time=13.74 y[1] (analytic) = -16.127269464632213805565807768051 y[1] (numeric) = -16.127269464632213805565807768051 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.717 y[1] (analytic) = -16.125585416433677343881779216249 y[1] (numeric) = -16.125585416433677343881779216249 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.718 y[1] (analytic) = -16.123901206687531731882857818365 y[1] (numeric) = -16.123901206687531731882857818365 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.719 y[1] (analytic) = -16.122216835408005122598916928058 y[1] (numeric) = -16.122216835408005122598916928057 absolute error = 1e-30 relative error = 6.2026209559703703660319054207513e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.72 y[1] (analytic) = -16.120532302609316333679267020005 y[1] (numeric) = -16.120532302609316333679267020004 absolute error = 1e-30 relative error = 6.2032691056866471214678098666902e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.721 y[1] (analytic) = -16.118847608305674856104457958925 y[1] (numeric) = -16.118847608305674856104457958924 absolute error = 1e-30 relative error = 6.2039174530363001137233156007812e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.722 y[1] (analytic) = -16.117162752511280862886788618195 y[1] (numeric) = -16.117162752511280862886788618194 absolute error = 1e-30 relative error = 6.2045659980953280468961657482963e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.723 y[1] (analytic) = -16.115477735240325217759542598654 y[1] (numeric) = -16.115477735240325217759542598653 absolute error = 1e-30 relative error = 6.2052147409397745921764897004255e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.724 y[1] (analytic) = -16.11379255650698948385496876023 y[1] (numeric) = -16.113792556506989483854968760229 absolute error = 1e-30 relative error = 6.2058636816457284157660181301442e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=339.5MB, alloc=4.4MB, time=13.90 x[1] = 0.725 y[1] (analytic) = -16.112107216325445932371025241107 y[1] (numeric) = -16.112107216325445932371025241106 absolute error = 1e-30 relative error = 6.2065128202893232068241855090523e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.726 y[1] (analytic) = -16.110421714709857551226905601372 y[1] (numeric) = -16.110421714709857551226905601371 absolute error = 1e-30 relative error = 6.2071621569467377054411395945498e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.727 y[1] (analytic) = -16.108736051674378053707365690369 y[1] (numeric) = -16.108736051674378053707365690367 absolute error = 2e-30 relative error = 1.2415623383388391461275354782185e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.728 y[1] (analytic) = -16.107050227233151887095869799354 y[1] (numeric) = -16.107050227233151887095869799353 absolute error = 1e-30 relative error = 6.2084614246079662083921271236629e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.729 y[1] (analytic) = -16.105364241400314241296574623549 y[1] (numeric) = -16.105364241400314241296574623548 absolute error = 1e-30 relative error = 6.2091113557643631996941957959879e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.73 y[1] (analytic) = -16.103678094189991057445169520208 y[1] (numeric) = -16.103678094189991057445169520207 absolute error = 1e-30 relative error = 6.2097614852397459286258019404507e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.731 y[1] (analytic) = -16.101991785616299036508591512006 y[1] (numeric) = -16.101991785616299036508591512006 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.732 y[1] (analytic) = -16.100305315693345647873633447772 y[1] (numeric) = -16.100305315693345647873633447772 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=343.3MB, alloc=4.4MB, time=14.05 x[1] = 0.733 y[1] (analytic) = -16.098618684435229137924463695412 y[1] (numeric) = -16.098618684435229137924463695412 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.734 y[1] (analytic) = -16.096931891856038538609075704819 y[1] (numeric) = -16.096931891856038538609075704818 absolute error = 1e-30 relative error = 6.2123639878599009853091240017606e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.735 y[1] (analytic) = -16.09524493796985367599468574152 y[1] (numeric) = -16.095244937969853675994685741519 absolute error = 1e-30 relative error = 6.2130151100771834409071544634142e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.736 y[1] (analytic) = -16.093557822790745178812097054962 y[1] (numeric) = -16.093557822790745178812097054962 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.737 y[1] (analytic) = -16.091870546332774486989048708468 y[1] (numeric) = -16.091870546332774486989048708468 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.738 y[1] (analytic) = -16.09018310860999386017256726119 y[1] (numeric) = -16.090183108609993860172567261189 absolute error = 1e-30 relative error = 6.2149696697043273113956679299177e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.739 y[1] (analytic) = -16.088495509636446386240339455742 y[1] (numeric) = -16.088495509636446386240339455741 absolute error = 1e-30 relative error = 6.2156215874942126076956016807923e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.74 y[1] (analytic) = -16.086807749426165989801124028639 y[1] (numeric) = -16.086807749426165989801124028638 absolute error = 1e-30 relative error = 6.2162737043691660496329348217529e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=347.1MB, alloc=4.4MB, time=14.21 x[1] = 0.741 y[1] (analytic) = -16.085119827993177440684220724176 y[1] (numeric) = -16.085119827993177440684220724175 absolute error = 1e-30 relative error = 6.2169260204060455163763690083010e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.742 y[1] (analytic) = -16.083431745351496362418014556035 y[1] (numeric) = -16.083431745351496362418014556033 absolute error = 2e-30 relative error = 1.2435157071363508778537678658976e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.743 y[1] (analytic) = -16.081743501515129240697613324574 y[1] (numeric) = -16.081743501515129240697613324573 absolute error = 1e-30 relative error = 6.2182312502732415802609544616036e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.744 y[1] (analytic) = -16.080055096498073431841596361582 y[1] (numeric) = -16.080055096498073431841596361581 absolute error = 1e-30 relative error = 6.2188841642575015603717001309334e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.745 y[1] (analytic) = -16.078366530314317171237892438105 y[1] (numeric) = -16.078366530314317171237892438105 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.746 y[1] (analytic) = -16.076677802977839581778804734977 y[1] (numeric) = -16.076677802977839581778804734976 absolute error = 1e-30 relative error = 6.2201905907125457383221362079325e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.747 y[1] (analytic) = -16.074988914502610682285200739663 y[1] (numeric) = -16.074988914502610682285200739662 absolute error = 1e-30 relative error = 6.2208441033375469300701035445623e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.748 y[1] (analytic) = -16.073299864902591395919884897225 y[1] (numeric) = -16.073299864902591395919884897224 absolute error = 1e-30 relative error = 6.2214978156637549558658278438436e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=350.9MB, alloc=4.4MB, time=14.37 x[1] = 0.749 y[1] (analytic) = -16.071610654191733558590171807378 y[1] (numeric) = -16.071610654191733558590171807377 absolute error = 1e-30 relative error = 6.2221517277683925099363585026512e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.75 y[1] (analytic) = -16.06992128238397992733967772394 y[1] (numeric) = -16.069921282383979927339677723939 absolute error = 1e-30 relative error = 6.2228058397287280169150016370380e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.751 y[1] (analytic) = -16.068231749493264188729348077361 y[1] (numeric) = -16.06823174949326418872934807736 absolute error = 1e-30 relative error = 6.2234601516220756604934321370382e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.752 y[1] (analytic) = -16.066542055533510967207738705474 y[1] (numeric) = -16.066542055533510967207738705473 absolute error = 1e-30 relative error = 6.2241146635257954121012309974203e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.753 y[1] (analytic) = -16.064852200518635833470568442179 y[1] (numeric) = -16.064852200518635833470568442178 absolute error = 1e-30 relative error = 6.2247693755172930596128683263057e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.754 y[1] (analytic) = -16.063162184462545312809560678401 y[1] (numeric) = -16.063162184462545312809560678399 absolute error = 2e-30 relative error = 1.2450848575348040472164304936578e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.755 y[1] (analytic) = -16.061472007379136893450591474385 y[1] (numeric) = -16.061472007379136893450591474384 absolute error = 1e-30 relative error = 6.2260794000734744485041657134435e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.756 y[1] (analytic) = -16.059781669282299034881161767219 y[1] (numeric) = -16.059781669282299034881161767217 absolute error = 2e-30 relative error = 1.2453469425586398213209414196664e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.757 y[1] (analytic) = -16.058091170185911176167211182305 y[1] (numeric) = -16.058091170185911176167211182304 absolute error = 1e-30 relative error = 6.2273902259107835516572628399444e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=354.7MB, alloc=4.4MB, time=14.52 TOP MAIN SOLVE Loop x[1] = 0.758 y[1] (analytic) = -16.056400510103843744259290922563 y[1] (numeric) = -16.056400510103843744259290922561 absolute error = 2e-30 relative error = 1.2456091879007726170655049956441e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.759 y[1] (analytic) = -16.054709689049958162288113174096 y[1] (numeric) = -16.054709689049958162288113174095 absolute error = 1e-30 relative error = 6.2287018536501189985454788376646e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.76 y[1] (analytic) = -16.053018707038106857849494432296 y[1] (numeric) = -16.053018707038106857849494432296 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.761 y[1] (analytic) = -16.051327564082133271278710117487 y[1] (numeric) = -16.051327564082133271278710117487 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.762 y[1] (analytic) = -16.049636260195871863914277814568 y[1] (numeric) = -16.049636260195871863914277814567 absolute error = 1e-30 relative error = 6.2306708001854483708362504284959e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.763 y[1] (analytic) = -16.047944795393148126351186436486 y[1] (numeric) = -16.047944795393148126351186436485 absolute error = 1e-30 relative error = 6.2313275173221435088993405922162e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.764 y[1] (analytic) = -16.046253169687778586683588576819 y[1] (numeric) = -16.046253169687778586683588576818 absolute error = 1e-30 relative error = 6.2319844354011123325799310929541e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.765 y[1] (analytic) = -16.044561383093570818736973282309 y[1] (numeric) = -16.044561383093570818736973282308 absolute error = 1e-30 relative error = 6.2326415545003126762540632213275e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=358.5MB, alloc=4.4MB, time=14.68 x[1] = 0.766 y[1] (analytic) = -16.042869435624323450289836441809 y[1] (numeric) = -16.042869435624323450289836441808 absolute error = 1e-30 relative error = 6.2332988746977485664403493128094e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.767 y[1] (analytic) = -16.041177327293826171284865953813 y[1] (numeric) = -16.041177327293826171284865953812 absolute error = 1e-30 relative error = 6.2339563960714702508933569199390e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.768 y[1] (analytic) = -16.039485058115859742029658800533 y[1] (numeric) = -16.039485058115859742029658800532 absolute error = 1e-30 relative error = 6.2346141186995742277247488663061e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.769 y[1] (analytic) = -16.037792628104196001386987122347 y[1] (numeric) = -16.037792628104196001386987122346 absolute error = 1e-30 relative error = 6.2352720426602032745522001415982e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.77 y[1] (analytic) = -16.036100037272597874954630352403 y[1] (numeric) = -16.036100037272597874954630352402 absolute error = 1e-30 relative error = 6.2359301680315464776761126319597e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.771 y[1] (analytic) = -16.034407285634819383234790437177 y[1] (numeric) = -16.034407285634819383234790437176 absolute error = 1e-30 relative error = 6.2365884948918392612841487148995e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.772 y[1] (analytic) = -16.032714373204605649793107134915 y[1] (numeric) = -16.032714373204605649793107134915 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.773 y[1] (analytic) = -16.03102129999569290940729035006 y[1] (numeric) = -16.03102129999569290940729035006 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=362.4MB, alloc=4.4MB, time=14.84 x[1] = 0.774 y[1] (analytic) = -16.029328066021808516205386428031 y[1] (numeric) = -16.029328066021808516205386428031 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.775 y[1] (analytic) = -16.027634671296670951793695301095 y[1] (numeric) = -16.027634671296670951793695301094 absolute error = 1e-30 relative error = 6.2392238187888381481580889404431e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.776 y[1] (analytic) = -16.025941115833989833374355342459 y[1] (numeric) = -16.025941115833989833374355342458 absolute error = 1e-30 relative error = 6.2398831542690340708827521136834e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.777 y[1] (analytic) = -16.024247399647465921852612752261 y[1] (numeric) = -16.02424739964746592185261275226 absolute error = 1e-30 relative error = 6.2405426917085668538143572516385e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.778 y[1] (analytic) = -16.022553522750791129933792265675 y[1] (numeric) = -16.022553522750791129933792265674 absolute error = 1e-30 relative error = 6.2412024311859971064195477658100e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.779 y[1] (analytic) = -16.020859485157648530209985940049 y[1] (numeric) = -16.020859485157648530209985940049 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.78 y[1] (analytic) = -16.01916528688171236323647674471 y[1] (numeric) = -16.01916528688171236323647674471 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.781 y[1] (analytic) = -16.017470927936648045597913643889 y[1] (numeric) = -16.017470927936648045597913643889 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=366.2MB, alloc=4.4MB, time=15.00 x[1] = 0.782 y[1] (analytic) = -16.015776408336112177964254830139 y[1] (numeric) = -16.015776408336112177964254830139 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.783 y[1] (analytic) = -16.01408172809375255313649573256 y[1] (numeric) = -16.01408172809375255313649573256 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.784 y[1] (analytic) = -16.012386887223208164082198391216 y[1] (numeric) = -16.012386887223208164082198391217 absolute error = 1e-30 relative error = 6.2451651152516914675916598107534e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.785 y[1] (analytic) = -16.010691885738109211960838756258 y[1] (numeric) = -16.010691885738109211960838756259 absolute error = 1e-30 relative error = 6.2458262711980168802631184848089e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.786 y[1] (analytic) = -16.008996723652077114138988437454 y[1] (numeric) = -16.008996723652077114138988437455 absolute error = 1e-30 relative error = 6.2464876298124037271593511001400e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.787 y[1] (analytic) = -16.007301400978724512195347397132 y[1] (numeric) = -16.007301400978724512195347397133 absolute error = 1e-30 relative error = 6.2471491911738328332630028081500e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.788 y[1] (analytic) = -16.005605917731655279915644046884 y[1] (numeric) = -16.005605917731655279915644046885 absolute error = 1e-30 relative error = 6.2478109553613318621978837818226e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.789 y[1] (analytic) = -16.003910273924464531277419175816 y[1] (numeric) = -16.003910273924464531277419175817 absolute error = 1e-30 relative error = 6.2484729224539753459378783474436e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.79 y[1] (analytic) = -16.002214469570738628424710105644 y[1] (numeric) = -16.002214469570738628424710105646 absolute error = 2e-30 relative error = 1.2498270185061769429088158409066e-29 % Correct digits = 30 h = 0.001 memory used=370.0MB, alloc=4.4MB, time=15.16 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.791 y[1] (analytic) = -16.000518504684055189632651435518 y[1] (numeric) = -16.00051850468405518963265143552 absolute error = 2e-30 relative error = 1.2499594931342456651860336932652e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.792 y[1] (analytic) = -15.998822379277983097262008707114 y[1] (numeric) = -15.998822379277983097262008707116 absolute error = 2e-30 relative error = 1.2500920083908442991312134576946e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.793 y[1] (analytic) = -15.997126093366082505703661288289 y[1] (numeric) = -15.997126093366082505703661288291 absolute error = 2e-30 relative error = 1.2502245642918253053499751777968e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.794 y[1] (analytic) = -15.995429646961904849313050741376 y[1] (numeric) = -15.995429646961904849313050741379 absolute error = 3e-30 relative error = 1.8755357412795758218674377393462e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.795 y[1] (analytic) = -15.993733040078992850334610910122 y[1] (numeric) = -15.993733040078992850334610910125 absolute error = 3e-30 relative error = 1.8757346971355869504873098629763e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.796 y[1] (analytic) = -15.992036272730880526816195927184 y[1] (numeric) = -15.992036272730880526816195927186 absolute error = 2e-30 relative error = 1.2506224760197282515192212701717e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.797 y[1] (analytic) = -15.990339344931093200513522312196 y[1] (numeric) = -15.990339344931093200513522312199 absolute error = 3e-30 relative error = 1.8761327919854272677480407399275e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.798 y[1] (analytic) = -15.988642256693147504784641298484 y[1] (numeric) = -15.988642256693147504784641298487 absolute error = 3e-30 relative error = 1.8763319310269409285018734248616e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=373.8MB, alloc=4.4MB, time=15.31 x[1] = 0.799 y[1] (analytic) = -15.986945008030551392474457494696 y[1] (numeric) = -15.986945008030551392474457494699 absolute error = 3e-30 relative error = 1.8765311311779968162458098660068e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.8 y[1] (analytic) = -15.985247598956804143789309955909 y[1] (numeric) = -15.985247598956804143789309955913 absolute error = 4e-30 relative error = 2.5023071899499633957200649099703e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.801 y[1] (analytic) = -15.98355002948539637416163170707 y[1] (numeric) = -15.983550029485396374161631707073 absolute error = 3e-30 relative error = 1.8769297149042599040642228987729e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.802 y[1] (analytic) = -15.981852299629810042104703730042 y[1] (numeric) = -15.981852299629810042104703730045 absolute error = 3e-30 relative error = 1.8771290985272648491406621007236e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.803 y[1] (analytic) = -15.980154409403518457057519394036 y[1] (numeric) = -15.980154409403518457057519394039 absolute error = 3e-30 relative error = 1.8773285433554075292662077024467e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.804 y[1] (analytic) = -15.97845635881998628721977527772 y[1] (numeric) = -15.978456358819986287219775277722 absolute error = 2e-30 relative error = 1.2516853662750815246017253214961e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.805 y[1] (analytic) = -15.976758147892669567377004299952 y[1] (numeric) = -15.976758147892669567377004299954 absolute error = 2e-30 relative error = 1.2518184111485717791835730373747e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.806 y[1] (analytic) = -15.975059776635015706715867044785 y[1] (numeric) = -15.975059776635015706715867044787 absolute error = 2e-30 relative error = 1.2519514968733842899542813118688e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=377.6MB, alloc=4.4MB, time=15.47 x[1] = 0.807 y[1] (analytic) = -15.973361245060463496629617135137 y[1] (numeric) = -15.97336124506046349662961713514 absolute error = 3e-30 relative error = 1.8781269351982555678051120864703e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.808 y[1] (analytic) = -15.971662553182443118513756478402 y[1] (numeric) = -15.971662553182443118513756478405 absolute error = 3e-30 relative error = 1.8783266864113862812928850108069e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.809 y[1] (analytic) = -15.969963701014376151551896176158 y[1] (numeric) = -15.969963701014376151551896176161 absolute error = 3e-30 relative error = 1.8785264989734740298365881928035e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.81 y[1] (analytic) = -15.968264688569675580491838859144 y[1] (numeric) = -15.968264688569675580491838859147 absolute error = 3e-30 relative error = 1.8787263729085385175153355021332e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.811 y[1] (analytic) = -15.966565515861745803411898177729 y[1] (numeric) = -15.966565515861745803411898177732 absolute error = 3e-30 relative error = 1.8789263082406137071459879642921e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.812 y[1] (analytic) = -15.964866182903982639477471147226 y[1] (numeric) = -15.964866182903982639477471147229 absolute error = 3e-30 relative error = 1.8791263049937478293922479159342e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.813 y[1] (analytic) = -15.963166689709773336687879016611 y[1] (numeric) = -15.963166689709773336687879016614 absolute error = 3e-30 relative error = 1.8793263631920033918823733316099e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.814 y[1] (analytic) = -15.961467036292496579613492298485 y[1] (numeric) = -15.961467036292496579613492298488 absolute error = 3e-30 relative error = 1.8795264828594571883355190868423e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=381.4MB, alloc=4.4MB, time=15.63 x[1] = 0.815 y[1] (analytic) = -15.959767222665522497123155567457 y[1] (numeric) = -15.95976722266552249712315556746 absolute error = 3e-30 relative error = 1.8797266640202003076967119332093e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.816 y[1] (analytic) = -15.958067248842212670101927603557 y[1] (numeric) = -15.95806724884221267010192760356 absolute error = 3e-30 relative error = 1.8799269066983381432804659718353e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.817 y[1] (analytic) = -15.956367114835920139159152426753 y[1] (numeric) = -15.956367114835920139159152426756 absolute error = 3e-30 relative error = 1.8801272109179904019230454224433e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.818 y[1] (analytic) = -15.954666820659989412326876738234 y[1] (numeric) = -15.954666820659989412326876738236 absolute error = 2e-30 relative error = 1.2535517178021940754289209972437e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.819 y[1] (analytic) = -15.952966366327756472748629253719 y[1] (numeric) = -15.952966366327756472748629253721 absolute error = 2e-30 relative error = 1.2536853360522590922084334591131e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.82 y[1] (analytic) = -15.951265751852548786358577383784 y[1] (numeric) = -15.951265751852548786358577383786 absolute error = 2e-30 relative error = 1.2538189953782971198883452195449e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.821 y[1] (analytic) = -15.949564977247685309551076685939 y[1] (numeric) = -15.949564977247685309551076685941 absolute error = 2e-30 relative error = 1.2539526957964261935480408106952e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.822 y[1] (analytic) = -15.947864042526476496840628483044 y[1] (numeric) = -15.947864042526476496840628483046 absolute error = 2e-30 relative error = 1.2540864373227739212089127982766e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=385.2MB, alloc=4.4MB, time=15.78 x[1] = 0.823 y[1] (analytic) = -15.946162947702224308512261012553 y[1] (numeric) = -15.946162947702224308512261012556 absolute error = 3e-30 relative error = 1.8813303299602162349558325573221e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.824 y[1] (analytic) = -15.944461692788222218262349441068 y[1] (numeric) = -15.944461692788222218262349441071 absolute error = 3e-30 relative error = 1.8815310656470255082291290769139e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.825 y[1] (analytic) = -15.942760277797755220829890048701 y[1] (numeric) = -15.942760277797755220829890048703 absolute error = 2e-30 relative error = 1.2544879087125488314432737712145e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.826 y[1] (analytic) = -15.941058702744099839618243857895 y[1] (numeric) = -15.941058702744099839618243857897 absolute error = 2e-30 relative error = 1.2546218148332389290514662625224e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.827 y[1] (analytic) = -15.939356967640524134307364951524 y[1] (numeric) = -15.939356967640524134307364951526 absolute error = 2e-30 relative error = 1.2547557621429295298676663444006e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.828 y[1] (analytic) = -15.937655072500287708456528695331 y[1] (numeric) = -15.937655072500287708456528695333 absolute error = 2e-30 relative error = 1.2548897506578058086284213981162e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.829 y[1] (analytic) = -15.935953017336641717097575050118 y[1] (numeric) = -15.93595301733664171709757505012 absolute error = 2e-30 relative error = 1.2550237803940625560875329754520e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.83 y[1] (analytic) = -15.934250802162828874318682129465 y[1] (numeric) = -15.934250802162828874318682129467 absolute error = 2e-30 relative error = 1.2551578513679041851929241665074e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.831 y[1] (analytic) = -15.932548426992083460838685129223 y[1] (numeric) = -15.932548426992083460838685129225 absolute error = 2e-30 relative error = 1.2552919635955447372693360256644e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=389.1MB, alloc=4.4MB, time=15.94 TOP MAIN SOLVE Loop x[1] = 0.832 y[1] (analytic) = -15.930845891837631331571955725565 y[1] (numeric) = -15.930845891837631331571955725568 absolute error = 3e-30 relative error = 1.8831391756398118323102865426350e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.833 y[1] (analytic) = -15.929143196712689923183857008955 y[1] (numeric) = -15.929143196712689923183857008957 absolute error = 2e-30 relative error = 1.2555603118771269546552948723785e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.834 y[1] (analytic) = -15.927440341630468261636788992056 y[1] (numeric) = -15.927440341630468261636788992059 absolute error = 3e-30 relative error = 1.8835418219453173503365719142547e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.835 y[1] (analytic) = -15.925737326604166969726839700369 y[1] (numeric) = -15.925737326604166969726839700372 absolute error = 3e-30 relative error = 1.8837432380530715125347566562277e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.836 y[1] (analytic) = -15.92403415164697827461105682512 y[1] (numeric) = -15.924034151646978274611056825123 absolute error = 3e-30 relative error = 1.8839447161633463328079257276503e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.837 y[1] (analytic) = -15.922330816772086015325354888846 y[1] (numeric) = -15.922330816772086015325354888849 absolute error = 3e-30 relative error = 1.8841462563005497237800089007816e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.838 y[1] (analytic) = -15.920627321992665650293072845019 y[1] (numeric) = -15.920627321992665650293072845022 absolute error = 3e-30 relative error = 1.8843478584891041058038817380720e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.839 y[1] (analytic) = -15.918923667321884264824197004062 y[1] (numeric) = -15.918923667321884264824197004066 absolute error = 4e-30 relative error = 2.5127326970045952217408138226706e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=392.9MB, alloc=4.4MB, time=16.10 x[1] = 0.84 y[1] (analytic) = -15.917219852772900578605264149177 y[1] (numeric) = -15.91721985277290057860526414918 absolute error = 3e-30 relative error = 1.8847512491180281191375028646737e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.841 y[1] (analytic) = -15.915515878358864953179959676511 y[1] (numeric) = -15.915515878358864953179959676514 absolute error = 3e-30 relative error = 1.8849530376073152139399743090380e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.842 y[1] (analytic) = -15.913811744092919399420425565429 y[1] (numeric) = -15.913811744092919399420425565432 absolute error = 3e-30 relative error = 1.8851548882457882455122325645964e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.843 y[1] (analytic) = -15.912107449988197584989292955878 y[1] (numeric) = -15.912107449988197584989292955881 absolute error = 3e-30 relative error = 1.8853568010579423131917918812622e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.844 y[1] (analytic) = -15.910402996057824841792454081182 y[1] (numeric) = -15.910402996057824841792454081185 absolute error = 3e-30 relative error = 1.8855587760682870802428213960394e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.845 y[1] (analytic) = -15.908698382314918173422588276 y[1] (numeric) = -15.908698382314918173422588276003 absolute error = 3e-30 relative error = 1.8857608133013467832533356380744e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.846 y[1] (analytic) = -15.906993608772586262593456750627 y[1] (numeric) = -15.90699360877258626259345675063 absolute error = 3e-30 relative error = 1.8859629127816602415412341485748e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.847 y[1] (analytic) = -15.905288675443929478564980794356 y[1] (numeric) = -15.905288675443929478564980794359 absolute error = 3e-30 relative error = 1.8861650745337808665691973380320e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=396.7MB, alloc=4.4MB, time=16.26 x[1] = 0.848 y[1] (analytic) = -15.903583582342039884559118042203 y[1] (numeric) = -15.903583582342039884559118042206 absolute error = 3e-30 relative error = 1.8863672985822766713684457141246e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.849 y[1] (analytic) = -15.901878329480001245166551410953 y[1] (numeric) = -15.901878329480001245166551410955 absolute error = 2e-30 relative error = 1.2577130566344868533142464164251e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.85 y[1] (analytic) = -15.900172916870889033744205282201 y[1] (numeric) = -15.900172916870889033744205282203 absolute error = 2e-30 relative error = 1.2578479557778259579020244471274e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.851 y[1] (analytic) = -15.898467344527770439803603481863 y[1] (numeric) = -15.898467344527770439803603481865 absolute error = 2e-30 relative error = 1.2579828965012763442543893043568e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.852 y[1] (analytic) = -15.896761612463704376390083577455 y[1] (numeric) = -15.896761612463704376390083577457 absolute error = 2e-30 relative error = 1.2581178788212556881850015687675e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.853 y[1] (analytic) = -15.895055720691741487452881986373 y[1] (numeric) = -15.895055720691741487452881986375 absolute error = 2e-30 relative error = 1.2582529027541914313878799759130e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.854 y[1] (analytic) = -15.893349669224924155206104360379 y[1] (numeric) = -15.893349669224924155206104360381 absolute error = 2e-30 relative error = 1.2583879683165207877554613274743e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.855 y[1] (analytic) = -15.891643458076286507480595683531 y[1] (numeric) = -15.891643458076286507480595683533 absolute error = 2e-30 relative error = 1.2585230755246907497026028101019e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=400.5MB, alloc=4.4MB, time=16.42 x[1] = 0.856 y[1] (analytic) = -15.889937087258854425066724492918 y[1] (numeric) = -15.889937087258854425066724492919 absolute error = 1e-30 relative error = 6.2932911219757904724826576800421e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.857 y[1] (analytic) = -15.888230556785645549048095603698 y[1] (numeric) = -15.8882305567856455490480956037 absolute error = 2e-30 relative error = 1.2587934149443893905927461267849e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.858 y[1] (analytic) = -15.886523866669669288126205692226 y[1] (numeric) = -15.886523866669669288126205692228 absolute error = 2e-30 relative error = 1.2589286471888610039768751692602e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.859 y[1] (analytic) = -15.884817016923926825936056063277 y[1] (numeric) = -15.884817016923926825936056063278 absolute error = 1e-30 relative error = 6.2953196057252955225624868978627e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.86 y[1] (analytic) = -15.883110007561411128352736899798 y[1] (numeric) = -15.883110007561411128352736899799 absolute error = 1e-30 relative error = 6.2959961841473983614746415948867e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.861 y[1] (analytic) = -15.881402838595106950788997266013 y[1] (numeric) = -15.881402838595106950788997266014 absolute error = 1e-30 relative error = 6.2966729712931425200548925613524e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.862 y[1] (analytic) = -15.879695510037990845483815107185 y[1] (numeric) = -15.879695510037990845483815107185 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.863 y[1] (analytic) = -15.877988021903031168781981461892 y[1] (numeric) = -15.877988021903031168781981461893 absolute error = 1e-30 relative error = 6.2980271720859163357452048980809e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.864 y[1] (analytic) = -15.876280374203188088404713075306 y[1] (numeric) = -15.876280374203188088404713075307 absolute error = 1e-30 relative error = 6.2987045858982496611183451997034e-30 % Correct digits = 31 h = 0.001 memory used=404.3MB, alloc=4.4MB, time=16.57 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.865 y[1] (analytic) = -15.874572566951413590711307574587 y[1] (numeric) = -15.874572566951413590711307574588 absolute error = 1e-30 relative error = 6.2993822087648317064927090850193e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.866 y[1] (analytic) = -15.87286460016065148795185534029 y[1] (numeric) = -15.87286460016065148795185534029 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.867 y[1] (analytic) = -15.871156473843837425511022180441 y[1] (numeric) = -15.871156473843837425511022180441 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.868 y[1] (analytic) = -15.869448188013898889142916886822 y[1] (numeric) = -15.869448188013898889142916886823 absolute error = 1e-30 relative error = 6.3014163325180653290243418459236e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.869 y[1] (analytic) = -15.867739742683755212197057725906 y[1] (numeric) = -15.867739742683755212197057725907 absolute error = 1e-30 relative error = 6.3020947924298839207616323315661e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.87 y[1] (analytic) = -15.866031137866317582835451889866 y[1] (numeric) = -15.866031137866317582835451889866 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.871 y[1] (analytic) = -15.864322373574489051240801906139 y[1] (numeric) = -15.864322373574489051240801906139 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.872 y[1] (analytic) = -15.862613449821164536815852977121 y[1] (numeric) = -15.862613449821164536815852977121 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=408.1MB, alloc=4.4MB, time=16.73 x[1] = 0.873 y[1] (analytic) = -15.860904366619230835373895194716 y[1] (numeric) = -15.860904366619230835373895194716 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.874 y[1] (analytic) = -15.85919512398156662632043454772 y[1] (numeric) = -15.85919512398156662632043454772 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.875 y[1] (analytic) = -15.857485721921042479826046613279 y[1] (numeric) = -15.85748572192104247982604661328 absolute error = 1e-30 relative error = 6.3061699536492207311940240913019e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.876 y[1] (analytic) = -15.855776160450520863990426797032 y[1] (numeric) = -15.855776160450520863990426797032 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.877 y[1] (analytic) = -15.854066439582856151997650959911 y[1] (numeric) = -15.854066439582856151997650959911 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.878 y[1] (analytic) = -15.852356559330894629262660243114 y[1] (numeric) = -15.852356559330894629262660243115 absolute error = 1e-30 relative error = 6.3082103676969563089847003982543e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.879 y[1] (analytic) = -15.850646519707474500568983876208 y[1] (numeric) = -15.850646519707474500568983876208 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.88 y[1] (analytic) = -15.848936320725425897197713726961 y[1] (numeric) = -15.848936320725425897197713726961 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=412.0MB, alloc=4.4MB, time=16.88 x[1] = 0.881 y[1] (analytic) = -15.847225962397570884047744325146 y[1] (numeric) = -15.847225962397570884047744325146 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.882 y[1] (analytic) = -15.845515444736723466747292066232 y[1] (numeric) = -15.845515444736723466747292066232 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.883 y[1] (analytic) = -15.84380476775568959875670727468 y[1] (numeric) = -15.84380476775568959875670727468 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.884 y[1] (analytic) = -15.842093931467267188462592780371 y[1] (numeric) = -15.842093931467267188462592780371 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.885 y[1] (analytic) = -15.840382935884246106263242635566 y[1] (numeric) = -15.840382935884246106263242635566 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.886 y[1] (analytic) = -15.838671781019408191645414573773 y[1] (numeric) = -15.838671781019408191645414573773 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.887 y[1] (analytic) = -15.836960466885527260252449785855 y[1] (numeric) = -15.836960466885527260252449785856 absolute error = 1e-30 relative error = 6.3143429706158664833366021935322e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.888 y[1] (analytic) = -15.835248993495369110943753562822 y[1] (numeric) = -15.835248993495369110943753562823 absolute error = 1e-30 relative error = 6.3150254246761076786682514754130e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=415.8MB, alloc=4.4MB, time=17.04 x[1] = 0.889 y[1] (analytic) = -15.833537360861691532845650328813 y[1] (numeric) = -15.833537360861691532845650328814 absolute error = 1e-30 relative error = 6.3157080897908594580221106151608e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.89 y[1] (analytic) = -15.831825568997244312393626562014 y[1] (numeric) = -15.831825568997244312393626562014 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.891 y[1] (analytic) = -15.830113617914769240365975075434 y[1] (numeric) = -15.830113617914769240365975075434 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.892 y[1] (analytic) = -15.828401507627000118908854103804 y[1] (numeric) = -15.828401507627000118908854103805 absolute error = 1e-30 relative error = 6.3177573523020921552157149832246e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.893 y[1] (analytic) = -15.826689238146662768552774617176 y[1] (numeric) = -15.826689238146662768552774617177 absolute error = 1e-30 relative error = 6.3184408624750505112667852606871e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.894 y[1] (analytic) = -15.824976809486475035220529256235 y[1] (numeric) = -15.824976809486475035220529256235 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.895 y[1] (analytic) = -15.823264221659146797226576258793 y[1] (numeric) = -15.823264221659146797226576258793 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.896 y[1] (analytic) = -15.821551474677379972267891721465 y[1] (numeric) = -15.821551474677379972267891721466 absolute error = 1e-30 relative error = 6.3204926621799027783369182582397e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.897 y[1] (analytic) = -15.819838568553868524406303515093 y[1] (numeric) = -15.819838568553868524406303515094 absolute error = 1e-30 relative error = 6.3211770187577364798372331747352e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=419.6MB, alloc=4.4MB, time=17.20 TOP MAIN SOLVE Loop x[1] = 0.898 y[1] (analytic) = -15.818125503301298471042320147138 y[1] (numeric) = -15.818125503301298471042320147139 absolute error = 1e-30 relative error = 6.3218615871475825633200666109149e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.899 y[1] (analytic) = -15.816412278932347889880467838958 y[1] (numeric) = -15.816412278932347889880467838958 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.9 y[1] (analytic) = -15.814698895459686925886149060624 y[1] (numeric) = -15.814698895459686925886149060625 absolute error = 1e-30 relative error = 6.3232313597010342076824053965805e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.901 y[1] (analytic) = -15.812985352895977798234035740763 y[1] (numeric) = -15.812985352895977798234035740764 absolute error = 1e-30 relative error = 6.3239165640336268339535360959445e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.902 y[1] (analytic) = -15.811271651253874807248010343743 y[1] (numeric) = -15.811271651253874807248010343744 absolute error = 1e-30 relative error = 6.3246019805162060390480899543074e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.903 y[1] (analytic) = -15.809557790546024341332667981489 y[1] (numeric) = -15.809557790546024341332667981489 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.904 y[1] (analytic) = -15.807843770785064883896392702147 y[1] (numeric) = -15.807843770785064883896392702147 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.905 y[1] (analytic) = -15.806129591983627020266021072888 y[1] (numeric) = -15.806129591983627020266021072888 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=423.4MB, alloc=4.4MB, time=17.36 x[1] = 0.906 y[1] (analytic) = -15.804415254154333444593106149205 y[1] (numeric) = -15.804415254154333444593106149206 absolute error = 1e-30 relative error = 6.3273457696395376509536954382306e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.907 y[1] (analytic) = -15.802700757309798966751794898222 y[1] (numeric) = -15.802700757309798966751794898222 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.908 y[1] (analytic) = -15.80098610146263051922833211872 y[1] (numeric) = -15.80098610146263051922833211872 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.909 y[1] (analytic) = -15.799271286625427164002203875868 y[1] (numeric) = -15.799271286625427164002203875869 absolute error = 1e-30 relative error = 6.3294058432082940090141609833655e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.91 y[1] (analytic) = -15.797556312810780099418933443933 y[1] (numeric) = -15.797556312810780099418933443933 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.911 y[1] (analytic) = -15.79584118003127266705454272561 y[1] (numeric) = -15.795841180031272667054542725611 absolute error = 1e-30 relative error = 6.3307802895877191654448035972857e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.912 y[1] (analytic) = -15.794125888299480358571692092085 y[1] (numeric) = -15.794125888299480358571692092086 absolute error = 1e-30 relative error = 6.3314678322325810844719697720178e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.913 y[1] (analytic) = -15.792410437627970822567511563345 y[1] (numeric) = -15.792410437627970822567511563345 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=427.2MB, alloc=4.4MB, time=17.52 x[1] = 0.914 y[1] (analytic) = -15.790694828029303871413136223849 y[1] (numeric) = -15.790694828029303871413136223849 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.915 y[1] (analytic) = -15.788979059516031488084958744236 y[1] (numeric) = -15.788979059516031488084958744237 absolute error = 1e-30 relative error = 6.3335317390094271194058494047953e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.916 y[1] (analytic) = -15.787263132100697832987611855378 y[1] (numeric) = -15.787263132100697832987611855378 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.917 y[1] (analytic) = -15.785547045795839250768693596796 y[1] (numeric) = -15.785547045795839250768693596796 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.918 y[1] (analytic) = -15.783830800613984277125248137223 y[1] (numeric) = -15.783830800613984277125248137222 absolute error = 1e-30 relative error = 6.3355975658399761044309509818432e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.919 y[1] (analytic) = -15.78211439656765364560201494086 y[1] (numeric) = -15.78211439656765364560201494086 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.92 y[1] (analytic) = -15.780397833669360294381459028789 y[1] (numeric) = -15.780397833669360294381459028789 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.921 y[1] (analytic) = -15.778681111931609373065595060851 y[1] (numeric) = -15.778681111931609373065595060851 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=431.0MB, alloc=4.4MB, time=17.67 x[1] = 0.922 y[1] (analytic) = -15.776964231366898249449617939342 y[1] (numeric) = -15.776964231366898249449617939341 absolute error = 1e-30 relative error = 6.3383549923492546104712539724135e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.923 y[1] (analytic) = -15.775247191987716516287352611823 y[1] (numeric) = -15.775247191987716516287352611822 absolute error = 1e-30 relative error = 6.3390448836066559149345545872608e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.924 y[1] (analytic) = -15.773529993806545998048535726482 y[1] (numeric) = -15.773529993806545998048535726482 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.925 y[1] (analytic) = -15.771812636835860757667941769561 y[1] (numeric) = -15.77181263683586075766794176956 absolute error = 1e-30 relative error = 6.3404253082771840821839217572517e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.926 y[1] (analytic) = -15.770095121088127103286366290565 y[1] (numeric) = -15.770095121088127103286366290564 absolute error = 1e-30 relative error = 6.3411158418618377989461100021507e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.927 y[1] (analytic) = -15.76837744657580359498347879722 y[1] (numeric) = -15.768377446575803594983478797218 absolute error = 2e-30 relative error = 1.2683613179454375798932174978951e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.928 y[1] (analytic) = -15.766659613311341051502557878383 y[1] (numeric) = -15.766659613311341051502557878381 absolute error = 2e-30 relative error = 1.2684995103918251900047618095847e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.929 y[1] (analytic) = -15.76494162130718255696712108951 y[1] (numeric) = -15.764941621307182556967121089508 absolute error = 2e-30 relative error = 1.2686377457287189667165623629908e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.93 y[1] (analytic) = -15.763223470575763467589462111621 y[1] (numeric) = -15.76322347057576346758946211162 absolute error = 1e-30 relative error = 6.3438801198665887837098435992103e-30 % Correct digits = 31 h = 0.001 memory used=434.8MB, alloc=4.4MB, time=17.83 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.931 y[1] (analytic) = -15.761505161129511418371107671191 y[1] (numeric) = -15.761505161129511418371107671189 absolute error = 2e-30 relative error = 1.2689143451428306837052278105112e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.932 y[1] (analytic) = -15.75978669298084632979520668485 y[1] (numeric) = -15.759786692980846329795206684848 absolute error = 2e-30 relative error = 1.2690527092544771549380741173003e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.933 y[1] (analytic) = -15.758068066142180414510864069381 y[1] (numeric) = -15.758068066142180414510864069379 absolute error = 2e-30 relative error = 1.2691911163254868682826602013110e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.934 y[1] (analytic) = -15.756349280625918184009431634032 y[1] (numeric) = -15.756349280625918184009431634031 absolute error = 1e-30 relative error = 6.3466478318654990945041648768803e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.935 y[1] (analytic) = -15.754630336444456455292768448884 y[1] (numeric) = -15.754630336444456455292768448882 absolute error = 2e-30 relative error = 1.2694680594145663060897611332929e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.936 y[1] (analytic) = -15.75291123361018435753348305966 y[1] (numeric) = -15.752911233610184357533483059658 absolute error = 2e-30 relative error = 1.2696065954671469401039191533806e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.937 y[1] (analytic) = -15.751191972135483338727169896172 y[1] (numeric) = -15.75119197213548333872716989617 absolute error = 2e-30 relative error = 1.2697451745481126489834333021597e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.938 y[1] (analytic) = -15.749472552032727172336652198355 y[1] (numeric) = -15.749472552032727172336652198353 absolute error = 2e-30 relative error = 1.2698837966747446853887950717462e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=438.7MB, alloc=4.4MB, time=17.99 x[1] = 0.939 y[1] (analytic) = -15.74775297331428196392824376075 y[1] (numeric) = -15.747752973314281963928243760747 absolute error = 3e-30 relative error = 1.9050336927965019501629212385165e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.94 y[1] (analytic) = -15.746033235992506157800041773156 y[1] (numeric) = -15.746033235992506157800041773154 absolute error = 2e-30 relative error = 1.2701611701341844155737497690238e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.941 y[1] (analytic) = -15.744313340079750543602263012194 y[1] (numeric) = -15.744313340079750543602263012192 absolute error = 2e-30 relative error = 1.2702999215016062993778256997735e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.942 y[1] (analytic) = -15.742593285588358262949635615462 y[1] (numeric) = -15.742593285588358262949635615461 absolute error = 1e-30 relative error = 6.3521935799196145223540066982120e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.943 y[1] (analytic) = -15.740873072530664816025858647107 y[1] (numeric) = -15.740873072530664816025858647106 absolute error = 1e-30 relative error = 6.3528877679923360467946869179490e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.944 y[1] (analytic) = -15.739152700918998068180141640682 y[1] (numeric) = -15.73915270091899806818014164068 absolute error = 2e-30 relative error = 1.2707164343625825583111617485034e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.945 y[1] (analytic) = -15.73743217076567825651583628237 y[1] (numeric) = -15.737432170765678256515836282368 absolute error = 2e-30 relative error = 1.2708553582936226682385078426685e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.946 y[1] (analytic) = -15.73571148208301799647117237485 y[1] (numeric) = -15.735711482083017996471172374848 absolute error = 2e-30 relative error = 1.2709943254089516355799640188160e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=442.5MB, alloc=4.4MB, time=18.14 x[1] = 0.947 y[1] (analytic) = -15.733990634883322288392110199349 y[1] (numeric) = -15.733990634883322288392110199347 absolute error = 2e-30 relative error = 1.2711333357259439431947397147197e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.948 y[1] (analytic) = -15.732269629178888524097321370741 y[1] (numeric) = -15.732269629178888524097321370739 absolute error = 2e-30 relative error = 1.2712723892619844672609537931682e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.949 y[1] (analytic) = -15.730548464982006493435310257926 y[1] (numeric) = -15.730548464982006493435310257925 absolute error = 1e-30 relative error = 6.3570574301723424209037530049642e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.95 y[1] (analytic) = -15.728827142304958390833688019132 y[1] (numeric) = -15.728827142304958390833688019131 absolute error = 1e-30 relative error = 6.3577531303040083874592463734942e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.951 y[1] (analytic) = -15.727105661160018821840611279243 y[1] (numeric) = -15.727105661160018821840611279241 absolute error = 2e-30 relative error = 1.2716898093584001447855318281212e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.952 y[1] (analytic) = -15.72538402155945480965839745379 y[1] (numeric) = -15.725384021559454809658397453788 absolute error = 2e-30 relative error = 1.2718290359446904046310755654004e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.953 y[1] (analytic) = -15.723662223515525801669328701796 y[1] (numeric) = -15.723662223515525801669328701795 absolute error = 1e-30 relative error = 6.3598415291855470175331768523075e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.954 y[1] (analytic) = -15.721940267040483675953656467273 y[1] (numeric) = -15.721940267040483675953656467272 absolute error = 1e-30 relative error = 6.3605380952655226136829071603492e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=446.3MB, alloc=4.4MB, time=18.30 x[1] = 0.955 y[1] (analytic) = -15.720218152146572747799818546847 y[1] (numeric) = -15.720218152146572747799818546846 absolute error = 1e-30 relative error = 6.3612348780506679271764898571755e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.956 y[1] (analytic) = -15.718495878846029776206880598703 y[1] (numeric) = -15.718495878846029776206880598701 absolute error = 2e-30 relative error = 1.2723863755256648634574485472386e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.957 y[1] (analytic) = -15.716773447151083970379213985784 y[1] (numeric) = -15.716773447151083970379213985782 absolute error = 2e-30 relative error = 1.2725258188171770843547135208722e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.958 y[1] (analytic) = -15.715050857073956996213421824018 y[1] (numeric) = -15.715050857073956996213421824016 absolute error = 2e-30 relative error = 1.2726653055021594383390052725913e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.959 y[1] (analytic) = -15.71332810862686298277752508418 y[1] (numeric) = -15.713328108626862982777525084179 absolute error = 1e-30 relative error = 6.3640241779905579262608338360667e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.96 y[1] (analytic) = -15.711605201822008528782420573926 y[1] (numeric) = -15.711605201822008528782420573924 absolute error = 2e-30 relative error = 1.2729444091225436615421590759203e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.961 y[1] (analytic) = -15.709882136671592709045622604477 y[1] (numeric) = -15.709882136671592709045622604476 absolute error = 1e-30 relative error = 6.3654201304648814362287173433150e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.962 y[1] (analytic) = -15.708158913187807080947300124468 y[1] (numeric) = -15.708158913187807080947300124466 absolute error = 2e-30 relative error = 1.2732236865269405729776636996092e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=450.1MB, alloc=4.4MB, time=18.45 x[1] = 0.963 y[1] (analytic) = -15.706435531382835690878621081473 y[1] (numeric) = -15.706435531382835690878621081472 absolute error = 1e-30 relative error = 6.3668169522098906346316705801512e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.964 y[1] (analytic) = -15.704711991268855080682415749905 y[1] (numeric) = -15.704711991268855080682415749903 absolute error = 2e-30 relative error = 1.2735031378556410618560392289742e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.965 y[1] (analytic) = -15.702988292858034294086170742037 y[1] (numeric) = -15.702988292858034294086170742036 absolute error = 1e-30 relative error = 6.3682146439274600105782519602284e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.966 y[1] (analytic) = -15.701264436162534883127365397206 y[1] (numeric) = -15.701264436162534883127365397205 absolute error = 1e-30 relative error = 6.3689138162455204532693262128737e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.967 y[1] (analytic) = -15.699540421194510914571162222395 y[1] (numeric) = -15.699540421194510914571162222393 absolute error = 2e-30 relative error = 1.2739226412640609960409755674443e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.968 y[1] (analytic) = -15.697816247966108976320463035768 y[1] (numeric) = -15.697816247966108976320463035766 absolute error = 2e-30 relative error = 1.2740625628479569194971692638239e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.969 y[1] (analytic) = -15.696091916489468183818342443036 y[1] (numeric) = -15.696091916489468183818342443035 absolute error = 1e-30 relative error = 6.3710126400919830096368603652678e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.97 y[1] (analytic) = -15.694367426776720186442870254929 y[1] (numeric) = -15.694367426776720186442870254927 absolute error = 2e-30 relative error = 1.2743425367929953309626347739172e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.971 y[1] (analytic) = -15.692642778839989173894334432471 y[1] (numeric) = -15.692642778839989173894334432469 absolute error = 2e-30 relative error = 1.2744825891893789480080715295552e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=453.9MB, alloc=4.4MB, time=18.61 TOP MAIN SOLVE Loop x[1] = 0.972 y[1] (analytic) = -15.690917972691391882574876125294 y[1] (numeric) = -15.690917972691391882574876125292 absolute error = 2e-30 relative error = 1.2746226852251838552973550902708e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.973 y[1] (analytic) = -15.689193008343037601960548346675 y[1] (numeric) = -15.689193008343037601960548346673 absolute error = 2e-30 relative error = 1.2747628249180570229537745625130e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.974 y[1] (analytic) = -15.687467885807028180965809807635 y[1] (numeric) = -15.687467885807028180965809807633 absolute error = 2e-30 relative error = 1.2749030082856559960578614623382e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.975 y[1] (analytic) = -15.685742605095458034300465411023 y[1] (numeric) = -15.68574260509545803430046541102 absolute error = 3e-30 relative error = 1.9125648530184733525823846695342e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.976 y[1] (analytic) = -15.684017166220414148819064885185 y[1] (numeric) = -15.684017166220414148819064885182 absolute error = 3e-30 relative error = 1.9127752591735716842537336818073e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.977 y[1] (analytic) = -15.682291569193976089862771015558 y[1] (numeric) = -15.682291569193976089862771015555 absolute error = 3e-30 relative error = 1.9129857309203129577365150109707e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.978 y[1] (analytic) = -15.680565814028216007593708911266 y[1] (numeric) = -15.680565814028216007593708911263 absolute error = 3e-30 relative error = 1.9131962682852470466067206111504e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.979 y[1] (analytic) = -15.67883990073519864332180772263 y[1] (numeric) = -15.678839900735198643321807722626 absolute error = 4e-30 relative error = 2.5512091617265863200419852102830e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=457.7MB, alloc=4.4MB, time=18.77 x[1] = 0.98 y[1] (analytic) = -15.677113829326981335824146204341 y[1] (numeric) = -15.677113829326981335824146204338 absolute error = 3e-30 relative error = 1.9136175399759727534298392398965e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.981 y[1] (analytic) = -15.675387599815614027656813497992 y[1] (numeric) = -15.675387599815614027656813497989 absolute error = 3e-30 relative error = 1.9138282743549437391433191103528e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.982 y[1] (analytic) = -15.67366121221313927145929648654 y[1] (numeric) = -15.673661212213139271459296486538 absolute error = 2e-30 relative error = 1.2760260496389775314110486104870e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.983 y[1] (analytic) = -15.671934666531592236251405052363 y[1] (numeric) = -15.67193466653159223625140505236 absolute error = 3e-30 relative error = 1.9142499403131699855878408446035e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.984 y[1] (analytic) = -15.670207962783000713722746549522 y[1] (numeric) = -15.670207962783000713722746549519 absolute error = 3e-30 relative error = 1.9144608719457003317893966411632e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.985 y[1] (analytic) = -15.668481100979385124514760780012 y[1] (numeric) = -15.668481100979385124514760780009 absolute error = 3e-30 relative error = 1.9146718693827188426579329452601e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.986 y[1] (analytic) = -15.666754081132758524495326742856 y[1] (numeric) = -15.666754081132758524495326742853 absolute error = 3e-30 relative error = 1.9148829326509030155549029315492e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.987 y[1] (analytic) = -15.665026903255126611025952404109 y[1] (numeric) = -15.665026903255126611025952404106 absolute error = 3e-30 relative error = 1.9150940617769463489968269826631e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=461.5MB, alloc=4.4MB, time=18.93 x[1] = 0.988 y[1] (analytic) = -15.663299567358487729221558715061 y[1] (numeric) = -15.663299567358487729221558715058 absolute error = 3e-30 relative error = 1.9153052567875583533955731435314e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.989 y[1] (analytic) = -15.661572073454832878202869085182 y[1] (numeric) = -15.661572073454832878202869085179 absolute error = 3e-30 relative error = 1.9155165177094645618086201161598e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.99 y[1] (analytic) = -15.659844421556145717341415495689 y[1] (numeric) = -15.659844421556145717341415495685 absolute error = 4e-30 relative error = 2.5543037927592087209324154218556e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.991 y[1] (analytic) = -15.658116611674402572497172418957 y[1] (numeric) = -15.658116611674402572497172418953 absolute error = 4e-30 relative error = 2.5545856498588558676094807018636e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.992 y[1] (analytic) = -15.656388643821572442248829688419 y[1] (numeric) = -15.656388643821572442248829688416 absolute error = 3e-30 relative error = 1.9161506962104443074278626888669e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.993 y[1] (analytic) = -15.654660518009617004116715443034 y[1] (numeric) = -15.65466051800961700411671544303 absolute error = 4e-30 relative error = 2.5551496280601379896054365348235e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.994 y[1] (analytic) = -15.652932234250490620778380249893 y[1] (numeric) = -15.65293223425049062077838024989 absolute error = 3e-30 relative error = 1.9165738119249252629252351795987e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.995 y[1] (analytic) = -15.651203792556140346276853488119 y[1] (numeric) = -15.651203792556140346276853488116 absolute error = 3e-30 relative error = 1.9167854688767315148381305775125e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=465.4MB, alloc=4.4MB, time=19.09 x[1] = 0.996 y[1] (analytic) = -15.64947519293850593222158305672 y[1] (numeric) = -15.649475192938505932221583056717 absolute error = 3e-30 relative error = 1.9169971919273602413672592505724e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.997 y[1] (analytic) = -15.647746435409519833982069448763 y[1] (numeric) = -15.64774643540951983398206944876 absolute error = 3e-30 relative error = 1.9172089811036655449452580781873e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.998 y[1] (analytic) = -15.646017519981107216874205213862 y[1] (numeric) = -15.646017519981107216874205213858 absolute error = 4e-30 relative error = 2.5565611152433568638045429462206e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 0.999 y[1] (analytic) = -15.644288446665185962339330810696 y[1] (numeric) = -15.644288446665185962339330810692 absolute error = 4e-30 relative error = 2.5568436772544038707629372231190e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1 y[1] (analytic) = -15.642559215473666674116017831062 y[1] (numeric) = -15.642559215473666674116017831058 absolute error = 4e-30 relative error = 2.5571263275405650735226802011036e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.001 y[1] (analytic) = -15.640829826418452684404590556727 y[1] (numeric) = -15.640829826418452684404590556724 absolute error = 3e-30 relative error = 1.9180567996032990010338036989891e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.002 y[1] (analytic) = -15.639100279511440060024396790236 y[1] (numeric) = -15.639100279511440060024396790233 absolute error = 3e-30 relative error = 1.9182689198113633010300068784530e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.003 y[1] (analytic) = -15.637370574764517608563838880694 y[1] (numeric) = -15.637370574764517608563838880691 absolute error = 3e-30 relative error = 1.9184811063065676896154366799770e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=469.2MB, alloc=4.4MB, time=19.25 x[1] = 1.004 y[1] (analytic) = -15.635640712189566884523175845501 y[1] (numeric) = -15.635640712189566884523175845498 absolute error = 3e-30 relative error = 1.9186933591158793363783643162336e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.005 y[1] (analytic) = -15.633910691798462195450107468975 y[1] (numeric) = -15.633910691798462195450107468971 absolute error = 4e-30 relative error = 2.5585409043550421425622668360172e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.006 y[1] (analytic) = -15.632180513603070608068151238833 y[1] (numeric) = -15.63218051360307060806815123883 absolute error = 3e-30 relative error = 1.9191180637847740737843118102091e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.007 y[1] (analytic) = -15.630450177615251954397822961583 y[1] (numeric) = -15.63045017761525195439782296158 absolute error = 3e-30 relative error = 1.9193305156983725273724849593564e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.008 y[1] (analytic) = -15.62871968384685883787063187794 y[1] (numeric) = -15.628719683846858837870631877937 absolute error = 3e-30 relative error = 1.9195430340341089869015349008940e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.009 y[1] (analytic) = -15.6269890323097366394359010796 y[1] (numeric) = -15.626989032309736639435901079597 absolute error = 3e-30 relative error = 1.9197556188190317113475788367522e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.01 y[1] (analytic) = -15.625258223015723523660424008836 y[1] (numeric) = -15.625258223015723523660424008833 absolute error = 3e-30 relative error = 1.9199682700802052104094773102916e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.011 y[1] (analytic) = -15.623527255976650444820967802669 y[1] (numeric) = -15.623527255976650444820967802666 absolute error = 3e-30 relative error = 1.9201809878447102554809540260642e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.012 y[1] (analytic) = -15.62179613120434115298963422361 y[1] (numeric) = -15.621796131204341152989634223608 absolute error = 2e-30 relative error = 1.2802625147597625937552687108828e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=473.0MB, alloc=4.4MB, time=19.40 TOP MAIN SOLVE Loop x[1] = 1.013 y[1] (analytic) = -15.620064848710612200112088899331 y[1] (numeric) = -15.620064848710612200112088899328 absolute error = 3e-30 relative error = 1.9206066229921194436058925596784e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.014 y[1] (analytic) = -15.618333408507272946078669573937 y[1] (numeric) = -15.618333408507272946078669573934 absolute error = 3e-30 relative error = 1.9208195404292665368128738697493e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.015 y[1] (analytic) = -15.616601810606125564788384053989 y[1] (numeric) = -15.616601810606125564788384053987 absolute error = 2e-30 relative error = 1.2806883496521540655680702561371e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.016 y[1] (analytic) = -15.614870055018965050205808512815 y[1] (numeric) = -15.614870055018965050205808512812 absolute error = 3e-30 relative error = 1.9212455751661753730302999970219e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.017 y[1] (analytic) = -15.613138141757579222410896797165 y[1] (numeric) = -15.613138141757579222410896797162 absolute error = 3e-30 relative error = 1.9214586925202779333960053893404e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.018 y[1] (analytic) = -15.611406070833748733641711360827 y[1] (numeric) = -15.611406070833748733641711360824 absolute error = 3e-30 relative error = 1.9216718765677336907832262268259e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.019 y[1] (analytic) = -15.609673842259247074330086430344 y[1] (numeric) = -15.609673842259247074330086430341 absolute error = 3e-30 relative error = 1.9218851273357539063652974039493e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.02 y[1] (analytic) = -15.60794145604584057913023398864 y[1] (numeric) = -15.607941456045840579130233988637 absolute error = 3e-30 relative error = 1.9220984448515662022190174781754e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=476.8MB, alloc=4.4MB, time=19.56 x[1] = 1.021 y[1] (analytic) = -15.606208912205288432940303142998 y[1] (numeric) = -15.606208912205288432940303142996 absolute error = 2e-30 relative error = 1.2815412194282763815993676330615e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.022 y[1] (analytic) = -15.604476210749342676916903424552 y[1] (numeric) = -15.604476210749342676916903424549 absolute error = 3e-30 relative error = 1.9225252802355593940226120540890e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.023 y[1] (analytic) = -15.602743351689748214482602547168 y[1] (numeric) = -15.602743351689748214482602547165 absolute error = 3e-30 relative error = 1.9227387981582774383644287507733e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.024 y[1] (analytic) = -15.601010335038242817326409134434 y[1] (numeric) = -15.601010335038242817326409134431 absolute error = 3e-30 relative error = 1.9229523829378618819620135969101e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.025 y[1] (analytic) = -15.599277160806557131397250904236 y[1] (numeric) = -15.599277160806557131397250904233 absolute error = 3e-30 relative error = 1.9231660346016223177312332162719e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.026 y[1] (analytic) = -15.59754382900641468289045878132 y[1] (numeric) = -15.597543829006414682890458781317 absolute error = 3e-30 relative error = 1.9233797531768847660921960794091e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.027 y[1] (analytic) = -15.595810339649531884227267389123 y[1] (numeric) = -15.59581033964953188422726738912 absolute error = 3e-30 relative error = 1.9235935386909916861054643269744e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.028 y[1] (analytic) = -15.594076692747618040027342353113 y[1] (numeric) = -15.59407669274761804002734235311 absolute error = 3e-30 relative error = 1.9238073911713019866185993798821e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=480.6MB, alloc=4.4MB, time=19.71 x[1] = 1.029 y[1] (analytic) = -15.592342888312375353074344828874 y[1] (numeric) = -15.592342888312375353074344828872 absolute error = 2e-30 relative error = 1.2826808737634606916153670618211e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.03 y[1] (analytic) = -15.590608926355498930274543649205 y[1] (numeric) = -15.590608926355498930274543649203 absolute error = 2e-30 relative error = 1.2828235314267004536142641463949e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.031 y[1] (analytic) = -15.588874806888676788608485465556 y[1] (numeric) = -15.588874806888676788608485465554 absolute error = 2e-30 relative error = 1.2829662337888594938699639826169e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.032 y[1] (analytic) = -15.587140529923589861075733240274 y[1] (numeric) = -15.587140529923589861075733240272 absolute error = 2e-30 relative error = 1.2831089808682210254944763180688e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.033 y[1] (analytic) = -15.585406095471912002632683427258 y[1] (numeric) = -15.585406095471912002632683427256 absolute error = 2e-30 relative error = 1.2832517726830792653831832684609e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.034 y[1] (analytic) = -15.583671503545309996123472159824 y[1] (numeric) = -15.583671503545309996123472159822 absolute error = 2e-30 relative error = 1.2833946092517394416873347575818e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.035 y[1] (analytic) = -15.581936754155443558203980745825 y[1] (numeric) = -15.581936754155443558203980745823 absolute error = 2e-30 relative error = 1.2835374905925178012934765227429e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.036 y[1] (analytic) = -15.580201847313965345258950751341 y[1] (numeric) = -15.580201847313965345258950751339 absolute error = 2e-30 relative error = 1.2836804167237416173098169159450e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=484.4MB, alloc=4.4MB, time=19.87 x[1] = 1.037 y[1] (analytic) = -15.578466783032520959312218935564 y[1] (numeric) = -15.578466783032520959312218935561 absolute error = 3e-30 relative error = 1.9257350814956237948393081092444e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.038 y[1] (analytic) = -15.576731561322748953930082280867 y[1] (numeric) = -15.576731561322748953930082280865 absolute error = 2e-30 relative error = 1.2839664034308898870810623633130e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.039 y[1] (analytic) = -15.574996182196280840117803343458 y[1] (numeric) = -15.574996182196280840117803343456 absolute error = 2e-30 relative error = 1.2841094640435240856352663796551e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.04 y[1] (analytic) = -15.573260645664741092209266131408 y[1] (numeric) = -15.573260645664741092209266131405 absolute error = 3e-30 relative error = 1.9263788542800348678295080893575e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.041 y[1] (analytic) = -15.571524951739747153749792698372 y[1] (numeric) = -15.571524951739747153749792698369 absolute error = 3e-30 relative error = 1.9265935798181548238843968257942e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.042 y[1] (analytic) = -15.569789100432909443372130622812 y[1] (numeric) = -15.569789100432909443372130622809 absolute error = 3e-30 relative error = 1.9268083727072363786794356448580e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.043 y[1] (analytic) = -15.568053091755831360665621524078 y[1] (numeric) = -15.568053091755831360665621524074 absolute error = 4e-30 relative error = 2.5693643106331820433440758084769e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.044 y[1] (analytic) = -15.566316925720109292038560748312 y[1] (numeric) = -15.566316925720109292038560748309 absolute error = 3e-30 relative error = 1.9272381606487289152084089290453e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=488.2MB, alloc=4.4MB, time=20.02 x[1] = 1.045 y[1] (analytic) = -15.564580602337332616573758338786 y[1] (numeric) = -15.564580602337332616573758338782 absolute error = 4e-30 relative error = 2.5699375410085383966493374435486e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.046 y[1] (analytic) = -15.562844121619083711877311386906 y[1] (numeric) = -15.562844121619083711877311386903 absolute error = 3e-30 relative error = 1.9276682183255681022528622302173e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.047 y[1] (analytic) = -15.561107483576937959920597841909 y[1] (numeric) = -15.561107483576937959920597841906 absolute error = 3e-30 relative error = 1.9278833483838954159621817567694e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.048 y[1] (analytic) = -15.559370688222463752875501838942 y[1] (numeric) = -15.559370688222463752875501838939 absolute error = 3e-30 relative error = 1.9280985459590759999735116338366e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.049 y[1] (analytic) = -15.55763373556722249894288058708 y[1] (numeric) = -15.557633735567222498942880587077 absolute error = 3e-30 relative error = 1.9283138110788168019134693814972e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.05 y[1] (analytic) = -15.555896625622768628174282840611 y[1] (numeric) = -15.555896625622768628174282840608 absolute error = 3e-30 relative error = 1.9285291437708414670529934031225e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.051 y[1] (analytic) = -15.554159358400649598286928958824 y[1] (numeric) = -15.554159358400649598286928958821 absolute error = 3e-30 relative error = 1.9287445440628903496941462306196e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.052 y[1] (analytic) = -15.552421933912405900471962541423 y[1] (numeric) = -15.55242193391240590047196254142 absolute error = 3e-30 relative error = 1.9289600119827205245674772309931e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.053 y[1] (analytic) = -15.550684352169571065195983608638 y[1] (numeric) = -15.550684352169571065195983608634 absolute error = 4e-30 relative error = 2.5722340634108077309866057839805e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=492.1MB, alloc=4.4MB, time=20.18 TOP MAIN SOLVE Loop x[1] = 1.054 y[1] (analytic) = -15.548946613183671667995873277088 y[1] (numeric) = -15.548946613183671667995873277085 absolute error = 3e-30 relative error = 1.9293911508168367205334743855117e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.055 y[1] (analytic) = -15.547208716966227335266919864496 y[1] (numeric) = -15.547208716966227335266919864492 absolute error = 4e-30 relative error = 2.5728090957156274612719488434402e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.056 y[1] (analytic) = -15.545470663528750750044256338358 y[1] (numeric) = -15.545470663528750750044256338355 absolute error = 3e-30 relative error = 1.9298225604955814951310640823764e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.057 y[1] (analytic) = -15.543732452882747657777619005858 y[1] (numeric) = -15.543732452882747657777619005855 absolute error = 3e-30 relative error = 1.9300383669712602662684572111820e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.058 y[1] (analytic) = -15.541994085039716872099437324351 y[1] (numeric) = -15.541994085039716872099437324348 absolute error = 3e-30 relative error = 1.9302542412416145466047647358188e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.059 y[1] (analytic) = -15.540255560011150280586264694014 y[1] (numeric) = -15.540255560011150280586264694011 absolute error = 3e-30 relative error = 1.9304701833345187738851060613234e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.06 y[1] (analytic) = -15.538516877808532850513560076403 y[1] (numeric) = -15.5385168778085328505135600764 absolute error = 3e-30 relative error = 1.9306861932778641978432800635993e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.061 y[1] (analytic) = -15.536778038443342634603830264944 y[1] (numeric) = -15.536778038443342634603830264941 absolute error = 3e-30 relative error = 1.9309022710995588916945948748437e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=495.9MB, alloc=4.4MB, time=20.34 x[1] = 1.062 y[1] (analytic) = -15.535039041927050776768142615661 y[1] (numeric) = -15.535039041927050776768142615658 absolute error = 3e-30 relative error = 1.9311184168275277636393533526044e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.063 y[1] (analytic) = -15.533299888271121517841018028777 y[1] (numeric) = -15.533299888271121517841018028773 absolute error = 4e-30 relative error = 2.5751128406529500911693385685333e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.064 y[1] (analytic) = -15.53156057748701220130871395418 y[1] (numeric) = -15.531560577487012201308713954176 absolute error = 4e-30 relative error = 2.5754012161520958915079553718999e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.065 y[1] (analytic) = -15.529821109586173279030907176161 y[1] (numeric) = -15.529821109586173279030907176157 absolute error = 4e-30 relative error = 2.5756896823047750622455244426125e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.066 y[1] (analytic) = -15.528081484580048316955786115255 y[1] (numeric) = -15.52808148458004831695578611525 absolute error = 5e-30 relative error = 3.2199727989353884432085400337013e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.067 y[1] (analytic) = -15.526341702480074000828562367497 y[1] (numeric) = -15.526341702480074000828562367493 absolute error = 4e-30 relative error = 2.5762668867200486432067937993586e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.068 y[1] (analytic) = -15.524601763297680141893411183938 y[1] (numeric) = -15.524601763297680141893411183934 absolute error = 4e-30 relative error = 2.5765556250573569418739529982874e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.069 y[1] (analytic) = -15.522861667044289682588850575772 y[1] (numeric) = -15.522861667044289682588850575768 absolute error = 4e-30 relative error = 2.5768444541976264186882769841946e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=499.7MB, alloc=4.4MB, time=20.50 x[1] = 1.07 y[1] (analytic) = -15.521121413731318702236568713069 y[1] (numeric) = -15.521121413731318702236568713065 absolute error = 4e-30 relative error = 2.5771333741782704116332652670954e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.071 y[1] (analytic) = -15.519381003370176422723709267685 y[1] (numeric) = -15.519381003370176422723709267681 absolute error = 4e-30 relative error = 2.5774223850367248440223820692194e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.072 y[1] (analytic) = -15.517640435972265214178624333617 y[1] (numeric) = -15.517640435972265214178624333613 absolute error = 4e-30 relative error = 2.5777114868104482399798265056225e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.073 y[1] (analytic) = -15.515899711548980600640104540739 y[1] (numeric) = -15.515899711548980600640104540734 absolute error = 5e-30 relative error = 3.2225008494211521749195668541191e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.074 y[1] (analytic) = -15.514158830111711265720095960619 y[1] (numeric) = -15.514158830111711265720095960615 absolute error = 4e-30 relative error = 2.5782899632536491161352584369234e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.075 y[1] (analytic) = -15.512417791671839058259913385874 y[1] (numeric) = -15.51241779167183905825991338587 absolute error = 4e-30 relative error = 2.5785793379981567881632390370951e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.076 y[1] (analytic) = -15.510676596240738997979959547317 y[1] (numeric) = -15.510676596240738997979959547312 absolute error = 5e-30 relative error = 3.2235860047599922981020587805224e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.077 y[1] (analytic) = -15.508935243829779281122959816015 y[1] (numeric) = -15.508935243829779281122959816011 absolute error = 4e-30 relative error = 2.5791583607207320279826433406766e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=503.5MB, alloc=4.4MB, time=20.66 x[1] = 1.078 y[1] (analytic) = -15.507193734450321286090721920267 y[1] (numeric) = -15.507193734450321286090721920263 absolute error = 4e-30 relative error = 2.5794480087739658115555697458623e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.079 y[1] (analytic) = -15.50545206811371957907443019037 y[1] (numeric) = -15.505452068113719579074430190366 absolute error = 4e-30 relative error = 2.5797377480053123536684501276218e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.08 y[1] (analytic) = -15.503710244831321919678483827077 y[1] (numeric) = -15.503710244831321919678483827074 absolute error = 3e-30 relative error = 1.9350206838393086579729510455482e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.081 y[1] (analytic) = -15.501968264614469266537888672577 y[1] (numeric) = -15.501968264614469266537888672574 absolute error = 3e-30 relative error = 1.9352381251146945096522753939629e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.082 y[1] (analytic) = -15.500226127474495782929211945871 y[1] (numeric) = -15.500226127474495782929211945868 absolute error = 3e-30 relative error = 1.9354556348584058604174907825442e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.083 y[1] (analytic) = -15.498483833422728842375109387497 y[1] (numeric) = -15.498483833422728842375109387494 absolute error = 3e-30 relative error = 1.9356732130987238294337141339744e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.084 y[1] (analytic) = -15.49674138247048903424243424163 y[1] (numeric) = -15.496741382470489034242434241627 absolute error = 3e-30 relative error = 1.9358908598639466266433855202162e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.085 y[1] (analytic) = -15.494998774629090169333937486717 y[1] (numeric) = -15.494998774629090169333937486714 absolute error = 3e-30 relative error = 1.9361085751823895645175365091917e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=507.3MB, alloc=4.4MB, time=20.81 x[1] = 1.086 y[1] (analytic) = -15.493256009909839285473568709004 y[1] (numeric) = -15.493256009909839285473568709 absolute error = 4e-30 relative error = 2.5817684787765134264239339843124e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.087 y[1] (analytic) = -15.491513088324036653085386996468 y[1] (numeric) = -15.491513088324036653085386996464 absolute error = 4e-30 relative error = 2.5820589487897102604936333013160e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.088 y[1] (analytic) = -15.489770009882975780766091213959 y[1] (numeric) = -15.489770009882975780766091213955 absolute error = 4e-30 relative error = 2.5823495103205988424636612637636e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.089 y[1] (analytic) = -15.488026774597943420851179003586 y[1] (numeric) = -15.488026774597943420851179003582 absolute error = 4e-30 relative error = 2.5826401634070242927554456177141e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.09 y[1] (analytic) = -15.486283382480219574974743837719 y[1] (numeric) = -15.486283382480219574974743837715 absolute error = 4e-30 relative error = 2.5829309080868546137217651966436e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.091 y[1] (analytic) = -15.484539833541077499622919435317 y[1] (numeric) = -15.484539833541077499622919435313 absolute error = 4e-30 relative error = 2.5832217443979807054024441224059e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.092 y[1] (analytic) = -15.482796127791783711680980835664 y[1] (numeric) = -15.482796127791783711680980835661 absolute error = 3e-30 relative error = 1.9376345042837372859709867528133e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.093 y[1] (analytic) = -15.481052265243597993974111407026 y[1] (numeric) = -15.481052265243597993974111407023 absolute error = 3e-30 relative error = 1.9378527690493487881033519416126e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.094 y[1] (analytic) = -15.47930824590777340080184505117 y[1] (numeric) = -15.479308245907773400801845051167 absolute error = 3e-30 relative error = 1.9380711026237898012848455094996e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=511.1MB, alloc=4.4MB, time=20.97 TOP MAIN SOLVE Loop x[1] = 1.095 y[1] (analytic) = -15.477564069795556263466192848203 y[1] (numeric) = -15.477564069795556263466192848199 absolute error = 4e-30 relative error = 2.5843860067140630826578324656062e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.096 y[1] (analytic) = -15.475819736918186195793463369665 y[1] (numeric) = -15.475819736918186195793463369661 absolute error = 4e-30 relative error = 2.5846773017508340522939577927185e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.097 y[1] (analytic) = -15.474075247286896099649785871417 y[1] (numeric) = -15.474075247286896099649785871413 absolute error = 4e-30 relative error = 2.5849686886467279284718882197296e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.098 y[1] (analytic) = -15.4723306009129121704503455614 y[1] (numeric) = -15.472330600912912170450345561397 absolute error = 3e-30 relative error = 1.9389451255798472530714140638145e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.099 y[1] (analytic) = -15.470585797807453902662340121012 y[1] (numeric) = -15.470585797807453902662340121009 absolute error = 3e-30 relative error = 1.9391638036260854472452378571221e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.1 y[1] (analytic) = -15.468840837981734095301666642466 y[1] (numeric) = -15.468840837981734095301666642463 absolute error = 3e-30 relative error = 1.9393825506523337968579482642324e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.101 y[1] (analytic) = -15.467095721446958857423348128227 y[1] (numeric) = -15.467095721446958857423348128224 absolute error = 3e-30 relative error = 1.9396013666871828619291398166546e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.102 y[1] (analytic) = -15.465350448214327613605708682313 y[1] (numeric) = -15.46535044821432761360570868231 absolute error = 3e-30 relative error = 1.9398202517592405064532435458550e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=515.0MB, alloc=4.4MB, time=21.13 x[1] = 1.103 y[1] (analytic) = -15.463605018295033109428306507031 y[1] (numeric) = -15.463605018295033109428306507028 absolute error = 3e-30 relative error = 1.9400392058971319103483936789807e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.104 y[1] (analytic) = -15.461859431700261416943633802505 y[1] (numeric) = -15.461859431700261416943633802502 absolute error = 3e-30 relative error = 1.9402582291294995814163685837968e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.105 y[1] (analytic) = -15.460113688441191940142592650179 y[1] (numeric) = -15.460113688441191940142592650176 absolute error = 3e-30 relative error = 1.9404773214850033673136162179292e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.106 y[1] (analytic) = -15.458367788528997420413755945353 y[1] (numeric) = -15.45836778852899742041375594535 absolute error = 3e-30 relative error = 1.9406964829923204675333743511588e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.107 y[1] (analytic) = -15.456621731974843941996422427685 y[1] (numeric) = -15.456621731974843941996422427682 absolute error = 3e-30 relative error = 1.9409157136801454453988958431862e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.108 y[1] (analytic) = -15.454875518789890937427474842551 y[1] (numeric) = -15.454875518789890937427474842549 absolute error = 2e-30 relative error = 1.2940900090514601600451928486441e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.109 y[1] (analytic) = -15.453129148985291192982050250092 y[1] (numeric) = -15.45312914898529119298205025009 absolute error = 2e-30 relative error = 1.2942362551414561190316568196084e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.11 y[1] (analytic) = -15.451382622572190854108031482786 y[1] (numeric) = -15.451382622572190854108031482783 absolute error = 3e-30 relative error = 1.9415738211138739877218385869885e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=518.8MB, alloc=4.4MB, time=21.29 x[1] = 1.111 y[1] (analytic) = -15.449635939561729430854368736422 y[1] (numeric) = -15.449635939561729430854368736419 absolute error = 3e-30 relative error = 1.9417933288110238063888771034161e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.112 y[1] (analytic) = -15.44788909996503980329324026341 y[1] (numeric) = -15.447889099965039803293240263407 absolute error = 3e-30 relative error = 1.9420129058324151973097066904909e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.113 y[1] (analytic) = -15.446142103793248226936061121443 y[1] (numeric) = -15.44614210379324822693606112144 absolute error = 3e-30 relative error = 1.9422325522068471592685837227361e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.114 y[1] (analytic) = -15.444394951057474338143348914698 y[1] (numeric) = -15.444394951057474338143348914694 absolute error = 4e-30 relative error = 2.5899363572841815188588863498676e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.115 y[1] (analytic) = -15.442647641768831159528455448879 y[1] (numeric) = -15.442647641768831159528455448876 absolute error = 3e-30 relative error = 1.9426720531301160439919440930946e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.116 y[1] (analytic) = -15.440900175938425105355173205655 y[1] (numeric) = -15.440900175938425105355173205652 absolute error = 3e-30 relative error = 1.9428919077366382531378894681469e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.117 y[1] (analytic) = -15.439152553577355986929225526217 y[1] (numeric) = -15.439152553577355986929225526214 absolute error = 3e-30 relative error = 1.9431118318115716302832864935922e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.118 y[1] (analytic) = -15.437404774696717017983649377997 y[1] (numeric) = -15.437404774696717017983649377994 absolute error = 3e-30 relative error = 1.9433318253838025356208020795131e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=522.6MB, alloc=4.4MB, time=21.44 x[1] = 1.119 y[1] (analytic) = -15.435656839307594820058079562858 y[1] (numeric) = -15.435656839307594820058079562856 absolute error = 2e-30 relative error = 1.2957012589881565586411849382068e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.12 y[1] (analytic) = -15.433908747421069427871943209398 y[1] (numeric) = -15.433908747421069427871943209396 absolute error = 2e-30 relative error = 1.2958480140905266179165072495532e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.121 y[1] (analytic) = -15.432160499048214294691573376372 y[1] (numeric) = -15.432160499048214294691573376369 absolute error = 3e-30 relative error = 1.9439922233734067248352914911469e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.122 y[1] (analytic) = -15.430412094200096297691250578638 y[1] (numeric) = -15.430412094200096297691250578635 absolute error = 3e-30 relative error = 1.9442124952240416993869432206922e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.123 y[1] (analytic) = -15.428663532887775743308181031461 y[1] (numeric) = -15.428663532887775743308181031459 absolute error = 2e-30 relative error = 1.2962885578111125835424271748693e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.124 y[1] (analytic) = -15.426914815122306372591420393453 y[1] (numeric) = -15.42691481512230637259142039345 absolute error = 3e-30 relative error = 1.9446532478802798468232572977100e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.125 y[1] (analytic) = -15.425165940914735366544751772923 y[1] (numeric) = -15.42516594091473536654475177292 absolute error = 3e-30 relative error = 1.9448737287438837897425047298703e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.126 y[1] (analytic) = -15.423416910276103351463526746972 y[1] (numeric) = -15.42341691027610335146352674697 absolute error = 2e-30 relative error = 1.2967295195576716491487513063672e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=526.4MB, alloc=4.4MB, time=21.60 x[1] = 1.127 y[1] (analytic) = -15.421667723217444404265478127161 y[1] (numeric) = -15.421667723217444404265478127159 absolute error = 2e-30 relative error = 1.2968765997914635163062711723125e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.128 y[1] (analytic) = -15.419918379749786057815513190213 y[1] (numeric) = -15.419918379749786057815513190211 absolute error = 2e-30 relative error = 1.2970237265500061239446645412092e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.129 y[1] (analytic) = -15.418168879884149306244496076834 y[1] (numeric) = -15.418168879884149306244496076832 absolute error = 2e-30 relative error = 1.2971708998526858883820570112951e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.13 y[1] (analytic) = -15.416419223631548610262028046354 y[1] (numeric) = -15.416419223631548610262028046351 absolute error = 3e-30 relative error = 1.9459771795783514816679081390499e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.131 y[1] (analytic) = -15.414669411002991902463234259614 y[1] (numeric) = -15.414669411002991902463234259611 absolute error = 3e-30 relative error = 1.9461980792520920554676139386309e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.132 y[1] (analytic) = -15.41291944200948059262956574722 y[1] (numeric) = -15.412919442009480592629565747217 absolute error = 3e-30 relative error = 1.9464190488293831435384998995912e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.133 y[1] (analytic) = -15.41116931666200957302362520503 y[1] (numeric) = -15.411169316662009573023625205028 absolute error = 2e-30 relative error = 1.2977600588929166766884144672692e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.134 y[1] (analytic) = -15.409419034971567223678025243545 y[1] (numeric) = -15.409419034971567223678025243542 absolute error = 3e-30 relative error = 1.9468611978112356309847925887750e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.135 y[1] (analytic) = -15.407668596949135417678287702645 y[1] (numeric) = -15.407668596949135417678287702643 absolute error = 2e-30 relative error = 1.2980549181827671044139872135771e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=530.2MB, alloc=4.4MB, time=21.76 x[1] = 1.136 y[1] (analytic) = -15.405918002605689526439792628017 y[1] (numeric) = -15.405918002605689526439792628014 absolute error = 3e-30 relative error = 1.9473036267573234736781163641975e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.137 y[1] (analytic) = -15.404167251952198424978785490411 y[1] (numeric) = -15.404167251952198424978785490408 absolute error = 3e-30 relative error = 1.9475249462899751927353175564944e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.138 y[1] (analytic) = -15.402416344999624497177451213865 y[1] (numeric) = -15.402416344999624497177451213862 absolute error = 3e-30 relative error = 1.9477463359013446655565484268189e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.139 y[1] (analytic) = -15.400665281758923641043063563889 y[1] (numeric) = -15.400665281758923641043063563887 absolute error = 2e-30 relative error = 1.2986451970804589982964782803429e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.14 y[1] (analytic) = -15.398914062241045273961218431626 y[1] (numeric) = -15.398914062241045273961218431624 absolute error = 2e-30 relative error = 1.2987928836515207064048188397396e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.141 y[1] (analytic) = -15.397162686456932337943159534978 y[1] (numeric) = -15.397162686456932337943159534976 absolute error = 2e-30 relative error = 1.2989406170002763343553291320081e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.142 y[1] (analytic) = -15.395411154417521304867205042736 y[1] (numeric) = -15.395411154417521304867205042733 absolute error = 3e-30 relative error = 1.9486325957193987633809229410054e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.143 y[1] (analytic) = -15.393659466133742181714283612788 y[1] (numeric) = -15.393659466133742181714283612785 absolute error = 3e-30 relative error = 1.9488543361635615883798935132563e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=534.0MB, alloc=4.4MB, time=21.91 x[1] = 1.144 y[1] (analytic) = -15.391907621616518515797588320612 y[1] (numeric) = -15.39190762161651851579758832061 absolute error = 2e-30 relative error = 1.2993840979081656901601455825063e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.145 y[1] (analytic) = -15.390155620876767399986356939344 y[1] (numeric) = -15.390155620876767399986356939342 absolute error = 2e-30 relative error = 1.2995320185632153270510793935828e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.146 y[1] (analytic) = -15.388403463925399477923787017887 y[1] (numeric) = -15.388403463925399477923787017885 absolute error = 2e-30 relative error = 1.2996799860937774542284772672354e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.147 y[1] (analytic) = -15.38665115077331894923909418872 y[1] (numeric) = -15.386651150773318949239094188718 absolute error = 2e-30 relative error = 1.2998280005194514581846970010131e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.148 y[1] (analytic) = -15.384898681431423574753722122265 y[1] (numeric) = -15.384898681431423574753722122263 absolute error = 2e-30 relative error = 1.2999760618598486355737449460232e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.149 y[1] (analytic) = -15.383146055910604681681712529919 y[1] (numeric) = -15.383146055910604681681712529917 absolute error = 2e-30 relative error = 1.3001241701345922015240132233169e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.15 y[1] (analytic) = -15.381393274221747168824243603155 y[1] (numeric) = -15.381393274221747168824243603153 absolute error = 2e-30 relative error = 1.3002723253633172979587238315061e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.151 y[1] (analytic) = -15.379640336375729511758345261375 y[1] (numeric) = -15.379640336375729511758345261373 absolute error = 2e-30 relative error = 1.3004205275656710019240869111821e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=537.8MB, alloc=4.4MB, time=22.07 x[1] = 1.152 y[1] (analytic) = -15.377887242383423768019799566563 y[1] (numeric) = -15.37788724238342376801979956656 absolute error = 3e-30 relative error = 1.9508531651419685008877706618935e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.153 y[1] (analytic) = -15.376133992255695582280234648126 y[1] (numeric) = -15.376133992255695582280234648124 absolute error = 2e-30 relative error = 1.3007170729699122662695586519660e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.154 y[1] (analytic) = -15.374380586003404191518420466755 y[1] (numeric) = -15.374380586003404191518420466753 absolute error = 2e-30 relative error = 1.3008654162111537314185964486901e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.155 y[1] (analytic) = -15.372627023637402430185774731501 y[1] (numeric) = -15.372627023637402430185774731499 absolute error = 2e-30 relative error = 1.3010138065047316303465771506565e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.156 y[1] (analytic) = -15.370873305168536735366087269789 y[1] (numeric) = -15.370873305168536735366087269787 absolute error = 2e-30 relative error = 1.3011622438703528409075308577911e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.157 y[1] (analytic) = -15.369119430607647151929471135534 y[1] (numeric) = -15.369119430607647151929471135531 absolute error = 3e-30 relative error = 1.9519660924916043393147461533705e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.158 y[1] (analytic) = -15.367365399965567337680548726057 y[1] (numeric) = -15.367365399965567337680548726055 absolute error = 2e-30 relative error = 1.3014592598966126429985547839345e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.159 y[1] (analytic) = -15.36561121325312456850088116407 y[1] (numeric) = -15.365611213253124568500881164068 absolute error = 2e-30 relative error = 1.3016078385967249500456197323835e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=541.7MB, alloc=4.4MB, time=22.22 x[1] = 1.16 y[1] (analytic) = -15.363856870481139743485649186523 y[1] (numeric) = -15.363856870481139743485649186521 absolute error = 2e-30 relative error = 1.3017564644478280165476955802440e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.161 y[1] (analytic) = -15.362102371660427390074593767777 y[1] (numeric) = -15.362102371660427390074593767775 absolute error = 2e-30 relative error = 1.3019051374696887305319069767114e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.162 y[1] (analytic) = -15.360347716801795669177224690168 y[1] (numeric) = -15.360347716801795669177224690166 absolute error = 2e-30 relative error = 1.3020538576820860072693295121612e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.163 y[1] (analytic) = -15.358592905916046380292305260697 y[1] (numeric) = -15.358592905916046380292305260695 absolute error = 2e-30 relative error = 1.3022026251048107976962880682834e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.164 y[1] (analytic) = -15.356837939013974966621621358289 y[1] (numeric) = -15.356837939013974966621621358286 absolute error = 3e-30 relative error = 1.9535271596364991452651969765413e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.165 y[1] (analytic) = -15.355082816106370520178042981788 y[1] (numeric) = -15.355082816106370520178042981786 absolute error = 2e-30 relative error = 1.3025003016604669522728231066909e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.166 y[1] (analytic) = -15.353327537204015786887886454614 y[1] (numeric) = -15.353327537204015786887886454611 absolute error = 3e-30 relative error = 1.9539738162495607087835371967890e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.167 y[1] (analytic) = -15.351572102317687171687585427764 y[1] (numeric) = -15.35157210231768717168758542776 absolute error = 4e-30 relative error = 2.6055963345904516711173519845864e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.168 memory used=545.5MB, alloc=4.4MB, time=22.38 y[1] (analytic) = -15.349816511458154743614678808713 y[1] (numeric) = -15.349816511458154743614678808709 absolute error = 4e-30 relative error = 2.6058943421337485944748287884740e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.169 y[1] (analytic) = -15.348060764636182240893123729554 y[1] (numeric) = -15.348060764636182240893123729551 absolute error = 3e-30 relative error = 1.9546443332517737996572633860661e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.17 y[1] (analytic) = -15.346304861862527076012941653629 y[1] (numeric) = -15.346304861862527076012941653625 absolute error = 4e-30 relative error = 2.6064906412360519604146270568301e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.171 y[1] (analytic) = -15.34454880314794034080420570577 y[1] (numeric) = -15.344548803147940340804205705766 absolute error = 4e-30 relative error = 2.6067889328745843578171649599588e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.172 y[1] (analytic) = -15.342792588503166811505377297255 y[1] (numeric) = -15.342792588503166811505377297251 absolute error = 4e-30 relative error = 2.6070873192910948960966426027594e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.173 y[1] (analytic) = -15.341036217938944953826000102474 y[1] (numeric) = -15.341036217938944953826000102471 absolute error = 3e-30 relative error = 1.9555393503940553401627711882048e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.174 y[1] (analytic) = -15.339279691466006928003759430347 y[1] (numeric) = -15.339279691466006928003759430344 absolute error = 3e-30 relative error = 1.9557632824630266245816024695407e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.175 y[1] (analytic) = -15.337523009095078593855915019513 y[1] (numeric) = -15.33752300909507859385591501951 absolute error = 3e-30 relative error = 1.9559872857051390832749757387687e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.176 y[1] (analytic) = -15.335766170836879515825115272389 y[1] (numeric) = -15.335766170836879515825115272387 absolute error = 2e-30 relative error = 1.3041409067668766619814215295600e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=549.3MB, alloc=4.4MB, time=22.54 x[1] = 1.177 y[1] (analytic) = -15.334009176702122968019600929247 y[1] (numeric) = -15.334009176702122968019600929245 absolute error = 2e-30 relative error = 1.3042903372189965746550112770328e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.178 y[1] (analytic) = -15.33225202670151593924780616956 y[1] (numeric) = -15.332252026701515939247806169558 absolute error = 2e-30 relative error = 1.3044398151797582953364072996508e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.179 y[1] (analytic) = -15.330494720845759138047365114031 y[1] (numeric) = -15.330494720845759138047365114029 absolute error = 2e-30 relative error = 1.3045893406691464972977651103725e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.18 y[1] (analytic) = -15.328737259145546997708531686831 y[1] (numeric) = -15.32873725914554699770853168683 absolute error = 1e-30 relative error = 6.5236945685357901691974039945175e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.181 y[1] (analytic) = -15.326979641611567681292020783813 y[1] (numeric) = -15.326979641611567681292020783811 absolute error = 2e-30 relative error = 1.3048885343138019468532002759050e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.182 y[1] (analytic) = -15.325221868254503086641278678627 y[1] (numeric) = -15.325221868254503086641278678624 absolute error = 3e-30 relative error = 1.9575573037636492130891590495278e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.183 y[1] (analytic) = -15.32346393908502885138919058497 y[1] (numeric) = -15.323463939085028851389190584968 absolute error = 2e-30 relative error = 1.3051879183130840642531556620467e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.184 y[1] (analytic) = -15.321705854113814357959233279432 y[1] (numeric) = -15.321705854113814357959233279429 absolute error = 3e-30 relative error = 1.9580065226187020588359195797911e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=553.1MB, alloc=4.4MB, time=22.70 x[1] = 1.185 y[1] (analytic) = -15.319947613351522738561080675699 y[1] (numeric) = -15.319947613351522738561080675696 absolute error = 3e-30 relative error = 1.9582312392409639235263198032813e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.186 y[1] (analytic) = -15.318189216808810880180670227252 y[1] (numeric) = -15.318189216808810880180670227249 absolute error = 3e-30 relative error = 1.9584560273665168608079523490166e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.187 y[1] (analytic) = -15.316430664496329429564738021994 y[1] (numeric) = -15.316430664496329429564738021992 absolute error = 2e-30 relative error = 1.3057872580169896008282889169278e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.188 y[1] (analytic) = -15.314671956424722798199830418673 y[1] (numeric) = -15.314671956424722798199830418671 absolute error = 2e-30 relative error = 1.3059372121653389656827626544043e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.189 y[1] (analytic) = -15.312913092604629167285800061344 y[1] (numeric) = -15.312913092604629167285800061342 absolute error = 2e-30 relative error = 1.3060872140428328616135955445066e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.19 y[1] (analytic) = -15.311154073046680492703794094593 y[1] (numeric) = -15.311154073046680492703794094592 absolute error = 1e-30 relative error = 6.5311863183479520724119643315229e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.191 y[1] (analytic) = -15.309394897761502509978742388674 y[1] (numeric) = -15.309394897761502509978742388672 absolute error = 2e-30 relative error = 1.3063873610657430248102856214641e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.192 y[1] (analytic) = -15.307635566759714739236353570229 y[1] (numeric) = -15.307635566759714739236353570227 absolute error = 2e-30 relative error = 1.3065375062514343764287441398639e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=556.9MB, alloc=4.4MB, time=22.86 x[1] = 1.193 y[1] (analytic) = -15.305876080051930490154626640791 y[1] (numeric) = -15.305876080051930490154626640789 absolute error = 2e-30 relative error = 1.3066876992468204451384197574037e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.194 y[1] (analytic) = -15.304116437648756866909885951797 y[1] (numeric) = -15.304116437648756866909885951795 absolute error = 2e-30 relative error = 1.3068379400720695073760222521831e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.195 y[1] (analytic) = -15.302356639560794773117347291436 y[1] (numeric) = -15.302356639560794773117347291434 absolute error = 2e-30 relative error = 1.3069882287473621488892407352540e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.196 y[1] (analytic) = -15.300596685798638916766222825255 y[1] (numeric) = -15.300596685798638916766222825253 absolute error = 2e-30 relative error = 1.3071385652928912734197157021783e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.197 y[1] (analytic) = -15.298836576372877815149372619082 y[1] (numeric) = -15.29883657637287781514937261908 absolute error = 2e-30 relative error = 1.3072889497288621113940699616732e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.198 y[1] (analytic) = -15.297076311294093799787510459484 y[1] (numeric) = -15.297076311294093799787510459483 absolute error = 1e-30 relative error = 6.5371969103774611431150308383800e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.199 y[1] (analytic) = -15.295315890572863021347971673668 y[1] (numeric) = -15.295315890572863021347971673667 absolute error = 1e-30 relative error = 6.5379493117650576750423934561619e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.2 y[1] (analytic) = -15.293555314219755454558050637434 y[1] (numeric) = -15.293555314219755454558050637432 absolute error = 2e-30 relative error = 1.3077403905816622932589475786891e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=560.7MB, alloc=4.4MB, time=23.02 x[1] = 1.201 y[1] (analytic) = -15.291794582245334903112915646559 y[1] (numeric) = -15.291794582245334903112915646557 absolute error = 2e-30 relative error = 1.3078909667816991276127223527602e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.202 y[1] (analytic) = -15.290033694660159004578108813735 y[1] (numeric) = -15.290033694660159004578108813733 absolute error = 2e-30 relative error = 1.3080415909733890325694034231394e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.203 y[1] (analytic) = -15.288272651474779235286638639981 y[1] (numeric) = -15.288272651474779235286638639979 absolute error = 2e-30 relative error = 1.3081922631770113816294288834431e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.204 y[1] (analytic) = -15.286511452699740915230672896286 y[1] (numeric) = -15.286511452699740915230672896285 absolute error = 1e-30 relative error = 6.5417149170642896802086724069625e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.205 y[1] (analytic) = -15.284750098345583212947839438087 y[1] (numeric) = -15.284750098345583212947839438085 absolute error = 2e-30 relative error = 1.3084937517012328535595345592777e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.206 y[1] (analytic) = -15.282988588422839150402142562033 y[1] (numeric) = -15.282988588422839150402142562031 absolute error = 2e-30 relative error = 1.3086445680624526972042317718969e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.207 y[1] (analytic) = -15.281226922942035607859502501444 y[1] (numeric) = -15.281226922942035607859502501442 absolute error = 2e-30 relative error = 1.3087954325168464440374633993174e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.208 y[1] (analytic) = -15.279465101913693328757925643744 y[1] (numeric) = -15.279465101913693328757925643742 absolute error = 2e-30 relative error = 1.3089463450847554939412920819793e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.209 y[1] (analytic) = -15.277703125348326924572313040144 y[1] (numeric) = -15.277703125348326924572313040141 memory used=564.5MB, alloc=4.4MB, time=23.18 absolute error = 3e-30 relative error = 1.9636459586798005176098232237635e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.21 y[1] (analytic) = -15.275940993256444879673914764813 y[1] (numeric) = -15.27594099325644487967391476481 absolute error = 3e-30 relative error = 1.9638724719638209039940040832044e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.211 y[1] (analytic) = -15.274178705648549556184437667802 y[1] (numeric) = -15.274178705648549556184437667799 absolute error = 3e-30 relative error = 1.9640990575097624817235481747176e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.212 y[1] (analytic) = -15.272416262535137198824814052988 y[1] (numeric) = -15.272416262535137198824814052986 absolute error = 2e-30 relative error = 1.3095504768988080129944714123418e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.213 y[1] (analytic) = -15.270653663926697939758638799411 y[1] (numeric) = -15.270653663926697939758638799408 absolute error = 3e-30 relative error = 1.9645524455097749862574626061205e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.214 y[1] (analytic) = -15.268890909833715803430282431419 y[1] (numeric) = -15.268890909833715803430282431416 absolute error = 3e-30 relative error = 1.9647792480250755644893597274423e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.215 y[1] (analytic) = -15.267128000266668711397687630194 y[1] (numeric) = -15.267128000266668711397687630192 absolute error = 2e-30 relative error = 1.3100040819498377756144263659034e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.216 y[1] (analytic) = -15.265364935236028487159856666335 y[1] (numeric) = -15.265364935236028487159856666333 absolute error = 2e-30 relative error = 1.3101553801596532882151218708801e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.217 y[1] (analytic) = -15.263601714752260860979037220352 y[1] (numeric) = -15.26360171475226086097903722035 absolute error = 2e-30 relative error = 1.3103067266666171825171843952312e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=568.4MB, alloc=4.4MB, time=23.34 x[1] = 1.218 y[1] (analytic) = -15.26183833882582547469761404514 y[1] (numeric) = -15.261838338825825474697614045138 absolute error = 2e-30 relative error = 1.3104581214911955713148106233971e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.219 y[1] (analytic) = -15.260074807467175886549713911675 y[1] (numeric) = -15.260074807467175886549713911673 absolute error = 2e-30 relative error = 1.3106095646538670873445014462359e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.22 y[1] (analytic) = -15.25831112068675957596753126646 y[1] (numeric) = -15.258311120686759575967531266458 absolute error = 2e-30 relative error = 1.3107610561751228921636000283823e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.221 y[1] (analytic) = -15.256547278495017948382382016494 y[1] (numeric) = -15.256547278495017948382382016492 absolute error = 2e-30 relative error = 1.3109125960754666850370769864366e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.222 y[1] (analytic) = -15.25478328090238634002049284484 y[1] (numeric) = -15.254783280902386340020492844838 absolute error = 2e-30 relative error = 1.3110641843754147118325706490995e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.223 y[1] (analytic) = -15.253019127919294022693533447192 y[1] (numeric) = -15.253019127919294022693533447189 absolute error = 3e-30 relative error = 1.9668237316432436608855355710742e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.224 y[1] (analytic) = -15.251254819556164208583899067171 y[1] (numeric) = -15.251254819556164208583899067168 absolute error = 3e-30 relative error = 1.9670512593843768556523864400767e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.225 y[1] (analytic) = -15.249490355823414055024750695493 y[1] (numeric) = -15.249490355823414055024750695491 absolute error = 2e-30 relative error = 1.3115192398782350404948260164806e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=572.2MB, alloc=4.4MB, time=23.49 x[1] = 1.226 y[1] (analytic) = -15.247725736731454669274820285489 y[1] (numeric) = -15.247725736731454669274820285487 absolute error = 2e-30 relative error = 1.3116710219820137054974885361725e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.227 y[1] (analytic) = -15.245960962290691113287988324933 y[1] (numeric) = -15.245960962290691113287988324931 absolute error = 2e-30 relative error = 1.3118228525881663447056464612180e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.228 y[1] (analytic) = -15.244196032511522408477641091562 y[1] (numeric) = -15.244196032511522408477641091559 absolute error = 3e-30 relative error = 1.9679620975759270062931221226157e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.229 y[1] (analytic) = -15.242430947404341540475814907136 y[1] (numeric) = -15.242430947404341540475814907134 absolute error = 2e-30 relative error = 1.3121266593899730058093385981265e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.23 y[1] (analytic) = -15.240665706979535463887134692415 y[1] (numeric) = -15.240665706979535463887134692412 absolute error = 3e-30 relative error = 1.9684179534402724341766438612726e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.231 y[1] (analytic) = -15.238900311247485107037554112904 y[1] (numeric) = -15.238900311247485107037554112901 absolute error = 3e-30 relative error = 1.9686459906728101330827905189793e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.232 y[1] (analytic) = -15.237134760218565376717904592836 y[1] (numeric) = -15.237134760218565376717904592833 absolute error = 3e-30 relative error = 1.9688741008135359098474996921458e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.233 y[1] (analytic) = -15.235369053903145162922260462367 y[1] (numeric) = -15.235369053903145162922260462364 absolute error = 3e-30 relative error = 1.9691022838934320363786773541164e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=576.0MB, alloc=4.4MB, time=23.65 x[1] = 1.234 y[1] (analytic) = -15.233603192311587343581127490609 y[1] (numeric) = -15.233603192311587343581127490606 absolute error = 3e-30 relative error = 1.9693305399434997655691737820519e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.235 y[1] (analytic) = -15.23183717545424878928946204472 y[1] (numeric) = -15.231837175454248789289462044717 absolute error = 3e-30 relative error = 1.9695588689947593448014131875633e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.236 y[1] (analytic) = -15.23007100334148036802952810294 y[1] (numeric) = -15.230071003341480368029528102937 absolute error = 3e-30 relative error = 1.9697872710782500294645750012221e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.237 y[1] (analytic) = -15.228304675983626949888599337123 y[1] (numeric) = -15.22830467598362694988859933712 absolute error = 3e-30 relative error = 1.9700157462250300964843390022694e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.238 y[1] (analytic) = -15.226538193391027411771513468016 y[1] (numeric) = -15.226538193391027411771513468013 absolute error = 3e-30 relative error = 1.9702442944661768578652065006342e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.239 y[1] (analytic) = -15.224771555574014642108086084274 y[1] (numeric) = -15.224771555574014642108086084271 absolute error = 3e-30 relative error = 1.9704729158327866742454097941754e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.24 y[1] (analytic) = -15.223004762542915545555391103922 y[1] (numeric) = -15.223004762542915545555391103919 absolute error = 3e-30 relative error = 1.9707016103559749684644221398893e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.241 y[1] (analytic) = -15.221237814308051047694915044781 y[1] (numeric) = -15.221237814308051047694915044778 absolute error = 3e-30 relative error = 1.9709303780668762391430804936623e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=579.8MB, alloc=4.4MB, time=23.80 x[1] = 1.242 y[1] (analytic) = -15.219470710879736099724592258143 y[1] (numeric) = -15.219470710879736099724592258139 absolute error = 4e-30 relative error = 2.6282122919955254323684443853525e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.243 y[1] (analytic) = -15.217703452268279683145728267817 y[1] (numeric) = -15.217703452268279683145728267813 absolute error = 4e-30 relative error = 2.6285175109019348864515007215417e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.244 y[1] (analytic) = -15.215936038483984814444818344523 y[1] (numeric) = -15.21593603848398481444481834452 absolute error = 3e-30 relative error = 1.9716171206374893184019335785782e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.245 y[1] (analytic) = -15.214168469537148549770268433466 y[1] (numeric) = -15.214168469537148549770268433462 absolute error = 4e-30 relative error = 2.6291282418812926303552822937460e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.246 y[1] (analytic) = -15.212400745438061989604025540811 y[1] (numeric) = -15.212400745438061989604025540807 absolute error = 4e-30 relative error = 2.6294337540374956128053509772278e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.247 y[1] (analytic) = -15.210632866197010283428124672747 y[1] (numeric) = -15.210632866197010283428124672743 absolute error = 4e-30 relative error = 2.6297393640269270241520638897207e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.248 y[1] (analytic) = -15.208864831824272634386159408699 y[1] (numeric) = -15.208864831824272634386159408695 absolute error = 4e-30 relative error = 2.6300450718912780782565849215151e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.249 y[1] (analytic) = -15.207096642330122303939683178285 y[1] (numeric) = -15.207096642330122303939683178281 absolute error = 4e-30 relative error = 2.6303508776722655688172527323943e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.25 y[1] (analytic) = -15.205328297724826616519548299562 y[1] (numeric) = -15.205328297724826616519548299558 absolute error = 4e-30 relative error = 2.6306567814116318876285030663379e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=583.6MB, alloc=4.4MB, time=23.96 TOP MAIN SOLVE Loop x[1] = 1.251 y[1] (analytic) = -15.203559798018646964172189824141 y[1] (numeric) = -15.203559798018646964172189824136 absolute error = 5e-30 relative error = 3.2887034789389313035709658157319e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.252 y[1] (analytic) = -15.201791143221838811200861222783 y[1] (numeric) = -15.201791143221838811200861222779 absolute error = 4e-30 relative error = 2.6312688829325986773334012664894e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.253 y[1] (analytic) = -15.200022333344651698801828933174 y[1] (numeric) = -15.200022333344651698801828933169 absolute error = 5e-30 relative error = 3.2894688509972651085806856812509e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.254 y[1] (analytic) = -15.198253368397329249695532779616 y[1] (numeric) = -15.198253368397329249695532779611 absolute error = 5e-30 relative error = 3.2898517209857877981976777163600e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.255 y[1] (analytic) = -15.196484248390109172752719262556 y[1] (numeric) = -15.19648424839010917275271926255 absolute error = 6e-30 relative error = 3.9482816564203856837518111182664e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.256 y[1] (analytic) = -15.19471497333322326761555470393 y[1] (numeric) = -15.194714973333223267615554703925 absolute error = 5e-30 relative error = 3.2906178291432363793178266206866e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.257 y[1] (analytic) = -15.192945543236897429313725222543 y[1] (numeric) = -15.192945543236897429313725222538 absolute error = 5e-30 relative error = 3.2910010674169353407034852230737e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.258 y[1] (analytic) = -15.191175958111351652875530501799 y[1] (numeric) = -15.191175958111351652875530501794 absolute error = 5e-30 relative error = 3.2913844285571864155239333220691e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=587.4MB, alloc=4.4MB, time=24.12 x[1] = 1.259 y[1] (analytic) = -15.189406217966800037933978300391 y[1] (numeric) = -15.189406217966800037933978300385 absolute error = 6e-30 relative error = 3.9501214951397479232123869287720e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.26 y[1] (analytic) = -15.187636322813450793327886644722 y[1] (numeric) = -15.187636322813450793327886644717 absolute error = 5e-30 relative error = 3.2921515196472451280880322395303e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.261 y[1] (analytic) = -15.185866272661506241698000630134 y[1] (numeric) = -15.185866272661506241698000630129 absolute error = 5e-30 relative error = 3.2925352497020834677682974078239e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.262 y[1] (analytic) = -15.184096067521162824078130746246 y[1] (numeric) = -15.18409606752116282407813074624 absolute error = 6e-30 relative error = 3.9515029234002424450735490787805e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.263 y[1] (analytic) = -15.18232570740261110448131963006 y[1] (numeric) = -15.182325707402611104481319630055 absolute error = 5e-30 relative error = 3.2933030790941968829106845252897e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.264 y[1] (analytic) = -15.180555192316035774481044138789 y[1] (numeric) = -15.180555192316035774481044138783 absolute error = 6e-30 relative error = 3.9524246142440356423796495410936e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.265 y[1] (analytic) = -15.178784522271615657787459622684 y[1] (numeric) = -15.178784522271615657787459622679 absolute error = 5e-30 relative error = 3.2940714012136945354787271509206e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.266 y[1] (analytic) = -15.17701369727952371481869326658 y[1] (numeric) = -15.177013697279523714818693266575 absolute error = 5e-30 relative error = 3.2944557471778844564643634307452e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=591.2MB, alloc=4.4MB, time=24.27 x[1] = 1.267 y[1] (analytic) = -15.175242717349927047267193357186 y[1] (numeric) = -15.175242717349927047267193357181 absolute error = 5e-30 relative error = 3.2948402164819915935601741278003e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.268 y[1] (analytic) = -15.17347158249298690266114132164 y[1] (numeric) = -15.173471582492986902661141321636 absolute error = 4e-30 relative error = 2.6361798473430190566524662487473e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.269 y[1] (analytic) = -15.171700292718858678920933371242 y[1] (numeric) = -15.171700292718858678920933371238 absolute error = 4e-30 relative error = 2.6364876202568171580851307898279e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.27 y[1] (analytic) = -15.16992884803769192891073857275 y[1] (numeric) = -15.169928848037691928910738572746 absolute error = 4e-30 relative error = 2.6367954919692457935096400161011e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.271 y[1] (analytic) = -15.168157248459630364985140158134 y[1] (numeric) = -15.168157248459630364985140158129 absolute error = 5e-30 relative error = 3.2963793281532364534642419886198e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.272 y[1] (analytic) = -15.166385493994811863530866872157 y[1] (numeric) = -15.166385493994811863530866872152 absolute error = 5e-30 relative error = 3.2967644149489468372925782477803e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.273 y[1] (analytic) = -15.164613584653368469503621145721 y[1] (numeric) = -15.164613584653368469503621145717 absolute error = 4e-30 relative error = 2.6377197003212869414333195794934e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.274 y[1] (analytic) = -15.162841520445426400960010871435 y[1] (numeric) = -15.16284152044542640096001087143 absolute error = 5e-30 relative error = 3.2975349595641748071849210118597e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=595.1MB, alloc=4.4MB, time=24.43 x[1] = 1.275 y[1] (analytic) = -15.161069301381106053584591546461 y[1] (numeric) = -15.161069301381106053584591546457 absolute error = 4e-30 relative error = 2.6383363339917045110882698841286e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.276 y[1] (analytic) = -15.159296927470522005212025536313 y[1] (numeric) = -15.159296927470522005212025536308 absolute error = 5e-30 relative error = 3.2983059992309941807526796431565e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.277 y[1] (analytic) = -15.157524398723783020344365201843 y[1] (numeric) = -15.157524398723783020344365201838 absolute error = 5e-30 relative error = 3.2986917048413160637476975548425e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.278 y[1] (analytic) = -15.155751715150992054663466620385 y[1] (numeric) = -15.15575171515099205466346662038 absolute error = 5e-30 relative error = 3.2990775343736795641080370322600e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.279 y[1] (analytic) = -15.153978876762246259538540620605 y[1] (numeric) = -15.153978876762246259538540620601 absolute error = 4e-30 relative error = 2.6395707903049605015367882248999e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.28 y[1] (analytic) = -15.152205883567636986528847839374 y[1] (numeric) = -15.15220588356763698652884783937 absolute error = 4e-30 relative error = 2.6398796523336223116544436221218e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.281 y[1] (analytic) = -15.150432735577249791881544497628 y[1] (numeric) = -15.150432735577249791881544497623 absolute error = 5e-30 relative error = 3.3002357670343427052164260377667e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.282 y[1] (analytic) = -15.148659432801164441024685580972 y[1] (numeric) = -15.148659432801164441024685580968 absolute error = 4e-30 relative error = 2.6404976742290873330658207460664e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=598.9MB, alloc=4.4MB, time=24.58 x[1] = 1.283 y[1] (analytic) = -15.146885975249454913055392099508 y[1] (numeric) = -15.146885975249454913055392099504 absolute error = 4e-30 relative error = 2.6408068341810593025728034894307e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.284 y[1] (analytic) = -15.145112362932189405223189090149 y[1] (numeric) = -15.145112362932189405223189090144 absolute error = 5e-30 relative error = 3.3013951169075172325593896243282e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.285 y[1] (analytic) = -15.143338595859430337408521013502 y[1] (numeric) = -15.143338595859430337408521013497 absolute error = 5e-30 relative error = 3.3017818153832509310246888536016e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.286 y[1] (analytic) = -15.141564674041234356596451186221 y[1] (numeric) = -15.141564674041234356596451186216 absolute error = 5e-30 relative error = 3.3021686382068705088457069122071e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.287 y[1] (analytic) = -15.139790597487652341345551878562 y[1] (numeric) = -15.139790597487652341345551878557 absolute error = 5e-30 relative error = 3.3025555854317541084508551691612e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.288 y[1] (analytic) = -15.138016366208729406251991695766 y[1] (numeric) = -15.138016366208729406251991695761 absolute error = 5e-30 relative error = 3.3029426571113127531082218604057e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.289 y[1] (analytic) = -15.136241980214504906408826850771 y[1] (numeric) = -15.136241980214504906408826850766 absolute error = 5e-30 relative error = 3.3033298532989903705926757613635e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.29 y[1] (analytic) = -15.134467439515012441860502924672 y[1] (numeric) = -15.134467439515012441860502924667 absolute error = 5e-30 relative error = 3.3037171740482638168750249282757e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.291 y[1] (analytic) = -15.132692744120279862052573700289 y[1] (numeric) = -15.132692744120279862052573700283 absolute error = 6e-30 relative error = 3.9649255432951714797999027516607e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=602.7MB, alloc=4.4MB, time=24.74 TOP MAIN SOLVE Loop x[1] = 1.292 y[1] (analytic) = -15.13091789404032927027664364314 y[1] (numeric) = -15.130917894040329270276643643134 absolute error = 6e-30 relative error = 3.9653906273348044835830199092854e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.293 y[1] (analytic) = -15.129142889285177028110540593133 y[1] (numeric) = -15.129142889285177028110540593128 absolute error = 5e-30 relative error = 3.3048798842009221092472737961324e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.294 y[1] (analytic) = -15.127367729864833759853725219251 y[1] (numeric) = -15.127367729864833759853725219245 absolute error = 6e-30 relative error = 3.9663212444784081896466491177574e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.295 y[1] (analytic) = -15.125592415789304356957943778538 y[1] (numeric) = -15.125592415789304356957943778532 absolute error = 6e-30 relative error = 3.9667867777110796829063889847202e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.296 y[1] (analytic) = -15.123816947068587982453130709776 y[1] (numeric) = -15.12381694706858798245313070977 absolute error = 6e-30 relative error = 3.9672524608035309195038796440104e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.297 y[1] (analytic) = -15.122041323712678075368567581241 y[1] (numeric) = -15.122041323712678075368567581234 absolute error = 7e-30 relative error = 4.6290046761235801085734242050967e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.298 y[1] (analytic) = -15.120265545731562355149304901072 y[1] (numeric) = -15.120265545731562355149304901066 absolute error = 6e-30 relative error = 3.9681842768256108537000574773085e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.299 y[1] (analytic) = -15.118489613135222826067853287877 y[1] (numeric) = -15.11848961313522282606785328787 absolute error = 7e-30 relative error = 4.6300921448649677261392705697704e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=606.5MB, alloc=4.4MB, time=24.90 x[1] = 1.3 y[1] (analytic) = -15.116713525933635781631150488301 y[1] (numeric) = -15.116713525933635781631150488294 absolute error = 7e-30 relative error = 4.6306361419041757230233573411299e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.301 y[1] (analytic) = -15.114937284136771808982810717502 y[1] (numeric) = -15.114937284136771808982810717495 absolute error = 7e-30 relative error = 4.6311803141562135436186486681401e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.302 y[1] (analytic) = -15.113160887754595793300662787572 y[1] (numeric) = -15.113160887754595793300662787565 absolute error = 7e-30 relative error = 4.6317246616965045781132020946042e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.303 y[1] (analytic) = -15.111384336797066922189583478207 y[1] (numeric) = -15.1113843367970669221895834782 absolute error = 7e-30 relative error = 4.6322691846005187501358256113789e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.304 y[1] (analytic) = -15.109607631274138690069632593092 y[1] (numeric) = -15.109607631274138690069632593085 absolute error = 7e-30 relative error = 4.6328138829437725503563995231985e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.305 y[1] (analytic) = -15.107830771195758902559496134744 y[1] (numeric) = -15.107830771195758902559496134737 absolute error = 7e-30 relative error = 4.6333587568018290701175370343529e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.306 y[1] (analytic) = -15.106053756571869680855244019788 y[1] (numeric) = -15.106053756571869680855244019782 absolute error = 6e-30 relative error = 3.9719175482145411729408125533935e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.307 y[1] (analytic) = -15.104276587412407466104408745938 y[1] (numeric) = -15.104276587412407466104408745931 absolute error = 7e-30 relative error = 4.6344490313648358390052034948644e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=610.3MB, alloc=4.4MB, time=25.06 x[1] = 1.308 y[1] (analytic) = -15.102499263727303023775391411237 y[1] (numeric) = -15.10249926372730302377539141123 absolute error = 7e-30 relative error = 4.6349944322211455773049328135715e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.309 y[1] (analytic) = -15.100721785526481448022201475465 y[1] (numeric) = -15.100721785526481448022201475457 absolute error = 8e-30 relative error = 5.2977600101656880925426476708137e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.31 y[1] (analytic) = -15.09894415281986216604453664292 y[1] (numeric) = -15.098944152819862166044536642912 absolute error = 8e-30 relative error = 5.2983837273852879431943720514954e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.311 y[1] (analytic) = -15.097166365617358942443209235193 y[1] (numeric) = -15.097166365617358942443209235186 absolute error = 7e-30 relative error = 4.6366316899984385886684831525371e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.312 y[1] (analytic) = -15.095388423928879883570925411897 y[1] (numeric) = -15.09538842392887988357092541189 absolute error = 7e-30 relative error = 4.6371777945798022364722713052650e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.313 y[1] (analytic) = -15.093610327764327441878423586746 y[1] (numeric) = -15.093610327764327441878423586739 absolute error = 7e-30 relative error = 4.6377240752821550049416227317156e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.314 y[1] (analytic) = -15.091832077133598420255978375794 y[1] (numeric) = -15.091832077133598420255978375787 absolute error = 7e-30 relative error = 4.6382705321814809100847841377576e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.315 y[1] (analytic) = -15.0900536720465839763702764041 y[1] (numeric) = -15.090053672046583976370276404093 absolute error = 7e-30 relative error = 4.6388171653538109066298306736700e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=614.1MB, alloc=4.4MB, time=25.21 x[1] = 1.316 y[1] (analytic) = -15.088275112513169626996670286538 y[1] (numeric) = -15.08827511251316962699667028653 absolute error = 8e-30 relative error = 5.3021302570002547680035581058732e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.317 y[1] (analytic) = -15.086496398543235252346817087969 y[1] (numeric) = -15.086496398543235252346817087962 absolute error = 7e-30 relative error = 4.6399109608218418903394208854488e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.318 y[1] (analytic) = -15.084717530146655100391707557524 y[1] (numeric) = -15.084717530146655100391707557518 absolute error = 6e-30 relative error = 3.9775355342312912455919037570583e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.319 y[1] (analytic) = -15.082938507333297791180092421222 y[1] (numeric) = -15.082938507333297791180092421215 absolute error = 7e-30 relative error = 4.6410054622954356602656795274065e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.32 y[1] (analytic) = -15.08115933011302632115231200675 y[1] (numeric) = -15.081159330113026321152312006743 absolute error = 7e-30 relative error = 4.6415529779748956702034882130992e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.321 y[1] (analytic) = -15.079379998495698067449535463794 y[1] (numeric) = -15.079379998495698067449535463787 absolute error = 7e-30 relative error = 4.6421006703845331180428678198265e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.322 y[1] (analytic) = -15.077600512491164792218415832863 y[1] (numeric) = -15.077600512491164792218415832855 absolute error = 8e-30 relative error = 5.3058840452579525516862208575928e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.323 y[1] (analytic) = -15.075820872109272646911167205216 y[1] (numeric) = -15.075820872109272646911167205209 absolute error = 7e-30 relative error = 4.6431965856998294546300235065225e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=618.0MB, alloc=4.4MB, time=25.37 x[1] = 1.324 y[1] (analytic) = -15.074041077359862176581070206097 y[1] (numeric) = -15.074041077359862176581070206091 absolute error = 6e-30 relative error = 3.9803526932214436884048439603864e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.325 y[1] (analytic) = -15.072261128252768324173412023144 y[1] (numeric) = -15.072261128252768324173412023137 absolute error = 7e-30 relative error = 4.6442932088527752442366208026159e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.326 y[1] (analytic) = -15.07048102479782043481186719151 y[1] (numeric) = -15.070481024797820434811867191503 absolute error = 7e-30 relative error = 4.6448417860596518081394957064301e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.327 y[1] (analytic) = -15.068700767004842260080325336951 y[1] (numeric) = -15.068700767004842260080325336945 absolute error = 6e-30 relative error = 3.9817633203904950345361363589379e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.328 y[1] (analytic) = -15.066920354883651962300172067805 y[1] (numeric) = -15.066920354883651962300172067799 absolute error = 6e-30 relative error = 3.9822338332433114591956521363514e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.329 y[1] (analytic) = -15.065139788444062118803029196554 y[1] (numeric) = -15.065139788444062118803029196547 absolute error = 7e-30 relative error = 4.6464885811212009734637610445865e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.33 y[1] (analytic) = -15.063359067695879726198960461405 y[1] (numeric) = -15.063359067695879726198960461398 absolute error = 7e-30 relative error = 4.6470378675443294842556016531389e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.331 y[1] (analytic) = -15.061578192648906204640148908107 y[1] (numeric) = -15.0615781926489062046401489081 absolute error = 7e-30 relative error = 4.6475873314633688517258714901214e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.332 y[1] (analytic) = -15.059797163312937402080052081986 y[1] (numeric) = -15.059797163312937402080052081979 absolute error = 7e-30 relative error = 4.6481369729551532135181638401466e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=621.8MB, alloc=4.4MB, time=25.53 TOP MAIN SOLVE Loop x[1] = 1.333 y[1] (analytic) = -15.058015979697763598528041170037 y[1] (numeric) = -15.05801597969776359852804117003 absolute error = 7e-30 relative error = 4.6486867920965642624861585255418e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.334 y[1] (analytic) = -15.056234641813169510299530222713 y[1] (numeric) = -15.056234641813169510299530222705 absolute error = 8e-30 relative error = 5.3134134731023214642831932971110e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.335 y[1] (analytic) = -15.054453149668934294261601574911 y[1] (numeric) = -15.054453149668934294261601574903 absolute error = 8e-30 relative error = 5.3140422441554642020248335164261e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.336 y[1] (analytic) = -15.052671503274831552074133575548 y[1] (numeric) = -15.05267150327483155207413357554 absolute error = 8e-30 relative error = 5.3146712185006725885670005947748e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.337 y[1] (analytic) = -15.050889702640629334426436724977 y[1] (numeric) = -15.050889702640629334426436724969 absolute error = 8e-30 relative error = 5.3153003962260292062626095180517e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.338 y[1] (analytic) = -15.049107747776090145269404309446 y[1] (numeric) = -15.049107747776090145269404309438 absolute error = 8e-30 relative error = 5.3159297774196711840979030020186e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.339 y[1] (analytic) = -15.047325638690970946043183611701 y[1] (numeric) = -15.047325638690970946043183611693 absolute error = 8e-30 relative error = 5.3165593621697902373678128007017e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.34 y[1] (analytic) = -15.045543375395023159900373766807 y[1] (numeric) = -15.045543375395023159900373766799 absolute error = 8e-30 relative error = 5.3171891505646327073884079331188e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=625.6MB, alloc=4.4MB, time=25.68 x[1] = 1.341 y[1] (analytic) = -15.043760957897992675924756322232 y[1] (numeric) = -15.043760957897992675924756322223 absolute error = 9e-30 relative error = 5.9825465355290620514022753689546e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.342 y[1] (analytic) = -15.041978386209619853345564551213 y[1] (numeric) = -15.041978386209619853345564551204 absolute error = 9e-30 relative error = 5.9832555059719649605344882377055e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.343 y[1] (analytic) = -15.040195660339639525747297558461 y[1] (numeric) = -15.040195660339639525747297558452 absolute error = 9e-30 relative error = 5.9839647058133822884873943113532e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.344 y[1] (analytic) = -15.038412780297781005275085207263 y[1] (numeric) = -15.038412780297781005275085207255 absolute error = 8e-30 relative error = 5.3197103423580777190556903921376e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.345 y[1] (analytic) = -15.036629746093768086835609887115 y[1] (numeric) = -15.036629746093768086835609887107 absolute error = 8e-30 relative error = 5.3203411503021470878626899774076e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.346 y[1] (analytic) = -15.03484655773731905229359113107 y[1] (numeric) = -15.034846557737319052293591131061 absolute error = 9e-30 relative error = 5.9860936827242632083826123918848e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.347 y[1] (analytic) = -15.033063215238146674663839082078 y[1] (numeric) = -15.033063215238146674663839082069 absolute error = 9e-30 relative error = 5.9868038011555892059015707886893e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.348 y[1] (analytic) = -15.031279718605958222298882797724 y[1] (numeric) = -15.031279718605958222298882797715 absolute error = 9e-30 relative error = 5.9875141494836638479479243935019e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=629.4MB, alloc=4.4MB, time=25.84 x[1] = 1.349 y[1] (analytic) = -15.029496067850455463072179372853 y[1] (numeric) = -15.029496067850455463072179372845 absolute error = 8e-30 relative error = 5.3228664247185061105012941004291e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.35 y[1] (analytic) = -15.027712262981334668556909849761 y[1] (numeric) = -15.027712262981334668556909849753 absolute error = 8e-30 relative error = 5.3234982544261777138975539129569e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.351 y[1] (analytic) = -15.025928304008286618200367875768 y[1] (numeric) = -15.02592830400828661820036787576 absolute error = 8e-30 relative error = 5.3241302887528992009123651646874e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.352 y[1] (analytic) = -15.024144190940996603493947058195 y[1] (numeric) = -15.024144190940996603493947058187 absolute error = 8e-30 relative error = 5.3247625277875755362369194307238e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.353 y[1] (analytic) = -15.022359923789144432138732956947 y[1] (numeric) = -15.022359923789144432138732956938 absolute error = 9e-30 relative error = 5.9910693430715626840169152140165e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.354 y[1] (analytic) = -15.020575502562404432206705645144 y[1] (numeric) = -15.020575502562404432206705645135 absolute error = 9e-30 relative error = 5.9917810728787744265885936553064e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.355 y[1] (analytic) = -15.018790927270445456297558758485 y[1] (numeric) = -15.018790927270445456297558758476 absolute error = 9e-30 relative error = 5.9924930332828620437492474330374e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.356 y[1] (analytic) = -15.017006197922930885691140944273 y[1] (numeric) = -15.017006197922930885691140944264 absolute error = 9e-30 relative error = 5.9932052243840920480729836132296e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=633.2MB, alloc=4.4MB, time=26.00 x[1] = 1.357 y[1] (analytic) = -15.015221314529518634495525611326 y[1] (numeric) = -15.015221314529518634495525611317 absolute error = 9e-30 relative error = 5.9939176462827931723325713529853e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.358 y[1] (analytic) = -15.01343627709986115379071487229 y[1] (numeric) = -15.013436277099861153790714872281 absolute error = 9e-30 relative error = 5.9946302990793564149341583340271e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.359 y[1] (analytic) = -15.011651085643605435767983560191 y[1] (numeric) = -15.011651085643605435767983560182 absolute error = 9e-30 relative error = 5.9953431828742350853945136425626e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.36 y[1] (analytic) = -15.009865740170393017864869191388 y[1] (numeric) = -15.009865740170393017864869191379 absolute error = 9e-30 relative error = 5.9960562977679448498608399377578e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.361 y[1] (analytic) = -15.008080240689859986895813737464 y[1] (numeric) = -15.008080240689859986895813737455 absolute error = 9e-30 relative error = 5.9967696438610637766731978059908e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.362 y[1] (analytic) = -15.00629458721163698317846305894 y[1] (numeric) = -15.006294587211636983178463058931 absolute error = 9e-30 relative error = 5.9974832212542323819695852530242e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.363 y[1] (analytic) = -15.004508779745349204655629844113 y[1] (numeric) = -15.004508779745349204655629844105 absolute error = 8e-30 relative error = 5.3317306933761366002966358588994e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.364 y[1] (analytic) = -15.002722818300616411012925886715 y[1] (numeric) = -15.002722818300616411012925886707 absolute error = 8e-30 relative error = 5.3323653958609717382093644749797e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=637.0MB, alloc=4.4MB, time=26.16 x[1] = 1.365 y[1] (analytic) = -15.000936702887052927792069526518 y[1] (numeric) = -15.00093670288705292779206952651 absolute error = 8e-30 relative error = 5.3330003042145592053462474369558e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.366 y[1] (analytic) = -14.999150433514267650499874067476 y[1] (numeric) = -14.999150433514267650499874067468 absolute error = 8e-30 relative error = 5.3336354185265796810274196530426e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.367 y[1] (analytic) = -14.997364010191864048712922978433 y[1] (numeric) = -14.997364010191864048712922978425 absolute error = 8e-30 relative error = 5.3342707388867695569860552578678e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.368 y[1] (analytic) = -14.99557743292944017017793767194 y[1] (numeric) = -14.995577432929440170177937671932 absolute error = 8e-30 relative error = 5.3349062653849209781345146355926e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.369 y[1] (analytic) = -14.993790701736588644907843647202 y[1] (numeric) = -14.993790701736588644907843647193 absolute error = 9e-30 relative error = 6.0024847478747421187897602209624e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.37 y[1] (analytic) = -14.992003816622896689273540773711 y[1] (numeric) = -14.992003816622896689273540773703 absolute error = 8e-30 relative error = 5.3361779371545560464104883680238e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.371 y[1] (analytic) = -14.990216777597946110091383482673 y[1] (numeric) = -14.990216777597946110091383482664 absolute error = 9e-30 relative error = 6.0039158429316410062748884772168e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.372 y[1] (analytic) = -14.988429584671313308706376623848 y[1] (numeric) = -14.988429584671313308706376623839 absolute error = 9e-30 relative error = 6.0046317388743059927907231747127e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.373 y[1] (analytic) = -14.986642237852569285071092736071 y[1] (numeric) = -14.986642237852569285071092736062 absolute error = 9e-30 relative error = 6.0053478672282009758523897397579e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=640.8MB, alloc=4.4MB, time=26.32 x[1] = 1.374 y[1] (analytic) = -14.984854737151279641820316470246 y[1] (numeric) = -14.984854737151279641820316470237 absolute error = 9e-30 relative error = 6.0060642280947194179546763880514e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.375 y[1] (analytic) = -14.98306708257700458834142189426 y[1] (numeric) = -14.983067082577004588341421894251 absolute error = 9e-30 relative error = 6.0067808215753178261576033795563e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.376 y[1] (analytic) = -14.981279274139298944840488399881 y[1] (numeric) = -14.981279274139298944840488399872 absolute error = 9e-30 relative error = 6.0074976477715157982932153575414e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.377 y[1] (analytic) = -14.979491311847712146404160922359 y[1] (numeric) = -14.979491311847712146404160922351 absolute error = 8e-30 relative error = 5.3406352949199076170806042219296e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.378 y[1] (analytic) = -14.977703195711788247057260174109 y[1] (numeric) = -14.977703195711788247057260174101 absolute error = 8e-30 relative error = 5.3412728877485373840842089529103e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.379 y[1] (analytic) = -14.975914925741065923816148584534 y[1] (numeric) = -14.975914925741065923816148584526 absolute error = 8e-30 relative error = 5.3419106877065336975578071405083e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.38 y[1] (analytic) = -14.974126501945078480737857628778 y[1] (numeric) = -14.97412650194507848073785762877 absolute error = 8e-30 relative error = 5.3425486948843609342612607918450e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.381 y[1] (analytic) = -14.972337924333353852964982218878 y[1] (numeric) = -14.972337924333353852964982218871 absolute error = 7e-30 relative error = 4.6752885457009722878845926676376e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=644.7MB, alloc=4.4MB, time=26.47 x[1] = 1.382 y[1] (analytic) = -14.970549192915414610766347821564 y[1] (numeric) = -14.970549192915414610766347821556 absolute error = 8e-30 relative error = 5.3438253312616471588412365544633e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.383 y[1] (analytic) = -14.968760307700777963573455957667 y[1] (numeric) = -14.96876030770077796357345595766 absolute error = 7e-30 relative error = 4.6764059655620269363039030826005e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.384 y[1] (analytic) = -14.966971268698955764012713728936 y[1] (numeric) = -14.966971268698955764012713728929 absolute error = 7e-30 relative error = 4.6769649479045828546837209327041e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.385 y[1] (analytic) = -14.965182075919454511933453008768 y[1] (numeric) = -14.96518207591945451193345300876 absolute error = 8e-30 relative error = 5.3457418422411565309017410983333e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.386 y[1] (analytic) = -14.963392729371775358431744924248 y[1] (numeric) = -14.963392729371775358431744924239 absolute error = 9e-30 relative error = 6.0146787314709856840218459668429e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.387 y[1] (analytic) = -14.96160322906541410987001524768 y[1] (numeric) = -14.961603229065414109870015247672 absolute error = 8e-30 relative error = 5.3470205548952556981314968038952e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.388 y[1] (analytic) = -14.959813575009861231892466306643 y[1] (numeric) = -14.959813575009861231892466306635 absolute error = 8e-30 relative error = 5.3476602230952109630455699058544e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.389 y[1] (analytic) = -14.958023767214601853436311012459 y[1] (numeric) = -14.958023767214601853436311012451 absolute error = 8e-30 relative error = 5.3483000993317144049400685643234e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=648.5MB, alloc=4.4MB, time=26.63 x[1] = 1.39 y[1] (analytic) = -14.956233805689115770738824597872 y[1] (numeric) = -14.956233805689115770738824597865 absolute error = 7e-30 relative error = 4.6803226607338207389264617643308e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.391 y[1] (analytic) = -14.954443690442877451340219645602 y[1] (numeric) = -14.954443690442877451340219645595 absolute error = 7e-30 relative error = 4.6808829167437215783057033959187e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.392 y[1] (analytic) = -14.952653421485356038082349980362 y[1] (numeric) = -14.952653421485356038082349980354 absolute error = 8e-30 relative error = 5.3502209771710884051563921747052e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.393 y[1] (analytic) = -14.95086299882601535310324898787 y[1] (numeric) = -14.950862998826015353103248987863 absolute error = 7e-30 relative error = 4.6820039756565624863347589989998e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.394 y[1] (analytic) = -14.949072422474313901827507915336 y[1] (numeric) = -14.949072422474313901827507915329 absolute error = 7e-30 relative error = 4.6825647787191511158528025915244e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.395 y[1] (analytic) = -14.947281692439704876952499698844 y[1] (numeric) = -14.947281692439704876952499698837 absolute error = 7e-30 relative error = 4.6831257642923671450172562651813e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.396 y[1] (analytic) = -14.945490808731636162430453854082 y[1] (numeric) = -14.945490808731636162430453854075 absolute error = 7e-30 relative error = 4.6836869324561592722711278994743e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.397 y[1] (analytic) = -14.943699771359550337446387957835 y[1] (numeric) = -14.943699771359550337446387957828 absolute error = 7e-30 relative error = 4.6842482832905260292023186064665e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=652.3MB, alloc=4.4MB, time=26.79 x[1] = 1.398 y[1] (analytic) = -14.941908580332884680391901238692 y[1] (numeric) = -14.941908580332884680391901238685 absolute error = 7e-30 relative error = 4.6848098168755158172311982213370e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.399 y[1] (analytic) = -14.940117235661071172834835786457 y[1] (numeric) = -14.94011723566107117283483578645 absolute error = 7e-30 relative error = 4.6853715332912269443326236226655e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.4 y[1] (analytic) = -14.938325737353536503484810880796 y[1] (numeric) = -14.938325737353536503484810880789 absolute error = 7e-30 relative error = 4.6859334326178076617924349542455e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.401 y[1] (analytic) = -14.936534085419702072154635930741 y[1] (numeric) = -14.936534085419702072154635930734 absolute error = 7e-30 relative error = 4.6864955149354562009984648651046e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.402 y[1] (analytic) = -14.934742279868983993717607507739 y[1] (numeric) = -14.934742279868983993717607507733 absolute error = 6e-30 relative error = 4.0174780974209321230852250823105e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.403 y[1] (analytic) = -14.932950320710793102060695946065 y[1] (numeric) = -14.932950320710793102060695946059 absolute error = 6e-30 relative error = 4.0179601961699998214557726736085e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.404 y[1] (analytic) = -14.931158207954534954033626975501 y[1] (numeric) = -14.931158207954534954033626975495 absolute error = 6e-30 relative error = 4.0184424519750356040693470708891e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.405 y[1] (analytic) = -14.929365941609609833393863842377 y[1] (numeric) = -14.929365941609609833393863842369 absolute error = 8e-30 relative error = 5.3585664865399366512125638359823e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.406 y[1] (analytic) = -14.927573521685412754747495366166 y[1] (numeric) = -14.927573521685412754747495366158 absolute error = 8e-30 memory used=656.1MB, alloc=4.4MB, time=26.94 relative error = 5.3592099133716086535565943109314e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.407 y[1] (analytic) = -14.925780948191333467486035370061 y[1] (numeric) = -14.925780948191333467486035370053 absolute error = 8e-30 relative error = 5.3598535498870622066081505061341e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.408 y[1] (analytic) = -14.923988221136756459719138915083 y[1] (numeric) = -14.923988221136756459719138915075 absolute error = 8e-30 relative error = 5.3604973961783534534032641118009e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.409 y[1] (analytic) = -14.922195340531060962203240758539 y[1] (numeric) = -14.922195340531060962203240758532 absolute error = 7e-30 relative error = 4.6909987707953964955324849060332e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.41 y[1] (analytic) = -14.920402306383620952266121448836 y[1] (numeric) = -14.920402306383620952266121448829 absolute error = 7e-30 relative error = 4.6915625036498408158092878156482e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.411 y[1] (analytic) = -14.918609118703805157727406459904 y[1] (numeric) = -14.918609118703805157727406459896 absolute error = 8e-30 relative error = 5.3624301946286769098166780675101e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.412 y[1] (analytic) = -14.916815777500977060815003759746 y[1] (numeric) = -14.916815777500977060815003759738 absolute error = 8e-30 relative error = 5.3630748809450301565665962155150e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.413 y[1] (analytic) = -14.915022282784494902077485198905 y[1] (numeric) = -14.915022282784494902077485198897 absolute error = 8e-30 relative error = 5.3637197774983645296561783453135e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.414 y[1] (analytic) = -14.913228634563711684292417095915 y[1] (numeric) = -14.913228634563711684292417095907 absolute error = 8e-30 relative error = 5.3643648843810815564719279027947e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=659.9MB, alloc=4.4MB, time=27.10 x[1] = 1.415 y[1] (analytic) = -14.911434832847975176370645388132 y[1] (numeric) = -14.911434832847975176370645388123 absolute error = 9e-30 relative error = 6.0356364768963455370043708638125e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.416 y[1] (analytic) = -14.909640877646627917256540707643 y[1] (numeric) = -14.909640877646627917256540707635 absolute error = 8e-30 relative error = 5.3656557295045582881556646707627e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.417 y[1] (analytic) = -14.907846768969007219824208733321 y[1] (numeric) = -14.907846768969007219824208733313 absolute error = 8e-30 relative error = 5.3663014679304097830945845548989e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.418 y[1] (analytic) = -14.906052506824445174769671161399 y[1] (numeric) = -14.90605250682444517476967116139 absolute error = 9e-30 relative error = 6.0378158441878060469721717631132e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.419 y[1] (analytic) = -14.904258091222268654499022628374 y[1] (numeric) = -14.904258091222268654499022628365 absolute error = 9e-30 relative error = 6.0385427740951900309163175881611e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.42 y[1] (analytic) = -14.902463522171799317012568911398 y[1] (numeric) = -14.902463522171799317012568911389 absolute error = 9e-30 relative error = 6.0392699412482049589571893341471e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.421 y[1] (analytic) = -14.900668799682353609784951722723 y[1] (numeric) = -14.900668799682353609784951722714 absolute error = 9e-30 relative error = 6.0399973457512580478123478578899e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.422 y[1] (analytic) = -14.898873923763242773641265406204 y[1] (numeric) = -14.898873923763242773641265406196 absolute error = 8e-30 relative error = 5.3695333224078415804610497198356e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=663.7MB, alloc=4.4MB, time=27.26 x[1] = 1.423 y[1] (analytic) = -14.897078894423772846629170835305 y[1] (numeric) = -14.897078894423772846629170835297 absolute error = 8e-30 relative error = 5.3701803264226079486425737653174e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.424 y[1] (analytic) = -14.895283711673244667887011803477 y[1] (numeric) = -14.895283711673244667887011803469 absolute error = 8e-30 relative error = 5.3708275416939535053488339851908e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.425 y[1] (analytic) = -14.893488375520953881507939189295 y[1] (numeric) = -14.893488375520953881507939189287 absolute error = 8e-30 relative error = 5.3714749683149169722861256359204e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.426 y[1] (analytic) = -14.891692885976190940400048170187 y[1] (numeric) = -14.891692885976190940400048170179 absolute error = 8e-30 relative error = 5.3721226063785952553865685823981e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.427 y[1] (analytic) = -14.889897243048241110142533750117 y[1] (numeric) = -14.88989724304824111014253375011 absolute error = 7e-30 relative error = 4.7011741489808755519079159580199e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.428 y[1] (analytic) = -14.888101446746384472837869858095 y[1] (numeric) = -14.888101446746384472837869858088 absolute error = 7e-30 relative error = 4.7017412025559281893081077850259e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.429 y[1] (analytic) = -14.886305497079895930960017265918 y[1] (numeric) = -14.886305497079895930960017265911 absolute error = 7e-30 relative error = 4.7023084413880415132940996796616e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.43 y[1] (analytic) = -14.884509394058045211198665565117 y[1] (numeric) = -14.88450939405804521119866556511 absolute error = 7e-30 relative error = 4.7028758655588793387100688556531e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=667.5MB, alloc=4.4MB, time=27.41 x[1] = 1.431 y[1] (analytic) = -14.882713137690096868299514434626 y[1] (numeric) = -14.882713137690096868299514434619 absolute error = 7e-30 relative error = 4.7034434751501565804570470705339e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.432 y[1] (analytic) = -14.8809167279853102889005994223 y[1] (numeric) = -14.880916727985310288900599422292 absolute error = 8e-30 relative error = 5.3760128802784449044245701219005e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.433 y[1] (analytic) = -14.879120164952939695364667454983 y[1] (numeric) = -14.879120164952939695364667454975 absolute error = 8e-30 relative error = 5.3766620010527368001594977687091e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.434 y[1] (analytic) = -14.877323448602234149607607283476 y[1] (numeric) = -14.877323448602234149607607283468 absolute error = 8e-30 relative error = 5.3773113340166185705679734060205e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.435 y[1] (analytic) = -14.875526578942437556922940060347 y[1] (numeric) = -14.875526578942437556922940060339 absolute error = 8e-30 relative error = 5.3779608792637127233883094852975e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.436 y[1] (analytic) = -14.873729555982788669802375240211 y[1] (numeric) = -14.873729555982788669802375240203 absolute error = 8e-30 relative error = 5.3786106368877003832807843893912e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.437 y[1] (analytic) = -14.871932379732521091752436983743 y[1] (numeric) = -14.871932379732521091752436983735 absolute error = 8e-30 relative error = 5.3792606069823213353216412665786e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.438 y[1] (analytic) = -14.870135050200863281107166238386 y[1] (numeric) = -14.870135050200863281107166238378 absolute error = 8e-30 relative error = 5.3799107896413740685380519115774e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=671.4MB, alloc=4.4MB, time=27.57 x[1] = 1.439 y[1] (analytic) = -14.8683375673970385548369036604 y[1] (numeric) = -14.868337567397038554836903660392 absolute error = 8e-30 relative error = 5.3805611849587158194840878252329e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.44 y[1] (analytic) = -14.866539931330265092353158534613 y[1] (numeric) = -14.866539931330265092353158534605 absolute error = 8e-30 relative error = 5.3812117930282626158577406384734e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.441 y[1] (analytic) = -14.864742142009755939309568839961 y[1] (numeric) = -14.864742142009755939309568839953 absolute error = 8e-30 relative error = 5.3818626139439893201590341401126e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.442 y[1] (analytic) = -14.86294419944471901139895760065 y[1] (numeric) = -14.862944199444719011398957600642 absolute error = 8e-30 relative error = 5.3825136477999296733892702021163e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.443 y[1] (analytic) = -14.861146103644357098146490654523 y[1] (numeric) = -14.861146103644357098146490654514 absolute error = 9e-30 relative error = 6.0560605065264483811403823188326e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.444 y[1] (analytic) = -14.859347854617867866698940961995 y[1] (numeric) = -14.859347854617867866698940961986 absolute error = 9e-30 relative error = 6.0567933990474910638359095283885e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.445 y[1] (analytic) = -14.857549452374443865610064570715 y[1] (numeric) = -14.857549452374443865610064570706 absolute error = 9e-30 relative error = 6.0575265314440358996511700685764e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.446 y[1] (analytic) = -14.855750896923272528622093342895 y[1] (numeric) = -14.855750896923272528622093342886 absolute error = 9e-30 relative error = 6.0582599038221362930120779945727e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.447 y[1] (analytic) = -14.853952188273536178443349544097 y[1] (numeric) = -14.853952188273536178443349544088 absolute error = 9e-30 relative error = 6.0589935162879121331625476317550e-29 % Correct digits = 30 h = 0.001 memory used=675.2MB, alloc=4.4MB, time=27.73 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.448 y[1] (analytic) = -14.85215332643441203052198738408 y[1] (numeric) = -14.85215332643441203052198738407 absolute error = 1.0e-29 relative error = 6.7330304099417220484497796122887e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.449 y[1] (analytic) = -14.85035431141507219681586659217 y[1] (numeric) = -14.850354311415072196815866592161 absolute error = 9e-30 relative error = 6.0604614619073024315862895502724e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.45 y[1] (analytic) = -14.848555143224683689558563101497 y[1] (numeric) = -14.848555143224683689558563101488 absolute error = 9e-30 relative error = 6.0611957952734895376332646108013e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.451 y[1] (analytic) = -14.846755821872408425021521908284 y[1] (numeric) = -14.846755821872408425021521908274 absolute error = 1.0e-29 relative error = 6.7354781879472194279234082900154e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.452 y[1] (analytic) = -14.844956347367403227272357164317 y[1] (numeric) = -14.844956347367403227272357164307 absolute error = 1.0e-29 relative error = 6.7362946485008659221679604875319e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.453 y[1] (analytic) = -14.843156719718819831929304552614 y[1] (numeric) = -14.843156719718819831929304552604 absolute error = 1.0e-29 relative error = 6.7371113765276165668055433417095e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.454 y[1] (analytic) = -14.841356938935804889911830988235 y[1] (numeric) = -14.841356938935804889911830988226 absolute error = 9e-30 relative error = 6.0641355349313108955646345419864e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.455 y[1] (analytic) = -14.83955700502749997118740667813 y[1] (numeric) = -14.839557005027499971187406678121 absolute error = 9e-30 relative error = 6.0648710719268008378304468612377e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=679.0MB, alloc=4.4MB, time=27.89 x[1] = 1.456 y[1] (analytic) = -14.837756918003041568514444565868 y[1] (numeric) = -14.837756918003041568514444565859 absolute error = 9e-30 relative error = 6.0656068499680452199455649493057e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.457 y[1] (analytic) = -14.835956677871561101181412179087 y[1] (numeric) = -14.835956677871561101181412179078 absolute error = 9e-30 relative error = 6.0663428691618315062574583646613e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.458 y[1] (analytic) = -14.834156284642184918742120889453 y[1] (numeric) = -14.834156284642184918742120889444 absolute error = 9e-30 relative error = 6.0670791296150141923465099027446e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.459 y[1] (analytic) = -14.832355738324034304747197586968 y[1] (numeric) = -14.832355738324034304747197586959 absolute error = 9e-30 relative error = 6.0678156314345148549816921374202e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.46 y[1] (analytic) = -14.830555038926225480471743762438 y[1] (numeric) = -14.830555038926225480471743762429 absolute error = 9e-30 relative error = 6.0685523747273222021233865296160e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.461 y[1] (analytic) = -14.828754186457869608639186983992 y[1] (numeric) = -14.828754186457869608639186983982 absolute error = 1.0e-29 relative error = 6.7436548440005468033037709485277e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.462 y[1] (analytic) = -14.826953180928072797141329745544 y[1] (numeric) = -14.826953180928072797141329745535 absolute error = 9e-30 relative error = 6.0700265861611477380721847543549e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.463 y[1] (analytic) = -14.825152022345936102754600657206 y[1] (numeric) = -14.825152022345936102754600657197 absolute error = 9e-30 relative error = 6.0707640545164794494434393098607e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=682.8MB, alloc=4.4MB, time=28.04 x[1] = 1.464 y[1] (analytic) = -14.823350710720555534852512939681 y[1] (numeric) = -14.823350710720555534852512939672 absolute error = 9e-30 relative error = 6.0715017647737449907859245388669e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.465 y[1] (analytic) = -14.821549246061022059114335176814 y[1] (numeric) = -14.821549246061022059114335176805 absolute error = 9e-30 relative error = 6.0722397170402694777127588520951e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.466 y[1] (analytic) = -14.819747628376421601229979272544 y[1] (numeric) = -14.819747628376421601229979272536 absolute error = 8e-30 relative error = 5.3982025879319515182561000104384e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.467 y[1] (analytic) = -14.817945857675835050601110550656 y[1] (numeric) = -14.817945857675835050601110550648 absolute error = 8e-30 relative error = 5.3988589760273181885434606443026e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.468 y[1] (analytic) = -14.816143933968338264038484927836 y[1] (numeric) = -14.816143933968338264038484927827 absolute error = 9e-30 relative error = 6.0744550269696595531989660594929e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.469 y[1] (analytic) = -14.814341857263002069455518082722 y[1] (numeric) = -14.814341857263002069455518082713 absolute error = 9e-30 relative error = 6.0751939483478203779134569359258e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.47 y[1] (analytic) = -14.812539627568892269558091535786 y[1] (numeric) = -14.812539627568892269558091535778 absolute error = 8e-30 relative error = 5.4008294331314473037250568953550e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.471 y[1] (analytic) = -14.810737244895069645530600547069 y[1] (numeric) = -14.81073724489506964553060054706 absolute error = 9e-30 relative error = 6.0766725188525635343143013081962e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=686.6MB, alloc=4.4MB, time=28.20 x[1] = 1.472 y[1] (analytic) = -14.808934709250589960718248730986 y[1] (numeric) = -14.808934709250589960718248730977 absolute error = 9e-30 relative error = 6.0774121681946745304880991125793e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.473 y[1] (analytic) = -14.807132020644503964305594279655 y[1] (numeric) = -14.807132020644503964305594279646 absolute error = 9e-30 relative error = 6.0781520604070771904561855048932e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.474 y[1] (analytic) = -14.80532917908585739499135267838 y[1] (numeric) = -14.805329179085857394991352678372 absolute error = 8e-30 relative error = 5.4034597294201825205963766516601e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.475 y[1] (analytic) = -14.803526184583690984659460789216 y[1] (numeric) = -14.803526184583690984659460789207 absolute error = 9e-30 relative error = 6.0796325738745606745087799746089e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.476 y[1] (analytic) = -14.801723037147040462046407170736 y[1] (numeric) = -14.801723037147040462046407170728 absolute error = 8e-30 relative error = 5.4047761736406336471414188531726e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.477 y[1] (analytic) = -14.799919736784936556404833494477 y[1] (numeric) = -14.799919736784936556404833494468 absolute error = 9e-30 relative error = 6.0811140601192995058108429623652e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.478 y[1] (analytic) = -14.79811628350640500116341191071 y[1] (numeric) = -14.798116283506405001163411910701 absolute error = 9e-30 relative error = 6.0818551683035263067624017276826e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.479 y[1] (analytic) = -14.796312677320466537583003208604 y[1] (numeric) = -14.796312677320466537583003208595 absolute error = 9e-30 relative error = 6.0825965200066670200794269762346e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=690.4MB, alloc=4.4MB, time=28.36 x[1] = 1.48 y[1] (analytic) = -14.794508918236136918409100608058 y[1] (numeric) = -14.794508918236136918409100608049 absolute error = 9e-30 relative error = 6.0833381153370635511758376811469e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.481 y[1] (analytic) = -14.792705006262426911520564012875 y[1] (numeric) = -14.792705006262426911520564012866 absolute error = 9e-30 relative error = 6.0840799544031259976929883840587e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.482 y[1] (analytic) = -14.790900941408342303574649547263 y[1] (numeric) = -14.790900941408342303574649547253 absolute error = 1.0e-29 relative error = 6.7609133747925918895022998633571e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.483 y[1] (analytic) = -14.789096723682883903648339190003 y[1] (numeric) = -14.789096723682883903648339189993 absolute error = 1.0e-29 relative error = 6.7617381824180336611719884915430e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.484 y[1] (analytic) = -14.787292353095047546875975313017 y[1] (numeric) = -14.787292353095047546875975313007 absolute error = 1.0e-29 relative error = 6.7625632612227041800359802853664e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.485 y[1] (analytic) = -14.785487829653824098083204923419 y[1] (numeric) = -14.78548782965382409808320492341 absolute error = 9e-30 relative error = 6.0870497501946264790430000298897e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.486 y[1] (analytic) = -14.783683153368199455417238400566 y[1] (numeric) = -14.783683153368199455417238400557 absolute error = 9e-30 relative error = 6.0877928095675602716175342118731e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.487 y[1] (analytic) = -14.781878324247154553973427512014 y[1] (numeric) = -14.781878324247154553973427512005 absolute error = 9e-30 relative error = 6.0885361133280554645539171702828e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.488 y[1] (analytic) = -14.780073342299665369418167484726 y[1] (numeric) = -14.780073342299665369418167484717 absolute error = 9e-30 relative error = 6.0892796615850009332599559985723e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=694.2MB, alloc=4.4MB, time=28.52 TOP MAIN SOLVE Loop x[1] = 1.489 y[1] (analytic) = -14.778268207534702921608127900315 y[1] (numeric) = -14.778268207534702921608127900307 absolute error = 8e-30 relative error = 5.4133541817309814712397760760801e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.49 y[1] (analytic) = -14.776462919961233278205817175567 y[1] (numeric) = -14.776462919961233278205817175558 absolute error = 9e-30 relative error = 6.0907674920241412610587292387908e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.491 y[1] (analytic) = -14.77465747958821755829148538193 y[1] (numeric) = -14.774657479588217558291485381921 absolute error = 9e-30 relative error = 6.0915117744244570867824050190854e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.492 y[1] (analytic) = -14.772851886424611935971370150199 y[1] (numeric) = -14.77285188642461193597137015019 absolute error = 9e-30 relative error = 6.0922563017574652245638160100493e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.493 y[1] (analytic) = -14.771046140479367643982290399059 y[1] (numeric) = -14.77104614047936764398229039905 absolute error = 9e-30 relative error = 6.0930010741323980747047878091873e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.494 y[1] (analytic) = -14.769240241761430977292592618696 y[1] (numeric) = -14.769240241761430977292592618688 absolute error = 8e-30 relative error = 5.4166631925853839086186814168722e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.495 y[1] (analytic) = -14.767434190279743296699454433217 y[1] (numeric) = -14.767434190279743296699454433208 absolute error = 9e-30 relative error = 6.0944913544453118634010411805678e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.496 y[1] (analytic) = -14.765627986043241032422550158122 y[1] (numeric) = -14.765627986043241032422550158114 absolute error = 8e-30 relative error = 5.4179883223129796513681356072181e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=698.1MB, alloc=4.4MB, time=28.68 x[1] = 1.497 y[1] (analytic) = -14.763821629060855687694083061686 y[1] (numeric) = -14.763821629060855687694083061678 absolute error = 8e-30 relative error = 5.4186512144341651375264817309153e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.498 y[1] (analytic) = -14.762015119341513842345189031603 y[1] (numeric) = -14.762015119341513842345189031596 absolute error = 7e-30 relative error = 4.7419000342496922963141021638583e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.499 y[1] (analytic) = -14.760208456894137156388716340893 y[1] (numeric) = -14.760208456894137156388716340885 absolute error = 8e-30 relative error = 5.4199776536783212347505669286495e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.5 y[1] (analytic) = -14.758401641727642373598386199615 y[1] (numeric) = -14.758401641727642373598386199608 absolute error = 7e-30 relative error = 4.7430610508717451294373285703014e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.501 y[1] (analytic) = -14.756594673850941325084338771589 y[1] (numeric) = -14.756594673850941325084338771582 absolute error = 7e-30 relative error = 4.7436418460447225649565813513190e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.502 y[1] (analytic) = -14.754787553272940932865069327893 y[1] (numeric) = -14.754787553272940932865069327886 absolute error = 7e-30 relative error = 4.7442228325729053887081602487719e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.503 y[1] (analytic) = -14.752980280002543213435759201595 y[1] (numeric) = -14.752980280002543213435759201588 absolute error = 7e-30 relative error = 4.7448040105417895231329046402333e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.504 y[1] (analytic) = -14.751172854048645281333006200796 y[1] (numeric) = -14.751172854048645281333006200789 absolute error = 7e-30 relative error = 4.7453853800369248519114783361676e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=701.9MB, alloc=4.4MB, time=28.84 x[1] = 1.505 y[1] (analytic) = -14.749365275420139352695959129727 y[1] (numeric) = -14.749365275420139352695959129721 absolute error = 6e-30 relative error = 4.0679716638376416518960846865490e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.506 y[1] (analytic) = -14.747557544125912748823861060341 y[1] (numeric) = -14.747557544125912748823861060335 absolute error = 6e-30 relative error = 4.0684703090986445802657670236790e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.507 y[1] (analytic) = -14.745749660174847899730005989498 y[1] (numeric) = -14.745749660174847899730005989491 absolute error = 7e-30 relative error = 4.7471306385361471122457664483915e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.508 y[1] (analytic) = -14.743941623575822347692113509582 y[1] (numeric) = -14.743941623575822347692113509576 absolute error = 6e-30 relative error = 4.0694680928510286010182456991218e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.509 y[1] (analytic) = -14.742133434337708750799126113087 y[1] (numeric) = -14.742133434337708750799126113081 absolute error = 6e-30 relative error = 4.0699672314894837798590168900018e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.51 y[1] (analytic) = -14.740325092469374886494433744432 y[1] (numeric) = -14.740325092469374886494433744426 absolute error = 6e-30 relative error = 4.0704665347342412081639674383830e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.511 y[1] (analytic) = -14.73851659797968365511553020504 y[1] (numeric) = -14.738516597979683655115530205033 absolute error = 7e-30 relative error = 4.7494603364354464510411465273183e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.512 y[1] (analytic) = -14.73670795087749308343010601044 y[1] (numeric) = -14.736707950877493083430106010434 absolute error = 6e-30 relative error = 4.0714656353373222046901009226137e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=705.7MB, alloc=4.4MB, time=28.99 x[1] = 1.513 y[1] (analytic) = -14.734899151171656328168582290963 y[1] (numeric) = -14.734899151171656328168582290957 absolute error = 6e-30 relative error = 4.0719654328430918329377009113403e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.514 y[1] (analytic) = -14.733090198871021679553090320333 y[1] (numeric) = -14.733090198871021679553090320328 absolute error = 5e-30 relative error = 3.3937211627083799173604217971005e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.515 y[1] (analytic) = -14.731281093984432564822901249323 y[1] (numeric) = -14.731281093984432564822901249318 absolute error = 5e-30 relative error = 3.3941379355267116337528657751733e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.516 y[1] (analytic) = -14.729471836520727551756310614386 y[1] (numeric) = -14.729471836520727551756310614382 absolute error = 4e-30 relative error = 2.7156438767086481574395733421876e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.517 y[1] (analytic) = -14.727662426488740352188982184065 y[1] (numeric) = -14.727662426488740352188982184061 absolute error = 4e-30 relative error = 2.7159775150778291061804858028173e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.518 y[1] (analytic) = -14.725852863897299825528755698761 y[1] (numeric) = -14.725852863897299825528755698756 absolute error = 5e-30 relative error = 3.3953890794727899198205388986848e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.519 y[1] (analytic) = -14.724043148755229982266923052338 y[1] (numeric) = -14.724043148755229982266923052333 absolute error = 5e-30 relative error = 3.3958064028240095178111005853801e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.52 y[1] (analytic) = -14.7222332810713499874859774569 y[1] (numeric) = -14.722233281071349987485977456895 absolute error = 5e-30 relative error = 3.3962238639626728972633160440289e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=709.5MB, alloc=4.4MB, time=29.15 x[1] = 1.521 y[1] (analytic) = -14.72042326085447416436384012492 y[1] (numeric) = -14.720423260854474164363840124915 absolute error = 5e-30 relative error = 3.3966414629505468190118984445080e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.522 y[1] (analytic) = -14.718613088113411997674568995841 y[1] (numeric) = -14.718613088113411997674568995836 absolute error = 5e-30 relative error = 3.3970591998494371136176918590092e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.523 y[1] (analytic) = -14.716802762856968137285554027144 y[1] (numeric) = -14.716802762856968137285554027139 absolute error = 5e-30 relative error = 3.3974770747211887108530788268520e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.524 y[1] (analytic) = -14.714992285093942401651203562801 y[1] (numeric) = -14.714992285093942401651203562796 absolute error = 5e-30 relative error = 3.3978950876276856692153833791204e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.525 y[1] (analytic) = -14.713181654833129781303126284972 y[1] (numeric) = -14.713181654833129781303126284967 absolute error = 5e-30 relative error = 3.3983132386308512054682989186281e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.526 y[1] (analytic) = -14.711370872083320442336813247733 y[1] (numeric) = -14.711370872083320442336813247728 absolute error = 5e-30 relative error = 3.3987315277926477242113703884074e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.527 y[1] (analytic) = -14.709559936853299729894824484597 y[1] (numeric) = -14.709559936853299729894824484592 absolute error = 5e-30 relative error = 3.3991499551750768474775601996490e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.528 y[1] (analytic) = -14.707748849151848171646484674543 y[1] (numeric) = -14.707748849151848171646484674537 absolute error = 6e-30 relative error = 4.0794822250082153332307129133747e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.529 y[1] (analytic) = -14.705937608987741481264092344268 y[1] (numeric) = -14.705937608987741481264092344262 absolute error = 6e-30 relative error = 4.0799846698200427927925397881461e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=713.3MB, alloc=4.4MB, time=29.30 TOP MAIN SOLVE Loop x[1] = 1.53 y[1] (analytic) = -14.704126216369750561895647077364 y[1] (numeric) = -14.704126216369750561895647077359 absolute error = 5e-30 relative error = 3.4004060672667649485820182222250e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.531 y[1] (analytic) = -14.702314671306641509634099194127 y[1] (numeric) = -14.702314671306641509634099194121 absolute error = 6e-30 relative error = 4.0809900577830313157143595716660e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.532 y[1] (analytic) = -14.700502973807175616983126358727 y[1] (numeric) = -14.700502973807175616983126358722 absolute error = 5e-30 relative error = 3.4012441675695172583488320682622e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.533 y[1] (analytic) = -14.698691123880109376319441563539 y[1] (numeric) = -14.698691123880109376319441563534 absolute error = 5e-30 relative error = 3.4016634255799759841013806039441e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.534 y[1] (analytic) = -14.696879121534194483351636933405 y[1] (numeric) = -14.696879121534194483351636933399 absolute error = 6e-30 relative error = 4.0824993866954150986203017086077e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.535 y[1] (analytic) = -14.695066966778177840575567785743 y[1] (numeric) = -14.695066966778177840575567785737 absolute error = 6e-30 relative error = 4.0830028291565321795855119255290e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.536 y[1] (analytic) = -14.69325465962080156072628137544 y[1] (numeric) = -14.693254659620801560726281375434 absolute error = 6e-30 relative error = 4.0835064381541495223844595984083e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.537 y[1] (analytic) = -14.691442200070802970226494746565 y[1] (numeric) = -14.691442200070802970226494746558 absolute error = 7e-30 relative error = 4.7646785827236652507926416606601e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=717.1MB, alloc=4.4MB, time=29.46 x[1] = 1.538 y[1] (analytic) = -14.689629588136914612631626106034 y[1] (numeric) = -14.689629588136914612631626106028 absolute error = 6e-30 relative error = 4.0845141560584305134035532745046e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.539 y[1] (analytic) = -14.687816823827864252071384127494 y[1] (numeric) = -14.687816823827864252071384127488 absolute error = 6e-30 relative error = 4.0850182651149855921138647831938e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.54 y[1] (analytic) = -14.68600390715237487668791958677 y[1] (numeric) = -14.686003907152374876687919586764 absolute error = 6e-30 relative error = 4.0855225410078238655209297531690e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.541 y[1] (analytic) = -14.684190838119164702070543723408 y[1] (numeric) = -14.684190838119164702070543723402 absolute error = 6e-30 relative error = 4.0860269838120098811958684148710e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.542 y[1] (analytic) = -14.68237761673694717468701771596 y[1] (numeric) = -14.682377616736947174687017715954 absolute error = 6e-30 relative error = 4.0865315936026557844543375718553e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.543 y[1] (analytic) = -14.680564243014430975311417651836 y[1] (numeric) = -14.68056424301443097531141765183 absolute error = 6e-30 relative error = 4.0870363704549213544176647367471e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.544 y[1] (analytic) = -14.678750716960320022448579365717 y[1] (numeric) = -14.67875071696032002244857936571 absolute error = 7e-30 relative error = 4.7687982001846830467930061344990e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.545 y[1] (analytic) = -14.676937038583313475755127513707 y[1] (numeric) = -14.6769370385833134757551275137 absolute error = 7e-30 relative error = 4.7693874965860538293428184005314e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=721.0MB, alloc=4.4MB, time=29.62 x[1] = 1.546 y[1] (analytic) = -14.675123207892105739457093243624 y[1] (numeric) = -14.675123207892105739457093243617 absolute error = 7e-30 relative error = 4.7699769881560406412598602493550e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.547 y[1] (analytic) = -14.673309224895386465764124814998 y[1] (numeric) = -14.673309224895386465764124814992 absolute error = 6e-30 relative error = 4.0890571499850450892513246769440e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.548 y[1] (analytic) = -14.671495089601840558280295515626 y[1] (numeric) = -14.67149508960184055828029551562 absolute error = 6e-30 relative error = 4.0895627632744753913626574448351e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.549 y[1] (analytic) = -14.669680802020148175411513214707 y[1] (numeric) = -14.669680802020148175411513214701 absolute error = 6e-30 relative error = 4.0900685440774863685768705750562e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.55 y[1] (analytic) = -14.667866362158984733769535885901 y[1] (numeric) = -14.667866362158984733769535885895 absolute error = 6e-30 relative error = 4.0905744924695722492532394589471e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.551 y[1] (analytic) = -14.666051770027020911572597426848 y[1] (numeric) = -14.666051770027020911572597426842 absolute error = 6e-30 relative error = 4.0910806085262751852839425404256e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.552 y[1] (analytic) = -14.66423702563292265204264809501 y[1] (numeric) = -14.664237025632922652042648095004 absolute error = 6e-30 relative error = 4.0915868923231852884652805685001e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.553 y[1] (analytic) = -14.662422128985351166799213872961 y[1] (numeric) = -14.662422128985351166799213872955 absolute error = 6e-30 relative error = 4.0920933439359406669035319472446e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=724.8MB, alloc=4.5MB, time=29.78 x[1] = 1.554 y[1] (analytic) = -14.660607080092962939249879069546 y[1] (numeric) = -14.660607080092962939249879069541 absolute error = 5e-30 relative error = 3.4104999695335228845462339950083e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.555 y[1] (analytic) = -14.658791878964409727977396456667 y[1] (numeric) = -14.658791878964409727977396456661 absolute error = 6e-30 relative error = 4.0931067509117798822036543636382e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.556 y[1] (analytic) = -14.656976525608338570123429234733 y[1] (numeric) = -14.656976525608338570123429234727 absolute error = 6e-30 relative error = 4.0936137064263802449663065435267e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.557 y[1] (analytic) = -14.655161020033391784768929113207 y[1] (numeric) = -14.655161020033391784768929113202 absolute error = 5e-30 relative error = 3.4117673583832158398684868095772e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.558 y[1] (analytic) = -14.65334536224820697631115478597 y[1] (numeric) = -14.653345362248206976311154785965 absolute error = 5e-30 relative error = 3.4121901015734123398250941463333e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.559 y[1] (analytic) = -14.651529552261417037837335074621 y[1] (numeric) = -14.651529552261417037837335074616 absolute error = 5e-30 relative error = 3.4126129849891787477028666519577e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.56 y[1] (analytic) = -14.649713590081650154494981006195 y[1] (numeric) = -14.64971359008165015449498100619 absolute error = 5e-30 relative error = 3.4130360086938276506328077391248e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.561 y[1] (analytic) = -14.647897475717529806858851085163 y[1] (numeric) = -14.647897475717529806858851085158 absolute error = 5e-30 relative error = 3.4134591727507118764193567723121e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=728.6MB, alloc=4.5MB, time=29.93 x[1] = 1.562 y[1] (analytic) = -14.646081209177674774294574012971 y[1] (numeric) = -14.646081209177674774294574012966 absolute error = 5e-30 relative error = 3.4138824772232245241397502054500e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.563 y[1] (analytic) = -14.644264790470699138318933101797 y[1] (numeric) = -14.644264790470699138318933101792 absolute error = 5e-30 relative error = 3.4143059221747989947725529927129e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.564 y[1] (analytic) = -14.642448219605212285956816622604 y[1] (numeric) = -14.642448219605212285956816622599 absolute error = 5e-30 relative error = 3.4147295076689090218553911754688e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.565 y[1] (analytic) = -14.64063149658981891309483832103 y[1] (numeric) = -14.640631496589818913094838321025 absolute error = 5e-30 relative error = 3.4151532337690687021719165880925e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.566 y[1] (analytic) = -14.638814621433119027831632328065 y[1] (numeric) = -14.63881462143311902783163232806 absolute error = 5e-30 relative error = 3.4155771005388325264680346651009e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.567 y[1] (analytic) = -14.63699759414370795382482668596 y[1] (numeric) = -14.636997594143707953824826685955 absolute error = 5e-30 relative error = 3.4160011080417954101974263718646e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.568 y[1] (analytic) = -14.635180414730176333634699703241 y[1] (numeric) = -14.635180414730176333634699703237 absolute error = 4e-30 relative error = 2.7331402050732741794371162568081e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.569 y[1] (analytic) = -14.633363083201110132064523346227 y[1] (numeric) = -14.633363083201110132064523346223 absolute error = 4e-30 relative error = 2.7334796364015202607904569412212e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.57 y[1] (analytic) = -14.631545599565090639497597867893 y[1] (numeric) = -14.631545599565090639497597867889 absolute error = 4e-30 relative error = 2.7338191804691476716928003900493e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=732.4MB, alloc=4.5MB, time=30.09 TOP MAIN SOLVE Loop x[1] = 1.571 y[1] (analytic) = -14.629727963830694475230981868472 y[1] (numeric) = -14.629727963830694475230981868469 absolute error = 3e-30 relative error = 2.0506191279953714625042936803388e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.572 y[1] (analytic) = -14.627910176006493590805921975677 y[1] (numeric) = -14.627910176006493590805921975674 absolute error = 3e-30 relative error = 2.0508739552699508225186379631036e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.573 y[1] (analytic) = -14.626092236101055273334986325949 y[1] (numeric) = -14.626092236101055273334986325945 absolute error = 4e-30 relative error = 2.7348384896185356005507251008235e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.574 y[1] (analytic) = -14.624274144122942148825906021704 y[1] (numeric) = -14.6242741441229421488259060217 absolute error = 4e-30 relative error = 2.7351784851540684629833189436481e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.575 y[1] (analytic) = -14.622455900080712185502128733077 y[1] (numeric) = -14.622455900080712185502128733073 absolute error = 4e-30 relative error = 2.7355185936843352227734896173044e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.576 y[1] (analytic) = -14.620637503982918697120088606238 y[1] (numeric) = -14.620637503982918697120088606234 absolute error = 4e-30 relative error = 2.7358588152605039808981054551725e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.577 y[1] (analytic) = -14.618818955838110346283196633922 y[1] (numeric) = -14.618818955838110346283196633918 absolute error = 4e-30 relative error = 2.7361991499337754253588548673674e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.578 y[1] (analytic) = -14.617000255654831147752555637412 y[1] (numeric) = -14.617000255654831147752555637407 absolute error = 5e-30 relative error = 3.4206744971942285700476241215664e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=736.2MB, alloc=4.5MB, time=30.25 x[1] = 1.579 y[1] (analytic) = -14.615181403441620471754404002803 y[1] (numeric) = -14.615181403441620471754404002799 absolute error = 4e-30 relative error = 2.7368801587765922095784617896650e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.58 y[1] (analytic) = -14.613362399207013047284292308001 y[1] (numeric) = -14.613362399207013047284292307996 absolute error = 5e-30 relative error = 3.4215260413108776053577205081056e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.581 y[1] (analytic) = -14.611543242959538965407996970492 y[1] (numeric) = -14.611543242959538965407996970487 absolute error = 5e-30 relative error = 3.4219520257788047063227796970764e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.582 y[1] (analytic) = -14.609723934707723682559175039619 y[1] (numeric) = -14.609723934707723682559175039615 absolute error = 4e-30 relative error = 2.7379025215509812483332779482523e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.583 y[1] (analytic) = -14.607904474460088023833764250681 y[1] (numeric) = -14.607904474460088023833764250676 absolute error = 5e-30 relative error = 3.4228044198548890838331128432451e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.584 y[1] (analytic) = -14.606084862225148186281132451852 y[1] (numeric) = -14.606084862225148186281132451848 absolute error = 4e-30 relative error = 2.7385846636732633157281350353050e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.585 y[1] (analytic) = -14.604265098011415742191980508618 y[1] (numeric) = -14.604265098011415742191980508614 absolute error = 4e-30 relative error = 2.7389259049704996753261428553803e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.586 y[1] (analytic) = -14.602445181827397642383002784037 y[1] (numeric) = -14.602445181827397642383002784033 absolute error = 4e-30 relative error = 2.7392672598271154384525469544255e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=740.0MB, alloc=4.5MB, time=30.41 x[1] = 1.587 y[1] (analytic) = -14.600625113681596219478309286895 y[1] (numeric) = -14.600625113681596219478309286891 absolute error = 4e-30 relative error = 2.7396087282946385343538678226325e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.588 y[1] (analytic) = -14.598804893582509191187613573483 y[1] (numeric) = -14.598804893582509191187613573479 absolute error = 4e-30 relative error = 2.7399503104246297540254618009712e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.589 y[1] (analytic) = -14.596984521538629663581190482449 y[1] (numeric) = -14.596984521538629663581190482445 absolute error = 4e-30 relative error = 2.7402920062686827753298590948130e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.59 y[1] (analytic) = -14.595163997558446134361607775912 y[1] (numeric) = -14.595163997558446134361607775907 absolute error = 5e-30 relative error = 3.4257922698480302351738959788145e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.591 y[1] (analytic) = -14.593343321650442496132235753751 y[1] (numeric) = -14.593343321650442496132235753746 absolute error = 5e-30 relative error = 3.4262196741318918993765155220967e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.592 y[1] (analytic) = -14.591522493823098039662538901741 y[1] (numeric) = -14.591522493823098039662538901736 absolute error = 5e-30 relative error = 3.4266472207520540735381298021043e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.593 y[1] (analytic) = -14.589701514084887457150153627946 y[1] (numeric) = -14.589701514084887457150153627942 absolute error = 4e-30 relative error = 2.7416599278185388831222808861640e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.594 y[1] (analytic) = -14.587880382444280845479756135588 y[1] (numeric) = -14.587880382444280845479756135583 absolute error = 5e-30 relative error = 3.4275027412599486027392933005923e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=743.8MB, alloc=4.5MB, time=30.56 x[1] = 1.595 y[1] (analytic) = -14.586059098909743709478724474341 y[1] (numeric) = -14.586059098909743709478724474336 absolute error = 5e-30 relative error = 3.4279307152771184799190875279900e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.596 y[1] (analytic) = -14.584237663489736965169598805855 y[1] (numeric) = -14.584237663489736965169598805851 absolute error = 4e-30 relative error = 2.7426870655115711796204874083288e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.597 y[1] (analytic) = -14.582416076192716943019343913058 y[1] (numeric) = -14.582416076192716943019343913054 absolute error = 4e-30 relative error = 2.7430296729294457491943591167781e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.598 y[1] (analytic) = -14.580594337027135391185417976641 y[1] (numeric) = -14.580594337027135391185417976637 absolute error = 4e-30 relative error = 2.7433723945272092866201265714085e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.599 y[1] (analytic) = -14.578772446001439478758651635944 y[1] (numeric) = -14.57877244600143947875865163594 absolute error = 4e-30 relative error = 2.7437152303567857252366440034305e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.6 y[1] (analytic) = -14.576950403124071799002941345303 y[1] (numeric) = -14.576950403124071799002941345299 absolute error = 4e-30 relative error = 2.7440581804701321631422945861628e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.601 y[1] (analytic) = -14.575128208403470372591761030757 y[1] (numeric) = -14.575128208403470372591761030753 absolute error = 4e-30 relative error = 2.7444012449192388886032049280588e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.602 y[1] (analytic) = -14.573305861848068650841496045892 y[1] (numeric) = -14.573305861848068650841496045888 absolute error = 4e-30 relative error = 2.7447444237561294054857838838225e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=747.7MB, alloc=4.5MB, time=30.72 x[1] = 1.603 y[1] (analytic) = -14.571483363466295518941603419454 y[1] (numeric) = -14.57148336346629551894160341945 absolute error = 4e-30 relative error = 2.7450877170328604587136116766757e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.604 y[1] (analytic) = -14.569660713266575299181602381257 y[1] (numeric) = -14.569660713266575299181602381253 absolute error = 4e-30 relative error = 2.7454311248015220597487053582993e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.605 y[1] (analytic) = -14.567837911257327754174899146802 y[1] (numeric) = -14.567837911257327754174899146797 absolute error = 5e-30 relative error = 3.4322183088927968901214833331092e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.606 y[1] (analytic) = -14.566014957446968090079449934923 y[1] (numeric) = -14.566014957446968090079449934917 absolute error = 6e-30 relative error = 4.1191774260347451552590675611705e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.607 y[1] (analytic) = -14.564191851843906959815266186705 y[1] (numeric) = -14.564191851843906959815266186699 absolute error = 6e-30 relative error = 4.1196930533707346972765328849148e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.608 y[1] (analytic) = -14.562368594456550466278765947831 y[1] (numeric) = -14.562368594456550466278765947825 absolute error = 6e-30 relative error = 4.1202088527576598935734637582144e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.609 y[1] (analytic) = -14.560545185293300165553975370459 y[1] (numeric) = -14.560545185293300165553975370453 absolute error = 6e-30 relative error = 4.1207248242739058349921316735583e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.61 y[1] (analytic) = -14.558721624362553070120584284683 y[1] (numeric) = -14.558721624362553070120584284678 absolute error = 5e-30 relative error = 3.4343674733315897852365830942597e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.611 y[1] (analytic) = -14.556897911672701652058859783588 y[1] (numeric) = -14.556897911672701652058859783582 absolute error = 6e-30 relative error = 4.1217572840081510045881696295705e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=751.5MB, alloc=4.5MB, time=30.88 x[1] = 1.612 y[1] (analytic) = -14.555074047232133846251421759869 y[1] (numeric) = -14.555074047232133846251421759863 absolute error = 6e-30 relative error = 4.1222737723831712179482075673007e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.613 y[1] (analytic) = -14.553250031049233053581884326 y[1] (numeric) = -14.553250031049233053581884325993 absolute error = 7e-30 relative error = 4.8099221720684799278412025715080e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.614 y[1] (analytic) = -14.551425863132378144130367043873 y[1] (numeric) = -14.551425863132378144130367043867 absolute error = 6e-30 relative error = 4.1233072665419361478813948595147e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.615 y[1] (analytic) = -14.549601543489943460365879883903 y[1] (numeric) = -14.549601543489943460365879883897 absolute error = 6e-30 relative error = 4.1238242724830034382199211651795e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.616 y[1] (analytic) = -14.54777707213029882033558582753 y[1] (numeric) = -14.547777072130298820335585827524 absolute error = 6e-30 relative error = 4.1243414511034929044354039464889e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.617 y[1] (analytic) = -14.545952449061809520850945021152 y[1] (numeric) = -14.545952449061809520850945021146 absolute error = 6e-30 relative error = 4.1248588024821917561213370124966e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.618 y[1] (analytic) = -14.544127674292836340670744383497 y[1] (numeric) = -14.544127674292836340670744383491 absolute error = 6e-30 relative error = 4.1253763266979376416466996049094e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.619 y[1] (analytic) = -14.542302747831735543681016562515 y[1] (numeric) = -14.542302747831735543681016562509 absolute error = 6e-30 relative error = 4.1258940238296186869310413068746e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=755.3MB, alloc=4.5MB, time=31.04 x[1] = 1.62 y[1] (analytic) = -14.540477669686858882071852131936 y[1] (numeric) = -14.54047766968685888207185213193 absolute error = 6e-30 relative error = 4.1264118939561735342567629782476e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.621 y[1] (analytic) = -14.538652439866553599511108911687 y[1] (numeric) = -14.538652439866553599511108911681 absolute error = 6e-30 relative error = 4.1269299371565913811186336210710e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.622 y[1] (analytic) = -14.536827058379162434315022290449 y[1] (numeric) = -14.536827058379162434315022290443 absolute error = 6e-30 relative error = 4.1274481535099120191105831304360e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.623 y[1] (analytic) = -14.535001525233023622615720422733 y[1] (numeric) = -14.535001525233023622615720422727 absolute error = 6e-30 relative error = 4.1279665430952258728498109374129e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.624 y[1] (analytic) = -14.533175840436470901525648166931 y[1] (numeric) = -14.533175840436470901525648166925 absolute error = 6e-30 relative error = 4.1284851059916740389382506023239e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.625 y[1] (analytic) = -14.531350003997833512298903624939 y[1] (numeric) = -14.531350003997833512298903624934 absolute error = 5e-30 relative error = 3.4408365352320402708011920569014e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.626 y[1] (analytic) = -14.529524015925436203489491138041 y[1] (numeric) = -14.529524015925436203489491138035 absolute error = 6e-30 relative error = 4.1295227520347912885247705366479e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.627 y[1] (analytic) = -14.527697876227599234106494587882 y[1] (numeric) = -14.527697876227599234106494587876 absolute error = 6e-30 relative error = 4.1300418353399962763273557778629e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=759.1MB, alloc=4.5MB, time=31.20 x[1] = 1.628 y[1] (analytic) = -14.525871584912638376766174845526 y[1] (numeric) = -14.52587158491263837676617484552 absolute error = 6e-30 relative error = 4.1305610922734074632732261429528e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.629 y[1] (analytic) = -14.524045141988864920840995205702 y[1] (numeric) = -14.524045141988864920840995205696 absolute error = 6e-30 relative error = 4.1310805229144198916202235929753e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.63 y[1] (analytic) = -14.522218547464585675605578637542 y[1] (numeric) = -14.522218547464585675605578637536 absolute error = 6e-30 relative error = 4.1316001273424795101664365156597e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.631 y[1] (analytic) = -14.520391801348102973379600677269 y[1] (numeric) = -14.520391801348102973379600677263 absolute error = 6e-30 relative error = 4.1321199056370832134742819505828e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.632 y[1] (analytic) = -14.518564903647714672667621782486 y[1] (numeric) = -14.51856490364771467266762178248 absolute error = 6e-30 relative error = 4.1326398578777788811322660963711e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.633 y[1] (analytic) = -14.516737854371714161295862961903 y[1] (numeric) = -14.516737854371714161295862961897 absolute error = 6e-30 relative error = 4.1331599841441654170544636256422e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.634 y[1] (analytic) = -14.514910653528390359545928488554 y[1] (numeric) = -14.514910653528390359545928488548 absolute error = 6e-30 relative error = 4.1336802845158927888177563856906e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.635 y[1] (analytic) = -14.513083301126027723285479498761 y[1] (numeric) = -14.513083301126027723285479498754 absolute error = 7e-30 relative error = 4.8232342189181057448763508011699e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=762.9MB, alloc=4.5MB, time=31.36 x[1] = 1.636 y[1] (analytic) = -14.511255797172906247095862273332 y[1] (numeric) = -14.511255797172906247095862273326 absolute error = 6e-30 relative error = 4.1347214078942254647772638604090e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.637 y[1] (analytic) = -14.509428141677301467396694991731 y[1] (numeric) = -14.509428141677301467396694991725 absolute error = 6e-30 relative error = 4.1352422310603863770058708241829e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.638 y[1] (analytic) = -14.507600334647484465567416744156 y[1] (numeric) = -14.507600334647484465567416744149 absolute error = 7e-30 relative error = 4.8250571000928326567597683454906e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.639 y[1] (analytic) = -14.505772376091721871065802580789 y[1] (numeric) = -14.505772376091721871065802580782 absolute error = 7e-30 relative error = 4.8256651342036322164851427514399e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.64 y[1] (analytic) = -14.503944266018275864543448371687 y[1] (numeric) = -14.50394426601827586454344837168 absolute error = 7e-30 relative error = 4.8262733719961328263975933057140e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.641 y[1] (analytic) = -14.502116004435404180958229245093 y[1] (numeric) = -14.502116004435404180958229245086 absolute error = 7e-30 relative error = 4.8268818135636777573099279900044e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.642 y[1] (analytic) = -14.500287591351360112683735366218 y[1] (numeric) = -14.500287591351360112683735366211 absolute error = 7e-30 relative error = 4.8274904589996702230473863506677e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.643 y[1] (analytic) = -14.498459026774392512615688812855 y[1] (numeric) = -14.498459026774392512615688812849 absolute error = 6e-30 relative error = 4.1383708357693486514911702739835e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.644 y[1] (analytic) = -14.496630310712745797275345298488 y[1] (numeric) = -14.496630310712745797275345298481 absolute error = 7e-30 relative error = 4.8287083618509106071576744360614e-29 % Correct digits = 30 h = 0.001 memory used=766.7MB, alloc=4.5MB, time=31.52 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.645 y[1] (analytic) = -14.494801443174659949909884487863 y[1] (numeric) = -14.494801443174659949909884487856 absolute error = 7e-30 relative error = 4.8293176194532650850943684860968e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.646 y[1] (analytic) = -14.492972424168370523589792644355 y[1] (numeric) = -14.492972424168370523589792644348 absolute error = 7e-30 relative error = 4.8299270812982803097908723075287e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.647 y[1] (analytic) = -14.491143253702108644303241342751 y[1] (numeric) = -14.491143253702108644303241342744 absolute error = 7e-30 relative error = 4.8305367474796599054067792339641e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.648 y[1] (analytic) = -14.489313931784101014047465975461 y[1] (numeric) = -14.489313931784101014047465975454 absolute error = 7e-30 relative error = 4.8311466180911677175353713827552e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.649 y[1] (analytic) = -14.487484458422569913917147774505 y[1] (numeric) = -14.487484458422569913917147774497 absolute error = 8e-30 relative error = 5.5220076494018604111583733936849e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.65 y[1] (analytic) = -14.485654833625733207189803065994 y[1] (numeric) = -14.485654833625733207189803065987 absolute error = 7e-30 relative error = 4.8323669729799247602767445608687e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.651 y[1] (analytic) = -14.483825057401804342408183468222 y[1] (numeric) = -14.483825057401804342408183468215 absolute error = 7e-30 relative error = 4.8329774574450032085082879073191e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.652 y[1] (analytic) = -14.481995129758992356459690738832 y[1] (numeric) = -14.481995129758992356459690738825 absolute error = 7e-30 relative error = 4.8335881467158684018342410583704e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=770.5MB, alloc=4.5MB, time=31.67 x[1] = 1.653 y[1] (analytic) = -14.480165050705501877652809970968 y[1] (numeric) = -14.480165050705501877652809970961 absolute error = 7e-30 relative error = 4.8341990408865859923127810275040e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.654 y[1] (analytic) = -14.478334820249533128790564832697 y[1] (numeric) = -14.47833482024953312879056483269 absolute error = 7e-30 relative error = 4.8348101400512821334687613350368e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.655 y[1] (analytic) = -14.47650443839928193024099853842 y[1] (numeric) = -14.476504438399281930240998538413 absolute error = 7e-30 relative error = 4.8354214443041435271233068208155e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.656 y[1] (analytic) = -14.474673905162939703004684235412 y[1] (numeric) = -14.474673905162939703004684235406 absolute error = 6e-30 relative error = 4.1451711032052149745158727267874e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.657 y[1] (analytic) = -14.472843220548693471779268483082 y[1] (numeric) = -14.472843220548693471779268483075 absolute error = 7e-30 relative error = 4.8366446684514119019873349982062e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.658 y[1] (analytic) = -14.471012384564725868021051496966 y[1] (numeric) = -14.47101238456472586802105149696 absolute error = 6e-30 relative error = 4.1462199330295675289302337916664e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.659 y[1] (analytic) = -14.469181397219215133003607823969 y[1] (numeric) = -14.469181397219215133003607823963 absolute error = 6e-30 relative error = 4.1467446120712264112292137830183e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.66 y[1] (analytic) = -14.467350258520335120873451109781 y[1] (numeric) = -14.467350258520335120873451109775 absolute error = 6e-30 relative error = 4.1472694673071784034520432587289e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=774.4MB, alloc=4.5MB, time=31.83 x[1] = 1.661 y[1] (analytic) = -14.46551896847625530170274661393 y[1] (numeric) = -14.465518968476255301702746613924 absolute error = 6e-30 relative error = 4.1477944988184672006414127719996e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.662 y[1] (analytic) = -14.463687527095140764539075122375 y[1] (numeric) = -14.463687527095140764539075122369 absolute error = 6e-30 relative error = 4.1483197066861886784422208948729e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.663 y[1] (analytic) = -14.461855934385152220452251902072 y[1] (numeric) = -14.461855934385152220452251902065 absolute error = 7e-30 relative error = 4.8403192728234060891436782223884e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.664 y[1] (analytic) = -14.460024190354446005578204336431 y[1] (numeric) = -14.460024190354446005578204336425 absolute error = 6e-30 relative error = 4.1493706518155743242086885872398e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.665 y[1] (analytic) = -14.458192295011174084159911875123 y[1] (numeric) = -14.458192295011174084159911875116 absolute error = 7e-30 relative error = 4.8415457874463067625085151184442e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.666 y[1] (analytic) = -14.456360248363484051585411926182 y[1] (numeric) = -14.456360248363484051585411926176 absolute error = 6e-30 relative error = 4.1504223033451474960358672034304e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.667 y[1] (analytic) = -14.454528050419519137422875312955 y[1] (numeric) = -14.454528050419519137422875312948 absolute error = 7e-30 relative error = 4.8427731265821829440637850261916e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.668 y[1] (analytic) = -14.452695701187418208452754912897 y[1] (numeric) = -14.452695701187418208452754912891 absolute error = 6e-30 relative error = 4.1514746619255578317129687952340e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=778.2MB, alloc=4.5MB, time=31.99 x[1] = 1.669 y[1] (analytic) = -14.450863200675315771697011089883 y[1] (numeric) = -14.450863200675315771697011089877 absolute error = 6e-30 relative error = 4.1520011065633842668052040086444e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.67 y[1] (analytic) = -14.449030548891341977445417526161 y[1] (numeric) = -14.449030548891341977445417526155 absolute error = 6e-30 relative error = 4.1525277282082937515665007473322e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.671 y[1] (analytic) = -14.447197745843622622278951054735 y[1] (numeric) = -14.447197745843622622278951054729 absolute error = 6e-30 relative error = 4.1530545269418536120074298099556e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.672 y[1] (analytic) = -14.445364791540279152090269087499 y[1] (numeric) = -14.445364791540279152090269087493 absolute error = 6e-30 relative error = 4.1535815028456837610024124989666e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.673 y[1] (analytic) = -14.44353168598942866510127822905 y[1] (numeric) = -14.443531685989428665101278229044 absolute error = 6e-30 relative error = 4.1541086560014567391317917583524e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.674 y[1] (analytic) = -14.44169842919918391487779766073 y[1] (numeric) = -14.441698429199183914877797660725 absolute error = 5e-30 relative error = 3.4621966554090814629694412765082e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.675 y[1] (analytic) = -14.439865021177653313341320874039 y[1] (numeric) = -14.439865021177653313341320874033 absolute error = 6e-30 relative error = 4.1551634943957847289731731263100e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.676 y[1] (analytic) = -14.438031461932940933777879327182 y[1] (numeric) = -14.438031461932940933777879327177 absolute error = 5e-30 relative error = 3.4630759831649569404219445178374e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=782.0MB, alloc=4.5MB, time=32.15 x[1] = 1.677 y[1] (analytic) = -14.436197751473146513844011593184 y[1] (numeric) = -14.436197751473146513844011593178 absolute error = 6e-30 relative error = 4.1562190427792720147767178200947e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.678 y[1] (analytic) = -14.434363889806365458569841562585 y[1] (numeric) = -14.434363889806365458569841562579 absolute error = 6e-30 relative error = 4.1567470834216920809067608926453e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.679 y[1] (analytic) = -14.432529876940688843359269258448 y[1] (numeric) = -14.432529876940688843359269258443 absolute error = 5e-30 relative error = 3.4643960848393314113389131002970e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.68 y[1] (analytic) = -14.430695712884203416987277816025 y[1] (numeric) = -14.43069571288420341698727781602 absolute error = 5e-30 relative error = 3.4648364150148591119112575016639e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.681 y[1] (analytic) = -14.428861397644991604594360174111 y[1] (numeric) = -14.428861397644991604594360174106 absolute error = 5e-30 relative error = 3.4652768934464057002080192011741e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.682 y[1] (analytic) = -14.427026931231131510678069019808 y[1] (numeric) = -14.427026931231131510678069019803 absolute error = 5e-30 relative error = 3.4657175202024278715177898255311e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.683 y[1] (analytic) = -14.425192313650696922081693523101 y[1] (numeric) = -14.425192313650696922081693523096 absolute error = 5e-30 relative error = 3.4661582953514265197142884823971e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.684 y[1] (analytic) = -14.423357544911757310980066392336 y[1] (numeric) = -14.423357544911757310980066392331 absolute error = 5e-30 relative error = 3.4665992189619467716547966779648e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.685 y[1] (analytic) = -14.421522625022377837862504776424 y[1] (numeric) = -14.42152262502237783786250477642 absolute error = 4e-30 relative error = 2.7736322328820624172894745306477e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=785.8MB, alloc=4.5MB, time=32.31 TOP MAIN SOLVE Loop x[1] = 1.686 y[1] (analytic) = -14.419687553990619354512888534294 y[1] (numeric) = -14.41968755399061935451288853429 absolute error = 4e-30 relative error = 2.7739852094735631725905399000049e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.687 y[1] (analytic) = -14.417852331824538406986879386839 y[1] (numeric) = -14.417852331824538406986879386835 absolute error = 4e-30 relative error = 2.7743383049990021092520401458900e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.688 y[1] (analytic) = -14.416016958532187238586284461368 y[1] (numeric) = -14.416016958532187238586284461364 absolute error = 4e-30 relative error = 2.7746915195133571500271125604512e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.689 y[1] (analytic) = -14.414181434121613792830567733278 y[1] (numeric) = -14.414181434121613792830567733274 absolute error = 4e-30 relative error = 2.7750448530716417420490623808200e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.69 y[1] (analytic) = -14.412345758600861716425512864457 y[1] (numeric) = -14.412345758600861716425512864453 absolute error = 4e-30 relative error = 2.7753983057289048845101451178502e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.691 y[1] (analytic) = -14.410509931977970362229040932661 y[1] (numeric) = -14.410509931977970362229040932657 absolute error = 4e-30 relative error = 2.7757518775402311563671229857172e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.692 y[1] (analytic) = -14.408673954260974792214186540901 y[1] (numeric) = -14.408673954260974792214186540897 absolute error = 4e-30 relative error = 2.7761055685607407440736245905369e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.693 y[1] (analytic) = -14.406837825457905780429235790653 y[1] (numeric) = -14.406837825457905780429235790649 absolute error = 4e-30 relative error = 2.7764593788455894693393370739764e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=789.6MB, alloc=4.5MB, time=32.46 x[1] = 1.694 y[1] (analytic) = -14.405001545576789815955029597495 y[1] (numeric) = -14.40500154557678981595502959749 absolute error = 5e-30 relative error = 3.4710166355624610211450749321186e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.695 y[1] (analytic) = -14.403165114625649105859435822571 y[1] (numeric) = -14.403165114625649105859435822566 absolute error = 5e-30 relative error = 3.4714591967863824530133123454640e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.696 y[1] (analytic) = -14.401328532612501578148993688112 y[1] (numeric) = -14.401328532612501578148993688107 absolute error = 5e-30 relative error = 3.4719019072978297501561072012993e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.697 y[1] (analytic) = -14.399491799545360884717733940035 y[1] (numeric) = -14.399491799545360884717733940029 absolute error = 6e-30 relative error = 4.1668137205991114563834251007274e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.698 y[1] (analytic) = -14.397654915432236404293178215486 y[1] (numeric) = -14.39765491543223640429317821548 absolute error = 6e-30 relative error = 4.1673453317518078351828337797847e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.699 y[1] (analytic) = -14.395817880281133245379521068048 y[1] (numeric) = -14.395817880281133245379521068042 absolute error = 6e-30 relative error = 4.1678771222985401631286233226666e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.7 y[1] (analytic) = -14.393980694100052249197998098132 y[1] (numeric) = -14.393980694100052249197998098126 absolute error = 6e-30 relative error = 4.1684090923224175122501214341469e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.701 y[1] (analytic) = -14.39214335689698999262444363098 y[1] (numeric) = -14.392143356896989992624443630974 absolute error = 6e-30 relative error = 4.1689412419066027420252759699683e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=793.4MB, alloc=4.5MB, time=32.63 x[1] = 1.702 y[1] (analytic) = -14.390305868679938791124041379542 y[1] (numeric) = -14.390305868679938791124041379536 absolute error = 6e-30 relative error = 4.1694735711343125413836614204668e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.703 y[1] (analytic) = -14.388468229456886701683271524367 y[1] (numeric) = -14.388468229456886701683271524361 absolute error = 6e-30 relative error = 4.1700060800888174707501751531884e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.704 y[1] (analytic) = -14.386630439235817525739057637537 y[1] (numeric) = -14.386630439235817525739057637532 absolute error = 5e-30 relative error = 3.4754489740445350034412231979885e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.705 y[1] (analytic) = -14.384792498024710812105116872571 y[1] (numeric) = -14.384792498024710812105116872566 absolute error = 5e-30 relative error = 3.4758930312596371426926271104659e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.706 y[1] (analytic) = -14.382954405831541859895516837101 y[1] (numeric) = -14.382954405831541859895516837096 absolute error = 5e-30 relative error = 3.4763372384555146663631974794578e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.707 y[1] (analytic) = -14.381116162664281721445442560068 y[1] (numeric) = -14.381116162664281721445442560062 absolute error = 6e-30 relative error = 4.1721379148420875570020236681444e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.708 y[1] (analytic) = -14.379277768530897205229176960074 y[1] (numeric) = -14.379277768530897205229176960068 absolute error = 6e-30 relative error = 4.1726713236815149933139224166446e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.709 y[1] (analytic) = -14.377439223439350878775298216477 y[1] (numeric) = -14.377439223439350878775298216472 absolute error = 5e-30 relative error = 3.4776707606237454859751833607096e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=797.2MB, alloc=4.5MB, time=32.78 x[1] = 1.71 y[1] (analytic) = -14.375600527397601071579097439732 y[1] (numeric) = -14.375600527397601071579097439726 absolute error = 6e-30 relative error = 4.1737386821266751681138519724087e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.711 y[1] (analytic) = -14.373761680413601878012220032437 y[1] (numeric) = -14.373761680413601878012220032431 absolute error = 6e-30 relative error = 4.1742726318997597990028207349839e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.712 y[1] (analytic) = -14.371922682495303160229534127515 y[1] (numeric) = -14.37192268249530316022953412751 absolute error = 5e-30 relative error = 3.4790056351262548153517549286738e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.713 y[1] (analytic) = -14.370083533650650551073229484887 y[1] (numeric) = -14.370083533650650551073229484882 absolute error = 5e-30 relative error = 3.4794508941381039192805923696893e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.714 y[1] (analytic) = -14.368244233887585456974150222992 y[1] (numeric) = -14.368244233887585456974150222987 absolute error = 5e-30 relative error = 3.4798963036885687554882423649115e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.715 y[1] (analytic) = -14.366404783214045060850364756493 y[1] (numeric) = -14.366404783214045060850364756488 absolute error = 5e-30 relative error = 3.4803418638475829178488400817831e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.716 y[1] (analytic) = -14.364565181637962325002976306481 y[1] (numeric) = -14.364565181637962325002976306475 absolute error = 6e-30 relative error = 4.1769450896221504220702583950004e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.717 y[1] (analytic) = -14.36272542916726599400917734449 y[1] (numeric) = -14.362725429167265994009177344485 absolute error = 5e-30 relative error = 3.4812334362712203894839289271959e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=801.1MB, alloc=4.5MB, time=32.94 x[1] = 1.718 y[1] (analytic) = -14.360885525809880597612551326669 y[1] (numeric) = -14.360885525809880597612551326664 absolute error = 5e-30 relative error = 3.4816794486759377860447775751614e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.719 y[1] (analytic) = -14.359045471573726453610625069427 y[1] (numeric) = -14.359045471573726453610625069422 absolute error = 5e-30 relative error = 3.4821256119693927544648049646708e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.72 y[1] (analytic) = -14.357205266466719670739675112943 y[1] (numeric) = -14.357205266466719670739675112938 absolute error = 5e-30 relative error = 3.4825719262217460015568569343647e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.721 y[1] (analytic) = -14.355364910496772151556791413922 y[1] (numeric) = -14.355364910496772151556791413917 absolute error = 5e-30 relative error = 3.4830183915032037635427185116447e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.722 y[1] (analytic) = -14.353524403671791595319201704056 y[1] (numeric) = -14.353524403671791595319201704051 absolute error = 5e-30 relative error = 3.4834650078840178417408707360632e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.723 y[1] (analytic) = -14.351683745999681500860859845673 y[1] (numeric) = -14.351683745999681500860859845668 absolute error = 5e-30 relative error = 3.4839117754344856382889052083169e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.724 y[1] (analytic) = -14.349842937488341169466301511131 y[1] (numeric) = -14.349842937488341169466301511126 absolute error = 5e-30 relative error = 3.4843586942249501919006343581335e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.725 y[1] (analytic) = -14.348001978145665707741770507585 y[1] (numeric) = -14.34800197814566570774177050758 absolute error = 5e-30 relative error = 3.4848057643258002136579354737595e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.726 y[1] (analytic) = -14.346160867979546030483619063815 y[1] (numeric) = -14.34616086797954603048361906381 absolute error = 5e-30 relative error = 3.4852529858074701228373665852521e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=804.9MB, alloc=4.5MB, time=33.09 TOP MAIN SOLVE Loop x[1] = 1.727 y[1] (analytic) = -14.344319606997868863543985390913 y[1] (numeric) = -14.344319606997868863543985390908 absolute error = 5e-30 relative error = 3.4857003587404400827715923433274e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.728 y[1] (analytic) = -14.342478195208516746693751823691 y[1] (numeric) = -14.342478195208516746693751823687 absolute error = 4e-30 relative error = 2.7889183065561888293965264681258e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.729 y[1] (analytic) = -14.340636632619368036482786844814 y[1] (numeric) = -14.34063663261936803648278684481 absolute error = 4e-30 relative error = 2.7892764473939437951425202625521e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.73 y[1] (analytic) = -14.338794919238296909097474288725 y[1] (numeric) = -14.338794919238296909097474288721 absolute error = 4e-30 relative error = 2.7896347095621110522698255862831e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.731 y[1] (analytic) = -14.336953055073173363215533017597 y[1] (numeric) = -14.336953055073173363215533017593 absolute error = 4e-30 relative error = 2.7899930931172213998735524998566e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.732 y[1] (analytic) = -14.335111040131863222858130356639 y[1] (numeric) = -14.335111040131863222858130356635 absolute error = 4e-30 relative error = 2.7903515981158423761581905739459e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.733 y[1] (analytic) = -14.333268874422228140239292571243 y[1] (numeric) = -14.333268874422228140239292571239 absolute error = 4e-30 relative error = 2.7907102246145782872944805798826e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.734 y[1] (analytic) = -14.331426557952125598612615663583 y[1] (numeric) = -14.33142655795212559861261566358 absolute error = 3e-30 relative error = 2.0933017295025526772282616639424e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=808.7MB, alloc=4.5MB, time=33.25 x[1] = 1.735 y[1] (analytic) = -14.329584090729408915115279761462 y[1] (numeric) = -14.329584090729408915115279761459 absolute error = 3e-30 relative error = 2.0935708817542471139804515403836e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.736 y[1] (analytic) = -14.327741472761927243609370367322 y[1] (numeric) = -14.327741472761927243609370367319 absolute error = 3e-30 relative error = 2.0938401252585531133460593919584e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.737 y[1] (analytic) = -14.325898704057525577520509730552 y[1] (numeric) = -14.325898704057525577520509730549 absolute error = 3e-30 relative error = 2.0941094600580344256997197015344e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.738 y[1] (analytic) = -14.324055784624044752673801601364 y[1] (numeric) = -14.324055784624044752673801601361 absolute error = 3e-30 relative error = 2.0943788861952824859201925647934e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.739 y[1] (analytic) = -14.322212714469321450127092619724 y[1] (numeric) = -14.322212714469321450127092619721 absolute error = 3e-30 relative error = 2.0946484037129164351596471004553e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.74 y[1] (analytic) = -14.320369493601188199001553588006 y[1] (numeric) = -14.320369493601188199001553588004 absolute error = 2e-30 relative error = 1.3966120084357220950894207256558e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.741 y[1] (analytic) = -14.318526122027473379309583871251 y[1] (numeric) = -14.318526122027473379309583871249 absolute error = 2e-30 relative error = 1.3967918087066381516235000946820e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.742 y[1] (analytic) = -14.316682599756001224780042164111 y[1] (numeric) = -14.316682599756001224780042164108 absolute error = 3e-30 relative error = 2.0954575049747410803630797491831e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=812.5MB, alloc=4.5MB, time=33.41 x[1] = 1.743 y[1] (analytic) = -14.314838926794591825680806858798 y[1] (numeric) = -14.314838926794591825680806858795 absolute error = 3e-30 relative error = 2.0957273884406648857803335511994e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.744 y[1] (analytic) = -14.31299510315106113163866924358 y[1] (numeric) = -14.312995103151061131638669243577 absolute error = 3e-30 relative error = 2.0959973635004866434878112539442e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.745 y[1] (analytic) = -14.311151128833220954456562756587 y[1] (numeric) = -14.311151128833220954456562756584 absolute error = 3e-30 relative error = 2.0962674301969921906211496002676e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.746 y[1] (analytic) = -14.309307003848878970928131514963 y[1] (numeric) = -14.309307003848878970928131514961 absolute error = 2e-30 relative error = 1.3976917257153301490459332407845e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.747 y[1] (analytic) = -14.307462728205838725649641334645 y[1] (numeric) = -14.307462728205838725649641334642 absolute error = 3e-30 relative error = 2.0968078386713373199119553344480e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.748 y[1] (analytic) = -14.305618301911899633829236451286 y[1] (numeric) = -14.305618301911899633829236451283 absolute error = 3e-30 relative error = 2.0970781805348879603843523698902e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.749 y[1] (analytic) = -14.30377372497485698409354514817 y[1] (numeric) = -14.303773724974856984093545148168 absolute error = 2e-30 relative error = 1.3982324094710297005703123140937e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.75 y[1] (analytic) = -14.301928997402501941291637492173 y[1] (numeric) = -14.301928997402501941291637492171 absolute error = 2e-30 relative error = 1.3984127598194882962224273697286e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=816.3MB, alloc=4.5MB, time=33.56 x[1] = 1.751 y[1] (analytic) = -14.300084119202621549296338374163 y[1] (numeric) = -14.300084119202621549296338374161 absolute error = 2e-30 relative error = 1.3985931714306033086608203178680e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.752 y[1] (analytic) = -14.298239090382998733802899045515 y[1] (numeric) = -14.298239090382998733802899045513 absolute error = 2e-30 relative error = 1.3987736443330289468074339816760e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.753 y[1] (analytic) = -14.296393910951412305125030337708 y[1] (numeric) = -14.296393910951412305125030337706 absolute error = 2e-30 relative error = 1.3989541785554380951032621175356e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.754 y[1] (analytic) = -14.294548580915636960988300747291 y[1] (numeric) = -14.294548580915636960988300747289 absolute error = 2e-30 relative error = 1.3991347741265223282347079544622e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.755 y[1] (analytic) = -14.292703100283443289320902563835 y[1] (numeric) = -14.292703100283443289320902563834 absolute error = 1e-30 relative error = 6.9965771553749596293715104084951e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.756 y[1] (analytic) = -14.290857469062597771041789213794 y[1] (numeric) = -14.290857469062597771041789213792 absolute error = 2e-30 relative error = 1.3994961494295758874357955283431e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.757 y[1] (analytic) = -14.289011687260862782846186988546 y[1] (numeric) = -14.289011687260862782846186988543 absolute error = 3e-30 relative error = 2.0995153938285329202654658492849e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.758 y[1] (analytic) = -14.28716575488599659998848432024 y[1] (numeric) = -14.287165754885996599988484320239 absolute error = 1e-30 relative error = 6.9992888523604829365844922717763e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=820.1MB, alloc=4.5MB, time=33.72 x[1] = 1.759 y[1] (analytic) = -14.285319671945753399062501764416 y[1] (numeric) = -14.285319671945753399062501764415 absolute error = 1e-30 relative error = 7.0001933660879252808376001581852e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.76 y[1] (analytic) = -14.283473438447883260779145843697 y[1] (numeric) = -14.283473438447883260779145843695 absolute error = 2e-30 relative error = 1.4002196374842913796131317500127e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.761 y[1] (analytic) = -14.281627054400132172741449902286 y[1] (numeric) = -14.281627054400132172741449902285 absolute error = 1e-30 relative error = 7.0020033165051918880211321506016e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.762 y[1] (analytic) = -14.279780519810242032217005116326 y[1] (numeric) = -14.279780519810242032217005116325 absolute error = 1e-30 relative error = 7.0029087534833383933292235353422e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.763 y[1] (analytic) = -14.277933834685950648907784800563 y[1] (numeric) = -14.277933834685950648907784800562 absolute error = 1e-30 relative error = 7.0038144985001986737686991121756e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.764 y[1] (analytic) = -14.276086999034991747717365147183 y[1] (numeric) = -14.276086999034991747717365147183 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.765 y[1] (analytic) = -14.274240012865094971515545528064 y[1] (numeric) = -14.274240012865094971515545528064 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.766 y[1] (analytic) = -14.272392876183985883900371487089 y[1] (numeric) = -14.272392876183985883900371487088 absolute error = 1e-30 relative error = 7.0065335832274980828948596071192e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.767 y[1] (analytic) = -14.270545588999385971957563544609 y[1] (numeric) = -14.270545588999385971957563544609 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=824.0MB, alloc=4.5MB, time=33.88 x[1] = 1.768 y[1] (analytic) = -14.268698151319012649017354931549 y[1] (numeric) = -14.268698151319012649017354931549 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.769 y[1] (analytic) = -14.266850563150579257408741366071 y[1] (numeric) = -14.266850563150579257408741366072 absolute error = 1e-30 relative error = 7.0092554455071536954197896270782e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.77 y[1] (analytic) = -14.265002824501795071211145981192 y[1] (numeric) = -14.265002824501795071211145981192 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.771 y[1] (analytic) = -14.263154935380365299003502507138 y[1] (numeric) = -14.263154935380365299003502507138 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.772 y[1] (analytic) = -14.261306895793991086610759807744 y[1] (numeric) = -14.261306895793991086610759807744 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.773 y[1] (analytic) = -14.259458705750369519847810865605 y[1] (numeric) = -14.259458705750369519847810865604 absolute error = 1e-30 relative error = 7.0128889226119991001715659152508e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.774 y[1] (analytic) = -14.257610365257193627260849306198 y[1] (numeric) = -14.257610365257193627260849306198 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.775 y[1] (analytic) = -14.255761874322152382866156546673 y[1] (numeric) = -14.255761874322152382866156546673 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=827.8MB, alloc=4.5MB, time=34.03 x[1] = 1.776 y[1] (analytic) = -14.25391323295293070888632265046 y[1] (numeric) = -14.253913232952930708886322650459 absolute error = 1e-30 relative error = 7.0156172810716182736949389125178e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.777 y[1] (analytic) = -14.252064441157209478483903964381 y[1] (numeric) = -14.25206444115720947848390396438 absolute error = 1e-30 relative error = 7.0165273538350916998871250425797e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.778 y[1] (analytic) = -14.250215498942665518492520610438 y[1] (numeric) = -14.250215498942665518492520610437 absolute error = 1e-30 relative error = 7.0174377368131575898599119145400e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.779 y[1] (analytic) = -14.248366406316971612145396899941 y[1] (numeric) = -14.248366406316971612145396899941 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.78 y[1] (analytic) = -14.246517163287796501801347733196 y[1] (numeric) = -14.246517163287796501801347733196 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.781 y[1] (analytic) = -14.244667769862804891668214043458 y[1] (numeric) = -14.244667769862804891668214043458 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.782 y[1] (analytic) = -14.242818226049657450523750339428 y[1] (numeric) = -14.242818226049657450523750339429 absolute error = 1e-30 relative error = 7.0210823737891430244389885849897e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.783 y[1] (analytic) = -14.240968531856010814433967396078 y[1] (numeric) = -14.240968531856010814433967396079 absolute error = 1e-30 relative error = 7.0219943100293546271667614287284e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=831.6MB, alloc=4.5MB, time=34.19 x[1] = 1.784 y[1] (analytic) = -14.239118687289517589468933139154 y[1] (numeric) = -14.239118687289517589468933139154 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.785 y[1] (analytic) = -14.237268692357826354416034764272 y[1] (numeric) = -14.237268692357826354416034764272 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.786 y[1] (analytic) = -14.23541854706858166349070512707 y[1] (numeric) = -14.23541854706858166349070512707 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.787 y[1] (analytic) = -14.233568251429424049044616436449 y[1] (numeric) = -14.23356825142942404904461643645 absolute error = 1e-30 relative error = 7.0256451673639443038266872276030e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.788 y[1] (analytic) = -14.231717805447990024271344278544 y[1] (numeric) = -14.231717805447990024271344278544 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.789 y[1] (analytic) = -14.229867209131912085909504994603 y[1] (numeric) = -14.229867209131912085909504994603 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.79 y[1] (analytic) = -14.228016462488818716943369431611 y[1] (numeric) = -14.228016462488818716943369431612 absolute error = 1e-30 relative error = 7.0283865824616581813861482354746e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.791 y[1] (analytic) = -14.226165565526334389300956080035 y[1] (numeric) = -14.226165565526334389300956080036 absolute error = 1e-30 relative error = 7.0293010115336892007331156674753e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=835.4MB, alloc=4.5MB, time=34.35 x[1] = 1.792 y[1] (analytic) = -14.224314518252079566549606608716 y[1] (numeric) = -14.224314518252079566549606608716 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.793 y[1] (analytic) = -14.222463320673670706589046802536 y[1] (numeric) = -14.222463320673670706589046802536 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.794 y[1] (analytic) = -14.220611972798720264341935904128 y[1] (numeric) = -14.220611972798720264341935904128 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.795 y[1] (analytic) = -14.218760474634836694441907356496 y[1] (numeric) = -14.218760474634836694441907356495 absolute error = 1e-30 relative error = 7.0329618519414702776838859594596e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.796 y[1] (analytic) = -14.216908826189624453919103939091 y[1] (numeric) = -14.216908826189624453919103939091 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.797 y[1] (analytic) = -14.215057027470684004883210285521 y[1] (numeric) = -14.21505702747068400488321028552 absolute error = 1e-30 relative error = 7.0347941486797691280602438630211e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.798 y[1] (analytic) = -14.213205078485611817203985766699 y[1] (numeric) = -14.213205078485611817203985766698 absolute error = 1e-30 relative error = 7.0357107666988505341864401152817e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.799 y[1] (analytic) = -14.211352979242000371189300718963 y[1] (numeric) = -14.211352979242000371189300718963 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.8 y[1] (analytic) = -14.209500729747438160260678992299 y[1] (numeric) = -14.209500729747438160260678992298 absolute error = 1e-30 relative error = 7.0375449427755802154771102307651e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=839.2MB, alloc=4.5MB, time=34.51 x[1] = 1.801 y[1] (analytic) = -14.207648330009509693626349789509 y[1] (numeric) = -14.207648330009509693626349789508 absolute error = 1e-30 relative error = 7.0384625011290004514078306685017e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.802 y[1] (analytic) = -14.205795780035795498951811762876 y[1] (numeric) = -14.205795780035795498951811762875 absolute error = 1e-30 relative error = 7.0393803732231339923731387761109e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.803 y[1] (analytic) = -14.203943079833872125027912330507 y[1] (numeric) = -14.203943079833872125027912330505 absolute error = 2e-30 relative error = 1.4080597118412219072171888979999e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.804 y[1] (analytic) = -14.202090229411312144436445170288 y[1] (numeric) = -14.202090229411312144436445170287 absolute error = 1e-30 relative error = 7.0412170592261530062926071026626e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.805 y[1] (analytic) = -14.200237228775684156213268845082 y[1] (numeric) = -14.200237228775684156213268845081 absolute error = 1e-30 relative error = 7.0421358734315876301695562026222e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.806 y[1] (analytic) = -14.19838407793455278850894950848 y[1] (numeric) = -14.198384077934552788508949508479 absolute error = 1e-30 relative error = 7.0430550019708340157958844455904e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.807 y[1] (analytic) = -14.196530776895478701246930636192 y[1] (numeric) = -14.196530776895478701246930636191 absolute error = 1e-30 relative error = 7.0439744449924102297019968395711e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.808 y[1] (analytic) = -14.194677325666018588779232723845 y[1] (numeric) = -14.194677325666018588779232723844 absolute error = 1e-30 relative error = 7.0448942026449318744944013377822e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=843.0MB, alloc=4.5MB, time=34.67 x[1] = 1.809 y[1] (analytic) = -14.192823724253725182539685887717 y[1] (numeric) = -14.192823724253725182539685887716 absolute error = 1e-30 relative error = 7.0458142750771121665567256445531e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.81 y[1] (analytic) = -14.190969972666147253694698300678 y[1] (numeric) = -14.190969972666147253694698300677 absolute error = 1e-30 relative error = 7.0467346624377620138270452508077e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.811 y[1] (analytic) = -14.189116070910829615791563391345 y[1] (numeric) = -14.189116070910829615791563391344 absolute error = 1e-30 relative error = 7.0476553648757900936516078273597e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.812 y[1] (analytic) = -14.187262018995313127404308730233 y[1] (numeric) = -14.187262018995313127404308730232 absolute error = 1e-30 relative error = 7.0485763825402029307150392160073e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.813 y[1] (analytic) = -14.18540781692713469477708952244 y[1] (numeric) = -14.185407816927134694777089522439 absolute error = 1e-30 relative error = 7.0494977155801049750471163703504e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.814 y[1] (analytic) = -14.183553464713827274465129622178 y[1] (numeric) = -14.183553464713827274465129622176 absolute error = 2e-30 relative error = 1.4100838728289397360212385420679e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.815 y[1] (analytic) = -14.181698962362919875973212980236 y[1] (numeric) = -14.181698962362919875973212980234 absolute error = 2e-30 relative error = 1.4102682656766569161878722933639e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.816 y[1] (analytic) = -14.179844309881937564391728431269 y[1] (numeric) = -14.179844309881937564391728431267 absolute error = 2e-30 relative error = 1.4104527216890522744838885409462e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=846.8MB, alloc=4.5MB, time=34.82 x[1] = 1.817 y[1] (analytic) = -14.177989507278401463030270723566 y[1] (numeric) = -14.177989507278401463030270723564 absolute error = 2e-30 relative error = 1.4106372408960251975117759652435e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.818 y[1] (analytic) = -14.176134554559828756048800689784 y[1] (numeric) = -14.176134554559828756048800689782 absolute error = 2e-30 relative error = 1.4108218233274947351801262935210e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.819 y[1] (analytic) = -14.174279451733732691086367452926 y[1] (numeric) = -14.174279451733732691086367452924 absolute error = 2e-30 relative error = 1.4110064690133996163972289634246e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.82 y[1] (analytic) = -14.172424198807622581887395557662 y[1] (numeric) = -14.17242419880762258188739555766 absolute error = 2e-30 relative error = 1.4111911779836982647800992986562e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.821 y[1] (analytic) = -14.17056879578900381092553991291 y[1] (numeric) = -14.170568795789003810925539912908 absolute error = 2e-30 relative error = 1.4113759502683688143789574474082e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.822 y[1] (analytic) = -14.168713242685377832025111427433 y[1] (numeric) = -14.16871324268537783202511142743 absolute error = 3e-30 relative error = 2.1173411788461136881257630352883e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.823 y[1] (analytic) = -14.166857539504242172980076216027 y[1] (numeric) = -14.166857539504242172980076216025 absolute error = 2e-30 relative error = 1.4117456849008368000467090797416e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.824 y[1] (analytic) = -14.165001686253090438170631249754 y[1] (numeric) = -14.165001686253090438170631249752 absolute error = 2e-30 relative error = 1.4119306473086891981190337317356e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=850.7MB, alloc=4.5MB, time=34.98 x[1] = 1.825 y[1] (analytic) = -14.163145682939412311177359319469 y[1] (numeric) = -14.163145682939412311177359319467 absolute error = 2e-30 relative error = 1.4121156731510234529715984412076e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.826 y[1] (analytic) = -14.161289529570693557392966177816 y[1] (numeric) = -14.161289529570693557392966177814 absolute error = 2e-30 relative error = 1.4123007624579164872298186556302e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.827 y[1] (analytic) = -14.159433226154416026631602720668 y[1] (numeric) = -14.159433226154416026631602720666 absolute error = 2e-30 relative error = 1.4124859152594650286246231918500e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.828 y[1] (analytic) = -14.157576772698057655735775064913 y[1] (numeric) = -14.157576772698057655735775064911 absolute error = 2e-30 relative error = 1.4126711315857856258255734402427e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.829 y[1] (analytic) = -14.155720169209092471180845375328 y[1] (numeric) = -14.155720169209092471180845375326 absolute error = 2e-30 relative error = 1.4128564114670146642895721557008e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.83 y[1] (analytic) = -14.153863415694990591677126289184 y[1] (numeric) = -14.153863415694990591677126289182 absolute error = 2e-30 relative error = 1.4130417549333083821251792913350e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.831 y[1] (analytic) = -14.152006512163218230769571783133 y[1] (numeric) = -14.152006512163218230769571783131 absolute error = 2e-30 relative error = 1.4132271620148428859725523537393e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.832 y[1] (analytic) = -14.150149458621237699435067322792 y[1] (numeric) = -14.15014945862123769943506732279 absolute error = 2e-30 relative error = 1.4134126327418141668990287816748e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.833 y[1] (analytic) = -14.148292255076507408677322131389 y[1] (numeric) = -14.148292255076507408677322131387 absolute error = 2e-30 relative error = 1.4135981671444381163103678730594e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=854.5MB, alloc=4.5MB, time=35.14 TOP MAIN SOLVE Loop x[1] = 1.834 y[1] (analytic) = -14.146434901536481872119366409713 y[1] (numeric) = -14.146434901536481872119366409711 absolute error = 2e-30 relative error = 1.4137837652529505418776698082231e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.835 y[1] (analytic) = -14.14457739800861170859365633556 y[1] (numeric) = -14.144577398008611708593656335557 absolute error = 3e-30 relative error = 2.1209541406464107752199840107325e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.836 y[1] (analytic) = -14.142719744500343644729789666767 y[1] (numeric) = -14.142719744500343644729789666764 absolute error = 3e-30 relative error = 2.1212327290630255937439926224054e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.837 y[1] (analytic) = -14.140861941019120517539834767898 y[1] (numeric) = -14.140861941019120517539834767895 absolute error = 3e-30 relative error = 2.1215114131747137466670379990886e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.838 y[1] (analytic) = -14.139003987572381277001275876543 y[1] (numeric) = -14.13900398757238127700127587654 absolute error = 3e-30 relative error = 2.1217901930269486824628371522774e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.839 y[1] (analytic) = -14.137145884167560988637577421182 y[1] (numeric) = -14.137145884167560988637577421178 absolute error = 4e-30 relative error = 2.8294254248869784584115592716584e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.84 y[1] (analytic) = -14.135287630812090836096370198485 y[1] (numeric) = -14.135287630812090836096370198481 absolute error = 4e-30 relative error = 2.8297973868468035888232049887040e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.841 y[1] (analytic) = -14.133429227513398123725262213924 y[1] (numeric) = -14.133429227513398123725262213919 absolute error = 5e-30 relative error = 3.5377118458035312151553771615921e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=858.3MB, alloc=4.5MB, time=35.29 x[1] = 1.842 y[1] (analytic) = -14.131570674278906279145276985486 y[1] (numeric) = -14.131570674278906279145276985481 absolute error = 5e-30 relative error = 3.5381771179197925430184938220667e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.843 y[1] (analytic) = -14.129711971116034855821922106315 y[1] (numeric) = -14.12971197111603485582192210631 absolute error = 5e-30 relative error = 3.5386425499833279030332589188046e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.844 y[1] (analytic) = -14.127853118032199535633890858038 y[1] (numeric) = -14.127853118032199535633890858033 absolute error = 5e-30 relative error = 3.5391081420702269196161964556303e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.845 y[1] (analytic) = -14.125994115034812131439399662561 y[1] (numeric) = -14.125994115034812131439399662557 absolute error = 4e-30 relative error = 2.8316591154053035587494251475993e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.846 y[1] (analytic) = -14.124134962131280589640164156098 y[1] (numeric) = -14.124134962131280589640164156093 absolute error = 5e-30 relative error = 3.5400398066187256167084932593872e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.847 y[1] (analytic) = -14.122275659329008992743016665191 y[1] (numeric) = -14.122275659329008992743016665186 absolute error = 5e-30 relative error = 3.5405058792327558635196374754807e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.848 y[1] (analytic) = -14.120416206635397561919167860522 y[1] (numeric) = -14.120416206635397561919167860518 absolute error = 4e-30 relative error = 2.8327776897400087841631844237730e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.849 y[1] (analytic) = -14.118556604057842659561115360301 y[1] (numeric) = -14.118556604057842659561115360296 absolute error = 5e-30 relative error = 3.5414385055218321507512422976605e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=862.1MB, alloc=4.5MB, time=35.44 x[1] = 1.85 y[1] (analytic) = -14.116696851603736791837202051043 y[1] (numeric) = -14.116696851603736791837202051038 absolute error = 5e-30 relative error = 3.5419050593496109922574911807284e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.851 y[1] (analytic) = -14.114836949280468611243826889609 y[1] (numeric) = -14.114836949280468611243826889605 absolute error = 4e-30 relative error = 2.8338974189878316763323893094654e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.852 y[1] (analytic) = -14.112976897095422919155310946381 y[1] (numeric) = -14.112976897095422919155310946376 absolute error = 5e-30 relative error = 3.5428386487538605650450140667407e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.853 y[1] (analytic) = -14.111116695055980668371421445498 y[1] (numeric) = -14.111116695055980668371421445493 absolute error = 5e-30 relative error = 3.5433056844833670606632570377084e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.854 y[1] (analytic) = -14.109256343169518965662556554163 y[1] (numeric) = -14.109256343169518965662556554158 absolute error = 5e-30 relative error = 3.5437728809999028370952518852526e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.855 y[1] (analytic) = -14.107395841443411074312593669033 y[1] (numeric) = -14.107395841443411074312593669028 absolute error = 5e-30 relative error = 3.5442402383801122851244697934441e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.856 y[1] (analytic) = -14.105535189885026416659403943807 y[1] (numeric) = -14.105535189885026416659403943803 absolute error = 4e-30 relative error = 2.8357662053605523777468572108507e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.857 y[1] (analytic) = -14.103674388501730576633035798195 y[1] (numeric) = -14.10367438850173057663303579819 absolute error = 5e-30 relative error = 3.5451754360383831830853799406042e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=865.9MB, alloc=4.5MB, time=35.60 x[1] = 1.858 y[1] (analytic) = -14.101813437300885302291570144497 y[1] (numeric) = -14.101813437300885302291570144493 absolute error = 4e-30 relative error = 2.8365146211759895686352926614404e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.859 y[1] (analytic) = -14.099952336289848508354650064165 y[1] (numeric) = -14.09995233628984850835465006416 absolute error = 5e-30 relative error = 3.5461112780723491472369419711288e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.86 y[1] (analytic) = -14.098091085475974278734687662721 y[1] (numeric) = -14.098091085475974278734687662716 absolute error = 5e-30 relative error = 3.5465794409223679241558612836231e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.861 y[1] (analytic) = -14.096229684866612869065750827615 y[1] (numeric) = -14.09622968486661286906575082761 absolute error = 5e-30 relative error = 3.5470477650969923540000141832737e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.862 y[1] (analytic) = -14.094368134469110709230132609597 y[1] (numeric) = -14.094368134469110709230132609592 absolute error = 5e-30 relative error = 3.5475162506732224208584208483454e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.863 y[1] (analytic) = -14.092506434290810405882605944375 y[1] (numeric) = -14.092506434290810405882605944371 absolute error = 4e-30 relative error = 2.8383879181824872571465711184512e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.864 y[1] (analytic) = -14.090644584339050744972366427395 y[1] (numeric) = -14.090644584339050744972366427391 absolute error = 4e-30 relative error = 2.8387629650710034048427257158752e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.865 y[1] (analytic) = -14.088782584621166694262665850723 y[1] (numeric) = -14.088782584621166694262665850719 absolute error = 4e-30 relative error = 2.8391381412658487757833968932263e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=869.7MB, alloc=4.5MB, time=35.76 x[1] = 1.866 y[1] (analytic) = -14.086920435144489405848139207144 y[1] (numeric) = -14.08692043514448940584813920714 absolute error = 4e-30 relative error = 2.8395134468287866345977488868259e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.867 y[1] (analytic) = -14.085058135916346218669827862712 y[1] (numeric) = -14.085058135916346218669827862708 absolute error = 4e-30 relative error = 2.8398888818216211474444348689130e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.868 y[1] (analytic) = -14.083195686944060661027901595142 y[1] (numeric) = -14.083195686944060661027901595138 absolute error = 4e-30 relative error = 2.8402644463061974149526934544199e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.869 y[1] (analytic) = -14.081333088234952453092082191576 y[1] (numeric) = -14.081333088234952453092082191572 absolute error = 4e-30 relative error = 2.8406401403444015051960573458978e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.87 y[1] (analytic) = -14.07947033979633750940977129542 y[1] (numeric) = -14.079470339796337509409771295416 absolute error = 4e-30 relative error = 2.8410159639981604866987109184295e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.871 y[1] (analytic) = -14.077607441635527941411885188101 y[1] (numeric) = -14.077607441635527941411885188097 absolute error = 4e-30 relative error = 2.8413919173294424614745335950332e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.872 y[1] (analytic) = -14.075744393759832059916399187772 y[1] (numeric) = -14.075744393759832059916399187768 absolute error = 4e-30 relative error = 2.8417680004002565980988659117899e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.873 y[1] (analytic) = -14.073881196176554377629604343155 y[1] (numeric) = -14.073881196176554377629604343151 absolute error = 4e-30 relative error = 2.8421442132726531648130352207359e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.874 y[1] (analytic) = -14.072017848892995611645079096907 y[1] (numeric) = -14.072017848892995611645079096903 absolute error = 4e-30 relative error = 2.8425205560087235626616780274298e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=873.5MB, alloc=4.5MB, time=35.91 TOP MAIN SOLVE Loop x[1] = 1.875 y[1] (analytic) = -14.070154351916452685940378589083 y[1] (numeric) = -14.070154351916452685940378589078 absolute error = 5e-30 relative error = 3.5536212858382504483286200113140e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.876 y[1] (analytic) = -14.068290705254218733871444267439 y[1] (numeric) = -14.068290705254218733871444267434 absolute error = 5e-30 relative error = 3.5540920391505716487641035098839e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.877 y[1] (analytic) = -14.066426908913583100664736467566 y[1] (numeric) = -14.066426908913583100664736467561 absolute error = 5e-30 relative error = 3.5545629550256368028923234303756e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.878 y[1] (analytic) = -14.064562962901831345907092622 y[1] (numeric) = -14.064562962901831345907092621995 absolute error = 5e-30 relative error = 3.5550340335412662410736883023543e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.879 y[1] (analytic) = -14.062698867226245246033313753704 y[1] (numeric) = -14.062698867226245246033313753699 absolute error = 5e-30 relative error = 3.5555052747753319173975675097985e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.88 y[1] (analytic) = -14.060834621894102796811481905533 y[1] (numeric) = -14.060834621894102796811481905528 absolute error = 5e-30 relative error = 3.5559766788057574513508935744207e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.881 y[1] (analytic) = -14.058970226912678215826011153494 y[1] (numeric) = -14.05897022691267821582601115349 absolute error = 4e-30 relative error = 2.8451585965684145356224685386871e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.882 y[1] (analytic) = -14.057105682289241944958434847891 y[1] (numeric) = -14.057105682289241944958434847886 absolute error = 5e-30 relative error = 3.5569199755676411473823411293105e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=877.4MB, alloc=4.5MB, time=36.07 x[1] = 1.883 y[1] (analytic) = -14.055240988031060652865931722621 y[1] (numeric) = -14.055240988031060652865931722617 absolute error = 4e-30 relative error = 2.8459134947641642008146733384730e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.884 y[1] (analytic) = -14.05337614414539723745759350922 y[1] (numeric) = -14.053376144145397237457593509215 absolute error = 5e-30 relative error = 3.5578639244513411790264213405593e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.885 y[1] (analytic) = -14.051511150639510828368436688399 y[1] (numeric) = -14.051511150639510828368436688395 absolute error = 4e-30 relative error = 2.8466689149073852034865943423620e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.886 y[1] (analytic) = -14.049646007520656789431161008185 y[1] (numeric) = -14.04964600752065678943116100818 absolute error = 5e-30 relative error = 3.5588085260821107162440299918152e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.887 y[1] (analytic) = -14.04778071479608672114565739394 y[1] (numeric) = -14.047780714796086721145657393935 absolute error = 5e-30 relative error = 3.5592810718732652621514014419760e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.888 y[1] (analytic) = -14.045915272473048463146267871891 y[1] (numeric) = -14.045915272473048463146267871887 absolute error = 4e-30 relative error = 2.8478030248688268718286846706857e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.889 y[1] (analytic) = -14.044049680558786096666800124015 y[1] (numeric) = -14.044049680558786096666800124011 absolute error = 4e-30 relative error = 2.8481813230390449513063620518801e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.89 y[1] (analytic) = -14.042183939060539947003299288433 y[1] (numeric) = -14.042183939060539947003299288429 absolute error = 4e-30 relative error = 2.8485597520720205076337896928074e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=881.2MB, alloc=4.5MB, time=36.23 x[1] = 1.891 y[1] (analytic) = -14.040318047985546585974579615773 y[1] (numeric) = -14.040318047985546585974579615768 absolute error = 5e-30 relative error = 3.5611728900381866268529577949266e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.892 y[1] (analytic) = -14.038452007341038834380518588214 y[1] (numeric) = -14.038452007341038834380518588209 absolute error = 5e-30 relative error = 3.5616462537218360355616211833739e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.893 y[1] (analytic) = -14.036585817134245764458116104273 y[1] (numeric) = -14.036585817134245764458116104268 absolute error = 5e-30 relative error = 3.5621197812195729410314338080787e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.894 y[1] (analytic) = -14.034719477372392702335321328663 y[1] (numeric) = -14.034719477372392702335321328658 absolute error = 5e-30 relative error = 3.5625934726100486767436774899063e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.895 y[1] (analytic) = -14.032852988062701230482629802893 y[1] (numeric) = -14.032852988062701230482629802888 absolute error = 5e-30 relative error = 3.5630673279719668715910659256910e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.896 y[1] (analytic) = -14.03098634921238919016245340859 y[1] (numeric) = -14.030986349212389190162453408585 absolute error = 5e-30 relative error = 3.5635413473840834922131301155371e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.897 y[1] (analytic) = -14.029119560828670683876265771846 y[1] (numeric) = -14.029119560828670683876265771841 absolute error = 5e-30 relative error = 3.5640155309252068853736803115750e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.898 y[1] (analytic) = -14.027252622918756077809525693234 y[1] (numeric) = -14.027252622918756077809525693229 absolute error = 5e-30 relative error = 3.5644898786741978203803922274129e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=885.0MB, alloc=4.5MB, time=36.39 x[1] = 1.899 y[1] (analytic) = -14.025385535489852004274381184467 y[1] (numeric) = -14.025385535489852004274381184462 absolute error = 5e-30 relative error = 3.5649643907099695315465653108756e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.9 y[1] (analytic) = -14.023518298549161364150156689029 y[1] (numeric) = -14.023518298549161364150156689024 absolute error = 5e-30 relative error = 3.5654390671114877606951009460590e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.901 y[1] (analytic) = -14.021650912103883329321626060447 y[1] (numeric) = -14.021650912103883329321626060442 absolute error = 5e-30 relative error = 3.5659139079577707997047485142667e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.902 y[1] (analytic) = -14.019783376161213345115073868234 y[1] (numeric) = -14.019783376161213345115073868229 absolute error = 5e-30 relative error = 3.5663889133278895330986673070187e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.903 y[1] (analytic) = -14.017915690728343132732147597907 y[1] (numeric) = -14.017915690728343132732147597902 absolute error = 5e-30 relative error = 3.5668640833009674806753523480384e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.904 y[1] (analytic) = -14.016047855812460691681503307824 y[1] (numeric) = -14.01604785581246069168150330782 absolute error = 4e-30 relative error = 2.8538715343649446721455777959540e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.905 y[1] (analytic) = -14.014179871420750302208247302004 y[1] (numeric) = -14.014179871420750302208247302 absolute error = 4e-30 relative error = 2.8542519338982068240241338042021e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.906 y[1] (analytic) = -14.012311737560392527721176374423 y[1] (numeric) = -14.012311737560392527721176374419 absolute error = 4e-30 relative error = 2.8546324653039857856434846522836e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.907 memory used=888.8MB, alloc=4.5MB, time=36.54 y[1] (analytic) = -14.010443454238564217217819176712 y[1] (numeric) = -14.010443454238564217217819176708 absolute error = 4e-30 relative error = 2.8550131286457491474500782760931e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.908 y[1] (analytic) = -14.008575021462438507707281257549 y[1] (numeric) = -14.008575021462438507707281257545 absolute error = 4e-30 relative error = 2.8553939239870067791440505640490e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.909 y[1] (analytic) = -14.006706439239184826630896318447 y[1] (numeric) = -14.006706439239184826630896318444 absolute error = 3e-30 relative error = 2.1418311385434831479910922483618e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.91 y[1] (analytic) = -14.004837707575968894280686227042 y[1] (numeric) = -14.004837707575968894280686227038 absolute error = 4e-30 relative error = 2.8561559109222559331506619724456e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.911 y[1] (analytic) = -14.002968826479952726215632325387 y[1] (numeric) = -14.002968826479952726215632325384 absolute error = 3e-30 relative error = 2.1424028269826091750622039889656e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.912 y[1] (analytic) = -14.001099795958294635675760567217 y[1] (numeric) = -14.001099795958294635675760567214 absolute error = 3e-30 relative error = 2.1426888199639943211979712009814e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.913 y[1] (analytic) = -13.999230616018149235994043014494 y[1] (numeric) = -13.999230616018149235994043014491 absolute error = 3e-30 relative error = 2.1429749121836387242346908656674e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.914 y[1] (analytic) = -13.997361286666667443006118220063 y[1] (numeric) = -13.99736128666666744300611822006 absolute error = 3e-30 relative error = 2.1432611036893655843519633959460e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.915 y[1] (analytic) = -13.995491807910996477457833019613 y[1] (numeric) = -13.995491807910996477457833019609 absolute error = 4e-30 relative error = 2.8580631927053733224405807479693e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=892.6MB, alloc=4.5MB, time=36.70 x[1] = 1.916 y[1] (analytic) = -13.993622179758279867410608252609 y[1] (numeric) = -13.993622179758279867410608252605 absolute error = 4e-30 relative error = 2.8584450463340252706179144980449e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.917 y[1] (analytic) = -13.991752402215657450644630928318 y[1] (numeric) = -13.991752402215657450644630928314 absolute error = 4e-30 relative error = 2.8588270325356685546592480618978e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.918 y[1] (analytic) = -13.989882475290265377059875349473 y[1] (numeric) = -13.989882475290265377059875349469 absolute error = 4e-30 relative error = 2.8592091513742377294404905764029e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.919 y[1] (analytic) = -13.988012398989236111074955702606 y[1] (numeric) = -13.988012398989236111074955702602 absolute error = 4e-30 relative error = 2.8595914029137100083744338671527e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.92 y[1] (analytic) = -13.986142173319698434023812620538 y[1] (numeric) = -13.986142173319698434023812620534 absolute error = 4e-30 relative error = 2.8599737872181052980975741901038e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.921 y[1] (analytic) = -13.984271798288777446550236218969 y[1] (numeric) = -13.984271798288777446550236218965 absolute error = 4e-30 relative error = 2.8603563043514862331915259218465e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.922 y[1] (analytic) = -13.982401273903594571000228105621 y[1] (numeric) = -13.982401273903594571000228105617 absolute error = 4e-30 relative error = 2.8607389543779582109390666267925e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.923 y[1] (analytic) = -13.980530600171267553812204856829 y[1] (numeric) = -13.980530600171267553812204856825 absolute error = 4e-30 relative error = 2.8611217373616694261148529820700e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=896.4MB, alloc=4.5MB, time=36.85 x[1] = 1.924 y[1] (analytic) = -13.978659777098910467905045452998 y[1] (numeric) = -13.978659777098910467905045452993 absolute error = 5e-30 relative error = 3.5768808167085136322635588668336e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.925 y[1] (analytic) = -13.976788804693633715063985160811 y[1] (numeric) = -13.976788804693633715063985160806 absolute error = 5e-30 relative error = 3.5773596280720206803706159855084e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.926 y[1] (analytic) = -13.974917682962544028324358346602 y[1] (numeric) = -13.974917682962544028324358346597 absolute error = 5e-30 relative error = 3.5778386058729539223921019058116e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.927 y[1] (analytic) = -13.973046411912744474353192701777 y[1] (numeric) = -13.973046411912744474353192701772 absolute error = 5e-30 relative error = 3.5783177501917130250081845077630e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.928 y[1] (analytic) = -13.97117499155133445582865735771 y[1] (numeric) = -13.971174991551334455828657357705 absolute error = 5e-30 relative error = 3.5787970611087513698576655635656e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.929 y[1] (analytic) = -13.969303421885409713817367364043 y[1] (numeric) = -13.969303421885409713817367364038 absolute error = 5e-30 relative error = 3.5792765387045760972874471330658e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.93 y[1] (analytic) = -13.967431702922062330149547000844 y[1] (numeric) = -13.967431702922062330149547000839 absolute error = 5e-30 relative error = 3.5797561830597481501456838332163e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.931 y[1] (analytic) = -13.965559834668380729792054391603 y[1] (numeric) = -13.965559834668380729792054391598 absolute error = 5e-30 relative error = 3.5802359942548823176186708608330e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=900.2MB, alloc=4.5MB, time=37.01 x[1] = 1.932 y[1] (analytic) = -13.963687817131449683219269880592 y[1] (numeric) = -13.963687817131449683219269880587 absolute error = 5e-30 relative error = 3.5807159723706472791115177144010e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.933 y[1] (analytic) = -13.961815650318350308781850634634 y[1] (numeric) = -13.961815650318350308781850634629 absolute error = 5e-30 relative error = 3.5811961174877656481726576272668e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.934 y[1] (analytic) = -13.959943334236160075073353925902 y[1] (numeric) = -13.959943334236160075073353925897 absolute error = 5e-30 relative error = 3.5816764296870140164622427912155e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.935 y[1] (analytic) = -13.958070868891952803294731548886 y[1] (numeric) = -13.958070868891952803294731548881 absolute error = 5e-30 relative error = 3.5821569090492229977644755162032e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.936 y[1] (analytic) = -13.956198254292798669616697821257 y[1] (numeric) = -13.956198254292798669616697821252 absolute error = 5e-30 relative error = 3.5826375556552772720439255388779e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.937 y[1] (analytic) = -13.954325490445764207539973614894 y[1] (numeric) = -13.954325490445764207539973614889 absolute error = 5e-30 relative error = 3.5831183695861156295458837594856e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.938 y[1] (analytic) = -13.952452577357912310253408859922 y[1] (numeric) = -13.952452577357912310253408859916 absolute error = 6e-30 relative error = 4.3003192211072772179289633045853e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.939 y[1] (analytic) = -13.950579515036302232989985961181 y[1] (numeric) = -13.950579515036302232989985961176 absolute error = 5e-30 relative error = 3.5840804997461705715128744740401e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=904.1MB, alloc=4.5MB, time=37.16 x[1] = 1.94 y[1] (analytic) = -13.948706303487989595380706563134 y[1] (numeric) = -13.948706303487989595380706563128 absolute error = 6e-30 relative error = 4.3014741793650428224713547432893e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.941 y[1] (analytic) = -13.946832942720026383806364095777 y[1] (numeric) = -13.946832942720026383806364095772 absolute error = 5e-30 relative error = 3.5850433001779820298347712254220e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.942 y[1] (analytic) = -13.944959432739460953747204530763 y[1] (numeric) = -13.944959432739460953747204530757 absolute error = 6e-30 relative error = 4.3026299423384635314453685046310e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.943 y[1] (analytic) = -13.943085773553338032130477773473 y[1] (numeric) = -13.943085773553338032130477773467 absolute error = 6e-30 relative error = 4.3032081258372153660136100406359e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.944 y[1] (analytic) = -13.941211965168698719675882113454 y[1] (numeric) = -13.941211965168698719675882113449 absolute error = 5e-30 relative error = 3.5864887590061804169852684718330e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.945 y[1] (analytic) = -13.939338007592580493238904152176 y[1] (numeric) = -13.939338007592580493238904152171 absolute error = 5e-30 relative error = 3.5869709144555957108643990156346e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.946 y[1] (analytic) = -13.937463900832017208152056623723 y[1] (numeric) = -13.937463900832017208152056623717 absolute error = 6e-30 relative error = 4.3049438855528237534729021118085e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.947 y[1] (analytic) = -13.935589644894039100564016520633 y[1] (numeric) = -13.935589644894039100564016520627 absolute error = 6e-30 relative error = 4.3055228755235219956444601759849e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.948 y[1] (analytic) = -13.933715239785672789776665933737 y[1] (numeric) = -13.933715239785672789776665933732 absolute error = 5e-30 relative error = 3.5884183894638782428948147852311e-29 % Correct digits = 30 h = 0.001 memory used=907.9MB, alloc=4.5MB, time=37.32 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.949 y[1] (analytic) = -13.931840685513941280580038011466 y[1] (numeric) = -13.931840685513941280580038011461 absolute error = 5e-30 relative error = 3.5889012176251077703404339802608e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.95 y[1] (analytic) = -13.929965982085863965585170440732 y[1] (numeric) = -13.929965982085863965585170440727 absolute error = 5e-30 relative error = 3.5893842141682698358625971289283e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.951 y[1] (analytic) = -13.928091129508456627554868848153 y[1] (numeric) = -13.928091129508456627554868848148 absolute error = 5e-30 relative error = 3.5898673791750654289544755470550e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.952 y[1] (analytic) = -13.926216127788731441732382517005 y[1] (numeric) = -13.926216127788731441732382517 absolute error = 5e-30 relative error = 3.5903507127272503162140353536829e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.953 y[1] (analytic) = -13.924340976933696978167994811963 y[1] (numeric) = -13.924340976933696978167994811959 absolute error = 4e-30 relative error = 2.8726673719253080689246936895283e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.954 y[1] (analytic) = -13.922465676950358204043530700347 y[1] (numeric) = -13.922465676950358204043530700342 absolute error = 5e-30 relative error = 3.5913178857950851940679169924499e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.955 y[1] (analytic) = -13.92059022784571648599478375523 y[1] (numeric) = -13.920590227845716485994783755226 absolute error = 4e-30 relative error = 2.8734413803796168055305367694430e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.956 y[1] (analytic) = -13.918714629626769592431865022483 y[1] (numeric) = -13.918714629626769592431865022479 absolute error = 4e-30 relative error = 2.8738285872215342786210748526398e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=911.7MB, alloc=4.5MB, time=37.48 x[1] = 1.957 y[1] (analytic) = -13.916838882300511695857476130445 y[1] (numeric) = -13.916838882300511695857476130441 absolute error = 4e-30 relative error = 2.8742159292274448346844983585657e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.958 y[1] (analytic) = -13.914962985873933375183109017643 y[1] (numeric) = -13.914962985873933375183109017639 absolute error = 4e-30 relative error = 2.8746034064630167711996190505564e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.959 y[1] (analytic) = -13.913086940354021618043174650635 y[1] (numeric) = -13.913086940354021618043174650631 absolute error = 4e-30 relative error = 2.8749910189939624590311200876603e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.96 y[1] (analytic) = -13.911210745747759823107063100757 y[1] (numeric) = -13.911210745747759823107063100754 absolute error = 3e-30 relative error = 2.1565340751645287838985015704108e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.961 y[1] (analytic) = -13.909334402062127802389137345255 y[1] (numeric) = -13.909334402062127802389137345251 absolute error = 4e-30 relative error = 2.8757666502050451556782400158542e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.962 y[1] (analytic) = -13.90745790930410178355666315496 y[1] (numeric) = -13.907457909304101783556663154956 absolute error = 4e-30 relative error = 2.8761546690168275982496923577898e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.963 y[1] (analytic) = -13.905581267480654412235677427417 y[1] (numeric) = -13.905581267480654412235677427413 absolute error = 4e-30 relative error = 2.8765428233872747320339711048284e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.964 y[1] (analytic) = -13.90370447659875475431479732104 y[1] (numeric) = -13.903704476598754754314797321036 absolute error = 4e-30 relative error = 2.8769311133823198370766473683709e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=915.5MB, alloc=4.5MB, time=37.64 x[1] = 1.965 y[1] (analytic) = -13.901827536665368298246972542624 y[1] (numeric) = -13.901827536665368298246972542621 absolute error = 3e-30 relative error = 2.1579896543009553629728758820711e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.966 y[1] (analytic) = -13.899950447687456957349183137252 y[1] (numeric) = -13.899950447687456957349183137248 absolute error = 4e-30 relative error = 2.8777081005101585701418572186045e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.967 y[1] (analytic) = -13.898073209671979072100085126352 y[1] (numeric) = -13.898073209671979072100085126348 absolute error = 4e-30 relative error = 2.8780967977750403562733817539909e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.968 y[1] (analytic) = -13.896195822625889412435606336433 y[1] (numeric) = -13.896195822625889412435606336428 absolute error = 5e-30 relative error = 3.5981070386608706282875615762065e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.969 y[1] (analytic) = -13.894318286556139180042494757714 y[1] (numeric) = -13.894318286556139180042494757709 absolute error = 5e-30 relative error = 3.5985932500466026319020676925809e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.97 y[1] (analytic) = -13.892440601469676010649821768662 y[1] (numeric) = -13.892440601469676010649821768657 absolute error = 5e-30 relative error = 3.5990796314587459172023869966471e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.971 y[1] (analytic) = -13.890562767373443976318442559153 y[1] (numeric) = -13.890562767373443976318442559148 absolute error = 5e-30 relative error = 3.5995661829801055814635527196858e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.972 y[1] (analytic) = -13.888684784274383587728416081773 y[1] (numeric) = -13.888684784274383587728416081769 absolute error = 4e-30 relative error = 2.8800423237548339231138579071647e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=919.3MB, alloc=4.5MB, time=37.79 x[1] = 1.973 y[1] (analytic) = -13.886806652179431796464386857503 y[1] (numeric) = -13.886806652179431796464386857499 absolute error = 4e-30 relative error = 2.8804318373455783130775217998210e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.974 y[1] (analytic) = -13.884928371095521997298930958809 y[1] (numeric) = -13.884928371095521997298930958806 absolute error = 3e-30 relative error = 2.1606161154170215944615699135972e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.975 y[1] (analytic) = -13.883049941029584030473868489949 y[1] (numeric) = -13.883049941029584030473868489946 absolute error = 3e-30 relative error = 2.1609084550894558809981445314172e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.976 y[1] (analytic) = -13.881171361988544183979544881047 y[1] (numeric) = -13.881171361988544183979544881043 absolute error = 4e-30 relative error = 2.8816011961017826308963093279284e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.977 y[1] (analytic) = -13.879292633979325195832083309303 y[1] (numeric) = -13.879292633979325195832083309299 absolute error = 4e-30 relative error = 2.8819912552367317284431909065174e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.978 y[1] (analytic) = -13.877413757008846256348610557483 y[1] (numeric) = -13.877413757008846256348610557479 absolute error = 4e-30 relative error = 2.8823814509240117999884930685060e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.979 y[1] (analytic) = -13.875534731084023010420458616614 y[1] (numeric) = -13.87553473108402301042045861661 absolute error = 4e-30 relative error = 2.8827717832302243138983962227654e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.98 y[1] (analytic) = -13.873655556211767559784344336627 y[1] (numeric) = -13.873655556211767559784344336624 absolute error = 3e-30 relative error = 2.1623716891665116832916748454559e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=923.1MB, alloc=4.5MB, time=37.95 x[1] = 1.981 y[1] (analytic) = -13.871776232398988465291529425485 y[1] (numeric) = -13.871776232398988465291529425481 absolute error = 4e-30 relative error = 2.8835528579660767750635030210028e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.982 y[1] (analytic) = -13.869896759652590749174963094131 y[1] (numeric) = -13.869896759652590749174963094128 absolute error = 3e-30 relative error = 2.1629577003968580018659862807404e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.983 y[1] (analytic) = -13.868017137979475897314409641441 y[1] (numeric) = -13.868017137979475897314409641438 absolute error = 3e-30 relative error = 2.1632508599834987298517277747395e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.984 y[1] (analytic) = -13.866137367386541861499563270128 y[1] (numeric) = -13.866137367386541861499563270125 absolute error = 3e-30 relative error = 2.1635441222845992902772944411364e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.985 y[1] (analytic) = -13.864257447880683061691152421436 y[1] (numeric) = -13.864257447880683061691152421432 absolute error = 4e-30 relative error = 2.8851166498004173014631158625538e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.986 y[1] (analytic) = -13.862377379468790388280035913225 y[1] (numeric) = -13.862377379468790388280035913222 absolute error = 3e-30 relative error = 2.1641309552308268759914053448492e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.987 y[1] (analytic) = -13.860497162157751204344293162947 y[1] (numeric) = -13.860497162157751204344293162944 absolute error = 3e-30 relative error = 2.1644245259763619021846240372530e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.988 y[1] (analytic) = -13.85861679595444934790431077379 y[1] (numeric) = -13.858616795954449347904310773787 absolute error = 3e-30 relative error = 2.1647181996371728182963808385251e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.989 y[1] (analytic) = -13.856736280865765134175867759169 y[1] (numeric) = -13.856736280865765134175867759167 absolute error = 2e-30 relative error = 1.4433413175090321781447094847108e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=927.0MB, alloc=4.5MB, time=38.11 TOP MAIN SOLVE Loop x[1] = 1.99 y[1] (analytic) = -13.854855616898575357821221677558 y[1] (numeric) = -13.854855616898575357821221677556 absolute error = 2e-30 relative error = 1.4435372372705405326752534137458e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.991 y[1] (analytic) = -13.852974804059753295198197946513 y[1] (numeric) = -13.852974804059753295198197946511 absolute error = 2e-30 relative error = 1.4437332257428779325725206350481e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.992 y[1] (analytic) = -13.851093842356168706607284601626 y[1] (numeric) = -13.851093842356168706607284601624 absolute error = 2e-30 relative error = 1.4439292829596380099996929802313e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.993 y[1] (analytic) = -13.849212731794687838536734762978 y[1] (numeric) = -13.849212731794687838536734762976 absolute error = 2e-30 relative error = 1.4441254089544370578259998470756e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.994 y[1] (analytic) = -13.847331472382173425905679068555 y[1] (numeric) = -13.847331472382173425905679068553 absolute error = 2e-30 relative error = 1.4443216037609140483050254198638e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.995 y[1] (analytic) = -13.845450064125484694305250330957 y[1] (numeric) = -13.845450064125484694305250330956 absolute error = 1e-30 relative error = 7.2225893370636532588592207735967e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.996 y[1] (analytic) = -13.843568507031477362237722670621 y[1] (numeric) = -13.84356850703147736223772267062 absolute error = 1e-30 relative error = 7.2235709997178562767950314698896e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.997 y[1] (analytic) = -13.841686801107003643353667375641 y[1] (numeric) = -13.84168680110700364335366737564 absolute error = 1e-30 relative error = 7.2245530069357149086569760144526e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=930.8MB, alloc=4.5MB, time=38.27 x[1] = 1.998 y[1] (analytic) = -13.839804946358912248687127735192 y[1] (numeric) = -13.839804946358912248687127735191 absolute error = 1e-30 relative error = 7.2255353588858785391998917562880e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 1.999 y[1] (analytic) = -13.837922942794048388888815090438 y[1] (numeric) = -13.837922942794048388888815090438 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2 y[1] (analytic) = -13.836040790419253776457328343713 y[1] (numeric) = -13.836040790419253776457328343713 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.001 y[1] (analytic) = -13.834158489241366627968399163664 y[1] (numeric) = -13.834158489241366627968399163664 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.002 y[1] (analytic) = -13.832276039267221666302165120973 y[1] (numeric) = -13.832276039267221666302165120974 absolute error = 1e-30 relative error = 7.2294682173865580023414554896689e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.003 y[1] (analytic) = -13.830393440503650122868472986177 y[1] (numeric) = -13.830393440503650122868472986178 absolute error = 1e-30 relative error = 7.2304522955319759734153078258038e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.004 y[1] (analytic) = -13.828510692957479739830214418016 y[1] (numeric) = -13.828510692957479739830214418017 absolute error = 1e-30 relative error = 7.2314367194239897147188219471766e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.005 y[1] (analytic) = -13.826627796635534772324696267706 y[1] (numeric) = -13.826627796635534772324696267707 absolute error = 1e-30 relative error = 7.2324214892320476445032287958992e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=934.6MB, alloc=4.5MB, time=38.42 x[1] = 2.006 y[1] (analytic) = -13.82474475154463599068304772141 y[1] (numeric) = -13.824744751544635990683047721411 absolute error = 1e-30 relative error = 7.2334066051257127060142172809539e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.007 y[1] (analytic) = -13.822861557691600682647666500171 y[1] (numeric) = -13.822861557691600682647666500171 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.008 y[1] (analytic) = -13.820978215083242655587706333463 y[1] (numeric) = -13.820978215083242655587706333464 absolute error = 1e-30 relative error = 7.2353778758486891900099719049387e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.009 y[1] (analytic) = -13.819094723726372238712607919513 y[1] (numeric) = -13.819094723726372238712607919514 absolute error = 1e-30 relative error = 7.2363640310176999760514834654557e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.01 y[1] (analytic) = -13.817211083627796285283675582438 y[1] (numeric) = -13.817211083627796285283675582439 absolute error = 1e-30 relative error = 7.2373505329517168106591545275992e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.011 y[1] (analytic) = -13.815327294794318174823701833268 y[1] (numeric) = -13.815327294794318174823701833269 absolute error = 1e-30 relative error = 7.2383373818208766833225245967601e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.012 y[1] (analytic) = -13.813443357232737815324642038819 y[1] (numeric) = -13.813443357232737815324642038819 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.013 y[1] (analytic) = -13.811559270949851645453341399394 y[1] (numeric) = -13.811559270949851645453341399394 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=938.4MB, alloc=4.5MB, time=38.58 x[1] = 2.014 y[1] (analytic) = -13.809675035952452636755316433245 y[1] (numeric) = -13.809675035952452636755316433245 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.015 y[1] (analytic) = -13.807790652247330295856593162695 y[1] (numeric) = -13.807790652247330295856593162695 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.016 y[1] (analytic) = -13.805906119841270666663604193817 y[1] (numeric) = -13.805906119841270666663604193817 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.017 y[1] (analytic) = -13.804021438741056332561146878544 y[1] (numeric) = -13.804021438741056332561146878545 absolute error = 1e-30 relative error = 7.2442657702160249989192649747304e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.018 y[1] (analytic) = -13.80213660895346641860840474508 y[1] (numeric) = -13.802136608953466418608404745081 absolute error = 1e-30 relative error = 7.2452550524047017614679762755133e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.019 y[1] (analytic) = -13.800251630485276593733034379461 y[1] (numeric) = -13.800251630485276593733034379461 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.02 y[1] (analytic) = -13.798366503343259072923319938145 y[1] (numeric) = -13.798366503343259072923319938145 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.021 y[1] (analytic) = -13.796481227534182619418397468494 y[1] (numeric) = -13.796481227534182619418397468493 absolute error = 1e-30 relative error = 7.2482249894578952112538901916023e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.022 y[1] (analytic) = -13.794595803064812546896551211012 y[1] (numeric) = -13.794595803064812546896551211011 absolute error = 1e-30 relative error = 7.2492156658756549338013409279300e-30 % Correct digits = 31 h = 0.001 memory used=942.2MB, alloc=4.5MB, time=38.74 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.023 y[1] (analytic) = -13.79271022994191072166158405426 y[1] (numeric) = -13.792710229941910721661584054259 absolute error = 1e-30 relative error = 7.2502066912792062096776728658478e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.024 y[1] (analytic) = -13.790824508172235564827264310331 y[1] (numeric) = -13.79082450817223556482726431033 absolute error = 1e-30 relative error = 7.2511980658401897057521202433644e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.025 y[1] (analytic) = -13.788938637762542054499850975845 y[1] (numeric) = -13.788938637762542054499850975845 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.026 y[1] (analytic) = -13.787052618719581727958699640426 y[1] (numeric) = -13.787052618719581727958699640426 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.027 y[1] (analytic) = -13.785166451050102683834951201651 y[1] (numeric) = -13.785166451050102683834951201651 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.028 y[1] (analytic) = -13.783280134760849584288305542535 y[1] (numeric) = -13.783280134760849584288305542534 absolute error = 1e-30 relative error = 7.2551670590953331311828873763819e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.029 y[1] (analytic) = -13.781393669858563657181882324609 y[1] (numeric) = -13.781393669858563657181882324608 absolute error = 1e-30 relative error = 7.2561601820221629848447440654153e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.03 y[1] (analytic) = -13.779507056349982698255171046757 y[1] (numeric) = -13.779507056349982698255171046757 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=946.0MB, alloc=4.5MB, time=38.89 x[1] = 2.031 y[1] (analytic) = -13.77762029424184107329507251697 y[1] (numeric) = -13.777620294241841073295072516969 absolute error = 1e-30 relative error = 7.2581474786174479416697177841538e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.032 y[1] (analytic) = -13.775733383540869720305033881275 y[1] (numeric) = -13.775733383540869720305033881274 absolute error = 1e-30 relative error = 7.2591416526309342034314315823910e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.033 y[1] (analytic) = -13.773846324253796151672279351159 y[1] (numeric) = -13.773846324253796151672279351158 absolute error = 1e-30 relative error = 7.2601361773518655512459602719601e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.034 y[1] (analytic) = -13.771959116387344456333138767842 y[1] (numeric) = -13.771959116387344456333138767841 absolute error = 1e-30 relative error = 7.2611310529530503973600548153249e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.035 y[1] (analytic) = -13.770071759948235301936476138864 y[1] (numeric) = -13.770071759948235301936476138863 absolute error = 1e-30 relative error = 7.2621262796074144623167206842167e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.036 y[1] (analytic) = -13.768184254943185937005220279509 y[1] (numeric) = -13.768184254943185937005220279508 absolute error = 1e-30 relative error = 7.2631218574880008723960881345065e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.037 y[1] (analytic) = -13.766296601378910193095999688674 y[1] (numeric) = -13.766296601378910193095999688673 absolute error = 1e-30 relative error = 7.2641177867679702571551227684915e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.038 y[1] (analytic) = -13.764408799262118486956883785873 y[1] (numeric) = -13.764408799262118486956883785872 absolute error = 1e-30 relative error = 7.2651140676206008470662915414717e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=949.8MB, alloc=4.5MB, time=39.05 x[1] = 2.039 y[1] (analytic) = -13.762520848599517822683232633173 y[1] (numeric) = -13.762520848599517822683232633172 absolute error = 1e-30 relative error = 7.2661107002192885712552995252498e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.04 y[1] (analytic) = -13.760632749397811793871657262936 y[1] (numeric) = -13.760632749397811793871657262935 absolute error = 1e-30 relative error = 7.2671076847375471553380128971985e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.041 y[1] (analytic) = -13.758744501663700585772092729349 y[1] (numeric) = -13.758744501663700585772092729349 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.042 y[1] (analytic) = -13.756856105403880977437985998847 y[1] (numeric) = -13.756856105403880977437985998847 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.043 y[1] (analytic) = -13.7549675606250463438746007916 y[1] (numeric) = -13.7549675606250463438746007916 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.044 y[1] (analytic) = -13.753078867333886658185441483407 y[1] (numeric) = -13.753078867333886658185441483407 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.045 y[1] (analytic) = -13.75119002553708849371679817441 y[1] (numeric) = -13.75119002553708849371679817441 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.046 y[1] (analytic) = -13.749301035241335026200415028196 y[1] (numeric) = -13.749301035241335026200415028196 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=953.7MB, alloc=4.5MB, time=39.21 x[1] = 2.047 y[1] (analytic) = -13.747411896453306035894283981968 y[1] (numeric) = -13.747411896453306035894283981967 absolute error = 1e-30 relative error = 7.2740964447132768281124556359473e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.048 y[1] (analytic) = -13.745522609179677909721565925602 y[1] (numeric) = -13.745522609179677909721565925601 absolute error = 1e-30 relative error = 7.2750962508487643572740852915623e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.049 y[1] (analytic) = -13.74363317342712364340764144456 y[1] (numeric) = -13.743633173427123643407641444559 absolute error = 1e-30 relative error = 7.2760964104707633112680186475156e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.05 y[1] (analytic) = -13.741743589202312843615293218743 y[1] (numeric) = -13.741743589202312843615293218742 absolute error = 1e-30 relative error = 7.2770969237539707835463405217319e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.051 y[1] (analytic) = -13.73985385651191173007802216654 y[1] (numeric) = -13.739853856511911730078022166539 absolute error = 1e-30 relative error = 7.2780977908732027468369214955129e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.052 y[1] (analytic) = -13.737963975362583137731499420471 y[1] (numeric) = -13.737963975362583137731499420469 absolute error = 2e-30 relative error = 1.4558198024006788304359278534915e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.053 y[1] (analytic) = -13.736073945760986518843156217974 y[1] (numeric) = -13.736073945760986518843156217973 absolute error = 1e-30 relative error = 7.2801005873195990280633016281279e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.054 y[1] (analytic) = -13.734183767713777945139913788067 y[1] (numeric) = -13.734183767713777945139913788066 absolute error = 1e-30 relative error = 7.2811025169969905796633887328127e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=957.5MB, alloc=4.5MB, time=39.37 x[1] = 2.055 y[1] (analytic) = -13.732293441227610109934055311743 y[1] (numeric) = -13.732293441227610109934055311742 absolute error = 1e-30 relative error = 7.2821048012108612881807325092954e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.056 y[1] (analytic) = -13.730402966309132330247242031169 y[1] (numeric) = -13.730402966309132330247242031168 absolute error = 1e-30 relative error = 7.2831074401366230102812511973131e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.057 y[1] (analytic) = -13.728512342964990548932675579911 y[1] (numeric) = -13.72851234296499054893267557991 absolute error = 1e-30 relative error = 7.2841104339498070776368571764174e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.058 y[1] (analytic) = -13.726621571201827336795408603583 y[1] (numeric) = -13.726621571201827336795408603581 absolute error = 2e-30 relative error = 1.4570227565652128793135312798453e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.059 y[1] (analytic) = -13.724730651026281894710805737513 y[1] (numeric) = -13.724730651026281894710805737512 absolute error = 1e-30 relative error = 7.2861174869411655477855579075528e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.06 y[1] (analytic) = -13.722839582444990055741157005216 y[1] (numeric) = -13.722839582444990055741157005215 absolute error = 1e-30 relative error = 7.2871215464710008862394120696426e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.061 y[1] (analytic) = -13.720948365464584287250445698613 y[1] (numeric) = -13.720948365464584287250445698612 absolute error = 1e-30 relative error = 7.2881259615915806410617963377664e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.062 y[1] (analytic) = -13.719057000091693693017272798201 y[1] (numeric) = -13.7190570000916936930172727982 absolute error = 1e-30 relative error = 7.2891307324790350156175674866092e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.063 y[1] (analytic) = -13.717165486332944015345939988509 y[1] (numeric) = -13.717165486332944015345939988508 absolute error = 1e-30 relative error = 7.2901358593096142876542994544120e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=961.3MB, alloc=4.5MB, time=39.52 x[1] = 2.064 y[1] (analytic) = -13.71527382419495763717569332144 y[1] (numeric) = -13.715273824194957637175693321439 absolute error = 1e-30 relative error = 7.2911413422596889095547260705079e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.065 y[1] (analytic) = -13.713382013684353584188129577268 y[1] (numeric) = -13.713382013684353584188129577267 absolute error = 1e-30 relative error = 7.2921471815057496086913081148812e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.066 y[1] (analytic) = -13.711490054807747526912767370302 y[1] (numeric) = -13.7114900548077475269127673703 absolute error = 2e-30 relative error = 1.4586306754448814975766088635126e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.067 y[1] (analytic) = -13.709597947571751782830785043426 y[1] (numeric) = -13.709597947571751782830785043424 absolute error = 2e-30 relative error = 1.4588319859184788251909292136294e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.068 y[1] (analytic) = -13.707705691982975318476927392973 y[1] (numeric) = -13.707705691982975318476927392971 absolute error = 2e-30 relative error = 1.4590333677573123356796391536756e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.069 y[1] (analytic) = -13.705813288048023751539583262596 y[1] (numeric) = -13.705813288048023751539583262594 absolute error = 2e-30 relative error = 1.4592348209967765956274817847469e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.07 y[1] (analytic) = -13.70392073577349935295903604204 y[1] (numeric) = -13.703920735773499352959036042039 absolute error = 1e-30 relative error = 7.2971817283614516363946202330873e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.071 y[1] (analytic) = -13.702028035166001049023889103974 y[1] (numeric) = -13.702028035166001049023889103972 absolute error = 2e-30 relative error = 1.4596379418192964287321228197904e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=965.1MB, alloc=4.5MB, time=39.68 x[1] = 2.072 y[1] (analytic) = -13.700135186232124423465668209242 y[1] (numeric) = -13.70013518623212442346566820924 absolute error = 2e-30 relative error = 1.4598396094732619941534840289097e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.073 y[1] (analytic) = -13.698242188978461719551602908193 y[1] (numeric) = -13.698242188978461719551602908191 absolute error = 2e-30 relative error = 1.4600413486696783340128388975536e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.074 y[1] (analytic) = -13.696349043411601842175588962951 y[1] (numeric) = -13.696349043411601842175588962949 absolute error = 2e-30 relative error = 1.4602431594440609953392615372715e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.075 y[1] (analytic) = -13.694455749538130359947333812772 y[1] (numeric) = -13.694455749538130359947333812769 absolute error = 3e-30 relative error = 2.1906675627479246729963281299060e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.076 y[1] (analytic) = -13.692562307364629507279687101874 y[1] (numeric) = -13.692562307364629507279687101872 absolute error = 2e-30 relative error = 1.4606469958689087749854096487635e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.077 y[1] (analytic) = -13.690668716897678186474158286425 y[1] (numeric) = -13.690668716897678186474158286423 absolute error = 2e-30 relative error = 1.4608490215905263527513193096297e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.078 y[1] (analytic) = -13.688774978143851969804623334579 y[1] (numeric) = -13.688774978143851969804623334576 absolute error = 3e-30 relative error = 2.1915766785486228172997663261328e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.079 y[1] (analytic) = -13.686881091109723101599222530792 y[1] (numeric) = -13.68688109110972310159922253079 absolute error = 2e-30 relative error = 1.4612532882302123857176804051515e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=968.9MB, alloc=4.5MB, time=39.84 x[1] = 2.08 y[1] (analytic) = -13.684987055801860500320451392893 y[1] (numeric) = -13.684987055801860500320451392891 absolute error = 2e-30 relative error = 1.4614555292195792682204987367601e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.081 y[1] (analytic) = -13.683092872226829760643446707648 y[1] (numeric) = -13.683092872226829760643446707646 absolute error = 2e-30 relative error = 1.4616578420362016308872650576999e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.082 y[1] (analytic) = -13.681198540391193155532469687881 y[1] (numeric) = -13.681198540391193155532469687879 absolute error = 2e-30 relative error = 1.4618602267157896449153963306086e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.083 y[1] (analytic) = -13.679304060301509638315588251485 y[1] (numeric) = -13.679304060301509638315588251483 absolute error = 2e-30 relative error = 1.4620626832940779012967772366816e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.084 y[1] (analytic) = -13.677409431964334844757560419941 y[1] (numeric) = -13.677409431964334844757560419939 absolute error = 2e-30 relative error = 1.4622652118068254312813284233451e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.085 y[1] (analytic) = -13.675514655386221095130920831286 y[1] (numeric) = -13.675514655386221095130920831283 absolute error = 3e-30 relative error = 2.1937017184347235902922264183237e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.086 y[1] (analytic) = -13.673619730573717396285272359743 y[1] (numeric) = -13.673619730573717396285272359741 absolute error = 2e-30 relative error = 1.4626704847788567612776048147672e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.087 y[1] (analytic) = -13.671724657533369443714784831579 y[1] (numeric) = -13.671724657533369443714784831576 absolute error = 3e-30 relative error = 2.1943098439646715143165194049066e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=972.7MB, alloc=4.5MB, time=40.00 x[1] = 2.088 y[1] (analytic) = -13.669829436271719623623902823997 y[1] (numeric) = -13.669829436271719623623902823994 absolute error = 3e-30 relative error = 2.1946140688776682034970226271864e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.089 y[1] (analytic) = -13.667934066795307014991264531278 y[1] (numeric) = -13.667934066795307014991264531276 absolute error = 2e-30 relative error = 1.4632789346407316798649299262457e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.09 y[1] (analytic) = -13.666038549110667391631833679614 y[1] (numeric) = -13.666038549110667391631833679612 absolute error = 2e-30 relative error = 1.4634818955125457458508164788763e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.091 y[1] (analytic) = -13.664142883224333224257246469462 y[1] (numeric) = -13.66414288322433322425724646946 absolute error = 2e-30 relative error = 1.4636849285698183547512597507946e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.092 y[1] (analytic) = -13.662247069142833682534375521558 y[1] (numeric) = -13.662247069142833682534375521556 absolute error = 2e-30 relative error = 1.4638880338485047990832386766993e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.093 y[1] (analytic) = -13.660351106872694637142112800053 y[1] (numeric) = -13.660351106872694637142112800052 absolute error = 1e-30 relative error = 7.3204560569229249836888391715154e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.094 y[1] (analytic) = -13.658454996420438661826373483587 y[1] (numeric) = -13.658454996420438661826373483586 absolute error = 1e-30 relative error = 7.3214723060703175582683556209306e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.095 y[1] (analytic) = -13.656558737792585035453322752439 y[1] (numeric) = -13.656558737792585035453322752438 absolute error = 1e-30 relative error = 7.3224889168648478725625614850792e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.096 y[1] (analytic) = -13.654662330995649744060827457258 y[1] (numeric) = -13.654662330995649744060827457257 absolute error = 1e-30 relative error = 7.3235058894867855172735362300880e-30 % Correct digits = 31 h = 0.001 memory used=976.5MB, alloc=4.5MB, time=40.15 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.097 y[1] (analytic) = -13.652765776036145482908134632219 y[1] (numeric) = -13.652765776036145482908134632218 absolute error = 1e-30 relative error = 7.3245232241165236240842150828627e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.098 y[1] (analytic) = -13.650869072920581658523778812791 y[1] (numeric) = -13.65086907292058165852377881279 absolute error = 1e-30 relative error = 7.3255409209345789694511425943410e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.099 y[1] (analytic) = -13.648972221655464390751720115688 y[1] (numeric) = -13.648972221655464390751720115687 absolute error = 1e-30 relative error = 7.3265589801215920785035098181040e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.1 y[1] (analytic) = -13.647075222247296514795715035913 y[1] (numeric) = -13.647075222247296514795715035913 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) = -13.645178074702577583261921913186 y[1] (numeric) = -13.645178074702577583261921913186 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.102 y[1] (analytic) = -13.643280779027803868199743017401 y[1] (numeric) = -13.643280779027803868199743017401 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.103 y[1] (analytic) = -13.641383335229468363140905200163 y[1] (numeric) = -13.641383335229468363140905200163 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.104 y[1] (analytic) = -13.639485743314060785136781056798 y[1] (numeric) = -13.639485743314060785136781056797 absolute error = 1e-30 relative error = 7.3316547179221179792934950229498e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=980.4MB, alloc=4.5MB, time=40.31 x[1] = 2.105 y[1] (analytic) = -13.637588003288067576793952540634 y[1] (numeric) = -13.637588003288067576793952540633 absolute error = 1e-30 relative error = 7.3326749551232717419598039764775e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.106 y[1] (analytic) = -13.635690115157971908308018968746 y[1] (numeric) = -13.635690115157971908308018968745 absolute error = 1e-30 relative error = 7.3336955559613406569466285425290e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.107 y[1] (analytic) = -13.633792078930253679495651355717 y[1] (numeric) = -13.633792078930253679495651355716 absolute error = 1e-30 relative error = 7.3347165206179589919251225731540e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.108 y[1] (analytic) = -13.631893894611389521824895009403 y[1] (numeric) = -13.631893894611389521824895009402 absolute error = 1e-30 relative error = 7.3357378492748857031339099631108e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.109 y[1] (analytic) = -13.629995562207852800443722320057 y[1] (numeric) = -13.629995562207852800443722320057 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.11 y[1] (analytic) = -13.6280970817261136162068376716 y[1] (numeric) = -13.628097081726113616206837671599 absolute error = 1e-30 relative error = 7.3377815993173241519546308380064e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.111 y[1] (analytic) = -13.626198453172638807700736401191 y[1] (numeric) = -13.626198453172638807700736401191 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.112 y[1] (analytic) = -13.624299676553891953267019730734 y[1] (numeric) = -13.624299676553891953267019730734 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=984.2MB, alloc=4.5MB, time=40.47 x[1] = 2.113 y[1] (analytic) = -13.62240075187633337302396759128 y[1] (numeric) = -13.622400751876333373023967591279 absolute error = 1e-30 relative error = 7.3408499589344498058236665676185e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.114 y[1] (analytic) = -13.620501679146420130886371258791 y[1] (numeric) = -13.620501679146420130886371258791 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.115 y[1] (analytic) = -13.618602458370606036583627717113 y[1] (numeric) = -13.618602458370606036583627717113 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.116 y[1] (analytic) = -13.61670308955534164767609766142 y[1] (numeric) = -13.61670308955534164767609766142 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.117 y[1] (analytic) = -13.614803572707074271569729052875 y[1] (numeric) = -13.614803572707074271569729052875 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.118 y[1] (analytic) = -13.612903907832247967528948132639 y[1] (numeric) = -13.612903907832247967528948132639 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.119 y[1] (analytic) = -13.611004094937303548687819800826 y[1] (numeric) = -13.611004094937303548687819800826 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.12 y[1] (analytic) = -13.609104134028678584059479263449 y[1] (numeric) = -13.609104134028678584059479263449 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=988.0MB, alloc=4.5MB, time=40.63 x[1] = 2.121 y[1] (analytic) = -13.60720402511280740054383684783 y[1] (numeric) = -13.607204025112807400543836847831 absolute error = 1e-30 relative error = 7.3490483287709043490703686870796e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.122 y[1] (analytic) = -13.605303768196121084933557884434 y[1] (numeric) = -13.605303768196121084933557884434 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.123 y[1] (analytic) = -13.603403363285047485918319550495 y[1] (numeric) = -13.603403363285047485918319550495 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.124 y[1] (analytic) = -13.601502810386011216087346568324 y[1] (numeric) = -13.601502810386011216087346568324 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.125 y[1] (analytic) = -13.599602109505433653930227648599 y[1] (numeric) = -13.599602109505433653930227648599 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.126 y[1] (analytic) = -13.597701260649732945836014566431 y[1] (numeric) = -13.597701260649732945836014566432 absolute error = 1e-30 relative error = 7.3541842171065423321705364294813e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.127 y[1] (analytic) = -13.595800263825324008090605755486 y[1] (numeric) = -13.595800263825324008090605755486 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.128 y[1] (analytic) = -13.593899119038618528872416302878 y[1] (numeric) = -13.593899119038618528872416302879 absolute error = 1e-30 relative error = 7.3562411434955649378471351157071e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.129 y[1] (analytic) = -13.591997826296024970246336225091 y[1] (numeric) = -13.591997826296024970246336225092 absolute error = 1e-30 relative error = 7.3572701583672298860088916678601e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=991.8MB, alloc=4.5MB, time=40.78 TOP MAIN SOLVE Loop x[1] = 2.13 y[1] (analytic) = -13.5900963856039485701559789026 y[1] (numeric) = -13.590096385603948570155978902601 absolute error = 1e-30 relative error = 7.3582995412696600615957142333368e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.131 y[1] (analytic) = -13.588194796968791344414221548415 y[1] (numeric) = -13.588194796968791344414221548416 absolute error = 1e-30 relative error = 7.3593292923875114485693851573584e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.132 y[1] (analytic) = -13.586293060396952088692039583223 y[1] (numeric) = -13.586293060396952088692039583224 absolute error = 1e-30 relative error = 7.3603594119055672686866047149791e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.133 y[1] (analytic) = -13.584391175894826380505636787323 y[1] (numeric) = -13.584391175894826380505636787324 absolute error = 1e-30 relative error = 7.3613899000087380890873403009246e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.134 y[1] (analytic) = -13.582489143468806581201873097031 y[1] (numeric) = -13.582489143468806581201873097032 absolute error = 1e-30 relative error = 7.3624207568820619299939471813596e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.135 y[1] (analytic) = -13.58058696312528183794199191076 y[1] (numeric) = -13.58058696312528183794199191076 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.136 y[1] (analytic) = -13.578684634870638085683648767455 y[1] (numeric) = -13.578684634870638085683648767455 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.137 y[1] (analytic) = -13.576782158711258049161243257626 y[1] (numeric) = -13.576782158711258049161243257626 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=995.6MB, alloc=4.5MB, time=40.94 x[1] = 2.138 y[1] (analytic) = -13.574879534653521244864556024676 y[1] (numeric) = -13.574879534653521244864556024675 absolute error = 1e-30 relative error = 7.3665478757821148014811194651529e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.139 y[1] (analytic) = -13.572976762703803983015692711792 y[1] (numeric) = -13.572976762703803983015692711791 absolute error = 1e-30 relative error = 7.3675805792862424590592751463207e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.14 y[1] (analytic) = -13.57107384286847936954433670718 y[1] (numeric) = -13.571073842868479369544336707178 absolute error = 2e-30 relative error = 1.4737227305346867636697423865097e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.141 y[1] (analytic) = -13.569170775153917308061312537919 y[1] (numeric) = -13.569170775153917308061312537917 absolute error = 2e-30 relative error = 1.4739294192259244192112669402362e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.142 y[1] (analytic) = -13.567267559566484501830461760304 y[1] (numeric) = -13.567267559566484501830461760302 absolute error = 2e-30 relative error = 1.4741361819681737655135971921136e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.143 y[1] (analytic) = -13.565364196112544455738833192017 y[1] (numeric) = -13.565364196112544455738833192015 absolute error = 2e-30 relative error = 1.4743430187986727951300891897441e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.144 y[1] (analytic) = -13.563460684798457478265189329055 y[1] (numeric) = -13.563460684798457478265189329054 absolute error = 1e-30 relative error = 7.3727496487734260392655265736766e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.145 y[1] (analytic) = -13.561557025630580683446830787867 y[1] (numeric) = -13.561557025630580683446830787865 absolute error = 2e-30 relative error = 1.4747569148735004324992784849119e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=999.4MB, alloc=4.5MB, time=41.10 x[1] = 2.146 y[1] (analytic) = -13.559653218615267992844740610688 y[1] (numeric) = -13.559653218615267992844740610686 absolute error = 2e-30 relative error = 1.4749639741924336487172484530908e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.147 y[1] (analytic) = -13.557749263758870137507050269649 y[1] (numeric) = -13.557749263758870137507050269647 absolute error = 2e-30 relative error = 1.4751711077488258088178969215173e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.148 y[1] (analytic) = -13.555845161067734659930829202743 y[1] (numeric) = -13.555845161067734659930829202741 absolute error = 2e-30 relative error = 1.4753783155800436596271082278021e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.149 y[1] (analytic) = -13.553940910548205916022199712335 y[1] (numeric) = -13.553940910548205916022199712333 absolute error = 2e-30 relative error = 1.4755855977234797643610823949856e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.15 y[1] (analytic) = -13.55203651220662507705477905444 y[1] (numeric) = -13.552036512206625077054779054438 absolute error = 2e-30 relative error = 1.4757929542165525245242273752047e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.151 y[1] (analytic) = -13.550131966049330131626450544559 y[1] (numeric) = -13.550131966049330131626450544557 absolute error = 2e-30 relative error = 1.4760003850967062018296573533446e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.152 y[1] (analytic) = -13.548227272082655887614465503459 y[1] (numeric) = -13.548227272082655887614465503457 absolute error = 2e-30 relative error = 1.4762078904014109401423240140126e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.153 y[1] (analytic) = -13.546322430312933974128877863821 y[1] (numeric) = -13.546322430312933974128877863819 absolute error = 2e-30 relative error = 1.4764154701681627874448077121946e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1003.2MB, alloc=4.5MB, time=41.25 x[1] = 2.154 y[1] (analytic) = -13.544417440746492843464313256286 y[1] (numeric) = -13.544417440746492843464313256284 absolute error = 2e-30 relative error = 1.4766231244344837178257955250255e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.155 y[1] (analytic) = -13.542512303389657773050074391003 y[1] (numeric) = -13.542512303389657773050074391001 absolute error = 2e-30 relative error = 1.4768308532379216534912731992341e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.156 y[1] (analytic) = -13.540607018248750867398584548364 y[1] (numeric) = -13.540607018248750867398584548362 absolute error = 2e-30 relative error = 1.4770386566160504867984580460135e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.157 y[1] (analytic) = -13.538701585330091060052170990206 y[1] (numeric) = -13.538701585330091060052170990204 absolute error = 2e-30 relative error = 1.4772465346064701023124998723118e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.158 y[1] (analytic) = -13.536796004639994115528190100351 y[1] (numeric) = -13.536796004639994115528190100349 absolute error = 2e-30 relative error = 1.4774544872468063988859770748367e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.159 y[1] (analytic) = -13.534890276184772631262496060954 y[1] (numeric) = -13.534890276184772631262496060952 absolute error = 2e-30 relative error = 1.4776625145747113117612150604305e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.16 y[1] (analytic) = -13.532984399970736039551254868731 y[1] (numeric) = -13.532984399970736039551254868728 absolute error = 3e-30 relative error = 2.2168059249417942520431812908250e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.161 y[1] (analytic) = -13.531078376004190609491105492732 y[1] (numeric) = -13.531078376004190609491105492729 absolute error = 3e-30 relative error = 2.2171181901659475631633417675964e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.162 y[1] (analytic) = -13.529172204291439448917669972959 y[1] (numeric) = -13.529172204291439448917669972957 absolute error = 2e-30 relative error = 1.4782870450607481112556444781078e-29 % Correct digits = 30 h = 0.001 memory used=1007.1MB, alloc=4.5MB, time=41.41 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.163 y[1] (analytic) = -13.527265884838782506342414256714 y[1] (numeric) = -13.527265884838782506342414256711 absolute error = 3e-30 relative error = 2.2177430572739525166264016444788e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.164 y[1] (analytic) = -13.525359417652516572887861567176 y[1] (numeric) = -13.525359417652516572887861567173 absolute error = 3e-30 relative error = 2.2180556592711122866819330911643e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.165 y[1] (analytic) = -13.52345280273893528422116009637 y[1] (numeric) = -13.523452802738935284221160096367 absolute error = 3e-30 relative error = 2.2183683736393144055665260074503e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.166 y[1] (analytic) = -13.521546040104329122486006812253 y[1] (numeric) = -13.52154604010432912248600681225 absolute error = 3e-30 relative error = 2.2186812004353110894175814083620e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.167 y[1] (analytic) = -13.519639129754985418232929167313 y[1] (numeric) = -13.519639129754985418232929167309 absolute error = 4e-30 relative error = 2.9586588529545251672296740146699e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.168 y[1] (analytic) = -13.517732071697188352347926493682 y[1] (numeric) = -13.517732071697188352347926493678 absolute error = 4e-30 relative error = 2.9590762553838582070411754755335e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.169 y[1] (analytic) = -13.515824865937218957979472867436 y[1] (numeric) = -13.515824865937218957979472867432 absolute error = 4e-30 relative error = 2.9594938079442409449400479710345e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.17 y[1] (analytic) = -13.513917512481355122463883222332 y[1] (numeric) = -13.513917512481355122463883222328 absolute error = 4e-30 relative error = 2.9599115107115529826003856414426e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1010.9MB, alloc=4.5MB, time=41.57 x[1] = 2.171 y[1] (analytic) = -13.512010011335871589249044490932 y[1] (numeric) = -13.512010011335871589249044490928 absolute error = 4e-30 relative error = 2.9603293637617265285115792809855e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.172 y[1] (analytic) = -13.510102362507039959816513548687 y[1] (numeric) = -13.510102362507039959816513548682 absolute error = 5e-30 relative error = 3.7009342089634330534766395686061e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.173 y[1] (analytic) = -13.508194566001128695601983734187 y[1] (numeric) = -13.508194566001128695601983734182 absolute error = 5e-30 relative error = 3.7014569012683128524812074515589e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.174 y[1] (analytic) = -13.506286621824403119914121716474 y[1] (numeric) = -13.506286621824403119914121716469 absolute error = 5e-30 relative error = 3.7019797817119104300768786246525e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.175 y[1] (analytic) = -13.504378529983125419851776477932 y[1] (numeric) = -13.504378529983125419851776477927 absolute error = 5e-30 relative error = 3.7025028503894046415698273567816e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.176 y[1] (analytic) = -13.502470290483554648219562178953 y[1] (numeric) = -13.502470290483554648219562178948 absolute error = 5e-30 relative error = 3.7030261073960403813849275291333e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.177 y[1] (analytic) = -13.500561903331946725441816668237 y[1] (numeric) = -13.500561903331946725441816668232 absolute error = 5e-30 relative error = 3.7035495528271286393602731686930e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.178 y[1] (analytic) = -13.498653368534554441474937400247 y[1] (numeric) = -13.498653368534554441474937400242 absolute error = 5e-30 relative error = 3.7040731867780465571000630084440e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1014.7MB, alloc=4.5MB, time=41.73 x[1] = 2.179 y[1] (analytic) = -13.496744686097627457718096519014 y[1] (numeric) = -13.496744686097627457718096519008 absolute error = 6e-30 relative error = 4.4455164112130849812631026580599e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.18 y[1] (analytic) = -13.494835856027412308922336865159 y[1] (numeric) = -13.494835856027412308922336865153 absolute error = 6e-30 relative error = 4.4461452247454532427760494255156e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.181 y[1] (analytic) = -13.492926878330152405098050660694 y[1] (numeric) = -13.492926878330152405098050660688 absolute error = 6e-30 relative error = 4.4467742648454517757843257162790e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.182 y[1] (analytic) = -13.491017753012088033420842623809 y[1] (numeric) = -13.491017753012088033420842623803 absolute error = 6e-30 relative error = 4.4474035316278513563285583067825e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.183 y[1] (analytic) = -13.489108480079456360135779263583 y[1] (numeric) = -13.489108480079456360135779263577 absolute error = 6e-30 relative error = 4.4480330252075024817394954302832e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.184 y[1] (analytic) = -13.487199059538491432460026102213 y[1] (numeric) = -13.487199059538491432460026102208 absolute error = 5e-30 relative error = 3.7072189547494461989028770387441e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.185 y[1] (analytic) = -13.485289491395424180483874570066 y[1] (numeric) = -13.48528949139542418048387457006 absolute error = 6e-30 relative error = 4.4492926932183603712783831627582e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.186 y[1] (analytic) = -13.483379775656482419070160316533 y[1] (numeric) = -13.483379775656482419070160316527 absolute error = 6e-30 relative error = 4.4499228678796673492806613897124e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1018.5MB, alloc=4.5MB, time=41.89 x[1] = 2.187 y[1] (analytic) = -13.481469912327890849752074677411 y[1] (numeric) = -13.481469912327890849752074677406 absolute error = 5e-30 relative error = 3.7087943914986886969522145260861e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.188 y[1] (analytic) = -13.479559901415871062629371037182 y[1] (numeric) = -13.479559901415871062629371037177 absolute error = 5e-30 relative error = 3.7093199159082397986176619385820e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.189 y[1] (analytic) = -13.477649742926641538262967822304 y[1] (numeric) = -13.477649742926641538262967822299 absolute error = 5e-30 relative error = 3.7098456298911513098141406464298e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.19 y[1] (analytic) = -13.475739436866417649567949859344 y[1] (numeric) = -13.475739436866417649567949859338 absolute error = 6e-30 relative error = 4.4524458402523183322450218081724e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.191 y[1] (analytic) = -13.473828983241411663704969829462 y[1] (numeric) = -13.473828983241411663704969829457 absolute error = 5e-30 relative error = 3.7108976269618239691469536273885e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.192 y[1] (analytic) = -13.471918382057832743970051548522 y[1] (numeric) = -13.471918382057832743970051548517 absolute error = 5e-30 relative error = 3.7114239102421366028755858398373e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.193 y[1] (analytic) = -13.47000763332188695168279679977 y[1] (numeric) = -13.470007633321886951682796799764 absolute error = 6e-30 relative error = 4.4543404601770952780807714089888e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.194 y[1] (analytic) = -13.468096737039777248072997443801 y[1] (numeric) = -13.468096737039777248072997443796 absolute error = 5e-30 relative error = 3.7124770467745956374730439370948e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1022.3MB, alloc=4.5MB, time=42.04 x[1] = 2.195 y[1] (analytic) = -13.466185693217703496165654528234 y[1] (numeric) = -13.466185693217703496165654528228 absolute error = 6e-30 relative error = 4.4556046802636348647278789160074e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.196 y[1] (analytic) = -13.464274501861862462664406117231 y[1] (numeric) = -13.464274501861862462664406117226 absolute error = 5e-30 relative error = 3.7135309439127905578266437737178e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.197 y[1] (analytic) = -13.46236316297844781983336555879 y[1] (numeric) = -13.462363162978447819833365558785 absolute error = 5e-30 relative error = 3.7140581779505249594788807402584e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.198 y[1] (analytic) = -13.460451676573650147377371905404 y[1] (numeric) = -13.460451676573650147377371905399 absolute error = 5e-30 relative error = 3.7145856024296110270973339238618e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.199 y[1] (analytic) = -13.45854004265365693432065420149 y[1] (numeric) = -13.458540042653656934320654201485 absolute error = 5e-30 relative error = 3.7151132174468282109993193496038e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.2 y[1] (analytic) = -13.456628261224652580883911348691 y[1] (numeric) = -13.456628261224652580883911348687 absolute error = 4e-30 relative error = 2.9725128184792186943521107073515e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.201 y[1] (analytic) = -13.454716332292818400359809257935 y[1] (numeric) = -13.454716332292818400359809257931 absolute error = 4e-30 relative error = 2.9729352155864886550622388637511e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.202 y[1] (analytic) = -13.452804255864332620986896994853 y[1] (numeric) = -13.452804255864332620986896994848 absolute error = 5e-30 relative error = 3.7166972066960724064978008474795e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.203 y[1] (analytic) = -13.450892031945370387821943622959 y[1] (numeric) = -13.450892031945370387821943622954 absolute error = 5e-30 relative error = 3.7172255848349575535480651262332e-29 % Correct digits = 30 h = 0.001 memory used=1026.1MB, alloc=4.5MB, time=42.20 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.204 y[1] (analytic) = -13.448979660542103764610697446722 y[1] (numeric) = -13.448979660542103764610697446718 absolute error = 4e-30 relative error = 2.9742033231975066561872534463151e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.205 y[1] (analytic) = -13.447067141660701735657069354433 y[1] (numeric) = -13.447067141660701735657069354429 absolute error = 4e-30 relative error = 2.9746263314232275699394050286592e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.206 y[1] (analytic) = -13.44515447530733020769074195853 y[1] (numeric) = -13.445154475307330207690741958526 absolute error = 4e-30 relative error = 2.9750494926229307916926672717596e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.207 y[1] (analytic) = -13.443241661488152011733206228844 y[1] (numeric) = -13.44324166148815201173320622884 absolute error = 4e-30 relative error = 2.9754728068744725784087633378243e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.208 y[1] (analytic) = -13.441328700209326904962227311959 y[1] (numeric) = -13.441328700209326904962227311956 absolute error = 3e-30 relative error = 2.2319222056918226121920568083413e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.209 y[1] (analytic) = -13.439415591477011572574741227695 y[1] (numeric) = -13.439415591477011572574741227691 absolute error = 4e-30 relative error = 2.9763198948447684005008018491096e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.21 y[1] (analytic) = -13.437502335297359629648184131467 y[1] (numeric) = -13.437502335297359629648184131464 absolute error = 3e-30 relative error = 2.2325577515396299615849698714634e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.211 y[1] (analytic) = -13.435588931676521623000255829111 y[1] (numeric) = -13.435588931676521623000255829108 absolute error = 3e-30 relative error = 2.2328756969685388858172276466489e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1030.0MB, alloc=4.5MB, time=42.35 x[1] = 2.212 y[1] (analytic) = -13.433675380620645033047119228484 y[1] (numeric) = -13.433675380620645033047119228481 absolute error = 3e-30 relative error = 2.2331937574788992248664034806289e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.213 y[1] (analytic) = -13.431761682135874275660037410006 y[1] (numeric) = -13.431761682135874275660037410002 absolute error = 4e-30 relative error = 2.9780159108391307031835607404077e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.214 y[1] (analytic) = -13.429847836228350704020449996056 y[1] (numeric) = -13.429847836228350704020449996052 absolute error = 4e-30 relative error = 2.9784402986380843653307878105437e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.215 y[1] (analytic) = -13.427933842904212610473490496967 y[1] (numeric) = -13.427933842904212610473490496962 absolute error = 5e-30 relative error = 3.7235810501421065206899449326390e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.216 y[1] (analytic) = -13.42601970216959522837994630913 y[1] (numeric) = -13.426019702169595228379946309126 absolute error = 4e-30 relative error = 2.9792895353442798568331270229504e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.217 y[1] (analytic) = -13.42410541403063073396666303857 y[1] (numeric) = -13.424105414030630733966663038566 absolute error = 4e-30 relative error = 2.9797143844082696028056198613148e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.218 y[1] (analytic) = -13.422190978493448248175394821112 y[1] (numeric) = -13.422190978493448248175394821107 absolute error = 5e-30 relative error = 3.7251742342301381684282439527935e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.219 y[1] (analytic) = -13.420276395564173838510102308105 y[1] (numeric) = -13.4202763955641738385101023081 absolute error = 5e-30 relative error = 3.7257056804378919295058573883113e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1033.8MB, alloc=4.5MB, time=42.51 x[1] = 2.22 y[1] (analytic) = -13.418361665248930520882699984481 y[1] (numeric) = -13.418361665248930520882699984476 absolute error = 5e-30 relative error = 3.7262373192318054726684154431972e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.221 y[1] (analytic) = -13.416446787553838261457254483719 y[1] (numeric) = -13.416446787553838261457254483714 absolute error = 5e-30 relative error = 3.7267691507101546150021009395771e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.222 y[1] (analytic) = -13.414531762485013978492635562145 y[1] (numeric) = -13.41453176248501397849263556214 absolute error = 5e-30 relative error = 3.7273011749712838637421314465902e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.223 y[1] (analytic) = -13.412616590048571544183621392788 y[1] (numeric) = -13.412616590048571544183621392783 absolute error = 5e-30 relative error = 3.7278333921136064753257645121833e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.224 y[1] (analytic) = -13.410701270250621786500459836861 y[1] (numeric) = -13.410701270250621786500459836857 absolute error = 4e-30 relative error = 2.9826926417884836116055841522829e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.225 y[1] (analytic) = -13.408785803097272491026887348775 y[1] (numeric) = -13.40878580309727249102688734877 absolute error = 5e-30 relative error = 3.7288984054358289135329152657774e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.226 y[1] (analytic) = -13.406870188594628402796607168386 y[1] (numeric) = -13.406870188594628402796607168382 absolute error = 4e-30 relative error = 2.9835449614503196251056989450610e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.227 y[1] (analytic) = -13.40495442674879122812822845209 y[1] (numeric) = -13.404954426748791228128228452085 absolute error = 5e-30 relative error = 3.7299641914655052130647377776655e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1037.6MB, alloc=4.5MB, time=42.67 x[1] = 2.228 y[1] (analytic) = -13.403038517565859636458667992126 y[1] (numeric) = -13.403038517565859636458667992122 absolute error = 4e-30 relative error = 2.9843978995939230791876840464270e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.229 y[1] (analytic) = -13.401122461051929262175016171393 y[1] (numeric) = -13.401122461051929262175016171388 absolute error = 5e-30 relative error = 3.7310307509924224343634752953104e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.23 y[1] (analytic) = -13.399206257213092706444868798839 y[1] (numeric) = -13.399206257213092706444868798834 absolute error = 5e-30 relative error = 3.7315643210644571287273129027046e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.231 y[1] (analytic) = -13.397289906055439539045126468423 y[1] (numeric) = -13.397289906055439539045126468418 absolute error = 5e-30 relative error = 3.7320980848074733154548095937322e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.232 y[1] (analytic) = -13.395373407585056300189263082426 y[1] (numeric) = -13.395373407585056300189263082422 absolute error = 4e-30 relative error = 2.9861056338564045291105379693565e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.233 y[1] (analytic) = -13.393456761808026502353065177805 y[1] (numeric) = -13.393456761808026502353065177801 absolute error = 4e-30 relative error = 2.9865329549621265412050101708366e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.234 y[1] (analytic) = -13.391539968730430632098843692105 y[1] (numeric) = -13.3915399687304306320988436921 absolute error = 5e-30 relative error = 3.7337005390531042736601603978675e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.235 y[1] (analytic) = -13.389623028358346151898119803336 y[1] (numeric) = -13.389623028358346151898119803332 absolute error = 4e-30 relative error = 2.9873880627768694626969844573867e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1041.4MB, alloc=4.5MB, time=42.82 x[1] = 2.236 y[1] (analytic) = -13.387705940697847501952786476088 y[1] (numeric) = -13.387705940697847501952786476084 absolute error = 4e-30 relative error = 2.9878158496447345909534131650723e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.237 y[1] (analytic) = -13.385788705755006102014747343989 y[1] (numeric) = -13.385788705755006102014747343985 absolute error = 4e-30 relative error = 2.9882437919255843881026281893596e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.238 y[1] (analytic) = -13.383871323535890353204034556561 y[1] (numeric) = -13.383871323535890353204034556557 absolute error = 4e-30 relative error = 2.9886718896989801525020418128997e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.239 y[1] (analytic) = -13.381953794046565639825407216327 y[1] (numeric) = -13.381953794046565639825407216323 absolute error = 4e-30 relative error = 2.9891001430445389445003276335626e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.24 y[1] (analytic) = -13.38003611729309433118343202996 y[1] (numeric) = -13.380036117293094331183432029955 absolute error = 5e-30 relative error = 3.7369106900524170431584844247507e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.241 y[1] (analytic) = -13.378118293281535783396047795122 y[1] (numeric) = -13.378118293281535783396047795117 absolute error = 5e-30 relative error = 3.7374463959636161890388546792467e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.242 y[1] (analytic) = -13.376200322017946341206615342543 y[1] (numeric) = -13.376200322017946341206615342538 absolute error = 5e-30 relative error = 3.7379822966390019120917460214115e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.243 y[1] (analytic) = -13.374282203508379339794454550765 y[1] (numeric) = -13.37428220350837933979445455076 absolute error = 5e-30 relative error = 3.7385183921783749494563384624072e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.244 y[1] (analytic) = -13.372363937758885106583870048886 y[1] (numeric) = -13.372363937758885106583870048881 absolute error = 5e-30 relative error = 3.7390546826816060419497578466361e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=1045.2MB, alloc=4.5MB, time=42.98 TOP MAIN SOLVE Loop x[1] = 2.245 y[1] (analytic) = -13.370445524775510963051667220532 y[1] (numeric) = -13.370445524775510963051667220526 absolute error = 6e-30 relative error = 4.4875094018983631933931949053174e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.246 y[1] (analytic) = -13.368526964564301226533160120177 y[1] (numeric) = -13.368526964564301226533160120172 absolute error = 5e-30 relative error = 3.7401278489794757366081677134249e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.247 y[1] (analytic) = -13.366608257131297212026672910858 y[1] (numeric) = -13.366608257131297212026672910853 absolute error = 5e-30 relative error = 3.7406647249742063829591864362847e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.248 y[1] (analytic) = -13.364689402482537233996536430198 y[1] (numeric) = -13.364689402482537233996536430192 absolute error = 6e-30 relative error = 4.4894421555995751527791122915975e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.249 y[1] (analytic) = -13.36277040062405660817458148961 y[1] (numeric) = -13.362770400624056608174581489604 absolute error = 6e-30 relative error = 4.4900868757872193638743523198435e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.25 y[1] (analytic) = -13.36085125156188765336013050944 y[1] (numeric) = -13.360851251561887653360130509434 absolute error = 6e-30 relative error = 4.4907318306523307337287201778693e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.251 y[1] (analytic) = -13.358931955302059693218489090714 y[1] (numeric) = -13.358931955302059693218489090708 absolute error = 6e-30 relative error = 4.4913770203153442168360064441582e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.252 y[1] (analytic) = -13.357012511850599058077939122106 y[1] (numeric) = -13.3570125118505990580779391221 absolute error = 6e-30 relative error = 4.4920224448967793543384993755457e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1049.0MB, alloc=4.5MB, time=43.14 x[1] = 2.253 y[1] (analytic) = -13.355092921213529086725235018642 y[1] (numeric) = -13.355092921213529086725235018636 absolute error = 6e-30 relative error = 4.4926681045172403471503214830308e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.254 y[1] (analytic) = -13.353173183396870128199604686592 y[1] (numeric) = -13.353173183396870128199604686587 absolute error = 5e-30 relative error = 3.7444283327478467742979268162417e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.255 y[1] (analytic) = -13.351253298406639543585256806927 y[1] (numeric) = -13.351253298406639543585256806922 absolute error = 5e-30 relative error = 3.7449667744650670337457913290398e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.256 y[1] (analytic) = -13.349333266248851707802396027651 y[1] (numeric) = -13.349333266248851707802396027646 absolute error = 5e-30 relative error = 3.7455054123500765840835039870414e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.257 y[1] (analytic) = -13.347413086929518011396747653265 y[1] (numeric) = -13.34741308692951801139674765326 absolute error = 5e-30 relative error = 3.7460442465036617359536847389929e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.258 y[1] (analytic) = -13.345492760454646862327593417537 y[1] (numeric) = -13.345492760454646862327593417532 absolute error = 5e-30 relative error = 3.7465832770266796554502635978023e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.259 y[1] (analytic) = -13.343572286830243687754319923722 y[1] (numeric) = -13.343572286830243687754319923717 absolute error = 5e-30 relative error = 3.7471225040200584254394906801420e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.26 y[1] (analytic) = -13.341651666062310935821481334289 y[1] (numeric) = -13.341651666062310935821481334284 absolute error = 5e-30 relative error = 3.7476619275847971069453684146084e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1052.8MB, alloc=4.5MB, time=43.30 x[1] = 2.261 y[1] (analytic) = -13.339730898156848077442377890197 y[1] (numeric) = -13.339730898156848077442377890192 absolute error = 5e-30 relative error = 3.7482015478219658005995841516006e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.262 y[1] (analytic) = -13.337809983119851608081151837679 y[1] (numeric) = -13.337809983119851608081151837674 absolute error = 5e-30 relative error = 3.7487413648327057081560215176104e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.263 y[1] (analytic) = -13.335888920957315049533402338477 y[1] (numeric) = -13.335888920957315049533402338471 absolute error = 6e-30 relative error = 4.4991376544618750328839147595602e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.264 y[1] (analytic) = -13.333967711675228951705320937403 y[1] (numeric) = -13.333967711675228951705320937397 absolute error = 6e-30 relative error = 4.4997859074957838165701889063339e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.265 y[1] (analytic) = -13.332046355279580894391349159089 y[1] (numeric) = -13.332046355279580894391349159084 absolute error = 5e-30 relative error = 3.7503619975188325422262123541799e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.266 y[1] (analytic) = -13.330124851776355489050359803728 y[1] (numeric) = -13.330124851776355489050359803722 absolute error = 6e-30 relative error = 4.5010831231640322024062388798434e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.267 y[1] (analytic) = -13.328203201171534380580363509584 y[1] (numeric) = -13.328203201171534380580363509578 absolute error = 6e-30 relative error = 4.5017320860418804305924881099539e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.268 y[1] (analytic) = -13.326281403471096249091742148042 y[1] (numeric) = -13.326281403471096249091742148036 absolute error = 6e-30 relative error = 4.5023812857780266599319324356776e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1056.7MB, alloc=4.5MB, time=43.46 x[1] = 2.269 y[1] (analytic) = -13.324359458681016811679010614896 y[1] (numeric) = -13.32435945868101681167901061489 absolute error = 6e-30 relative error = 4.5030307224944396553726031338721e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.27 y[1] (analytic) = -13.322437366807268824191108579594 y[1] (numeric) = -13.322437366807268824191108579589 absolute error = 5e-30 relative error = 3.7530669969276450804580022102770e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.271 y[1] (analytic) = -13.320515127855822083000223752117 y[1] (numeric) = -13.320515127855822083000223752112 absolute error = 5e-30 relative error = 3.7536085894636422102535174721690e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.272 y[1] (analytic) = -13.318592741832643426769148225147 y[1] (numeric) = -13.318592741832643426769148225142 absolute error = 5e-30 relative error = 3.7541503797885467127345781800115e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.273 y[1] (analytic) = -13.316670208743696738217169447189 y[1] (numeric) = -13.316670208743696738217169447183 absolute error = 6e-30 relative error = 4.5056308416051431766062982894609e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.274 y[1] (analytic) = -13.314747528594942945884497380266 y[1] (numeric) = -13.314747528594942945884497380261 absolute error = 5e-30 relative error = 3.7552345542128592505317344711377e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.275 y[1] (analytic) = -13.312824701392340025895229393845 y[1] (numeric) = -13.31282470139234002589522939384 absolute error = 5e-30 relative error = 3.7557769385163376665035976203027e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.276 y[1] (analytic) = -13.310901727141843003718854444582 y[1] (numeric) = -13.310901727141843003718854444576 absolute error = 6e-30 relative error = 4.5075834252202372095127886476272e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1060.5MB, alloc=4.5MB, time=43.62 x[1] = 2.277 y[1] (analytic) = -13.308978605849403955930298089543 y[1] (numeric) = -13.308978605849403955930298089537 absolute error = 6e-30 relative error = 4.5082347621799853031427901882333e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.278 y[1] (analytic) = -13.307055337520972011968509878514 y[1] (numeric) = -13.307055337520972011968509878508 absolute error = 6e-30 relative error = 4.5088863372215941671153464577673e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.279 y[1] (analytic) = -13.30513192216249335589359466902 y[1] (numeric) = -13.305131922162493355893594669014 absolute error = 6e-30 relative error = 4.5095381504678950760425446053165e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.28 y[1] (analytic) = -13.303208359779911228142489405704 y[1] (numeric) = -13.303208359779911228142489405698 absolute error = 6e-30 relative error = 4.5101902020418059679560757211690e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.281 y[1] (analytic) = -13.301284650379165927283186903703 y[1] (numeric) = -13.301284650379165927283186903698 absolute error = 5e-30 relative error = 3.7590354100552762663459018941111e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.282 y[1] (analytic) = -13.299360793966194811767508173688 y[1] (numeric) = -13.299360793966194811767508173682 absolute error = 6e-30 relative error = 4.5114950206645632218934081773890e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.283 y[1] (analytic) = -13.297436790546932301682424824231 y[1] (numeric) = -13.297436790546932301682424824225 absolute error = 6e-30 relative error = 4.5121477879596794552463483271964e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.284 y[1] (analytic) = -13.295512640127309880499933075218 y[1] (numeric) = -13.295512640127309880499933075212 absolute error = 6e-30 relative error = 4.5128007940749455652569945276102e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.285 y[1] (analytic) = -13.293588342713256096825480914 y[1] (numeric) = -13.293588342713256096825480913994 absolute error = 6e-30 relative error = 4.5134540391337139382622749345922e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1064.3MB, alloc=4.5MB, time=43.77 x[1] = 2.286 y[1] (analytic) = -13.291663898310696566144949924046 y[1] (numeric) = -13.291663898310696566144949924039 absolute error = 7e-30 relative error = 5.2664587771359947565685815925228e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.287 y[1] (analytic) = -13.289739306925553972570193313854 y[1] (numeric) = -13.289739306925553972570193313849 absolute error = 5e-30 relative error = 3.7623010388130022305737515362523e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.288 y[1] (analytic) = -13.287814568563748070583131671947 y[1] (numeric) = -13.287814568563748070583131671941 absolute error = 6e-30 relative error = 4.5154152092058637003044958871969e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.289 y[1] (analytic) = -13.285889683231195686778407971748 y[1] (numeric) = -13.285889683231195686778407971743 absolute error = 5e-30 relative error = 3.7633911760615903792639251392588e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.29 y[1] (analytic) = -13.283964650933810721604603348272 y[1] (numeric) = -13.283964650933810721604603348267 absolute error = 5e-30 relative error = 3.7639365440862713903482769347432e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.291 y[1] (analytic) = -13.282039471677504151104015166485 y[1] (numeric) = -13.28203947167750415110401516648 absolute error = 5e-30 relative error = 3.7644821118488263030750340300351e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.292 y[1] (analytic) = -13.280114145468184028650998899341 y[1] (numeric) = -13.280114145468184028650998899336 absolute error = 5e-30 relative error = 3.7650278794525582806588575315099e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.293 y[1] (analytic) = -13.278188672311755486688875331469 y[1] (numeric) = -13.278188672311755486688875331463 absolute error = 6e-30 relative error = 4.5186886164010122322201042559658e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1068.1MB, alloc=4.5MB, time=43.92 x[1] = 2.294 y[1] (analytic) = -13.276263052214120738465404602579 y[1] (numeric) = -13.276263052214120738465404602574 absolute error = 5e-30 relative error = 3.7661200145971313495578003913515e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.295 y[1] (analytic) = -13.2743372851811790797668286027 y[1] (numeric) = -13.274337285181179079766828602694 absolute error = 6e-30 relative error = 4.5199996588139330694481229125659e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.296 y[1] (analytic) = -13.272411371218826890650483229386 y[1] (numeric) = -13.27241137121882689065048322938 absolute error = 6e-30 relative error = 4.5206555404174534309940632376669e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.297 y[1] (analytic) = -13.270485310332957637175982015143 y[1] (numeric) = -13.270485310332957637175982015137 absolute error = 6e-30 relative error = 4.5213116624515215074627839842259e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.298 y[1] (analytic) = -13.268559102529461873134972631338 y[1] (numeric) = -13.268559102529461873134972631333 absolute error = 5e-30 relative error = 3.7683066875338567778323093586345e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.299 y[1] (analytic) = -13.266632747814227241779467772938 y[1] (numeric) = -13.266632747814227241779467772932 absolute error = 6e-30 relative error = 4.5226246283093522512874144517897e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.3 y[1] (analytic) = -13.26470624619313847754875192649 y[1] (numeric) = -13.264706246193138477548751926484 absolute error = 6e-30 relative error = 4.5232814723823609883881927478466e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.301 y[1] (analytic) = -13.262779597672077407794865521841 y[1] (numeric) = -13.262779597672077407794865521835 absolute error = 6e-30 relative error = 4.5239385573844097336491267352991e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1071.9MB, alloc=4.5MB, time=44.08 x[1] = 2.302 y[1] (analytic) = -13.260852802256922954506667966122 y[1] (numeric) = -13.260852802256922954506667966117 absolute error = 5e-30 relative error = 3.7704965695336185122521629586947e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.303 y[1] (analytic) = -13.258925859953551136032481056662 y[1] (numeric) = -13.258925859953551136032481056656 absolute error = 6e-30 relative error = 4.5252534506750905749426185400332e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.304 y[1] (analytic) = -13.256998770767835068801314267506 y[1] (numeric) = -13.2569987707678350688013142675 absolute error = 6e-30 relative error = 4.5259112592136754506837013622443e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.305 y[1] (analytic) = -13.255071534705644969042673402364 y[1] (numeric) = -13.255071534705644969042673402358 absolute error = 6e-30 relative error = 4.5265693091812060484013463589003e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.306 y[1] (analytic) = -13.253144151772848154504954104835 y[1] (numeric) = -13.253144151772848154504954104829 absolute error = 6e-30 relative error = 4.5272276007028802220543272016966e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.307 y[1] (analytic) = -13.251216621975309046172421714891 y[1] (numeric) = -13.251216621975309046172421714885 absolute error = 6e-30 relative error = 4.5278861339039845504888279556278e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.308 y[1] (analytic) = -13.249288945318889169980778958661 y[1] (numeric) = -13.249288945318889169980778958655 absolute error = 6e-30 relative error = 4.5285449089098944149245468443617e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.309 y[1] (analytic) = -13.24736112180944715853132295667 y[1] (numeric) = -13.247361121809447158531322956664 absolute error = 6e-30 relative error = 4.5292039258460740765228651436911e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1075.7MB, alloc=4.5MB, time=44.24 x[1] = 2.31 y[1] (analytic) = -13.245433151452838752803693033772 y[1] (numeric) = -13.245433151452838752803693033765 absolute error = 7e-30 relative error = 5.2848403823110895463767120660619e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.311 y[1] (analytic) = -13.243505034254916803867210812112 y[1] (numeric) = -13.243505034254916803867210812105 absolute error = 7e-30 relative error = 5.2856098003468021518030999931980e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.312 y[1] (analytic) = -13.241576770221531274590814066579 y[1] (numeric) = -13.241576770221531274590814066572 absolute error = 7e-30 relative error = 5.2863795010742441673097116326668e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.313 y[1] (analytic) = -13.239648359358529241351585820274 y[1] (numeric) = -13.239648359358529241351585820267 absolute error = 7e-30 relative error = 5.2871494846402062441936127941778e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.314 y[1] (analytic) = -13.237719801671754895741880155668 y[1] (numeric) = -13.237719801671754895741880155661 absolute error = 7e-30 relative error = 5.2879197511915831809384034557290e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.315 y[1] (analytic) = -13.235791097167049546275046215205 y[1] (numeric) = -13.235791097167049546275046215198 absolute error = 7e-30 relative error = 5.2886903008753740142873404190059e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.316 y[1] (analytic) = -13.233862245850251620089751863232 y[1] (numeric) = -13.233862245850251620089751863225 absolute error = 7e-30 relative error = 5.2894611338386821104130274045104e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.317 y[1] (analytic) = -13.231933247727196664652908479256 y[1] (numeric) = -13.231933247727196664652908479249 absolute error = 7e-30 relative error = 5.2902322502287152561837910801009e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.318 y[1] (analytic) = -13.230004102803717349461198350634 y[1] (numeric) = -13.230004102803717349461198350627 memory used=1079.5MB, alloc=4.5MB, time=44.40 absolute error = 7e-30 relative error = 5.2910036501927857505268616840369e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.319 y[1] (analytic) = -13.228074811085643467741206130938 y[1] (numeric) = -13.228074811085643467741206130931 absolute error = 7e-30 relative error = 5.2917753338783104958884770712998e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.32 y[1] (analytic) = -13.226145372578801938148155828355 y[1] (numeric) = -13.226145372578801938148155828348 absolute error = 7e-30 relative error = 5.2925473014328110897910291799029e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.321 y[1] (analytic) = -13.22421578728901680646325478661 y[1] (numeric) = -13.224215787289016806463254786603 absolute error = 7e-30 relative error = 5.2933195530039139164873720821093e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.322 y[1] (analytic) = -13.222286055222109247289646119028 y[1] (numeric) = -13.222286055222109247289646119021 absolute error = 7e-30 relative error = 5.2940920887393502387124109539566e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.323 y[1] (analytic) = -13.220356176383897565746971054491 y[1] (numeric) = -13.220356176383897565746971054483 absolute error = 8e-30 relative error = 6.0512741814708071880366759602484e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.324 y[1] (analytic) = -13.21842615078019719916454265217 y[1] (numeric) = -13.218426150780197199164542652162 absolute error = 8e-30 relative error = 6.0521577294796267020456105839301e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.325 y[1] (analytic) = -13.216495978416820718773132340075 y[1] (numeric) = -13.216495978416820718773132340067 absolute error = 8e-30 relative error = 6.0530416027549119001726392856800e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.326 y[1] (analytic) = -13.214565659299577831395370730567 y[1] (numeric) = -13.214565659299577831395370730559 absolute error = 8e-30 relative error = 6.0539258014659790065649663833569e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1083.4MB, alloc=4.5MB, time=44.55 x[1] = 2.327 y[1] (analytic) = -13.212635193434275381134764164165 y[1] (numeric) = -13.212635193434275381134764164157 absolute error = 8e-30 relative error = 6.0548103257822646324593941622016e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.328 y[1] (analytic) = -13.210704580826717351063328431097 y[1] (numeric) = -13.210704580826717351063328431089 absolute error = 8e-30 relative error = 6.0556951758733258817112256733866e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.329 y[1] (analytic) = -13.208773821482704864907841118205 y[1] (numeric) = -13.208773821482704864907841118197 absolute error = 8e-30 relative error = 6.0565803519088404564353058088376e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.33 y[1] (analytic) = -13.206842915408036188734714026969 y[1] (numeric) = -13.206842915408036188734714026962 absolute error = 7e-30 relative error = 5.3002826223012809174144212615886e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.331 y[1] (analytic) = -13.204911862608506732633487106572 y[1] (numeric) = -13.204911862608506732633487106565 absolute error = 7e-30 relative error = 5.3010577221809760146034164157898e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.332 y[1] (analytic) = -13.202980663089909052398945344063 y[1] (numeric) = -13.202980663089909052398945344056 absolute error = 7e-30 relative error = 5.3018331077081058063281516055734e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.333 y[1] (analytic) = -13.201049316858032851211860051882 y[1] (numeric) = -13.201049316858032851211860051874 absolute error = 8e-30 relative error = 6.0601243188932129167694509280827e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.334 y[1] (analytic) = -13.199117823918664981318355991123 y[1] (numeric) = -13.199117823918664981318355991115 absolute error = 8e-30 relative error = 6.0610111272003879986926992803602e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1087.2MB, alloc=4.5MB, time=44.71 x[1] = 2.335 y[1] (analytic) = -13.197186184277589445707905767124 y[1] (numeric) = -13.197186184277589445707905767116 absolute error = 8e-30 relative error = 6.0618982624726211122901672657057e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.336 y[1] (analytic) = -13.1952543979405873997899529321 y[1] (numeric) = -13.195254397940587399789952932091 absolute error = 9e-30 relative error = 6.8206339404904917542526821657431e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.337 y[1] (analytic) = -13.19332246491343715306916522774 y[1] (numeric) = -13.193322464913437153069165227732 absolute error = 8e-30 relative error = 6.0636735145944823112668761014610e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.338 y[1] (analytic) = -13.191390385201914170819319398858 y[1] (numeric) = -13.19139038520191417081931939885 absolute error = 8e-30 relative error = 6.0645616317855245602857933462564e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.339 y[1] (analytic) = -13.189458158811791075755819007336 y[1] (numeric) = -13.189458158811791075755819007327 absolute error = 9e-30 relative error = 6.8236313362025100543954466580665e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.34 y[1] (analytic) = -13.187525785748837649706846673825 y[1] (numeric) = -13.187525785748837649706846673817 absolute error = 8e-30 relative error = 6.0663388492822800629525457737248e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.341 y[1] (analytic) = -13.18559326601882083528315217282 y[1] (numeric) = -13.185593266018820835283152172812 absolute error = 8e-30 relative error = 6.0672279499301377663266553120262e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.342 y[1] (analytic) = -13.183660599627504737546477804909 y[1] (numeric) = -13.183660599627504737546477804901 absolute error = 8e-30 relative error = 6.0681173787392816359056048406111e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1091.0MB, alloc=4.5MB, time=44.87 x[1] = 2.343 y[1] (analytic) = -13.181727786580650625676622468212 y[1] (numeric) = -13.181727786580650625676622468204 absolute error = 8e-30 relative error = 6.0690071358810889048740639206694e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.344 y[1] (analytic) = -13.179794826884016934637145849187 y[1] (numeric) = -13.179794826884016934637145849179 absolute error = 8e-30 relative error = 6.0698972215270590028427139555065e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.345 y[1] (analytic) = -13.177861720543359266839714151196 y[1] (numeric) = -13.177861720543359266839714151188 absolute error = 8e-30 relative error = 6.0707876358488136633023940271100e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.346 y[1] (analytic) = -13.175928467564430393807088777407 y[1] (numeric) = -13.175928467564430393807088777399 absolute error = 8e-30 relative error = 6.0716783790180970311927566310186e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.347 y[1] (analytic) = -13.173995067952980257834759382809 y[1] (numeric) = -13.173995067952980257834759382801 absolute error = 8e-30 relative error = 6.0725694512067757705855746043336e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.348 y[1] (analytic) = -13.172061521714755973651222708332 y[1] (numeric) = -13.172061521714755973651222708323 absolute error = 9e-30 relative error = 6.8326434591601940690431958351291e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.349 y[1] (analytic) = -13.170127828855501830076908608246 y[1] (numeric) = -13.170127828855501830076908608237 absolute error = 9e-30 relative error = 6.8336466562466991705710270251555e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.35 y[1] (analytic) = -13.168193989380959291681754680249 y[1] (numeric) = -13.168193989380959291681754680241 absolute error = 8e-30 relative error = 6.0752446436096909100430687770256e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1094.8MB, alloc=4.5MB, time=45.03 x[1] = 2.351 y[1] (analytic) = -13.166260003296867000441430905835 y[1] (numeric) = -13.166260003296867000441430905826 absolute error = 9e-30 relative error = 6.8356541627967059259231887806455e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.352 y[1] (analytic) = -13.164325870608960777392215706758 y[1] (numeric) = -13.164325870608960777392215706749 absolute error = 9e-30 relative error = 6.8366584726481511158255081856448e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.353 y[1] (analytic) = -13.162391591322973624284524821647 y[1] (numeric) = -13.162391591322973624284524821637 absolute error = 1.0e-29 relative error = 7.5974035042326859955435601952183e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.354 y[1] (analytic) = -13.160457165444635725235094404987 y[1] (numeric) = -13.160457165444635725235094404978 absolute error = 9e-30 relative error = 6.8386682064748230045526602149933e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.355 y[1] (analytic) = -13.158522592979674448377819748979 y[1] (numeric) = -13.15852259297967444837781974897 absolute error = 9e-30 relative error = 6.8396736308388249874901802789799e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.356 y[1] (analytic) = -13.156587873933814347513251026934 y[1] (numeric) = -13.156587873933814347513251026925 absolute error = 9e-30 relative error = 6.8406794270960193209237428904792e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.357 y[1] (analytic) = -13.154653008312777163756747455152 y[1] (numeric) = -13.154653008312777163756747455143 absolute error = 9e-30 relative error = 6.8416855954411410335653397883027e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.358 y[1] (analytic) = -13.152717996122281827185291268427 y[1] (numeric) = -13.152717996122281827185291268417 absolute error = 1.0e-29 relative error = 7.6029912622989603658778452084915e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.359 y[1] (analytic) = -13.15078283736804445848296290255 y[1] (numeric) = -13.150782837368044458482962902541 absolute error = 9e-30 relative error = 6.8436990491748027098400858212295e-29 % Correct digits = 30 memory used=1098.6MB, alloc=4.5MB, time=45.19 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.36 y[1] (analytic) = -13.148847532055778370585078775447 y[1] (numeric) = -13.148847532055778370585078775438 absolute error = 9e-30 relative error = 6.8447063349535090976597481802790e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.361 y[1] (analytic) = -13.146912080191194070320993056779 y[1] (numeric) = -13.14691208019119407032099305677 absolute error = 9e-30 relative error = 6.8457139936004759588618276046802e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.362 y[1] (analytic) = -13.144976481779999260055564814117 y[1] (numeric) = -13.144976481779999260055564814109 absolute error = 8e-30 relative error = 6.0859751336098981567335458690238e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.363 y[1] (analytic) = -13.143040736827898839329291922023 y[1] (numeric) = -13.143040736827898839329291922014 absolute error = 9e-30 relative error = 6.8477304302810594229242780112455e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.364 y[1] (analytic) = -13.141104845340594906497113118594 y[1] (numeric) = -13.141104845340594906497113118585 absolute error = 9e-30 relative error = 6.8487392087059597848895848406077e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.365 y[1] (analytic) = -13.139168807323786760365879592332 y[1] (numeric) = -13.139168807323786760365879592322 absolute error = 1.0e-29 relative error = 7.6108315119796537614455476408546e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.366 y[1] (analytic) = -13.13723262278317090183049748038 y[1] (numeric) = -13.13723262278317090183049748037 absolute error = 1.0e-29 relative error = 7.6119532074491525085693576111376e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.367 y[1] (analytic) = -13.13529629172444103550874265748 y[1] (numeric) = -13.13529629172444103550874265747 absolute error = 1.0e-29 relative error = 7.6130753185219319110099791206185e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1102.4MB, alloc=4.5MB, time=45.34 x[1] = 2.368 y[1] (analytic) = -13.133359814153288071374749193215 y[1] (numeric) = -13.133359814153288071374749193205 absolute error = 1.0e-29 relative error = 7.6141978454160727753293852999987e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.369 y[1] (analytic) = -13.131423190075400126391172853392 y[1] (numeric) = -13.131423190075400126391172853382 absolute error = 1.0e-29 relative error = 7.6153207883498120549147497299346e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.37 y[1] (analytic) = -13.129486419496462526140031019657 y[1] (numeric) = -13.129486419496462526140031019647 absolute error = 1.0e-29 relative error = 7.6164441475415429879281305068796e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.371 y[1] (analytic) = -13.127549502422157806452220399713 y[1] (numeric) = -13.127549502422157806452220399704 absolute error = 9e-30 relative error = 6.8558111308888337118634049756664e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.372 y[1] (analytic) = -13.125612438858165715035713898772 y[1] (numeric) = -13.125612438858165715035713898763 absolute error = 9e-30 relative error = 6.8568229040160015175439578072939e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.373 y[1] (analytic) = -13.123675228810163213102438021124 y[1] (numeric) = -13.123675228810163213102438021116 absolute error = 8e-30 relative error = 6.0958533798807722094869290126069e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.374 y[1] (analytic) = -13.121737872283824476993832169019 y[1] (numeric) = -13.12173787228382447699383216901 absolute error = 9e-30 relative error = 6.8588475761355531499923040955159e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.375 y[1] (analytic) = -13.119800369284820899805091204271 y[1] (numeric) = -13.119800369284820899805091204262 absolute error = 9e-30 relative error = 6.8598604755223138233121353182775e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1106.2MB, alloc=4.5MB, time=45.50 x[1] = 2.376 y[1] (analytic) = -13.117862719818821093008092636334 y[1] (numeric) = -13.117862719818821093008092636326 absolute error = 8e-30 relative error = 6.0985544450876010866343027029971e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.377 y[1] (analytic) = -13.115924923891490888073009798823 y[1] (numeric) = -13.115924923891490888073009798814 absolute error = 9e-30 relative error = 6.8618874019368073433878680400858e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.378 y[1] (analytic) = -13.113986981508493338088612374762 y[1] (numeric) = -13.113986981508493338088612374753 absolute error = 9e-30 relative error = 6.8629014293597658363583320895748e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.379 y[1] (analytic) = -13.112048892675488719381255629131 y[1] (numeric) = -13.112048892675488719381255629122 absolute error = 9e-30 relative error = 6.8639158331902521313369727751646e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.38 y[1] (analytic) = -13.110110657398134533132559705543 y[1] (numeric) = -13.110110657398134533132559705535 absolute error = 8e-30 relative error = 6.1021605454455409453024202398027e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.381 y[1] (analytic) = -13.1081722756820855069957803422 y[1] (numeric) = -13.108172275682085506995780342192 absolute error = 8e-30 relative error = 6.1030629074362839988349314699146e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.382 y[1] (analytic) = -13.106233747532993596710872360539 y[1] (numeric) = -13.106233747532993596710872360531 absolute error = 8e-30 relative error = 6.1039656045397879640179809811561e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.383 y[1] (analytic) = -13.104295072956507987718247278304 y[1] (numeric) = -13.104295072956507987718247278296 absolute error = 8e-30 relative error = 6.1048686369324028897144440135518e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1110.1MB, alloc=4.5MB, time=45.66 x[1] = 2.384 y[1] (analytic) = -13.102356251958275096771226397053 y[1] (numeric) = -13.102356251958275096771226397045 absolute error = 8e-30 relative error = 6.1057720047906054101113020939371e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.385 y[1] (analytic) = -13.100417284543938573547190712412 y[1] (numeric) = -13.100417284543938573547190712404 absolute error = 8e-30 relative error = 6.1066757082909988568664064839847e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.386 y[1] (analytic) = -13.098478170719139302257428993699 y[1] (numeric) = -13.098478170719139302257428993691 absolute error = 8e-30 relative error = 6.1075797476103133713755630105955e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.387 y[1] (analytic) = -13.096538910489515403255685377834 y[1] (numeric) = -13.096538910489515403255685377826 absolute error = 8e-30 relative error = 6.1084841229254060171600878528301e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.388 y[1] (analytic) = -13.094599503860702234645407820766 y[1] (numeric) = -13.094599503860702234645407820758 absolute error = 8e-30 relative error = 6.1093888344132608923749840733771e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.389 y[1] (analytic) = -13.092659950838332393885698747944 y[1] (numeric) = -13.092659950838332393885698747936 absolute error = 8e-30 relative error = 6.1102938822509892424378888967242e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.39 y[1] (analytic) = -13.090720251428035719395969243693 y[1] (numeric) = -13.090720251428035719395969243684 absolute error = 9e-30 relative error = 6.8750991749428082693763096945369e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.391 y[1] (analytic) = -13.088780405635439292159298117636 y[1] (numeric) = -13.088780405635439292159298117628 absolute error = 8e-30 relative error = 6.1121049876851477617117249029170e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1113.9MB, alloc=4.5MB, time=45.82 x[1] = 2.392 y[1] (analytic) = -13.086840413466167437324497184668 y[1] (numeric) = -13.086840413466167437324497184659 absolute error = 9e-30 relative error = 6.8771374263409918201036010311866e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.393 y[1] (analytic) = -13.084900274925841725806884093239 y[1] (numeric) = -13.08490027492584172580688409323 absolute error = 9e-30 relative error = 6.8781571207282336174856553866518e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.394 y[1] (analytic) = -13.082959990020080975887764035108 y[1] (numeric) = -13.082959990020080975887764035099 absolute error = 9e-30 relative error = 6.8791771945074838838996891997982e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.395 y[1] (analytic) = -13.081019558754501254812621667969 y[1] (numeric) = -13.08101955875450125481262166796 absolute error = 9e-30 relative error = 6.8801976478788536829520851303932e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.396 y[1] (analytic) = -13.079078981134715880388024580746 y[1] (numeric) = -13.079078981134715880388024580737 absolute error = 9e-30 relative error = 6.8812184810425980096911535865516e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.397 y[1] (analytic) = -13.077138257166335422577239629639 y[1] (numeric) = -13.077138257166335422577239629631 absolute error = 8e-30 relative error = 6.1175463948436585941402126760784e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.398 y[1] (analytic) = -13.075197386854967705094563471353 y[1] (numeric) = -13.075197386854967705094563471344 absolute error = 9e-30 relative error = 6.8832612875489506505732244328155e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.399 y[1] (analytic) = -13.073256370206217806998368618266 y[1] (numeric) = -13.073256370206217806998368618257 absolute error = 9e-30 relative error = 6.8842832612927897629151002264131e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.4 y[1] (analytic) = -13.07131520722568806428286633865 y[1] (numeric) = -13.071315207225688064282866338642 absolute error = 8e-30 relative error = 6.1202716583390802272269131037289e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=1117.7MB, alloc=4.5MB, time=45.97 TOP MAIN SOLVE Loop x[1] = 2.401 y[1] (analytic) = -13.069373897918978071468587723366 y[1] (numeric) = -13.069373897918978071468587723358 absolute error = 8e-30 relative error = 6.1211807562364032895433842166495e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.402 y[1] (analytic) = -13.067432442291684683191584238811 y[1] (numeric) = -13.067432442291684683191584238803 absolute error = 8e-30 relative error = 6.1220901927976678849428336206830e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.403 y[1] (analytic) = -13.065490840349402015791349084253 y[1] (numeric) = -13.065490840349402015791349084245 absolute error = 8e-30 relative error = 6.1229999682017772145497086198208e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.404 y[1] (analytic) = -13.063549092097721448897460670009 y[1] (numeric) = -13.063549092097721448897460670001 absolute error = 8e-30 relative error = 6.1239100826277633307804502776913e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.405 y[1] (analytic) = -13.061607197542231627014949531285 y[1] (numeric) = -13.061607197542231627014949531276 absolute error = 9e-30 relative error = 6.8904231032866356584160176612170e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.406 y[1] (analytic) = -13.059665156688518461108389990846 y[1] (numeric) = -13.059665156688518461108389990838 absolute error = 8e-30 relative error = 6.1257313292621390768537541954826e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.407 y[1] (analytic) = -13.057722969542165130184717882048 y[1] (numeric) = -13.05772296954216513018471788204 absolute error = 8e-30 relative error = 6.1266424618292380998427912556661e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.408 y[1] (analytic) = -13.055780636108752082874775642078 y[1] (numeric) = -13.05578063610875208287477564207 absolute error = 8e-30 relative error = 6.1275539341356329255297411173399e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1121.5MB, alloc=4.5MB, time=46.13 x[1] = 2.409 y[1] (analytic) = -13.053838156393857039013586083678 y[1] (numeric) = -13.053838156393857039013586083669 absolute error = 9e-30 relative error = 6.8945239646561267819867650941431e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.41 y[1] (analytic) = -13.051895530403054991219356151912 y[1] (numeric) = -13.051895530403054991219356151903 absolute error = 9e-30 relative error = 6.8955501360207956016694770548629e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.411 y[1] (analytic) = -13.049952758141918206471211970963 y[1] (numeric) = -13.049952758141918206471211970954 absolute error = 9e-30 relative error = 6.8965766901990228802739231644039e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.412 y[1] (analytic) = -13.048009839616016227685666484265 y[1] (numeric) = -13.048009839616016227685666484257 absolute error = 8e-30 relative error = 6.1312032243496746583470995441463e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.413 y[1] (analytic) = -13.046066774830915875291820989675 y[1] (numeric) = -13.046066774830915875291820989666 absolute error = 9e-30 relative error = 6.8986309478066004284647419637387e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.414 y[1] (analytic) = -13.044123563792181248805301869732 y[1] (numeric) = -13.044123563792181248805301869724 absolute error = 8e-30 relative error = 6.1330299125702577266286680828433e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.415 y[1] (analytic) = -13.04218020650537372840093381547 y[1] (numeric) = -13.042180206505373728400933815462 absolute error = 8e-30 relative error = 6.1339437680899703685721867686795e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.416 y[1] (analytic) = -13.040236702976051976484150840552 y[1] (numeric) = -13.040236702976051976484150840544 absolute error = 8e-30 relative error = 6.1348579647900366584938658618871e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1125.3MB, alloc=4.5MB, time=46.29 x[1] = 2.417 y[1] (analytic) = -13.038293053209771939261146380955 y[1] (numeric) = -13.038293053209771939261146380948 absolute error = 7e-30 relative error = 5.3688009399947774141589721143700e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.418 y[1] (analytic) = -13.036349257212086848307763773751 y[1] (numeric) = -13.036349257212086848307763773743 absolute error = 8e-30 relative error = 6.1366873824542310138573223999696e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.419 y[1] (analytic) = -13.034405314988547222137128406935 y[1] (numeric) = -13.034405314988547222137128406927 absolute error = 8e-30 relative error = 6.1376026037801857782133635270540e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.42 y[1] (analytic) = -13.032461226544700867766022830654 y[1] (numeric) = -13.032461226544700867766022830646 absolute error = 8e-30 relative error = 6.1385181670101478211474155988184e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.421 y[1] (analytic) = -13.030516991886092882280006118535 y[1] (numeric) = -13.030516991886092882280006118527 absolute error = 8e-30 relative error = 6.1394340723253572991933753892670e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.422 y[1] (analytic) = -13.028572611018265654397278766247 y[1] (numeric) = -13.028572611018265654397278766239 absolute error = 8e-30 relative error = 6.1403503199071853016499533435919e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.423 y[1] (analytic) = -13.026628083946758866031294412785 y[1] (numeric) = -13.026628083946758866031294412778 absolute error = 7e-30 relative error = 5.3736085461949922214808008828237e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.424 y[1] (analytic) = -13.02468341067710949385211966839 y[1] (numeric) = -13.024683410677109493852119668382 absolute error = 8e-30 relative error = 6.1421838425968366018957683445100e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1129.1MB, alloc=4.5MB, time=46.45 x[1] = 2.425 y[1] (analytic) = -13.022738591214851810846543331376 y[1] (numeric) = -13.022738591214851810846543331368 absolute error = 8e-30 relative error = 6.1431011180680577941710488561759e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.426 y[1] (analytic) = -13.020793625565517387876936274596 y[1] (numeric) = -13.020793625565517387876936274588 absolute error = 8e-30 relative error = 6.1440187365326935341123707281440e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.427 y[1] (analytic) = -13.018848513734635095238863280603 y[1] (numeric) = -13.018848513734635095238863280595 absolute error = 8e-30 relative error = 6.1449366981727713297573923517184e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.428 y[1] (analytic) = -13.016903255727731104217448103034 y[1] (numeric) = -13.016903255727731104217448103026 absolute error = 8e-30 relative error = 6.1458550031704503247598608792936e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.429 y[1] (analytic) = -13.014957851550328888642493030109 y[1] (numeric) = -13.014957851550328888642493030101 absolute error = 8e-30 relative error = 6.1467736517080214159748926600336e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.43 y[1] (analytic) = -13.013012301207949226442354224563 y[1] (numeric) = -13.013012301207949226442354224555 absolute error = 8e-30 relative error = 6.1476926439679073711713632138640e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.431 y[1] (analytic) = -13.011066604706110201196574112739 y[1] (numeric) = -13.011066604706110201196574112731 absolute error = 8e-30 relative error = 6.1486119801326629468715660580711e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.432 y[1] (analytic) = -13.00912076205032720368727209397 y[1] (numeric) = -13.009120762050327203687272093962 absolute error = 8e-30 relative error = 6.1495316603849750063182999302793e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1133.0MB, alloc=4.5MB, time=46.60 x[1] = 2.433 y[1] (analytic) = -13.007174773246112933449294839818 y[1] (numeric) = -13.007174773246112933449294839809 absolute error = 9e-30 relative error = 6.9192581455211204672657372040836e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.434 y[1] (analytic) = -13.005228638298977400319127451127 y[1] (numeric) = -13.005228638298977400319127451118 absolute error = 9e-30 relative error = 6.9202935606191369306859926352314e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.435 y[1] (analytic) = -13.003282357214427925982566739294 y[1] (numeric) = -13.003282357214427925982566739285 absolute error = 9e-30 relative error = 6.9213293634331156514128133617344e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.436 y[1] (analytic) = -13.001335929997969145521157896562 y[1] (numeric) = -13.001335929997969145521157896553 absolute error = 9e-30 relative error = 6.9223655541691751608397881592755e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.437 y[1] (analytic) = -12.999389356655103008957395818577 y[1] (numeric) = -12.999389356655103008957395818568 absolute error = 9e-30 relative error = 6.9234021330335832761425941535809e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.438 y[1] (analytic) = -12.997442637191328782798692340878 y[1] (numeric) = -12.997442637191328782798692340869 absolute error = 9e-30 relative error = 6.9244391002327572338558953524476e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.439 y[1] (analytic) = -12.99549577161214305158011064941 y[1] (numeric) = -12.995495771612143051580110649401 absolute error = 9e-30 relative error = 6.9254764559732638235948617942302e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.44 y[1] (analytic) = -12.993548759923039719405868123589 y[1] (numeric) = -12.99354875992303971940586812358 absolute error = 9e-30 relative error = 6.9265142004618195219214908798037e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.441 y[1] (analytic) = -12.991601602129510011489608868884 y[1] (numeric) = -12.991601602129510011489608868874 absolute error = 1.0e-29 relative error = 7.6972803710058784737287919077209e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=1136.8MB, alloc=4.5MB, time=46.76 TOP MAIN SOLVE Loop x[1] = 2.442 y[1] (analytic) = -12.989654298237042475693447194296 y[1] (numeric) = -12.989654298237042475693447194287 absolute error = 9e-30 relative error = 6.9285908565106933895328615684693e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.443 y[1] (analytic) = -12.987706848251122984065783288605 y[1] (numeric) = -12.987706848251122984065783288596 absolute error = 9e-30 relative error = 6.9296297684851941535034957580963e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.444 y[1] (analytic) = -12.985759252177234734377892347613 y[1] (numeric) = -12.985759252177234734377892347604 absolute error = 9e-30 relative error = 6.9306690700361094841827486514819e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.445 y[1] (analytic) = -12.983811510020858251659288403146 y[1] (numeric) = -12.983811510020858251659288403136 absolute error = 1.0e-29 relative error = 7.7018986237454514510471039923996e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.446 y[1] (analytic) = -12.981863621787471389731864102954 y[1] (numeric) = -12.981863621787471389731864102945 absolute error = 9e-30 relative error = 6.9327488426972020363500059444397e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.447 y[1] (analytic) = -12.979915587482549332742807689139 y[1] (numeric) = -12.97991558748254933274280768913 absolute error = 9e-30 relative error = 6.9337893142227647210540056316614e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.448 y[1] (analytic) = -12.977967407111564596696298421155 y[1] (numeric) = -12.977967407111564596696298421146 absolute error = 9e-30 relative error = 6.9348301761555131688149638791517e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.449 y[1] (analytic) = -12.97601908067998703098398168791 y[1] (numeric) = -12.976019080679987030983981687901 absolute error = 9e-30 relative error = 6.9358714287035170866833580665581e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1140.6MB, alloc=4.5MB, time=46.91 x[1] = 2.45 y[1] (analytic) = -12.974070608193283819914225051936 y[1] (numeric) = -12.974070608193283819914225051927 absolute error = 9e-30 relative error = 6.9369130720749972153239589159953e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.451 y[1] (analytic) = -12.972121989656919484240156467052 y[1] (numeric) = -12.972121989656919484240156467044 absolute error = 8e-30 relative error = 6.1670712057585115239884750939047e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.452 y[1] (analytic) = -12.970173225076355882686485909406 y[1] (numeric) = -12.970173225076355882686485909398 absolute error = 8e-30 relative error = 6.1679978063306889321124939316011e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.453 y[1] (analytic) = -12.968224314457052213475111660239 y[1] (numeric) = -12.968224314457052213475111660231 absolute error = 8e-30 relative error = 6.1689247548575738868138563008705e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.454 y[1] (analytic) = -12.966275257804465015849512477191 y[1] (numeric) = -12.966275257804465015849512477183 absolute error = 8e-30 relative error = 6.1698520515247897048080507965000e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.455 y[1] (analytic) = -12.964326055124048171597926889417 y[1] (numeric) = -12.964326055124048171597926889409 absolute error = 8e-30 relative error = 6.1707796965180945583147260787109e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.456 y[1] (analytic) = -12.96237670642125290657532085026 y[1] (numeric) = -12.962376706421252906575320850252 absolute error = 8e-30 relative error = 6.1717076900233815961315259108396e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.457 y[1] (analytic) = -12.960427211701527792224144979694 y[1] (numeric) = -12.960427211701527792224144979686 absolute error = 8e-30 relative error = 6.1726360322266790648394168597170e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1144.4MB, alloc=4.5MB, time=47.07 x[1] = 2.458 y[1] (analytic) = -12.958477570970318747093882627228 y[1] (numeric) = -12.958477570970318747093882627221 absolute error = 7e-30 relative error = 5.4018691328998816263722150130412e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.459 y[1] (analytic) = -12.956527784233069038359389984434 y[1] (numeric) = -12.956527784233069038359389984427 absolute error = 7e-30 relative error = 5.4026820430380826860323560323137e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.46 y[1] (analytic) = -12.954577851495219283338029474724 y[1] (numeric) = -12.954577851495219283338029474717 absolute error = 7e-30 relative error = 5.4034952587760773456351874491772e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.461 y[1] (analytic) = -12.952627772762207451005597646519 y[1] (numeric) = -12.952627772762207451005597646512 absolute error = 7e-30 relative error = 5.4043087802771142260335009866373e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.462 y[1] (analytic) = -12.950677548039468863511048794384 y[1] (numeric) = -12.950677548039468863511048794377 absolute error = 7e-30 relative error = 5.4051226077045606906447258382053e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.463 y[1] (analytic) = -12.948727177332436197690015531232 y[1] (numeric) = -12.948727177332436197690015531225 absolute error = 7e-30 relative error = 5.4059367412219029521989779070906e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.464 y[1] (analytic) = -12.946776660646539486577127533157 y[1] (numeric) = -12.94677666064653948657712753315 absolute error = 7e-30 relative error = 5.4067511809927461796031840981669e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.465 y[1] (analytic) = -12.94482599798720612091712967695 y[1] (numeric) = -12.944825997987206120917129676944 absolute error = 6e-30 relative error = 4.6350565090121268042183669211590e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1148.2MB, alloc=4.5MB, time=47.23 x[1] = 2.466 y[1] (analytic) = -12.942875189359860850674800788861 y[1] (numeric) = -12.942875189359860850674800788855 absolute error = 6e-30 relative error = 4.6357551256713871118328549461443e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.467 y[1] (analytic) = -12.940924234769925786543674221626 y[1] (numeric) = -12.940924234769925786543674221619 absolute error = 7e-30 relative error = 5.4091963394641199360389458277364e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.468 y[1] (analytic) = -12.938973134222820401453561475311 y[1] (numeric) = -12.938973134222820401453561475304 absolute error = 7e-30 relative error = 5.4100120058874015862053170092681e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.469 y[1] (analytic) = -12.937021887723961532076880076002 y[1] (numeric) = -12.937021887723961532076880075995 absolute error = 7e-30 relative error = 5.4108279793839981377965115152925e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.47 y[1] (analytic) = -12.935070495278763380333786924863 y[1] (numeric) = -12.935070495278763380333786924856 absolute error = 7e-30 relative error = 5.4116442601182307474456100133674e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.471 y[1] (analytic) = -12.933118956892637514896118328604 y[1] (numeric) = -12.933118956892637514896118328596 absolute error = 8e-30 relative error = 6.1856695408623317477414869392931e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.472 y[1] (analytic) = -12.931167272570992872690137920888 y[1] (numeric) = -12.931167272570992872690137920881 absolute error = 7e-30 relative error = 5.4132777439574874126883945677662e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.473 y[1] (analytic) = -12.929215442319235760398093682732 y[1] (numeric) = -12.929215442319235760398093682725 absolute error = 7e-30 relative error = 5.4140949473917527502982355204812e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1152.0MB, alloc=4.5MB, time=47.38 x[1] = 2.474 y[1] (analytic) = -12.927263466142769855958585268427 y[1] (numeric) = -12.927263466142769855958585268419 absolute error = 8e-30 relative error = 6.1884713813967279153676190695934e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.475 y[1] (analytic) = -12.925311344046996210065742842059 y[1] (numeric) = -12.925311344046996210065742842052 absolute error = 7e-30 relative error = 5.4157302781135607128621884589075e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.476 y[1] (analytic) = -12.923359076037313247667218628201 y[1] (numeric) = -12.923359076037313247667218628193 absolute error = 8e-30 relative error = 6.1903410351212172936308169706258e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.477 y[1] (analytic) = -12.921406662119116769460992378835 y[1] (numeric) = -12.921406662119116769460992378828 absolute error = 7e-30 relative error = 5.4173668417398115600633245112010e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.478 y[1] (analytic) = -12.919454102297799953390991957155 y[1] (numeric) = -12.919454102297799953390991957147 absolute error = 8e-30 relative error = 6.1922120986343792442724640262287e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.479 y[1] (analytic) = -12.917501396578753356141530237314 y[1] (numeric) = -12.917501396578753356141530237306 absolute error = 8e-30 relative error = 6.1931481595340324372423963779066e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.48 y[1] (analytic) = -12.915548544967364914630559517813 y[1] (numeric) = -12.915548544967364914630559517806 absolute error = 7e-30 relative error = 5.4198240017669242881534154859943e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.481 y[1] (analytic) = -12.913595547469019947501744644658 y[1] (numeric) = -12.913595547469019947501744644651 absolute error = 7e-30 relative error = 5.4206436729946634427504870257088e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.482 y[1] (analytic) = -12.911642404089101156615356038989 y[1] (numeric) = -12.911642404089101156615356038982 absolute error = 7e-30 relative error = 5.4214636534412606334392615587310e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=1155.8MB, alloc=4.5MB, time=47.54 TOP MAIN SOLVE Loop x[1] = 2.483 y[1] (analytic) = -12.9096891148329886285379838224 y[1] (numeric) = -12.909689114832988628537983822393 absolute error = 7e-30 relative error = 5.4222839432726016561261263440316e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.484 y[1] (analytic) = -12.907735679706059836031074231697 y[1] (numeric) = -12.90773567970605983603107423169 absolute error = 7e-30 relative error = 5.4231045426546934247795618614321e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.485 y[1] (analytic) = -12.905782098713689639538289513369 y[1] (numeric) = -12.905782098713689639538289513361 absolute error = 8e-30 relative error = 6.1987719448613303780182772526280e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.486 y[1] (analytic) = -12.903828371861250288671692486579 y[1] (numeric) = -12.903828371861250288671692486572 absolute error = 7e-30 relative error = 5.4247466707357631023049834762803e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.487 y[1] (analytic) = -12.901874499154111423696756962046 y[1] (numeric) = -12.901874499154111423696756962038 absolute error = 8e-30 relative error = 6.2006493711626987589073521425191e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.488 y[1] (analytic) = -12.899920480597640077016205202665 y[1] (numeric) = -12.899920480597640077016205202657 absolute error = 8e-30 relative error = 6.2015886160170874248599032013354e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.489 y[1] (analytic) = -12.897966316197200674652673610337 y[1] (numeric) = -12.897966316197200674652673610329 absolute error = 8e-30 relative error = 6.2025282155944542824415087285572e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.49 y[1] (analytic) = -12.896012005958155037730207821937 y[1] (numeric) = -12.896012005958155037730207821929 absolute error = 8e-30 relative error = 6.2034681700853546717393679814900e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1159.7MB, alloc=4.5MB, time=47.70 x[1] = 2.491 y[1] (analytic) = -12.894057549885862383954588395959 y[1] (numeric) = -12.89405754988586238395458839595 absolute error = 9e-30 relative error = 6.9799595396405436349202583097103e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.492 y[1] (analytic) = -12.892102947985679329092488269881 y[1] (numeric) = -12.892102947985679329092488269873 absolute error = 8e-30 relative error = 6.2053491445706740227440515511883e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.493 y[1] (analytic) = -12.890148200262959888449463166876 y[1] (numeric) = -12.890148200262959888449463166868 absolute error = 8e-30 relative error = 6.2062901649469006594152705431707e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.494 y[1] (analytic) = -12.888193306723055478346776129002 y[1] (numeric) = -12.888193306723055478346776128994 absolute error = 8e-30 relative error = 6.2072315410002764299718557311176e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.495 y[1] (analytic) = -12.886238267371314917597057352606 y[1] (numeric) = -12.886238267371314917597057352598 absolute error = 8e-30 relative error = 6.2081732729220544260123211886352e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.496 y[1] (analytic) = -12.884283082213084428978800500192 y[1] (numeric) = -12.884283082213084428978800500184 absolute error = 8e-30 relative error = 6.2091153609036276682808723555005e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.497 y[1] (analytic) = -12.882327751253707640709696661588 y[1] (numeric) = -12.88232775125370764070969666158 absolute error = 8e-30 relative error = 6.2100578051365292332708616860482e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.498 y[1] (analytic) = -12.880372274498525587918807135783 y[1] (numeric) = -12.880372274498525587918807135774 absolute error = 9e-30 relative error = 6.9873756815389864274625701778276e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1163.5MB, alloc=4.5MB, time=47.86 x[1] = 2.499 y[1] (analytic) = -12.87841665195287671411757620338 y[1] (numeric) = -12.878416651952876714117576203371 absolute error = 9e-30 relative error = 6.9884367335135445113151779929066e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.5 y[1] (analytic) = -12.876460883622096872669685058181 y[1] (numeric) = -12.876460883622096872669685058172 absolute error = 9e-30 relative error = 6.9894981869182178943282037249646e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.501 y[1] (analytic) = -12.874504969511519328259748064962 y[1] (numeric) = -12.874504969511519328259748064953 absolute error = 9e-30 relative error = 6.9905600419691129658355816426310e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.502 y[1] (analytic) = -12.872548909626474758360852509083 y[1] (numeric) = -12.872548909626474758360852509074 absolute error = 9e-30 relative error = 6.9916222988824943923743643090468e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.503 y[1] (analytic) = -12.870592703972291254700943002143 y[1] (numeric) = -12.870592703972291254700943002135 absolute error = 8e-30 relative error = 6.2157199625553646764900929538205e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.504 y[1] (analytic) = -12.868636352554294324728051706461 y[1] (numeric) = -12.868636352554294324728051706453 absolute error = 8e-30 relative error = 6.2166649059222819760593100969996e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.505 y[1] (analytic) = -12.866679855377806893074375539729 y[1] (numeric) = -12.86667985537780689307437553972 absolute error = 9e-30 relative error = 6.9948114829625806373948162631716e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.506 y[1] (analytic) = -12.86472321244814930301920151977 y[1] (numeric) = -12.864723212448149303019201519761 absolute error = 9e-30 relative error = 6.9958753494917247146223382521417e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1167.3MB, alloc=4.5MB, time=48.01 x[1] = 2.507 y[1] (analytic) = -12.86276642377063931795068140792 y[1] (numeric) = -12.862766423770639317950681407911 absolute error = 9e-30 relative error = 6.9969396189670576609441340572635e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.508 y[1] (analytic) = -12.860809489350592122826456808097 y[1] (numeric) = -12.860809489350592122826456808088 absolute error = 9e-30 relative error = 6.9980042916057968223167471425619e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.509 y[1] (analytic) = -12.858852409193320325633135877249 y[1] (numeric) = -12.85885240919332032563313587724 absolute error = 9e-30 relative error = 6.9990693676253188287699684229104e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.51 y[1] (analytic) = -12.856895183304133958844622801414 y[1] (numeric) = -12.856895183304133958844622801406 absolute error = 8e-30 relative error = 6.2223420864383642123347308434422e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.511 y[1] (analytic) = -12.854937811688340480879301190251 y[1] (numeric) = -12.854937811688340480879301190243 absolute error = 8e-30 relative error = 6.2232895383795690527826142835971e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.512 y[1] (analytic) = -12.852980294351244777556072541445 y[1] (numeric) = -12.852980294351244777556072541437 absolute error = 8e-30 relative error = 6.2242373494619915688740278885502e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.513 y[1] (analytic) = -12.851022631298149163549250925023 y[1] (numeric) = -12.851022631298149163549250925015 absolute error = 8e-30 relative error = 6.2251855198794230607023386891034e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.514 y[1] (analytic) = -12.84906482253435338384231503618 y[1] (numeric) = -12.849064822534353383842315036172 absolute error = 8e-30 relative error = 6.2261340498257970577012105336008e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.515 y[1] (analytic) = -12.847106868065154615180518763814 y[1] (numeric) = -12.847106868065154615180518763806 absolute error = 8e-30 memory used=1171.1MB, alloc=4.5MB, time=48.17 relative error = 6.2270829394951894477678923689306e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.516 y[1] (analytic) = -12.845148767895847467522361420579 y[1] (numeric) = -12.845148767895847467522361420572 absolute error = 7e-30 relative error = 5.4495281654465912807121707509456e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.517 y[1] (analytic) = -12.843190522031723985489918778847 y[1] (numeric) = -12.84319052203172398548991877884 absolute error = 7e-30 relative error = 5.4503590739325398359004205819143e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.518 y[1] (analytic) = -12.841232130478073649818036055571 y[1] (numeric) = -12.841232130478073649818036055564 absolute error = 7e-30 relative error = 5.4511902976863272043764877480421e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.519 y[1] (analytic) = -12.83927359324018337880238398766 y[1] (numeric) = -12.839273593240183378802383987652 absolute error = 8e-30 relative error = 6.2308820992894504856956644149233e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.52 y[1] (analytic) = -12.837314910323337529746379138057 y[1] (numeric) = -12.83731491032333752974637913805 absolute error = 7e-30 relative error = 5.4528536916788066669982586375828e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.521 y[1] (analytic) = -12.835356081732817900406969571348 y[1] (numeric) = -12.83535608173281790040696957134 absolute error = 8e-30 relative error = 6.2327838425811495358380465369219e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.522 y[1] (analytic) = -12.833397107473903730439287036288 y[1] (numeric) = -12.83339710747390373043928703628 absolute error = 8e-30 relative error = 6.2337352557577808308776651808020e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.523 y[1] (analytic) = -12.831437987551871702840166791311 y[1] (numeric) = -12.831437987551871702840166791303 absolute error = 8e-30 relative error = 6.2346870302151780684874884752936e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1174.9MB, alloc=4.5MB, time=48.33 x[1] = 2.524 y[1] (analytic) = -12.829478721971995945390536207636 y[1] (numeric) = -12.829478721971995945390536207628 absolute error = 8e-30 relative error = 6.2356391661487041967233046850498e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.525 y[1] (analytic) = -12.827519310739548032096673283233 y[1] (numeric) = -12.827519310739548032096673283224 absolute error = 9e-30 relative error = 7.0161656217230990488051231694584e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.526 y[1] (analytic) = -12.825559753859796984630336199521 y[1] (numeric) = -12.825559753859796984630336199513 absolute error = 8e-30 relative error = 6.2375445232263133355839387617184e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.527 y[1] (analytic) = -12.823600051338009273767765051292 y[1] (numeric) = -12.823600051338009273767765051284 absolute error = 8e-30 relative error = 6.2384977447618410528273898368947e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.528 y[1] (analytic) = -12.821640203179448820827556878952 y[1] (numeric) = -12.821640203179448820827556878944 absolute error = 8e-30 relative error = 6.2394513285563873357490144758591e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.529 y[1] (analytic) = -12.819680209389376999107415130836 y[1] (numeric) = -12.819680209389376999107415130828 absolute error = 8e-30 relative error = 6.2404052748060347283567673853603e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.53 y[1] (analytic) = -12.81772006997305263531977468193 y[1] (numeric) = -12.817720069973052635319774681922 absolute error = 8e-30 relative error = 6.2413595837070100870756941158713e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.531 y[1] (analytic) = -12.815759784935732011026303533997 y[1] (numeric) = -12.815759784935732011026303533989 absolute error = 8e-30 relative error = 6.2423142554556847121600425822768e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1178.7MB, alloc=4.5MB, time=48.49 x[1] = 2.532 y[1] (analytic) = -12.813799354282668864071282320713 y[1] (numeric) = -12.813799354282668864071282320705 absolute error = 8e-30 relative error = 6.2432692902485744792499826785165e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.533 y[1] (analytic) = -12.811838778019114390013862740048 y[1] (numeric) = -12.811838778019114390013862740039 absolute error = 9e-30 relative error = 7.0247527743176324674572585749040e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.534 y[1] (analytic) = -12.809878056150317243559206034768 y[1] (numeric) = -12.809878056150317243559206034759 absolute error = 9e-30 relative error = 7.0258280059730099354523523025416e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.535 y[1] (analytic) = -12.807917188681523539988502640572 y[1] (numeric) = -12.807917188681523539988502640563 absolute error = 9e-30 relative error = 7.0269036467173478848020073977879e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.536 y[1] (analytic) = -12.805956175617976856587874119991 y[1] (numeric) = -12.805956175617976856587874119982 absolute error = 9e-30 relative error = 7.0279796967723787481121224947536e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.537 y[1] (analytic) = -12.803995016964918234076158498845 y[1] (numeric) = -12.803995016964918234076158498835 absolute error = 1.0e-29 relative error = 7.8100623959555537197242810715500e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.538 y[1] (analytic) = -12.802033712727586178031580120662 y[1] (numeric) = -12.802033712727586178031580120652 absolute error = 1.0e-29 relative error = 7.8112589174469622720393338317153e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.539 y[1] (analytic) = -12.800072262911216660317305133143 y[1] (numeric) = -12.800072262911216660317305133133 absolute error = 1.0e-29 relative error = 7.8124558944682276537421642224374e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1182.5MB, alloc=4.5MB, time=48.65 x[1] = 2.54 y[1] (analytic) = -12.798110667521043120505883719354 y[1] (numeric) = -12.798110667521043120505883719344 absolute error = 1.0e-29 relative error = 7.8136533272664464050621660159499e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.541 y[1] (analytic) = -12.796148926562296467302580185019 y[1] (numeric) = -12.796148926562296467302580185009 absolute error = 1.0e-29 relative error = 7.8148512160888972736466524911592e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.542 y[1] (analytic) = -12.794187040040205079967592011897 y[1] (numeric) = -12.794187040040205079967592011888 absolute error = 9e-30 relative error = 7.0344446050647372427444030887834e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.543 y[1] (analytic) = -12.792225007959994809737158985909 y[1] (numeric) = -12.7922250079599948097371589859 absolute error = 9e-30 relative error = 7.0355235265168701492619181082886e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.544 y[1] (analytic) = -12.790262830326888981243563507293 y[1] (numeric) = -12.790262830326888981243563507285 absolute error = 8e-30 relative error = 6.2547580969417333308830672993866e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.545 y[1] (analytic) = -12.788300507146108393934023188772 y[1] (numeric) = -12.788300507146108393934023188763 absolute error = 9e-30 relative error = 7.0376826029156851043233444239373e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.546 y[1] (analytic) = -12.78633803842287132348847684631 y[1] (numeric) = -12.786338038422871323488476846301 absolute error = 9e-30 relative error = 7.0387627583089485246622175265013e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.547 y[1] (analytic) = -12.784375424162393523236264985759 y[1] (numeric) = -12.78437542416239352323626498575 absolute error = 9e-30 relative error = 7.0398433254627781994136466435322e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1186.4MB, alloc=4.5MB, time=48.80 x[1] = 2.548 y[1] (analytic) = -12.782412664369888225571705887296 y[1] (numeric) = -12.782412664369888225571705887287 absolute error = 9e-30 relative error = 7.0409243046008771073568967321184e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.549 y[1] (analytic) = -12.78044975905056614336856838825 y[1] (numeric) = -12.780449759050566143368568388241 absolute error = 9e-30 relative error = 7.0420056959471134156959102563600e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.55 y[1] (analytic) = -12.778486708209635471393442463572 y[1] (numeric) = -12.778486708209635471393442463564 absolute error = 8e-30 relative error = 6.2605222219782405609109054528900e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.551 y[1] (analytic) = -12.776523511852301887718008701863 y[1] (numeric) = -12.776523511852301887718008701855 absolute error = 8e-30 relative error = 6.2614841921424868892976349890930e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.552 y[1] (analytic) = -12.774560169983768555130207773534 y[1] (numeric) = -12.774560169983768555130207773526 absolute error = 8e-30 relative error = 6.2624465293118305892789533627131e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.553 y[1] (analytic) = -12.772596682609236122544310986366 y[1] (numeric) = -12.772596682609236122544310986358 absolute error = 8e-30 relative error = 6.2634092336858542672772540240730e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.554 y[1] (analytic) = -12.770633049733902726409893022383 y[1] (numeric) = -12.770633049733902726409893022375 absolute error = 8e-30 relative error = 6.2643723054642880363113573178108e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.555 y[1] (analytic) = -12.768669271362963992119707948635 y[1] (numeric) = -12.768669271362963992119707948627 absolute error = 8e-30 relative error = 6.2653357448470096509307595064196e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.556 y[1] (analytic) = -12.766705347501613035416469593163 y[1] (numeric) = -12.766705347501613035416469593156 absolute error = 7e-30 relative error = 5.4830121080297890620116245576460e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=1190.2MB, alloc=4.5MB, time=48.96 TOP MAIN SOLVE Loop x[1] = 2.557 y[1] (analytic) = -12.764741278155040463798537376099 y[1] (numeric) = -12.764741278155040463798537376091 absolute error = 8e-30 relative error = 6.2672637272255664534263346265344e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.558 y[1] (analytic) = -12.762777063328434377924508684507 y[1] (numeric) = -12.762777063328434377924508684499 absolute error = 8e-30 relative error = 6.2682282706218965745519172141412e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.559 y[1] (analytic) = -12.7608127030269803730167188783 y[1] (numeric) = -12.760812703026980373016718878292 absolute error = 8e-30 relative error = 6.2691931824235046786756637283704e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.56 y[1] (analytic) = -12.758848197255861540263650013195 y[1] (numeric) = -12.758848197255861540263650013187 absolute error = 8e-30 relative error = 6.2701584628310087572400088786916e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.561 y[1] (analytic) = -12.756883546020258468221249365391 y[1] (numeric) = -12.756883546020258468221249365383 absolute error = 8e-30 relative error = 6.2711241120451752559617370808634e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.562 y[1] (analytic) = -12.754918749325349244213158841329 y[1] (numeric) = -12.754918749325349244213158841322 absolute error = 7e-30 relative error = 5.4880788639835543094623235882766e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.563 y[1] (analytic) = -12.752953807176309455729856354574 y[1] (numeric) = -12.752953807176309455729856354566 absolute error = 8e-30 relative error = 6.2730565176973043841593019460246e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.564 y[1] (analytic) = -12.750988719578312191826710250551 y[1] (numeric) = -12.750988719578312191826710250544 absolute error = 7e-30 relative error = 5.4897703652203504759028953136974e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1194.0MB, alloc=4.5MB, time=49.12 x[1] = 2.565 y[1] (analytic) = -12.749023486536528044520947858585 y[1] (numeric) = -12.749023486536528044520947858577 absolute error = 8e-30 relative error = 6.2749904009889978855726185527004e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.566 y[1] (analytic) = -12.747058108056125110187539249329 y[1] (numeric) = -12.747058108056125110187539249321 absolute error = 8e-30 relative error = 6.2759578972531785976137411219282e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.567 y[1] (analytic) = -12.745092584142268990953997274434 y[1] (numeric) = -12.745092584142268990953997274426 absolute error = 8e-30 relative error = 6.2769257635317455694152523274184e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.568 y[1] (analytic) = -12.743126914800122796094094963945 y[1] (numeric) = -12.743126914800122796094094963937 absolute error = 8e-30 relative error = 6.2778940000265082425527232680646e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.569 y[1] (analytic) = -12.741161100034847143420501355654 y[1] (numeric) = -12.741161100034847143420501355646 absolute error = 8e-30 relative error = 6.2788626069394256049567067168959e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.57 y[1] (analytic) = -12.739195139851600160676336829311 y[1] (numeric) = -12.739195139851600160676336829303 absolute error = 8e-30 relative error = 6.2798315844726063281039746974960e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.571 y[1] (analytic) = -12.737229034255537486925649017319 y[1] (numeric) = -12.737229034255537486925649017311 absolute error = 8e-30 relative error = 6.2808009328283089043607741615726e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.572 y[1] (analytic) = -12.735262783251812273942810362223 y[1] (numeric) = -12.735262783251812273942810362216 absolute error = 7e-30 relative error = 5.4965493206828240614185093651260e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1197.8MB, alloc=4.5MB, time=49.28 x[1] = 2.573 y[1] (analytic) = -12.733296386845575187600838390037 y[1] (numeric) = -12.733296386845575187600838390029 absolute error = 8e-30 relative error = 6.2827407428170635152405562468288e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.574 y[1] (analytic) = -12.731329845041974409258639767115 y[1] (numeric) = -12.731329845041974409258639767108 absolute error = 7e-30 relative error = 5.4982473042484600176067673234720e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.575 y[1] (analytic) = -12.729363157846155637147179207054 y[1] (numeric) = -12.729363157846155637147179207047 absolute error = 7e-30 relative error = 5.4990967837109141450857805481001e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.576 y[1] (analytic) = -12.727396325263262087754574292739 y[1] (numeric) = -12.727396325263262087754574292731 absolute error = 8e-30 relative error = 6.2856532440342016146082606909422e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.577 y[1] (analytic) = -12.725429347298434497210117277438 y[1] (numeric) = -12.725429347298434497210117277431 absolute error = 7e-30 relative error = 5.5007967188832620923391317340864e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.578 y[1] (analytic) = -12.723462223956811122667224927524 y[1] (numeric) = -12.723462223956811122667224927516 absolute error = 8e-30 relative error = 6.2875967713700781641646861621244e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.579 y[1] (analytic) = -12.72149495524352774368531746811 y[1] (numeric) = -12.721494955243527743685317468102 absolute error = 8e-30 relative error = 6.2885690936052852412285599104785e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.58 y[1] (analytic) = -12.719527541163717663610627691655 y[1] (numeric) = -12.719527541163717663610627691647 absolute error = 8e-30 relative error = 6.2895417884901052798630039367972e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1201.6MB, alloc=4.5MB, time=49.44 x[1] = 2.581 y[1] (analytic) = -12.717559981722511710955941288252 y[1] (numeric) = -12.717559981722511710955941288244 absolute error = 8e-30 relative error = 6.2905148562283025687923210814219e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.582 y[1] (analytic) = -12.715592276925038240779269455088 y[1] (numeric) = -12.715592276925038240779269455081 absolute error = 7e-30 relative error = 5.5050522598958186461835268003819e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.583 y[1] (analytic) = -12.713624426776423136061454841265 y[1] (numeric) = -12.713624426776423136061454841258 absolute error = 7e-30 relative error = 5.5059043471955625378402242296511e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.584 y[1] (analytic) = -12.711656431281789809082711882888 y[1] (numeric) = -12.71165643128178980908271188288 absolute error = 8e-30 relative error = 6.2934362986030717861636982334887e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.585 y[1] (analytic) = -12.709688290446259202798102582085 y[1] (numeric) = -12.709688290446259202798102582078 absolute error = 7e-30 relative error = 5.5076095023210186513685905434503e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.586 y[1] (analytic) = -12.707720004274949792211948782333 y[1] (numeric) = -12.707720004274949792211948782326 absolute error = 7e-30 relative error = 5.5084625705045121452797542387721e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.587 y[1] (analytic) = -12.705751572772977585751181991186 y[1] (numeric) = -12.705751572772977585751181991178 absolute error = 8e-30 relative error = 6.2963611040082953382339294629922e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.588 y[1] (analytic) = -12.703782995945456126637631800265 y[1] (numeric) = -12.703782995945456126637631800257 absolute error = 8e-30 relative error = 6.2973367874382637274272765960019e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1205.4MB, alloc=4.5MB, time=49.59 x[1] = 2.589 y[1] (analytic) = -12.701814273797496494259253951087 y[1] (numeric) = -12.70181427379749649425925395108 absolute error = 7e-30 relative error = 5.5110237396875357293944323855301e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.59 y[1] (analytic) = -12.699845406334207305540299094042 y[1] (numeric) = -12.699845406334207305540299094035 absolute error = 7e-30 relative error = 5.5118781182239132892356604643306e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.591 y[1] (analytic) = -12.697876393560694716310423286575 y[1] (numeric) = -12.697876393560694716310423286568 absolute error = 7e-30 relative error = 5.5127328247972369306009163354539e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.592 y[1] (analytic) = -12.69590723548206242267274127538 y[1] (numeric) = -12.695907235482062422672741275373 absolute error = 7e-30 relative error = 5.5135878595872637910612734220998e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.593 y[1] (analytic) = -12.693937932103411662370823606137 y[1] (numeric) = -12.69393793210341166237082360613 absolute error = 7e-30 relative error = 5.5144432227738847793259739883110e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.594 y[1] (analytic) = -12.691968483429841216154638603074 y[1] (numeric) = -12.691968483429841216154638603068 absolute error = 6e-30 relative error = 4.7273990696032497415927779612991e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.595 y[1] (analytic) = -12.689998889466447409145440259396 y[1] (numeric) = -12.68999888946644740914544025939 absolute error = 6e-30 relative error = 4.7281328014775506025385298431033e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.596 y[1] (analytic) = -12.688029150218324112199603078343 y[1] (numeric) = -12.688029150218324112199603078337 absolute error = 6e-30 relative error = 4.7288668152979120757174426066957e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.597 y[1] (analytic) = -12.686059265690562743271404903428 y[1] (numeric) = -12.686059265690562743271404903421 absolute error = 7e-30 relative error = 5.5178679630888170821106429145711e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=1209.2MB, alloc=4.5MB, time=49.75 TOP MAIN SOLVE Loop x[1] = 2.598 y[1] (analytic) = -12.684089235888252268774758775109 y[1] (numeric) = -12.684089235888252268774758775102 absolute error = 7e-30 relative error = 5.5187249709614629673329924172520e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.599 y[1] (analytic) = -12.682119060816479204943894849953 y[1] (numeric) = -12.682119060816479204943894849947 absolute error = 6e-30 relative error = 4.7310705499824553199563519583851e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.6 y[1] (analytic) = -12.680148740480327619192993417069 y[1] (numeric) = -12.680148740480327619192993417063 absolute error = 6e-30 relative error = 4.7318056931347307710629223086625e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.601 y[1] (analytic) = -12.678178274884879131474770045351 y[1] (numeric) = -12.678178274884879131474770045344 absolute error = 7e-30 relative error = 5.5212979721753925737365782644241e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.602 y[1] (analytic) = -12.676207664035212915638013893846 y[1] (numeric) = -12.67620766403521291563801389384 absolute error = 6e-30 relative error = 4.7332768277559299790888045850314e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.603 y[1] (analytic) = -12.67423690793640570078408021632 y[1] (numeric) = -12.674236907936405700784080216313 absolute error = 7e-30 relative error = 5.5230149561246651951642524902600e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.604 y[1] (analytic) = -12.672266006593531772622338089813 y[1] (numeric) = -12.672266006593531772622338089806 absolute error = 7e-30 relative error = 5.5238739435850037905621318843662e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.605 y[1] (analytic) = -12.670294960011662974824574395827 y[1] (numeric) = -12.67029496001166297482457439582 absolute error = 7e-30 relative error = 5.5247332616111065795627966086871e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1213.1MB, alloc=4.5MB, time=49.91 x[1] = 2.606 y[1] (analytic) = -12.66832376819586871037835508146 y[1] (numeric) = -12.668323768195868710378355081452 absolute error = 8e-30 relative error = 6.3149633261538454451363717757042e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.607 y[1] (analytic) = -12.66635243115121594293934472663 y[1] (numeric) = -12.666352431151215942939344726623 absolute error = 7e-30 relative error = 5.5264528900873050573272479413329e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.608 y[1] (analytic) = -12.664380948882769198182585442292 y[1] (numeric) = -12.664380948882769198182585442285 absolute error = 7e-30 relative error = 5.5273132009010898048939932401451e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.609 y[1] (analytic) = -12.662409321395590565152736123285 y[1] (numeric) = -12.662409321395590565152736123278 absolute error = 7e-30 relative error = 5.5281738430080171142480385600400e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.61 y[1] (analytic) = -12.66043754869473969761327307828 y[1] (numeric) = -12.660437548694739697613273078273 absolute error = 7e-30 relative error = 5.5290348165902709781629433748853e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.611 y[1] (analytic) = -12.658465630785273815394653058014 y[1] (numeric) = -12.658465630785273815394653058007 absolute error = 7e-30 relative error = 5.5298961218301714007714476929881e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.612 y[1] (analytic) = -12.656493567672247705741439701818 y[1] (numeric) = -12.656493567672247705741439701811 absolute error = 7e-30 relative error = 5.5307577589101745233448170638918e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.613 y[1] (analytic) = -12.654521359360713724658394421189 y[1] (numeric) = -12.654521359360713724658394421182 absolute error = 7e-30 relative error = 5.5316197280128727502126160804459e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1216.9MB, alloc=4.5MB, time=50.06 x[1] = 2.614 y[1] (analytic) = -12.652549005855721798255532737967 y[1] (numeric) = -12.652549005855721798255532737961 absolute error = 6e-30 relative error = 4.7421274537037098927055079048327e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.615 y[1] (analytic) = -12.650576507162319424092147093438 y[1] (numeric) = -12.650576507162319424092147093431 absolute error = 7e-30 relative error = 5.5333446630174062059443548247290e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.616 y[1] (analytic) = -12.648603863285551672519797143465 y[1] (numeric) = -12.648603863285551672519797143458 absolute error = 7e-30 relative error = 5.5342076292851086940065248947294e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.617 y[1] (analytic) = -12.64663107423046118802426855356 y[1] (numeric) = -12.646631074230461188024268553554 absolute error = 6e-30 relative error = 4.7443465099776351922157575158808e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.618 y[1] (analytic) = -12.644658140002088190566501306571 y[1] (numeric) = -12.644658140002088190566501306564 absolute error = 7e-30 relative error = 5.5359345602670789100253588767255e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.619 y[1] (analytic) = -12.642685060605470476922488534438 y[1] (numeric) = -12.642685060605470476922488534431 absolute error = 7e-30 relative error = 5.5367985253480348862090371564358e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.62 y[1] (analytic) = -12.640711836045643422022146884314 y[1] (numeric) = -12.640711836045643422022146884307 absolute error = 7e-30 relative error = 5.5376628237336587694617209229177e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.621 y[1] (analytic) = -12.638738466327639980287159428068 y[1] (numeric) = -12.638738466327639980287159428061 absolute error = 7e-30 relative error = 5.5385274556076376186028772870647e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1220.7MB, alloc=4.5MB, time=50.22 x[1] = 2.622 y[1] (analytic) = -12.636764951456490686967792123034 y[1] (numeric) = -12.636764951456490686967792123027 absolute error = 7e-30 relative error = 5.5393924211537958951376654792966e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.623 y[1] (analytic) = -12.634791291437223659478684830639 y[1] (numeric) = -12.634791291437223659478684830632 absolute error = 7e-30 relative error = 5.5402577205560955905910600484384e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.624 y[1] (analytic) = -12.632817486274864598733617898357 y[1] (numeric) = -12.63281748627486459873361789835 absolute error = 7e-30 relative error = 5.5411233539986363539844215126434e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.625 y[1] (analytic) = -12.630843535974436790479255309209 y[1] (numeric) = -12.630843535974436790479255309202 absolute error = 7e-30 relative error = 5.5419893216656556194546996483672e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.626 y[1] (analytic) = -12.62886944054096110662786540186 y[1] (numeric) = -12.628869440540961106627865401853 absolute error = 7e-30 relative error = 5.5428556237415287340164548794530e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.627 y[1] (analytic) = -12.626895199979456006589020163139 y[1] (numeric) = -12.626895199979456006589020163132 absolute error = 7e-30 relative error = 5.5437222604107690854668835049334e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.628 y[1] (analytic) = -12.624920814294937538600274093631 y[1] (numeric) = -12.624920814294937538600274093624 absolute error = 7e-30 relative error = 5.5445892318580282304340327811320e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.629 y[1] (analytic) = -12.622946283492419341056823645786 y[1] (numeric) = -12.622946283492419341056823645779 absolute error = 7e-30 relative error = 5.5454565382680960225683921511139e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.63 y[1] (analytic) = -12.620971607576912643840148232794 y[1] (numeric) = -12.620971607576912643840148232787 absolute error = 7e-30 relative error = 5.5463241798259007408780471924519e-29 % Correct digits = 30 h = 0.001 memory used=1224.5MB, alloc=4.5MB, time=50.38 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.631 y[1] (analytic) = -12.618996786553426269645633805294 y[1] (numeric) = -12.618996786553426269645633805287 absolute error = 7e-30 relative error = 5.5471921567165092182075831326569e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.632 y[1] (analytic) = -12.617021820426966635309179991782 y[1] (numeric) = -12.617021820426966635309179991775 absolute error = 7e-30 relative error = 5.5480604691251269698609250604816e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.633 y[1] (analytic) = -12.615046709202537753132791797415 y[1] (numeric) = -12.615046709202537753132791797407 absolute error = 8e-30 relative error = 6.3416332768423980827066311321272e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.634 y[1] (analytic) = -12.613071452885141232209156854689 y[1] (numeric) = -12.613071452885141232209156854681 absolute error = 8e-30 relative error = 6.3426264014147503341685991075011e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.635 y[1] (analytic) = -12.611096051479776279745209218328 y[1] (numeric) = -12.61109605147977627974520921832 absolute error = 8e-30 relative error = 6.3436199100721988180682933563967e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.636 y[1] (analytic) = -12.609120504991439702384680695493 y[1] (numeric) = -12.609120504991439702384680695485 absolute error = 8e-30 relative error = 6.3446138030270424306971261144976e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.637 y[1] (analytic) = -12.607144813425125907529640701272 y[1] (numeric) = -12.607144813425125907529640701264 absolute error = 8e-30 relative error = 6.3456080804917393000484072420332e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.638 y[1] (analytic) = -12.605168976785826904661025628215 y[1] (numeric) = -12.605168976785826904661025628207 absolute error = 8e-30 relative error = 6.3466027426789069338063793705936e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1228.3MB, alloc=4.5MB, time=50.54 x[1] = 2.639 y[1] (analytic) = -12.603192995078532306658158717512 y[1] (numeric) = -12.603192995078532306658158717504 absolute error = 8e-30 relative error = 6.3475977898013223675012581247879e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.64 y[1] (analytic) = -12.601216868308229331117261418217 y[1] (numeric) = -12.601216868308229331117261418208 absolute error = 9e-30 relative error = 7.1421673748309126019343055794054e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.641 y[1] (analytic) = -12.599240596479902801668957219764 y[1] (numeric) = -12.599240596479902801668957219756 absolute error = 8e-30 relative error = 6.3495890397038033061464715878963e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.642 y[1] (analytic) = -12.597264179598535149294768941854 y[1] (numeric) = -12.597264179598535149294768941846 absolute error = 8e-30 relative error = 6.3505852429102218571108664113160e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.643 y[1] (analytic) = -12.595287617669106413642610464576 y[1] (numeric) = -12.595287617669106413642610464569 absolute error = 7e-30 relative error = 5.5576341029165202728263875301220e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.644 y[1] (analytic) = -12.59331091069659424434127388053 y[1] (numeric) = -12.593310910696594244341273880523 absolute error = 7e-30 relative error = 5.5585064560379361264884519221677e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.645 y[1] (analytic) = -12.591334058685973902313913049468 y[1] (numeric) = -12.591334058685973902313913049461 absolute error = 7e-30 relative error = 5.5593791470977118437455079845250e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.646 y[1] (analytic) = -12.58935706164221826109052453488 y[1] (numeric) = -12.589357061642218261090524534872 absolute error = 8e-30 relative error = 6.3545739157520092351803174640010e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1232.1MB, alloc=4.5MB, time=50.70 x[1] = 2.647 y[1] (analytic) = -12.587379919570297808119426900719 y[1] (numeric) = -12.587379919570297808119426900711 absolute error = 8e-30 relative error = 6.3555720500355727119862123777133e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.648 y[1] (analytic) = -12.585402632475180646077739345358 y[1] (numeric) = -12.585402632475180646077739345351 absolute error = 7e-30 relative error = 5.5619992497795080159026152515771e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.649 y[1] (analytic) = -12.583425200361832494180860648656 y[1] (numeric) = -12.583425200361832494180860648649 absolute error = 7e-30 relative error = 5.5628732944657366963210749026580e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.65 y[1] (analytic) = -12.581447623235216689490949406884 y[1] (numeric) = -12.581447623235216689490949406876 absolute error = 8e-30 relative error = 6.3585687748886127126128225670294e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.651 y[1] (analytic) = -12.579469901100294188224406529094 y[1] (numeric) = -12.579469901100294188224406529087 absolute error = 7e-30 relative error = 5.5646224006527714107331669526097e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.652 y[1] (analytic) = -12.577492033962023567058360967365 y[1] (numeric) = -12.577492033962023567058360967357 absolute error = 8e-30 relative error = 6.3605685286050845217492006279158e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.653 y[1] (analytic) = -12.575514021825361024436159652172 y[1] (numeric) = -12.575514021825361024436159652165 absolute error = 7e-30 relative error = 5.5663728638457165766697577074024e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.654 y[1] (analytic) = -12.57353586469526038187186260303 y[1] (numeric) = -12.573535864695260381871862603023 absolute error = 7e-30 relative error = 5.5672486047898636358522900478611e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1236.0MB, alloc=4.5MB, time=50.86 x[1] = 2.655 y[1] (analytic) = -12.571557562576673085253744183347 y[1] (numeric) = -12.57155756257667308525374418334 absolute error = 7e-30 relative error = 5.5681246855503211797254436427992e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.656 y[1] (analytic) = -12.569579115474548206146801467322 y[1] (numeric) = -12.569579115474548206146801467315 absolute error = 7e-30 relative error = 5.5690011063156620670165016708652e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.657 y[1] (analytic) = -12.567600523393832443094270685546 y[1] (numeric) = -12.567600523393832443094270685539 absolute error = 7e-30 relative error = 5.5698778672746011018156339827564e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.658 y[1] (analytic) = -12.565621786339470122918152714831 y[1] (numeric) = -12.565621786339470122918152714823 absolute error = 8e-30 relative error = 6.3665771069897087611516549953196e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.659 y[1] (analytic) = -12.563642904316403202018748576629 y[1] (numeric) = -12.563642904316403202018748576622 absolute error = 7e-30 relative error = 5.5716324105288433518531366301017e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.66 y[1] (analytic) = -12.561663877329571267673205907296 y[1] (numeric) = -12.561663877329571267673205907288 absolute error = 8e-30 relative error = 6.3685830779454709653921894719589e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.661 y[1] (analytic) = -12.559684705383911539333077362252 y[1] (numeric) = -12.559684705383911539333077362245 absolute error = 7e-30 relative error = 5.5733883168256103059544511769217e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.662 y[1] (analytic) = -12.557705388484358869920891915032 y[1] (numeric) = -12.557705388484358869920891915025 absolute error = 7e-30 relative error = 5.5742667815882395059284658126279e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1239.8MB, alloc=4.5MB, time=51.01 x[1] = 2.663 y[1] (analytic) = -12.555725926635845747125740010986 y[1] (numeric) = -12.555725926635845747125740010979 absolute error = 7e-30 relative error = 5.5751455876797439572007268374744e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.664 y[1] (analytic) = -12.553746319843302294697873534341 y[1] (numeric) = -12.553746319843302294697873534334 absolute error = 7e-30 relative error = 5.5760247352898357978551070820946e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.665 y[1] (analytic) = -12.551766568111656273742321546137 y[1] (numeric) = -12.551766568111656273742321546131 absolute error = 6e-30 relative error = 4.7802036210928887214100726507157e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.666 y[1] (analytic) = -12.549786671445833084011522749446 y[1] (numeric) = -12.54978667144583308401152274944 absolute error = 6e-30 relative error = 4.7809577621360103242489670134791e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.667 y[1] (analytic) = -12.547806629850755765196975637137 y[1] (numeric) = -12.547806629850755765196975637131 absolute error = 6e-30 relative error = 4.7817121963979168347926394564714e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.668 y[1] (analytic) = -12.545826443331344998219907276333 y[1] (numeric) = -12.545826443331344998219907276326 absolute error = 7e-30 relative error = 5.5795447447153279383600673221673e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.669 y[1] (analytic) = -12.543846111892519106520961682556 y[1] (numeric) = -12.543846111892519106520961682549 absolute error = 7e-30 relative error = 5.5804256027690487925031488403156e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.67 y[1] (analytic) = -12.541865635539194057348908735457 y[1] (numeric) = -12.54186563553919405734890873545 absolute error = 7e-30 relative error = 5.5813068034826377359225414896662e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.671 y[1] (analytic) = -12.539885014276283463048374586864 y[1] (numeric) = -12.539885014276283463048374586857 absolute error = 7e-30 relative error = 5.5821883470468107812339805589839e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=1243.6MB, alloc=4.5MB, time=51.17 TOP MAIN SOLVE Loop x[1] = 2.672 y[1] (analytic) = -12.537904248108698582346594510789 y[1] (numeric) = -12.537904248108698582346594510782 absolute error = 7e-30 relative error = 5.5830702336524278886373986057988e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.673 y[1] (analytic) = -12.535923337041348321639189143898 y[1] (numeric) = -12.535923337041348321639189143892 absolute error = 6e-30 relative error = 4.7862449687061369433763942194856e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.674 y[1] (analytic) = -12.533942281079139236274965063832 y[1] (numeric) = -12.533942281079139236274965063826 absolute error = 6e-30 relative error = 4.7870014600732754371938421658869e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.675 y[1] (analytic) = -12.531961080226975531839740651625 y[1] (numeric) = -12.531961080226975531839740651619 absolute error = 6e-30 relative error = 4.7877582459674616245936690668165e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.676 y[1] (analytic) = -12.529979734489759065439198183388 y[1] (numeric) = -12.529979734489759065439198183381 absolute error = 7e-30 relative error = 5.5866012143115818554521270981621e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.677 y[1] (analytic) = -12.527998243872389346980763095268 y[1] (numeric) = -12.527998243872389346980763095262 absolute error = 6e-30 relative error = 4.7892727019934568101451747144716e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.678 y[1] (analytic) = -12.526016608379763540454511364614 y[1] (numeric) = -12.526016608379763540454511364608 absolute error = 6e-30 relative error = 4.7900303724538156948667760559370e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.679 y[1] (analytic) = -12.524034828016776465213105949121 y[1] (numeric) = -12.524034828016776465213105949114 absolute error = 7e-30 relative error = 5.5892530611147093250843651470207e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1247.4MB, alloc=4.5MB, time=51.33 x[1] = 2.68 y[1] (analytic) = -12.522052902788320597250763224667 y[1] (numeric) = -12.52205290278832059725076322466 absolute error = 7e-30 relative error = 5.5901376989401557241925705143865e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.681 y[1] (analytic) = -12.520070832699286070481250361407 y[1] (numeric) = -12.5200708326992860704812503614 absolute error = 7e-30 relative error = 5.5910226815312857424144358806466e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.682 y[1] (analytic) = -12.518088617754560678014914576584 y[1] (numeric) = -12.518088617754560678014914576578 absolute error = 6e-30 relative error = 4.7930640077832053561438868322751e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.683 y[1] (analytic) = -12.51610625795902987343474520143 y[1] (numeric) = -12.516106257959029873434745201424 absolute error = 6e-30 relative error = 4.7938231558114024715101649573909e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.684 y[1] (analytic) = -12.514123753317576772071469498398 y[1] (numeric) = -12.514123753317576772071469498392 absolute error = 6e-30 relative error = 4.7945825998479201658019805751071e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.685 y[1] (analytic) = -12.512141103835082152277683163878 y[1] (numeric) = -12.512141103835082152277683163872 absolute error = 6e-30 relative error = 4.7953423400579672313303907188881e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.686 y[1] (analytic) = -12.510158309516424456701016450448 y[1] (numeric) = -12.510158309516424456701016450442 absolute error = 6e-30 relative error = 4.7961023766068774722392155710254e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.687 y[1] (analytic) = -12.508175370366479793556336841594 y[1] (numeric) = -12.508175370366479793556336841587 absolute error = 7e-30 relative error = 5.5963398279367947920917755571211e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1251.2MB, alloc=4.5MB, time=51.49 x[1] = 2.688 y[1] (analytic) = -12.506192286390121937896989210741 y[1] (numeric) = -12.506192286390121937896989210735 absolute error = 6e-30 relative error = 4.7976233393832484597974285738473e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.689 y[1] (analytic) = -12.504209057592222332885074395366 y[1] (numeric) = -12.50420905759222233288507439536 absolute error = 6e-30 relative error = 4.7983842659420029301534087263174e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.69 y[1] (analytic) = -12.502225683977650091060767115797 y[1] (numeric) = -12.502225683977650091060767115791 absolute error = 6e-30 relative error = 4.7991454895022082585432637579789e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.691 y[1] (analytic) = -12.500242165551271995610674167296 y[1] (numeric) = -12.50024216555127199561067416729 absolute error = 6e-30 relative error = 4.7999070102298250702509441910841e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.692 y[1] (analytic) = -12.498258502317952501635233812853 y[1] (numeric) = -12.498258502317952501635233812847 absolute error = 6e-30 relative error = 4.8006688282909397081153930032647e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.693 y[1] (analytic) = -12.496274694282553737415157303081 y[1] (numeric) = -12.496274694282553737415157303075 absolute error = 6e-30 relative error = 4.8014309438517643506175871590608e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.694 y[1] (analytic) = -12.494290741449935505676913448466 y[1] (numeric) = -12.49429074144993550567691344846 absolute error = 6e-30 relative error = 4.8021933570786371301013819438713e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.695 y[1] (analytic) = -12.492306643824955284857257168179 y[1] (numeric) = -12.492306643824955284857257168173 absolute error = 6e-30 relative error = 4.8029560681380222511283343931251e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1255.0MB, alloc=4.5MB, time=51.64 x[1] = 2.696 y[1] (analytic) = -12.490322401412468230366802938536 y[1] (numeric) = -12.49032240141246823036680293853 absolute error = 6e-30 relative error = 4.8037190771965101089666823756922e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.697 y[1] (analytic) = -12.488338014217327175852644063126 y[1] (numeric) = -12.48833801421732717585264406312 absolute error = 6e-30 relative error = 4.8044823844208174082146561572090e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.698 y[1] (analytic) = -12.486353482244382634460018685526 y[1] (numeric) = -12.48635348224438263446001868552 absolute error = 6e-30 relative error = 4.8052459899777872815582995361097e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.699 y[1] (analytic) = -12.484368805498482800093023464462 y[1] (numeric) = -12.484368805498482800093023464456 absolute error = 6e-30 relative error = 4.8060098940343894086639779127141e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.7 y[1] (analytic) = -12.482383983984473548674375830162 y[1] (numeric) = -12.482383983984473548674375830155 absolute error = 7e-30 relative error = 5.6079031128840068244067094063774e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.701 y[1] (analytic) = -12.480399017707198439404225739594 y[1] (numeric) = -12.480399017707198439404225739588 absolute error = 6e-30 relative error = 4.8075385983150025920277875111712e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.702 y[1] (analytic) = -12.478413906671498716018017847201 y[1] (numeric) = -12.478413906671498716018017847195 absolute error = 6e-30 relative error = 4.8083033988735868144420016750044e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.703 y[1] (analytic) = -12.47642865088221330804340500663 y[1] (numeric) = -12.476428650882213308043405006624 absolute error = 6e-30 relative error = 4.8090684986009498616610872054749e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1258.8MB, alloc=4.5MB, time=51.80 x[1] = 2.704 y[1] (analytic) = -12.474443250344178832056214017942 y[1] (numeric) = -12.474443250344178832056214017936 absolute error = 6e-30 relative error = 4.8098338976646959363671302393367e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.705 y[1] (analytic) = -12.472457705062229592935464533658 y[1] (numeric) = -12.472457705062229592935464533651 absolute error = 7e-30 relative error = 5.6123661956046492551519749537334e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.706 y[1] (analytic) = -12.470472015041197585117442035942 y[1] (numeric) = -12.470472015041197585117442035935 absolute error = 7e-30 relative error = 5.6132598602177888171238045042386e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.707 y[1] (analytic) = -12.468486180285912493848825796173 y[1] (numeric) = -12.468486180285912493848825796167 absolute error = 6e-30 relative error = 4.8121318925521840190122370773277e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.708 y[1] (analytic) = -12.466500200801201696438872727049 y[1] (numeric) = -12.466500200801201696438872727043 absolute error = 6e-30 relative error = 4.8128984906400512923836555903170e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.709 y[1] (analytic) = -12.464514076591890263510658036323 y[1] (numeric) = -12.464514076591890263510658036317 absolute error = 6e-30 relative error = 4.8136653889042339531078033473647e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.71 y[1] (analytic) = -12.462527807662800960251373590207 y[1] (numeric) = -12.4625278076628009602513735902 absolute error = 7e-30 relative error = 5.6168380187652851804454109194622e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.711 y[1] (analytic) = -12.46054139401875424766168489339 y[1] (numeric) = -12.460541394018754247661684893383 absolute error = 7e-30 relative error = 5.6177334344076770406075496062386e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.712 y[1] (analytic) = -12.458554835664568283804147591589 y[1] (numeric) = -12.458554835664568283804147591582 absolute error = 7e-30 relative error = 5.6186292008455118088872808600533e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=1262.7MB, alloc=4.5MB, time=51.96 TOP MAIN SOLVE Loop x[1] = 2.713 y[1] (analytic) = -12.456568132605058925050684401444 y[1] (numeric) = -12.456568132605058925050684401438 absolute error = 6e-30 relative error = 4.8167359870934305986258384017494e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.714 y[1] (analytic) = -12.454581284845039727329123371555 y[1] (numeric) = -12.454581284845039727329123371549 absolute error = 6e-30 relative error = 4.8175043887672954228646736031389e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.715 y[1] (analytic) = -12.452594292389321947368798377355 y[1] (numeric) = -12.452594292389321947368798377349 absolute error = 6e-30 relative error = 4.8182730916296153059486568124981e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.716 y[1] (analytic) = -12.450607155242714543945212751498 y[1] (numeric) = -12.450607155242714543945212751492 absolute error = 6e-30 relative error = 4.8190420958495295481397830032134e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.717 y[1] (analytic) = -12.448619873410024179123766950342 y[1] (numeric) = -12.448619873410024179123766950336 absolute error = 6e-30 relative error = 4.8198114015963061599807837524546e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.718 y[1] (analytic) = -12.446632446896055219502551156087 y[1] (numeric) = -12.446632446896055219502551156081 absolute error = 6e-30 relative error = 4.8205810090393419837807447118057e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.719 y[1] (analytic) = -12.444644875705609737454203713052 y[1] (numeric) = -12.444644875705609737454203713046 absolute error = 6e-30 relative error = 4.8213509183481628152390141122822e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.72 y[1] (analytic) = -12.442657159843487512366836295536 y[1] (numeric) = -12.442657159843487512366836295529 absolute error = 7e-30 relative error = 5.6258079846411607794088496206955e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1266.5MB, alloc=4.5MB, time=52.21 x[1] = 2.721 y[1] (analytic) = -12.440669299314486031884026703641 y[1] (numeric) = -12.440669299314486031884026703634 absolute error = 7e-30 relative error = 5.6267069171155595451908268381660e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.722 y[1] (analytic) = -12.438681294123400493143880182416 y[1] (numeric) = -12.43868129412340049314388018241 absolute error = 6e-30 relative error = 4.8236624591665301713919151061105e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.723 y[1] (analytic) = -12.436693144275023804017160158595 y[1] (numeric) = -12.436693144275023804017160158589 absolute error = 6e-30 relative error = 4.8244335776363323228786369508443e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.724 y[1] (analytic) = -12.434704849774146584344489288179 y[1] (numeric) = -12.434704849774146584344489288173 absolute error = 6e-30 relative error = 4.8252049988214870279146092787311e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.725 y[1] (analytic) = -12.43271641062555716717262170707 y[1] (numeric) = -12.432716410625557167172621707065 absolute error = 5e-30 relative error = 4.0216472690769136370085301079676e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.726 y[1] (analytic) = -12.430727826834041599989787375912 y[1] (numeric) = -12.430727826834041599989787375906 absolute error = 6e-30 relative error = 4.8267487500191922189211068534238e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.727 y[1] (analytic) = -12.428739098404383645960109409235 y[1] (numeric) = -12.428739098404383645960109409229 absolute error = 6e-30 relative error = 4.8275210803727364093848473573938e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.728 y[1] (analytic) = -12.426750225341364785157095278012 y[1] (numeric) = -12.426750225341364785157095278007 absolute error = 5e-30 relative error = 4.0235780951030173399982668287217e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1270.3MB, alloc=4.5MB, time=52.58 x[1] = 2.729 y[1] (analytic) = -12.424761207649764215796202773629 y[1] (numeric) = -12.424761207649764215796202773624 absolute error = 5e-30 relative error = 4.0242222095355562201937992475629e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.73 y[1] (analytic) = -12.422772045334358855466481620283 y[1] (numeric) = -12.422772045334358855466481620278 absolute error = 5e-30 relative error = 4.0248665770840239399950198663031e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.731 y[1] (analytic) = -12.420782738399923342361291621769 y[1] (numeric) = -12.420782738399923342361291621763 absolute error = 6e-30 relative error = 4.8306134374691873729183615964828e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.732 y[1] (analytic) = -12.418793286851230036508098227573 y[1] (numeric) = -12.418793286851230036508098227568 absolute error = 5e-30 relative error = 4.0261560720991305998423843722043e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.733 y[1] (analytic) = -12.416803690693049020997346402178 y[1] (numeric) = -12.416803690693049020997346402173 absolute error = 5e-30 relative error = 4.0268011998512339668544894635862e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.734 y[1] (analytic) = -12.414813949930148103210413680423 y[1] (numeric) = -12.414813949930148103210413680417 absolute error = 6e-30 relative error = 4.8329358975482342801847808588400e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.735 y[1] (analytic) = -12.412824064567292816046643290761 y[1] (numeric) = -12.412824064567292816046643290755 absolute error = 6e-30 relative error = 4.8337106598708229840425137327864e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.736 y[1] (analytic) = -12.410834034609246419149458227219 y[1] (numeric) = -12.410834034609246419149458227213 absolute error = 6e-30 relative error = 4.8344857269609836184857852649496e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1274.1MB, alloc=4.5MB, time=52.95 x[1] = 2.737 y[1] (analytic) = -12.408843860060769900131557149811 y[1] (numeric) = -12.408843860060769900131557149805 absolute error = 6e-30 relative error = 4.8352610989905840966802477708611e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.738 y[1] (analytic) = -12.40685354092662197579919299218 y[1] (numeric) = -12.406853540926621975799192992173 absolute error = 7e-30 relative error = 5.6420429054868942263159749191132e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.739 y[1] (analytic) = -12.404863077211559093375535154161 y[1] (numeric) = -12.404863077211559093375535154154 absolute error = 7e-30 relative error = 5.6429482183156049511120338825251e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.74 y[1] (analytic) = -12.40287246892033543172311615599 y[1] (numeric) = -12.402872468920335431723116155983 absolute error = 7e-30 relative error = 5.6438538875094528058850310761106e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.741 y[1] (analytic) = -12.400881716057702902565363629815 y[1] (numeric) = -12.400881716057702902565363629808 absolute error = 7e-30 relative error = 5.6447599132695639178951858893501e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.742 y[1] (analytic) = -12.398890818628411151707218523171 y[1] (numeric) = -12.398890818628411151707218523164 absolute error = 7e-30 relative error = 5.6456662957972181686246899482962e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.743 y[1] (analytic) = -12.396899776637207560254840388057 y[1] (numeric) = -12.39689977663720756025484038805 absolute error = 7e-30 relative error = 5.6465730352938493396092482465992e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.744 y[1] (analytic) = -12.394908590088837245834400628227 y[1] (numeric) = -12.394908590088837245834400628221 absolute error = 6e-30 relative error = 4.8406972559666102215169128330374e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1277.9MB, alloc=4.5MB, time=53.33 x[1] = 2.745 y[1] (analytic) = -12.392917258988043063809964576308 y[1] (numeric) = -12.392917258988043063809964576301 absolute error = 7e-30 relative error = 5.6483875860005479449108292296253e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.746 y[1] (analytic) = -12.390925783339565608500463271306 y[1] (numeric) = -12.3909257833395656085004632713 absolute error = 6e-30 relative error = 4.8422531979550746491887910328970e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.747 y[1] (analytic) = -12.38893416314814321439575580611 y[1] (numeric) = -12.388934163148143214395755806103 absolute error = 7e-30 relative error = 5.6502035670042135392687396418934e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.748 y[1] (analytic) = -12.386942398418511957371783113512 y[1] (numeric) = -12.386942398418511957371783113506 absolute error = 6e-30 relative error = 4.8438103666051137991522901629587e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.749 y[1] (analytic) = -12.384950489155405655904814058331 y[1] (numeric) = -12.384950489155405655904814058325 absolute error = 6e-30 relative error = 4.8445894113616043059611324405626e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.75 y[1] (analytic) = -12.382958435363555872284784702147 y[1] (numeric) = -12.38295843536355587228478470214 absolute error = 7e-30 relative error = 5.6529302238544454923304903928559e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.751 y[1] (analytic) = -12.3809662370476919138277316062 y[1] (numeric) = -12.380966237047691913827731606193 absolute error = 7e-30 relative error = 5.6538398263730244237645133877893e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.752 y[1] (analytic) = -12.378973894212540834087320036968 y[1] (numeric) = -12.378973894212540834087320036962 absolute error = 6e-30 relative error = 4.8469283894403719628158408477217e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.753 y[1] (analytic) = -12.376981406862827434065467937947 y[1] (numeric) = -12.376981406862827434065467937941 absolute error = 6e-30 relative error = 4.8477086639825613689993604296152e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1281.7MB, alloc=4.5MB, time=53.71 x[1] = 2.754 y[1] (analytic) = -12.374988775003274263422066530137 y[1] (numeric) = -12.37498877500327426342206653013 absolute error = 7e-30 relative error = 5.6565707874738237002704872668336e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.755 y[1] (analytic) = -12.372995998638601621683798402763 y[1] (numeric) = -12.372995998638601621683798402757 absolute error = 6e-30 relative error = 4.8492701368853419576287658604115e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.756 y[1] (analytic) = -12.371003077773527559452053954739 y[1] (numeric) = -12.371003077773527559452053954732 absolute error = 7e-30 relative error = 5.6583932248603285104779667121398e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.757 y[1] (analytic) = -12.369010012412767879609947046361 y[1] (numeric) = -12.369010012412767879609947046354 absolute error = 7e-30 relative error = 5.6593049831597161684013969476276e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.758 y[1] (analytic) = -12.367016802561036138528430719785 y[1] (numeric) = -12.367016802561036138528430719778 absolute error = 7e-30 relative error = 5.6602171014681551537330659402056e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.759 y[1] (analytic) = -12.365023448223043647271513845766 y[1] (numeric) = -12.365023448223043647271513845759 absolute error = 7e-30 relative error = 5.6611295799895616187271847129768e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.76 y[1] (analytic) = -12.363029949403499472800579553202 y[1] (numeric) = -12.363029949403499472800579553195 absolute error = 7e-30 relative error = 5.6620424189280081205268000380381e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.761 y[1] (analytic) = -12.361036306107110439177806296993 y[1] (numeric) = -12.361036306107110439177806296986 absolute error = 7e-30 relative error = 5.6629556184877237700315637453579e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1285.5MB, alloc=4.5MB, time=54.08 x[1] = 2.762 y[1] (analytic) = -12.35904251833858112876869241876 y[1] (numeric) = -12.359042518338581128768692418753 absolute error = 7e-30 relative error = 5.6638691788730943809363259152277e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.763 y[1] (analytic) = -12.357048586102613883443685053951 y[1] (numeric) = -12.357048586102613883443685053945 absolute error = 6e-30 relative error = 4.8555283716759965305206685711223e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.764 y[1] (analytic) = -12.3550545094039088057789142379 y[1] (numeric) = -12.355054509403908805778914237894 absolute error = 6e-30 relative error = 4.8563120425192527009689042286082e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.765 y[1] (analytic) = -12.35306028824716376025603306238 y[1] (numeric) = -12.353060288247163760256033062373 absolute error = 7e-30 relative error = 5.6666120270293477955288163115544e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.766 y[1] (analytic) = -12.35106592263707437446116473324 y[1] (numeric) = -12.351065922637074374461164733233 absolute error = 7e-30 relative error = 5.6675270327643356708221057271424e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.767 y[1] (analytic) = -12.349071412578334040282957378708 y[1] (numeric) = -12.349071412578334040282957378702 absolute error = 6e-30 relative error = 4.8586649145850828682184123248503e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.768 y[1] (analytic) = -12.347076758075633915109747456961 y[1] (numeric) = -12.347076758075633915109747456954 absolute error = 7e-30 relative error = 5.6693581299894599916983540789230e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.769 y[1] (analytic) = -12.34508195913366292302583261057 y[1] (numeric) = -12.345081959133662923025832610563 absolute error = 7e-30 relative error = 5.6702742218904125278917558047495e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1289.4MB, alloc=4.5MB, time=54.45 x[1] = 2.77 y[1] (analytic) = -12.343087015757107756006854814484 y[1] (numeric) = -12.343087015757107756006854814477 absolute error = 7e-30 relative error = 5.6711906762577657768550929651793e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.771 y[1] (analytic) = -12.341091927950652875114294663176 y[1] (numeric) = -12.341091927950652875114294663169 absolute error = 7e-30 relative error = 5.6721074932973226124757935621852e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.772 y[1] (analytic) = -12.339096695718980511689077641647 y[1] (numeric) = -12.33909669571898051168907764164 absolute error = 7e-30 relative error = 5.6730246732150441112680724566742e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.773 y[1] (analytic) = -12.337101319066770668544293223982 y[1] (numeric) = -12.337101319066770668544293223975 absolute error = 7e-30 relative error = 5.6739422162170497033057152974792e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.774 y[1] (analytic) = -12.33510579799870112115702764217 y[1] (numeric) = -12.335105797998701121157027642163 absolute error = 7e-30 relative error = 5.6748601225096173233284460285062e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.775 y[1] (analytic) = -12.333110132519447418859311166943 y[1] (numeric) = -12.333110132519447418859311166937 absolute error = 6e-30 relative error = 4.8649529076850144817332373522297e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.776 y[1] (analytic) = -12.331114322633682886028180741405 y[1] (numeric) = -12.331114322633682886028180741398 absolute error = 7e-30 relative error = 5.6766970257923438174729070200669e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.777 y[1] (analytic) = -12.329118368346078623274858807231 y[1] (numeric) = -12.329118368346078623274858807224 absolute error = 7e-30 relative error = 5.6776160231958524467959021997322e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1293.2MB, alloc=4.5MB, time=54.83 x[1] = 2.778 y[1] (analytic) = -12.327122269661303508633049162293 y[1] (numeric) = -12.327122269661303508633049162286 absolute error = 7e-30 relative error = 5.6785353847166229179380564810481e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.779 y[1] (analytic) = -12.325126026584024198746350687538 y[1] (numeric) = -12.325126026584024198746350687531 absolute error = 7e-30 relative error = 5.6794551105617279616560019968992e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.78 y[1] (analytic) = -12.323129639118905130054789780025 y[1] (numeric) = -12.323129639118905130054789780018 absolute error = 7e-30 relative error = 5.6803752009383997236688014486241e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.781 y[1] (analytic) = -12.321133107270608519980472328035 y[1] (numeric) = -12.321133107270608519980472328027 absolute error = 8e-30 relative error = 6.4929093212046056194124848082018e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.782 y[1] (analytic) = -12.319136431043794368112356063199 y[1] (numeric) = -12.319136431043794368112356063192 absolute error = 7e-30 relative error = 5.6822164761161699744106741574156e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.783 y[1] (analytic) = -12.317139610443120457390144123653 y[1] (numeric) = -12.317139610443120457390144123645 absolute error = 8e-30 relative error = 6.4950144700943213728220621956254e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.784 y[1] (analytic) = -12.315142645473242355287300661212 y[1] (numeric) = -12.315142645473242355287300661205 absolute error = 7e-30 relative error = 5.6840592119109849280160544557254e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.785 y[1] (analytic) = -12.313145536138813414993189324666 y[1] (numeric) = -12.313145536138813414993189324658 absolute error = 8e-30 relative error = 6.4971212892109287585878232981364e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.786 y[1] (analytic) = -12.311148282444484776594335450254 y[1] (numeric) = -12.311148282444484776594335450247 absolute error = 7e-30 relative error = 5.6859034099864562489943697900021e-29 % Correct digits = 30 memory used=1297.0MB, alloc=4.5MB, time=55.20 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.787 y[1] (analytic) = -12.309150884394905368254812789504 y[1] (numeric) = -12.309150884394905368254812789497 absolute error = 7e-30 relative error = 5.6868260579000180091873125234523e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.788 y[1] (analytic) = -12.307153341994721907395755603578 y[1] (numeric) = -12.307153341994721907395755603571 absolute error = 7e-30 relative error = 5.6877490720087609083364395257647e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.789 y[1] (analytic) = -12.305155655248578901873996952383 y[1] (numeric) = -12.305155655248578901873996952376 absolute error = 7e-30 relative error = 5.6886724525213587026852919227092e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.79 y[1] (analytic) = -12.303157824161118651159834005696 y[1] (numeric) = -12.303157824161118651159834005689 absolute error = 7e-30 relative error = 5.6895961996466460946432230985233e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.791 y[1] (analytic) = -12.301159848736981247513921202632 y[1] (numeric) = -12.301159848736981247513921202625 absolute error = 7e-30 relative error = 5.6905203135936188868785167792205e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.792 y[1] (analytic) = -12.299161728980804577163292084804 y[1] (numeric) = -12.299161728980804577163292084797 absolute error = 7e-30 relative error = 5.6914447945714341365893245337872e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.793 y[1] (analytic) = -12.297163464897224321476510627602 y[1] (numeric) = -12.297163464897224321476510627595 absolute error = 7e-30 relative error = 5.6923696427894103099526614666813e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.794 y[1] (analytic) = -12.295165056490873958137952893037 y[1] (numeric) = -12.29516505649087395813795289303 absolute error = 7e-30 relative error = 5.6932948584570274367516992423018e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1300.8MB, alloc=4.5MB, time=55.57 x[1] = 2.795 y[1] (analytic) = -12.293166503766384762321219826665 y[1] (numeric) = -12.293166503766384762321219826658 absolute error = 7e-30 relative error = 5.6942204417839272651815959499614e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.796 y[1] (analytic) = -12.291167806728385807861682020159 y[1] (numeric) = -12.291167806728385807861682020152 absolute error = 7e-30 relative error = 5.6951463929799134168341026864087e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.797 y[1] (analytic) = -12.289168965381503968428157260134 y[1] (numeric) = -12.289168965381503968428157260128 absolute error = 6e-30 relative error = 4.8823480390756727501667318017961e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.798 y[1] (analytic) = -12.287169979730363918693721682911 y[1] (numeric) = -12.287169979730363918693721682905 absolute error = 6e-30 relative error = 4.8831423427021452637010695947112e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.799 y[1] (analytic) = -12.285170849779588135505655353923 y[1] (numeric) = -12.285170849779588135505655353917 absolute error = 6e-30 relative error = 4.8839369621853063323012808544822e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.8 y[1] (analytic) = -12.283171575533796899054523089576 y[1] (numeric) = -12.283171575533796899054523089569 absolute error = 7e-30 relative error = 5.6988538806564679505700662007627e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.801 y[1] (analytic) = -12.281172156997608294042391338375 y[1] (numeric) = -12.281172156997608294042391338368 absolute error = 7e-30 relative error = 5.6997816743506164825914680842401e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.802 y[1] (analytic) = -12.279172594175638210850181937248 y[1] (numeric) = -12.279172594175638210850181937242 absolute error = 6e-30 relative error = 4.8863227175794980946619096042250e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1304.6MB, alloc=4.5MB, time=55.95 x[1] = 2.803 y[1] (analytic) = -12.277172887072500346704163558004 y[1] (numeric) = -12.277172887072500346704163557998 absolute error = 6e-30 relative error = 4.8871186022946882206717325578588e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.804 y[1] (analytic) = -12.275173035692806206841581657962 y[1] (numeric) = -12.275173035692806206841581657955 absolute error = 7e-30 relative error = 5.7025672710648861333688390356361e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.805 y[1] (analytic) = -12.27317304004116510567542774784 y[1] (numeric) = -12.273173040041165105675427747833 absolute error = 7e-30 relative error = 5.7034965425505982242801057933863e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.806 y[1] (analytic) = -12.271172900122184167958348789058 y[1] (numeric) = -12.27117290012218416795834878905 absolute error = 8e-30 relative error = 6.5193442102998515612171379467219e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.807 y[1] (analytic) = -12.269172615940468329945697531659 y[1] (numeric) = -12.269172615940468329945697531651 absolute error = 8e-30 relative error = 6.5204070807563386491807854683740e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.808 y[1] (analytic) = -12.26717218750062034055772460316 y[1] (numeric) = -12.267172187500620340557724603152 absolute error = 8e-30 relative error = 6.5214703745264400991298698024814e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.809 y[1] (analytic) = -12.265171614807240762540913157662 y[1] (numeric) = -12.265171614807240762540913157654 absolute error = 8e-30 relative error = 6.5225340918523526666403156558643e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.81 y[1] (analytic) = -12.263170897864927973628456893663 y[1] (numeric) = -12.263170897864927973628456893654 absolute error = 9e-30 relative error = 7.3390480120985181826691519420838e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1308.4MB, alloc=4.5MB, time=56.34 x[1] = 2.811 y[1] (analytic) = -12.261170036678278167699882248055 y[1] (numeric) = -12.261170036678278167699882248046 absolute error = 9e-30 relative error = 7.3402456479090028363316995392854e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.812 y[1] (analytic) = -12.25916903125188535593981557289 y[1] (numeric) = -12.259169031251885355939815572881 absolute error = 9e-30 relative error = 7.3414437610384554803793446690223e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.813 y[1] (analytic) = -12.257167881590341367995896100538 y[1] (numeric) = -12.257167881590341367995896100529 absolute error = 9e-30 relative error = 7.3426423517601924301616966862226e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.814 y[1] (analytic) = -12.255166587698235853135835501969 y[1] (numeric) = -12.25516658769823585313583550196 absolute error = 9e-30 relative error = 7.3438414203477417504132380666237e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.815 y[1] (analytic) = -12.25316514958015628140362484194 y[1] (numeric) = -12.253165149580156281403624841931 absolute error = 9e-30 relative error = 7.3450409670748434589457416910575e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.816 y[1] (analytic) = -12.251163567240687944774889733969 y[1] (numeric) = -12.25116356724068794477488973396 absolute error = 9e-30 relative error = 7.3462409922154497305768129469936e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.817 y[1] (analytic) = -12.249161840684413958311394497035 y[1] (numeric) = -12.249161840684413958311394497026 absolute error = 9e-30 relative error = 7.3474414960437251012948752021064e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.818 y[1] (analytic) = -12.247159969915915261314696115037 y[1] (numeric) = -12.247159969915915261314696115028 absolute error = 9e-30 relative error = 7.3486424788340466726609176968152e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1312.3MB, alloc=4.5MB, time=56.70 x[1] = 2.819 y[1] (analytic) = -12.245157954939770618478948799121 y[1] (numeric) = -12.245157954939770618478948799112 absolute error = 9e-30 relative error = 7.3498439408610043164473253957855e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.82 y[1] (analytic) = -12.243155795760556621042859952068 y[1] (numeric) = -12.243155795760556621042859952059 absolute error = 9e-30 relative error = 7.3510458823994008795141108322785e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.821 y[1] (analytic) = -12.24115349238284768794079833302 y[1] (numeric) = -12.24115349238284768794079833301 absolute error = 1.0e-29 relative error = 8.1691647819158359876920760822079e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.822 y[1] (analytic) = -12.239151044811216066953055219895 y[1] (numeric) = -12.239151044811216066953055219885 absolute error = 1.0e-29 relative error = 8.1705013390119869525430807051334e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.823 y[1] (analytic) = -12.23714845305023183585525936596 y[1] (numeric) = -12.23714845305023183585525936595 absolute error = 1.0e-29 relative error = 8.1718384298160572093010449466106e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.824 y[1] (analytic) = -12.235145717104462903566946546067 y[1] (numeric) = -12.235145717104462903566946546057 absolute error = 1.0e-29 relative error = 8.1731760546343320921127577226728e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.825 y[1] (analytic) = -12.233142836978475011299284487196 y[1] (numeric) = -12.233142836978475011299284487187 absolute error = 9e-30 relative error = 7.3570627923960012446535597044745e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.826 y[1] (analytic) = -12.231139812676831733701953977015 y[1] (numeric) = -12.231139812676831733701953977005 absolute error = 1.0e-29 relative error = 8.1758529075398262074986456869325e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.827 y[1] (analytic) = -12.229136644204094480009186943243 y[1] (numeric) = -12.229136644204094480009186943234 absolute error = 9e-30 relative error = 7.3594729226167253382042468363442e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=1316.1MB, alloc=4.5MB, time=57.08 TOP MAIN SOLVE Loop x[1] = 2.828 y[1] (analytic) = -12.227133331564822495184962295744 y[1] (numeric) = -12.227133331564822495184962295734 absolute error = 1.0e-29 relative error = 8.1785319001835117230217547804924e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.829 y[1] (analytic) = -12.225129874763572861067360322299 y[1] (numeric) = -12.225129874763572861067360322289 absolute error = 1.0e-29 relative error = 8.1798721996754201174491733143454e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.83 y[1] (analytic) = -12.223126273804900497512076428187 y[1] (numeric) = -12.223126273804900497512076428176 absolute error = 1.1e-29 relative error = 8.9993343385266712374445883374449e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.831 y[1] (analytic) = -12.221122528693358163535095008708 y[1] (numeric) = -12.221122528693358163535095008698 absolute error = 1.0e-29 relative error = 8.1825544065379457345750662564883e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.832 y[1] (analytic) = -12.219118639433496458454524242968 y[1] (numeric) = -12.219118639433496458454524242958 absolute error = 1.0e-29 relative error = 8.1838963145247115994790943359517e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.833 y[1] (analytic) = -12.217114606029863823031592596263 y[1] (numeric) = -12.217114606029863823031592596253 absolute error = 1.0e-29 relative error = 8.1852387592929778134735083094953e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.834 y[1] (analytic) = -12.215110428487006540610807817566 y[1] (numeric) = -12.215110428487006540610807817556 absolute error = 1.0e-29 relative error = 8.1865817411514178696718569068149e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.835 y[1] (analytic) = -12.213106106809468738259279217678 y[1] (numeric) = -12.213106106809468738259279217668 absolute error = 1.0e-29 relative error = 8.1879252604089453466748985919595e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1319.9MB, alloc=4.5MB, time=57.45 x[1] = 2.836 y[1] (analytic) = -12.211101641001792387905204012724 y[1] (numeric) = -12.211101641001792387905204012714 absolute error = 1.0e-29 relative error = 8.1892693173747141404801512323175e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.837 y[1] (analytic) = -12.209097031068517307475518516775 y[1] (numeric) = -12.209097031068517307475518516764 absolute error = 1.1e-29 relative error = 9.0096753035939305663274869110229e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.838 y[1] (analytic) = -12.207092277014181162032714966476 y[1] (numeric) = -12.207092277014181162032714966465 absolute error = 1.1e-29 relative error = 9.0111549502356736671000104328482e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.839 y[1] (analytic) = -12.205087378843319464910824759687 y[1] (numeric) = -12.205087378843319464910824759677 absolute error = 1.0e-29 relative error = 8.1933047176166170212966924631911e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.84 y[1] (analytic) = -12.203082336560465578850568889216 y[1] (numeric) = -12.203082336560465578850568889206 absolute error = 1.0e-29 relative error = 8.1946509285117045221805947263776e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.841 y[1] (analytic) = -12.201077150170150717133676351855 y[1] (numeric) = -12.201077150170150717133676351845 absolute error = 1.0e-29 relative error = 8.1959976786644157165541161252264e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.842 y[1] (analytic) = -12.199071819676903944716371312045 y[1] (numeric) = -12.199071819676903944716371312035 absolute error = 1.0e-29 relative error = 8.1973449683853512900364586032659e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.843 y[1] (analytic) = -12.19706634508525217936202979858 y[1] (numeric) = -12.19706634508525217936202979857 absolute error = 1.0e-29 relative error = 8.1986927979853538765884257121060e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1323.7MB, alloc=4.5MB, time=57.82 x[1] = 2.844 y[1] (analytic) = -12.195060726399720192773006711898 y[1] (numeric) = -12.195060726399720192773006711888 absolute error = 1.0e-29 relative error = 8.2000411677755082925915216760239e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.845 y[1] (analytic) = -12.193054963624830611721633918604 y[1] (numeric) = -12.193054963624830611721633918593 absolute error = 1.1e-29 relative error = 9.0215290858738559483198915957225e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.846 y[1] (analytic) = -12.191049056765103919180390208987 y[1] (numeric) = -12.191049056765103919180390208977 absolute error = 1.0e-29 relative error = 8.2027395291718241969655419771112e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.847 y[1] (analytic) = -12.189043005825058455451243892423 y[1] (numeric) = -12.189043005825058455451243892413 absolute error = 1.0e-29 relative error = 8.2040895214013683407370054079551e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.848 y[1] (analytic) = -12.187036810809210419294168804635 y[1] (numeric) = -12.187036810809210419294168804626 absolute error = 9e-30 relative error = 7.3848960495610470853489490919764e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.849 y[1] (analytic) = -12.185030471722073869054834499956 y[1] (numeric) = -12.185030471722073869054834499946 absolute error = 1.0e-29 relative error = 8.2067911304835087084852702079292e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.85 y[1] (analytic) = -12.183023988568160723791471400789 y[1] (numeric) = -12.183023988568160723791471400779 absolute error = 1.0e-29 relative error = 8.2081427479609470235687096740140e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.851 y[1] (analytic) = -12.181017361351980764400911675656 y[1] (numeric) = -12.181017361351980764400911675646 absolute error = 1.0e-29 relative error = 8.2094949078129317105898682223909e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1327.5MB, alloc=4.5MB, time=58.20 x[1] = 2.852 y[1] (analytic) = -12.179010590078041634743806616275 y[1] (numeric) = -12.179010590078041634743806616266 absolute error = 9e-30 relative error = 7.3897628493172441544670856536124e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.853 y[1] (analytic) = -12.177003674750848842769021283286 y[1] (numeric) = -12.177003674750848842769021283276 absolute error = 1.0e-29 relative error = 8.2122008558929074435595053536640e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.854 y[1] (analytic) = -12.174996615374905761637207189318 y[1] (numeric) = -12.174996615374905761637207189309 absolute error = 9e-30 relative error = 7.3921991802729237913751847770644e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.855 y[1] (analytic) = -12.172989411954713630843553787279 y[1] (numeric) = -12.17298941195471363084355378727 absolute error = 9e-30 relative error = 7.3934180795075533464594886198803e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.856 y[1] (analytic) = -12.170982064494771557339719530793 y[1] (numeric) = -12.170982064494771557339719530784 absolute error = 9e-30 relative error = 7.3946374682901137914166808273921e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.857 y[1] (analytic) = -12.168974572999576516654943272923 y[1] (numeric) = -12.168974572999576516654943272914 absolute error = 9e-30 relative error = 7.3958573469034342785793598877881e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.858 y[1] (analytic) = -12.16696693747362335401633676837 y[1] (numeric) = -12.166966937473623354016336768362 absolute error = 8e-30 relative error = 6.5751801916716132442596700444112e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.859 y[1] (analytic) = -12.164959157921404785468359043532 y[1] (numeric) = -12.164959157921404785468359043524 absolute error = 8e-30 relative error = 6.5762653997820239118235497285038e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1331.3MB, alloc=4.5MB, time=58.57 x[1] = 2.86 y[1] (analytic) = -12.162951234347411398991473397881 y[1] (numeric) = -12.162951234347411398991473397873 absolute error = 8e-30 relative error = 6.5773510440529447963523371858632e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.861 y[1] (analytic) = -12.160943166756131655619987799297 y[1] (numeric) = -12.160943166756131655619987799289 absolute error = 8e-30 relative error = 6.5784371247365662958218735854212e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.862 y[1] (analytic) = -12.158934955152051890559079435091 y[1] (numeric) = -12.158934955152051890559079435083 absolute error = 8e-30 relative error = 6.5795236420852759624983760666681e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.863 y[1] (analytic) = -12.156926599539656314301004179615 y[1] (numeric) = -12.156926599539656314301004179606 absolute error = 9e-30 relative error = 7.4031869208956160312001627203526e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.864 y[1] (analytic) = -12.154918099923427013740491738463 y[1] (numeric) = -12.154918099923427013740491738455 absolute error = 8e-30 relative error = 6.5816979877884969269832564111578e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.865 y[1] (analytic) = -12.152909456307843953289327228437 y[1] (numeric) = -12.152909456307843953289327228429 absolute error = 8e-30 relative error = 6.5827858166487708250515521656084e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.866 y[1] (analytic) = -12.150900668697384975990119951544 y[1] (numeric) = -12.150900668697384975990119951536 absolute error = 8e-30 relative error = 6.5838740831856584748912208419605e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.867 y[1] (analytic) = -12.148891737096525804629260120486 y[1] (numeric) = -12.148891737096525804629260120478 absolute error = 8e-30 relative error = 6.5849627876525360766302878780366e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.868 y[1] (analytic) = -12.146882661509740042849064292186 y[1] (numeric) = -12.146882661509740042849064292178 absolute error = 8e-30 relative error = 6.5860519303029781368233139081369e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1335.1MB, alloc=4.5MB, time=58.95 x[1] = 2.869 y[1] (analytic) = -12.144873441941499176259110265085 y[1] (numeric) = -12.144873441941499176259110265077 absolute error = 8e-30 relative error = 6.5871415113907576612616107594017e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.87 y[1] (analytic) = -12.142864078396272573546762195046 y[1] (numeric) = -12.142864078396272573546762195038 absolute error = 8e-30 relative error = 6.5882315311698463480092821767156e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.871 y[1] (analytic) = -12.140854570878527487586886683878 y[1] (numeric) = -12.140854570878527487586886683871 absolute error = 7e-30 relative error = 5.7656567411576129330822225369745e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.872 y[1] (analytic) = -12.138844919392729056550760593609 y[1] (numeric) = -12.138844919392729056550760593602 absolute error = 7e-30 relative error = 5.7666112768414785441210289194385e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.873 y[1] (analytic) = -12.136835123943340305014171338802 y[1] (numeric) = -12.136835123943340305014171338794 absolute error = 8e-30 relative error = 6.5915042251976688069324967118769e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.874 y[1] (analytic) = -12.134825184534822145064710408347 y[1] (numeric) = -12.13482518453482214506471040834 absolute error = 7e-30 relative error = 5.7685215019999802707045297785570e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.875 y[1] (analytic) = -12.132815101171633377408260867321 y[1] (numeric) = -12.132815101171633377408260867313 absolute error = 8e-30 relative error = 6.5936882193378694777933367177479e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.876 y[1] (analytic) = -12.130804873858230692474679588619 y[1] (numeric) = -12.130804873858230692474679588611 absolute error = 8e-30 relative error = 6.5947808766093699446111572076897e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1339.0MB, alloc=4.5MB, time=59.32 x[1] = 2.877 y[1] (analytic) = -12.128794502599068671522674963275 y[1] (numeric) = -12.128794502599068671522674963267 absolute error = 8e-30 relative error = 6.5958739743555611064183423609304e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.878 y[1] (analytic) = -12.126783987398599787743880837477 y[1] (numeric) = -12.126783987398599787743880837469 absolute error = 8e-30 relative error = 6.5969675128320111759595972145378e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.879 y[1] (analytic) = -12.124773328261274407366127423472 y[1] (numeric) = -12.124773328261274407366127423464 absolute error = 8e-30 relative error = 6.5980614922944888057898620299729e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.88 y[1] (analytic) = -12.122762525191540790755909930698 y[1] (numeric) = -12.12276252519154079075590993069 absolute error = 8e-30 relative error = 6.5991559129989632835856148897564e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.881 y[1] (analytic) = -12.120751578193845093520055662642 y[1] (numeric) = -12.120751578193845093520055662634 absolute error = 8e-30 relative error = 6.6002507752016047276854125990331e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.882 y[1] (analytic) = -12.118740487272631367606590324061 y[1] (numeric) = -12.118740487272631367606590324052 absolute error = 9e-30 relative error = 7.4265143390536323182174810271765e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.883 y[1] (analytic) = -12.11672925243234156240480428238 y[1] (numeric) = -12.116729252432341562404804282371 absolute error = 9e-30 relative error = 7.4277470532679586058512063017744e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.884 y[1] (analytic) = -12.114717873677415525844519526235 y[1] (numeric) = -12.114717873677415525844519526227 absolute error = 8e-30 relative error = 6.6035380133632486139071363523435e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1342.8MB, alloc=4.5MB, time=59.69 x[1] = 2.885 y[1] (analytic) = -12.112706351012291005494558063277 y[1] (numeric) = -12.112706351012291005494558063269 absolute error = 8e-30 relative error = 6.6046346441242825766328626737778e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.886 y[1] (analytic) = -12.110694684441403649660412498517 y[1] (numeric) = -12.110694684441403649660412498509 absolute error = 8e-30 relative error = 6.6057317176673534172917214502901e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.887 y[1] (analytic) = -12.108682873969187008481119533673 y[1] (numeric) = -12.108682873969187008481119533664 absolute error = 9e-30 relative error = 7.4326828885310704021008483336701e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.888 y[1] (analytic) = -12.106670919600072535025337127106 y[1] (numeric) = -12.106670919600072535025337127098 absolute error = 8e-30 relative error = 6.6079271941293248244568026854390e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.889 y[1] (analytic) = -12.104658821338489586386626053141 y[1] (numeric) = -12.104658821338489586386626053133 absolute error = 8e-30 relative error = 6.6090255975635906491000533182743e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.89 y[1] (analytic) = -12.102646579188865424777936598677 y[1] (numeric) = -12.10264657918886542477793659867 absolute error = 7e-30 relative error = 5.7838588892092962300848363665387e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.891 y[1] (analytic) = -12.100634193155625218625301134224 y[1] (numeric) = -12.100634193155625218625301134217 absolute error = 7e-30 relative error = 5.7848207691125380343194280555893e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.892 y[1] (analytic) = -12.098621663243192043660733295603 y[1] (numeric) = -12.098621663243192043660733295596 absolute error = 7e-30 relative error = 5.7857830378039604294434121388279e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1346.6MB, alloc=4.5MB, time=60.07 x[1] = 2.893 y[1] (analytic) = -12.09660898945598688401433451177 y[1] (numeric) = -12.096608989455986884014334511764 absolute error = 6e-30 relative error = 4.9600677390084294942725060612264e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.894 y[1] (analytic) = -12.094596171798428633305608613364 y[1] (numeric) = -12.094596171798428633305608613357 absolute error = 7e-30 relative error = 5.7877087424566089399521338527642e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.895 y[1] (analytic) = -12.092583210274934095733985255738 y[1] (numeric) = -12.092583210274934095733985255732 absolute error = 6e-30 relative error = 4.9617190104607809658043147800990e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.896 y[1] (analytic) = -12.090570104889917987168552889459 y[1] (numeric) = -12.090570104889917987168552889453 absolute error = 6e-30 relative error = 4.9625451471253254817931090164005e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.897 y[1] (analytic) = -12.088556855647792936237002010352 y[1] (numeric) = -12.088556855647792936237002010347 absolute error = 5e-30 relative error = 4.1361430150067847591401007338271e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.898 y[1] (analytic) = -12.086543462552969485413779420426 y[1] (numeric) = -12.086543462552969485413779420421 absolute error = 5e-30 relative error = 4.1368320194199503658706244672141e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.899 y[1] (analytic) = -12.084529925609856092107454230114 y[1] (numeric) = -12.084529925609856092107454230109 absolute error = 5e-30 relative error = 4.1375213026729881201680675340719e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.9 y[1] (analytic) = -12.082516244822859129747296331499 y[1] (numeric) = -12.082516244822859129747296331493 absolute error = 6e-30 relative error = 4.9658530379140951470480009339750e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.901 y[1] (analytic) = -12.080502420196382888869068071331 y[1] (numeric) = -12.080502420196382888869068071326 absolute error = 5e-30 relative error = 4.1389007063488664673058343887428e-29 % Correct digits = 30 h = 0.001 memory used=1350.4MB, alloc=4.5MB, time=60.44 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.902 y[1] (analytic) = -12.078488451734829578200029851852 y[1] (numeric) = -12.078488451734829578200029851846 absolute error = 6e-30 relative error = 4.9675089925165444414369306252718e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.903 y[1] (analytic) = -12.07647433944259932574316038658 y[1] (numeric) = -12.076474339442599325743160386575 absolute error = 5e-30 relative error = 4.1402812273360732821074385441736e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.904 y[1] (analytic) = -12.074460083324090179860592337449 y[1] (numeric) = -12.074460083324090179860592337444 absolute error = 5e-30 relative error = 4.1409719072287525379853105522139e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.905 y[1] (analytic) = -12.072445683383698110356264058809 y[1] (numeric) = -12.072445683383698110356264058803 absolute error = 6e-30 relative error = 4.9699954403259767510579301223833e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.906 y[1] (analytic) = -12.070431139625817009557788173034 y[1] (numeric) = -12.070431139625817009557788173028 absolute error = 6e-30 relative error = 4.9708249279536503893684769454745e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.907 y[1] (analytic) = -12.068416452054838693397537701637 y[1] (numeric) = -12.068416452054838693397537701631 absolute error = 6e-30 relative error = 4.9716547517536197920882099030533e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.908 y[1] (analytic) = -12.066401620675152902492950474978 y[1] (numeric) = -12.066401620675152902492950474973 absolute error = 5e-30 relative error = 4.1437374266017795327834562179482e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.909 y[1] (analytic) = -12.064386645491147303226052542851 y[1] (numeric) = -12.064386645491147303226052542846 absolute error = 5e-30 relative error = 4.1444295072130021761352341096066e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1354.2MB, alloc=4.5MB, time=60.81 x[1] = 2.91 y[1] (analytic) = -12.062371526507207488822201307402 y[1] (numeric) = -12.062371526507207488822201307397 absolute error = 5e-30 relative error = 4.1451218684588179502105158335543e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.911 y[1] (analytic) = -12.060356263727716980428049099044 y[1] (numeric) = -12.060356263727716980428049099039 absolute error = 5e-30 relative error = 4.1458145105031563015778095882708e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.912 y[1] (analytic) = -12.058340857157057228188727915197 y[1] (numeric) = -12.058340857157057228188727915192 absolute error = 5e-30 relative error = 4.1465074335100760567120989156816e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.913 y[1] (analytic) = -12.056325306799607612324256040888 y[1] (numeric) = -12.056325306799607612324256040883 absolute error = 5e-30 relative error = 4.1472006376437655488975105183868e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.914 y[1] (analytic) = -12.054309612659745444205167269436 y[1] (numeric) = -12.054309612659745444205167269431 absolute error = 5e-30 relative error = 4.1478941230685427452798813604044e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.915 y[1] (analytic) = -12.052293774741845967427363440624 y[1] (numeric) = -12.05229377474184596742736344062 absolute error = 4e-30 relative error = 3.3188703119590842992555449808836e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.916 y[1] (analytic) = -12.050277793050282358886191012983 y[1] (numeric) = -12.050277793050282358886191012979 absolute error = 4e-30 relative error = 3.3194255507594248415149977893041e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.917 y[1] (analytic) = -12.048261667589425729849742385968 y[1] (numeric) = -12.048261667589425729849742385963 absolute error = 5e-30 relative error = 4.1499762687345274113012871483162e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1358.0MB, alloc=4.5MB, time=61.19 x[1] = 2.918 y[1] (analytic) = -12.046245398363645127031382687036 y[1] (numeric) = -12.046245398363645127031382687031 absolute error = 5e-30 relative error = 4.1506708809694322284156085833819e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.919 y[1] (analytic) = -12.044228985377307533661502737823 y[1] (numeric) = -12.044228985377307533661502737818 absolute error = 5e-30 relative error = 4.1513657753189635507405316695309e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.92 y[1] (analytic) = -12.04221242863477787055849891279 y[1] (numeric) = -12.042212428634777870558498912785 absolute error = 5e-30 relative error = 4.1520609519482198251164428920353e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.921 y[1] (analytic) = -12.040195728140418997198980602949 y[1] (numeric) = -12.040195728140418997198980602944 absolute error = 5e-30 relative error = 4.1527564110224300258279482893723e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.922 y[1] (analytic) = -12.038178883898591712787205996442 y[1] (numeric) = -12.038178883898591712787205996437 absolute error = 5e-30 relative error = 4.1534521527069537828630844515925e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.923 y[1] (analytic) = -12.036161895913654757323746886972 y[1] (numeric) = -12.036161895913654757323746886966 absolute error = 6e-30 relative error = 4.9849778126007378123891553311104e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.924 y[1] (analytic) = -12.034144764189964812673383220267 y[1] (numeric) = -12.034144764189964812673383220262 absolute error = 5e-30 relative error = 4.1548444845690345349913894300575e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.925 y[1] (analytic) = -12.032127488731876503632228087986 y[1] (numeric) = -12.03212748873187650363222808798 absolute error = 6e-30 relative error = 4.9866492900935582700440045640215e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1361.8MB, alloc=4.5MB, time=61.57 x[1] = 2.926 y[1] (analytic) = -12.030110069543742398994083877639 y[1] (numeric) = -12.030110069543742398994083877633 absolute error = 6e-30 relative error = 4.9874855386319485426709742680480e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.927 y[1] (analytic) = -12.028092506629913012616030286355 y[1] (numeric) = -12.028092506629913012616030286349 absolute error = 6e-30 relative error = 4.9883221272972300651255896553137e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.928 y[1] (analytic) = -12.026074799994736804483244905478 y[1] (numeric) = -12.026074799994736804483244905472 absolute error = 6e-30 relative error = 4.9891590562887783568066146716900e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.929 y[1] (analytic) = -12.024056949642560181773057082224 y[1] (numeric) = -12.024056949642560181773057082217 absolute error = 7e-30 relative error = 5.8216623801071479408556968642208e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.93 y[1] (analytic) = -12.022038955577727499918235763811 y[1] (numeric) = -12.022038955577727499918235763805 absolute error = 6e-30 relative error = 4.9908339360489668274926449231338e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.931 y[1] (analytic) = -12.020020817804581063669512028709 y[1] (numeric) = -12.020020817804581063669512028703 absolute error = 6e-30 relative error = 4.9916718872171480136541952020053e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.932 y[1] (analytic) = -12.018002536327461128157337008831 y[1] (numeric) = -12.018002536327461128157337008825 absolute error = 6e-30 relative error = 4.9925101795106782946580370216843e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.933 y[1] (analytic) = -12.01598411115070589995287590574 y[1] (numeric) = -12.015984111150705899952875905734 absolute error = 6e-30 relative error = 4.9933488131297240921708356072310e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1365.7MB, alloc=4.5MB, time=61.94 x[1] = 2.934 y[1] (analytic) = -12.013965542278651538128238803123 y[1] (numeric) = -12.013965542278651538128238803117 absolute error = 6e-30 relative error = 4.9941877882746104759134169955484e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.935 y[1] (analytic) = -12.011946829715632155315948977022 y[1] (numeric) = -12.011946829715632155315948977015 absolute error = 7e-30 relative error = 5.8275316226701248732855782963328e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.936 y[1] (analytic) = -12.009927973465979818767649404501 y[1] (numeric) = -12.009927973465979818767649404495 absolute error = 6e-30 relative error = 4.9958667639439994592172440519510e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.937 y[1] (analytic) = -12.007908973534024551412048170681 y[1] (numeric) = -12.007908973534024551412048170675 absolute error = 6e-30 relative error = 4.9967067648699468461029597263772e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.938 y[1] (analytic) = -12.005889829924094332912103473237 y[1] (numeric) = -12.005889829924094332912103473232 absolute error = 5e-30 relative error = 4.1646225901038539228267394897652e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.939 y[1] (analytic) = -12.003870542640515100721448922735 y[1] (numeric) = -12.00387054264051510072144892273 absolute error = 5e-30 relative error = 4.1653231615909614177190433482651e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.94 y[1] (analytic) = -12.001851111687610751140059836333 y[1] (numeric) = -12.001851111687610751140059836328 absolute error = 5e-30 relative error = 4.1660240186873450621031340992307e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.941 y[1] (analytic) = -11.99983153706970314036916122166 y[1] (numeric) = -11.999831537069703140369161221655 absolute error = 5e-30 relative error = 4.1667251615608715166901935652721e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.942 y[1] (analytic) = -11.997811818791112085565378146853 y[1] (numeric) = -11.997811818791112085565378146848 absolute error = 5e-30 relative error = 4.1674265903795406952301498996923e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=1369.5MB, alloc=4.5MB, time=62.32 TOP MAIN SOLVE Loop x[1] = 2.943 y[1] (analytic) = -11.995791956856155365894129191982 y[1] (numeric) = -11.995791956856155365894129191977 absolute error = 5e-30 relative error = 4.1681283053114858960023437872558e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.944 y[1] (analytic) = -11.993771951269148723582263676304 y[1] (numeric) = -11.9937719512691487235822636763 absolute error = 4e-30 relative error = 3.3350642452199791467699381964369e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.945 y[1] (analytic) = -11.991751802034405864969943355025 y[1] (numeric) = -11.991751802034405864969943355021 absolute error = 4e-30 relative error = 3.3356260753507242160365437559852e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.946 y[1] (analytic) = -11.989731509156238461561769278448 y[1] (numeric) = -11.989731509156238461561769278444 absolute error = 4e-30 relative error = 3.3361881347762513185016418463494e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.947 y[1] (analytic) = -11.987711072638956151077154505638 y[1] (numeric) = -11.987711072638956151077154505634 absolute error = 4e-30 relative error = 3.3367504236314949777103999923042e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.948 y[1] (analytic) = -11.985690492486866538499943363946 y[1] (numeric) = -11.985690492486866538499943363942 absolute error = 4e-30 relative error = 3.3373129420514969526723805544223e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.949 y[1] (analytic) = -11.983669768704275197127277944967 y[1] (numeric) = -11.983669768704275197127277944963 absolute error = 4e-30 relative error = 3.3378756901714063438065680745691e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.95 y[1] (analytic) = -11.981648901295485669617712526725 y[1] (numeric) = -11.981648901295485669617712526721 absolute error = 4e-30 relative error = 3.3384386681264796990124208267783e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1373.3MB, alloc=4.5MB, time=62.69 x[1] = 2.951 y[1] (analytic) = -11.979627890264799469038576611133 y[1] (numeric) = -11.97962789026479946903857661113 absolute error = 3e-30 relative error = 2.5042514070390608399003408689873e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.952 y[1] (analytic) = -11.977606735616516079912587264976 y[1] (numeric) = -11.977606735616516079912587264973 absolute error = 3e-30 relative error = 2.5046739855627617759618996139408e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.953 y[1] (analytic) = -11.975585437354932959263711451917 y[1] (numeric) = -11.975585437354932959263711451913 absolute error = 4e-30 relative error = 3.3401289823568629712887070748486e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.954 y[1] (analytic) = -11.973563995484345537662279042251 y[1] (numeric) = -11.973563995484345537662279042247 absolute error = 4e-30 relative error = 3.3406928810073103309441130435237e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.955 y[1] (analytic) = -11.971542410009047220269347186379 y[1] (numeric) = -11.971542410009047220269347186375 absolute error = 4e-30 relative error = 3.3412570101708198277061012542309e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.956 y[1] (analytic) = -11.969520680933329387880316737175 y[1] (numeric) = -11.969520680933329387880316737171 absolute error = 4e-30 relative error = 3.3418213699832949289284430944396e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.957 y[1] (analytic) = -11.967498808261481397967801405698 y[1] (numeric) = -11.967498808261481397967801405694 absolute error = 4e-30 relative error = 3.3423859605807472954861223859866e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.958 y[1] (analytic) = -11.965476791997790585723750333907 y[1] (numeric) = -11.965476791997790585723750333904 absolute error = 3e-30 relative error = 2.5072130865744726666456667203690e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1377.1MB, alloc=4.5MB, time=63.06 x[1] = 2.959 y[1] (analytic) = -11.963454632146542265100824767291 y[1] (numeric) = -11.963454632146542265100824767288 absolute error = 3e-30 relative error = 2.5076368760063790587658132855120e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.96 y[1] (analytic) = -11.961432328712019729853029509546 y[1] (numeric) = -11.961432328712019729853029509543 absolute error = 3e-30 relative error = 2.5080608388335323113219376765861e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.961 y[1] (analytic) = -11.959409881698504254575599840703 y[1] (numeric) = -11.9594098816985042545755998407 absolute error = 3e-30 relative error = 2.5084849751582665546332722883132e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.962 y[1] (analytic) = -11.957387291110275095744144579314 y[1] (numeric) = -11.957387291110275095744144579312 absolute error = 2e-30 relative error = 1.6726061900553316444594367381685e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.963 y[1] (analytic) = -11.955364556951609492753045968579 y[1] (numeric) = -11.955364556951609492753045968577 absolute error = 2e-30 relative error = 1.6728891791401482359620305072478e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.964 y[1] (analytic) = -11.953341679226782668953117065503 y[1] (numeric) = -11.953341679226782668953117065501 absolute error = 2e-30 relative error = 1.6731722840950134881352745959741e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.965 y[1] (analytic) = -11.951318657940067832688517311462 y[1] (numeric) = -11.95131865794006783268851731146 absolute error = 2e-30 relative error = 1.6734555049883679384120798346288e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.966 y[1] (analytic) = -11.949295493095736178332926961756 y[1] (numeric) = -11.949295493095736178332926961755 absolute error = 1e-30 relative error = 8.3686942094435335258765435449762e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1380.9MB, alloc=4.5MB, time=63.44 x[1] = 2.967 y[1] (analytic) = -11.947272184698056887324981051007 y[1] (numeric) = -11.947272184698056887324981051006 absolute error = 1e-30 relative error = 8.3701114743228977093898817604935e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.968 y[1] (analytic) = -11.945248732751297129202963570478 y[1] (numeric) = -11.945248732751297129202963570477 absolute error = 1e-30 relative error = 8.3715293199229544561402814273999e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.969 y[1] (analytic) = -11.943225137259722062638762532669 y[1] (numeric) = -11.943225137259722062638762532668 absolute error = 1e-30 relative error = 8.3729477465869996971899036610899e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.97 y[1] (analytic) = -11.941201398227594836471086597765 y[1] (numeric) = -11.941201398227594836471086597765 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.971 y[1] (analytic) = -11.939177515659176590737943935782 y[1] (numeric) = -11.939177515659176590737943935781 absolute error = 1e-30 relative error = 8.3757863444816096037998465527749e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.972 y[1] (analytic) = -11.93715348955872645770838399748 y[1] (numeric) = -11.93715348955872645770838399748 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.973 y[1] (analytic) = -11.93512931993050156291350286642 y[1] (numeric) = -11.935129319930501562913502866419 absolute error = 1e-30 relative error = 8.3786272707585795559899324430393e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.974 y[1] (analytic) = -11.933105006778757026176712863707 y[1] (numeric) = -11.933105006778757026176712863707 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.975 y[1] (analytic) = -11.931080550107745962643277076317 y[1] (numeric) = -11.931080550107745962643277076317 absolute error = 0 relative error = 0 % memory used=1384.7MB, alloc=4.5MB, time=63.81 Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.976 y[1] (analytic) = -11.929055949921719483809109479062 y[1] (numeric) = -11.929055949921719483809109479062 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.977 y[1] (analytic) = -11.927031206224926698548841319586 y[1] (numeric) = -11.927031206224926698548841319586 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.978 y[1] (analytic) = -11.925006319021614714143154434979 y[1] (numeric) = -11.925006319021614714143154434979 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.979 y[1] (analytic) = -11.922981288316028637305382167895 y[1] (numeric) = -11.922981288316028637305382167895 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.98 y[1] (analytic) = -11.920956114112411575207378549294 y[1] (numeric) = -11.920956114112411575207378549294 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.981 y[1] (analytic) = -11.9189307964150046365046564142 y[1] (numeric) = -11.918930796415004636504656414199 absolute error = 1e-30 relative error = 8.3900143148811772964155964626691e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.982 y[1] (analytic) = -11.916905335228046932360795116123 y[1] (numeric) = -11.916905335228046932360795116123 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.983 y[1] (analytic) = -11.914879730555775577471118505059 y[1] (numeric) = -11.91487973055577557747111850506 absolute error = 1e-30 relative error = 8.3928669245019269311916664393871e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1388.5MB, alloc=4.6MB, time=64.19 x[1] = 2.984 y[1] (analytic) = -11.912853982402425691085643833231 y[1] (numeric) = -11.912853982402425691085643833232 absolute error = 1e-30 relative error = 8.3942941085082730255366450544446e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.985 y[1] (analytic) = -11.910828090772230398031302252014 y[1] (numeric) = -11.910828090772230398031302252015 absolute error = 1e-30 relative error = 8.3957218791087906929513668831555e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.986 y[1] (analytic) = -11.908802055669420829733431562747 y[1] (numeric) = -11.908802055669420829733431562748 absolute error = 1e-30 relative error = 8.3971502366514708788804778869508e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.987 y[1] (analytic) = -11.906775877098226125236541883391 y[1] (numeric) = -11.906775877098226125236541883392 absolute error = 1e-30 relative error = 8.3985791814845831845760946214157e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.988 y[1] (analytic) = -11.904749555062873432224354892268 y[1] (numeric) = -11.904749555062873432224354892269 absolute error = 1e-30 relative error = 8.4000087139566761445775794332876e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.989 y[1] (analytic) = -11.90272308956758790803911730938 y[1] (numeric) = -11.90272308956758790803911730938 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.99 y[1] (analytic) = -11.900696480616592720700189275071 y[1] (numeric) = -11.900696480616592720700189275072 absolute error = 1e-30 relative error = 8.4028695432133944992991953367813e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.991 y[1] (analytic) = -11.898669728214109049921908285084 y[1] (numeric) = -11.898669728214109049921908285085 absolute error = 1e-30 relative error = 8.4043008406965141315115402021780e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1392.4MB, alloc=4.6MB, time=64.57 x[1] = 2.992 y[1] (analytic) = -11.896642832364356088130729340292 y[1] (numeric) = -11.896642832364356088130729340293 absolute error = 1e-30 relative error = 8.4057327272156034503061624486523e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.993 y[1] (analytic) = -11.894615793071551041481641968707 y[1] (numeric) = -11.894615793071551041481641968708 absolute error = 1e-30 relative error = 8.4071652031206098305127912691375e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.994 y[1] (analytic) = -11.892588610339909130873864776604 y[1] (numeric) = -11.892588610339909130873864776605 absolute error = 1e-30 relative error = 8.4085982687617612521280769088873e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.995 y[1] (analytic) = -11.890561284173643592965818184883 y[1] (numeric) = -11.890561284173643592965818184884 absolute error = 1e-30 relative error = 8.4100319244895665801333922231676e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.996 y[1] (analytic) = -11.888533814576965681189376006065 y[1] (numeric) = -11.888533814576965681189376006066 absolute error = 1e-30 relative error = 8.4114661706548158446485074775692e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.997 y[1] (analytic) = -11.886506201554084666763396516599 y[1] (numeric) = -11.8865062015540846667633965166 absolute error = 1e-30 relative error = 8.4129010076085805214216080043715e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.998 y[1] (analytic) = -11.88447844510920783970653367842 y[1] (numeric) = -11.884478445109207839706533678421 absolute error = 1e-30 relative error = 8.4143364357022138126561250798435e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 2.999 y[1] (analytic) = -11.882450545246540509849329162983 y[1] (numeric) = -11.882450545246540509849329162984 absolute error = 1e-30 relative error = 8.4157724552873509281748511401527e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1396.2MB, alloc=4.6MB, time=64.94 x[1] = 3 y[1] (analytic) = -11.880422501970286007845585830281 y[1] (numeric) = -11.880422501970286007845585830282 absolute error = 1e-30 relative error = 8.4172090667159093669218112077029e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.001 y[1] (analytic) = -11.878394315284645686183023314616 y[1] (numeric) = -11.878394315284645686183023314617 absolute error = 1e-30 relative error = 8.4186462703400891988023631552366e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.002 y[1] (analytic) = -11.876365985193818920193216368194 y[1] (numeric) = -11.876365985193818920193216368195 absolute error = 1e-30 relative error = 8.4200840665123733468620001918924e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.003 y[1] (analytic) = -11.874337511702003109060816612873 y[1] (numeric) = -11.874337511702003109060816612874 absolute error = 1e-30 relative error = 8.4215224555855278698043297136502e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.004 y[1] (analytic) = -11.872308894813393676832058349696 y[1] (numeric) = -11.872308894813393676832058349697 absolute error = 1e-30 relative error = 8.4229614379126022448487034201786e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.005 y[1] (analytic) = -11.870280134532184073422549075105 y[1] (numeric) = -11.870280134532184073422549075105 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.006 y[1] (analytic) = -11.868251230862565775624345352025 y[1] (numeric) = -11.868251230862565775624345352025 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.007 y[1] (analytic) = -11.866222183808728288112314683295 y[1] (numeric) = -11.866222183808728288112314683295 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.008 memory used=1400.0MB, alloc=4.6MB, time=65.32 y[1] (analytic) = -11.864192993374859144449784034195 y[1] (numeric) = -11.864192993374859144449784034195 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.009 y[1] (analytic) = -11.862163659565143908093475650114 y[1] (numeric) = -11.862163659565143908093475650114 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.01 y[1] (analytic) = -11.860134182383766173397730814692 y[1] (numeric) = -11.860134182383766173397730814692 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.011 y[1] (analytic) = -11.858104561834907566618022193051 y[1] (numeric) = -11.85810456183490756661802219305 absolute error = 1e-30 relative error = 8.4330509550276836986285070163519e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.012 y[1] (analytic) = -11.856074797922747746913755404017 y[1] (numeric) = -11.856074797922747746913755404016 absolute error = 1e-30 relative error = 8.4344946961300019051145010004223e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.013 y[1] (analytic) = -11.854044890651464407350360464545 y[1] (numeric) = -11.854044890651464407350360464544 absolute error = 1e-30 relative error = 8.4359390336764859321350330691776e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.014 y[1] (analytic) = -11.852014840025233275900673748814 y[1] (numeric) = -11.852014840025233275900673748813 absolute error = 1e-30 relative error = 8.4373839680230350743009155142918e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.015 y[1] (analytic) = -11.849984646048228116445611103781 y[1] (numeric) = -11.84998464604822811644561110378 absolute error = 1e-30 relative error = 8.4388294995258351787262062540313e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.016 y[1] (analytic) = -11.847954308724620729774132762272 y[1] (numeric) = -11.847954308724620729774132762271 absolute error = 1e-30 relative error = 8.4402756285413589319989748729359e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1403.8MB, alloc=4.6MB, time=65.69 x[1] = 3.017 y[1] (analytic) = -11.84592382805858095458250069396 y[1] (numeric) = -11.845923828058580954582500693959 absolute error = 1e-30 relative error = 8.4417223554263661474979634035912e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.018 y[1] (analytic) = -11.843893204054276668472829033901 y[1] (numeric) = -11.8438932040542766684728290339 absolute error = 1e-30 relative error = 8.4431696805379040530556275317446e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.019 y[1] (analytic) = -11.841862436715873788950928227579 y[1] (numeric) = -11.841862436715873788950928227577 absolute error = 2e-30 relative error = 1.6889235208466615157936089372876e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.02 y[1] (analytic) = -11.839831526047536274423443530706 y[1] (numeric) = -11.839831526047536274423443530704 absolute error = 2e-30 relative error = 1.6892132253740399292704352517294e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.021 y[1] (analytic) = -11.837800472053426125194288501339 y[1] (numeric) = -11.837800472053426125194288501337 absolute error = 2e-30 relative error = 1.6895030497612982911701943950275e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.022 y[1] (analytic) = -11.83576927473770338446037412114 y[1] (numeric) = -11.835769274737703384460374121139 absolute error = 1e-30 relative error = 8.4489649704003827766868052389133e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.023 y[1] (analytic) = -11.833737934104526139306634181947 y[1] (numeric) = -11.833737934104526139306634181945 absolute error = 2e-30 relative error = 1.6900830584020724472127458067350e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.024 y[1] (analytic) = -11.831706450158050521700347573075 y[1] (numeric) = -11.831706450158050521700347573074 absolute error = 1e-30 relative error = 8.4518662139952076089190427772133e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1407.6MB, alloc=4.6MB, time=66.07 x[1] = 3.025 y[1] (analytic) = -11.829674822902430709484758104125 y[1] (numeric) = -11.829674822902430709484758104124 absolute error = 1e-30 relative error = 8.4533177367139861080246612975499e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.026 y[1] (analytic) = -11.827643052341818927371992497313 y[1] (numeric) = -11.827643052341818927371992497312 absolute error = 1e-30 relative error = 8.4547698605260546744387778960017e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.027 y[1] (analytic) = -11.8256111384803654479352771827 y[1] (numeric) = -11.825611138480365447935277182699 absolute error = 1e-30 relative error = 8.4562225857910602683083142530851e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.028 y[1] (analytic) = -11.823579081322218592600454528961 y[1] (numeric) = -11.82357908132221859260045452896 absolute error = 1e-30 relative error = 8.4576759128689401600226507263921e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.029 y[1] (analytic) = -11.821546880871524732636799141648 y[1] (numeric) = -11.821546880871524732636799141648 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.03 y[1] (analytic) = -11.81951453713242829014713486023 y[1] (numeric) = -11.819514537132428290147134860229 absolute error = 1e-30 relative error = 8.4605843739045252191408389146980e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.031 y[1] (analytic) = -11.817482050109071739057253084447 y[1] (numeric) = -11.817482050109071739057253084446 absolute error = 1e-30 relative error = 8.4620395085835591038471353480207e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.032 y[1] (analytic) = -11.815449419805595606104633059898 y[1] (numeric) = -11.815449419805595606104633059898 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1411.4MB, alloc=4.6MB, time=66.44 x[1] = 3.033 y[1] (analytic) = -11.813416646226138471826464752009 y[1] (numeric) = -11.813416646226138471826464752008 absolute error = 1e-30 relative error = 8.4649515880696170261689194678341e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.034 y[1] (analytic) = -11.81138372937483697154697493689 y[1] (numeric) = -11.811383729374836971546974936889 absolute error = 1e-30 relative error = 8.4664085335997195308280561351377e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.035 y[1] (analytic) = -11.809350669255825796364057136898 y[1] (numeric) = -11.809350669255825796364057136896 absolute error = 2e-30 relative error = 1.6935732166940820887514961593998e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.036 y[1] (analytic) = -11.807317465873237694135206027993 y[1] (numeric) = -11.807317465873237694135206027992 absolute error = 1e-30 relative error = 8.4693242380439600411376828829120e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.037 y[1] (analytic) = -11.805284119231203470462756945345 y[1] (numeric) = -11.805284119231203470462756945344 absolute error = 1e-30 relative error = 8.4707829976829315456646309117248e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.038 y[1] (analytic) = -11.803250629333851989678431112893 y[1] (numeric) = -11.803250629333851989678431112892 absolute error = 1e-30 relative error = 8.4722423627501814212436274454329e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.039 y[1] (analytic) = -11.801216996185310175827187221946 y[1] (numeric) = -11.801216996185310175827187221945 absolute error = 1e-30 relative error = 8.4737023336088596680399262391827e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.04 y[1] (analytic) = -11.79918321978970301365037998317 y[1] (numeric) = -11.799183219789703013650379983169 absolute error = 1e-30 relative error = 8.4751629106224101178866147678395e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1415.3MB, alloc=4.6MB, time=66.81 x[1] = 3.041 y[1] (analytic) = -11.797149300151153549568226275642 y[1] (numeric) = -11.797149300151153549568226275641 absolute error = 1e-30 relative error = 8.4766240941545707300502661215403e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.042 y[1] (analytic) = -11.795115237273782892661579515984 y[1] (numeric) = -11.795115237273782892661579515982 absolute error = 2e-30 relative error = 1.6956171769138747774709730152424e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.043 y[1] (analytic) = -11.793081031161710215653012869871 y[1] (numeric) = -11.793081031161710215653012869869 absolute error = 2e-30 relative error = 1.6959096564462293385329027920192e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.044 y[1] (analytic) = -11.791046681819052755887211927566 y[1] (numeric) = -11.791046681819052755887211927564 absolute error = 2e-30 relative error = 1.6962022575009022531450849507630e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.045 y[1] (analytic) = -11.789012189249925816310677464417 y[1] (numeric) = -11.789012189249925816310677464415 absolute error = 2e-30 relative error = 1.6964949801508770080735409359082e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.046 y[1] (analytic) = -11.786977553458442766450738906592 y[1] (numeric) = -11.786977553458442766450738906591 absolute error = 1e-30 relative error = 8.4839391223459810620674433543076e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.047 y[1] (analytic) = -11.784942774448715043393879121651 y[1] (numeric) = -11.78494277444871504339387912165 absolute error = 1e-30 relative error = 8.4854039526448082858696104034690e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.048 y[1] (analytic) = -11.782907852224852152763371152849 y[1] (numeric) = -11.782907852224852152763371152849 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.049 y[1] (analytic) = -11.78087278679096166969622751543 y[1] (numeric) = -11.780872786790961669696227515429 absolute error = 1e-30 relative error = 8.4883354408276734978726456417430e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=1419.1MB, alloc=4.6MB, time=67.19 TOP MAIN SOLVE Loop x[1] = 3.05 y[1] (analytic) = -11.778837578151149239819462672439 y[1] (numeric) = -11.778837578151149239819462672438 absolute error = 1e-30 relative error = 8.4898020994442116303754782254987e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.051 y[1] (analytic) = -11.776802226309518580225669306969 y[1] (numeric) = -11.776802226309518580225669306968 absolute error = 1e-30 relative error = 8.4912693682329818519643034611999e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.052 y[1] (analytic) = -11.774766731270171480447909007017 y[1] (numeric) = -11.774766731270171480447909007016 absolute error = 1e-30 relative error = 8.4927372475609771470360478011348e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.053 y[1] (analytic) = -11.7727310930372078034339179785 y[1] (numeric) = -11.7727310930372078034339179785 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.054 y[1] (analytic) = -11.770695311614725486519628401293 y[1] (numeric) = -11.770695311614725486519628401292 absolute error = 1e-30 relative error = 8.4956748393041037192383255467604e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.055 y[1] (analytic) = -11.768659387006820542402006042449 y[1] (numeric) = -11.768659387006820542402006042449 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.056 y[1] (analytic) = -11.766623319217587060111204740162 y[1] (numeric) = -11.766623319217587060111204740162 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.057 y[1] (analytic) = -11.764587108251117205982038371263 y[1] (numeric) = -11.764587108251117205982038371262 absolute error = 1e-30 relative error = 8.5000858151549403445065412923147e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1422.9MB, alloc=4.6MB, time=67.56 x[1] = 3.058 y[1] (analytic) = -11.762550754111501224624770914465 y[1] (numeric) = -11.762550754111501224624770914464 absolute error = 1e-30 relative error = 8.5015573654418312695286921218978e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.059 y[1] (analytic) = -11.760514256802827439895225220845 y[1] (numeric) = -11.760514256802827439895225220844 absolute error = 1e-30 relative error = 8.5030295288452507422396227085091e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.06 y[1] (analytic) = -11.758477616329182255864211102399 y[1] (numeric) = -11.758477616329182255864211102397 absolute error = 2e-30 relative error = 1.7009004611469163636326967450617e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.061 y[1] (analytic) = -11.756440832694650157786273348838 y[1] (numeric) = -11.756440832694650157786273348836 absolute error = 2e-30 relative error = 1.7011951392959015342971838579779e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.062 y[1] (analytic) = -11.754403905903313713067760282141 y[1] (numeric) = -11.754403905903313713067760282139 absolute error = 2e-30 relative error = 1.7014899402900023796901503713649e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.063 y[1] (analytic) = -11.752366835959253572234213457684 y[1] (numeric) = -11.752366835959253572234213457682 absolute error = 2e-30 relative error = 1.7017848642032757642251465571945e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.064 y[1] (analytic) = -11.750329622866548469897079120133 y[1] (numeric) = -11.750329622866548469897079120131 absolute error = 2e-30 relative error = 1.7020799111098387583075763339720e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.065 y[1] (analytic) = -11.748292266629275225719742021595 y[1] (numeric) = -11.748292266629275225719742021594 absolute error = 1e-30 relative error = 8.5118754054193434961789383517732e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1426.7MB, alloc=4.6MB, time=67.93 x[1] = 3.066 y[1] (analytic) = -11.746254767251508745382882208893 y[1] (numeric) = -11.746254767251508745382882208891 absolute error = 2e-30 relative error = 1.7026703741996032521762904831993e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.067 y[1] (analytic) = -11.744217124737322021549155386118 y[1] (numeric) = -11.744217124737322021549155386116 absolute error = 2e-30 relative error = 1.7029657905313404712132071566153e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.068 y[1] (analytic) = -11.742179339090786134827197458018 y[1] (numeric) = -11.742179339090786134827197458016 absolute error = 2e-30 relative error = 1.7032613301534388604720609791743e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.069 y[1] (analytic) = -11.740141410315970254734953859046 y[1] (numeric) = -11.740141410315970254734953859045 absolute error = 1e-30 relative error = 8.5177849657015871765900398367129e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.07 y[1] (analytic) = -11.738103338416941640662334272305 y[1] (numeric) = -11.738103338416941640662334272303 absolute error = 2e-30 relative error = 1.7038527795664557836286177143994e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.071 y[1] (analytic) = -11.736065123397765642833193341899 y[1] (numeric) = -11.736065123397765642833193341898 absolute error = 1e-30 relative error = 8.5207434475319706357065453782119e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.072 y[1] (analytic) = -11.734026765262505703266637981609 y[1] (numeric) = -11.734026765262505703266637981608 absolute error = 1e-30 relative error = 8.5222236151736669143777333625319e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.073 y[1] (analytic) = -11.73198826401522335673766188209 y[1] (numeric) = -11.731988264015223356737661882089 absolute error = 1e-30 relative error = 8.5237044011306761231495218519202e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1430.5MB, alloc=4.6MB, time=68.31 x[1] = 3.074 y[1] (analytic) = -11.729949619659978231737107818187 y[1] (numeric) = -11.729949619659978231737107818185 absolute error = 2e-30 relative error = 1.7050371611553221445541020573939e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.075 y[1] (analytic) = -11.727910832200828051430958357263 y[1] (numeric) = -11.727910832200828051430958357261 absolute error = 2e-30 relative error = 1.7053335658970775147961222241294e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.076 y[1] (analytic) = -11.725871901641828634618955568827 y[1] (numeric) = -11.725871901641828634618955568825 absolute error = 2e-30 relative error = 1.7056300945262456492245130175112e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.077 y[1] (analytic) = -11.723832827987033896692550335041 y[1] (numeric) = -11.72383282798703389669255033504 absolute error = 1e-30 relative error = 8.5296337355886593261299230764402e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.078 y[1] (analytic) = -11.721793611240495850592181861088 y[1] (numeric) = -11.721793611240495850592181861087 absolute error = 1e-30 relative error = 8.5311176187325127278920297072485e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.079 y[1] (analytic) = -11.719754251406264607763887983677 y[1] (numeric) = -11.719754251406264607763887983675 absolute error = 2e-30 relative error = 1.7065204244875852003993089168756e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.08 y[1] (analytic) = -11.717714748488388379115246875363 y[1] (numeric) = -11.717714748488388379115246875361 absolute error = 2e-30 relative error = 1.7068174494160685291700076138963e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.081 y[1] (analytic) = -11.715675102490913475970650741668 y[1] (numeric) = -11.715675102490913475970650741667 absolute error = 1e-30 relative error = 8.5355729930355124141771992906960e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.082 y[1] (analytic) = -11.713635313417884311025912107359 y[1] (numeric) = -11.713635313417884311025912107357 absolute error = 2e-30 relative error = 1.7074118721358983259798389960295e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=1434.3MB, alloc=4.6MB, time=68.69 TOP MAIN SOLVE Loop x[1] = 3.083 y[1] (analytic) = -11.711595381273343399302203287576 y[1] (numeric) = -11.711595381273343399302203287574 absolute error = 2e-30 relative error = 1.7077092700777286990783437216454e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.084 y[1] (analytic) = -11.709555306061331359099329638888 y[1] (numeric) = -11.709555306061331359099329638886 absolute error = 2e-30 relative error = 1.7080067925079276808246540322667e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.085 y[1] (analytic) = -11.707515087785886912948337184664 y[1] (numeric) = -11.707515087785886912948337184662 absolute error = 2e-30 relative error = 1.7083044395018908505348415579288e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.086 y[1] (analytic) = -11.705474726451046888563455208529 y[1] (numeric) = -11.705474726451046888563455208528 absolute error = 1e-30 relative error = 8.5430110556753767531371134329019e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.087 y[1] (analytic) = -11.703434222060846219793374409023 y[1] (numeric) = -11.703434222060846219793374409022 absolute error = 1e-30 relative error = 8.5445005374149997458990154152812e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.088 y[1] (analytic) = -11.70139357461931794757186120793 y[1] (numeric) = -11.701393574619317947571861207928 absolute error = 2e-30 relative error = 1.7091981286212451025612023770112e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.089 y[1] (analytic) = -11.699352784130493220867708804108 y[1] (numeric) = -11.699352784130493220867708804106 absolute error = 2e-30 relative error = 1.7094962746254530181421679722229e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.09 y[1] (analytic) = -11.697311850598401297634025564011 y[1] (numeric) = -11.697311850598401297634025564009 absolute error = 2e-30 relative error = 1.7097945455713277170807871072522e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1438.1MB, alloc=4.6MB, time=69.06 x[1] = 3.091 y[1] (analytic) = -11.695270774027069545756861339434 y[1] (numeric) = -11.695270774027069545756861339432 absolute error = 2e-30 relative error = 1.7100929415346350971857064753661e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.092 y[1] (analytic) = -11.693229554420523444003172302393 y[1] (numeric) = -11.693229554420523444003172302391 absolute error = 2e-30 relative error = 1.7103914625912029958560688898582e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.093 y[1] (analytic) = -11.691188191782786582968124886395 y[1] (numeric) = -11.691188191782786582968124886393 absolute error = 2e-30 relative error = 1.7106901088169212530984766594686e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.094 y[1] (analytic) = -11.689146686117880666021739422727 y[1] (numeric) = -11.689146686117880666021739422725 absolute error = 2e-30 relative error = 1.7109888802877417746210915174944e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.095 y[1] (analytic) = -11.687105037429825510254874059741 y[1] (numeric) = -11.687105037429825510254874059739 absolute error = 2e-30 relative error = 1.7112877770796785950049811274009e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.096 y[1] (analytic) = -11.685063245722639047424549552479 y[1] (numeric) = -11.685063245722639047424549552477 absolute error = 2e-30 relative error = 1.7115867992688079409528223672927e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.097 y[1] (analytic) = -11.683021311000337324898615509355 y[1] (numeric) = -11.683021311000337324898615509353 absolute error = 2e-30 relative error = 1.7118859469312682946150717754772e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.098 y[1] (analytic) = -11.680979233266934506599758681953 y[1] (numeric) = -11.680979233266934506599758681951 absolute error = 2e-30 relative error = 1.7121852201432604569937137195654e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1442.0MB, alloc=4.6MB, time=69.43 x[1] = 3.099 y[1] (analytic) = -11.678937012526442873948853883388 y[1] (numeric) = -11.678937012526442873948853883386 absolute error = 2e-30 relative error = 1.7124846189810476114236970320882e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.1 y[1] (analytic) = -11.676894648782872826807658120024 y[1] (numeric) = -11.676894648782872826807658120022 absolute error = 2e-30 relative error = 1.7127841435209553871321710364799e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.101 y[1] (analytic) = -11.674852142040232884420848520721 y[1] (numeric) = -11.674852142040232884420848520719 absolute error = 2e-30 relative error = 1.7130837938393719228756320684790e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.102 y[1] (analytic) = -11.672809492302529686357404647141 y[1] (numeric) = -11.672809492302529686357404647139 absolute error = 2e-30 relative error = 1.7133835700127479306550917795347e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.103 y[1] (analytic) = -11.670766699573767993451335768017 y[1] (numeric) = -11.670766699573767993451335768015 absolute error = 2e-30 relative error = 1.7136834721175967595093786906730e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.104 y[1] (analytic) = -11.668723763857950688741753679661 y[1] (numeric) = -11.668723763857950688741753679658 absolute error = 3e-30 relative error = 2.5709752503457416890800269712171e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.105 y[1] (analytic) = -11.666680685159078778412291654333 y[1] (numeric) = -11.666680685159078778412291654331 absolute error = 2e-30 relative error = 1.7142836544280798450944680093879e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.106 y[1] (analytic) = -11.664637463481151392729870097512 y[1] (numeric) = -11.66463746348115139272987009751 absolute error = 2e-30 relative error = 1.7145839347870545603278255893655e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1445.8MB, alloc=4.6MB, time=69.81 x[1] = 3.107 y[1] (analytic) = -11.662594098828165786982809494409 y[1] (numeric) = -11.662594098828165786982809494407 absolute error = 2e-30 relative error = 1.7148843413841831417764455432304e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.108 y[1] (analytic) = -11.660550591204117342418291225517 y[1] (numeric) = -11.660550591204117342418291225514 absolute error = 3e-30 relative error = 2.5727773114444396249653803871984e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.109 y[1] (analytic) = -11.658506940612999567179166830284 y[1] (numeric) = -11.658506940612999567179166830281 absolute error = 3e-30 relative error = 2.5732283004004123503657977103219e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.11 y[1] (analytic) = -11.656463147058804097240116297444 y[1] (numeric) = -11.656463147058804097240116297441 absolute error = 3e-30 relative error = 2.5736794790596232905199340785872e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.111 y[1] (analytic) = -11.654419210545520697343155959846 y[1] (numeric) = -11.654419210545520697343155959844 absolute error = 2e-30 relative error = 1.7160872316917317149316650043999e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.112 y[1] (analytic) = -11.652375131077137261932496571052 y[1] (numeric) = -11.65237513107713726193249657105 absolute error = 2e-30 relative error = 1.7163882706333034300241405488498e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.113 y[1] (analytic) = -11.650330908657639816088752140313 y[1] (numeric) = -11.65033090865763981608875214031 absolute error = 3e-30 relative error = 2.5750341544124108764130192833606e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.114 y[1] (analytic) = -11.648286543291012516462500101927 y[1] (numeric) = -11.648286543291012516462500101925 absolute error = 2e-30 relative error = 1.7169907286938497669562369554909e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1449.6MB, alloc=4.6MB, time=70.18 x[1] = 3.115 y[1] (analytic) = -11.646242034981237652207193394369 y[1] (numeric) = -11.646242034981237652207193394367 absolute error = 2e-30 relative error = 1.7172921479673009760304211644587e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.116 y[1] (analytic) = -11.644197383732295645911425023916 y[1] (numeric) = -11.644197383732295645911425023914 absolute error = 2e-30 relative error = 1.7175936941726276829734212171902e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.117 y[1] (analytic) = -11.642152589548165054530545686941 y[1] (numeric) = -11.642152589548165054530545686939 absolute error = 2e-30 relative error = 1.7178953673872268976716474945821e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.118 y[1] (analytic) = -11.640107652432822570317635024356 y[1] (numeric) = -11.640107652432822570317635024353 absolute error = 3e-30 relative error = 2.5772957515328388501017993721466e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.119 y[1] (analytic) = -11.638062572390243021753827081118 y[1] (numeric) = -11.638062572390243021753827081116 absolute error = 2e-30 relative error = 1.7184990951541489718866092454725e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.12 y[1] (analytic) = -11.636017349424399374477990543073 y[1] (numeric) = -11.636017349424399374477990543071 absolute error = 2e-30 relative error = 1.7188011498615841284396397829902e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.121 y[1] (analytic) = -11.633971983539262732215764322776 y[1] (numeric) = -11.633971983539262732215764322774 absolute error = 2e-30 relative error = 1.7191033318885165171782565309047e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.122 y[1] (analytic) = -11.631926474738802337707949065359 y[1] (numeric) = -11.631926474738802337707949065357 absolute error = 2e-30 relative error = 1.7194056413126618163258835335781e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.123 y[1] (analytic) = -11.629880823026985573638255144842 y[1] (numeric) = -11.62988082302698557363825514484 absolute error = 2e-30 relative error = 1.7197080782117996335910615412659e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1453.4MB, alloc=4.6MB, time=70.56 x[1] = 3.124 y[1] (analytic) = -11.627835028407777963560407720711 y[1] (numeric) = -11.627835028407777963560407720709 absolute error = 2e-30 relative error = 1.7200106426637735716276227061737e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.125 y[1] (analytic) = -11.625789090885143172824609423957 y[1] (numeric) = -11.625789090885143172824609423955 absolute error = 2e-30 relative error = 1.7203133347464912935754975314577e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.126 y[1] (analytic) = -11.623743010463043009503361241147 y[1] (numeric) = -11.623743010463043009503361241145 absolute error = 2e-30 relative error = 1.7206161545379245886822698182447e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.127 y[1] (analytic) = -11.621696787145437425316642164504 y[1] (numeric) = -11.621696787145437425316642164501 absolute error = 3e-30 relative error = 2.5813786531741641570083933187313e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.128 y[1] (analytic) = -11.619650420936284516556448175335 y[1] (numeric) = -11.619650420936284516556448175332 absolute error = 3e-30 relative error = 2.5818332663387191202949027158703e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.129 y[1] (analytic) = -11.617603911839540525010691127575 y[1] (numeric) = -11.617603911839540525010691127572 absolute error = 3e-30 relative error = 2.5822880714177986160465732101454e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.13 y[1] (analytic) = -11.615557259859159838886458097549 y[1] (numeric) = -11.615557259859159838886458097546 absolute error = 3e-30 relative error = 2.5827430685287460715325570347527e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.131 y[1] (analytic) = -11.613510464999094993732631765492 y[1] (numeric) = -11.613510464999094993732631765489 absolute error = 3e-30 relative error = 2.5831982577890015971680750322335e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1457.2MB, alloc=4.6MB, time=70.93 x[1] = 3.132 y[1] (analytic) = -11.611463527263296673361872393734 y[1] (numeric) = -11.611463527263296673361872393732 absolute error = 2e-30 relative error = 1.7224357595440680571180953537965e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.133 y[1] (analytic) = -11.609416446655713710771961965859 y[1] (numeric) = -11.609416446655713710771961965857 absolute error = 2e-30 relative error = 1.7227394754851208742517623688652e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.134 y[1] (analytic) = -11.607369223180293089066511050517 y[1] (numeric) = -11.607369223180293089066511050516 absolute error = 1e-30 relative error = 8.6152165988049000986297292480349e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.135 y[1] (analytic) = -11.605321856840979942375028953003 y[1] (numeric) = -11.605321856840979942375028953002 absolute error = 1e-30 relative error = 8.6167364622509869205402030839101e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.136 y[1] (analytic) = -11.603274347641717556772357717059 y[1] (numeric) = -11.603274347641717556772357717058 absolute error = 1e-30 relative error = 8.6182569681569482237769221371377e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.137 y[1] (analytic) = -11.601226695586447371197470538799 y[1] (numeric) = -11.601226695586447371197470538798 absolute error = 1e-30 relative error = 8.6197781169161916616636734503196e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.138 y[1] (analytic) = -11.599178900679108978371635154015 y[1] (numeric) = -11.599178900679108978371635154014 absolute error = 1e-30 relative error = 8.6212999089224494870594852302972e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.139 y[1] (analytic) = -11.597130962923640125715942759534 y[1] (numeric) = -11.597130962923640125715942759533 absolute error = 1e-30 relative error = 8.6228223445697788857681203043729e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1461.0MB, alloc=4.6MB, time=71.30 x[1] = 3.14 y[1] (analytic) = -11.5950828823239767162682030287 y[1] (numeric) = -11.595082882323976716268203028699 absolute error = 1e-30 relative error = 8.6243454242525623103595123180392e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.141 y[1] (analytic) = -11.593034658884052809599205780432 y[1] (numeric) = -11.593034658884052809599205780431 absolute error = 1e-30 relative error = 8.6258691483655078144037378416517e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.142 y[1] (analytic) = -11.590986292607800622728349860726 y[1] (numeric) = -11.590986292607800622728349860725 absolute error = 1e-30 relative error = 8.6273935173036493871181185305886e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.143 y[1] (analytic) = -11.588937783499150531038639794865 y[1] (numeric) = -11.588937783499150531038639794864 absolute error = 1e-30 relative error = 8.6289185314623472884280484623698e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.144 y[1] (analytic) = -11.586889131562031069191050767983 y[1] (numeric) = -11.586889131562031069191050767982 absolute error = 1e-30 relative error = 8.6304441912372883844421427549655e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.145 y[1] (analytic) = -11.584840336800368932038262491062 y[1] (numeric) = -11.584840336800368932038262491061 absolute error = 1e-30 relative error = 8.6319704970244864833423045530603e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.146 y[1] (analytic) = -11.582791399218088975537762508809 y[1] (numeric) = -11.582791399218088975537762508808 absolute error = 1e-30 relative error = 8.6334974492202826716893084534460e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.147 y[1] (analytic) = -11.580742318819114217664319505288 y[1] (numeric) = -11.580742318819114217664319505288 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1464.8MB, alloc=4.6MB, time=71.67 x[1] = 3.148 y[1] (analytic) = -11.578693095607365839321827162569 y[1] (numeric) = -11.578693095607365839321827162569 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.149 y[1] (analytic) = -11.576643729586763185254519127061 y[1] (numeric) = -11.576643729586763185254519127061 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.15 y[1] (analytic) = -11.574594220761223764957555637618 y[1] (numeric) = -11.574594220761223764957555637618 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.151 y[1] (analytic) = -11.572544569134663253586982368883 y[1] (numeric) = -11.572544569134663253586982368883 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.152 y[1] (analytic) = -11.570494774710995492869062042768 y[1] (numeric) = -11.570494774710995492869062042768 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.153 y[1] (analytic) = -11.568444837494132492008979360356 y[1] (numeric) = -11.568444837494132492008979360356 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.154 y[1] (analytic) = -11.56639475748798442859891980593 y[1] (numeric) = -11.56639475748798442859891980593 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.155 y[1] (analytic) = -11.564344534696459649525522874237 y[1] (numeric) = -11.564344534696459649525522874238 absolute error = 1e-30 relative error = 8.6472691729280785489324519602304e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.156 y[1] (analytic) = -11.562294169123464671876710271504 y[1] (numeric) = -11.562294169123464671876710271505 absolute error = 1e-30 relative error = 8.6488026110808579293029114104713e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=1468.7MB, alloc=4.6MB, time=72.04 TOP MAIN SOLVE Loop x[1] = 3.157 y[1] (analytic) = -11.560243660772904183847889640132 y[1] (numeric) = -11.560243660772904183847889640133 absolute error = 1e-30 relative error = 8.6503367000236843254269908108669e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.158 y[1] (analytic) = -11.558193009648681045647534356409 y[1] (numeric) = -11.55819300964868104564753435641 absolute error = 1e-30 relative error = 8.6518714401568525483161027840137e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.159 y[1] (analytic) = -11.556142215754696290402139949995 y[1] (numeric) = -11.556142215754696290402139949995 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.16 y[1] (analytic) = -11.554091279094849125060557693324 y[1] (numeric) = -11.554091279094849125060557693324 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.161 y[1] (analytic) = -11.552040199673036931297705908521 y[1] (numeric) = -11.552040199673036931297705908521 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.162 y[1] (analytic) = -11.549988977493155266417659538797 y[1] (numeric) = -11.549988977493155266417659538797 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.163 y[1] (analytic) = -11.547937612559097864256118530742 y[1] (numeric) = -11.547937612559097864256118530743 absolute error = 1e-30 relative error = 8.6595549227113768145722392781134e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.164 y[1] (analytic) = -11.545886104874756636082255573323 y[1] (numeric) = -11.545886104874756636082255573324 absolute error = 1e-30 relative error = 8.6610935784113855586111912789707e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1472.5MB, alloc=4.6MB, time=72.41 x[1] = 3.165 y[1] (analytic) = -11.543834454444021671499943738815 y[1] (numeric) = -11.543834454444021671499943738816 absolute error = 1e-30 relative error = 8.6626328881131062749238584533796e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.166 y[1] (analytic) = -11.541782661270781239348364570329 y[1] (numeric) = -11.541782661270781239348364570329 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.167 y[1] (analytic) = -11.53973072535892178860199715998 y[1] (numeric) = -11.539730725358921788601997159981 absolute error = 1e-30 relative error = 8.6657134711338497563969992340777e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.168 y[1] (analytic) = -11.537678646712327949269988761208 y[1] (numeric) = -11.537678646712327949269988761208 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.169 y[1] (analytic) = -11.535626425334882533294907478112 y[1] (numeric) = -11.535626425334882533294907478112 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.17 y[1] (analytic) = -11.533574061230466535450877574166 y[1] (numeric) = -11.533574061230466535450877574166 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.171 y[1] (analytic) = -11.531521554402959134241097942021 y[1] (numeric) = -11.531521554402959134241097942021 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.172 y[1] (analytic) = -11.52946890485623769279474427557 y[1] (numeric) = -11.52946890485623769279474427557 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1476.3MB, alloc=4.6MB, time=72.79 x[1] = 3.173 y[1] (analytic) = -11.527416112594177759763255484863 y[1] (numeric) = -11.527416112594177759763255484863 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.174 y[1] (analytic) = -11.525363177620653070216004893867 y[1] (numeric) = -11.525363177620653070216004893867 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.175 y[1] (analytic) = -11.523310099939535546535356760508 y[1] (numeric) = -11.523310099939535546535356760509 absolute error = 1e-30 relative error = 8.6780620440410359414544615967949e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.176 y[1] (analytic) = -11.521256879554695299311108657848 y[1] (numeric) = -11.521256879554695299311108657849 absolute error = 1e-30 relative error = 8.6796085744305590466388017005389e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.177 y[1] (analytic) = -11.519203516470000628234320254662 y[1] (numeric) = -11.519203516470000628234320254662 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.178 y[1] (analytic) = -11.517150010689318022990529033131 y[1] (numeric) = -11.517150010689318022990529033131 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.179 y[1] (analytic) = -11.515096362216512164152353480776 y[1] (numeric) = -11.515096362216512164152353480776 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.18 y[1] (analytic) = -11.513042571055445924071484293177 y[1] (numeric) = -11.513042571055445924071484293177 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1480.1MB, alloc=4.6MB, time=73.18 x[1] = 3.181 y[1] (analytic) = -11.510988637209980367770064123475 y[1] (numeric) = -11.510988637209980367770064123474 absolute error = 1e-30 relative error = 8.6873511174134804957689786529498e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.182 y[1] (analytic) = -11.508934560683974753831456414047 y[1] (numeric) = -11.508934560683974753831456414046 absolute error = 1e-30 relative error = 8.6889016070708295575049288774197e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.183 y[1] (analytic) = -11.506880341481286535290403845217 y[1] (numeric) = -11.506880341481286535290403845216 absolute error = 1e-30 relative error = 8.6904527580345855359738636583099e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.184 y[1] (analytic) = -11.504825979605771360522576935248 y[1] (numeric) = -11.504825979605771360522576935247 absolute error = 1e-30 relative error = 8.6920045707137794652887079999219e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.185 y[1] (analytic) = -11.502771475061283074133513325323 y[1] (numeric) = -11.502771475061283074133513325322 absolute error = 1e-30 relative error = 8.6935570455177831044492350587763e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.186 y[1] (analytic) = -11.500716827851673717846948282652 y[1] (numeric) = -11.500716827851673717846948282651 absolute error = 1e-30 relative error = 8.6951101828563092907702551115589e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.187 y[1] (analytic) = -11.498662037980793531392536954248 y[1] (numeric) = -11.498662037980793531392536954247 absolute error = 1e-30 relative error = 8.6966639831394122937507124298733e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.188 y[1] (analytic) = -11.496607105452490953392968903379 y[1] (numeric) = -11.496607105452490953392968903378 absolute error = 1e-30 relative error = 8.6982184467774881693843311726280e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.189 y[1] (analytic) = -11.494552030270612622250475460122 y[1] (numeric) = -11.494552030270612622250475460121 absolute error = 1e-30 relative error = 8.6997735741812751149124524732696e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=1483.9MB, alloc=4.6MB, time=73.58 TOP MAIN SOLVE Loop x[1] = 3.19 y[1] (analytic) = -11.492496812439003377032730416866 y[1] (numeric) = -11.492496812439003377032730416865 absolute error = 1e-30 relative error = 8.7013293657618538240197059674455e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.191 y[1] (analytic) = -11.490441451961506258358144599075 y[1] (numeric) = -11.490441451961506258358144599074 absolute error = 1e-30 relative error = 8.7028858219306478424731600770224e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.192 y[1] (analytic) = -11.488385948841962509280554841027 y[1] (numeric) = -11.488385948841962509280554841026 absolute error = 1e-30 relative error = 8.7044429430994239242055964387759e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.193 y[1] (analytic) = -11.486330303084211576173307895707 y[1] (numeric) = -11.486330303084211576173307895705 absolute error = 2e-30 relative error = 1.7412001459360584775687109880840e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.194 y[1] (analytic) = -11.484274514692091109612739807439 y[1] (numeric) = -11.484274514692091109612739807437 absolute error = 2e-30 relative error = 1.7415118364171414947361593806115e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.195 y[1] (analytic) = -11.482218583669436965261051275321 y[1] (numeric) = -11.482218583669436965261051275319 absolute error = 2e-30 relative error = 1.7418236601456935402195670054986e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.196 y[1] (analytic) = -11.480162510020083204748579534912 y[1] (numeric) = -11.48016251002008320474857953491 absolute error = 2e-30 relative error = 1.7421356172043432452856359604650e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.197 y[1] (analytic) = -11.478106293747862096555467285112 y[1] (numeric) = -11.478106293747862096555467285109 absolute error = 3e-30 relative error = 2.6136715615136823603815859462383e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1487.7MB, alloc=4.6MB, time=74.00 x[1] = 3.198 y[1] (analytic) = -11.47604993485660411689272918657 y[1] (numeric) = -11.476049934856604116892729186568 absolute error = 2e-30 relative error = 1.7427599316427952262515042409091e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.199 y[1] (analytic) = -11.47399343335013795058271645744 y[1] (numeric) = -11.473993433350137950582716457438 absolute error = 2e-30 relative error = 1.7430722891882000470503598171197e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.2 y[1] (analytic) = -11.471936789232290491938980091693 y[1] (numeric) = -11.47193678923229049193898009169 absolute error = 3e-30 relative error = 2.6150771705923616415059645559225e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.201 y[1] (analytic) = -11.469880002506886845645533224683 y[1] (numeric) = -11.46988000250688684564553322468 absolute error = 3e-30 relative error = 2.6155461080188390696003969885326e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.202 y[1] (analytic) = -11.467823073177750327635513170086 y[1] (numeric) = -11.467823073177750327635513170083 absolute error = 3e-30 relative error = 2.6160152461862979103611156577020e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.203 y[1] (analytic) = -11.465766001248702465969243651766 y[1] (numeric) = -11.465766001248702465969243651763 absolute error = 3e-30 relative error = 2.6164845852194078656642750042289e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.204 y[1] (analytic) = -11.463708786723563001711697753579 y[1] (numeric) = -11.463708786723563001711697753577 absolute error = 2e-30 relative error = 1.7446360834952952614659696930124e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.205 y[1] (analytic) = -11.461651429606149889809362109576 y[1] (numeric) = -11.461651429606149889809362109574 absolute error = 2e-30 relative error = 1.7449492442545208733613279458100e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1491.5MB, alloc=4.6MB, time=74.39 x[1] = 3.206 y[1] (analytic) = -11.45959392990027929996650285648 y[1] (numeric) = -11.459593929900279299966502856478 absolute error = 2e-30 relative error = 1.7452625391739372742458653381358e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.207 y[1] (analytic) = -11.457536287609765617520833869805 y[1] (numeric) = -11.457536287609765617520833869802 absolute error = 3e-30 relative error = 2.6183639525054040693003524555983e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.208 y[1] (analytic) = -11.45547850273842144431858780438 y[1] (numeric) = -11.455478502738421444318587804378 absolute error = 2e-30 relative error = 1.7458895318269785645910524198846e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.209 y[1] (analytic) = -11.453420575290057599588990459539 y[1] (numeric) = -11.453420575290057599588990459537 absolute error = 2e-30 relative error = 1.7462032297275960708175313833641e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.21 y[1] (analytic) = -11.451362505268483120818138988637 y[1] (numeric) = -11.451362505268483120818138988634 absolute error = 3e-30 relative error = 2.6197755931835846177239570248664e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.211 y[1] (analytic) = -11.449304292677505264622284472034 y[1] (numeric) = -11.449304292677505264622284472032 absolute error = 2e-30 relative error = 1.7468310290950307796555638671524e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.212 y[1] (analytic) = -11.447245937520929507620519372141 y[1] (numeric) = -11.447245937520929507620519372139 absolute error = 2e-30 relative error = 1.7471451307292604512256508535175e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.213 y[1] (analytic) = -11.445187439802559547306870388531 y[1] (numeric) = -11.445187439802559547306870388529 absolute error = 2e-30 relative error = 1.7474593671088901946812352987937e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1495.4MB, alloc=4.6MB, time=74.76 x[1] = 3.214 y[1] (analytic) = -11.44312879952619730292179723062 y[1] (numeric) = -11.443128799526197302921797230618 absolute error = 2e-30 relative error = 1.7477737383178016759802115854692e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.215 y[1] (analytic) = -11.441070016695642916323097824844 y[1] (numeric) = -11.441070016695642916323097824842 absolute error = 2e-30 relative error = 1.7480882444399468655124495539295e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.216 y[1] (analytic) = -11.439011091314694752856220472712 y[1] (numeric) = -11.43901109131469475285622047271 absolute error = 2e-30 relative error = 1.7484028855593481114875333255859e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.217 y[1] (analytic) = -11.436952023387149402223983475577 y[1] (numeric) = -11.436952023387149402223983475575 absolute error = 2e-30 relative error = 1.7487176617600982134146227894456e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.218 y[1] (analytic) = -11.434892812916801679355702741414 y[1] (numeric) = -11.434892812916801679355702741412 absolute error = 2e-30 relative error = 1.7490325731263604956745725494889e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.219 y[1] (analytic) = -11.432833459907444625275727888355 y[1] (numeric) = -11.432833459907444625275727888353 absolute error = 2e-30 relative error = 1.7493476197423688811844433558290e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.22 y[1] (analytic) = -11.430773964362869507971387359169 y[1] (numeric) = -11.430773964362869507971387359167 absolute error = 2e-30 relative error = 1.7496628016924279651545412686702e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.221 y[1] (analytic) = -11.428714326286865823260343060354 y[1] (numeric) = -11.428714326286865823260343060353 absolute error = 1e-30 relative error = 8.7498905953045654446906001527006e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.222 y[1] (analytic) = -11.426654545683221295657355038946 y[1] (numeric) = -11.426654545683221295657355038944 absolute error = 2e-30 relative error = 1.7502935719322704139738823491605e-29 % Correct digits = 30 h = 0.001 memory used=1499.2MB, alloc=4.6MB, time=75.13 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.223 y[1] (analytic) = -11.424594622555721879240456709606 y[1] (numeric) = -11.424594622555721879240456709604 absolute error = 2e-30 relative error = 1.7506091603910169958214160206417e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.224 y[1] (analytic) = -11.422534556908151758516541144031 y[1] (numeric) = -11.422534556908151758516541144028 absolute error = 3e-30 relative error = 2.6263873267826112874345515756338e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.225 y[1] (analytic) = -11.42047434874429334928635893414 y[1] (numeric) = -11.420474348744293349286358934137 absolute error = 3e-30 relative error = 2.6268611166136516014882362363432e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.226 y[1] (analytic) = -11.418413998067927299508928140013 y[1] (numeric) = -11.41841399806792729950892814001 absolute error = 3e-30 relative error = 2.6273351102067417104925559148733e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.227 y[1] (analytic) = -11.416353504882832490165356832952 y[1] (numeric) = -11.416353504882832490165356832949 absolute error = 3e-30 relative error = 2.6278093076890836758389453501561e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.228 y[1] (analytic) = -11.414292869192786036122078743544 y[1] (numeric) = -11.414292869192786036122078743542 absolute error = 2e-30 relative error = 1.7521891394586576383094213349847e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.229 y[1] (analytic) = -11.412232091001563286993502524047 y[1] (numeric) = -11.412232091001563286993502524045 absolute error = 2e-30 relative error = 1.7525055432205773504960031745572e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.23 y[1] (analytic) = -11.410171170312937828004075133873 y[1] (numeric) = -11.410171170312937828004075133871 absolute error = 2e-30 relative error = 1.7528220831634969823522145199171e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1503.0MB, alloc=4.6MB, time=75.51 x[1] = 3.231 y[1] (analytic) = -11.408110107130681480849759856422 y[1] (numeric) = -11.408110107130681480849759856419 absolute error = 3e-30 relative error = 2.6297081390587551283164640709402e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.232 y[1] (analytic) = -11.40604890145856430455892945497 y[1] (numeric) = -11.406048901458564304558929454968 absolute error = 2e-30 relative error = 1.7534555719327551097162945830839e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.233 y[1] (analytic) = -11.403987553300354596352674974798 y[1] (numeric) = -11.403987553300354596352674974795 absolute error = 3e-30 relative error = 2.6306587813942232161933611196512e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.234 y[1] (analytic) = -11.401926062659818892504530698164 y[1] (numeric) = -11.401926062659818892504530698162 absolute error = 2e-30 relative error = 1.7540896064479863260597051179970e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.235 y[1] (analytic) = -11.399864429540721969199615758264 y[1] (numeric) = -11.399864429540721969199615758262 absolute error = 2e-30 relative error = 1.7544068285736412492977382926727e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.236 y[1] (analytic) = -11.397802653946826843393192917708 y[1] (numeric) = -11.397802653946826843393192917706 absolute error = 2e-30 relative error = 1.7547241873918923727329470737693e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.237 y[1] (analytic) = -11.39574073588189477366864501657 y[1] (numeric) = -11.395740735881894773668645016567 absolute error = 3e-30 relative error = 2.6325625244823856435606289491079e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.238 y[1] (analytic) = -11.393678675349685261094869594495 y[1] (numeric) = -11.393678675349685261094869594493 absolute error = 2e-30 relative error = 1.7553593154483248334596500258201e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1506.8MB, alloc=4.6MB, time=75.88 x[1] = 3.239 y[1] (analytic) = -11.391616472353956050083092190847 y[1] (numeric) = -11.391616472353956050083092190845 absolute error = 2e-30 relative error = 1.7556770848577570926689420265288e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.24 y[1] (analytic) = -11.389554126898463129243098826308 y[1] (numeric) = -11.389554126898463129243098826306 absolute error = 2e-30 relative error = 1.7559949913022875470884204676545e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.241 y[1] (analytic) = -11.387491638986960732238888168859 y[1] (numeric) = -11.387491638986960732238888168857 absolute error = 2e-30 relative error = 1.7563130348677221132784685215910e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.242 y[1] (analytic) = -11.385429008623201338643743886494 y[1] (numeric) = -11.385429008623201338643743886493 absolute error = 1e-30 relative error = 8.7831560781996951321686212505148e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.243 y[1] (analytic) = -11.383366235810935674794727688529 y[1] (numeric) = -11.383366235810935674794727688527 absolute error = 2e-30 relative error = 1.7569495337048889163061126573494e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.244 y[1] (analytic) = -11.381303320553912714646593556794 y[1] (numeric) = -11.381303320553912714646593556792 absolute error = 2e-30 relative error = 1.7572679891485948832237203831594e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.245 y[1] (analytic) = -11.37924026285587968062512366753 y[1] (numeric) = -11.379240262855879680625123667528 absolute error = 2e-30 relative error = 1.7575865820571525742056540771633e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.246 y[1] (analytic) = -11.377177062720582044479886504213 y[1] (numeric) = -11.377177062720582044479886504211 absolute error = 2e-30 relative error = 1.7579053125167302591730237317886e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1510.6MB, alloc=4.6MB, time=76.25 x[1] = 3.247 y[1] (analytic) = -11.375113720151763528136417661057 y[1] (numeric) = -11.375113720151763528136417661054 absolute error = 3e-30 relative error = 2.6373362709203533608842887349566e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.248 y[1] (analytic) = -11.373050235153166104547823836388 y[1] (numeric) = -11.373050235153166104547823836385 absolute error = 3e-30 relative error = 2.6378147796509733947976520225967e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.249 y[1] (analytic) = -11.37098660772852999854581051458 y[1] (numeric) = -11.370986607728529998545810514577 absolute error = 3e-30 relative error = 2.6382934950965353857842161237730e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.25 y[1] (analytic) = -11.368922837881593687691133834689 y[1] (numeric) = -11.368922837881593687691133834686 absolute error = 3e-30 relative error = 2.6387724173867286221936019381035e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.251 y[1] (analytic) = -11.366858925616093903123477143425 y[1] (numeric) = -11.366858925616093903123477143422 absolute error = 3e-30 relative error = 2.6392515466513519004810640583934e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.252 y[1] (analytic) = -11.364794870935765630410752729558 y[1] (numeric) = -11.364794870935765630410752729555 absolute error = 3e-30 relative error = 2.6397308830203136403935606835991e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.253 y[1] (analytic) = -11.362730673844342110397829236347 y[1] (numeric) = -11.362730673844342110397829236344 absolute error = 3e-30 relative error = 2.6402104266236320003015044166561e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.254 y[1] (analytic) = -11.360666334345554840054685248041 y[1] (numeric) = -11.360666334345554840054685248038 absolute error = 3e-30 relative error = 2.6406901775914349926764087373446e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1514.4MB, alloc=4.6MB, time=76.62 x[1] = 3.255 y[1] (analytic) = -11.358601852443133573323989545991 y[1] (numeric) = -11.358601852443133573323989545989 absolute error = 2e-30 relative error = 1.7607800907026403998097635350518e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.256 y[1] (analytic) = -11.356537228140806321968108529393 y[1] (numeric) = -11.356537228140806321968108529391 absolute error = 2e-30 relative error = 1.7611002014277045927383517262665e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.257 y[1] (analytic) = -11.354472461442299356415541295139 y[1] (numeric) = -11.354472461442299356415541295137 absolute error = 2e-30 relative error = 1.7614204506564547533052911730533e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.258 y[1] (analytic) = -11.352407552351337206606782870775 y[1] (numeric) = -11.352407552351337206606782870773 absolute error = 2e-30 relative error = 1.7617408384759366058958039926366e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.259 y[1] (analytic) = -11.350342500871642662839616093994 y[1] (numeric) = -11.350342500871642662839616093992 absolute error = 2e-30 relative error = 1.7620613649732694973519865797748e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.26 y[1] (analytic) = -11.348277307006936776613832631616 y[1] (numeric) = -11.348277307006936776613832631614 absolute error = 2e-30 relative error = 1.7623820302356464745445105727058e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.261 y[1] (analytic) = -11.346211970760938861475383630468 y[1] (numeric) = -11.346211970760938861475383630466 absolute error = 2e-30 relative error = 1.7627028343503343620425967436556e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.262 y[1] (analytic) = -11.344146492137366493859960492057 y[1] (numeric) = -11.344146492137366493859960492055 absolute error = 2e-30 relative error = 1.7630237774046738398824069520559e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.263 y[1] (analytic) = -11.342080871139935513936006262431 y[1] (numeric) = -11.342080871139935513936006262429 absolute error = 2e-30 relative error = 1.7633448594860795214339995437778e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=1518.3MB, alloc=4.6MB, time=77.00 TOP MAIN SOLVE Loop x[1] = 3.264 y[1] (analytic) = -11.340015107772360026447158128082 y[1] (numeric) = -11.34001510777236002644715812808 absolute error = 2e-30 relative error = 1.7636660806820400313669938253320e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.265 y[1] (analytic) = -11.33794920203835240155412150825 y[1] (numeric) = -11.337949202038352401554121508248 absolute error = 2e-30 relative error = 1.7639874410801180837150894880805e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.266 y[1] (analytic) = -11.335883153941623275675976233459 y[1] (numeric) = -11.335883153941623275675976233456 absolute error = 3e-30 relative error = 2.6464634111519258400593806561150e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.267 y[1] (analytic) = -11.333816963485881552330915299608 y[1] (numeric) = -11.333816963485881552330915299605 absolute error = 3e-30 relative error = 2.6469458697498728815380840932839e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.268 y[1] (analytic) = -11.331750630674834402976416686432 y[1] (numeric) = -11.331750630674834402976416686429 absolute error = 3e-30 relative error = 2.6474285375456964272644448410031e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.269 y[1] (analytic) = -11.32968415551218726784884872861 y[1] (numeric) = -11.329684155512187267848848728608 absolute error = 2e-30 relative error = 1.7652742764474575056097425203018e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.27 y[1] (analytic) = -11.327617538001643856802509527325 y[1] (numeric) = -11.327617538001643856802509527323 absolute error = 2e-30 relative error = 1.7655963341721625852844525307381e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.271 y[1] (analytic) = -11.325550778146906150148100889525 y[1] (numeric) = -11.325550778146906150148100889523 absolute error = 2e-30 relative error = 1.7659185316259217523278361915090e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1522.1MB, alloc=4.6MB, time=77.36 x[1] = 3.272 y[1] (analytic) = -11.32348387595167439949063728166 y[1] (numeric) = -11.323483875951674399490637281658 absolute error = 2e-30 relative error = 1.7662408688968185404632634586430e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.273 y[1] (analytic) = -11.321416831419647128566790284139 y[1] (numeric) = -11.321416831419647128566790284137 absolute error = 2e-30 relative error = 1.7665633460730112008707048576624e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.274 y[1] (analytic) = -11.319349644554521134081669032241 y[1] (numeric) = -11.31934964455452113408166903224 absolute error = 1e-30 relative error = 8.8344298162136639057377533704536e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.275 y[1] (analytic) = -11.317282315359991486545037128721 y[1] (numeric) = -11.317282315359991486545037128719 absolute error = 2e-30 relative error = 1.7672087204942912043697574834205e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.276 y[1] (analytic) = -11.315214843839751531106966512815 y[1] (numeric) = -11.315214843839751531106966512813 absolute error = 2e-30 relative error = 1.7675316179160693482534706338004e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.277 y[1] (analytic) = -11.313147229997492888392928769879 y[1] (numeric) = -11.313147229997492888392928769877 absolute error = 2e-30 relative error = 1.7678546555965251244172715464739e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.278 y[1] (analytic) = -11.311079473836905455338324365349 y[1] (numeric) = -11.311079473836905455338324365347 absolute error = 2e-30 relative error = 1.7681778336241915577451989512666e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.279 y[1] (analytic) = -11.30901157536167740602245028623 y[1] (numeric) = -11.309011575361677406022450286228 absolute error = 2e-30 relative error = 1.7685011520876768658506934271601e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1525.9MB, alloc=4.6MB, time=77.74 x[1] = 3.28 y[1] (analytic) = -11.306943534575495192501906572806 y[1] (numeric) = -11.306943534575495192501906572804 absolute error = 2e-30 relative error = 1.7688246110756645386416148712118e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.281 y[1] (analytic) = -11.304875351482043545643442222758 y[1] (numeric) = -11.304875351482043545643442222756 absolute error = 2e-30 relative error = 1.7691482106769134179864827727873e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.282 y[1] (analytic) = -11.302807026085005475956240949371 y[1] (numeric) = -11.302807026085005475956240949369 absolute error = 2e-30 relative error = 1.7694719509802577774820894242623e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.283 y[1] (analytic) = -11.300738558388062274423647275011 y[1] (numeric) = -11.300738558388062274423647275009 absolute error = 2e-30 relative error = 1.7697958320746074023226364540247e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.284 y[1] (analytic) = -11.298669948394893513334333440545 y[1] (numeric) = -11.298669948394893513334333440543 absolute error = 2e-30 relative error = 1.7701198540489476692705453227695e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.285 y[1] (analytic) = -11.296601196109177047112907610877 y[1] (numeric) = -11.296601196109177047112907610875 absolute error = 2e-30 relative error = 1.7704440169923396267290926797256e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.286 y[1] (analytic) = -11.294532301534589013149963856267 y[1] (numeric) = -11.294532301534589013149963856265 absolute error = 2e-30 relative error = 1.7707683209939200749170217315914e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.287 y[1] (analytic) = -11.292463264674803832631574388603 y[1] (numeric) = -11.292463264674803832631574388602 absolute error = 1e-30 relative error = 8.8554638307145082307264051678947e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1529.7MB, alloc=4.6MB, time=78.12 x[1] = 3.288 y[1] (analytic) = -11.290394085533494211368224531296 y[1] (numeric) = -11.290394085533494211368224531295 absolute error = 1e-30 relative error = 8.8570867626428644259802118454096e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.289 y[1] (analytic) = -11.28832476411433114062319090095 y[1] (numeric) = -11.288324764114331140623190900949 absolute error = 1e-30 relative error = 8.8587104012014916490207482104549e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.29 y[1] (analytic) = -11.286255300420983897940363278493 y[1] (numeric) = -11.286255300420983897940363278492 absolute error = 1e-30 relative error = 8.8603347468375929562057548228698e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.291 y[1] (analytic) = -11.28418569445712004797151064692 y[1] (numeric) = -11.284185694457120047971510646919 absolute error = 1e-30 relative error = 8.8619597999987521750103318981718e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.292 y[1] (analytic) = -11.282115946226405443302991872324 y[1] (numeric) = -11.282115946226405443302991872323 absolute error = 1e-30 relative error = 8.8635855611329343079752196017222e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.293 y[1] (analytic) = -11.280046055732504225281911504381 y[1] (numeric) = -11.28004605573250422528191150438 absolute error = 1e-30 relative error = 8.8652120306884859371702848186591e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.294 y[1] (analytic) = -11.277976022979078824841721171966 y[1] (numeric) = -11.277976022979078824841721171965 absolute error = 1e-30 relative error = 8.8668392091141356291739804973742e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.295 y[1] (analytic) = -11.275905847969789963327267049072 y[1] (numeric) = -11.275905847969789963327267049071 absolute error = 1e-30 relative error = 8.8684670968589943405695449671894e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1533.5MB, alloc=4.6MB, time=78.49 x[1] = 3.296 y[1] (analytic) = -11.273835530708296653319283865713 y[1] (numeric) = -11.273835530708296653319283865711 absolute error = 2e-30 relative error = 1.7740191388745111647917419872506e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.297 y[1] (analytic) = -11.271765071198256199458335937993 y[1] (numeric) = -11.271765071198256199458335937992 absolute error = 1e-30 relative error = 8.8717250021046970344936871835411e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.298 y[1] (analytic) = -11.26969446944332419926820569104 y[1] (numeric) = -11.269694469443324199268205691039 absolute error = 1e-30 relative error = 8.8733550205056785369282052692130e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.299 y[1] (analytic) = -11.267623725447154543978730147981 y[1] (numeric) = -11.26762372544715454397873014798 absolute error = 1e-30 relative error = 8.8749857500261449131883689004568e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.3 y[1] (analytic) = -11.265552839213399419348085857676 y[1] (numeric) = -11.265552839213399419348085857675 absolute error = 1e-30 relative error = 8.8766171911171251704641149053370e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.301 y[1] (analytic) = -11.263481810745709306484522733411 y[1] (numeric) = -11.26348181074570930648452273341 absolute error = 1e-30 relative error = 8.8782493442300331498220400850737e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.302 y[1] (analytic) = -11.261410640047732982667547274267 y[1] (numeric) = -11.261410640047732982667547274266 absolute error = 1e-30 relative error = 8.8798822098166679353403775356128e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.303 y[1] (analytic) = -11.259339327123117522168555640386 y[1] (numeric) = -11.259339327123117522168555640386 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.304 y[1] (analytic) = -11.257267871975508297070917052873 y[1] (numeric) = -11.257267871975508297070917052872 absolute error = 1e-30 relative error = 8.8831500802202429347005249570583e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1537.3MB, alloc=4.6MB, time=78.86 x[1] = 3.305 y[1] (analytic) = -11.255196274608548978089507988557 y[1] (numeric) = -11.255196274608548978089507988556 absolute error = 1e-30 relative error = 8.8847850859427112212974156151909e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.306 y[1] (analytic) = -11.25312453502588153538969763939 y[1] (numeric) = -11.253124535025881535389697639389 absolute error = 1e-30 relative error = 8.8864208059499632815023370401522e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.307 y[1] (analytic) = -11.251052653231146239405785105721 y[1] (numeric) = -11.251052653231146239405785105721 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.308 y[1] (analytic) = -11.24898062922798166165888879223 y[1] (numeric) = -11.24898062922798166165888879223 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.309 y[1] (analytic) = -11.246908463020024675574288474798 y[1] (numeric) = -11.246908463020024675574288474798 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.31 y[1] (analytic) = -11.244836154610910457298220506121 y[1] (numeric) = -11.244836154610910457298220506121 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.311 y[1] (analytic) = -11.242763704004272486514126627367 y[1] (numeric) = -11.242763704004272486514126627367 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.312 y[1] (analytic) = -11.240691111203742547258356852701 y[1] (numeric) = -11.240691111203742547258356852701 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1541.1MB, alloc=4.6MB, time=79.24 x[1] = 3.313 y[1] (analytic) = -11.238618376212950728735326893019 y[1] (numeric) = -11.23861837621295072873532689302 absolute error = 1e-30 relative error = 8.8978908841370189125118843445082e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.314 y[1] (analytic) = -11.236545499035525426132130584742 y[1] (numeric) = -11.236545499035525426132130584743 absolute error = 1e-30 relative error = 8.8995323347894931459334562717940e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.315 y[1] (analytic) = -11.234472479675093341432607789024 y[1] (numeric) = -11.234472479675093341432607789025 absolute error = 1e-30 relative error = 8.9011745038243265041459986046066e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.316 y[1] (analytic) = -11.232399318135279484230868226281 y[1] (numeric) = -11.232399318135279484230868226282 absolute error = 1e-30 relative error = 8.9028173916987547268259777618589e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.317 y[1] (analytic) = -11.230326014419707172544271710416 y[1] (numeric) = -11.230326014419707172544271710417 absolute error = 1e-30 relative error = 8.9044609988704049968761094691119e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.318 y[1] (analytic) = -11.22825256853199803362586524667 y[1] (numeric) = -11.228252568531998033625865246671 absolute error = 1e-30 relative error = 8.9061053257972963580214142876426e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.319 y[1] (analytic) = -11.226178980475772004776277456531 y[1] (numeric) = -11.226178980475772004776277456532 absolute error = 1e-30 relative error = 8.9077503729378401329408281560822e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.32 y[1] (analytic) = -11.224105250254647334155070792646 y[1] (numeric) = -11.224105250254647334155070792646 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1545.0MB, alloc=4.6MB, time=79.61 x[1] = 3.321 y[1] (analytic) = -11.222031377872240581591552006215 y[1] (numeric) = -11.222031377872240581591552006215 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.322 y[1] (analytic) = -11.219957363332166619395041328854 y[1] (numeric) = -11.219957363332166619395041328854 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.323 y[1] (analytic) = -11.217883206638038633164600830438 y[1] (numeric) = -11.217883206638038633164600830438 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.324 y[1] (analytic) = -11.215808907793468122598222413948 y[1] (numeric) = -11.215808907793468122598222413948 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.325 y[1] (analytic) = -11.213734466802064902301475907889 y[1] (numeric) = -11.213734466802064902301475907889 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.326 y[1] (analytic) = -11.211659883667437102595617716333 y[1] (numeric) = -11.211659883667437102595617716334 absolute error = 1e-30 relative error = 8.9192859074930375014374597454350e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.327 y[1] (analytic) = -11.209585158393191170325160486205 y[1] (numeric) = -11.209585158393191170325160486206 absolute error = 1e-30 relative error = 8.9209367328928200864288539499354e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.328 y[1] (analytic) = -11.207510290982931869664904250906 y[1] (numeric) = -11.207510290982931869664904250907 absolute error = 1e-30 relative error = 8.9225882826496788000794228194789e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.329 y[1] (analytic) = -11.205435281440262282926429508942 memory used=1548.8MB, alloc=4.6MB, time=79.98 y[1] (numeric) = -11.205435281440262282926429508943 absolute error = 1e-30 relative error = 8.9242405572259708702422751227249e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.33 y[1] (analytic) = -11.203360129768783811364052695703 y[1] (numeric) = -11.203360129768783811364052695704 absolute error = 1e-30 relative error = 8.9258935570844504387487921421118e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.331 y[1] (analytic) = -11.201284835972096175980244506096 y[1] (numeric) = -11.201284835972096175980244506097 absolute error = 1e-30 relative error = 8.9275472826882689860297540433487e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.332 y[1] (analytic) = -11.199209400053797418330511525247 y[1] (numeric) = -11.199209400053797418330511525248 absolute error = 1e-30 relative error = 8.9292017345009757562825391854289e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.333 y[1] (analytic) = -11.197133822017483901327741624006 y[1] (numeric) = -11.197133822017483901327741624008 absolute error = 2e-30 relative error = 1.7861713825973036366370430354820e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.334 y[1] (analytic) = -11.19505810186675031004601357554 y[1] (numeric) = -11.195058101866750310046013575542 absolute error = 2e-30 relative error = 1.7865025637218484632316683784626e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.335 y[1] (analytic) = -11.192982239605189652523871348788 y[1] (numeric) = -11.19298223960518965252387134879 absolute error = 2e-30 relative error = 1.7868338903667786494350616110703e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.336 y[1] (analytic) = -11.190906235236393260567063534123 y[1] (numeric) = -11.190906235236393260567063534125 absolute error = 2e-30 relative error = 1.7871653626251231076244048866428e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.337 y[1] (analytic) = -11.188830088763950790550748356058 y[1] (numeric) = -11.18883008876395079055074835606 absolute error = 2e-30 relative error = 1.7874969805899907297413596126819e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1552.6MB, alloc=4.6MB, time=80.40 x[1] = 3.338 y[1] (analytic) = -11.186753800191450224221164727382 y[1] (numeric) = -11.186753800191450224221164727384 absolute error = 2e-30 relative error = 1.7878287443545704729842426755358e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.339 y[1] (analytic) = -11.184677369522477869496769798631 y[1] (numeric) = -11.184677369522477869496769798633 absolute error = 2e-30 relative error = 1.7881606540121314456105694982373e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.34 y[1] (analytic) = -11.182600796760618361268843456343 y[1] (numeric) = -11.182600796760618361268843456345 absolute error = 2e-30 relative error = 1.7884927096560229928501296699326e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.341 y[1] (analytic) = -11.180524081909454662201560223056 y[1] (numeric) = -11.180524081909454662201560223058 absolute error = 2e-30 relative error = 1.7888249113796747829287611699815e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.342 y[1] (analytic) = -11.178447224972568063531529011554 y[1] (numeric) = -11.178447224972568063531529011556 absolute error = 2e-30 relative error = 1.7891572592765968932029894949932e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.343 y[1] (analytic) = -11.176370225953538185866801185397 y[1] (numeric) = -11.176370225953538185866801185399 absolute error = 2e-30 relative error = 1.7894897534403798964056982828101e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.344 y[1] (analytic) = -11.174293084855942979985347377292 y[1] (numeric) = -11.174293084855942979985347377295 absolute error = 3e-30 relative error = 2.6847335909470424205044974706148e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.345 y[1] (analytic) = -11.172215801683358727633003516415 y[1] (numeric) = -11.172215801683358727633003516418 absolute error = 3e-30 relative error = 2.6852327714149408014936930843136e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1556.4MB, alloc=4.6MB, time=80.77 x[1] = 3.346 y[1] (analytic) = -11.170138376439360042320886515295 y[1] (numeric) = -11.170138376439360042320886515298 absolute error = 3e-30 relative error = 2.6857321717050138537493368169902e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.347 y[1] (analytic) = -11.168060809127519870122280066446 y[1] (numeric) = -11.168060809127519870122280066449 absolute error = 3e-30 relative error = 2.6862317919581317056536774984749e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.348 y[1] (analytic) = -11.165983099751409490468990998432 y[1] (numeric) = -11.165983099751409490468990998435 absolute error = 3e-30 relative error = 2.6867316323152858780030158245941e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.349 y[1] (analytic) = -11.163905248314598516947176640605 y[1] (numeric) = -11.163905248314598516947176640608 absolute error = 3e-30 relative error = 2.6872316929175894143807655839138e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.35 y[1] (analytic) = -11.161827254820654898092643645281 y[1] (numeric) = -11.161827254820654898092643645284 absolute error = 3e-30 relative error = 2.6877319739062770116988234379822e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.351 y[1] (analytic) = -11.159749119273144918185618715668 y[1] (numeric) = -11.15974911927314491818561871567 absolute error = 2e-30 relative error = 1.7921549836151367672716670699744e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.352 y[1] (analytic) = -11.157670841675633198044991687375 y[1] (numeric) = -11.157670841675633198044991687377 absolute error = 2e-30 relative error = 1.7924887984055681519161801551189e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.353 y[1] (analytic) = -11.155592422031682695822031410903 y[1] (numeric) = -11.155592422031682695822031410905 absolute error = 2e-30 relative error = 1.7928227604032124562877231227240e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1560.2MB, alloc=4.6MB, time=81.14 x[1] = 3.354 y[1] (analytic) = -11.153513860344854707793574882009 y[1] (numeric) = -11.153513860344854707793574882011 absolute error = 2e-30 relative error = 1.7931568697025514263960115973174e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.355 y[1] (analytic) = -11.151435156618708869154690066424 y[1] (numeric) = -11.151435156618708869154690066426 absolute error = 2e-30 relative error = 1.7934911263981483472966562736184e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.356 y[1] (analytic) = -11.1493563108568031548108128649 y[1] (numeric) = -11.149356310856803154810812864902 absolute error = 2e-30 relative error = 1.7938255305846481307955340786817e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.357 y[1] (analytic) = -11.14727732306269388016935866414 y[1] (numeric) = -11.147277323062693880169358664141 absolute error = 1e-30 relative error = 8.9708004117838870163327673073859e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.358 y[1] (analytic) = -11.145198193239935701930808918662 y[1] (numeric) = -11.145198193239935701930808918664 absolute error = 2e-30 relative error = 1.7944947818093445935829847569932e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.359 y[1] (analytic) = -11.143118921392081618879273208243 y[1] (numeric) = -11.143118921392081618879273208245 absolute error = 2e-30 relative error = 1.7948296290372400211625268666623e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.36 y[1] (analytic) = -11.141039507522682972672527215063 y[1] (numeric) = -11.141039507522682972672527215065 absolute error = 2e-30 relative error = 1.7951646241354359841262817922123e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.361 y[1] (analytic) = -11.138959951635289448631527064284 y[1] (numeric) = -11.138959951635289448631527064286 absolute error = 2e-30 relative error = 1.7954997671989868475718088559043e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1564.0MB, alloc=4.6MB, time=81.52 x[1] = 3.362 y[1] (analytic) = -11.136880253733449076529400471275 y[1] (numeric) = -11.136880253733449076529400471277 absolute error = 2e-30 relative error = 1.7958350583230291319604307365658e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.363 y[1] (analytic) = -11.134800413820708231379915138288 y[1] (numeric) = -11.134800413820708231379915138289 absolute error = 1e-30 relative error = 8.9808524880139080080948187391953e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.364 y[1] (analytic) = -11.132720431900611634225424842894 y[1] (numeric) = -11.132720431900611634225424842895 absolute error = 1e-30 relative error = 8.9825304256677267667802254133070e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.365 y[1] (analytic) = -11.130640307976702352924293660068 y[1] (numeric) = -11.130640307976702352924293660069 absolute error = 1e-30 relative error = 8.9842091050535195259661502308022e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.366 y[1] (analytic) = -11.128560042052521802937798759326 y[1] (numeric) = -11.128560042052521802937798759327 absolute error = 1e-30 relative error = 8.9858885266486164260551629895015e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.367 y[1] (analytic) = -11.126479634131609748116512217874 y[1] (numeric) = -11.126479634131609748116512217875 absolute error = 1e-30 relative error = 8.9875686909307606025504141187174e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.368 y[1] (analytic) = -11.124399084217504301486162290289 y[1] (numeric) = -11.12439908421750430148616229029 absolute error = 1e-30 relative error = 8.9892495983781086314378762875108e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.369 y[1] (analytic) = -11.122318392313741926032974574766 y[1] (numeric) = -11.122318392313741926032974574767 absolute error = 1e-30 relative error = 8.9909312494692309751459113652586e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.37 y[1] (analytic) = -11.120237558423857435488493515546 y[1] (numeric) = -11.120237558423857435488493515547 absolute error = 1e-30 relative error = 8.9926136446831124290830353432594e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=1567.8MB, alloc=4.6MB, time=81.90 TOP MAIN SOLVE Loop x[1] = 3.371 y[1] (analytic) = -11.118156582551383995113884680664 y[1] (numeric) = -11.118156582551383995113884680665 absolute error = 1e-30 relative error = 8.9942967844991525687547553344420e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.372 y[1] (analytic) = -11.116075464699853122483718253709 y[1] (numeric) = -11.11607546469985312248371825371 absolute error = 1e-30 relative error = 8.9959806693971661974603542794871e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.373 y[1] (analytic) = -11.11399420487279468826923417785 y[1] (numeric) = -11.113994204872794688269234177851 absolute error = 1e-30 relative error = 8.9976652998573837945705005018505e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.374 y[1] (analytic) = -11.111912803073736917021089389908 y[1] (numeric) = -11.111912803073736917021089389908 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.375 y[1] (analytic) = -11.109831259306206387951587581817 y[1] (numeric) = -11.109831259306206387951587581817 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.376 y[1] (analytic) = -11.10774957357372803571639192638 y[1] (numeric) = -11.107749573573728035716391926379 absolute error = 1e-30 relative error = 9.0027236694198097612302286645559e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.377 y[1] (analytic) = -11.105667745879825151195721203736 y[1] (numeric) = -11.105667745879825151195721203735 absolute error = 1e-30 relative error = 9.0044112869394772694093430099792e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.378 y[1] (analytic) = -11.10358577622801938227502976456 y[1] (numeric) = -11.10358577622801938227502976456 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1571.7MB, alloc=4.6MB, time=82.27 x[1] = 3.379 y[1] (analytic) = -11.101503664621830734625171765519 y[1] (numeric) = -11.101503664621830734625171765519 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.38 y[1] (analytic) = -11.099421411064777572482050112088 y[1] (numeric) = -11.099421411064777572482050112088 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.381 y[1] (analytic) = -11.097339015560376619425750543385 y[1] (numeric) = -11.097339015560376619425750543385 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.382 y[1] (analytic) = -11.095256478112142959159161293212 y[1] (numeric) = -11.095256478112142959159161293212 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.383 y[1] (analytic) = -11.093173798723590036286078761074 y[1] (numeric) = -11.093173798723590036286078761074 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.384 y[1] (analytic) = -11.091090977398229657088799626476 y[1] (numeric) = -11.091090977398229657088799626476 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.385 y[1] (analytic) = -11.089008014139571990305199839376 y[1] (numeric) = -11.089008014139571990305199839376 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.386 y[1] (analytic) = -11.086924908951125567905300919202 y[1] (numeric) = -11.086924908951125567905300919203 absolute error = 1e-30 relative error = 9.0196335612649570140611757780016e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1575.5MB, alloc=4.6MB, time=82.65 x[1] = 3.387 y[1] (analytic) = -11.084841661836397285867323994428 y[1] (numeric) = -11.084841661836397285867323994429 absolute error = 1e-30 relative error = 9.0213286802540810038656301120611e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.388 y[1] (analytic) = -11.082758272798892404953232014224 y[1] (numeric) = -11.082758272798892404953232014225 absolute error = 1e-30 relative error = 9.0230245520590538975578843531473e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.389 y[1] (analytic) = -11.08067474184211455148376056329 y[1] (numeric) = -11.080674741842114551483760563292 absolute error = 2e-30 relative error = 1.8049442354333636869564380085163e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.39 y[1] (analytic) = -11.078591068969565718112937710515 y[1] (numeric) = -11.078591068969565718112937710517 absolute error = 2e-30 relative error = 1.8052837112129481483394192078581e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.391 y[1] (analytic) = -11.076507254184746264602093321663 y[1] (numeric) = -11.076507254184746264602093321665 absolute error = 2e-30 relative error = 1.8056233378481221579719281316639e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.392 y[1] (analytic) = -11.074423297491154918593358265863 y[1] (numeric) = -11.074423297491154918593358265865 absolute error = 2e-30 relative error = 1.8059631154365285711414652035626e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.393 y[1] (analytic) = -11.072339198892288776382653945223 y[1] (numeric) = -11.072339198892288776382653945226 absolute error = 3e-30 relative error = 2.7094545661138427941916347943686e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.394 y[1] (analytic) = -11.070254958391643303692172576455 y[1] (numeric) = -11.070254958391643303692172576458 absolute error = 3e-30 relative error = 2.7099646857960523295082101976861e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1579.3MB, alloc=4.6MB, time=83.03 x[1] = 3.395 y[1] (analytic) = -11.06817057599271233644234865295 y[1] (numeric) = -11.068170575992712336442348652952 absolute error = 2e-30 relative error = 1.8069833548988456325670544027958e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.396 y[1] (analytic) = -11.066086051698988081523322015319 y[1] (numeric) = -11.066086051698988081523322015321 absolute error = 2e-30 relative error = 1.8073237372783106553658113399716e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.397 y[1] (analytic) = -11.064001385513961117565892957965 y[1] (numeric) = -11.064001385513961117565892957967 absolute error = 2e-30 relative error = 1.8076642711004984975461707691718e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.398 y[1] (analytic) = -11.061916577441120395711969798809 y[1] (numeric) = -11.061916577441120395711969798812 absolute error = 3e-30 relative error = 2.7120074346953446751918481281971e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.399 y[1] (analytic) = -11.059831627483953240384509338873 y[1] (numeric) = -11.059831627483953240384509338875 absolute error = 2e-30 relative error = 1.8083457934657439784111603570923e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.4 y[1] (analytic) = -11.057746535645945350056950637959 y[1] (numeric) = -11.057746535645945350056950637962 absolute error = 3e-30 relative error = 2.7130301733080492222538959370479e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.401 y[1] (analytic) = -11.05566130193058079802214253227 y[1] (numeric) = -11.055661301930580798022142532273 absolute error = 3e-30 relative error = 2.7135418841712605779439118215417e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.402 y[1] (analytic) = -11.053575926341342033160765319317 y[1] (numeric) = -11.05357592634134203316076531932 absolute error = 3e-30 relative error = 2.7140538229359948533610208051317e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.403 y[1] (analytic) = -11.051490408881709880709247035097 y[1] (numeric) = -11.0514904088817098807092470351 absolute error = 3e-30 relative error = 2.7145659897501256868484482487603e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=1583.1MB, alloc=4.6MB, time=83.41 TOP MAIN SOLVE Loop x[1] = 3.404 y[1] (analytic) = -11.049404749555163543027174748031 y[1] (numeric) = -11.049404749555163543027174748033 absolute error = 2e-30 relative error = 1.8100522565077704509576033121947e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.405 y[1] (analytic) = -11.04731894836518060036420129374 y[1] (numeric) = -11.047318948365180600364201293743 absolute error = 3e-30 relative error = 2.7155910081187165200429931926281e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.406 y[1] (analytic) = -11.045233005315237011626447874326 y[1] (numeric) = -11.045233005315237011626447874329 absolute error = 3e-30 relative error = 2.7161038599695691558583044105571e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.407 y[1] (analytic) = -11.043146920408807115142402945328 y[1] (numeric) = -11.043146920408807115142402945332 absolute error = 4e-30 relative error = 3.6221559206168052038826509764982e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.408 y[1] (analytic) = -11.041060693649363629428317813176 y[1] (numeric) = -11.04106069364936362942831781318 absolute error = 4e-30 relative error = 3.6228403329951208024327625048338e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.409 y[1] (analytic) = -11.03897432504037765395309936545 y[1] (numeric) = -11.038974325040377653953099365453 absolute error = 3e-30 relative error = 2.7176437879694287557428103956805e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.41 y[1] (analytic) = -11.036887814585318669902700355882 y[1] (numeric) = -11.036887814585318669902700355885 absolute error = 3e-30 relative error = 2.7181575552806476714593481860491e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.411 y[1] (analytic) = -11.034801162287654540944007665575 y[1] (numeric) = -11.034801162287654540944007665578 absolute error = 3e-30 relative error = 2.7186715518289066007169729306229e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1586.9MB, alloc=4.6MB, time=83.78 x[1] = 3.412 y[1] (analytic) = -11.032714368150851513988228961487 y[1] (numeric) = -11.032714368150851513988228961489 absolute error = 2e-30 relative error = 1.8127905185088299211318289801154e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.413 y[1] (analytic) = -11.030627432178374219953778172804 y[1] (numeric) = -11.030627432178374219953778172807 absolute error = 3e-30 relative error = 2.7197002332328320806972737045861e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.414 y[1] (analytic) = -11.028540354373685674528660205403 y[1] (numeric) = -11.028540354373685674528660205406 absolute error = 3e-30 relative error = 2.7202149183869681339844550604199e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.415 y[1] (analytic) = -11.026453134740247278932355314144 y[1] (numeric) = -11.026453134740247278932355314148 absolute error = 4e-30 relative error = 3.6276397778334446531292007605874e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.416 y[1] (analytic) = -11.024365773281518820677203552355 y[1] (numeric) = -11.024365773281518820677203552359 absolute error = 4e-30 relative error = 3.6283266377956523344298588037661e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.417 y[1] (analytic) = -11.022278270000958474329289717386 y[1] (numeric) = -11.02227827000095847432928971739 absolute error = 4e-30 relative error = 3.6290138046021697548221716969807e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.418 y[1] (analytic) = -11.020190624902022802268829210734 y[1] (numeric) = -11.020190624902022802268829210738 absolute error = 4e-30 relative error = 3.6297012784527606989433587532666e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.419 y[1] (analytic) = -11.018102837988166755450055230772 y[1] (numeric) = -11.018102837988166755450055230776 absolute error = 4e-30 relative error = 3.6303890595473637275151622575648e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1590.7MB, alloc=4.6MB, time=84.15 x[1] = 3.42 y[1] (analytic) = -11.016014909262843674160607715718 y[1] (numeric) = -11.016014909262843674160607715722 absolute error = 4e-30 relative error = 3.6310771480860923679816009594824e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.421 y[1] (analytic) = -11.013926838729505288780424454036 y[1] (numeric) = -11.01392683872950528878042445404 absolute error = 4e-30 relative error = 3.6317655442692353053966306096979e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.422 y[1] (analytic) = -11.01183862639160172054013477904 y[1] (numeric) = -11.011838626391601720540134779045 absolute error = 5e-30 relative error = 4.5405678103715707169526169622937e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.423 y[1] (analytic) = -11.009750272252581482278956264058 y[1] (numeric) = -11.009750272252581482278956264063 absolute error = 5e-30 relative error = 4.5414290754634946830204252418204e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.424 y[1] (analytic) = -11.007661776315891479202094834062 y[1] (numeric) = -11.007661776315891479202094834066 absolute error = 4e-30 relative error = 3.6338325806906681296739053449834e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.425 y[1] (analytic) = -11.00557313858497700963764870928 y[1] (numeric) = -11.005573138584977009637648709284 absolute error = 4e-30 relative error = 3.6345222094578649527166240937959e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.426 y[1] (analytic) = -11.003484359063281765793016595856 y[1] (numeric) = -11.00348435906328176579301659586 absolute error = 4e-30 relative error = 3.6352121468735535607365712925558e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.427 y[1] (analytic) = -11.001395437754247834510810538211 y[1] (numeric) = -11.001395437754247834510810538215 absolute error = 4e-30 relative error = 3.6359023931390776071312104218967e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1594.5MB, alloc=4.6MB, time=84.53 x[1] = 3.428 y[1] (analytic) = -10.999306374661315698024273847334 y[1] (numeric) = -10.999306374661315698024273847338 absolute error = 4e-30 relative error = 3.6365929484559572461511377580487e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.429 y[1] (analytic) = -10.997217169787924234712204518812 y[1] (numeric) = -10.997217169787924234712204518816 absolute error = 4e-30 relative error = 3.6372838130258893258008085957224e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.43 y[1] (analytic) = -10.995127823137510719853384553989 y[1] (numeric) = -10.995127823137510719853384553993 absolute error = 4e-30 relative error = 3.6379749870507475809926329356601e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.431 y[1] (analytic) = -10.993038334713510826380515597209 y[1] (numeric) = -10.993038334713510826380515597212 absolute error = 3e-30 relative error = 2.7289998530494371202161215435140e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.432 y[1] (analytic) = -10.990948704519358625633661301694 y[1] (numeric) = -10.990948704519358625633661301697 absolute error = 3e-30 relative error = 2.7295186982052173646700660618747e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.433 y[1] (analytic) = -10.988858932558486588113196836189 y[1] (numeric) = -10.988858932558486588113196836191 absolute error = 2e-30 relative error = 1.8200251839381370579543896486177e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.434 y[1] (analytic) = -10.986769018834325584232265944056 y[1] (numeric) = -10.986769018834325584232265944058 absolute error = 2e-30 relative error = 1.8203713908715594675835373604452e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.435 y[1] (analytic) = -10.984678963350304885068745966134 y[1] (numeric) = -10.984678963350304885068745966136 absolute error = 2e-30 relative error = 1.8207177530384593431635310230983e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1598.4MB, alloc=4.6MB, time=84.90 x[1] = 3.436 y[1] (analytic) = -10.982588766109852163116721238203 y[1] (numeric) = -10.982588766109852163116721238205 absolute error = 2e-30 relative error = 1.8210642705403062481112818991494e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.437 y[1] (analytic) = -10.980498427116393493037465273523 y[1] (numeric) = -10.980498427116393493037465273526 absolute error = 3e-30 relative error = 2.7321164152179883033507929208091e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.438 y[1] (analytic) = -10.978407946373353352409932140471 y[1] (numeric) = -10.978407946373353352409932140474 absolute error = 3e-30 relative error = 2.7326366579327476689890656093585e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.439 y[1] (analytic) = -10.976317323884154622480757444886 y[1] (numeric) = -10.976317323884154622480757444889 absolute error = 3e-30 relative error = 2.7331571341073433073444256992720e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.44 y[1] (analytic) = -10.974226559652218588913769326337 y[1] (numeric) = -10.97422655965221858891376932634 absolute error = 3e-30 relative error = 2.7336778438945151810320197277645e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.441 y[1] (analytic) = -10.972135653680964942539009877076 y[1] (numeric) = -10.972135653680964942539009877078 absolute error = 2e-30 relative error = 1.8227991916314250159964325598180e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.442 y[1] (analytic) = -10.970044605973811780101267392058 y[1] (numeric) = -10.970044605973811780101267392061 absolute error = 3e-30 relative error = 2.7347199649182189886715154020430e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.443 y[1] (analytic) = -10.967953416534175605008119857982 y[1] (numeric) = -10.967953416534175605008119857985 absolute error = 3e-30 relative error = 2.7352413764609027933608206273208e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.444 y[1] (analytic) = -10.965862085365471328077490088869 y[1] (numeric) = -10.965862085365471328077490088872 absolute error = 3e-30 relative error = 2.7357630222284668697765109795270e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=1602.2MB, alloc=4.6MB, time=85.27 TOP MAIN SOLVE Loop x[1] = 3.445 y[1] (analytic) = -10.963770612471112268284712915332 y[1] (numeric) = -10.963770612471112268284712915335 absolute error = 3e-30 relative error = 2.7362849023743240107994716570390e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.446 y[1] (analytic) = -10.961678997854510153509114834219 y[1] (numeric) = -10.961678997854510153509114834222 absolute error = 3e-30 relative error = 2.7368070170520220184234659727376e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.447 y[1] (analytic) = -10.959587241519075121280106524951 y[1] (numeric) = -10.959587241519075121280106524954 absolute error = 3e-30 relative error = 2.7373293664152438518961199758617e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.448 y[1] (analytic) = -10.957495343468215719522788638417 y[1] (numeric) = -10.95749534346821571952278863842 absolute error = 3e-30 relative error = 2.7378519506178077760552521865197e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.449 y[1] (analytic) = -10.955403303705338907303071263917 y[1] (numeric) = -10.95540330370533890730307126392 absolute error = 3e-30 relative error = 2.7383747698136675098608488409354e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.45 y[1] (analytic) = -10.953311122233850055572307479205 y[1] (numeric) = -10.953311122233850055572307479208 absolute error = 3e-30 relative error = 2.7388978241569123751229855737594e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.451 y[1] (analytic) = -10.951218799057152947911441388282 y[1] (numeric) = -10.951218799057152947911441388285 absolute error = 3e-30 relative error = 2.7394211138017674454259969930524e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.452 y[1] (analytic) = -10.949126334178649781274671051181 y[1] (numeric) = -10.949126334178649781274671051184 absolute error = 3e-30 relative error = 2.7399446389025936952491961338864e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1606.0MB, alloc=4.6MB, time=85.65 x[1] = 3.453 y[1] (analytic) = -10.947033727601741166732626709577 y[1] (numeric) = -10.94703372760174116673262670958 absolute error = 3e-30 relative error = 2.7404683996138881492844463078859e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.454 y[1] (analytic) = -10.944940979329826130215064711631 y[1] (numeric) = -10.944940979329826130215064711634 absolute error = 3e-30 relative error = 2.7409923960902840319508883984721e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.455 y[1] (analytic) = -10.942848089366302113253077539091 y[1] (numeric) = -10.942848089366302113253077539094 absolute error = 3e-30 relative error = 2.7415166284865509171071271850557e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.456 y[1] (analytic) = -10.940755057714564973720820339246 y[1] (numeric) = -10.940755057714564973720820339249 absolute error = 3e-30 relative error = 2.7420410969575948779611808139714e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.457 y[1] (analytic) = -10.938661884378008986576754363928 y[1] (numeric) = -10.938661884378008986576754363931 absolute error = 3e-30 relative error = 2.7425658016584586371784980695515e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.458 y[1] (analytic) = -10.936568569360026844604407717349 y[1] (numeric) = -10.936568569360026844604407717352 absolute error = 3e-30 relative error = 2.7430907427443217171883486354006e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.459 y[1] (analytic) = -10.934475112664009659152653814156 y[1] (numeric) = -10.934475112664009659152653814158 absolute error = 2e-30 relative error = 1.8290772802470003937925947157736e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.46 y[1] (analytic) = -10.932381514293346960875507948664 y[1] (numeric) = -10.932381514293346960875507948667 absolute error = 3e-30 relative error = 2.7441413346924488313512317888531e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1609.8MB, alloc=4.6MB, time=86.02 x[1] = 3.461 y[1] (analytic) = -10.930287774251426700471442375861 y[1] (numeric) = -10.930287774251426700471442375863 absolute error = 2e-30 relative error = 1.8297779905771715098151738551634e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.462 y[1] (analytic) = -10.928193892541635249422220304308 y[1] (numeric) = -10.92819389254163524942222030431 absolute error = 2e-30 relative error = 1.8301285826974360795534043650806e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.463 y[1] (analytic) = -10.926099869167357400731249200727 y[1] (numeric) = -10.92609986916735740073124920073 absolute error = 3e-30 relative error = 2.7457189993895051779819829873460e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.464 y[1] (analytic) = -10.924005704131976369661453805606 y[1] (numeric) = -10.924005704131976369661453805609 absolute error = 3e-30 relative error = 2.7462453620518139292722577986942e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.465 y[1] (analytic) = -10.92191139743887379447266925877 y[1] (numeric) = -10.921911397438873794472669258772 absolute error = 2e-30 relative error = 1.8311813081261478128556961930445e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.466 y[1] (analytic) = -10.919816949091429737158554733471 y[1] (numeric) = -10.919816949091429737158554733474 absolute error = 3e-30 relative error = 2.7472987999580079034916271559698e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.467 y[1] (analytic) = -10.917722359093022684183027977134 y[1] (numeric) = -10.917722359093022684183027977137 absolute error = 3e-30 relative error = 2.7478258755145899988710322859414e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.468 y[1] (analytic) = -10.915627627447029547216221156486 y[1] (numeric) = -10.915627627447029547216221156489 absolute error = 3e-30 relative error = 2.7483531890155238362020512060267e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1613.6MB, alloc=4.6MB, time=86.39 x[1] = 3.469 y[1] (analytic) = -10.913532754156825663869958404416 y[1] (numeric) = -10.913532754156825663869958404419 absolute error = 3e-30 relative error = 2.7488807406175037125795313343898e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.47 y[1] (analytic) = -10.911437739225784798432755465496 y[1] (numeric) = -10.9114377392257847984327554655 absolute error = 4e-30 relative error = 3.6658780406364833921649916723172e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.471 y[1] (analytic) = -10.909342582657279142604341836692 y[1] (numeric) = -10.909342582657279142604341836696 absolute error = 4e-30 relative error = 3.6665820783360960251915210292118e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.472 y[1] (analytic) = -10.907247284454679316229705799395 y[1] (numeric) = -10.907247284454679316229705799398 absolute error = 3e-30 relative error = 2.7504648255987427500028160757428e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.473 y[1] (analytic) = -10.905151844621354368032662738508 y[1] (numeric) = -10.905151844621354368032662738512 absolute error = 4e-30 relative error = 3.6679911082328325719179744862990e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.474 y[1] (analytic) = -10.903056263160671776348947143925 y[1] (numeric) = -10.903056263160671776348947143928 absolute error = 3e-30 relative error = 2.7515220756371059790837698698483e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.475 y[1] (analytic) = -10.900960540075997449858828689309 y[1] (numeric) = -10.900960540075997449858828689312 absolute error = 3e-30 relative error = 2.7520510591437157094436917462381e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.476 y[1] (analytic) = -10.898864675370695728319252782736 y[1] (numeric) = -10.898864675370695728319252782739 absolute error = 3e-30 relative error = 2.7525802818521214685750388702002e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1617.4MB, alloc=4.6MB, time=86.77 x[1] = 3.477 y[1] (analytic) = -10.896768669048129383295505983312 y[1] (numeric) = -10.896768669048129383295505983315 absolute error = 3e-30 relative error = 2.7531097439201307987205721326977e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.478 y[1] (analytic) = -10.894672521111659618892406677515 y[1] (numeric) = -10.894672521111659618892406677518 absolute error = 3e-30 relative error = 2.7536394455056910901477968790991e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.479 y[1] (analytic) = -10.892576231564646072485021408588 y[1] (numeric) = -10.892576231564646072485021408591 absolute error = 3e-30 relative error = 2.7541693867668897356926467045649e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.48 y[1] (analytic) = -10.890479800410446815448907251941 y[1] (numeric) = -10.890479800410446815448907251944 absolute error = 3e-30 relative error = 2.7546995678619542855083923750454e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.481 y[1] (analytic) = -10.888383227652418353889880629087 y[1] (numeric) = -10.88838322765241835388988062909 absolute error = 3e-30 relative error = 2.7552299889492526020200937055945e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.482 y[1] (analytic) = -10.886286513293915629373312952283 y[1] (numeric) = -10.886286513293915629373312952286 absolute error = 3e-30 relative error = 2.7557606501872930150849127905511e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.483 y[1] (analytic) = -10.884189657338292019652953491608 y[1] (numeric) = -10.884189657338292019652953491611 absolute error = 3e-30 relative error = 2.7562915517347244773586075441124e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.484 y[1] (analytic) = -10.882092659788899339399279855854 y[1] (numeric) = -10.882092659788899339399279855857 absolute error = 3e-30 relative error = 2.7568226937503367198685250749152e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.485 y[1] (analytic) = -10.879995520649087840927376478182 y[1] (numeric) = -10.879995520649087840927376478186 absolute error = 4e-30 relative error = 3.6764721018574138770578866459496e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1621.3MB, alloc=4.6MB, time=87.15 x[1] = 3.486 y[1] (analytic) = -10.87789823992220621492434149712 y[1] (numeric) = -10.877898239922206214924341497124 absolute error = 4e-30 relative error = 3.6771809330959563952671776621069e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.487 y[1] (analytic) = -10.87580081761160159117622242307 y[1] (numeric) = -10.875800817611601591176222423074 absolute error = 4e-30 relative error = 3.6778900855950271833190771914378e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.488 y[1] (analytic) = -10.873703253720619539294480980116 y[1] (numeric) = -10.87370325372061953929448098012 absolute error = 4e-30 relative error = 3.6785995595670987803933844058481e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.489 y[1] (analytic) = -10.871605548252604069441987512517 y[1] (numeric) = -10.871605548252604069441987512521 absolute error = 4e-30 relative error = 3.6793093552248324714636006142714e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.49 y[1] (analytic) = -10.869507701210897633058545344884 y[1] (numeric) = -10.869507701210897633058545344888 absolute error = 4e-30 relative error = 3.6800194727810784963885748121161e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.491 y[1] (analytic) = -10.867409712598841123585945484645 y[1] (numeric) = -10.867409712598841123585945484649 absolute error = 4e-30 relative error = 3.6807299124488762592824857865639e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.492 y[1] (analytic) = -10.865311582419773877192552055012 y[1] (numeric) = -10.865311582419773877192552055016 absolute error = 4e-30 relative error = 3.6814406744414545381635928912220e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.493 y[1] (analytic) = -10.863213310677033673497418846279 y[1] (numeric) = -10.863213310677033673497418846283 absolute error = 4e-30 relative error = 3.6821517589722316948821883707294e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1625.1MB, alloc=4.6MB, time=87.52 x[1] = 3.494 y[1] (analytic) = -10.861114897373956736293937372872 y[1] (numeric) = -10.861114897373956736293937372876 absolute error = 4e-30 relative error = 3.6828631662548158853281848845453e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.495 y[1] (analytic) = -10.859016342513877734273016823204 y[1] (numeric) = -10.859016342513877734273016823208 absolute error = 4e-30 relative error = 3.6835748965030052699187726493088e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.496 y[1] (analytic) = -10.856917646100129781745796288985 y[1] (numeric) = -10.856917646100129781745796288989 absolute error = 4e-30 relative error = 3.6842869499307882243665813908599e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.497 y[1] (analytic) = -10.854818808136044439365889660248 y[1] (numeric) = -10.854818808136044439365889660252 absolute error = 4e-30 relative error = 3.6849993267523435507287830702615e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.498 y[1] (analytic) = -10.852719828624951714851163571972 y[1] (numeric) = -10.852719828624951714851163571976 absolute error = 4e-30 relative error = 3.6857120271820406887375721229426e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.499 y[1] (analytic) = -10.850620707570180063705048787781 y[1] (numeric) = -10.850620707570180063705048787785 absolute error = 4e-30 relative error = 3.6864250514344399274124607264331e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.5 y[1] (analytic) = -10.84852144497505638993738540583 y[1] (numeric) = -10.848521444975056389937385405834 absolute error = 4e-30 relative error = 3.6871383997242926169548273900389e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.501 y[1] (analytic) = -10.846422040842906046784802271577 y[1] (numeric) = -10.84642204084290604678480227158 absolute error = 3e-30 relative error = 2.7658890541999060356938684544508e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1628.9MB, alloc=4.6MB, time=87.89 x[1] = 3.502 y[1] (analytic) = -10.844322495177052837430630981776 y[1] (numeric) = -10.84432249517705283743063098178 absolute error = 4e-30 relative error = 3.6885660692763203287034187488099e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.503 y[1] (analytic) = -10.842222807980819015724354863635 y[1] (numeric) = -10.842222807980819015724354863639 absolute error = 4e-30 relative error = 3.6892803909689552682330028604550e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.504 y[1] (analytic) = -10.840122979257525286900593312668 y[1] (numeric) = -10.840122979257525286900593312672 absolute error = 4e-30 relative error = 3.6899950375599639190486904064663e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.505 y[1] (analytic) = -10.838023009010490808297621872442 y[1] (numeric) = -10.838023009010490808297621872446 absolute error = 4e-30 relative error = 3.6907100092650561255890655446273e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.506 y[1] (analytic) = -10.835922897243033190075428438978 y[1] (numeric) = -10.835922897243033190075428438982 absolute error = 4e-30 relative error = 3.6914253063001340707938328984669e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.507 y[1] (analytic) = -10.833822643958468495933305972212 y[1] (numeric) = -10.833822643958468495933305972216 absolute error = 4e-30 relative error = 3.6921409288812924899864772850237e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.508 y[1] (analytic) = -10.831722249160111243826982096535 y[1] (numeric) = -10.831722249160111243826982096539 absolute error = 4e-30 relative error = 3.6928568772248188850427113029396e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.509 y[1] (analytic) = -10.829621712851274406685285972032 y[1] (numeric) = -10.829621712851274406685285972036 absolute error = 4e-30 relative error = 3.6935731515471937388451561457060e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1632.7MB, alloc=4.6MB, time=88.26 x[1] = 3.51 y[1] (analytic) = -10.827521035035269413126352817682 y[1] (numeric) = -10.827521035035269413126352817686 absolute error = 4e-30 relative error = 3.6942897520650907300247017984808e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.511 y[1] (analytic) = -10.82542021571540614817336646737 y[1] (numeric) = -10.825420215715406148173366467373 absolute error = 3e-30 relative error = 2.7712550092465327109917451790798e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.512 y[1] (analytic) = -10.823319254894992953969840339202 y[1] (numeric) = -10.823319254894992953969840339205 absolute error = 3e-30 relative error = 2.7717929494163348311788695435581e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.513 y[1] (analytic) = -10.821218152577336630494437198226 y[1] (numeric) = -10.821218152577336630494437198229 absolute error = 3e-30 relative error = 2.7723311347211653259779197899513e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.514 y[1] (analytic) = -10.819116908765742436275328092271 y[1] (numeric) = -10.819116908765742436275328092274 absolute error = 3e-30 relative error = 2.7728695653241106564790071024193e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.515 y[1] (analytic) = -10.817015523463514089104090840248 y[1] (numeric) = -10.817015523463514089104090840251 absolute error = 3e-30 relative error = 2.7734082413884029891004415358224e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.516 y[1] (analytic) = -10.81491399667395376674914845187 y[1] (numeric) = -10.814913996673953766749148451873 absolute error = 3e-30 relative error = 2.7739471630774203579418698668504e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.517 y[1] (analytic) = -10.812812328400362107668747857374 y[1] (numeric) = -10.812812328400362107668747857377 absolute error = 3e-30 relative error = 2.7744863305546868273547820809087e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.518 y[1] (analytic) = -10.810710518646038211723479325433 y[1] (numeric) = -10.810710518646038211723479325437 absolute error = 4e-30 memory used=1636.5MB, alloc=4.6MB, time=88.64 relative error = 3.7000343253118302063076345578848e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.519 y[1] (analytic) = -10.808608567414279640888336947096 y[1] (numeric) = -10.8086085674142796408883369471 absolute error = 4e-30 relative error = 3.7007538713717259380100926802463e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.52 y[1] (analytic) = -10.806506474708382419964320563172 y[1] (numeric) = -10.806506474708382419964320563176 absolute error = 4e-30 relative error = 3.7014737458045538085255369851898e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.521 y[1] (analytic) = -10.804404240531641037289579512151 y[1] (numeric) = -10.804404240531641037289579512155 absolute error = 4e-30 relative error = 3.7021939488291269050848914293108e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.522 y[1] (analytic) = -10.80230186488734844545009857532 y[1] (numeric) = -10.802301864887348445450098575324 absolute error = 4e-30 relative error = 3.7029144806644541100881549616322e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.523 y[1] (analytic) = -10.800199347778796061989926495401 y[1] (numeric) = -10.800199347778796061989926495405 absolute error = 4e-30 relative error = 3.7036353415297403196135581265626e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.524 y[1] (analytic) = -10.798096689209273770120947444637 y[1] (numeric) = -10.79809668920927377012094744464 absolute error = 3e-30 relative error = 2.7782673987332899966647971210345e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.525 y[1] (analytic) = -10.79599388918206991943219581787 y[1] (numeric) = -10.795993889182069919432195817873 absolute error = 3e-30 relative error = 2.7788085384209930385309976327839e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.526 y[1] (analytic) = -10.793890947700471326598714725814 y[1] (numeric) = -10.793890947700471326598714725817 absolute error = 3e-30 relative error = 2.7793499253752600536339616229888e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1640.3MB, alloc=4.6MB, time=89.02 x[1] = 3.527 y[1] (analytic) = -10.791787864767763276089958563301 y[1] (numeric) = -10.791787864767763276089958563304 absolute error = 3e-30 relative error = 2.7798915597610843982860377892071e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.528 y[1] (analytic) = -10.789684640387229520877740026944 y[1] (numeric) = -10.789684640387229520877740026948 absolute error = 4e-30 relative error = 3.7072445889914763490277725451525e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.529 y[1] (analytic) = -10.787581274562152283143721956269 y[1] (numeric) = -10.787581274562152283143721956273 absolute error = 4e-30 relative error = 3.7079674286508237753983649358507e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.53 y[1] (analytic) = -10.785477767295812254986454371989 y[1] (numeric) = -10.785477767295812254986454371992 absolute error = 3e-30 relative error = 2.7815179491600534586845499579538e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.531 y[1] (analytic) = -10.78337411859148859912795708473 y[1] (numeric) = -10.783374118591488599127957084734 absolute error = 4e-30 relative error = 3.7094140998999997646622184350351e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.532 y[1] (analytic) = -10.781270328452458949619848247153 y[1] (numeric) = -10.781270328452458949619848247157 absolute error = 4e-30 relative error = 3.7101379319315881352394077172819e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.533 y[1] (analytic) = -10.779166396881999412549019222004 y[1] (numeric) = -10.779166396881999412549019222008 absolute error = 4e-30 relative error = 3.7108620951960135055314432723698e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.534 y[1] (analytic) = -10.77706232388338456674285613831 y[1] (numeric) = -10.777062323883384566742856138314 absolute error = 4e-30 relative error = 3.7115865899146514278109599450458e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1644.1MB, alloc=4.6MB, time=89.40 x[1] = 3.535 y[1] (analytic) = -10.774958109459887464474008507517 y[1] (numeric) = -10.774958109459887464474008507521 absolute error = 4e-30 relative error = 3.7123114163090761131251191161609e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.536 y[1] (analytic) = -10.772853753614779632164705271021 y[1] (numeric) = -10.772853753614779632164705271025 absolute error = 4e-30 relative error = 3.7130365746010606536498725538031e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.537 y[1] (analytic) = -10.770749256351331071090618650167 y[1] (numeric) = -10.770749256351331071090618650171 absolute error = 4e-30 relative error = 3.7137620650125772453432578082245e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.538 y[1] (analytic) = -10.768644617672810258084276169407 y[1] (numeric) = -10.768644617672810258084276169411 absolute error = 4e-30 relative error = 3.7144878877657974108981941891405e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.539 y[1] (analytic) = -10.766539837582484146238021222968 y[1] (numeric) = -10.766539837582484146238021222972 absolute error = 4e-30 relative error = 3.7152140430830922229952492051813e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.54 y[1] (analytic) = -10.764434916083618165606522554972 y[1] (numeric) = -10.764434916083618165606522554976 absolute error = 4e-30 relative error = 3.7159405311870325278558461882130e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.541 y[1] (analytic) = -10.762329853179476223908833022615 y[1] (numeric) = -10.762329853179476223908833022619 absolute error = 4e-30 relative error = 3.7166673523003891690963846698460e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.542 y[1] (analytic) = -10.760224648873320707229998011625 y[1] (numeric) = -10.760224648873320707229998011629 absolute error = 4e-30 relative error = 3.7173945066461332118837459237800e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1648.0MB, alloc=4.6MB, time=89.77 x[1] = 3.543 y[1] (analytic) = -10.758119303168412480722213872849 y[1] (numeric) = -10.758119303168412480722213872853 absolute error = 4e-30 relative error = 3.7181219944474361673926569356686e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.544 y[1] (analytic) = -10.756013816068010889305536748466 y[1] (numeric) = -10.75601381606801088930553674847 absolute error = 4e-30 relative error = 3.7188498159276702175653869119214e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.545 y[1] (analytic) = -10.753908187575373758368142155941 y[1] (numeric) = -10.753908187575373758368142155945 absolute error = 4e-30 relative error = 3.7195779713104084401742512903335e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.546 y[1] (analytic) = -10.751802417693757394466135697467 y[1] (numeric) = -10.751802417693757394466135697471 absolute error = 4e-30 relative error = 3.7203064608194250341873990686076e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.547 y[1] (analytic) = -10.749696506426416586022915262293 y[1] (numeric) = -10.749696506426416586022915262297 absolute error = 4e-30 relative error = 3.7210352846786955454383601217393e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.548 y[1] (analytic) = -10.747590453776604604028085088952 y[1] (numeric) = -10.747590453776604604028085088956 absolute error = 4e-30 relative error = 3.7217644431123970925998300358727e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.549 y[1] (analytic) = -10.745484259747573202735922054034 y[1] (numeric) = -10.745484259747573202735922054038 absolute error = 4e-30 relative error = 3.7224939363449085934621708446006e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.55 y[1] (analytic) = -10.743377924342572620363394553809 y[1] (numeric) = -10.743377924342572620363394553813 absolute error = 4e-30 relative error = 3.7232237646008109915171069137792e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1651.8MB, alloc=4.6MB, time=90.14 x[1] = 3.551 y[1] (analytic) = -10.741271447564851579787734344612 y[1] (numeric) = -10.741271447564851579787734344616 absolute error = 4e-30 relative error = 3.7239539281048874828470960827749e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.552 y[1] (analytic) = -10.73916482941765728924356170755 y[1] (numeric) = -10.739164829417657289243561707553 absolute error = 3e-30 relative error = 2.7935133203115928074906427752337e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.553 y[1] (analytic) = -10.737058069904235443019564302725 y[1] (numeric) = -10.737058069904235443019564302728 absolute error = 3e-30 relative error = 2.7940614463182811170716510438143e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.554 y[1] (analytic) = -10.734951169027830222154730077813 y[1] (numeric) = -10.734951169027830222154730077817 absolute error = 4e-30 relative error = 3.7261464323570320394259865950640e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.555 y[1] (analytic) = -10.732844126791684295134134595454 y[1] (numeric) = -10.732844126791684295134134595458 absolute error = 4e-30 relative error = 3.7268779391056898747816731048952e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.556 y[1] (analytic) = -10.730736943199038818584283143562 y[1] (numeric) = -10.730736943199038818584283143566 absolute error = 4e-30 relative error = 3.7276097822294795352716370681244e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.557 y[1] (analytic) = -10.728629618253133437968007992299 y[1] (numeric) = -10.728629618253133437968007992303 absolute error = 4e-30 relative error = 3.7283419619544025143780570799325e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.558 y[1] (analytic) = -10.726522151957206288278921161096 y[1] (numeric) = -10.7265221519572062882789211611 absolute error = 4e-30 relative error = 3.7290744785066641549988612369176e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.559 y[1] (analytic) = -10.724414544314493994735423058731 y[1] (numeric) = -10.724414544314493994735423058734 absolute error = 3e-30 relative error = 2.7973554990845054090999161597574e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=1655.6MB, alloc=4.6MB, time=90.52 TOP MAIN SOLVE Loop x[1] = 3.56 y[1] (analytic) = -10.722306795328231673474267359124 y[1] (numeric) = -10.722306795328231673474267359128 absolute error = 4e-30 relative error = 3.7305405229990454158770836349489e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.561 y[1] (analytic) = -10.720198905001652932243682475159 y[1] (numeric) = -10.720198905001652932243682475162 absolute error = 3e-30 relative error = 2.7984555385444477760469154351566e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.562 y[1] (analytic) = -10.71809087333798987109604999244 y[1] (numeric) = -10.718090873337989871096049992444 absolute error = 4e-30 relative error = 3.7320079175203517725416339015080e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.563 y[1] (analytic) = -10.715982700340473083080140424595 y[1] (numeric) = -10.715982700340473083080140424599 absolute error = 4e-30 relative error = 3.7327421216095376657814589650464e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.564 y[1] (analytic) = -10.713874386012331654932906651307 y[1] (numeric) = -10.713874386012331654932906651311 absolute error = 4e-30 relative error = 3.7334766638875879811048662744591e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.565 y[1] (analytic) = -10.71176593035679316777083539996 y[1] (numeric) = -10.711765930356793167770835399964 absolute error = 4e-30 relative error = 3.7342115445821414465767843390628e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.566 y[1] (analytic) = -10.709657333377083697780857131383 y[1] (numeric) = -10.709657333377083697780857131387 absolute error = 4e-30 relative error = 3.7349467639210424832036040334061e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.567 y[1] (analytic) = -10.707548595076427816910814689837 y[1] (numeric) = -10.70754859507642781691081468984 absolute error = 3e-30 relative error = 2.8017617415992560775845189390050e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1659.4MB, alloc=4.6MB, time=90.89 x[1] = 3.568 y[1] (analytic) = -10.705439715458048593559491077024 y[1] (numeric) = -10.705439715458048593559491077028 absolute error = 4e-30 relative error = 3.7364182194442948100458742218579e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.569 y[1] (analytic) = -10.703330694525167593266196709559 y[1] (numeric) = -10.703330694525167593266196709563 absolute error = 4e-30 relative error = 3.7371544560853654951673873957812e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.57 y[1] (analytic) = -10.70122153228100487939991651895 y[1] (numeric) = -10.701221532281004879399916518954 absolute error = 4e-30 relative error = 3.7378910322842230065201254120340e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.571 y[1] (analytic) = -10.699112228728779013848017252816 y[1] (numeric) = -10.69911222872877901384801725282 absolute error = 4e-30 relative error = 3.7386279482697437137973481697086e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.572 y[1] (analytic) = -10.697002783871707057704515335698 y[1] (numeric) = -10.697002783871707057704515335701 absolute error = 3e-30 relative error = 2.8045239032032583065727622265711e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.573 y[1] (analytic) = -10.694893197713004571957905647449 y[1] (numeric) = -10.694893197713004571957905647452 absolute error = 3e-30 relative error = 2.8050771003879869042444389234787e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.574 y[1] (analytic) = -10.692783470255885618178551576872 y[1] (numeric) = -10.692783470255885618178551576875 absolute error = 3e-30 relative error = 2.8056305529286173314405691678065e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.575 y[1] (analytic) = -10.69067360150356275920563670787 y[1] (numeric) = -10.690673601503562759205636707873 absolute error = 3e-30 relative error = 2.8061842609974291844150283280995e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1663.2MB, alloc=4.6MB, time=91.26 x[1] = 3.576 y[1] (analytic) = -10.688563591459247059833678495063 y[1] (numeric) = -10.688563591459247059833678495066 absolute error = 3e-30 relative error = 2.8067382247668580786154226443490e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.577 y[1] (analytic) = -10.686453440126148087498604285444 y[1] (numeric) = -10.686453440126148087498604285448 absolute error = 4e-30 relative error = 3.7430565925459944332524299366647e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.578 y[1] (analytic) = -10.684343147507473912963390042311 y[1] (numeric) = -10.684343147507473912963390042314 absolute error = 3e-30 relative error = 2.8078469200980906062297232181146e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.579 y[1] (analytic) = -10.682232713606431111003262127332 y[1] (numeric) = -10.682232713606431111003262127335 absolute error = 3e-30 relative error = 2.8084016520055471540101131007295e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.58 y[1] (analytic) = -10.680122138426224761090462496291 y[1] (numeric) = -10.680122138426224761090462496294 absolute error = 3e-30 relative error = 2.8089566403049269254595264558779e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.581 y[1] (analytic) = -10.678011421970058448078577663659 y[1] (numeric) = -10.678011421970058448078577663662 absolute error = 3e-30 relative error = 2.8095118851694482806279633687909e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.582 y[1] (analytic) = -10.675900564241134262886431790827 y[1] (numeric) = -10.67590056424113426288643179083 absolute error = 3e-30 relative error = 2.8100673867724866598925560020194e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.583 y[1] (analytic) = -10.673789565242652803181544252455 y[1] (numeric) = -10.673789565242652803181544252457 absolute error = 2e-30 relative error = 1.8737487635250498411032421526645e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1667.0MB, alloc=4.6MB, time=91.63 x[1] = 3.584 y[1] (analytic) = -10.671678424977813174063152035053 y[1] (numeric) = -10.671678424977813174063152035056 absolute error = 3e-30 relative error = 2.8111791608884027202796757166775e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.585 y[1] (analytic) = -10.669567143449812988744797321574 y[1] (numeric) = -10.669567143449812988744797321576 absolute error = 2e-30 relative error = 1.8744902891658788561838095419507e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.586 y[1] (analytic) = -10.667455720661848369236480615402 y[1] (numeric) = -10.667455720661848369236480615404 absolute error = 2e-30 relative error = 1.8748613093618846631457368588636e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.587 y[1] (analytic) = -10.665344156617113947026379756834 y[1] (numeric) = -10.665344156617113947026379756836 absolute error = 2e-30 relative error = 1.8752325012963949092776777847912e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.588 y[1] (analytic) = -10.66323245131880286376213518474 y[1] (numeric) = -10.663232451318802863762135184742 absolute error = 2e-30 relative error = 1.8756038650856240362125604401211e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.589 y[1] (analytic) = -10.661120604770106771931701795788 y[1] (numeric) = -10.66112060477010677193170179579 absolute error = 2e-30 relative error = 1.8759754008458920384455384183585e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.59 y[1] (analytic) = -10.65900861697421583554376775324 y[1] (numeric) = -10.659008616974215835543767753242 absolute error = 2e-30 relative error = 1.8763471086936245829312788423184e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.591 y[1] (analytic) = -10.656896487934318730807740596985 y[1] (numeric) = -10.656896487934318730807740596987 absolute error = 2e-30 relative error = 1.8767189887453531288440537946378e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1670.8MB, alloc=4.6MB, time=92.01 x[1] = 3.592 y[1] (analytic) = -10.654784217653602646813301006141 y[1] (numeric) = -10.654784217653602646813301006143 absolute error = 2e-30 relative error = 1.8770910411177150475008936180617e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.593 y[1] (analytic) = -10.652671806135253286209524565184 y[1] (numeric) = -10.652671806135253286209524565186 absolute error = 2e-30 relative error = 1.8774632659274537424480610502419e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.594 y[1] (analytic) = -10.650559253382454865883571884244 y[1] (numeric) = -10.650559253382454865883571884246 absolute error = 2e-30 relative error = 1.8778356632914187697111056280283e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.595 y[1] (analytic) = -10.648446559398390117638947423835 y[1] (numeric) = -10.648446559398390117638947423837 absolute error = 2e-30 relative error = 1.8782082333265659582087582674407e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.596 y[1] (analytic) = -10.646333724186240288873327373959 y[1] (numeric) = -10.646333724186240288873327373961 absolute error = 2e-30 relative error = 1.8785809761499575303309263976716e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.597 y[1] (analytic) = -10.644220747749185143255956937169 y[1] (numeric) = -10.644220747749185143255956937171 absolute error = 2e-30 relative error = 1.8789538918787622226810505006046e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.598 y[1] (analytic) = -10.642107630090402961404617364835 y[1] (numeric) = -10.642107630090402961404617364837 absolute error = 2e-30 relative error = 1.8793269806302554069830833814313e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.599 y[1] (analytic) = -10.639994371213070541562163095503 y[1] (numeric) = -10.639994371213070541562163095504 absolute error = 1e-30 relative error = 9.3985012126090960557667698550992e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.6 y[1] (analytic) = -10.637880971120363200272629343901 y[1] (numeric) = -10.637880971120363200272629343902 absolute error = 1e-30 relative error = 9.4003683883547132026878896836359e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=1674.7MB, alloc=4.6MB, time=92.38 TOP MAIN SOLVE Loop x[1] = 3.601 y[1] (analytic) = -10.63576742981545477305691048881 y[1] (numeric) = -10.635767429815454773056910488812 absolute error = 2e-30 relative error = 1.8804472861952216993132778553598e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.602 y[1] (analytic) = -10.633653747301517615088009607647 y[1] (numeric) = -10.633653747301517615088009607649 absolute error = 2e-30 relative error = 1.8808210682123595120578761799826e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.603 y[1] (analytic) = -10.631539923581722601865859505287 y[1] (numeric) = -10.631539923581722601865859505289 absolute error = 2e-30 relative error = 1.8811950238401664454827247112403e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.604 y[1] (analytic) = -10.629425958659239129891715584309 y[1] (numeric) = -10.629425958659239129891715584311 absolute error = 2e-30 relative error = 1.8815691531965602303333347638056e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.605 y[1] (analytic) = -10.627311852537235117342120903486 y[1] (numeric) = -10.627311852537235117342120903488 absolute error = 2e-30 relative error = 1.8819434563995660834560726995021e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.606 y[1] (analytic) = -10.625197605218877004742443771026 y[1] (numeric) = -10.625197605218877004742443771028 absolute error = 2e-30 relative error = 1.8823179335673168300315859805655e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.607 y[1] (analytic) = -10.6230832167073297556399882187 y[1] (numeric) = -10.623083216707329755639988218702 absolute error = 2e-30 relative error = 1.8826925848180530259752253794114e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.608 y[1] (analytic) = -10.620968687005756857276677702676 y[1] (numeric) = -10.620968687005756857276677702677 absolute error = 1e-30 relative error = 9.4153370513506154025236473258588e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1678.5MB, alloc=4.6MB, time=92.75 x[1] = 3.609 y[1] (analytic) = -10.618854016117320321261312376523 y[1] (numeric) = -10.618854016117320321261312376525 absolute error = 2e-30 relative error = 1.8834424100419833788754379721479e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.61 y[1] (analytic) = -10.616739204045180684241400281519 y[1] (numeric) = -10.616739204045180684241400281521 absolute error = 2e-30 relative error = 1.8838175842521984052833011412057e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.611 y[1] (analytic) = -10.614624250792497008574562799029 y[1] (numeric) = -10.61462425079249700857456279903 absolute error = 1e-30 relative error = 9.4209646650972043296797630601039e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.612 y[1] (analytic) = -10.612509156362426882999514709427 y[1] (numeric) = -10.612509156362426882999514709429 absolute error = 2e-30 relative error = 1.8845684564624918122921139319452e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.613 y[1] (analytic) = -10.610393920758126423306619201657 y[1] (numeric) = -10.610393920758126423306619201659 absolute error = 2e-30 relative error = 1.8849441547002407644695992361527e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.614 y[1] (analytic) = -10.608278543982750273008018177193 y[1] (numeric) = -10.608278543982750273008018177195 absolute error = 2e-30 relative error = 1.8853200278516858348221891435934e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.615 y[1] (analytic) = -10.606163026039451604007338191843 y[1] (numeric) = -10.606163026039451604007338191844 absolute error = 1e-30 relative error = 9.4284803801796692584282170208599e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.616 y[1] (analytic) = -10.604047366931382117268972378476 y[1] (numeric) = -10.604047366931382117268972378478 absolute error = 2e-30 relative error = 1.8860722993722004832931223244578e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1682.3MB, alloc=4.6MB, time=93.13 x[1] = 3.617 y[1] (analytic) = -10.601931566661692043486938693443 y[1] (numeric) = -10.601931566661692043486938693444 absolute error = 1e-30 relative error = 9.4322434898990518093014374606587e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.618 y[1] (analytic) = -10.599815625233530143753314829077 y[1] (numeric) = -10.599815625233530143753314829077 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.619 y[1] (analytic) = -10.597699542650043710226250134386 y[1] (numeric) = -10.597699542650043710226250134387 absolute error = 1e-30 relative error = 9.4360101074345197717467868585315e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.62 y[1] (analytic) = -10.595583318914378566797554885661 y[1] (numeric) = -10.595583318914378566797554885662 absolute error = 1e-30 relative error = 9.4378947331279143588096605743911e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.621 y[1] (analytic) = -10.593466954029679069759867248404 y[1] (numeric) = -10.593466954029679069759867248404 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.622 y[1] (analytic) = -10.591350447999088108473398271651 y[1] (numeric) = -10.591350447999088108473398271652 absolute error = 1e-30 relative error = 9.4416666213600686792975634164089e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.623 y[1] (analytic) = -10.589233800825747106032255255436 y[1] (numeric) = -10.589233800825747106032255255436 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.624 y[1] (analytic) = -10.587117012512796019930343831762 y[1] (numeric) = -10.587117012512796019930343831762 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1686.1MB, alloc=4.6MB, time=93.50 x[1] = 3.625 y[1] (analytic) = -10.585000083063373342726849099186 y[1] (numeric) = -10.585000083063373342726849099185 absolute error = 1e-30 relative error = 9.4473310548202941427609310188649e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.626 y[1] (analytic) = -10.582883012480616102711296150708 y[1] (numeric) = -10.582883012480616102711296150707 absolute error = 1e-30 relative error = 9.4492209620070353894584178416766e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.627 y[1] (analytic) = -10.580765800767659864568190334393 y[1] (numeric) = -10.580765800767659864568190334393 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.628 y[1] (analytic) = -10.578648447927638730041237585765 y[1] (numeric) = -10.578648447927638730041237585764 absolute error = 1e-30 relative error = 9.4530034240423253861671604118383e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.629 y[1] (analytic) = -10.576530953963685338597145170708 y[1] (numeric) = -10.576530953963685338597145170707 absolute error = 1e-30 relative error = 9.4548959800967412122714453514910e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.63 y[1] (analytic) = -10.574413318878930868089003177283 y[1] (numeric) = -10.574413318878930868089003177282 absolute error = 1e-30 relative error = 9.4567894203138368253319165617843e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.631 y[1] (analytic) = -10.572295542676505035419247094507 y[1] (numeric) = -10.572295542676505035419247094506 absolute error = 1e-30 relative error = 9.4586837452979284882223327582201e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.632 y[1] (analytic) = -10.570177625359536097202201815835 y[1] (numeric) = -10.570177625359536097202201815833 absolute error = 2e-30 relative error = 1.8921157911307773385692923821967e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.633 y[1] (analytic) = -10.56805956693115085042620740474 y[1] (numeric) = -10.568059566931150850426207404739 absolute error = 1e-30 relative error = 9.4624750519871367943239132998065e-30 % Correct digits = 31 h = 0.001 memory used=1689.9MB, alloc=4.6MB, time=93.87 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.634 y[1] (analytic) = -10.565941367394474633115326959474 y[1] (numeric) = -10.565941367394474633115326959473 absolute error = 1e-30 relative error = 9.4643720349036596460477422996334e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.635 y[1] (analytic) = -10.563823026752631324990636913722 y[1] (numeric) = -10.563823026752631324990636913721 absolute error = 1e-30 relative error = 9.4662699050099922356152257361113e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.636 y[1] (analytic) = -10.561704545008743348131100109581 y[1] (numeric) = -10.56170454500874334813110010958 absolute error = 1e-30 relative error = 9.4681686629132283216332082125803e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.637 y[1] (analytic) = -10.559585922165931667634021978928 y[1] (numeric) = -10.559585922165931667634021978928 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.638 y[1] (analytic) = -10.557467158227315792275090168931 y[1] (numeric) = -10.55746715822731579227509016893 absolute error = 1e-30 relative error = 9.4719688445415736994611886803112e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.639 y[1] (analytic) = -10.555348253196013775167997947104 y[1] (numeric) = -10.555348253196013775167997947104 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.64 y[1] (analytic) = -10.553229207075142214423651721034 y[1] (numeric) = -10.553229207075142214423651721034 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.641 y[1] (analytic) = -10.551110019867816253808963007485 y[1] (numeric) = -10.551110019867816253808963007485 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1693.7MB, alloc=4.6MB, time=94.25 x[1] = 3.642 y[1] (analytic) = -10.548990691577149583405225185361 y[1] (numeric) = -10.548990691577149583405225185361 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.643 y[1] (analytic) = -10.546871222206254440266075366604 y[1] (numeric) = -10.546871222206254440266075366605 absolute error = 1e-30 relative error = 9.4814848776622714739416309261958e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.644 y[1] (analytic) = -10.544751611758241609075041718816 y[1] (numeric) = -10.544751611758241609075041718817 absolute error = 1e-30 relative error = 9.4833907598631342033945606003342e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.645 y[1] (analytic) = -10.542631860236220422802676573041 y[1] (numeric) = -10.542631860236220422802676573042 absolute error = 1e-30 relative error = 9.4852975353499044597949623872097e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.646 y[1] (analytic) = -10.54051196764329876336327564985 y[1] (numeric) = -10.540511967643298763363275649851 absolute error = 1e-30 relative error = 9.4872052047352789295514646120935e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.647 y[1] (analytic) = -10.538391933982583062271183736506 y[1] (numeric) = -10.538391933982583062271183736507 absolute error = 1e-30 relative error = 9.4891137686325181330658531555427e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.648 y[1] (analytic) = -10.536271759257178301296687147694 y[1] (numeric) = -10.536271759257178301296687147695 absolute error = 1e-30 relative error = 9.4910232276554470721434408379975e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.649 y[1] (analytic) = -10.534151443470188013121493301948 y[1] (numeric) = -10.534151443470188013121493301949 absolute error = 1e-30 relative error = 9.4929335824184558782964486235889e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1697.5MB, alloc=4.6MB, time=94.62 x[1] = 3.65 y[1] (analytic) = -10.532030986624714281993797745609 y[1] (numeric) = -10.53203098662471428199379774561 absolute error = 1e-30 relative error = 9.4948448335365004619418354829540e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.651 y[1] (analytic) = -10.529910388723857744382938955796 y[1] (numeric) = -10.529910388723857744382938955797 absolute error = 1e-30 relative error = 9.4967569816251031624950163981431e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.652 y[1] (analytic) = -10.527789649770717589633641253566 y[1] (numeric) = -10.527789649770717589633641253566 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.653 y[1] (analytic) = -10.52566876976839156061984615811 y[1] (numeric) = -10.525668769768391560619846158111 absolute error = 1e-30 relative error = 9.5005839711789083238237651139242e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.654 y[1] (analytic) = -10.523547748719975954398132512512 y[1] (numeric) = -10.523547748719975954398132512512 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.655 y[1] (analytic) = -10.521426586628565622860725711249 y[1] (numeric) = -10.521426586628565622860725711249 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.656 y[1] (analytic) = -10.519305283497253973388096359344 y[1] (numeric) = -10.519305283497253973388096359344 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.657 y[1] (analytic) = -10.517183839329132969501148692687 y[1] (numeric) = -10.517183839329132969501148692687 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1701.4MB, alloc=4.6MB, time=94.99 x[1] = 3.658 y[1] (analytic) = -10.515062254127293131512999088787 y[1] (numeric) = -10.515062254127293131512999088787 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.659 y[1] (analytic) = -10.512940527894823537180344996843 y[1] (numeric) = -10.512940527894823537180344996843 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.66 y[1] (analytic) = -10.510818660634811822354424615736 y[1] (numeric) = -10.510818660634811822354424615736 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.661 y[1] (analytic) = -10.508696652350344181631567648196 y[1] (numeric) = -10.508696652350344181631567648196 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.662 y[1] (analytic) = -10.506574503044505369003337459106 y[1] (numeric) = -10.506574503044505369003337459106 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.663 y[1] (analytic) = -10.504452212720378698506264965552 y[1] (numeric) = -10.504452212720378698506264965552 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.664 y[1] (analytic) = -10.502329781381046044871174585936 y[1] (numeric) = -10.502329781381046044871174585936 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.665 y[1] (analytic) = -10.500207209029587844172102575138 y[1] (numeric) = -10.500207209029587844172102575138 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.666 y[1] (analytic) = -10.498084495669083094474808072384 y[1] (numeric) = -10.498084495669083094474808072383 absolute error = 1e-30 relative error = 9.5255472597171754200957594761855e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=1705.2MB, alloc=4.6MB, time=95.36 TOP MAIN SOLVE Loop x[1] = 3.667 y[1] (analytic) = -10.495961641302609356484877188175 y[1] (numeric) = -10.495961641302609356484877188175 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.668 y[1] (analytic) = -10.493838645933242754195420456318 y[1] (numeric) = -10.493838645933242754195420456317 absolute error = 1e-30 relative error = 9.5294013348255323066723124904039e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.669 y[1] (analytic) = -10.491715509564057975534363976737 y[1] (numeric) = -10.491715509564057975534363976736 absolute error = 1e-30 relative error = 9.5313297342881447592944775243390e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.67 y[1] (analytic) = -10.489592232198128273011334574498 y[1] (numeric) = -10.489592232198128273011334574497 absolute error = 1e-30 relative error = 9.5332590425247325142862508320553e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.671 y[1] (analytic) = -10.487468813838525464364139300093 y[1] (numeric) = -10.487468813838525464364139300092 absolute error = 1e-30 relative error = 9.5351892601622844032406341337478e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.672 y[1] (analytic) = -10.485345254488319933204839595755 y[1] (numeric) = -10.485345254488319933204839595754 absolute error = 1e-30 relative error = 9.5371203878283695482450287928108e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.673 y[1] (analytic) = -10.483221554150580629665420452249 y[1] (numeric) = -10.483221554150580629665420452248 absolute error = 1e-30 relative error = 9.5390524261511380320541020024913e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.674 y[1] (analytic) = -10.481097712828375071043054880255 y[1] (numeric) = -10.481097712828375071043054880254 absolute error = 1e-30 relative error = 9.5409853757593215691923915090527e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1709.0MB, alloc=4.6MB, time=95.73 x[1] = 3.675 y[1] (analytic) = -10.478973730524769342444964020158 y[1] (numeric) = -10.478973730524769342444964020158 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.676 y[1] (analytic) = -10.476849607242828097432873213746 y[1] (numeric) = -10.476849607242828097432873213746 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.677 y[1] (analytic) = -10.474725342985614558667064360978 y[1] (numeric) = -10.474725342985614558667064360978 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.678 y[1] (analytic) = -10.472600937756190518550024884703 y[1] (numeric) = -10.472600937756190518550024884703 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.679 y[1] (analytic) = -10.470476391557616339869693625873 y[1] (numeric) = -10.470476391557616339869693625873 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.68 y[1] (analytic) = -10.468351704392950956442303991481 y[1] (numeric) = -10.46835170439295095644230399148 absolute error = 1e-30 relative error = 9.5526022456845700769020844899515e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.681 y[1] (analytic) = -10.46622687626525187375482467715 y[1] (numeric) = -10.466226876265251873754824677149 absolute error = 1e-30 relative error = 9.5545415919441454251797178357030e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.682 y[1] (analytic) = -10.464101907177575169606998285987 y[1] (numeric) = -10.464101907177575169606998285986 absolute error = 1e-30 relative error = 9.5564818545400091270187069247773e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1712.8MB, alloc=4.6MB, time=96.11 x[1] = 3.683 y[1] (analytic) = -10.461976797132975494752978164983 y[1] (numeric) = -10.461976797132975494752978164982 absolute error = 1e-30 relative error = 9.5584230341061579366434787710016e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.684 y[1] (analytic) = -10.459851546134506073542563779951 y[1] (numeric) = -10.45985154613450607354256377995 absolute error = 1e-30 relative error = 9.5603651312771770025423905383910e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.685 y[1] (analytic) = -10.457726154185218704562034949673 y[1] (numeric) = -10.457726154185218704562034949673 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.686 y[1] (analytic) = -10.455600621288163761274585259609 y[1] (numeric) = -10.455600621288163761274585259609 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.687 y[1] (analytic) = -10.453474947446390192660354975212 y[1] (numeric) = -10.453474947446390192660354975212 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.688 y[1] (analytic) = -10.451349132662945523856063774595 y[1] (numeric) = -10.451349132662945523856063774595 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.689 y[1] (analytic) = -10.449223176940875856794243619963 y[1] (numeric) = -10.449223176940875856794243619962 absolute error = 1e-30 relative error = 9.5700894034570799115377998629321e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.69 y[1] (analytic) = -10.447097080283225870842072086924 y[1] (numeric) = -10.447097080283225870842072086923 absolute error = 1e-30 relative error = 9.5720370196166446918273036237023e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1716.6MB, alloc=4.6MB, time=96.48 x[1] = 3.691 y[1] (analytic) = -10.444970842693038823439806470494 y[1] (numeric) = -10.444970842693038823439806470493 absolute error = 1e-30 relative error = 9.5739855578397081669292293686016e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.692 y[1] (analytic) = -10.442844464173356550738818986274 y[1] (numeric) = -10.442844464173356550738818986273 absolute error = 1e-30 relative error = 9.5759350187655872507350723223697e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.693 y[1] (analytic) = -10.440717944727219468239233384989 y[1] (numeric) = -10.440717944727219468239233384989 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.694 y[1] (analytic) = -10.438591284357666571427163298273 y[1] (numeric) = -10.438591284357666571427163298272 absolute error = 1e-30 relative error = 9.5798367112860333969794168624910e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.695 y[1] (analytic) = -10.436464483067735436411552633243 y[1] (numeric) = -10.436464483067735436411552633242 absolute error = 1e-30 relative error = 9.5817889441622098551689942630918e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.696 y[1] (analytic) = -10.434337540860462220560618333149 y[1] (numeric) = -10.434337540860462220560618333148 absolute error = 1e-30 relative error = 9.5837421023044220964861414981901e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.697 y[1] (analytic) = -10.43221045773888166313789582102 y[1] (numeric) = -10.432210457738881663137895821019 absolute error = 1e-30 relative error = 9.5856961863549667515580736345025e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.698 y[1] (analytic) = -10.430083233706027085937887442971 y[1] (numeric) = -10.430083233706027085937887442971 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.699 y[1] (analytic) = -10.427955868764930393921314227492 y[1] (numeric) = -10.427955868764930393921314227492 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 memory used=1720.4MB, alloc=4.6MB, time=96.86 TOP MAIN SOLVE Loop x[1] = 3.7 y[1] (analytic) = -10.425828362918622075849971276747 y[1] (numeric) = -10.425828362918622075849971276747 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.701 y[1] (analytic) = -10.423700716170131204921187105609 y[1] (numeric) = -10.423700716170131204921187105609 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.702 y[1] (analytic) = -10.421572928522485439401887243842 y[1] (numeric) = -10.421572928522485439401887243842 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.703 y[1] (analytic) = -10.419444999978711023262262416539 y[1] (numeric) = -10.419444999978711023262262416538 absolute error = 1e-30 relative error = 9.5974401707772649772168772342909e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.704 y[1] (analytic) = -10.41731693054183278680904161761 y[1] (numeric) = -10.417316930541832786809041617609 absolute error = 1e-30 relative error = 9.5994007542207636316622794414807e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.705 y[1] (analytic) = -10.415188720214874147318370390837 y[1] (numeric) = -10.415188720214874147318370390836 absolute error = 1e-30 relative error = 9.6013622687325549939157816831655e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.706 y[1] (analytic) = -10.413060369000857109668294632666 y[1] (numeric) = -10.413060369000857109668294632665 absolute error = 1e-30 relative error = 9.6033247149603429805621474249835e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.707 y[1] (analytic) = -10.410931876902802266970850230638 y[1] (numeric) = -10.410931876902802266970850230637 absolute error = 1e-30 relative error = 9.6052880935524358179205076178516e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1724.2MB, alloc=4.6MB, time=97.23 x[1] = 3.708 y[1] (analytic) = -10.408803243923728801203758851036 y[1] (numeric) = -10.408803243923728801203758851035 absolute error = 1e-30 relative error = 9.6072524051577467456718362786590e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.709 y[1] (analytic) = -10.406674470066654483841730189031 y[1] (numeric) = -10.40667447006665448384173018903 absolute error = 1e-30 relative error = 9.6092176504257947214705203836018e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.71 y[1] (analytic) = -10.404545555334595676487370994298 y[1] (numeric) = -10.404545555334595676487370994297 absolute error = 1e-30 relative error = 9.6111838300067051265416296400695e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.711 y[1] (analytic) = -10.402416499730567331501701184785 y[1] (numeric) = -10.402416499730567331501701184783 absolute error = 2e-30 relative error = 1.9226301889102420944530989395844e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.712 y[1] (analytic) = -10.400287303257582992634277360987 y[1] (numeric) = -10.400287303257582992634277360986 absolute error = 1e-30 relative error = 9.6151189947106511077512053622406e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.713 y[1] (analytic) = -10.398157965918654795652924032818 y[1] (numeric) = -10.398157965918654795652924032816 absolute error = 2e-30 relative error = 1.9234175962273951856801286754248e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.714 y[1] (analytic) = -10.396028487716793468973072870814 y[1] (numeric) = -10.396028487716793468973072870812 absolute error = 2e-30 relative error = 1.9238115808965486170929334727972e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.715 y[1] (analytic) = -10.393898868655008334286710293165 y[1] (numeric) = -10.393898868655008334286710293163 absolute error = 2e-30 relative error = 1.9242057530802241393186141035852e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1728.1MB, alloc=4.6MB, time=97.61 x[1] = 3.716 y[1] (analytic) = -10.391769108736307307190933699707 y[1] (numeric) = -10.391769108736307307190933699705 absolute error = 2e-30 relative error = 1.9246001129091775114759869384625e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.717 y[1] (analytic) = -10.389639207963696897816116663759 y[1] (numeric) = -10.389639207963696897816116663757 absolute error = 2e-30 relative error = 1.9249946605142867707812015069078e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.718 y[1] (analytic) = -10.387509166340182211453683392347 y[1] (numeric) = -10.387509166340182211453683392345 absolute error = 2e-30 relative error = 1.9253893960265523752559464750416e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.719 y[1] (analytic) = -10.385378983868766949183492765086 y[1] (numeric) = -10.385378983868766949183492765084 absolute error = 2e-30 relative error = 1.9257843195770973466357127237182e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.72 y[1] (analytic) = -10.383248660552453408500832261677 y[1] (numeric) = -10.383248660552453408500832261675 absolute error = 2e-30 relative error = 1.9261794312971674134784406868577e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.721 y[1] (analytic) = -10.381118196394242483943022087673 y[1] (numeric) = -10.381118196394242483943022087671 absolute error = 2e-30 relative error = 1.9265747313181311544738797216903e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.722 y[1] (analytic) = -10.378987591397133667715629807883 y[1] (numeric) = -10.378987591397133667715629807881 absolute error = 2e-30 relative error = 1.9269702197714801419539878955653e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.723 y[1] (analytic) = -10.376856845564125050318295796466 y[1] (numeric) = -10.376856845564125050318295796464 absolute error = 2e-30 relative error = 1.9273658967888290856047011882471e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1731.9MB, alloc=4.6MB, time=97.98 x[1] = 3.724 y[1] (analytic) = -10.374725958898213321170169812489 y[1] (numeric) = -10.374725958898213321170169812488 absolute error = 1e-30 relative error = 9.6388088125095798818970086208926e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.725 y[1] (analytic) = -10.372594931402393769234959009403 y[1] (numeric) = -10.372594931402393769234959009401 absolute error = 2e-30 relative error = 1.9281578170426022306144152660530e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.726 y[1] (analytic) = -10.3704637630796602836455876866 y[1] (numeric) = -10.370463763079660283645587686598 absolute error = 2e-30 relative error = 1.9285540605428728343468688191928e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.727 y[1] (analytic) = -10.368332453933005354328469090943 y[1] (numeric) = -10.36833245393300535432846909094 absolute error = 3e-30 relative error = 2.8934257397022547317528597235241e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.728 y[1] (analytic) = -10.366201003965420072627389575801 y[1] (numeric) = -10.366201003965420072627389575799 absolute error = 2e-30 relative error = 1.9293471149507257502829289679834e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.729 y[1] (analytic) = -10.364069413179894131927005424907 y[1] (numeric) = -10.364069413179894131927005424905 absolute error = 2e-30 relative error = 1.9297439261228971847651895038063e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.73 y[1] (analytic) = -10.361937681579415828275952647974 y[1] (numeric) = -10.361937681579415828275952647972 absolute error = 2e-30 relative error = 1.9301409267838315033597461174269e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.731 y[1] (analytic) = -10.359805809166972061009570054784 y[1] (numeric) = -10.359805809166972061009570054782 absolute error = 2e-30 relative error = 1.9305381170661337124814375973003e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1735.7MB, alloc=4.6MB, time=98.35 x[1] = 3.732 y[1] (analytic) = -10.357673795945548333372235914114 y[1] (numeric) = -10.357673795945548333372235914113 absolute error = 1e-30 relative error = 9.6546774855126662921060885793052e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.733 y[1] (analytic) = -10.355541641918128753139318503601 y[1] (numeric) = -10.355541641918128753139318503599 absolute error = 2e-30 relative error = 1.9313330670258841730898495947234e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.734 y[1] (analytic) = -10.353409347087696033238740856322 y[1] (numeric) = -10.35340934708769603323874085632 absolute error = 2e-30 relative error = 1.9317308269691652199666293871567e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.735 y[1] (analytic) = -10.351276911457231492372160009614 y[1] (numeric) = -10.351276911457231492372160009612 absolute error = 2e-30 relative error = 1.9321287770654800402534757496886e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.736 y[1] (analytic) = -10.349144335029715055635761061315 y[1] (numeric) = -10.349144335029715055635761061313 absolute error = 2e-30 relative error = 1.9325269174480572992347222060126e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.737 y[1] (analytic) = -10.347011617808125255140666338347 y[1] (numeric) = -10.347011617808125255140666338345 absolute error = 2e-30 relative error = 1.9329252482502508328429501390136e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.738 y[1] (analytic) = -10.344878759795439230632959982253 y[1] (numeric) = -10.344878759795439230632959982251 absolute error = 2e-30 relative error = 1.9333237696055397944312007807152e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.739 y[1] (analytic) = -10.342745760994632730113328256016 y[1] (numeric) = -10.342745760994632730113328256014 absolute error = 2e-30 relative error = 1.9337224816475288017519052052669e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.74 y[1] (analytic) = -10.340612621408680110456315876177 y[1] (numeric) = -10.340612621408680110456315876175 absolute error = 2e-30 relative error = 1.9341213845099480841428719667607e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=1739.5MB, alloc=4.6MB, time=98.73 TOP MAIN SOLVE Loop x[1] = 3.741 y[1] (analytic) = -10.338479341040554338029198674005 y[1] (numeric) = -10.338479341040554338029198674002 absolute error = 3e-30 relative error = 2.9017807174899804448810089925024e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.742 y[1] (analytic) = -10.336345919893226989310472889139 y[1] (numeric) = -10.336345919893226989310472889136 absolute error = 3e-30 relative error = 2.9023796448474410009726495025821e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.743 y[1] (analytic) = -10.334212357969668251507961398883 y[1] (numeric) = -10.33421235796966825150796139888 absolute error = 3e-30 relative error = 2.9029788590384657184175564356398e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.744 y[1] (analytic) = -10.332078655272846923176537185981 y[1] (numeric) = -10.332078655272846923176537185978 absolute error = 3e-30 relative error = 2.9035783602644058247541362577148e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.745 y[1] (analytic) = -10.329944811805730414835464347461 y[1] (numeric) = -10.329944811805730414835464347458 absolute error = 3e-30 relative error = 2.9041781487268020734704642451076e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.746 y[1] (analytic) = -10.327810827571284749585356946817 y[1] (numeric) = -10.327810827571284749585356946814 absolute error = 3e-30 relative error = 2.9047782246273849666575371954233e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.747 y[1] (analytic) = -10.325676702572474563724756011511 y[1] (numeric) = -10.325676702572474563724756011508 absolute error = 3e-30 relative error = 2.9053785881680749779767057545960e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.748 y[1] (analytic) = -10.323542436812263107366324977495 y[1] (numeric) = -10.323542436812263107366324977492 absolute error = 3e-30 relative error = 2.9059792395509827759418035355844e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1743.3MB, alloc=4.6MB, time=99.10 x[1] = 3.749 y[1] (analytic) = -10.321408030293612245052663882149 y[1] (numeric) = -10.321408030293612245052663882146 absolute error = 3e-30 relative error = 2.9065801789784094475164911777626e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.75 y[1] (analytic) = -10.319273483019482456371742606759 y[1] (numeric) = -10.319273483019482456371742606756 absolute error = 3e-30 relative error = 2.9071814066528467220273344714139e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.751 y[1] (analytic) = -10.317138794992832836571953469346 y[1] (numeric) = -10.317138794992832836571953469344 absolute error = 2e-30 relative error = 1.9385219485179847969287577661332e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.752 y[1] (analytic) = -10.315003966216621097176783468398 y[1] (numeric) = -10.315003966216621097176783468395 absolute error = 3e-30 relative error = 2.9083847275536745546710459259957e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.753 y[1] (analytic) = -10.312868996693803566599106477725 y[1] (numeric) = -10.312868996693803566599106477723 absolute error = 2e-30 relative error = 1.9393245474573358686133069000641e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.754 y[1] (analytic) = -10.31073388642733519075509569243 y[1] (numeric) = -10.310733886427335190755095692428 absolute error = 2e-30 relative error = 1.9397261359181476562545020083104e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.755 y[1] (analytic) = -10.308598635420169533677756625625 y[1] (numeric) = -10.308598635420169533677756625622 absolute error = 3e-30 relative error = 2.9101918758307759099808416464932e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.756 y[1] (analytic) = -10.3064632436752587781300809553 y[1] (numeric) = -10.306463243675258778130080955297 absolute error = 3e-30 relative error = 2.9107948372503073831426276385569e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1747.1MB, alloc=4.6MB, time=99.48 x[1] = 3.757 y[1] (analytic) = -10.304327711195553726217821520432 y[1] (numeric) = -10.30432771119555372621782152043 absolute error = 2e-30 relative error = 1.9409320588930989506208869731080e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.758 y[1] (analytic) = -10.302192037984003800001888765133 y[1] (numeric) = -10.302192037984003800001888765131 absolute error = 2e-30 relative error = 1.9413344195352160036718296803190e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.759 y[1] (analytic) = -10.300056224043557042110368929357 y[1] (numeric) = -10.300056224043557042110368929355 absolute error = 2e-30 relative error = 1.9417369735627011739382976308371e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.76 y[1] (analytic) = -10.297920269377160116350164284402 y[1] (numeric) = -10.2979202693771601163501642844 absolute error = 2e-30 relative error = 1.9421397211118281534266545095767e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.761 y[1] (analytic) = -10.295784173987758308318255711152 y[1] (numeric) = -10.29578417398775830831825571115 absolute error = 2e-30 relative error = 1.9425426623189993850730406637388e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.762 y[1] (analytic) = -10.29364793787829552601258791871 y[1] (numeric) = -10.293647937878295526012587918709 absolute error = 1e-30 relative error = 9.7147289866037310728593204697853e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.763 y[1] (analytic) = -10.291511561051714300442577600809 y[1] (numeric) = -10.291511561051714300442577600808 absolute error = 1e-30 relative error = 9.7167456312686452120966985261447e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.764 y[1] (analytic) = -10.289375043510955786239244827071 y[1] (numeric) = -10.289375043510955786239244827069 absolute error = 2e-30 relative error = 1.9437526492547374761724321503283e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1751.0MB, alloc=4.6MB, time=99.85 x[1] = 3.765 y[1] (analytic) = -10.287238385258959762264967965932 y[1] (numeric) = -10.287238385258959762264967965931 absolute error = 1e-30 relative error = 9.7207818323034524146177913482422e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.766 y[1] (analytic) = -10.285101586298664632222862435751 y[1] (numeric) = -10.285101586298664632222862435749 absolute error = 2e-30 relative error = 1.9445602780086365419914058041218e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.767 y[1] (analytic) = -10.282964646633007425265783580315 y[1] (numeric) = -10.282964646633007425265783580313 absolute error = 2e-30 relative error = 1.9449643840357537978282257319869e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.768 y[1] (analytic) = -10.280827566264923796604953964723 y[1] (numeric) = -10.280827566264923796604953964721 absolute error = 2e-30 relative error = 1.9453686846793502131439562557172e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.769 y[1] (analytic) = -10.278690345197348028118215387283 y[1] (numeric) = -10.278690345197348028118215387281 absolute error = 2e-30 relative error = 1.9457731800768637222475371424317e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.77 y[1] (analytic) = -10.276552983433213028957905902826 y[1] (numeric) = -10.276552983433213028957905902823 absolute error = 3e-30 relative error = 2.9192668055487935769086606992917e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.771 y[1] (analytic) = -10.274415480975450336158362152518 y[1] (numeric) = -10.274415480975450336158362152515 absolute error = 3e-30 relative error = 2.9198741335260668079301667207427e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.772 y[1] (analytic) = -10.272277837826990115243047295006 y[1] (numeric) = -10.272277837826990115243047295003 absolute error = 3e-30 relative error = 2.9204817542538584334325170457766e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1754.8MB, alloc=4.6MB, time=100.22 x[1] = 3.773 y[1] (analytic) = -10.27014005399076116083130483341 y[1] (numeric) = -10.270140053990761160831304833408 absolute error = 2e-30 relative error = 1.9473931119594049940849635975874e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.774 y[1] (analytic) = -10.26800212946969089724473863243 y[1] (numeric) = -10.268002129469690897244738632427 absolute error = 3e-30 relative error = 2.9216978747889491310907316286047e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.775 y[1] (analytic) = -10.265864064266705379113219419518 y[1] (numeric) = -10.265864064266705379113219419515 absolute error = 3e-30 relative error = 2.9223063750107148477402427190409e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.776 y[1] (analytic) = -10.26372585838472929198051806383 y[1] (numeric) = -10.263725858384729291980518063827 absolute error = 3e-30 relative error = 2.9229151688119327121435542821037e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.777 y[1] (analytic) = -10.261587511826685952909565926333 y[1] (numeric) = -10.26158751182668595290956592633 absolute error = 3e-30 relative error = 2.9235242564003276046556988751878e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.778 y[1] (analytic) = -10.259449024595497311087342574215 y[1] (numeric) = -10.259449024595497311087342574212 absolute error = 3e-30 relative error = 2.9241336379838214478875883839070e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.779 y[1] (analytic) = -10.257310396694083948429391152431 y[1] (numeric) = -10.257310396694083948429391152428 absolute error = 3e-30 relative error = 2.9247433137705334400056588169402e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.78 y[1] (analytic) = -10.255171628125365080183961704956 y[1] (numeric) = -10.255171628125365080183961704953 absolute error = 3e-30 relative error = 2.9253532839687802883632868795445e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.781 y[1] (analytic) = -10.253032718892258555535782738024 y[1] (numeric) = -10.253032718892258555535782738022 absolute error = 2e-30 relative error = 1.9506423658580509623096858243702e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1758.6MB, alloc=4.6MB, time=100.60 x[1] = 3.782 y[1] (analytic) = -10.250893668997680858209461317364 y[1] (numeric) = -10.250893668997680858209461317362 absolute error = 2e-30 relative error = 1.9510494056227562221738216131102e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.783 y[1] (analytic) = -10.248754478444547107072511991144 y[1] (numeric) = -10.248754478444547107072511991143 absolute error = 1e-30 relative error = 9.7572832103962153259352545999556e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.784 y[1] (analytic) = -10.246615147235771056738014830094 y[1] (numeric) = -10.246615147235771056738014830092 absolute error = 2e-30 relative error = 1.9518640753669175493960584902180e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.785 y[1] (analytic) = -10.244475675374265098166902875944 y[1] (numeric) = -10.244475675374265098166902875942 absolute error = 2e-30 relative error = 1.9522717056253181877407965415361e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.786 y[1] (analytic) = -10.242336062862940259269879289098 y[1] (numeric) = -10.242336062862940259269879289096 absolute error = 2e-30 relative error = 1.9526795329941161051435797575523e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.787 y[1] (analytic) = -10.240196309704706205508964486129 y[1] (numeric) = -10.240196309704706205508964486126 absolute error = 3e-30 relative error = 2.9296313364196727937329170776641e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.788 y[1] (analytic) = -10.238056415902471240498673557438 y[1] (numeric) = -10.238056415902471240498673557436 absolute error = 2e-30 relative error = 1.9534957796222522808256456128022e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.789 y[1] (analytic) = -10.235916381459142306606824255144 y[1] (numeric) = -10.235916381459142306606824255142 absolute error = 2e-30 relative error = 1.9539041991615972657981587808420e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1762.4MB, alloc=4.6MB, time=100.98 x[1] = 3.79 y[1] (analytic) = -10.233776206377624985554975840958 y[1] (numeric) = -10.233776206377624985554975840955 absolute error = 3e-30 relative error = 2.9314692245570299484446040206806e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.791 y[1] (analytic) = -10.231635890660823499018499083561 y[1] (numeric) = -10.231635890660823499018499083559 absolute error = 2e-30 relative error = 1.9547216313918569293357139104616e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.792 y[1] (analytic) = -10.229495434311640709226277694716 y[1] (numeric) = -10.229495434311640709226277694714 absolute error = 2e-30 relative error = 1.9551306443635782651604539697176e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.793 y[1] (analytic) = -10.227354837332978119560041493038 y[1] (numeric) = -10.227354837332978119560041493036 absolute error = 2e-30 relative error = 1.9555398554271211325739554765544e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.794 y[1] (analytic) = -10.225214099727735875153331584119 y[1] (numeric) = -10.225214099727735875153331584117 absolute error = 2e-30 relative error = 1.9559492647232232344948506204778e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.795 y[1] (analytic) = -10.223073221498812763490097845396 y[1] (numeric) = -10.223073221498812763490097845393 absolute error = 3e-30 relative error = 2.9345383085891344646102380003346e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.796 y[1] (analytic) = -10.220932202649106215002929003876 y[1] (numeric) = -10.220932202649106215002929003874 absolute error = 2e-30 relative error = 1.9567686785767262923688433860747e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.797 y[1] (analytic) = -10.218791043181512303670915594587 y[1] (numeric) = -10.218791043181512303670915594584 absolute error = 3e-30 relative error = 2.9357680251244102068793279944639e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1766.2MB, alloc=4.6MB, time=101.34 x[1] = 3.798 y[1] (analytic) = -10.216649743098925747617146087293 y[1] (numeric) = -10.21664974309892574761714608729 absolute error = 3e-30 relative error = 2.9363833305790089748143718967256e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.799 y[1] (analytic) = -10.214508302404239909705836468807 y[1] (numeric) = -10.214508302404239909705836468805 absolute error = 2e-30 relative error = 1.9579992896273333063621171293269e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.8 y[1] (analytic) = -10.212366721100346798139093567903 y[1] (numeric) = -10.212366721100346798139093567901 absolute error = 2e-30 relative error = 1.9584098912817997537287949356085e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.801 y[1] (analytic) = -10.210224999190137067053312409577 y[1] (numeric) = -10.210224999190137067053312409575 absolute error = 2e-30 relative error = 1.9588206921577513003746280925031e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.802 y[1] (analytic) = -10.208083136676500017115207885148 y[1] (numeric) = -10.208083136676500017115207885146 absolute error = 2e-30 relative error = 1.9592316923970024107923536956737e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.803 y[1] (analytic) = -10.205941133562323596117481024388 y[1] (numeric) = -10.205941133562323596117481024386 absolute error = 2e-30 relative error = 1.9596428921415028665132443805616e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.804 y[1] (analytic) = -10.203798989850494399574120155618 y[1] (numeric) = -10.203798989850494399574120155616 absolute error = 2e-30 relative error = 1.9600542915333379272814364038623e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.805 y[1] (analytic) = -10.201656705543897671315337239428 y[1] (numeric) = -10.201656705543897671315337239426 absolute error = 2e-30 relative error = 1.9604658907147284924588246812196e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1770.0MB, alloc=4.6MB, time=101.72 x[1] = 3.806 y[1] (analytic) = -10.199514280645417304082139661401 y[1] (numeric) = -10.199514280645417304082139661398 absolute error = 3e-30 relative error = 2.9413165347420468939913643626961e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.807 y[1] (analytic) = -10.197371715157935840120537768961 y[1] (numeric) = -10.197371715157935840120537768958 absolute error = 3e-30 relative error = 2.9419345335236083524359714418753e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.808 y[1] (analytic) = -10.19522900908433447177538843719 y[1] (numeric) = -10.195229009084334471775388437187 absolute error = 3e-30 relative error = 2.9425528326307202974560387555805e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.809 y[1] (analytic) = -10.193086162427493042083874948171 y[1] (numeric) = -10.193086162427493042083874948167 absolute error = 4e-30 relative error = 3.9242285763700404584154929483578e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.81 y[1] (analytic) = -10.190943175190290045368623468168 y[1] (numeric) = -10.190943175190290045368623468164 absolute error = 4e-30 relative error = 3.9250537769045210419121537093884e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.811 y[1] (analytic) = -10.188800047375602627830456406675 y[1] (numeric) = -10.188800047375602627830456406671 absolute error = 4e-30 relative error = 3.9258793787304784261611717441398e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.812 y[1] (analytic) = -10.18665677898630658814078294108 y[1] (numeric) = -10.186656778986306588140782941077 absolute error = 3e-30 relative error = 2.9450290366006968315797347796225e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.813 y[1] (analytic) = -10.184513370025276378033626990444 y[1] (numeric) = -10.184513370025276378033626990441 absolute error = 3e-30 relative error = 2.9456488405518725993239965508690e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.814 y[1] (analytic) = -10.182369820495385102897292921606 y[1] (numeric) = -10.182369820495385102897292921602 memory used=1773.8MB, alloc=4.6MB, time=102.09 absolute error = 4e-30 relative error = 3.9283585948220794118914254047418e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.815 y[1] (analytic) = -10.180226130399504522365669270567 y[1] (numeric) = -10.180226130399504522365669270564 absolute error = 3e-30 relative error = 2.9468893535101370460777236975690e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.816 y[1] (analytic) = -10.178082299740505050909170761841 y[1] (numeric) = -10.178082299740505050909170761837 absolute error = 4e-30 relative error = 3.9300134172642540561535116935014e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.817 y[1] (analytic) = -10.175938328521255758425318908159 y[1] (numeric) = -10.175938328521255758425318908155 absolute error = 4e-30 relative error = 3.9308414328620158936623463594531e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.818 y[1] (analytic) = -10.173794216744624370828961472704 y[1] (numeric) = -10.1737942167446243708289614727 absolute error = 4e-30 relative error = 3.9316698517614662563295669836558e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.819 y[1] (analytic) = -10.171649964413477270642131075717 y[1] (numeric) = -10.171649964413477270642131075714 absolute error = 3e-30 relative error = 2.9493740056881592554599247844077e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.82 y[1] (analytic) = -10.169505571530679497583543227111 y[1] (numeric) = -10.169505571530679497583543227108 absolute error = 3e-30 relative error = 2.9499959254641031401625071307720e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.821 y[1] (analytic) = -10.167361038099094749157734066399 y[1] (numeric) = -10.167361038099094749157734066397 absolute error = 2e-30 relative error = 1.9670787655770341715243847551061e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.822 y[1] (analytic) = -10.165216364121585381243838091044 y[1] (numeric) = -10.165216364121585381243838091042 absolute error = 2e-30 relative error = 1.9674937830728874309959745882618e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1777.7MB, alloc=4.6MB, time=102.46 x[1] = 3.823 y[1] (analytic) = -10.163071549601012408684006154 y[1] (numeric) = -10.163071549601012408684006153998 absolute error = 2e-30 relative error = 1.9679090029416521497393914184538e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.824 y[1] (analytic) = -10.160926594540235505871464011008 y[1] (numeric) = -10.160926594540235505871464011006 absolute error = 2e-30 relative error = 1.9683244253281573562722742588148e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.825 y[1] (analytic) = -10.158781498942113007338211697902 y[1] (numeric) = -10.1587814989421130073382116979 absolute error = 2e-30 relative error = 1.9687400503773709958449775303144e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.826 y[1] (analytic) = -10.156636262809501908342364017939 y[1] (numeric) = -10.156636262809501908342364017937 absolute error = 2e-30 relative error = 1.9691558782344000967774018854593e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.827 y[1] (analytic) = -10.154490886145257865455132418883 y[1] (numeric) = -10.154490886145257865455132418881 absolute error = 2e-30 relative error = 1.9695719090444909370350295107200e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.828 y[1] (analytic) = -10.152345368952235197147448539327 y[1] (numeric) = -10.152345368952235197147448539325 absolute error = 2e-30 relative error = 1.9699881429530292110445652239856e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.829 y[1] (analytic) = -10.15019971123328688437622970345 y[1] (numeric) = -10.150199711233286884376229703447 absolute error = 3e-30 relative error = 2.9556068701583102951243781796631e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.83 y[1] (analytic) = -10.148053912991264571170286643158 y[1] (numeric) = -10.148053912991264571170286643155 absolute error = 3e-30 relative error = 2.9562318309715333843598969295313e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1781.5MB, alloc=4.6MB, time=102.83 x[1] = 3.831 y[1] (analytic) = -10.145907974229018565215873726291 y[1] (numeric) = -10.145907974229018565215873726288 absolute error = 3e-30 relative error = 2.9568570970879205049328738379771e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.832 y[1] (analytic) = -10.143761894949397838441881969301 y[1] (numeric) = -10.143761894949397838441881969298 absolute error = 3e-30 relative error = 2.9574826687263892066946260684564e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.833 y[1] (analytic) = -10.141615675155250027604675112553 y[1] (numeric) = -10.14161567515525002760467511255 absolute error = 3e-30 relative error = 2.9581085461060674207178934208635e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.834 y[1] (analytic) = -10.139469314849421434872569036142 y[1] (numeric) = -10.139469314849421434872569036139 absolute error = 3e-30 relative error = 2.9587347294462937116894584309956e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.835 y[1] (analytic) = -10.137322814034757028409954793841 y[1] (numeric) = -10.137322814034757028409954793838 absolute error = 3e-30 relative error = 2.9593612189666175306664214535685e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.836 y[1] (analytic) = -10.135176172714100442961065542539 y[1] (numeric) = -10.135176172714100442961065542536 absolute error = 3e-30 relative error = 2.9599880148867994681967420104515e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.837 y[1] (analytic) = -10.133029390890293980433387644272 y[1] (numeric) = -10.133029390890293980433387644268 absolute error = 4e-30 relative error = 3.9474868232357486770728784807060e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.838 y[1] (analytic) = -10.130882468566178610480716217672 y[1] (numeric) = -10.130882468566178610480716217668 absolute error = 4e-30 relative error = 3.9483233690757830397888032331818e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1785.3MB, alloc=4.6MB, time=103.20 x[1] = 3.839 y[1] (analytic) = -10.128735405744593971085855415416 y[1] (numeric) = -10.128735405744593971085855415412 absolute error = 4e-30 relative error = 3.9491603243296964209376191744363e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.84 y[1] (analytic) = -10.126588202428378369142963703968 y[1] (numeric) = -10.126588202428378369142963703965 absolute error = 3e-30 relative error = 2.9624982669687243024130904206464e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.841 y[1] (analytic) = -10.124440858620368781039544421683 y[1] (numeric) = -10.124440858620368781039544421681 absolute error = 2e-30 relative error = 1.9754177321280088917159089039828e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.842 y[1] (analytic) = -10.122293374323400853238081891039 y[1] (numeric) = -10.122293374323400853238081891037 absolute error = 2e-30 relative error = 1.9758368247587814564574966240371e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.843 y[1] (analytic) = -10.120145749540308902857323360531 y[1] (numeric) = -10.120145749540308902857323360528 absolute error = 3e-30 relative error = 2.9643841840284465288366459383768e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.844 y[1] (analytic) = -10.117997984273925918253207051492 y[1] (numeric) = -10.11799798427392591825320705149 absolute error = 2e-30 relative error = 1.9766756260561968218359968551423e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.845 y[1] (analytic) = -10.115850078527083559599436584849 y[1] (numeric) = -10.115850078527083559599436584847 absolute error = 2e-30 relative error = 1.9770953350182603954909200766045e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.846 y[1] (analytic) = -10.113702032302612159467702062535 y[1] (numeric) = -10.113702032302612159467702062533 absolute error = 2e-30 relative error = 1.9775152497197457319654200030055e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1789.1MB, alloc=4.6MB, time=103.57 x[1] = 3.847 y[1] (analytic) = -10.111553845603340723407548078073 y[1] (numeric) = -10.111553845603340723407548078071 absolute error = 2e-30 relative error = 1.9779353703087194550586464005581e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.848 y[1] (analytic) = -10.109405518432096930525888930525 y[1] (numeric) = -10.109405518432096930525888930523 absolute error = 2e-30 relative error = 1.9783556969333909922859101966915e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.849 y[1] (analytic) = -10.107257050791707134066171315791 y[1] (numeric) = -10.107257050791707134066171315789 absolute error = 2e-30 relative error = 1.9787762297421127468201284275571e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.85 y[1] (analytic) = -10.105108442684996361987184768953 y[1] (numeric) = -10.105108442684996361987184768951 absolute error = 2e-30 relative error = 1.9791969688833802696819016659741e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.851 y[1] (analytic) = -10.10295969411478831754152013111 y[1] (numeric) = -10.102959694114788317541520131108 absolute error = 2e-30 relative error = 1.9796179145058324321786433780278e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.852 y[1] (analytic) = -10.100810805083905379853676313895 y[1] (numeric) = -10.100810805083905379853676313893 absolute error = 2e-30 relative error = 1.9800390667582515985931814655313e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.853 y[1] (analytic) = -10.098661775595168604497815634603 y[1] (numeric) = -10.098661775595168604497815634601 absolute error = 2e-30 relative error = 1.9804604257895637991222530623110e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.854 y[1] (analytic) = -10.096512605651397724075167994597 y[1] (numeric) = -10.096512605651397724075167994595 absolute error = 2e-30 relative error = 1.9808819917488389030653144647906e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.855 y[1] (analytic) = -10.094363295255411148791084173408 y[1] (numeric) = -10.094363295255411148791084173406 memory used=1792.9MB, alloc=4.6MB, time=103.95 absolute error = 2e-30 relative error = 1.9813037647852907922640888916212e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.856 y[1] (analytic) = -10.092213844410025967031738510687 y[1] (numeric) = -10.092213844410025967031738510686 absolute error = 1e-30 relative error = 9.9086287252413876739663779157502e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.857 y[1] (analytic) = -10.09006425311805794594048124791 y[1] (numeric) = -10.090064253118057945940481247909 absolute error = 1e-30 relative error = 9.9107396634365077945142228466861e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.858 y[1] (analytic) = -10.087914521382321531993840801465 y[1] (numeric) = -10.087914521382321531993840801463 absolute error = 2e-30 relative error = 1.9825703278520098272123422543263e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.859 y[1] (analytic) = -10.085764649205629851577176238519 y[1] (numeric) = -10.085764649205629851577176238517 absolute error = 2e-30 relative error = 1.9829929306921940111576337872442e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.86 y[1] (analytic) = -10.083614636590794711559980226801 y[1] (numeric) = -10.0836146365907947115599802268 absolute error = 1e-30 relative error = 9.9170787067889533284525450598441e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.861 y[1] (analytic) = -10.081464483540626599870832729152 y[1] (numeric) = -10.081464483540626599870832729151 absolute error = 1e-30 relative error = 9.9191937999944070211578980677834e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.862 y[1] (analytic) = -10.079314190057934686072005713475 y[1] (numeric) = -10.079314190057934686072005713474 absolute error = 1e-30 relative error = 9.9213099338284653693844795288171e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.863 y[1] (analytic) = -10.07716375614552682193371914845 y[1] (numeric) = -10.077163756145526821933719148449 absolute error = 1e-30 relative error = 9.9234271090429896542935626631603e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1796.7MB, alloc=4.6MB, time=104.32 x[1] = 3.864 y[1] (analytic) = -10.075013181806209542008048555111 y[1] (numeric) = -10.07501318180620954200804855511 absolute error = 1e-30 relative error = 9.9255453263905690813041659373762e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.865 y[1] (analytic) = -10.072862467042788064202484384141 y[1] (numeric) = -10.072862467042788064202484384141 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.866 y[1] (analytic) = -10.070711611858066290353143488489 y[1] (numeric) = -10.070711611858066290353143488489 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.867 y[1] (analytic) = -10.06856061625484680679763296064 y[1] (numeric) = -10.06856061625484680679763296064 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.868 y[1] (analytic) = -10.066409480235930884947566603639 y[1] (numeric) = -10.066409480235930884947566603639 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.869 y[1] (analytic) = -10.0642582038041184818607343047 y[1] (numeric) = -10.0642582038041184818607343047 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.87 y[1] (analytic) = -10.062106786962208240812924579982 y[1] (numeric) = -10.062106786962208240812924579981 absolute error = 1e-30 relative error = 9.9382765575071395785610903317263e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.871 y[1] (analytic) = -10.059955229712997491869400558859 y[1] (numeric) = -10.059955229712997491869400558858 absolute error = 1e-30 relative error = 9.9404020909199334808491663529986e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1800.5MB, alloc=4.6MB, time=104.69 x[1] = 3.872 y[1] (analytic) = -10.057803532059282252456029675771 y[1] (numeric) = -10.05780353205928225245602967577 absolute error = 1e-30 relative error = 9.9425286725128072928423138100694e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.873 y[1] (analytic) = -10.055651694003857227930067337462 y[1] (numeric) = -10.055651694003857227930067337461 absolute error = 1e-30 relative error = 9.9446563030449412853293857197231e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.874 y[1] (analytic) = -10.053499715549515812150594833196 y[1] (numeric) = -10.053499715549515812150594833194 absolute error = 2e-30 relative error = 1.9893569966552505019219092752811e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.875 y[1] (analytic) = -10.05134759669905008804861175525 y[1] (numeric) = -10.051347596699050088048611755248 absolute error = 2e-30 relative error = 1.9897829427934791380427942969041e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.876 y[1] (analytic) = -10.049195337455250828196783196776 y[1] (numeric) = -10.049195337455250828196783196774 absolute error = 2e-30 relative error = 1.9902090991759528237853153446463e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.877 y[1] (analytic) = -10.047042937820907495378841993823 y[1] (numeric) = -10.047042937820907495378841993821 absolute error = 2e-30 relative error = 1.9906354659550981100211960126439e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.878 y[1] (analytic) = -10.044890397798808243158646278103 y[1] (numeric) = -10.044890397798808243158646278101 absolute error = 2e-30 relative error = 1.9910620432834896194621814870092e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.879 y[1] (analytic) = -10.042737717391739916448892606803 y[1] (numeric) = -10.042737717391739916448892606801 absolute error = 2e-30 relative error = 1.9914888313138502262462511276820e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1804.4MB, alloc=4.6MB, time=105.06 x[1] = 3.88 y[1] (analytic) = -10.04058489660248805207948493552 y[1] (numeric) = -10.040584896602488052079484935517 absolute error = 3e-30 relative error = 2.9878737452985768536781092041541e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.881 y[1] (analytic) = -10.03843193543383687936555970011 y[1] (numeric) = -10.038431935433836879365559700108 absolute error = 2e-30 relative error = 1.9923430400921125648754768080305e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.882 y[1] (analytic) = -10.036278833888569320675167273046 y[1] (numeric) = -10.036278833888569320675167273045 absolute error = 1e-30 relative error = 9.9638523057310146103419736718752e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.883 y[1] (analytic) = -10.034125591969466991996610059566 y[1] (numeric) = -10.034125591969466991996610059564 absolute error = 2e-30 relative error = 1.9931980935146399883073761783637e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.884 y[1] (analytic) = -10.03197220967931020350543749869 y[1] (numeric) = -10.031972209679310203505437498689 absolute error = 1e-30 relative error = 9.9681296867544529891273186234672e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.885 y[1] (analytic) = -10.029818687020877960131098233935 y[1] (numeric) = -10.029818687020877960131098233933 absolute error = 2e-30 relative error = 1.9940539928085709193078741655483e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.886 y[1] (analytic) = -10.027665023996947962123249718255 y[1] (numeric) = -10.027665023996947962123249718254 absolute error = 1e-30 relative error = 9.9724113002072331865930072975368e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.887 y[1] (analytic) = -10.025511220610296605617725517571 y[1] (numeric) = -10.02551122061029660561772551757 absolute error = 1e-30 relative error = 9.9745536960171656699586223619517e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1808.2MB, alloc=4.6MB, time=105.44 x[1] = 3.888 y[1] (analytic) = -10.023357276863698983202160576915 y[1] (numeric) = -10.023357276863698983202160576914 absolute error = 1e-30 relative error = 9.9766971522429783549393504202917e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.889 y[1] (analytic) = -10.021203192759928884481274713039 y[1] (numeric) = -10.021203192759928884481274713039 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.89 y[1] (analytic) = -10.019048968301758796641814597053 y[1] (numeric) = -10.019048968301758796641814597052 absolute error = 1e-30 relative error = 9.9809872490273020191147773080889e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.891 y[1] (analytic) = -10.016894603491959905017154490404 y[1] (numeric) = -10.016894603491959905017154490403 absolute error = 1e-30 relative error = 9.9831338911302208097263375641490e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.892 y[1] (analytic) = -10.014740098333302093651555997298 y[1] (numeric) = -10.014740098333302093651555997297 absolute error = 1e-30 relative error = 9.9852815967378372536679809862795e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.893 y[1] (analytic) = -10.012585452828553945864087096374 y[1] (numeric) = -10.012585452828553945864087096373 absolute error = 1e-30 relative error = 9.9874303666242383407017220115763e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.894 y[1] (analytic) = -10.010430666980482744812200714227 y[1] (numeric) = -10.010430666980482744812200714226 absolute error = 1e-30 relative error = 9.9895802015642659448842389354476e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.895 y[1] (analytic) = -10.008275740791854474054973103107 y[1] (numeric) = -10.008275740791854474054973103107 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.896 y[1] (analytic) = -10.006120674265433818116002284901 y[1] (numeric) = -10.0061206742654338181160022849 absolute error = 1e-30 relative error = 9.9938830697083481384968193854511e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=1812.0MB, alloc=4.6MB, time=105.81 TOP MAIN SOLVE Loop x[1] = 3.897 y[1] (analytic) = -10.00396546740398416304596682322 y[1] (numeric) = -10.003965467403984163045966823219 absolute error = 1e-30 relative error = 9.9960361044658691763714870942388e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.898 y[1] (analytic) = -10.001810120210267596984845185218 y[1] (numeric) = -10.001810120210267596984845185217 absolute error = 1e-30 relative error = 9.9981902073839514732655178208982e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.899 y[1] (analytic) = -9.999654632687044910723795954474 y[1] (numeric) = -9.9996546326870449107237959544727 absolute error = 1.3e-30 relative error = 1.3000448993013592680070244370101e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.9 y[1] (analytic) = -9.997499004837075598266699156056 y[1] (numeric) = -9.9974990048370755982666991560549 absolute error = 1.1e-30 relative error = 1.1002751782898788770787058895257e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.901 y[1] (analytic) = -9.995343236663117857391358954636 y[1] (numeric) = -9.995343236663117857391358954635 absolute error = 1.0e-30 relative error = 1.0004658932891670034940814721994e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.902 y[1] (analytic) = -9.993187328167928590210367986264 y[1] (numeric) = -9.9931873281679285902103679862629 absolute error = 1.1e-30 relative error = 1.1007499047870498020463920933748e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.903 y[1] (analytic) = -9.991031279354263403731633584185 y[1] (numeric) = -9.9910312793542634037316335841844 absolute error = 6e-31 relative error = 6.0053860629968818950186583748555e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.904 y[1] (analytic) = -9.988875090224876610418566158831 y[1] (numeric) = -9.9888750902248766104185661588298 absolute error = 1.2e-30 relative error = 1.2013364759904958952997651406838e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1815.8MB, alloc=4.6MB, time=106.18 x[1] = 3.905 y[1] (analytic) = -9.986718760782521228749929991863 y[1] (numeric) = -9.9867187607825212287499299918623 absolute error = 7e-31 relative error = 7.0093092312649712314179865323291e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.906 y[1] (analytic) = -9.984562291029948983779356703931 y[1] (numeric) = -9.9845622910299489837793567039295 absolute error = 1.5e-30 relative error = 1.5023192367156525425244790410403e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.907 y[1] (analytic) = -9.98240568096991030769452165552 y[1] (numeric) = -9.9824056809699103076945216555189 absolute error = 1.1e-30 relative error = 1.1019387862557012622594802276268e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.908 y[1] (analytic) = -9.980248930605154340375983540077 y[1] (numeric) = -9.9802489306051543403759835400759 absolute error = 1.1e-30 relative error = 1.1021769172778551982116827382342e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.909 y[1] (analytic) = -9.9780920399384289299556874283 y[1] (numeric) = -9.9780920399384289299556874282983 absolute error = 1.7e-30 relative error = 1.7037325304232111127096259407683e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.91 y[1] (analytic) = -9.975935008972480633375131522282 y[1] (numeric) = -9.9759350089724806333751315222811 absolute error = 9e-31 relative error = 9.0217107387982053929000792741748e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.911 y[1] (analytic) = -9.973777837710054716943197877943 y[1] (numeric) = -9.9737778377100547169431978779413 absolute error = 1.7e-30 relative error = 1.7044694875520850646031776755895e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.912 y[1] (analytic) = -9.971620526153895156893647353913 y[1] (numeric) = -9.9716205261538951568936473539119 absolute error = 1.1e-30 relative error = 1.1031306266768613231455190756357e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1819.6MB, alloc=4.6MB, time=106.56 x[1] = 3.913 y[1] (analytic) = -9.969463074306744639942279044853 y[1] (numeric) = -9.9694630743067446399422790448518 absolute error = 1.2e-30 relative error = 1.2036756554047876444820835361503e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.914 y[1] (analytic) = -9.967305482171344563843754456879 y[1] (numeric) = -9.9673054821713445638437544568776 absolute error = 1.4e-30 relative error = 1.4045922466249269868744786096985e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.915 y[1] (analytic) = -9.965147749750435037948086682583 y[1] (numeric) = -9.9651477497504350379480866825815 absolute error = 1.5e-30 relative error = 1.5052461214512004291335026657929e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.916 y[1] (analytic) = -9.96298987704675488375679483286 y[1] (numeric) = -9.962989877046754883756794832859 absolute error = 1.0e-30 relative error = 1.0037147606702392550308002102077e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.917 y[1] (analytic) = -9.960831864063041635478723982532 y[1] (numeric) = -9.9608318640630416354787239825303 absolute error = 1.7e-30 relative error = 1.7066847660919826767089919753632e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.918 y[1] (analytic) = -9.958673710802031540585530886498 y[1] (numeric) = -9.9586737108020315405855308864973 absolute error = 7e-31 relative error = 7.0290484488985713985883309463173e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.919 y[1] (analytic) = -9.956515417266459560366835722941 y[1] (numeric) = -9.9565154172664595603668357229397 absolute error = 1.3e-30 relative error = 1.3056776849313735862105980754032e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.92 y[1] (analytic) = -9.954356983459059370485040119814 y[1] (numeric) = -9.9543569834590593704850401198132 absolute error = 8e-31 relative error = 8.0366818402167289336042445032728e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1823.4MB, alloc=4.6MB, time=106.92 x[1] = 3.921 y[1] (analytic) = -9.952198409382563361529811720674 y[1] (numeric) = -9.9521984093825633615298117206732 absolute error = 8e-31 relative error = 8.0384249498662495093524073785415e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.922 y[1] (analytic) = -9.95003969503970263957223554561 y[1] (numeric) = -9.9500396950397026395722355456086 absolute error = 1.4e-30 relative error = 1.4070295626035828807222130101597e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.923 y[1] (analytic) = -9.947880840433207026718632402832 y[1] (numeric) = -9.9478808404332070267186324028307 absolute error = 1.3e-30 relative error = 1.3068109890461736066545075176108e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.924 y[1] (analytic) = -9.945721845565805061664044606225 y[1] (numeric) = -9.9457218455658050616640446062244 absolute error = 6e-31 relative error = 6.0327446244387344974824206144182e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.925 y[1] (analytic) = -9.94356271044022400024538925393 y[1] (numeric) = -9.9435627104402240002453892539293 absolute error = 7e-31 relative error = 7.0397303299051594912222720717987e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.926 y[1] (analytic) = -9.941403435059189815994279322783 y[1] (numeric) = -9.9414034350591898159942793227814 absolute error = 1.6e-30 relative error = 1.6094307111181770576996378559403e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.927 y[1] (analytic) = -9.939244019425427200689512833208 y[1] (numeric) = -9.939244019425427200689512833207 absolute error = 1.0e-30 relative error = 1.0061127365879970629278604103843e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.928 y[1] (analytic) = -9.937084463541659564909230338924 y[1] (numeric) = -9.9370844635416595649092303389233 absolute error = 7e-31 relative error = 7.0443197153877685469243000028658e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1827.3MB, alloc=4.6MB, time=107.30 x[1] = 3.929 y[1] (analytic) = -9.934924767410609038582740995564 y[1] (numeric) = -9.934924767410609038582740995563 absolute error = 1.0e-30 relative error = 1.0065501485026697244679803228933e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.93 y[1] (analytic) = -9.932764931034996471542017462104 y[1] (numeric) = -9.932764931034996471542017462103 absolute error = 1.0e-30 relative error = 1.0067690184386551890600487170734e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.931 y[1] (analytic) = -9.930604954417541434072859888741 y[1] (numeric) = -9.9306049544175414340728598887393 absolute error = 1.7e-30 relative error = 1.7118795962614242300889473617424e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.932 y[1] (analytic) = -9.928444837560962217465729244617 y[1] (numeric) = -9.9284448375609622174657292446156 absolute error = 1.4e-30 relative error = 1.4100899213374954495806947729602e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.933 y[1] (analytic) = -9.926284580467975834566250238576 y[1] (numeric) = -9.9262845804679758345662502385751 absolute error = 9e-31 relative error = 9.0668365661300574551016440676417e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.934 y[1] (analytic) = -9.92412418314129802032538408587 y[1] (numeric) = -9.9241241831412980203253840858696 absolute error = 4e-31 relative error = 4.0305823729967413175745799335302e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.935 y[1] (analytic) = -9.921963645583643232349271373525 y[1] (numeric) = -9.9219636455836432323492713735239 absolute error = 1.1e-30 relative error = 1.1086515122332866648848980736702e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.936 y[1] (analytic) = -9.919802967797724651448745276819 y[1] (numeric) = -9.9198029677977246514487452768185 absolute error = 5e-31 relative error = 5.0404226941112721158734422087685e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.937 y[1] (analytic) = -9.917642149786254182188515379118 y[1] (numeric) = -9.9176421497862541821885153791171 absolute error = 9e-31 relative error = 9.0747375878993261727183976664915e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=1831.1MB, alloc=4.6MB, time=107.67 TOP MAIN SOLVE Loop x[1] = 3.938 y[1] (analytic) = -9.915481191551942453436022347033 y[1] (numeric) = -9.9154811915519424534360223470319 absolute error = 1.1e-30 relative error = 1.1093763164385884733529992118890e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.939 y[1] (analytic) = -9.913320093097498818909963712684 y[1] (numeric) = -9.9133200930974988189099637126834 absolute error = 6e-31 relative error = 6.0524626902521921861444920983082e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.94 y[1] (analytic) = -9.911158854425631357728491014579 y[1] (numeric) = -9.9111588544256313577284910145779 absolute error = 1.1e-30 relative error = 1.1098601244886886491956904508881e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.941 y[1] (analytic) = -9.908997475539046874957078548392 y[1] (numeric) = -9.9089974755390468749570785483914 absolute error = 6e-31 relative error = 6.0551029655738221558951494630366e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.942 y[1] (analytic) = -9.906835956440450902156063978715 y[1] (numeric) = -9.9068359564404509021560639787139 absolute error = 1.1e-30 relative error = 1.1103444175684448771120874144400e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.943 y[1] (analytic) = -9.904674297132547697927861062577 y[1] (numeric) = -9.9046742971325476979278610625754 absolute error = 1.6e-30 relative error = 1.6153989035895990345551094976754e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.944 y[1] (analytic) = -9.902512497618040248463844735341 y[1] (numeric) = -9.9025124976180402484638447353405 absolute error = 5e-31 relative error = 5.0492236199678664822961996463481e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.945 y[1] (analytic) = -9.900350557899630268090908809327 y[1] (numeric) = -9.9003505578996302680909088093257 absolute error = 1.3e-30 relative error = 1.3130848169438925004023636889130e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1834.9MB, alloc=4.6MB, time=108.04 x[1] = 3.946 y[1] (analytic) = -9.898188477980018199817696535261 y[1] (numeric) = -9.8981884779800181998176965352605 absolute error = 5e-31 relative error = 5.0514293712665082929260084949934e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.947 y[1] (analytic) = -9.896026257861903215880504276481 y[1] (numeric) = -9.8960262578619032158805042764804 absolute error = 6e-31 relative error = 6.0630396925566935256540358533427e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.948 y[1] (analytic) = -9.893863897547983218288858545508 y[1] (numeric) = -9.8938638975479832182888585455074 absolute error = 6e-31 relative error = 6.0643648044188200598608750769841e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.949 y[1] (analytic) = -9.891701397040954839370766652443 y[1] (numeric) = -9.891701397040954839370766652442 absolute error = 1.0e-30 relative error = 1.0109484302661463335543833020616e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.95 y[1] (analytic) = -9.889538756343513442317641214359 y[1] (numeric) = -9.8895387563435134423176412143579 absolute error = 1.1e-30 relative error = 1.1122864545067074967605411824705e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.951 y[1] (analytic) = -9.88737597545835312172889877466 y[1] (numeric) = -9.8873759754583531217288987746589 absolute error = 1.1e-30 relative error = 1.1125297578754274601620478902783e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.952 y[1] (analytic) = -9.885213054388166704156232781128 y[1] (numeric) = -9.8852130543881667041562327811271 absolute error = 9e-31 relative error = 9.1045078649112071215772216875093e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.953 y[1] (analytic) = -9.88304999313564574864756117116 y[1] (numeric) = -9.8830499931356457486475611711591 absolute error = 9e-31 relative error = 9.1065005299487754921504104748426e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1838.7MB, alloc=4.6MB, time=108.41 x[1] = 3.954 y[1] (analytic) = -9.880886791703480547290648812457 y[1] (numeric) = -9.8808867917034805472906488124561 absolute error = 9e-31 relative error = 9.1084941966513369313580286425244e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.955 y[1] (analytic) = -9.878723450094360125756405047205 y[1] (numeric) = -9.8787234500943601257564050472039 absolute error = 1.1e-30 relative error = 1.1135041947039148670729773351632e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.956 y[1] (analytic) = -9.876559968310972243841856587548 y[1] (numeric) = -9.8765599683109722438418565875475 absolute error = 5e-31 relative error = 5.0624914100076778561609993179893e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.957 y[1] (analytic) = -9.874396346356003396012796009936 y[1] (numeric) = -9.874396346356003396012796009935 absolute error = 1.0e-30 relative error = 1.0127201349063073341580062265724e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.958 y[1] (analytic) = -9.872232584232138811946106095677 y[1] (numeric) = -9.8722325842321388119461060956759 absolute error = 1.1e-30 relative error = 1.1142363093804256047411224655475e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.959 y[1] (analytic) = -9.870068681942062457071760264829 y[1] (numeric) = -9.8700686819420624570717602648285 absolute error = 5e-31 relative error = 5.0658208783772981261416269679205e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.96 y[1] (analytic) = -9.867904639488457033114499350304 y[1] (numeric) = -9.8679046394884570331144993503028 absolute error = 1.2e-30 relative error = 1.2160636364461329857874696392409e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.961 y[1] (analytic) = -9.865740456874003978635184958835 y[1] (numeric) = -9.8657404568740039786351849588347 absolute error = 3e-31 relative error = 3.0408259908253870636470079535991e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1842.5MB, alloc=4.6MB, time=108.78 x[1] = 3.962 y[1] (analytic) = -9.86357613410138346957182966526 y[1] (numeric) = -9.8635761341013834695718296652593 absolute error = 7e-31 relative error = 7.0968175282784814783957089247385e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.963 y[1] (analytic) = -9.861411671173274419780304286283 y[1] (numeric) = -9.8614116711732744197803042862822 absolute error = 8e-31 relative error = 8.1124287949416774335520433971909e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.964 y[1] (analytic) = -9.85924706809235448157472247972 y[1] (numeric) = -9.8592470680923544815747224797192 absolute error = 8e-31 relative error = 8.1142098831162607348158108103699e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.965 y[1] (analytic) = -9.857082324861300046267502914947 y[1] (numeric) = -9.8570823248613000462675029149464 absolute error = 6e-31 relative error = 6.0869939017014617226031927911983e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.966 y[1] (analytic) = -9.854917441482786244709109260076 y[1] (numeric) = -9.8549174414827862447091092600753 absolute error = 7e-31 relative error = 7.1030529089310859666822292924343e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.967 y[1] (analytic) = -9.85275241795948694782746823114 y[1] (numeric) = -9.8527524179594869478274682311391 absolute error = 9e-31 relative error = 9.1345033531898158989056965663994e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.968 y[1] (analytic) = -9.85058725429407476716706594835 y[1] (numeric) = -9.8505872542940747671670659483493 absolute error = 7e-31 relative error = 7.1061753165513611264273977989589e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.969 y[1] (analytic) = -9.848421950489221055427722844256 y[1] (numeric) = -9.8484219504892210554277228442552 absolute error = 8e-31 relative error = 8.1231288019727865492322391332611e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1846.3MB, alloc=4.6MB, time=109.16 x[1] = 3.97 y[1] (analytic) = -9.846256506547595907003047368411 y[1] (numeric) = -9.8462565065475959070030473684102 absolute error = 8e-31 relative error = 8.1249152860075641873223979840322e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.971 y[1] (analytic) = -9.844090922471868158518568732925 y[1] (numeric) = -9.8440909224718681585185687329242 absolute error = 8e-31 relative error = 8.1267026716888411705267520547585e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.972 y[1] (analytic) = -9.841925198264705389369548943054 y[1] (numeric) = -9.8419251982647053893695489430529 absolute error = 1.1e-30 relative error = 1.1176675069568180015530841914874e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.973 y[1] (analytic) = -9.839759333928773922258474356751 y[1] (numeric) = -9.8397593339287739222584743567504 absolute error = 6e-31 relative error = 6.0977101130016637838384293576347e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.974 y[1] (analytic) = -9.837593329466738823732227016885 y[1] (numeric) = -9.8375933294667388237322270168843 absolute error = 7e-31 relative error = 7.1155614646447733041676880695332e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.975 y[1] (analytic) = -9.835427184881263904718935999589 y[1] (numeric) = -9.8354271848812639047189359995877 absolute error = 1.3e-30 relative error = 1.3217524521947787390489210600191e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.976 y[1] (analytic) = -9.833260900175011721064509021997 y[1] (numeric) = -9.8332609001750117210645090219957 absolute error = 1.3e-30 relative error = 1.3220436365894275080037896664967e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.977 y[1] (analytic) = -9.831094475350643574068844552392 y[1] (numeric) = -9.8310944753506435740688445523904 absolute error = 1.6e-30 relative error = 1.6274891915764375128850771715707e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.978 y[1] (analytic) = -9.828927910410819511021724665554 y[1] (numeric) = -9.8289279104108195110217246655525 absolute error = 1.5e-30 relative error = 1.5261074388501690911481064019727e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1850.1MB, alloc=4.6MB, time=109.52 x[1] = 3.979 y[1] (analytic) = -9.826761205358198325738388885894 y[1] (numeric) = -9.826761205358198325738388885893 absolute error = 1.0e-30 relative error = 1.0176292871090975994806593035597e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.98 y[1] (analytic) = -9.824594360195437559094789260715 y[1] (numeric) = -9.8245943601954375590947892607135 absolute error = 1.5e-30 relative error = 1.5267805926698443077191138028762e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.981 y[1] (analytic) = -9.822427374925193499562526905722 y[1] (numeric) = -9.8224273749251934995625269057211 absolute error = 9e-31 relative error = 9.1627045499723463073124470961507e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.982 y[1] (analytic) = -9.820260249550121183743470264699 y[1] (numeric) = -9.8202602495501211837434702646976 absolute error = 1.4e-30 relative error = 1.4256241325825716377723278089301e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.983 y[1] (analytic) = -9.818092984072874396904055325001 y[1] (numeric) = -9.8180929840728743969040553250006 absolute error = 4e-31 relative error = 4.0741109362978000517373264325662e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.984 y[1] (analytic) = -9.815925578496105673509268030351 y[1] (numeric) = -9.8159255784961056735092680303499 absolute error = 1.1e-30 relative error = 1.1206278931146201630597875482367e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.985 y[1] (analytic) = -9.813758032822466297756309132131 y[1] (numeric) = -9.8137580328224662977563091321297 absolute error = 1.3e-30 relative error = 1.3246709320243104606833214347245e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.986 y[1] (analytic) = -9.811590347054606304107941720214 y[1] (numeric) = -9.8115903470546063041079417202135 absolute error = 5e-31 relative error = 5.0960138195139554494522097191847e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1854.0MB, alloc=4.6MB, time=109.90 x[1] = 3.987 y[1] (analytic) = -9.809422521195174477825521674098 y[1] (numeric) = -9.809422521195174477825521674097 absolute error = 1.0e-30 relative error = 1.0194280018413974557004292285528e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.988 y[1] (analytic) = -9.807254555246818355501711274901 y[1] (numeric) = -9.8072545552468183555017112748997 absolute error = 1.3e-30 relative error = 1.3255493600953880906790545327060e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.989 y[1] (analytic) = -9.805086449212184225592876218577 y[1] (numeric) = -9.8050864492121842255928762185761 absolute error = 9e-31 relative error = 9.1789093820005319385015277488432e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.99 y[1] (analytic) = -9.802918203093917128951166270454 y[1] (numeric) = -9.8029182030939171289511662704536 absolute error = 4e-31 relative error = 4.0804176033393327798812574731645e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.991 y[1] (analytic) = -9.800749816894660859356279800994 y[1] (numeric) = -9.800749816894660859356279800993 absolute error = 1.0e-30 relative error = 1.0203300958424496323890774725728e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.992 y[1] (analytic) = -9.798581290617057964046912442447 y[1] (numeric) = -9.7985812906170579640469124424458 absolute error = 1.2e-30 relative error = 1.2246670863965766437023521591318e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.993 y[1] (analytic) = -9.796412624263749744251890105862 y[1] (numeric) = -9.7964126242637497442518901058614 absolute error = 6e-31 relative error = 6.1246909763061664930312749006404e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.994 y[1] (analytic) = -9.794243817837376255720986597677 y[1] (numeric) = -9.7942438178373762557209865976758 absolute error = 1.2e-30 relative error = 1.2252094417075341943398288003065e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1857.8MB, alloc=4.6MB, time=110.27 x[1] = 3.995 y[1] (analytic) = -9.792074871340576309255426074894 y[1] (numeric) = -9.7920748713405763092554260748936 absolute error = 4e-31 relative error = 4.0849360861273553005538942265644e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.996 y[1] (analytic) = -9.789905784775987471238070577653 y[1] (numeric) = -9.7899057847759874712380705776525 absolute error = 5e-31 relative error = 5.1073014489836685913250898435110e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.997 y[1] (analytic) = -9.787736558146246064163292877743 y[1] (numeric) = -9.7877365581462460641632928777413 absolute error = 1.7e-30 relative error = 1.7368673440491255595315404173968e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.998 y[1] (analytic) = -9.785567191453987167166534881422 y[1] (numeric) = -9.7855671914539871671665348814214 absolute error = 6e-31 relative error = 6.1314790268263344456422618304777e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 3.999 y[1] (analytic) = -9.783397684701844616553551824682 y[1] (numeric) = -9.7833976847018446165535518246809 absolute error = 1.1e-30 relative error = 1.1243537628241912898672383470140e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4 y[1] (analytic) = -9.781228037892451006329342498834 y[1] (numeric) = -9.7812280378924510063293424988332 absolute error = 8e-31 relative error = 8.1789321023986166180530885060494e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.001 y[1] (analytic) = -9.779058251028437688726765744151 y[1] (numeric) = -9.7790582510284376887267657441495 absolute error = 1.5e-30 relative error = 1.5338900346996593130992408056404e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.002 y[1] (analytic) = -9.776888324112434774734843449 y[1] (numeric) = -9.7768883241124347747348434489986 absolute error = 1.4e-30 relative error = 1.4319484416603426470241851622135e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1861.6MB, alloc=4.6MB, time=110.64 x[1] = 4.003 y[1] (analytic) = -9.774718257147071134626750291747 y[1] (numeric) = -9.7747182571470711346267502917458 absolute error = 1.2e-30 relative error = 1.2276568678821866846477071125037e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.004 y[1] (analytic) = -9.772548050134974398487490462447 y[1] (numeric) = -9.7725480501349743984874904624456 absolute error = 1.4e-30 relative error = 1.4325844117805732130155514339052e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.005 y[1] (analytic) = -9.770377703078770956741261601146 y[1] (numeric) = -9.7703777030787709567412616011445 absolute error = 1.5e-30 relative error = 1.5352528280737097995374095796225e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.006 y[1] (analytic) = -9.768207215981085960678506189391 y[1] (numeric) = -9.7682072159810859606785061893901 absolute error = 9e-31 relative error = 9.2135637594539605543967201761034e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.007 y[1] (analytic) = -9.766036588844543322982650631329 y[1] (numeric) = -9.7660365888445433229826506313279 absolute error = 1.1e-30 relative error = 1.1263525279605215516714908524157e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.008 y[1] (analytic) = -9.763865821671765718256532260547 y[1] (numeric) = -9.7638658216717657182565322605462 absolute error = 8e-31 relative error = 8.1934759716210876561682649032765e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.009 y[1] (analytic) = -9.761694914465374583548514508615 y[1] (numeric) = -9.7616949144653745835485145086143 absolute error = 7e-31 relative error = 7.1708858567450668824235016273976e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.01 y[1] (analytic) = -9.759523867227990118878290471042 y[1] (numeric) = -9.7595238672279901188782904710408 absolute error = 1.2e-30 relative error = 1.2295681800928240513366504970207e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1865.4MB, alloc=4.6MB, time=111.02 x[1] = 4.011 y[1] (analytic) = -9.757352679962231287762375106163 y[1] (numeric) = -9.7573526799622312877623751061624 absolute error = 6e-31 relative error = 6.1492089061427927909709570204140e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.012 y[1] (analytic) = -9.755181352670715817739286302257 y[1] (numeric) = -9.7551813526707158177392863022559 absolute error = 1.1e-30 relative error = 1.1276058949932781208691099752238e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.013 y[1] (analytic) = -9.753009885356060200894415047952 y[1] (numeric) = -9.7530098853560602008944150479508 absolute error = 1.2e-30 relative error = 1.2303894019442908933712576258409e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.014 y[1] (analytic) = -9.750838278020879694384584940803 y[1] (numeric) = -9.7508382780208796943845849408024 absolute error = 6e-31 relative error = 6.1533171086679282754605824890100e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.015 y[1] (analytic) = -9.748666530667788320962301268671 y[1] (numeric) = -9.74866653066778832096230126867 absolute error = 1.0e-30 relative error = 1.0257813177362827709888227002344e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.016 y[1] (analytic) = -9.746494643299398869499689898329 y[1] (numeric) = -9.7464946432993988694996898983288 absolute error = 2e-31 relative error = 2.0520198011651056720680525503782e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.017 y[1] (analytic) = -9.744322615918322895512126205529 y[1] (numeric) = -9.7443226159183228955121262055279 absolute error = 1.1e-30 relative error = 1.1288624600780769363952507450404e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.018 y[1] (analytic) = -9.742150448527170721681554280494 y[1] (numeric) = -9.7421504485271707216815542804924 absolute error = 1.6e-30 relative error = 1.6423478660626615576770228561436e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.019 y[1] (analytic) = -9.739978141128551438379496642652 y[1] (numeric) = -9.7399781411285514383794966426511 absolute error = 9e-31 relative error = 9.2402671439231672879005769757712e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1869.2MB, alloc=4.6MB, time=111.39 x[1] = 4.02 y[1] (analytic) = -9.737805693725072904189754698159 y[1] (numeric) = -9.7378056937250729041897546981586 absolute error = 4e-31 relative error = 4.1077015970626244938232111951553e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.021 y[1] (analytic) = -9.735633106319341746430800173564 y[1] (numeric) = -9.7356331063193417464308001735629 absolute error = 1.1e-30 relative error = 1.1298700228195704290412883123170e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.022 y[1] (analytic) = -9.733460378913963361677857758759 y[1] (numeric) = -9.7334603789139633616778577587578 absolute error = 1.2e-30 relative error = 1.2328606202575339196628284128927e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.023 y[1] (analytic) = -9.731287511511541916284679192145 y[1] (numeric) = -9.7312875115115419162846791921439 absolute error = 1.1e-30 relative error = 1.1303745765385767999428265638234e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.024 y[1] (analytic) = -9.729114504114680346905009020709 y[1] (numeric) = -9.7291145041146803469050090207081 absolute error = 9e-31 relative error = 9.2505849285602302241460457487975e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.025 y[1] (analytic) = -9.726941356725980361013742267519 y[1] (numeric) = -9.7269413567259803610137422675182 absolute error = 8e-31 relative error = 8.2245792450143272962607513895936e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.026 y[1] (analytic) = -9.724768069348042437427774238916 y[1] (numeric) = -9.7247680693480424374277742389148 absolute error = 1.2e-30 relative error = 1.2339625906167746006598408909422e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.027 y[1] (analytic) = -9.722594641983465826826542703471 y[1] (numeric) = -9.7225946419834658268265427034706 absolute error = 4e-31 relative error = 4.1141281183599532922671398033783e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1873.0MB, alloc=4.6MB, time=111.77 x[1] = 4.028 y[1] (analytic) = -9.720421074634848552272262674574 y[1] (numeric) = -9.7204210746348485522722626745733 absolute error = 7e-31 relative error = 7.2013341256031521845914633285606e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.029 y[1] (analytic) = -9.718247367304787409729854028277 y[1] (numeric) = -9.7182473673047874097298540282756 absolute error = 1.4e-30 relative error = 1.4405889735941855881196195416480e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.03 y[1] (analytic) = -9.716073519995877968586562187844 y[1] (numeric) = -9.716073519995877968586562187843 absolute error = 1.0e-30 relative error = 1.0292223478362731128087628279296e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.031 y[1] (analytic) = -9.71389953271071457217127210622 y[1] (numeric) = -9.7138995327107145721712721062189 absolute error = 1.1e-30 relative error = 1.1323979585086765203936107607963e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.032 y[1] (analytic) = -9.711725405451890338273515777414 y[1] (numeric) = -9.7117254054518903382735157774125 absolute error = 1.5e-30 relative error = 1.5445247238538499637558353305498e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.033 y[1] (analytic) = -9.709551138221997159662173507606 y[1] (numeric) = -9.7095511382219971596621735076046 absolute error = 1.4e-30 relative error = 1.4418792177620339867332919646356e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.034 y[1] (analytic) = -9.707376731023625704603869176555 y[1] (numeric) = -9.707376731023625704603869176554 absolute error = 1.0e-30 relative error = 1.0301444228533116473901423120979e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.035 y[1] (analytic) = -9.705202183859365417381059719677 y[1] (numeric) = -9.705202183859365417381059719676 absolute error = 1.0e-30 relative error = 1.0303752369663055740201412037366e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1876.8MB, alloc=4.6MB, time=112.14 x[1] = 4.036 y[1] (analytic) = -9.703027496731804518809819060954 y[1] (numeric) = -9.7030274967318045188098190609531 absolute error = 9e-31 relative error = 9.2754555246096130132074382331363e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.037 y[1] (analytic) = -9.700852669643530006757316726628 y[1] (numeric) = -9.7008526696435300067573167266273 absolute error = 7e-31 relative error = 7.2158605417282600333059194598032e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.038 y[1] (analytic) = -9.698677702597127656658991369413 y[1] (numeric) = -9.6986777025971276566589913694121 absolute error = 9e-31 relative error = 9.2796155063385242635010532216042e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.039 y[1] (analytic) = -9.696502595595182022035419432754 y[1] (numeric) = -9.6965025955951820220354194327526 absolute error = 1.4e-30 relative error = 1.4438195485411164953795417268935e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.04 y[1] (analytic) = -9.694327348640276435008879184451 y[1] (numeric) = -9.6943273486402764350088791844504 absolute error = 6e-31 relative error = 6.1891865048703541807670908617406e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.041 y[1] (analytic) = -9.692151961734993006819610348763 y[1] (numeric) = -9.6921519617349930068196103487621 absolute error = 9e-31 relative error = 9.2858634857690666861881413339065e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.042 y[1] (analytic) = -9.689976434881912628341769565869 y[1] (numeric) = -9.6899764348819126283417695658678 absolute error = 1.2e-30 relative error = 1.2383931045283536426673910180092e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.043 y[1] (analytic) = -9.687800768083614970599081907399 y[1] (numeric) = -9.6878007680836149705990819073982 absolute error = 8e-31 relative error = 8.2578081357287387617257595249726e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1880.7MB, alloc=4.6MB, time=112.52 x[1] = 4.044 y[1] (analytic) = -9.6856249613426784852801886765 y[1] (numeric) = -9.685624961342678485280188676499 absolute error = 1.0e-30 relative error = 1.0324578991972182445303264435816e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.045 y[1] (analytic) = -9.683449014661680405253691720703 y[1] (numeric) = -9.6834490146616804052536917207017 absolute error = 1.3e-30 relative error = 1.3424968707241335123869163951460e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.046 y[1] (analytic) = -9.681272928043196745082894485662 y[1] (numeric) = -9.6812729280431967450828944856613 absolute error = 7e-31 relative error = 7.2304541479493829548751539394566e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.047 y[1] (analytic) = -9.679096701489802301540240037614 y[1] (numeric) = -9.679096701489802301540240037613 absolute error = 1.0e-30 relative error = 1.0331542610232217644939427357914e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.048 y[1] (analytic) = -9.676920335004070654121446282192 y[1] (numeric) = -9.6769203350040706541214462821907 absolute error = 1.3e-30 relative error = 1.3434026064031384291274609720042e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.049 y[1] (analytic) = -9.674743828588574165559338607043 y[1] (numeric) = -9.6747438285885741655593386070425 absolute error = 5e-31 relative error = 5.1680954954333280261241819733660e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.05 y[1] (analytic) = -9.672567182245883982337380175471 y[1] (numeric) = -9.6725671822458839823373801754702 absolute error = 8e-31 relative error = 8.2708135795470083528328497572241e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.051 y[1] (analytic) = -9.670390395978570035202900098113 y[1] (numeric) = -9.6703903959785700352029000981114 absolute error = 1.6e-30 relative error = 1.6545350647532903001730304102810e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1884.5MB, alloc=4.6MB, time=112.89 x[1] = 4.052 y[1] (analytic) = -9.668213469789201039680019709478 y[1] (numeric) = -9.6682134697892010396800197094765 absolute error = 1.5e-30 relative error = 1.5514758798894258902252204403842e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.053 y[1] (analytic) = -9.666036403680344496582277175945 y[1] (numeric) = -9.6660364036803444965822771759437 absolute error = 1.3e-30 relative error = 1.3449152741707292217869479858943e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.054 y[1] (analytic) = -9.663859197654566692524950661611 y[1] (numeric) = -9.66385919765456669252495066161 absolute error = 1.0e-30 relative error = 1.0347832884844819749474481885305e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.055 y[1] (analytic) = -9.661681851714432700437080278189 y[1] (numeric) = -9.6616818517144327004370802781871 absolute error = 1.9e-30 relative error = 1.9665313235944023961414070922976e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.056 y[1] (analytic) = -9.659504365862506380073189044928 y[1] (numeric) = -9.6595043658625063800731890449266 absolute error = 1.4e-30 relative error = 1.4493497253831332178190617892095e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.057 y[1] (analytic) = -9.657326740101350378524703084352 y[1] (numeric) = -9.6573267401013503785247030843506 absolute error = 1.4e-30 relative error = 1.4496765385255127791277421318888e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.058 y[1] (analytic) = -9.655148974433526130731071279359 y[1] (numeric) = -9.6551489744335261307310712793583 absolute error = 7e-31 relative error = 7.2500176004904104053368722917746e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.059 y[1] (analytic) = -9.652971068861593859990584617074 y[1] (numeric) = -9.6529710688615938599905846170732 absolute error = 8e-31 relative error = 8.2876038298781163845235469153202e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.06 y[1] (analytic) = -9.650793023388112578470895444591 y[1] (numeric) = -9.6507930233881125784708954445901 absolute error = 9e-31 relative error = 9.3256585010050934788590675874092e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1888.3MB, alloc=4.6MB, time=113.26 x[1] = 4.061 y[1] (analytic) = -9.648614838015640087719236861575 y[1] (numeric) = -9.648614838015640087719236861574 absolute error = 1.0e-30 relative error = 1.0364181976256217440353920686532e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.062 y[1] (analytic) = -9.646436512746732979172342474461 y[1] (numeric) = -9.6464365127467329791723424744595 absolute error = 1.5e-30 relative error = 1.5549783570522758424069374711375e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.063 y[1] (analytic) = -9.644258047583946634666066736794 y[1] (numeric) = -9.6442580475839466346660667367924 absolute error = 1.6e-30 relative error = 1.6590182387341114953725159596760e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.064 y[1] (analytic) = -9.642079442529835226944706100053 y[1] (numeric) = -9.6420794425298352269447061000523 absolute error = 7e-31 relative error = 7.2598447686751053113139957282672e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.065 y[1] (analytic) = -9.639900697586951720170021199089 y[1] (numeric) = -9.6399006975869517201700211990877 absolute error = 1.3e-30 relative error = 1.3485616094836064309261156730020e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.066 y[1] (analytic) = -9.637721812757847870429960296095 y[1] (numeric) = -9.6377218127578478704299602960934 absolute error = 1.6e-30 relative error = 1.6601433731797636451666556214680e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.067 y[1] (analytic) = -9.635542788045074226247084206855 y[1] (numeric) = -9.6355427880450742262470842068532 absolute error = 1.8e-30 relative error = 1.8680836561000799506424717616209e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.068 y[1] (analytic) = -9.63336362345118012908669293277 y[1] (numeric) = -9.6333636234511801290866929327684 absolute error = 1.6e-30 relative error = 1.6608944316240762996412514601415e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1892.1MB, alloc=4.6MB, time=113.64 x[1] = 4.069 y[1] (analytic) = -9.63118431897871371386465422199 y[1] (numeric) = -9.6311843189787137138646542219889 absolute error = 1.1e-30 relative error = 1.1421232982037285796157557078927e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.07 y[1] (analytic) = -9.62900487463022190945493428276 y[1] (numeric) = -9.6290048746302219094549342827584 absolute error = 1.6e-30 relative error = 1.6616462664958865111786732085341e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.071 y[1] (analytic) = -9.626825290408250439196830871886 y[1] (numeric) = -9.6268252904082504391968308718842 absolute error = 1.8e-30 relative error = 1.8697752848942232563090956216461e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.072 y[1] (analytic) = -9.624645566315343821401908981037 y[1] (numeric) = -9.6246455663153438214019089810363 absolute error = 7e-31 relative error = 7.2729950955272928887342137168888e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.073 y[1] (analytic) = -9.622465702354045369860639343381 y[1] (numeric) = -9.6224657023540453698606393433805 absolute error = 5e-31 relative error = 5.1961733662264935011658551024473e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.074 y[1] (analytic) = -9.620285698526897194348739982845 y[1] (numeric) = -9.6202856985268971943487399828442 absolute error = 8e-31 relative error = 8.3157613512715086390505401074578e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.075 y[1] (analytic) = -9.618105554836440201133221028115 y[1] (numeric) = -9.618105554836440201133221028114 absolute error = 1.0e-30 relative error = 1.0397057864447666762284282591613e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.076 y[1] (analytic) = -9.615925271285214093478133013261 y[1] (numeric) = -9.6159252712852140934781330132599 absolute error = 1.1e-30 relative error = 1.1439356785402511498415168259213e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1895.9MB, alloc=4.6MB, time=114.01 x[1] = 4.077 y[1] (analytic) = -9.613744847875757372150018886681 y[1] (numeric) = -9.6137448478757573721500188866801 absolute error = 9e-31 relative error = 9.3615964875421363323957636197142e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.078 y[1] (analytic) = -9.611564284610607335923069949859 y[1] (numeric) = -9.6115642846106073359230699498572 absolute error = 1.8e-30 relative error = 1.8727440681867356206155261570767e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.079 y[1] (analytic) = -9.609383581492300082083985947218 y[1] (numeric) = -9.6093835814923000820839859472168 absolute error = 1.2e-30 relative error = 1.2487793726032577044613479833314e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.08 y[1] (analytic) = -9.607202738523370506936539528177 y[1] (numeric) = -9.6072027385233705069365395281756 absolute error = 1.4e-30 relative error = 1.4572399876461651046857953763867e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.081 y[1] (analytic) = -9.605021755706352306305845302269 y[1] (numeric) = -9.6050217557063523063058453022677 absolute error = 1.3e-30 relative error = 1.3534586730401404848050183058674e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.082 y[1] (analytic) = -9.602840633043777976042333708036 y[1] (numeric) = -9.6028406330437779760423337080345 absolute error = 1.5e-30 relative error = 1.5620377941485741146185013367448e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.083 y[1] (analytic) = -9.600659370538178812525429916165 y[1] (numeric) = -9.6006593705381788125254299161635 absolute error = 1.5e-30 relative error = 1.5623926879471355891363319966211e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.084 y[1] (analytic) = -9.598477968192084913166937987163 y[1] (numeric) = -9.5984779681920849131669379871615 absolute error = 1.5e-30 relative error = 1.5627477658132620856271504661090e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1899.7MB, alloc=4.6MB, time=114.38 x[1] = 4.085 y[1] (analytic) = -9.596296426008025176914130503648 y[1] (numeric) = -9.5962964260080251769141305036465 absolute error = 1.5e-30 relative error = 1.5631030278875897472892620945311e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.086 y[1] (analytic) = -9.594114743988527304752543897144 y[1] (numeric) = -9.5941147439885273047525438971424 absolute error = 1.6e-30 relative error = 1.6676890392649584604671067214241e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.087 y[1] (analytic) = -9.591932922136117800208479689063 y[1] (numeric) = -9.5919329221361178002084796890613 absolute error = 1.7e-30 relative error = 1.7723226525873275221044290153430e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.088 y[1] (analytic) = -9.589750960453321969851211865359 y[1] (numeric) = -9.5897509604533219698512118653583 absolute error = 7e-31 relative error = 7.2994596302520659599657356320681e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.089 y[1] (analytic) = -9.587568858942663923794900604144 y[1] (numeric) = -9.587568858942663923794900604143 absolute error = 1.0e-30 relative error = 1.0430172807231154321027626525561e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.09 y[1] (analytic) = -9.585386617606666576200212575337 y[1] (numeric) = -9.5853866176066665762002125753353 absolute error = 1.7e-30 relative error = 1.7735330538232015450962347958393e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.091 y[1] (analytic) = -9.583204236447851645775648031252 y[1] (numeric) = -9.5832042364478516457756480312507 absolute error = 1.3e-30 relative error = 1.3565400130529443223893449141644e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.092 y[1] (analytic) = -9.581021715468739656278574906806 y[1] (numeric) = -9.5810217154687396562785749068046 absolute error = 1.4e-30 relative error = 1.4612220299424576857811756763937e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1903.5MB, alloc=4.6MB, time=114.75 x[1] = 4.093 y[1] (analytic) = -9.578839054671849937015970147825 y[1] (numeric) = -9.5788390546718499370159701478237 absolute error = 1.3e-30 relative error = 1.3571582031811632260328432353966e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.094 y[1] (analytic) = -9.576656254059700623344868485757 y[1] (numeric) = -9.5766562540597006233448684857562 absolute error = 8e-31 relative error = 8.3536463957434722082665974300652e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.095 y[1] (analytic) = -9.574473313634808657172518876875 y[1] (numeric) = -9.5744733136348086571725188768735 absolute error = 1.5e-30 relative error = 1.5666658111249640683187380747409e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.096 y[1] (analytic) = -9.572290233399689787456248823859 y[1] (numeric) = -9.5722902333996897874562488238576 absolute error = 1.4e-30 relative error = 1.4625549015585758140533553869305e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.097 y[1] (analytic) = -9.570107013356858570703036797472 y[1] (numeric) = -9.5701070133568585707030367974716 absolute error = 4e-31 relative error = 4.1796815797537670444704837897840e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.098 y[1] (analytic) = -9.567923653508828371468792975813 y[1] (numeric) = -9.5679236535088283714687929758124 absolute error = 6e-31 relative error = 6.2709530482087722374641179856672e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.099 y[1] (analytic) = -9.565740153858111362857348518449 y[1] (numeric) = -9.5657401538581113628573485184478 absolute error = 1.2e-30 relative error = 1.2544768943112142179208064056661e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.1 y[1] (analytic) = -9.563556514407218527019153592543 y[1] (numeric) = -9.563556514407218527019153592542 absolute error = 1.0e-30 relative error = 1.0456361067072999580152437423045e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.101 y[1] (analytic) = -9.56137273515865965564968436788 y[1] (numeric) = -9.5613727351586596556496843678785 absolute error = 1.5e-30 relative error = 1.5688123887109493348946574666426e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1907.4MB, alloc=4.6MB, time=115.12 x[1] = 4.102 y[1] (analytic) = -9.559188816114943350487559197492 y[1] (numeric) = -9.5591888161149433504875591974907 absolute error = 1.3e-30 relative error = 1.3599480301178395529800464459016e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.103 y[1] (analytic) = -9.557004757278577023812364200416 y[1] (numeric) = -9.5570047572785770238123642004147 absolute error = 1.3e-30 relative error = 1.3602588185486934509343346380433e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.104 y[1] (analytic) = -9.554820558652066898942188462884 y[1] (numeric) = -9.5548205586520668989421884628832 absolute error = 8e-31 relative error = 8.3727370397928110752913527272314e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.105 y[1] (analytic) = -9.552636220237918010730869074083 y[1] (numeric) = -9.5526362202379180107308690740818 absolute error = 1.2e-30 relative error = 1.2561977367647658557424169338620e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.106 y[1] (analytic) = -9.550451742038634206064946212396 y[1] (numeric) = -9.5504517420386342060649462123949 absolute error = 1.1e-30 relative error = 1.1517779783736120963316047828567e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.107 y[1] (analytic) = -9.548267124056718144360328497872 y[1] (numeric) = -9.5482671240567181443603284978704 absolute error = 1.6e-30 relative error = 1.6756967303196028170677310342573e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.108 y[1] (analytic) = -9.546082366294671298058668826441 y[1] (numeric) = -9.5460823662946712980586688264397 absolute error = 1.3e-30 relative error = 1.3618151929948172992083107048237e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.109 y[1] (analytic) = -9.543897468754993953123450901233 y[1] (numeric) = -9.5438974687549939531234509012319 absolute error = 1.1e-30 relative error = 1.1525689621050544801444750851812e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1911.2MB, alloc=4.6MB, time=115.50 x[1] = 4.11 y[1] (analytic) = -9.541712431440185209535786676128 y[1] (numeric) = -9.541712431440185209535786676127 absolute error = 1.0e-30 relative error = 1.0480299078234369747822647621523e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.111 y[1] (analytic) = -9.539527254352742981789924926499 y[1] (numeric) = -9.5395272543527429817899249264982 absolute error = 8e-31 relative error = 8.3861598029920404885218621602796e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.112 y[1] (analytic) = -9.537341937495163999388471161899 y[1] (numeric) = -9.5373419374951639993884711618985 absolute error = 5e-31 relative error = 5.2425508414907193820086751129671e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.113 y[1] (analytic) = -9.535156480869943807337319095253 y[1] (numeric) = -9.5351564808699438073373190952521 absolute error = 9e-31 relative error = 9.4387543802310850044843702747082e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.114 y[1] (analytic) = -9.532970884479576766640293882918 y[1] (numeric) = -9.5329708844795767666402938829172 absolute error = 8e-31 relative error = 8.3919274452255241536032788723128e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.115 y[1] (analytic) = -9.530785148326556054793507349794 y[1] (numeric) = -9.5307851483265560547935073497931 absolute error = 9e-31 relative error = 9.4430835024963783714431842069871e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.116 y[1] (analytic) = -9.528599272413373666279425413451 y[1] (numeric) = -9.52859927241337366627942541345 absolute error = 1.0e-30 relative error = 1.0494721956616852709241533797646e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.117 y[1] (analytic) = -9.526413256742520413060647921067 y[1] (numeric) = -9.5264132567425204130606479210662 absolute error = 8e-31 relative error = 8.3977041352240633110691411060480e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1915.0MB, alloc=4.6MB, time=115.87 x[1] = 4.118 y[1] (analytic) = -9.524227101316485925073401112766 y[1] (numeric) = -9.5242271013164859250734011127654 absolute error = 6e-31 relative error = 6.2997237845899855018930770198556e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.119 y[1] (analytic) = -9.522040806137758650720742924752 y[1] (numeric) = -9.5220408061377586507207429247514 absolute error = 6e-31 relative error = 6.3011702240684515810476152611805e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.12 y[1] (analytic) = -9.519854371208825857365481345447 y[1] (numeric) = -9.5198543712088258573654813454465 absolute error = 5e-31 relative error = 5.2521811836971438437643297078147e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.121 y[1] (analytic) = -9.517667796532173631822806037647 y[1] (numeric) = -9.5176677965321736318228060376459 absolute error = 1.1e-30 relative error = 1.1557453186176474966692607606619e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.122 y[1] (analytic) = -9.51548108211028688085263343951 y[1] (numeric) = -9.5154810821102868808526334395087 absolute error = 1.3e-30 relative error = 1.3661947186717476199844282249210e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.123 y[1] (analytic) = -9.513294227945649331651665557014 y[1] (numeric) = -9.5132942279456493316516655570126 absolute error = 1.4e-30 relative error = 1.4716248299011386146169272956784e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.124 y[1] (analytic) = -9.511107234040743532345162660309 y[1] (numeric) = -9.5111072340407435323451626603082 absolute error = 8e-31 relative error = 8.4112183819856296293537659174383e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.125 y[1] (analytic) = -9.508920100398050852478430096217 y[1] (numeric) = -9.5089201003980508524784300962166 absolute error = 4e-31 relative error = 4.2065765173824069287573661812809e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1918.8MB, alloc=4.6MB, time=116.24 x[1] = 4.126 y[1] (analytic) = -9.506732827020051483508019428923 y[1] (numeric) = -9.5067328270200514835080194289221 absolute error = 9e-31 relative error = 9.4669747890886187319531109665023e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.127 y[1] (analytic) = -9.504545413909224439292644120721 y[1] (numeric) = -9.5045454139092244392926441207202 absolute error = 8e-31 relative error = 8.4170253827106454602925637144123e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.128 y[1] (analytic) = -9.50235786106804755658380996449 y[1] (numeric) = -9.5023578610680475565838099644896 absolute error = 4e-31 relative error = 4.2094815397221920167733041606682e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.129 y[1] (analytic) = -9.500170168498997495516160479368 y[1] (numeric) = -9.5001701684989974955161604793669 absolute error = 1.1e-30 relative error = 1.1578739964547363227447610596323e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.13 y[1] (analytic) = -9.49798233620454974009753748091 y[1] (numeric) = -9.4979823362045497400975374809096 absolute error = 4e-31 relative error = 4.2114207611786566053537386075139e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.131 y[1] (analytic) = -9.495794364187178598698757036846 y[1] (numeric) = -9.4957943641871785986987570368444 absolute error = 1.6e-30 relative error = 1.6849564540216924406923470071405e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.132 y[1] (analytic) = -9.493606252449357204543101019307 y[1] (numeric) = -9.4936062524493572045431010193063 absolute error = 7e-31 relative error = 7.3733835318838876348300988381728e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.133 y[1] (analytic) = -9.491418000993557516195524464284 y[1] (numeric) = -9.491418000993557516195524464283 absolute error = 1.0e-30 relative error = 1.0535833527670158811802251943528e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1922.6MB, alloc=4.6MB, time=116.61 x[1] = 4.134 y[1] (analytic) = -9.489229609822250318051578948792 y[1] (numeric) = -9.4892296098222503180515789487908 absolute error = 1.2e-30 relative error = 1.2645915941984231060948494054756e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.135 y[1] (analytic) = -9.487041078937905220826052196117 y[1] (numeric) = -9.4870410789379052208260521961161 absolute error = 9e-31 relative error = 9.4866248866370139892003942910482e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.136 y[1] (analytic) = -9.48485240834299066204132411927 y[1] (numeric) = -9.4848524083429906620413241192689 absolute error = 1.1e-30 relative error = 1.1597439292069813577981498236313e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.137 y[1] (analytic) = -9.482663598039973906515439512605 y[1] (numeric) = -9.4826635980399739065154395126034 absolute error = 1.6e-30 relative error = 1.6872896348771806807135192344403e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.138 y[1] (analytic) = -9.480474648031321046849897601374 y[1] (numeric) = -9.4804746480313210468498976013726 absolute error = 1.4e-30 relative error = 1.4767193120343596118694692666632e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.139 y[1] (analytic) = -9.478285558319497003917158658796 y[1] (numeric) = -9.4782855583194970039171586587949 absolute error = 1.1e-30 relative error = 1.1605474357485282858339689644298e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.14 y[1] (analytic) = -9.476096328906965527347867900021 y[1] (numeric) = -9.47609632890696552734786790002 absolute error = 1.0e-30 relative error = 1.0552868663328019295724904448700e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.141 y[1] (analytic) = -9.473906959796189196017796862196 y[1] (numeric) = -9.4739069597961891960177968621952 absolute error = 8e-31 relative error = 8.4442458997635151512881465274832e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.142 y[1] (analytic) = -9.471717450989629418534502479644 y[1] (numeric) = -9.4717174509896294185345024796428 absolute error = 1.2e-30 relative error = 1.2669296843041078166027878068355e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1926.4MB, alloc=4.6MB, time=116.99 x[1] = 4.143 y[1] (analytic) = -9.469527802489746433723704062972 y[1] (numeric) = -9.4695278024897464337237040629713 absolute error = 7e-31 relative error = 7.3921320534689665922160299428777e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.144 y[1] (analytic) = -9.467338014298999311115378390757 y[1] (numeric) = -9.4673380142989993111153783907559 absolute error = 1.1e-30 relative error = 1.1618894332690080140895167148181e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.145 y[1] (analytic) = -9.465148086419845951429573122236 y[1] (numeric) = -9.4651480864198459514295731222349 absolute error = 1.1e-30 relative error = 1.1621582567506036335016521892359e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.146 y[1] (analytic) = -9.462958018854743087061938739282 y[1] (numeric) = -9.4629580188547430870619387392811 absolute error = 9e-31 relative error = 9.5107681784783266959641057858827e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.147 y[1] (analytic) = -9.460767811606146282568979225721 y[1] (numeric) = -9.4607678116061462825689792257199 absolute error = 1.1e-30 relative error = 1.1626963285691861424207176733161e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.148 y[1] (analytic) = -9.45857746467650993515302169188 y[1] (numeric) = -9.4585774646765099351530216918792 absolute error = 8e-31 relative error = 8.4579314700084297295232148844494e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.149 y[1] (analytic) = -9.456386978068287275146905152068 y[1] (numeric) = -9.4563869780682872751469051520668 absolute error = 1.2e-30 relative error = 1.2689836010128375446101298346403e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.15 y[1] (analytic) = -9.454196351783930366498388662489 y[1] (numeric) = -9.4541963517839303664983886624876 absolute error = 1.4e-30 relative error = 1.4808239092007342602885498053027e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1930.3MB, alloc=4.6MB, time=117.36 x[1] = 4.151 y[1] (analytic) = -9.452005585825890107254279026923 y[1] (numeric) = -9.4520055858258901072542790269221 absolute error = 9e-31 relative error = 9.5217887021737354281841710685862e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.152 y[1] (analytic) = -9.449814680196616230044278277306 y[1] (numeric) = -9.4498146801966162300442782773054 absolute error = 6e-31 relative error = 6.3493308631478494245332741785445e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.153 y[1] (analytic) = -9.447623634898557302564551136156 y[1] (numeric) = -9.4476236348985573025645511361553 absolute error = 7e-31 relative error = 7.4092705959863965723361519054145e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.154 y[1] (analytic) = -9.445432449934160728061012667617 y[1] (numeric) = -9.4454324499341607280610126676161 absolute error = 9e-31 relative error = 9.5284149748619867483862485822139e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.155 y[1] (analytic) = -9.443241125305872745812336323696 y[1] (numeric) = -9.443241125305872745812336323695 absolute error = 1.0e-30 relative error = 1.0589584515852435644242263838146e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.156 y[1] (analytic) = -9.441049661016138431612682592086 y[1] (numeric) = -9.4410496610161384316126825920854 absolute error = 6e-31 relative error = 6.3552255474040384488048554747135e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.157 y[1] (analytic) = -9.438858057067401698254148451785 y[1] (numeric) = -9.4388580570674016982541484517839 absolute error = 1.1e-30 relative error = 1.1653952134351341250895575532331e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.158 y[1] (analytic) = -9.436666313462105296008937842524 y[1] (numeric) = -9.4366663134621052960089378425227 absolute error = 1.3e-30 relative error = 1.3776051381041771684263787438812e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1934.1MB, alloc=4.6MB, time=117.73 x[1] = 4.159 y[1] (analytic) = -9.434474430202690813111253353856 y[1] (numeric) = -9.4344744302026908131112533538549 absolute error = 1.1e-30 relative error = 1.1659367017611043906219785950315e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.16 y[1] (analytic) = -9.432282407291598676238909339546 y[1] (numeric) = -9.4322824072915986762389093395447 absolute error = 1.3e-30 relative error = 1.3782454170318721099400138582624e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.161 y[1] (analytic) = -9.430090244731268150994666662729 y[1] (numeric) = -9.4300902447312681509946666627287 absolute error = 3e-31 relative error = 3.1813057162163900550635787430844e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.162 y[1] (analytic) = -9.427897942524137342387289277133 y[1] (numeric) = -9.4278979425241373423872892771323 absolute error = 7e-31 relative error = 7.4247727782741413269496655880734e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.163 y[1] (analytic) = -9.425705500672643195312322849439 y[1] (numeric) = -9.4257055006726431953123228494384 absolute error = 6e-31 relative error = 6.3655712557238544966805541633720e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.164 y[1] (analytic) = -9.423512919179221495032595627724 y[1] (numeric) = -9.4235129191792214950325956277231 absolute error = 9e-31 relative error = 9.5505785126932164861108032151308e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.165 y[1] (analytic) = -9.421320198046306867658441760689 y[1] (numeric) = -9.421320198046306867658441760688 absolute error = 1.0e-30 relative error = 1.0614223686053780012760883527495e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.166 y[1] (analytic) = -9.419127337276332780627647272237 y[1] (numeric) = -9.4191273372763327806276472722359 absolute error = 1.1e-30 relative error = 1.1678364254050734374576131801687e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1937.9MB, alloc=4.6MB, time=118.11 x[1] = 4.167 y[1] (analytic) = -9.416934336871731543185118895753 y[1] (numeric) = -9.4169343368717315431851188957528 absolute error = 2e-31 relative error = 2.1238334350161690882395893761180e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.168 y[1] (analytic) = -9.414741196834934306862275972275 y[1] (numeric) = -9.4147411968349343068622759722744 absolute error = 6e-31 relative error = 6.3729845298531323089726137663561e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.169 y[1] (analytic) = -9.412547917168371065956165616536 y[1] (numeric) = -9.412547917168371065956165616535 absolute error = 1.0e-30 relative error = 1.0624115901455464142295329376460e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.17 y[1] (analytic) = -9.410354497874470658008301354712 y[1] (numeric) = -9.4103544978744706580083013547106 absolute error = 1.4e-30 relative error = 1.4877229123687315608559787562001e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.171 y[1] (analytic) = -9.408160938955660764283225437488 y[1] (numeric) = -9.4081609389556607642832254374872 absolute error = 8e-31 relative error = 8.5032558986900455559534802350788e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.172 y[1] (analytic) = -9.405967240414367910246795031902 y[1] (numeric) = -9.4059672404143679102467950319015 absolute error = 5e-31 relative error = 5.3157744144766246989958621802959e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.173 y[1] (analytic) = -9.403773402253017466044192495221 y[1] (numeric) = -9.4037734022530174660441924952204 absolute error = 6e-31 relative error = 6.3804174594024998542939002907206e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.174 y[1] (analytic) = -9.401579424474033646977659933942 y[1] (numeric) = -9.4015794244740336469776599339409 absolute error = 1.1e-30 relative error = 1.1700161752997570555225682347436e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1941.7MB, alloc=4.6MB, time=118.48 x[1] = 4.175 y[1] (analytic) = -9.399385307079839513983958250813 y[1] (numeric) = -9.3993853070798395139839582508126 absolute error = 4e-31 relative error = 4.2555974346398006608611282432309e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.176 y[1] (analytic) = -9.397191050072856974111550882603 y[1] (numeric) = -9.3971910500728569741115508826018 absolute error = 1.2e-30 relative error = 1.2769773367443629120678331593238e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.177 y[1] (analytic) = -9.394996653455506780997512431135 y[1] (numeric) = -9.3949966534555067809975124311341 absolute error = 9e-31 relative error = 9.5795670099464847854000945502807e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.178 y[1] (analytic) = -9.392802117230208535344162389973 y[1] (numeric) = -9.3928021172302085353441623899726 absolute error = 4e-31 relative error = 4.2585800808710509446514352389606e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.179 y[1] (analytic) = -9.390607441399380685395424168906 y[1] (numeric) = -9.3906074413993806853954241689053 absolute error = 7e-31 relative error = 7.4542568664300013500661931492659e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.18 y[1] (analytic) = -9.388412625965440527412909618238 y[1] (numeric) = -9.388412625965440527412909618237 absolute error = 1.0e-30 relative error = 1.0651427880729377278422299833250e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.181 y[1] (analytic) = -9.386217670930804206151729254698 y[1] (numeric) = -9.3862176709308042061517292546971 absolute error = 9e-31 relative error = 9.5885268332025544100615708260170e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.182 y[1] (analytic) = -9.384022576297886715336028390597 y[1] (numeric) = -9.3840225762978867153360283905961 absolute error = 9e-31 relative error = 9.5907697651241282667096474528590e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.183 y[1] (analytic) = -9.381827342069101898134249367684 y[1] (numeric) = -9.3818273420691018981342493676828 absolute error = 1.2e-30 relative error = 1.2790685185806752333987168078292e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 memory used=1945.5MB, alloc=4.6MB, time=118.85 TOP MAIN SOLVE Loop x[1] = 4.184 y[1] (analytic) = -9.379631968246862447634120096974 y[1] (numeric) = -9.3796319682468624476341200969728 absolute error = 1.2e-30 relative error = 1.2793678942440326791084611545522e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.185 y[1] (analytic) = -9.377436454833579907317369105641 y[1] (numeric) = -9.3774364548335799073173691056401 absolute error = 9e-31 relative error = 9.5975057184855344126341448666042e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.186 y[1] (analytic) = -9.375240801831664671534167291884 y[1] (numeric) = -9.3752408018316646715341672918831 absolute error = 9e-31 relative error = 9.5997534252577779970746153725324e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.187 y[1] (analytic) = -9.373045009243525985977296588497 y[1] (numeric) = -9.3730450092435259859772965884958 absolute error = 1.2e-30 relative error = 1.2802669770779740125424712347850e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.188 y[1] (analytic) = -9.370849077071571948156045735698 y[1] (numeric) = -9.3708490770715719481560457356973 absolute error = 7e-31 relative error = 7.4699741105931119885252662610849e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.189 y[1] (analytic) = -9.368653005318209507869833363592 y[1] (numeric) = -9.3686530053182095078698333635915 absolute error = 5e-31 relative error = 5.3369465142552510275377857225443e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.19 y[1] (analytic) = -9.366456793985844467681558584452 y[1] (numeric) = -9.3664567939858444676815585844507 absolute error = 1.3e-30 relative error = 1.3879314543304396209397126199597e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.191 y[1] (analytic) = -9.364260443076881483390679294838 y[1] (numeric) = -9.3642604430768814833906792948373 absolute error = 7e-31 relative error = 7.4752299367914209168875699261427e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1949.3MB, alloc=4.6MB, time=119.23 x[1] = 4.192 y[1] (analytic) = -9.362063952593724064506018387401 y[1] (numeric) = -9.3620639525937240645060183873997 absolute error = 1.3e-30 relative error = 1.3885826956350153586351890415019e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.193 y[1] (analytic) = -9.359867322538774574718298072001 y[1] (numeric) = -9.3598673225387745747182980719996 absolute error = 1.4e-30 relative error = 1.4957476978640156380410540158199e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.194 y[1] (analytic) = -9.35767055291443423237240250565 y[1] (numeric) = -9.3576705529144342323724025056484 absolute error = 1.6e-30 relative error = 1.7098272384698156492334300041488e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.195 y[1] (analytic) = -9.355473643723103110939368930555 y[1] (numeric) = -9.355473643723103110939368930554 absolute error = 1.0e-30 relative error = 1.0688929690598114134210951082809e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.196 y[1] (analytic) = -9.353276594967180139488107519401 y[1] (numeric) = -9.3532765949671801394881075194003 absolute error = 7e-31 relative error = 7.4840083353961397641782817332828e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.197 y[1] (analytic) = -9.351079406649063103156850126805 y[1] (numeric) = -9.3510794066490631031568501268036 absolute error = 1.4e-30 relative error = 1.4971533649949900758028737315589e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.198 y[1] (analytic) = -9.348882078771148643624328145714 y[1] (numeric) = -9.3488820787711486436243281457128 absolute error = 1.2e-30 relative error = 1.2835759290673740128558350284002e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.199 y[1] (analytic) = -9.346684611335832259580679667344 y[1] (numeric) = -9.3466846113358322595806796673429 absolute error = 1.1e-30 relative error = 1.1768878974111308095938987724232e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1953.1MB, alloc=4.6MB, time=119.60 x[1] = 4.2 y[1] (analytic) = -9.344487004345508307198086143055 y[1] (numeric) = -9.3444870043455083071980861430539 absolute error = 1.1e-30 relative error = 1.1771646741960924264050826764556e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.201 y[1] (analytic) = -9.342289257802570000601138746411 y[1] (numeric) = -9.3422892578025700006011387464097 absolute error = 1.3e-30 relative error = 1.3915218894707796646347126308331e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.202 y[1] (analytic) = -9.340091371709409412336934633477 y[1] (numeric) = -9.3400913717094094123369346334759 absolute error = 1.1e-30 relative error = 1.1777186712882013934961109662631e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.203 y[1] (analytic) = -9.337893346068417473844903299238 y[1] (numeric) = -9.3378933460684174738449032992365 absolute error = 1.5e-30 relative error = 1.6063580343114037791454926364074e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.204 y[1] (analytic) = -9.335695180881983975926363227836 y[1] (numeric) = -9.3356951808819839759263632278354 absolute error = 6e-31 relative error = 6.4269450573825973445321302928148e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.205 y[1] (analytic) = -9.333496876152497569213809034172 y[1] (numeric) = -9.3334968761524975692138090341706 absolute error = 1.4e-30 relative error = 1.4999737167931803628006525929675e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.206 y[1] (analytic) = -9.331298431882345764639929294194 y[1] (numeric) = -9.3312984318823457646399292941934 absolute error = 6e-31 relative error = 6.4299733245051264474316088874843e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.207 y[1] (analytic) = -9.329099848073914933906355261089 y[1] (numeric) = -9.3290998480739149339063552610886 absolute error = 4e-31 relative error = 4.2876591151780196875312331843021e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1957.0MB, alloc=4.6MB, time=119.98 x[1] = 4.208 y[1] (analytic) = -9.326901124729590309952140664337 y[1] (numeric) = -9.3269011247295903099521406643364 absolute error = 6e-31 relative error = 6.4330048316813851548802973802366e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.209 y[1] (analytic) = -9.324702261851755987421972788482 y[1] (numeric) = -9.3247022618517559874219727884809 absolute error = 1.1e-30 relative error = 1.1796623303461437509368123378383e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.21 y[1] (analytic) = -9.322503259442794923134115028255 y[1] (numeric) = -9.322503259442794923134115028254 absolute error = 1.0e-30 relative error = 1.0726732640045973004595829298800e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.211 y[1] (analytic) = -9.32030411750508893654808111653 y[1] (numeric) = -9.3203041175050889365480811165292 absolute error = 8e-31 relative error = 8.5834109049882426829017478484433e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.212 y[1] (analytic) = -9.318104836041018710232041221405 y[1] (numeric) = -9.3181048360410187102320412214044 absolute error = 6e-31 relative error = 6.4390775866707449160867888545046e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.213 y[1] (analytic) = -9.315905415052963790329960108539 y[1] (numeric) = -9.3159054150529637903299601085376 absolute error = 1.4e-30 relative error = 1.5028061553070636977784024882863e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.214 y[1] (analytic) = -9.313705854543302587028467564686 y[1] (numeric) = -9.313705854543302587028467564685 absolute error = 1.0e-30 relative error = 1.0736864741247886269085225653099e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.215 y[1] (analytic) = -9.311506154514412375023461278217 y[1] (numeric) = -9.3115061545144123750234612782163 absolute error = 7e-31 relative error = 7.5175808122150614861697109237795e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1960.8MB, alloc=4.6MB, time=120.35 x[1] = 4.216 y[1] (analytic) = -9.309306314968669293986442372209 y[1] (numeric) = -9.3093063149686692939864423722083 absolute error = 7e-31 relative error = 7.5193572573119898216218222002182e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.217 y[1] (analytic) = -9.307106335908448349030583785543 y[1] (numeric) = -9.3071063359084483490305837855425 absolute error = 5e-31 relative error = 5.3722390392265350983783516153656e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.218 y[1] (analytic) = -9.304906217336123411176531697261 y[1] (numeric) = -9.3049062173361234111765316972595 absolute error = 1.5e-30 relative error = 1.6120527869537528427786484890564e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.219 y[1] (analytic) = -9.30270595925406721781794018925 y[1] (numeric) = -9.3027059592540672178179401892491 absolute error = 9e-31 relative error = 9.6746043994296692331633546579897e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.22 y[1] (analytic) = -9.300505561664651373186739342182 y[1] (numeric) = -9.3005055616646513731867393421808 absolute error = 1.2e-30 relative error = 1.2902524406266985235750156822940e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.221 y[1] (analytic) = -9.298305024570246348818136959407 y[1] (numeric) = -9.2983050245702463488181369594066 absolute error = 4e-31 relative error = 4.3018593060027883677246191147405e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.222 y[1] (analytic) = -9.296104347973221484015354113395 y[1] (numeric) = -9.2961043479732214840153541133942 absolute error = 8e-31 relative error = 8.6057553793963124044298987765749e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.223 y[1] (analytic) = -9.293903531875944986314094709077 y[1] (numeric) = -9.2939035318759449863140947090764 absolute error = 6e-31 relative error = 6.4558449304120536820734830939102e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.224 y[1] (analytic) = -9.29170257628078393194674925833 y[1] (numeric) = -9.2917025762807839319467492583285 absolute error = 1.5e-30 relative error = 1.6143435368121837172999340848677e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1964.6MB, alloc=4.6MB, time=120.72 x[1] = 4.225 y[1] (analytic) = -9.289501481190104266306333059615 y[1] (numeric) = -9.2895014811901042663063330596146 absolute error = 4e-31 relative error = 4.3059361238053742199970745254398e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.226 y[1] (analytic) = -9.287300246606270804410158976669 y[1] (numeric) = -9.2873002466062708044101589766685 absolute error = 5e-31 relative error = 5.3836958720345889389222980288926e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.227 y[1] (analytic) = -9.285098872531647231363245009907 y[1] (numeric) = -9.2850988725316472313632450099057 absolute error = 1.3e-30 relative error = 1.4000927915219344304830065534216e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.228 y[1] (analytic) = -9.282897358968596102821456854089 y[1] (numeric) = -9.2828973589685961028214568540882 absolute error = 8e-31 relative error = 8.6179989831201405998386300033124e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.229 y[1] (analytic) = -9.280695705919478845454385635594 y[1] (numeric) = -9.2806957059194788454543856355932 absolute error = 8e-31 relative error = 8.6200434250822204307730539924780e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.23 y[1] (analytic) = -9.278493913386655757407961022466 y[1] (numeric) = -9.278493913386655757407961022465 absolute error = 1.0e-30 relative error = 1.0777611208616931769827814083851e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.231 y[1] (analytic) = -9.276291981372486008766799900258 y[1] (numeric) = -9.2762919813724860087667999002571 absolute error = 9e-31 relative error = 9.7021525606057875892396796800900e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.232 y[1] (analytic) = -9.274089909879327642016290806502 y[1] (numeric) = -9.2740899098793276420162908065008 absolute error = 1.2e-30 relative error = 1.2939275030336794829338728218177e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1968.4MB, alloc=4.6MB, time=121.10 x[1] = 4.233 y[1] (analytic) = -9.271887698909537572504414316465 y[1] (numeric) = -9.2718876989095375725044143164646 absolute error = 4e-31 relative error = 4.3141161000800712367332817837568e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.234 y[1] (analytic) = -9.269685348465471588903299572699 y[1] (numeric) = -9.2696853484654715889032995726984 absolute error = 6e-31 relative error = 6.4727116125826816620419229306100e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.235 y[1] (analytic) = -9.267482858549484353670517150686 y[1] (numeric) = -9.2674828585494843536705171506853 absolute error = 7e-31 relative error = 7.5532915537494900292701448033545e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.236 y[1] (analytic) = -9.265280229163929403510108452753 y[1] (numeric) = -9.2652802291639294035101084527526 absolute error = 4e-31 relative error = 4.3171926817813558846475097665564e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.237 y[1] (analytic) = -9.263077460311159149833351822225 y[1] (numeric) = -9.263077460311159149833351822224 absolute error = 1.0e-30 relative error = 1.0795548286027273097350829588783e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.238 y[1] (analytic) = -9.260874551993524879219265569625 y[1] (numeric) = -9.2608745519935248792192655696237 absolute error = 1.3e-30 relative error = 1.4037551126531110669882446714300e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.239 y[1] (analytic) = -9.258671504213376753874848102574 y[1] (numeric) = -9.2586715042133767538748481025735 absolute error = 5e-31 relative error = 5.4003428005028930102343207909648e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.24 y[1] (analytic) = -9.256468316973063812095055350855 y[1] (numeric) = -9.2564683169730638120950553508542 absolute error = 8e-31 relative error = 8.6426050692906832140496852750735e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1972.2MB, alloc=4.6MB, time=121.47 x[1] = 4.241 y[1] (analytic) = -9.254264990274933968722515677933 y[1] (numeric) = -9.254264990274933968722515677932 absolute error = 1.0e-30 relative error = 1.0805828459103710050170490179321e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.242 y[1] (analytic) = -9.252061524121334015606982470082 y[1] (numeric) = -9.2520615241213340156069824700813 absolute error = 7e-31 relative error = 7.5658813787068804224604723156641e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.243 y[1] (analytic) = -9.249857918514609622064524594067 y[1] (numeric) = -9.2498579185146096220645245940665 absolute error = 5e-31 relative error = 5.4054884345757886526283391852792e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.244 y[1] (analytic) = -9.247654173457105335336454914176 y[1] (numeric) = -9.2476541734571053353364549141748 absolute error = 1.2e-30 relative error = 1.2976263790705712475450196281088e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.245 y[1] (analytic) = -9.245450288951164581047997059225 y[1] (numeric) = -9.2454502889511645810479970592245 absolute error = 5e-31 relative error = 5.4080654199993725303459374969335e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.246 y[1] (analytic) = -9.243246264999129663666690630003 y[1] (numeric) = -9.2432462649991296636666906300021 absolute error = 9e-31 relative error = 9.7368389221433855548893051409479e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.247 y[1] (analytic) = -9.241042101603341766960535037417 y[1] (numeric) = -9.2410421016033417669605350374161 absolute error = 9e-31 relative error = 9.7391613424621013082997509551209e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.248 y[1] (analytic) = -9.238837798766140954455872161483 y[1] (numeric) = -9.2388377987661409544558721614825 absolute error = 5e-31 relative error = 5.4119361210863087494521597056215e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1976.0MB, alloc=4.6MB, time=121.85 x[1] = 4.249 y[1] (analytic) = -9.236633356489866169895008021093 y[1] (numeric) = -9.2366333564898661698950080210929 absolute error = 1e-31 relative error = 1.0826455499582838016774107573491e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.25 y[1] (analytic) = -9.234428774776855237693573644345 y[1] (numeric) = -9.2344287747768552376935736443449 absolute error = 1e-31 relative error = 1.0829040153857967634943330090203e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.251 y[1] (analytic) = -9.232224053629444863397625329048 y[1] (numeric) = -9.2322240536294448633976253290474 absolute error = 6e-31 relative error = 6.4989757236678334233437410027660e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.252 y[1] (analytic) = -9.230019193049970634140484482847 y[1] (numeric) = -9.2300191930499706341404844828461 absolute error = 9e-31 relative error = 9.7507922917179081022752439005167e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.253 y[1] (analytic) = -9.227814193040767019099317232246 y[1] (numeric) = -9.2278141930407670190993172322456 absolute error = 4e-31 relative error = 4.3347210036117039906739212452793e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.254 y[1] (analytic) = -9.225609053604167369951453989639 y[1] (numeric) = -9.2256090536041673699514539896382 absolute error = 8e-31 relative error = 8.6715142095411480110249652390143e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.255 y[1] (analytic) = -9.223403774742503921330449167282 y[1] (numeric) = -9.2234037747425039213304491672809 absolute error = 1.1e-30 relative error = 1.1926182859003258297633115564786e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.256 y[1] (analytic) = -9.221198356458107791281881226997 y[1] (numeric) = -9.2211983564581077912818812269963 absolute error = 7e-31 relative error = 7.5912042333386294413094147682160e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1979.8MB, alloc=4.6MB, time=122.23 x[1] = 4.257 y[1] (analytic) = -9.218992798753308981718893254205 y[1] (numeric) = -9.218992798753308981718893254205 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.258 y[1] (analytic) = -9.216787101630436378877474244731 y[1] (numeric) = -9.2167871016304363788774742447303 absolute error = 7e-31 relative error = 7.5948374664764797163422726471945e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.259 y[1] (analytic) = -9.214581265091817753771481292651 y[1] (numeric) = -9.2145812650918177537714812926502 absolute error = 8e-31 relative error = 8.6818920685054968877941070382374e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.26 y[1] (analytic) = -9.212375289139779762647402867305 y[1] (numeric) = -9.2123752891397797626474028673048 absolute error = 2e-31 relative error = 2.1709927540161612219936548772951e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.261 y[1] (analytic) = -9.210169173776647947438863367401 y[1] (numeric) = -9.2101691737766479474388633673999 absolute error = 1.1e-30 relative error = 1.1943320250098542336748449517711e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.262 y[1] (analytic) = -9.207962919004746736220869139984 y[1] (numeric) = -9.2079629190047467362208691399835 absolute error = 5e-31 relative error = 5.4300826838477654853208326110363e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.263 y[1] (analytic) = -9.205756524826399443663796151904 y[1] (numeric) = -9.2057565248263994436637961519039 absolute error = 1e-31 relative error = 1.0862768283119000110346795026830e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.264 y[1] (analytic) = -9.203549991243928271487119501194 y[1] (numeric) = -9.2035499912439282714871195011932 absolute error = 8e-31 relative error = 8.6922980889016070485886318031106e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.265 y[1] (analytic) = -9.201343318259654308912884955656 y[1] (numeric) = -9.2013433182596543089128849556554 absolute error = 6e-31 relative error = 6.5207870117108534950663930957153e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1983.7MB, alloc=4.6MB, time=122.61 x[1] = 4.266 y[1] (analytic) = -9.199136505875897533118922705771 y[1] (numeric) = -9.1991365058758975331189227057703 absolute error = 7e-31 relative error = 7.6094098565977238619218900574908e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.267 y[1] (analytic) = -9.196929554094976809691803518863 y[1] (numeric) = -9.196929554094976809691803518862 absolute error = 1.0e-30 relative error = 1.0873194081982994246922493812000e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.268 y[1] (analytic) = -9.194722462919209893079537481314 y[1] (numeric) = -9.1947224629192098930795374813134 absolute error = 6e-31 relative error = 6.5254824429959734853475202343990e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.269 y[1] (analytic) = -9.192515232350913427044015515445 y[1] (numeric) = -9.1925152323509134270440155154444 absolute error = 6e-31 relative error = 6.5270492877557595507445144300115e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.27 y[1] (analytic) = -9.190307862392402945113193857507 y[1] (numeric) = -9.1903078623924029451131938575069 absolute error = 1e-31 relative error = 1.0881028306919872413573843846297e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.271 y[1] (analytic) = -9.188100353045992871033021683084 y[1] (numeric) = -9.188100353045992871033021683084 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.272 y[1] (analytic) = -9.185892704313996519219112066018 y[1] (numeric) = -9.1858927043139965192191120660175 absolute error = 5e-31 relative error = 5.4431291121567705615041068300332e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.273 y[1] (analytic) = -9.183684916198726095208156456823 y[1] (numeric) = -9.1836849161987260952081564568228 absolute error = 2e-31 relative error = 2.1777750633324558263211918567454e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1987.5MB, alloc=4.6MB, time=122.98 x[1] = 4.274 y[1] (analytic) = -9.181476988702492696109082866387 y[1] (numeric) = -9.1814769887024926961090828663867 absolute error = 3e-31 relative error = 3.2674481498907005200225468425908e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.275 y[1] (analytic) = -9.17926892182760631105395794058 y[1] (numeric) = -9.17926892182760631105395794058 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.276 y[1] (analytic) = -9.177060715576375821648633111252 y[1] (numeric) = -9.1770607155763758216486331112513 absolute error = 7e-31 relative error = 7.6277145994237404073288695947642e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.277 y[1] (analytic) = -9.174852369951109002423135008908 y[1] (numeric) = -9.1748523699511090024231350089076 absolute error = 4e-31 relative error = 4.3597431748335752450910054273190e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.278 y[1] (analytic) = -9.172643884954112521281800322222 y[1] (numeric) = -9.1726438849541125212818003222217 absolute error = 3e-31 relative error = 3.2705946482026844043684639832312e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.279 y[1] (analytic) = -9.170435260587691939953155289344 y[1] (numeric) = -9.1704352605876919399531552893439 absolute error = 1e-31 relative error = 1.0904607813957944007053239914148e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.28 y[1] (analytic) = -9.168226496854151714439540005833 y[1] (numeric) = -9.168226496854151714439540005833 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.281 y[1] (analytic) = -9.166017593755795195466477733857 y[1] (numeric) = -9.1660175937557951954664777338572 absolute error = 2e-31 relative error = 2.1819726828393482802767428574808e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1991.3MB, alloc=4.6MB, time=123.35 x[1] = 4.282 y[1] (analytic) = -9.163808551294924628931789397155 y[1] (numeric) = -9.163808551294924628931789397155 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.283 y[1] (analytic) = -9.161599369473841156354453446082 y[1] (numeric) = -9.1615993694738411563544534460816 absolute error = 4e-31 relative error = 4.3660498988068319959787718014904e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.284 y[1] (analytic) = -9.159390048294844815323211276905 y[1] (numeric) = -9.1593900482948448153232112769051 absolute error = 1e-31 relative error = 1.0917757566030990340755493941037e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.285 y[1] (analytic) = -9.157180587760234539944918389354 y[1] (numeric) = -9.157180587760234539944918389354 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.286 y[1] (analytic) = -9.154970987872308161292641466256 y[1] (numeric) = -9.1549709878723081612926414662561 absolute error = 1e-31 relative error = 1.0923027515048503337501522705798e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.287 y[1] (analytic) = -9.152761248633362407853501558946 y[1] (numeric) = -9.1527612486333624078535015589463 absolute error = 3e-31 relative error = 3.2776993942106189220093593980614e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.288 y[1] (analytic) = -9.15055137004569290597626356196 y[1] (numeric) = -9.1505513700456929059762635619597 absolute error = 3e-31 relative error = 3.2784909659329300307014829777935e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.289 y[1] (analytic) = -9.148341352111594180318672160365 y[1] (numeric) = -9.1483413521115941803186721603645 absolute error = 5e-31 relative error = 5.4654716167165255526286740804370e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=1995.1MB, alloc=4.6MB, time=123.72 x[1] = 4.29 y[1] (analytic) = -9.146131194833359654294534432928 y[1] (numeric) = -9.1461311948333596542945344329277 absolute error = 3e-31 relative error = 3.2800754068503817148380127986208e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.291 y[1] (analytic) = -9.143920898213281650520549294147 y[1] (numeric) = -9.1439208982132816505205492941465 absolute error = 5e-31 relative error = 5.4681137945725207721125879920078e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.292 y[1] (analytic) = -9.141710462253651391262883958015 y[1] (numeric) = -9.1417104622536513912628839580151 absolute error = 1e-31 relative error = 1.0938871933529559198941703894392e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.293 y[1] (analytic) = -9.139499886956758998883497606239 y[1] (numeric) = -9.1394998869567589988834976062384 absolute error = 6e-31 relative error = 6.5649106342927703904097867759475e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.294 y[1] (analytic) = -9.137289172324893496286212443441 y[1] (numeric) = -9.1372891723248934962862124434411 absolute error = 1e-31 relative error = 1.0944164961187934261190808193227e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.295 y[1] (analytic) = -9.135078318360342807362532321762 y[1] (numeric) = -9.1350783183603428073625323217615 absolute error = 5e-31 relative error = 5.4734068233992449083039241792767e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.296 y[1] (analytic) = -9.132867325065393757437209117059 y[1] (numeric) = -9.1328673250653937574372091170588 absolute error = 2e-31 relative error = 2.1898927563646387126593662121515e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.297 y[1] (analytic) = -9.130656192442332073713557038802 y[1] (numeric) = -9.1306561924423320737135570388018 absolute error = 2e-31 relative error = 2.1904230734867106492837048593265e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.298 y[1] (analytic) = -9.128444920493442385718515055548 y[1] (numeric) = -9.1284449204934423857185150555475 absolute error = 5e-31 relative error = 5.4773842024011715756368128643403e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=1998.9MB, alloc=4.6MB, time=124.09 TOP MAIN SOLVE Loop x[1] = 4.299 y[1] (analytic) = -9.126233509221008225747457617759 y[1] (numeric) = -9.1262335092210082257474576177584 absolute error = 6e-31 relative error = 6.5744537370621634884482933302498e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.3 y[1] (analytic) = -9.124021958627312029308753859547 y[1] (numeric) = -9.1240219586273120293087538595468 absolute error = 2e-31 relative error = 2.1920157679025307471054506896958e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.301 y[1] (analytic) = -9.121810268714635135568075460776 y[1] (numeric) = -9.1218102687146351355680754607753 absolute error = 7e-31 relative error = 7.6739153674442497679725408813748e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.302 y[1] (analytic) = -9.119598439485257787792453350784 y[1] (numeric) = -9.1195984394852577877924533507842 absolute error = 2e-31 relative error = 2.1930790190723430960435199025227e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.303 y[1] (analytic) = -9.117386470941459133794083434856 y[1] (numeric) = -9.1173864709414591337940834348554 absolute error = 6e-31 relative error = 6.5808332454952317528613824670437e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.304 y[1] (analytic) = -9.115174363085517226373881524365 y[1] (numeric) = -9.115174363085517226373881524365 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.305 y[1] (analytic) = -9.112962115919709023764787651418 y[1] (numeric) = -9.1129621159197090237647876514174 absolute error = 6e-31 relative error = 6.5840282486398342507543359255159e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.306 y[1] (analytic) = -9.110749729446310390074819948595 y[1] (numeric) = -9.1107497294463103900748199485946 absolute error = 4e-31 relative error = 4.3904180432833521433799753289296e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2002.7MB, alloc=4.6MB, time=124.47 x[1] = 4.307 y[1] (analytic) = -9.108537203667596095729878274297 y[1] (numeric) = -9.1085372036675960957298782742963 absolute error = 7e-31 relative error = 7.6850978850713992803817270703936e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.308 y[1] (analytic) = -9.106324538585839817916297763989 y[1] (numeric) = -9.1063245385858398179162977639884 absolute error = 6e-31 relative error = 6.5888273304739540127768299956965e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.309 y[1] (analytic) = -9.104111734203314141023152487518 y[1] (numeric) = -9.104111734203314141023152487518 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.31 y[1] (analytic) = -9.101898790522290557084309392497 y[1] (numeric) = -9.1018987905222905570843093924965 absolute error = 5e-31 relative error = 5.4933592595057706999715475516138e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.311 y[1] (analytic) = -9.099685707545039466220232713593 y[1] (numeric) = -9.0996857075450394662202327135929 absolute error = 1e-31 relative error = 1.0989390536541785689596409743612e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.312 y[1] (analytic) = -9.097472485273830177079539027424 y[1] (numeric) = -9.0974724852738301770795390274235 absolute error = 5e-31 relative error = 5.4960320111916250089258260946559e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.313 y[1] (analytic) = -9.095259123710930907280303132565 y[1] (numeric) = -9.0952591237109309072803031325649 absolute error = 1e-31 relative error = 1.0994738977727913628707044566468e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.314 y[1] (analytic) = -9.093045622858608783851114934061 y[1] (numeric) = -9.093045622858608783851114934061 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2006.5MB, alloc=4.6MB, time=124.84 x[1] = 4.315 y[1] (analytic) = -9.090831982719129843671887511637 y[1] (numeric) = -9.090831982719129843671887511637 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.316 y[1] (analytic) = -9.088618203294759033914416550676 y[1] (numeric) = -9.0886182032947590339144165506756 absolute error = 4e-31 relative error = 4.4011090690881267446551144992419e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.317 y[1] (analytic) = -9.086404284587760212482691314857 y[1] (numeric) = -9.086404284587760212482691314856 absolute error = 1.0e-30 relative error = 1.1005453518023481366568053526617e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.318 y[1] (analytic) = -9.084190226600396148452957339196 y[1] (numeric) = -9.0841902266003961484529573391961 absolute error = 1e-31 relative error = 1.1008135838809190260205367626096e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.319 y[1] (analytic) = -9.081976029334928522513531022086 y[1] (numeric) = -9.0819760293349285225135310220852 absolute error = 8e-31 relative error = 8.8086557090217717373857382548172e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.32 y[1] (analytic) = -9.079761692793617927404366294736 y[1] (numeric) = -9.0797616927936179274043662947357 absolute error = 3e-31 relative error = 3.3040514734885891669911729832200e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.321 y[1] (analytic) = -9.077547216978723868356373546327 y[1] (numeric) = -9.0775472169787238683563735463265 absolute error = 5e-31 relative error = 5.5080958330329102348803919763709e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.322 y[1] (analytic) = -9.075332601892504763530490982956 y[1] (numeric) = -9.075332601892504763530490982956 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2010.4MB, alloc=4.6MB, time=125.21 x[1] = 4.323 y[1] (analytic) = -9.073117847537217944456508598365 y[1] (numeric) = -9.0731178475372179444565085983645 absolute error = 5e-31 relative error = 5.5107848085067981276526919502070e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.324 y[1] (analytic) = -9.070902953915119656471644934232 y[1] (numeric) = -9.0709029539151196564716449342323 absolute error = 3e-31 relative error = 3.3072782447806488696297033110504e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.325 y[1] (analytic) = -9.068687921028465059158876807702 y[1] (numeric) = -9.0686879210284650591588768077019 absolute error = 1e-31 relative error = 1.1026953498765802012244087216945e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.326 y[1] (analytic) = -9.06647274887950822678502218362 y[1] (numeric) = -9.0664727488795082267850221836196 absolute error = 4e-31 relative error = 4.4118590666853823377790311140761e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.327 y[1] (analytic) = -9.064257437470502148738576368834 y[1] (numeric) = -9.0642574374705021487385763688341 absolute error = 1e-31 relative error = 1.1032343320988717275975700751508e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.328 y[1] (analytic) = -9.062041986803698729967301705737 y[1] (numeric) = -9.0620419868036987299673017057368 absolute error = 2e-31 relative error = 2.2070080925606329892126216218819e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.329 y[1] (analytic) = -9.059826396881348791415570942072 y[1] (numeric) = -9.0598263968813487914155709420719 absolute error = 1e-31 relative error = 1.1037739093369698382253440320932e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.33 y[1] (analytic) = -9.05761066770570207046146445389 y[1] (numeric) = -9.0576106677057020704614644538899 absolute error = 1e-31 relative error = 1.1040439213902539799676845022926e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2014.2MB, alloc=4.6MB, time=125.58 x[1] = 4.331 y[1] (analytic) = -9.055394799279007221353621498364 y[1] (numeric) = -9.0553947992790072213536214983644 absolute error = 4e-31 relative error = 4.4172563302468943613080252800816e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.332 y[1] (analytic) = -9.053178791603511815647845673037 y[1] (numeric) = -9.0531787916035118156478456730368 absolute error = 2e-31 relative error = 2.2091687859461319385889396583915e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.333 y[1] (analytic) = -9.050962644681462342643464757898 y[1] (numeric) = -9.0509626446814623426434647578983 absolute error = 3e-31 relative error = 3.3145645582383036815127887846451e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.334 y[1] (analytic) = -9.048746358515104209819445116567 y[1] (numeric) = -9.0487463585151042098194451165666 absolute error = 4e-31 relative error = 4.4205018480111298627003497755406e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.335 y[1] (analytic) = -9.046529933106681743270260832659 y[1] (numeric) = -9.0465299331066817432702608326588 absolute error = 2e-31 relative error = 2.2107924417303919186963116024105e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.336 y[1] (analytic) = -9.044313368458438188141517757309 y[1] (numeric) = -9.0443133684584381881415177573088 absolute error = 2e-31 relative error = 2.2113342589111226745111955748269e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.337 y[1] (analytic) = -9.042096664572615709065332643624 y[1] (numeric) = -9.042096664572615709065332643624 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.338 y[1] (analytic) = -9.039879821451455390595467543722 y[1] (numeric) = -9.0398798214514553905954675437222 absolute error = 2e-31 relative error = 2.2124187926193882539024587515197e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.339 y[1] (analytic) = -9.037662839097197237642219643836 y[1] (numeric) = -9.037662839097197237642219643836 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2018.0MB, alloc=4.6MB, time=125.95 x[1] = 4.34 y[1] (analytic) = -9.03544571751208017590706671282 y[1] (numeric) = -9.03544571751208017590706671282 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.341 y[1] (analytic) = -9.033228456698342052317068339241 y[1] (numeric) = -9.0332284566983420523170683392413 absolute error = 3e-31 relative error = 3.3210717678411338438702660296733e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.342 y[1] (analytic) = -9.031011056658219635459023132082 y[1] (numeric) = -9.0310110566582196354590231320819 absolute error = 1e-31 relative error = 1.1072957321458909978818211631158e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.343 y[1] (analytic) = -9.028793517393948616013382059929 y[1] (numeric) = -9.0287935173939486160133820599288 absolute error = 2e-31 relative error = 2.2151353845306185088806580085550e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.344 y[1] (analytic) = -9.026575838907763607187918103375 y[1] (numeric) = -9.026575838907763607187918103375 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.345 y[1] (analytic) = -9.024358021201898145151152395201 y[1] (numeric) = -9.0243580212018981451511523952016 absolute error = 6e-31 relative error = 6.6486723885550113611824600303373e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.346 y[1] (analytic) = -9.02214006427858468946553702276 y[1] (numeric) = -9.0221400642785846894655370227598 absolute error = 2e-31 relative error = 2.2167689547612017774501497158553e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.347 y[1] (analytic) = -9.019921968140054623520394666819 y[1] (numeric) = -9.0199219681400546235203946668185 absolute error = 5e-31 relative error = 5.5432852054162734279531463691070e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2021.8MB, alloc=4.6MB, time=126.32 x[1] = 4.348 y[1] (analytic) = -9.017703732788538254964615250992 y[1] (numeric) = -9.017703732788538254964615250992 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.349 y[1] (analytic) = -9.015485358226264816139109775711 y[1] (numeric) = -9.0154853582262648161391097757103 absolute error = 7e-31 relative error = 7.7644183555938936181171066568106e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.35 y[1] (analytic) = -9.013266844455462464509021510543 y[1] (numeric) = -9.0132668444554624645090215105425 absolute error = 5e-31 relative error = 5.5473781995878272095293697935072e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.351 y[1] (analytic) = -9.011048191478358283095694718533 y[1] (numeric) = -9.0110481914783582830956947185328 absolute error = 2e-31 relative error = 2.2194976183696102630178165224429e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.352 y[1] (analytic) = -9.008829399297178280908401086057 y[1] (numeric) = -9.0088293992971782809084010860565 absolute error = 5e-31 relative error = 5.5501106507689820731561470972477e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.353 y[1] (analytic) = -9.006610467914147393375824031553 y[1] (numeric) = -9.0066104679141473933758240315533 absolute error = 3e-31 relative error = 3.3308868088471621147621294265300e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.354 y[1] (analytic) = -9.004391397331489482777301066343 y[1] (numeric) = -9.0043913973314894827773010663434 absolute error = 4e-31 relative error = 4.4422769107809177038699628168905e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.355 y[1] (analytic) = -9.00217218755142733867382438058 y[1] (numeric) = -9.0021721875514273386738243805805 absolute error = 5e-31 relative error = 5.5542150225855543271306983725143e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2025.6MB, alloc=4.6MB, time=126.70 x[1] = 4.356 y[1] (analytic) = -8.999952838576182678338799827247 y[1] (numeric) = -8.9999528385761826783387998272468 absolute error = 2e-31 relative error = 2.2222338670792473922262892139228e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.357 y[1] (analytic) = -8.997733350407976147188564476943 y[1] (numeric) = -8.9977333504079761471885644769426 absolute error = 4e-31 relative error = 4.4455640595513219896546831590979e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.358 y[1] (analytic) = -8.995513723049027319212662916074 y[1] (numeric) = -8.9955137230490273192126629160741 absolute error = 1e-31 relative error = 1.1116652486869312769981754510262e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.359 y[1] (analytic) = -8.993293956501554697403882460892 y[1] (numeric) = -8.9932939565015546974038824608917 absolute error = 3e-31 relative error = 3.3358189051867909785484263752487e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.36 y[1] (analytic) = -8.991074050767775714188047459682 y[1] (numeric) = -8.9910740507677757141880474596819 absolute error = 1e-31 relative error = 1.1122141741393030756008651931411e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.361 y[1] (analytic) = -8.988854005849906731853572855266 y[1] (numeric) = -8.9888540058499067318535728552655 absolute error = 5e-31 relative error = 5.5624443302183147559294146195510e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.362 y[1] (analytic) = -8.986633821750163042980777179804 y[1] (numeric) = -8.9866338217501630429807771798044 absolute error = 4e-31 relative error = 4.4510548436043795885346346245300e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.363 y[1] (analytic) = -8.984413498470758870870955153771 y[1] (numeric) = -8.9844134984707588708709551537709 absolute error = 1e-31 relative error = 1.1130387088374888991771110836263e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2029.4MB, alloc=4.6MB, time=127.07 x[1] = 4.364 y[1] (analytic) = -8.982193036013907369975210060783 y[1] (numeric) = -8.9821930360139073699752100607833 absolute error = 3e-31 relative error = 3.3399415799366205245237877774074e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.365 y[1] (analytic) = -8.979972434381820626323046069862 y[1] (numeric) = -8.9799724343818206263230460698616 absolute error = 4e-31 relative error = 4.4543566578056641227157703685052e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.366 y[1] (analytic) = -8.977751693576709657950720676509 y[1] (numeric) = -8.977751693576709657950720676509 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.367 y[1] (analytic) = -8.975530813600784415329357433876 y[1] (numeric) = -8.9755308136007844153293574338755 absolute error = 5e-31 relative error = 5.5707011694766948325467663008541e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.368 y[1] (analytic) = -8.973309794456253781792819145111 y[1] (numeric) = -8.9733097944562537817928191451105 absolute error = 5e-31 relative error = 5.5720799955987474547182625016055e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.369 y[1] (analytic) = -8.971088636145325573965341687863 y[1] (numeric) = -8.9710886361453255739653416878635 absolute error = 5e-31 relative error = 5.5734595909068926722371999696331e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.37 y[1] (analytic) = -8.968867338670206542188928641742 y[1] (numeric) = -8.9688673386702065421889286417421 absolute error = 1e-31 relative error = 1.1149679912070900516158086563572e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.371 y[1] (analytic) = -8.96664590203310237095050688939 y[1] (numeric) = -8.9666459020331023709505068893898 absolute error = 2e-31 relative error = 2.2304884366477758055633397465536e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.372 memory used=2033.3MB, alloc=4.6MB, time=127.44 y[1] (analytic) = -8.964424326236217679308843361696 y[1] (numeric) = -8.9644243262362176793088433616964 absolute error = 4e-31 relative error = 4.4620823986356641872007527849499e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.373 y[1] (analytic) = -8.962202611281756021321223097506 y[1] (numeric) = -8.9622026112817560213212230975061 absolute error = 1e-31 relative error = 1.1157971353394587341521480149418e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.374 y[1] (analytic) = -8.959980757171919886469888788041 y[1] (numeric) = -8.9599807571719198864698887880411 absolute error = 1e-31 relative error = 1.1160738254929407003668678932368e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.375 y[1] (analytic) = -8.957758763908910700088241976109 y[1] (numeric) = -8.9577587639089107000882419761089 absolute error = 1e-31 relative error = 1.1163506702469273597652796146653e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.376 y[1] (analytic) = -8.955536631494928823786806080017 y[1] (numeric) = -8.9555366314949288237868060800167 absolute error = 3e-31 relative error = 3.3498830091873749985713710366401e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.377 y[1] (analytic) = -8.953314359932173555878951411965 y[1] (numeric) = -8.9533143599321735558789514119655 absolute error = 5e-31 relative error = 5.5845241203369048702977384454233e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.378 y[1] (analytic) = -8.951091949222843131806382360552 y[1] (numeric) = -8.9510919492228431318063823605521 absolute error = 1e-31 relative error = 1.1171821333896838997377287729159e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.379 y[1] (analytic) = -8.948869399369134724564386906857 y[1] (numeric) = -8.9488693993691347245643869068574 absolute error = 4e-31 relative error = 4.4698383912966553996059035393605e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.38 y[1] (analytic) = -8.946646710373244445126848643454 y[1] (numeric) = -8.9466467103732444451268486434544 absolute error = 4e-31 relative error = 4.4709488699963702009004101887957e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2037.1MB, alloc=4.6MB, time=127.83 x[1] = 4.381 y[1] (analytic) = -8.944423882237367342871021465521 y[1] (numeric) = -8.9444238822373673428710214655214 absolute error = 4e-31 relative error = 4.4720599701715342975647811981244e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.382 y[1] (analytic) = -8.942200914963697406002067103099 y[1] (numeric) = -8.9422009149636974060020671030991 absolute error = 1e-31 relative error = 1.1182929230840925400922378417142e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.383 y[1] (analytic) = -8.939977808554427561977355663384 y[1] (numeric) = -8.9399778085544275619773556633842 absolute error = 2e-31 relative error = 2.2371420185028346107147711516575e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.384 y[1] (analytic) = -8.937754563011749677930529351805 y[1] (numeric) = -8.9377545630117496779305293518048 absolute error = 2e-31 relative error = 2.2376985023473963304100399489122e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.385 y[1] (analytic) = -8.935531178337854561095329540477 y[1] (numeric) = -8.9355311783378545610953295404776 absolute error = 6e-31 relative error = 6.7147658938795082917302815763425e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.386 y[1] (analytic) = -8.9333076545349319592291873525 y[1] (numeric) = -8.9333076545349319592291873525001 absolute error = 1e-31 relative error = 1.1194062027992027158682379644787e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.387 y[1] (analytic) = -8.931083991605170561036577930385 y[1] (numeric) = -8.9310839916051705610365779303849 absolute error = 1e-31 relative error = 1.1196849127608209561132479295229e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.388 y[1] (analytic) = -8.928860189550757996592138556798 y[1] (numeric) = -8.9288601895507579965921385567982 absolute error = 2e-31 relative error = 2.2399275579883695707905550577509e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2040.9MB, alloc=4.6MB, time=128.20 x[1] = 4.389 y[1] (analytic) = -8.926636248373880837763550795617 y[1] (numeric) = -8.9266362483738808377635507956172 absolute error = 2e-31 relative error = 2.2404856032576992898273675571293e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.39 y[1] (analytic) = -8.924412168076724598634186821178 y[1] (numeric) = -8.9244121680767245986341868211778 absolute error = 2e-31 relative error = 2.2410439615890291992983524589889e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.391 y[1] (analytic) = -8.922187948661473735925520103437 y[1] (numeric) = -8.9221879486614737359255201034364 absolute error = 6e-31 relative error = 6.7248078997261352238874292489172e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.392 y[1] (analytic) = -8.919963590130311649419300616626 y[1] (numeric) = -8.9199635901303116494193006166255 absolute error = 5e-31 relative error = 5.6054040461918018381820687184194e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.393 y[1] (analytic) = -8.917739092485420682379494738839 y[1] (numeric) = -8.9177390924854206823794947388384 absolute error = 6e-31 relative error = 6.7281627526599553318086136268021e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.394 y[1] (analytic) = -8.915514455728982121973990009831 y[1] (numeric) = -8.9155144557289821219739900098309 absolute error = 1e-31 relative error = 1.1216402653661946532351712918506e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.395 y[1] (analytic) = -8.913289679863176199696064914186 y[1] (numeric) = -8.9132896798631761996960649141856 absolute error = 4e-31 relative error = 4.4876809165495473448534610669672e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.396 y[1] (analytic) = -8.911064764890182091785623856838 y[1] (numeric) = -8.9110647648901820917856238568383 absolute error = 3e-31 relative error = 3.3666010506624023044204713491533e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2044.7MB, alloc=4.6MB, time=128.58 x[1] = 4.397 y[1] (analytic) = -8.908839710812177919650197497823 y[1] (numeric) = -8.9088397108121779196501974978226 absolute error = 4e-31 relative error = 4.4899225149885858786414272154042e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.398 y[1] (analytic) = -8.906614517631340750285708612942 y[1] (numeric) = -8.9066145176313407502857086129421 absolute error = 1e-31 relative error = 1.1227610648472791861064595815696e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.399 y[1] (analytic) = -8.904389185349846596697003646939 y[1] (numeric) = -8.9043891853498465966970036469391 absolute error = 1e-31 relative error = 1.1230416586521995891143845925790e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.4 y[1] (analytic) = -8.90216371396987041831815012558 y[1] (numeric) = -8.9021637139698704183181501255803 absolute error = 3e-31 relative error = 3.3699672308791619357257678876168e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.401 y[1] (analytic) = -8.89993810349358612143250009294 y[1] (numeric) = -8.89993810349358612143250009294 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.402 y[1] (analytic) = -8.897712353923166559592519740015 y[1] (numeric) = -8.897712353923166559592519740015 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.403 y[1] (analytic) = -8.895486465260783534039385390662 y[1] (numeric) = -8.8954864652607835340393853906619 absolute error = 1e-31 relative error = 1.1241656135448727388349990725019e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.404 y[1] (analytic) = -8.893260437508607794122346010706 y[1] (numeric) = -8.8932604375086077941223460107059 absolute error = 1e-31 relative error = 1.1244469978438457253086680592775e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2048.5MB, alloc=4.6MB, time=128.95 x[1] = 4.405 y[1] (analytic) = -8.891034270668809037717852405924 y[1] (numeric) = -8.8910342706688090377178524059245 absolute error = 5e-31 relative error = 5.6236427031833785671838268936892e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.406 y[1] (analytic) = -8.888807964743555911648453274468 y[1] (numeric) = -8.8888079647435559116484532744678 absolute error = 2e-31 relative error = 2.2500204841107740650599254204562e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.407 y[1] (analytic) = -8.886581519735016012101458279133 y[1] (numeric) = -8.8865815197350160121014582791336 absolute error = 6e-31 relative error = 6.7517526133929063796852733245520e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.408 y[1] (analytic) = -8.884354935645355885047368304772 y[1] (numeric) = -8.884354935645355885047368304772 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.409 y[1] (analytic) = -8.882128212476741026658073065953 y[1] (numeric) = -8.882128212476741026658073065953 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.41 y[1] (analytic) = -8.879901350231335883724816229886 y[1] (numeric) = -8.8799013502313358837248162298858 absolute error = 2e-31 relative error = 2.2522772732693666069381403271180e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.411 y[1] (analytic) = -8.877674348911303854075928219438 y[1] (numeric) = -8.8776743489113038540759282194383 absolute error = 3e-31 relative error = 3.3792633995049605575026895882815e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.412 y[1] (analytic) = -8.875447208518807286994326860961 y[1] (numeric) = -8.8754472085188072869943268609609 absolute error = 1e-31 relative error = 1.1267037891230796292646741069667e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.413 y[1] (analytic) = -8.873219929056007483634786041478 y[1] (numeric) = -8.8732199290560074836347860414781 absolute error = 1e-31 relative error = 1.1269866046320196326765078509995e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=2052.3MB, alloc=4.6MB, time=129.32 TOP MAIN SOLVE Loop x[1] = 4.414 y[1] (analytic) = -8.870992510525064697440972539668 y[1] (numeric) = -8.8709925105250646974409725396683 absolute error = 3e-31 relative error = 3.3818087394850400586573204892770e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.415 y[1] (analytic) = -8.868764952928138134562251194911 y[1] (numeric) = -8.8687649529281381345622511949112 absolute error = 2e-31 relative error = 2.2551054296908319566935735956026e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.416 y[1] (analytic) = -8.86653725626738595427025857854 y[1] (numeric) = -8.8665372562673859542702585785395 absolute error = 5e-31 relative error = 5.6391800490836580161857453871545e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.417 y[1] (analytic) = -8.86430942054496526937524533129 y[1] (numeric) = -8.8643094205449652693752453312903 absolute error = 3e-31 relative error = 3.3843583946278403056703390850198e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.418 y[1] (analytic) = -8.862081445763032146642187330811 y[1] (numeric) = -8.8620814457630321466421873308114 absolute error = 4e-31 relative error = 4.5136123206274560142999235911884e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.419 y[1] (analytic) = -8.859853331923741607206665852934 y[1] (numeric) = -8.8598533319237416072066658529336 absolute error = 4e-31 relative error = 4.5147474231737414705048614406732e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.42 y[1] (analytic) = -8.857625079029247626990516890282 y[1] (numeric) = -8.8576250790292476269905168902821 absolute error = 1e-31 relative error = 1.1289707919197626589219449081303e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.421 y[1] (analytic) = -8.855396687081703137117249791656 y[1] (numeric) = -8.8553966870817031371172497916565 absolute error = 5e-31 relative error = 5.6462744433504881185627355767622e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2056.1MB, alloc=4.6MB, time=129.69 x[1] = 4.422 y[1] (analytic) = -8.853168156083260024327235385469 y[1] (numeric) = -8.8531681560832600243272353854695 absolute error = 5e-31 relative error = 5.6476957308942108289999732583195e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.423 y[1] (analytic) = -8.850939486036069131392663750394 y[1] (numeric) = -8.8509394860360691313926637503933 absolute error = 7e-31 relative error = 7.9087649520638398948138865776682e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.424 y[1] (analytic) = -8.848710676942280257532271796222 y[1] (numeric) = -8.8487106769422802575322717962217 absolute error = 3e-31 relative error = 3.3903244320297589331046002035262e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.425 y[1] (analytic) = -8.846481728804042158825840817816 y[1] (numeric) = -8.8464817288040421588258408178161 absolute error = 1e-31 relative error = 1.1303928846018090667494104479988e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.426 y[1] (analytic) = -8.844252641623502548628464184862 y[1] (numeric) = -8.8442526416235025486284641848621 absolute error = 1e-31 relative error = 1.1306777864912214597200732482788e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.427 y[1] (analytic) = -8.842023415402808097984585330026 y[1] (numeric) = -8.8420234154028080979845853300255 absolute error = 5e-31 relative error = 5.6548142490665633492757909007749e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.428 y[1] (analytic) = -8.839794050144104436041806197953 y[1] (numeric) = -8.8397940501441044360418061979534 absolute error = 4e-31 relative error = 4.5249922988135598630474830760343e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.429 y[1] (analytic) = -8.837564545849536150464466317429 y[1] (numeric) = -8.8375645458495361504644663174287 absolute error = 3e-31 relative error = 3.3946003838907367502009303787350e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2060.0MB, alloc=4.6MB, time=130.06 x[1] = 4.43 y[1] (analytic) = -8.835334902521246787846992658846 y[1] (numeric) = -8.8353349025212467878469926588459 absolute error = 1e-31 relative error = 1.1318190097294902717604239903564e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.431 y[1] (analytic) = -8.833105120161378854127020439035 y[1] (numeric) = -8.8331051201613788541270204390352 absolute error = 2e-31 relative error = 2.2642094402737736777919196868396e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.432 y[1] (analytic) = -8.830875198772073814998285035325 y[1] (numeric) = -8.8308751987720738149982850353247 absolute error = 3e-31 relative error = 3.3971717779650510949483374291083e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.433 y[1] (analytic) = -8.828645138355472096323285170589 y[1] (numeric) = -8.8286451383554720963232851705887 absolute error = 3e-31 relative error = 3.3980298822598452472067098415058e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.434 y[1] (analytic) = -8.826414938913713084545717530894 y[1] (numeric) = -8.8264149389137130845457175308936 absolute error = 4e-31 relative error = 4.5318512982716050247346458030691e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.435 y[1] (analytic) = -8.824184600448935127102682977211 y[1] (numeric) = -8.8241846004489351271026829772111 absolute error = 1e-31 relative error = 1.1332491842352487314733121984665e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.436 y[1] (analytic) = -8.821954122963275532836664512531 y[1] (numeric) = -8.8219541229632755328366645125316 absolute error = 6e-31 relative error = 6.8012142393511028881830719221703e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.437 y[1] (analytic) = -8.819723506458870572407277165571 y[1] (numeric) = -8.819723506458870572407277165571 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2063.8MB, alloc=4.6MB, time=130.44 x[1] = 4.438 y[1] (analytic) = -8.817492750937855478702789952125 y[1] (numeric) = -8.8174927509378554787027899521252 absolute error = 2e-31 relative error = 2.2682184794393779197791648756897e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.439 y[1] (analytic) = -8.81526185640236444725142007499 y[1] (numeric) = -8.8152618564023644472514200749895 absolute error = 5e-31 relative error = 5.6719812541570627165100377316194e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.44 y[1] (analytic) = -8.81303082285453063663239952322 y[1] (numeric) = -8.8130308228545306366323995232201 absolute error = 1e-31 relative error = 1.1346834251466978757303114551486e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.441 y[1] (analytic) = -8.810799650296486168886814231377 y[1] (numeric) = -8.8107996502964861688868142313771 absolute error = 1e-31 relative error = 1.1349707628028401334421491203320e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.442 y[1] (analytic) = -8.808568338730362129928215959252 y[1] (numeric) = -8.8085683387303621299282159592519 absolute error = 1e-31 relative error = 1.1352582639372889152389468476777e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.443 y[1] (analytic) = -8.806336888158288569953007052442 y[1] (numeric) = -8.8063368881582885699530070524416 absolute error = 4e-31 relative error = 4.5421837147505938379822167888703e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.444 y[1] (analytic) = -8.804105298582394503850598243997 y[1] (numeric) = -8.8041052985823945038505982439967 absolute error = 3e-31 relative error = 3.4075012715750335846983614404985e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.445 y[1] (analytic) = -8.801873570004807911613339657231 y[1] (numeric) = -8.8018735700048079116133396572306 absolute error = 4e-31 relative error = 4.5444869983491651662276678178983e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2067.6MB, alloc=4.6MB, time=130.81 x[1] = 4.446 y[1] (analytic) = -8.799641702427655738746225169642 y[1] (numeric) = -8.7996417024276557387462251696418 absolute error = 2e-31 relative error = 2.2728198120251164249336548965508e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.447 y[1] (analytic) = -8.797409695853063896676370297762 y[1] (numeric) = -8.7974096958530638966763702977617 absolute error = 3e-31 relative error = 3.4100946798171107960886953034919e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.448 y[1] (analytic) = -8.795177550283157263162263762605 y[1] (numeric) = -8.7951775502831572631622637626049 absolute error = 1e-31 relative error = 1.1369867115051081549250078780379e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.449 y[1] (analytic) = -8.792945265720059682702792895261 y[1] (numeric) = -8.7929452657200596827027928952609 absolute error = 1e-31 relative error = 1.1372753608493085353603804791281e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.45 y[1] (analytic) = -8.790712842165893966946043042029 y[1] (numeric) = -8.790712842165893966946043042029 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.451 y[1] (analytic) = -8.788480279622781895097871128363 y[1] (numeric) = -8.7884802796227818950978711283627 absolute error = 3e-31 relative error = 3.4135594602810733541951988474990e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.452 y[1] (analytic) = -8.786247578092844214330253540751 y[1] (numeric) = -8.7862475780928442143302535407515 absolute error = 5e-31 relative error = 5.6907114846919751073765637203441e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.453 y[1] (analytic) = -8.784014737578200640189408485533 y[1] (numeric) = -8.784014737578200640189408485533 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.454 y[1] (analytic) = -8.78178175808096985700369298349 y[1] (numeric) = -8.7817817580809698570036929834902 absolute error = 2e-31 relative error = 2.2774421582039497358818381440311e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=2071.4MB, alloc=4.6MB, time=131.18 TOP MAIN SOLVE Loop x[1] = 4.455 y[1] (analytic) = -8.779548639603269518291274658955 y[1] (numeric) = -8.7795486396032695182912746589548 absolute error = 2e-31 relative error = 2.2780214360659616485333636959877e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.456 y[1] (analytic) = -8.777315382147216247167578481999 y[1] (numeric) = -8.7773153821472162471675784819988 absolute error = 2e-31 relative error = 2.2786010447658485316800535447858e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.457 y[1] (analytic) = -8.775081985714925636752508622162 y[1] (numeric) = -8.7750819857149256367525086221626 absolute error = 6e-31 relative error = 6.8375429537495842837949222697858e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.458 y[1] (analytic) = -8.772848450308512250577445572031 y[1] (numeric) = -8.772848450308512250577445572031 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.459 y[1] (analytic) = -8.770614775930089622992018698833 y[1] (numeric) = -8.770614775930089622992018698833 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.46 y[1] (analytic) = -8.768380962581770259570654382106 y[1] (numeric) = -8.7683809625817702595706543821059 absolute error = 1e-31 relative error = 1.1404613967702870751671885479702e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.461 y[1] (analytic) = -8.766147010265665637518899895328 y[1] (numeric) = -8.7661470102656656375188998953282 absolute error = 2e-31 relative error = 2.2815040606299258001185165981830e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.462 y[1] (analytic) = -8.763912918983886206079523189292 y[1] (numeric) = -8.763912918983886206079523189292 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2075.2MB, alloc=4.6MB, time=131.55 x[1] = 4.463 y[1] (analytic) = -8.761678688738541386938388734848 y[1] (numeric) = -8.761678688738541386938388734848 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.464 y[1] (analytic) = -8.759444319531739574630109582524 y[1] (numeric) = -8.7594443195317395746301095825237 absolute error = 3e-31 relative error = 3.4248747872175221869212235453243e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.465 y[1] (analytic) = -8.757209811365588136943475796379 y[1] (numeric) = -8.7572098113655881369434757963788 absolute error = 2e-31 relative error = 2.2838324570050726568063580563999e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.466 y[1] (analytic) = -8.754975164242193415326659419328 y[1] (numeric) = -8.7549751642421934153266594193278 absolute error = 2e-31 relative error = 2.2844153895131174851598970320426e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.467 y[1] (analytic) = -8.752740378163660725292196127025 y[1] (numeric) = -8.7527403781636607252921961270253 absolute error = 3e-31 relative error = 3.4274979839278689038265022546982e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.468 y[1] (analytic) = -8.750505453132094356821743727274 y[1] (numeric) = -8.7505054531320943568217437272741 absolute error = 1e-31 relative error = 1.1427911283022708540817495467854e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.469 y[1] (analytic) = -8.748270389149597574770617661783 y[1] (numeric) = -8.7482703891495975747706176617834 absolute error = 4e-31 relative error = 4.5723323835088186555114858180289e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.47 y[1] (analytic) = -8.746035186218272619272103666969 y[1] (numeric) = -8.7460351862182726192721036669686 absolute error = 4e-31 relative error = 4.5735009233704825360638035852311e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2079.0MB, alloc=4.6MB, time=131.92 x[1] = 4.471 y[1] (analytic) = -8.743799844340220706141547750352 y[1] (numeric) = -8.7437998443402207061415477503514 absolute error = 6e-31 relative error = 6.8620052000432552153574103566961e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.472 y[1] (analytic) = -8.741564363517542027280223638984 y[1] (numeric) = -8.7415643635175420272802236389838 absolute error = 2e-31 relative error = 2.2879200070263104738188632799266e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.473 y[1] (analytic) = -8.739328743752335751078977856187 y[1] (numeric) = -8.7393287437523357510789778561871 absolute error = 1e-31 relative error = 1.1442526415028049288168175806898e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.474 y[1] (analytic) = -8.737092985046700022821652582762 y[1] (numeric) = -8.7370929850467000228216525827624 absolute error = 4e-31 relative error = 4.5781817898079974258090481169909e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.475 y[1] (analytic) = -8.734857087402731965088286458695 y[1] (numeric) = -8.7348570874027319650882864586955 absolute error = 5e-31 relative error = 5.7241921075170402343180091076156e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.476 y[1] (analytic) = -8.732621050822527678158093481247 y[1] (numeric) = -8.7326210508225276781580934812468 absolute error = 2e-31 relative error = 2.2902631275997250776482857626840e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.477 y[1] (analytic) = -8.730384875308182240412220155182 y[1] (numeric) = -8.7303848753081822404122201551821 absolute error = 1e-31 relative error = 1.1454248744843566127383960165465e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.478 y[1] (analytic) = -8.728148560861789708736281050768 y[1] (numeric) = -8.7281485608617897087362810507681 absolute error = 1e-31 relative error = 1.1457183537000465209394906857299e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2082.8MB, alloc=4.6MB, time=132.30 x[1] = 4.479 y[1] (analytic) = -8.725912107485443118922672925023 y[1] (numeric) = -8.725912107485443118922672925023 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.48 y[1] (analytic) = -8.72367551518123448607266756158 y[1] (numeric) = -8.7236755151812344860726675615798 absolute error = 2e-31 relative error = 2.2926116365969051874205505226068e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.481 y[1] (analytic) = -8.721438783951254804998283484388 y[1] (numeric) = -8.7214387839512548049982834843875 absolute error = 5e-31 relative error = 5.7329990198414785038255933851520e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.482 y[1] (analytic) = -8.719201913797594050623936700342 y[1] (numeric) = -8.719201913797594050623936700342 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.483 y[1] (analytic) = -8.716964904722341178387870625807 y[1] (numeric) = -8.716964904722341178387870625807 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.484 y[1] (analytic) = -8.714727756727584124643365351852 y[1] (numeric) = -8.7147277567275841246433653518523 absolute error = 3e-31 relative error = 3.4424483285597349010560243507172e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.485 y[1] (analytic) = -8.712490469815409807059726402905 y[1] (numeric) = -8.7124904698154098070597264029047 absolute error = 3e-31 relative error = 3.4433323174281309000767880430345e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.486 y[1] (analytic) = -8.710253043987904125023053143375 y[1] (numeric) = -8.710253043987904125023053143375 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.487 y[1] (analytic) = -8.708015479247151960036786986693 y[1] (numeric) = -8.7080154792471519600367869866926 absolute error = 4e-31 relative error = 4.5934690969862842051697540257702e-30 % Correct digits = 31 h = 0.001 memory used=2086.7MB, alloc=4.6MB, time=132.67 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.488 y[1] (analytic) = -8.705777775595237176122039561047 y[1] (numeric) = -8.7057777755952371761220395610471 absolute error = 1e-31 relative error = 1.1486624466837224556789870758594e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.489 y[1] (analytic) = -8.703539933034242620217700986005 y[1] (numeric) = -8.7035399330342426202177009860046 absolute error = 4e-31 relative error = 4.5958311569503115071314366484908e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.49 y[1] (analytic) = -8.701301951566250122580328414036 y[1] (numeric) = -8.7013019515662501225803284140356 absolute error = 4e-31 relative error = 4.5970132082130453476715549375681e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.491 y[1] (analytic) = -8.69906383119334049718381499086 y[1] (numeric) = -8.6990638311933404971838149908595 absolute error = 5e-31 relative error = 5.7477449263803118009616407911008e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.492 y[1] (analytic) = -8.696825571917593542118839388379 y[1] (numeric) = -8.6968255719175935421188393883788 absolute error = 2e-31 relative error = 2.2996896781028724167446512701753e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.493 y[1] (analytic) = -8.694587173741088039992096063847 y[1] (numeric) = -8.6945871737410880399920960638465 absolute error = 5e-31 relative error = 5.7507043176250205857447430113784e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.494 y[1] (analytic) = -8.692348636665901758325306398778 y[1] (numeric) = -8.692348636665901758325306398778 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.495 y[1] (analytic) = -8.690109960694111449954010870988 y[1] (numeric) = -8.6901099606941114499540108709879 absolute error = 1e-31 relative error = 1.1507334251500383493143464943854e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2090.5MB, alloc=4.6MB, time=133.05 x[1] = 4.496 y[1] (analytic) = -8.687871145827792853426142413003 y[1] (numeric) = -8.6878711458277928534261424130023 absolute error = 7e-31 relative error = 8.0572097381550540204518337243539e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.497 y[1] (analytic) = -8.685632192069020693400381109966 y[1] (numeric) = -8.6856321920690206934003811099662 absolute error = 2e-31 relative error = 2.3026533426389268487263104128151e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.498 y[1] (analytic) = -8.683393099419868681044290390034 y[1] (numeric) = -8.6833930994198686810442903900338 absolute error = 2e-31 relative error = 2.3032471029482916971378745410620e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.499 y[1] (analytic) = -8.681153867882409514432234860102 y[1] (numeric) = -8.681153867882409514432234860102 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.5 y[1] (analytic) = -8.678914497458714878943079939614 y[1] (numeric) = -8.6789144974587148789430799396144 absolute error = 4e-31 relative error = 4.6088713066262441087990255111845e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.501 y[1] (analytic) = -8.676674988150855447657673445034 y[1] (numeric) = -8.6766749881508554476576734450342 absolute error = 2e-31 relative error = 2.3050304439560821314599688297908e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.502 y[1] (analytic) = -8.674435339960900881756109277455 y[1] (numeric) = -8.6744353399609008817561092774551 absolute error = 1e-31 relative error = 1.1528127893158142975520212369963e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.503 y[1] (analytic) = -8.672195552890919830914773365689 y[1] (numeric) = -8.6721955528909198309147733656884 absolute error = 6e-31 relative error = 6.9186631729030486899058507828679e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2094.3MB, alloc=4.6MB, time=133.43 x[1] = 4.504 y[1] (analytic) = -8.669955626942979933703172017035 y[1] (numeric) = -8.6699556269429799337031720170348 absolute error = 2e-31 relative error = 2.3068168812591703534798310056673e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.505 y[1] (analytic) = -8.667715562119147817980542827821 y[1] (numeric) = -8.667715562119147817980542827821 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.506 y[1] (analytic) = -8.665475358421489101292248305651 y[1] (numeric) = -8.6654753584214891012922483056508 absolute error = 2e-31 relative error = 2.3080095635565015616633937359693e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.507 y[1] (analytic) = -8.663235015852068391265952355191 y[1] (numeric) = -8.6632350158520683912659523551907 absolute error = 3e-31 relative error = 3.4629096342308294355860285601622e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.508 y[1] (analytic) = -8.660994534412949286007579779183 y[1] (numeric) = -8.6609945344129492860075797791829 absolute error = 1e-31 relative error = 1.1546018139448935490239624412619e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.509 y[1] (analytic) = -8.658753914106194374497058946247 y[1] (numeric) = -8.6587539141061943744970589462465 absolute error = 5e-31 relative error = 5.7745029476520563778021081605815e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.51 y[1] (analytic) = -8.656513154933865236983847776902 y[1] (numeric) = -8.6565131549338652369838477769016 absolute error = 4e-31 relative error = 4.6207981532612359775026998940801e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.511 y[1] (analytic) = -8.654272256898022445382243199121 y[1] (numeric) = -8.6542722568980224453822431991205 absolute error = 5e-31 relative error = 5.7774933022411816918626233838969e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2098.1MB, alloc=4.6MB, time=133.81 x[1] = 4.512 y[1] (analytic) = -8.652031220000725563666474224583 y[1] (numeric) = -8.6520312200007255636664742245825 absolute error = 5e-31 relative error = 5.7789897803900674060427654245987e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.513 y[1] (analytic) = -8.64979004424403314826557879668 y[1] (numeric) = -8.6497900442440331482655787966795 absolute error = 5e-31 relative error = 5.7804871267681569090286830999040e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.514 y[1] (analytic) = -8.647548729630002748458064561192 y[1] (numeric) = -8.647548729630002748458064561192 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.515 y[1] (analytic) = -8.645307276160690906766353710426 y[1] (numeric) = -8.6453072761606909067663537104259 absolute error = 1e-31 relative error = 1.1566968854392086882979816017773e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.516 y[1] (analytic) = -8.643065683838153159351012051474 y[1] (numeric) = -8.6430656838381531593510120514736 absolute error = 4e-31 relative error = 4.6279875061920245793703223844227e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.517 y[1] (analytic) = -8.640823952664444036404762449134 y[1] (numeric) = -8.6408239526644440364047624491338 absolute error = 2e-31 relative error = 2.3145940838006419048405256183429e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.518 y[1] (analytic) = -8.638582082641617062546282793897 y[1] (numeric) = -8.6385820826416170625462827938969 absolute error = 1e-31 relative error = 1.1575973816460016786788487387583e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.519 y[1] (analytic) = -8.636340073771724757213788645275 y[1] (numeric) = -8.6363400737717247572137886452753 absolute error = 3e-31 relative error = 3.4736936878052074573677404729512e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2101.9MB, alloc=4.6MB, time=134.18 x[1] = 4.52 y[1] (analytic) = -8.63409792605681863505840070063 y[1] (numeric) = -8.6340979260568186350584007006301 absolute error = 1e-31 relative error = 1.1581985849177167112522281740359e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.521 y[1] (analytic) = -8.631855639498949206337297239519 y[1] (numeric) = -8.6318556394989492063372972395187 absolute error = 3e-31 relative error = 3.4754983462329313473960532039694e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.522 y[1] (analytic) = -8.62961321410016597730665169346 y[1] (numeric) = -8.6296132141001659773066516934593 absolute error = 7e-31 relative error = 8.1116034129577262553562598137871e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.523 y[1] (analytic) = -8.627370649862517450614355490882 y[1] (numeric) = -8.6273706498625174506143554908822 absolute error = 2e-31 relative error = 2.3182034030633322232246534737548e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.524 y[1] (analytic) = -8.62512794678805112569252632691 y[1] (numeric) = -8.6251279467880511256925263269101 absolute error = 1e-31 relative error = 1.1594030907940262442535102668332e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.525 y[1] (analytic) = -8.622885104878813499149802007483 y[1] (numeric) = -8.6228851048788134991498020074833 absolute error = 3e-31 relative error = 3.4791139665105884125844990175973e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.526 y[1] (analytic) = -8.620642124136850065163420017218 y[1] (numeric) = -8.6206421241368500651634200172174 absolute error = 6e-31 relative error = 6.9600383748684564109228469095717e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.527 y[1] (analytic) = -8.618399004564205315871082960256 y[1] (numeric) = -8.6183990045642053158710829602563 absolute error = 3e-31 relative error = 3.4809249356072217014730127440625e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.528 y[1] (analytic) = -8.616155746162922741762610023255 y[1] (numeric) = -8.6161557461629227417626100232546 absolute error = 4e-31 relative error = 4.6424416153124213364887404202569e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=2105.7MB, alloc=4.6MB, time=134.55 TOP MAIN SOLVE Loop x[1] = 4.529 y[1] (analytic) = -8.6139123489350448320713746095 y[1] (numeric) = -8.6139123489350448320713746094996 absolute error = 4e-31 relative error = 4.6436506873610433007900825216295e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.53 y[1] (analytic) = -8.611668812882613075165528293054 y[1] (numeric) = -8.6116688128826130751655282930537 absolute error = 3e-31 relative error = 3.4836453481724175096462656538514e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.531 y[1] (analytic) = -8.609425138007667958939011241674 y[1] (numeric) = -8.6094251380076679589390112416742 absolute error = 2e-31 relative error = 2.3230354732636955138104073767803e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.532 y[1] (analytic) = -8.607181324312248971202349257141 y[1] (numeric) = -8.6071813243122489712023492571411 absolute error = 1e-31 relative error = 1.1618205337156694868794561338112e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.533 y[1] (analytic) = -8.604937371798394600073237581496 y[1] (numeric) = -8.6049373717983946000732375814955 absolute error = 5e-31 relative error = 5.8106175373069817936183618992020e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.534 y[1] (analytic) = -8.602693280468142334366911617569 y[1] (numeric) = -8.6026932804681423343669116175682 absolute error = 8e-31 relative error = 9.2994132641733044521921264999532e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.535 y[1] (analytic) = -8.600449050323528663986304712051 y[1] (numeric) = -8.6004490503235286639863047120503 absolute error = 7e-31 relative error = 8.1391098988449637578387818233760e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.536 y[1] (analytic) = -8.598204681366589080311993149234 y[1] (numeric) = -8.5982046813665890803119931492333 absolute error = 7e-31 relative error = 8.1412344313806539815722530085927e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2109.6MB, alloc=4.6MB, time=134.93 x[1] = 4.537 y[1] (analytic) = -8.59596017359935807659192850342 y[1] (numeric) = -8.5959601735993580765919285034195 absolute error = 5e-31 relative error = 5.8166858605934728020819588512140e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.538 y[1] (analytic) = -8.59371552702386914833095749788 y[1] (numeric) = -8.5937155270238691483309574978793 absolute error = 7e-31 relative error = 8.1454872202689766969885272915175e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.539 y[1] (analytic) = -8.591470741642154793680129518107 y[1] (numeric) = -8.5914707416421547936801295181064 absolute error = 6e-31 relative error = 6.9836704103739672583837854464245e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.54 y[1] (analytic) = -8.589225817456246513825791926996 y[1] (numeric) = -8.5892258174562465138257919269962 absolute error = 2e-31 relative error = 2.3284985661167686408681679021753e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.541 y[1] (analytic) = -8.586980754468174813378473329449 y[1] (numeric) = -8.5869807544681748133784733294489 absolute error = 1e-31 relative error = 1.1645536756090399524671535734310e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.542 y[1] (analytic) = -8.584735552679969200761554933773 y[1] (numeric) = -8.5847355526799692007615549337727 absolute error = 3e-31 relative error = 3.4945747386050403533722282516416e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.543 y[1] (analytic) = -8.582490212093658188599730157139 y[1] (numeric) = -8.582490212093658188599730157139 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.544 y[1] (analytic) = -8.580244732711269294107252622217 y[1] (numeric) = -8.580244732711269294107252622216 absolute error = 1.0e-30 relative error = 1.1654679221300139546791121187669e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2113.4MB, alloc=4.6MB, time=135.30 x[1] = 4.545 y[1] (analytic) = -8.577999114534829039475972691983 y[1] (numeric) = -8.5779991145348290394759726919826 absolute error = 4e-31 relative error = 4.6630921110988171320570077986302e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.546 y[1] (analytic) = -8.575753357566362952263162689602 y[1] (numeric) = -8.5757533575663629522631626896013 absolute error = 7e-31 relative error = 8.1625481845556108280930782031334e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.547 y[1] (analytic) = -8.573507461807895565779130950104 y[1] (numeric) = -8.5735074618078955657791309501034 absolute error = 6e-31 relative error = 6.9983026511937973713416932844312e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.548 y[1] (analytic) = -8.571261427261450419474624850516 y[1] (numeric) = -8.5712614272614504194746248505153 absolute error = 7e-31 relative error = 8.1668259210202689734355492827098e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.549 y[1] (analytic) = -8.569015253929050059328022964934 y[1] (numeric) = -8.5690152539290500593280229649332 absolute error = 8e-31 relative error = 9.3359619080288762832316095084651e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.55 y[1] (analytic) = -8.566768941812716038232316490927 y[1] (numeric) = -8.5667689418127160382323164909264 absolute error = 6e-31 relative error = 7.0038074339967065734474500241321e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.551 y[1] (analytic) = -8.564522490914468916381880093528 y[1] (numeric) = -8.5645224909144689163818800935279 absolute error = 1e-31 relative error = 1.1676074189318007510830872088566e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.552 y[1] (analytic) = -8.562275901236328261659032312947 y[1] (numeric) = -8.5622759012363282616590323129468 absolute error = 2e-31 relative error = 2.3358275569130107541882028174918e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2117.2MB, alloc=4.6MB, time=135.67 x[1] = 4.553 y[1] (analytic) = -8.560029172780312650020385682014 y[1] (numeric) = -8.5600291727803126500203856820133 absolute error = 7e-31 relative error = 8.1775422241071493811555612776839e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.554 y[1] (analytic) = -8.557782305548439665882986699245 y[1] (numeric) = -8.5577823055484396658829866992441 absolute error = 9e-31 relative error = 1.0516743332165447132243924726541e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.555 y[1] (analytic) = -8.555535299542725902510245803292 y[1] (numeric) = -8.5555352995427259025102458032918 absolute error = 2e-31 relative error = 2.3376678722918664091694013796731e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.556 y[1] (analytic) = -8.553288154765186962397657494422 y[1] (numeric) = -8.553288154765186962397657494421 absolute error = 1.0e-30 relative error = 1.1691410156021488034690242787664e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.557 y[1] (analytic) = -8.551040871217837457658310748528 y[1] (numeric) = -8.5510408712178374576583107485279 absolute error = 1e-31 relative error = 1.1694482754326728045897151474357e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.558 y[1] (analytic) = -8.5487934489026910104081898691 y[1] (numeric) = -8.5487934489026910104081898690997 absolute error = 3e-31 relative error = 3.5092671473833246477259232195522e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.559 y[1] (analytic) = -8.546545887821760253151265922386 y[1] (numeric) = -8.546545887821760253151265922386 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.56 y[1] (analytic) = -8.544298187977056829164378900933 y[1] (numeric) = -8.5442981879770568291643789009329 absolute error = 1e-31 relative error = 1.1703711387403714081352705646408e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2121.0MB, alloc=4.6MB, time=136.05 x[1] = 4.561 y[1] (analytic) = -8.542050349370591392881910760507 y[1] (numeric) = -8.5420503493705913928819107605065 absolute error = 5e-31 relative error = 5.8533956081965938747558610408657e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.562 y[1] (analytic) = -8.539802372004373610280249475312 y[1] (numeric) = -8.5398023720043736102802494753113 absolute error = 7e-31 relative error = 8.1969109998935874561693633769335e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.563 y[1] (analytic) = -8.537554255880412159262044256287 y[1] (numeric) = -8.5375542558804121592620442562868 absolute error = 2e-31 relative error = 2.3425912621550367141552866827071e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.564 y[1] (analytic) = -8.535306001000714730040252077143 y[1] (numeric) = -8.5353060010007147300402520771427 absolute error = 3e-31 relative error = 3.5148124737979722559614326207507e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.565 y[1] (analytic) = -8.533057607367288025521975652672 y[1] (numeric) = -8.5330576073672880255219756526713 absolute error = 7e-31 relative error = 8.2033900649590438257139263215670e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.566 y[1] (analytic) = -8.530809074982137761692093013755 y[1] (numeric) = -8.5308090749821377616920930137543 absolute error = 7e-31 relative error = 8.2055522969427808382379001375015e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.567 y[1] (analytic) = -8.52856040384726866799667882336 y[1] (numeric) = -8.5285604038472686679966788233595 absolute error = 5e-31 relative error = 5.8626541447070943412404664231046e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.568 y[1] (analytic) = -8.5263115939646844877262175777 y[1] (numeric) = -8.5263115939646844877262175776996 absolute error = 4e-31 relative error = 4.6913603331496634244899123179236e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.569 y[1] (analytic) = -8.524062645336387978398608836607 y[1] (numeric) = -8.5240626453363879783986088366064 absolute error = 6e-31 relative error = 7.0388971194183662205878901842849e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=2124.8MB, alloc=4.6MB, time=136.42 TOP MAIN SOLVE Loop x[1] = 4.57 y[1] (analytic) = -8.521813557964380912141964627051 y[1] (numeric) = -8.5218135579643809121419646270504 absolute error = 6e-31 relative error = 7.0407548336849902795078156412916e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.571 y[1] (analytic) = -8.519564331850664076077199163615 y[1] (numeric) = -8.5195643318506640760771991636145 absolute error = 5e-31 relative error = 5.8688447029002878531309211157399e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.572 y[1] (analytic) = -8.517314966997237272700411029611 y[1] (numeric) = -8.517314966997237272700411029611 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.573 y[1] (analytic) = -8.515065463406099320265057962408 y[1] (numeric) = -8.515065463406099320265057962408 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.574 y[1] (analytic) = -8.512815821079248053163924386412 y[1] (numeric) = -8.5128158210792480531639243864118 absolute error = 2e-31 relative error = 2.3493988852051089984743604892241e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.575 y[1] (analytic) = -8.51056604001868032231088183703 y[1] (numeric) = -8.5105660400186803223108818370303 absolute error = 3e-31 relative error = 3.5250299285538651791930762133342e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.576 y[1] (analytic) = -8.508316120226391995522442418823 y[1] (numeric) = -8.5083161202263919955224424188224 absolute error = 6e-31 relative error = 7.0519241589255267136675134063921e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.577 y[1] (analytic) = -8.506066061704377957899105440918 y[1] (numeric) = -8.5060660617043779578991054409173 absolute error = 7e-31 relative error = 8.2294211557033165077430265308462e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2128.6MB, alloc=4.6MB, time=136.79 x[1] = 4.578 y[1] (analytic) = -8.503815864454632112206497372667 y[1] (numeric) = -8.5038158644546321122064973726668 absolute error = 2e-31 relative error = 2.3518853557964054938792064349811e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.579 y[1] (analytic) = -8.501565528479147379256305262375 y[1] (numeric) = -8.5015655284791473792563052623749 absolute error = 1e-31 relative error = 1.1762539459939808164279430189419e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.58 y[1] (analytic) = -8.499315053779915698287003761827 y[1] (numeric) = -8.4993150537799156982870037618271 absolute error = 1e-31 relative error = 1.1765653981202499349149281016516e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.581 y[1] (analytic) = -8.497064440358928027344375899223 y[1] (numeric) = -8.4970644403589280273443758992225 absolute error = 5e-31 relative error = 5.8843851721910595793964541574172e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.582 y[1] (analytic) = -8.494813688218174343661827742992 y[1] (numeric) = -8.4948136882181743436618277429918 absolute error = 2e-31 relative error = 2.3543777102185145874315305768889e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.583 y[1] (analytic) = -8.492562797359643644040497098865 y[1] (numeric) = -8.4925627973596436440404970988644 absolute error = 6e-31 relative error = 7.0650051617697935991436613840276e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.584 y[1] (analytic) = -8.490311767785323945229156382428 y[1] (numeric) = -8.4903117677853239452291563824281 absolute error = 1e-31 relative error = 1.1778130501571056393821392579904e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.585 y[1] (analytic) = -8.488060599497202284303909809305 y[1] (numeric) = -8.4880605994972022843039098093049 absolute error = 1e-31 relative error = 1.1781254248576357681072523228873e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2132.4MB, alloc=4.6MB, time=137.16 x[1] = 4.586 y[1] (analytic) = -8.485809292497264719047685044948 y[1] (numeric) = -8.4858092924972647190476850449481 absolute error = 1e-31 relative error = 1.1784379845587041701682983996472e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.587 y[1] (analytic) = -8.483557846787496328329519455945 y[1] (numeric) = -8.4835578467874963283295194559445 absolute error = 5e-31 relative error = 5.8937536471132456804396739574281e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.588 y[1] (analytic) = -8.481306262369881212483641104589 y[1] (numeric) = -8.4813062623698812124836411045886 absolute error = 4e-31 relative error = 4.7162546384479973653319369228877e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.589 y[1] (analytic) = -8.479054539246402493688344628375 y[1] (numeric) = -8.4790545392464024936883446283743 absolute error = 7e-31 relative error = 8.2556374270263188775313862591087e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.59 y[1] (analytic) = -8.476802677419042316344662145933 y[1] (numeric) = -8.4768026774190423163446621459327 absolute error = 3e-31 relative error = 3.5390702298539513134847935731673e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.591 y[1] (analytic) = -8.474550676889781847454829330824 y[1] (numeric) = -8.474550676889781847454829330824 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.592 y[1] (analytic) = -8.472298537660601277000546794474 y[1] (numeric) = -8.4722985376606012770005467944734 absolute error = 6e-31 relative error = 7.0819034212842310700913743815917e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.593 y[1] (analytic) = -8.470046259733479818321036919423 y[1] (numeric) = -8.4700462597334798183210369194226 absolute error = 4e-31 relative error = 4.7225243845667789843875151687485e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2136.3MB, alloc=4.6MB, time=137.53 x[1] = 4.594 y[1] (analytic) = -8.46779384311039570849089628395 y[1] (numeric) = -8.4677938431103957084908962839496 absolute error = 4e-31 relative error = 4.7237805668291014034751310736543e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.595 y[1] (analytic) = -8.465541287793326208697743818991 y[1] (numeric) = -8.4655412877933262086977438189901 absolute error = 9e-31 relative error = 1.0631334363671845832658588479617e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.596 y[1] (analytic) = -8.463288593784247604619664838178 y[1] (numeric) = -8.4632885937842476046196648381779 absolute error = 1e-31 relative error = 1.1815737924078791464677101618710e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.597 y[1] (analytic) = -8.461035761085135206802451081701 y[1] (numeric) = -8.461035761085135206802451081701 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.598 y[1] (analytic) = -8.458782789697963351036636914553 y[1] (numeric) = -8.4587827896979633510366369145531 absolute error = 1e-31 relative error = 1.1822031902957835249001275628480e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.599 y[1] (analytic) = -8.456529679624705398734331819643 y[1] (numeric) = -8.4565296796247053987343318196429 absolute error = 1e-31 relative error = 1.1825181698462143498373960293609e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.6 y[1] (analytic) = -8.454276430867333737305849326105 y[1] (numeric) = -8.4542764308673337373058493261042 absolute error = 8e-31 relative error = 9.4626666934987728963870803391154e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.601 y[1] (analytic) = -8.452023043427819780536132513034 y[1] (numeric) = -8.4520230434278197805361325130336 absolute error = 4e-31 relative error = 4.7325947639368382572364091931325e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.602 memory used=2140.1MB, alloc=4.6MB, time=137.90 y[1] (analytic) = -8.449769517308133968960976228764 y[1] (numeric) = -8.4497695173081339689609762287638 absolute error = 2e-31 relative error = 2.3669284658040535921028581430073e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.603 y[1] (analytic) = -8.447515852510245770243046165664 y[1] (numeric) = -8.4475158525102457702430461656638 absolute error = 2e-31 relative error = 2.3675599252124330387540554009445e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.604 y[1] (analytic) = -8.44526204903612367954769493034 y[1] (numeric) = -8.4452620490361236795476949303397 absolute error = 3e-31 relative error = 3.5522876407871755667297668279307e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.605 y[1] (analytic) = -8.443008106887735219918575248992 y[1] (numeric) = -8.4430081068877352199185752489921 absolute error = 1e-31 relative error = 1.1844119860363611221554611263899e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.606 y[1] (analytic) = -8.44075402606704694265305044757 y[1] (numeric) = -8.4407540260670469426530504475697 absolute error = 3e-31 relative error = 3.5541848402823843611001164496470e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.607 y[1] (analytic) = -8.438499806576024427677402346241 y[1] (numeric) = -8.4384998065760244276774023462412 absolute error = 2e-31 relative error = 2.3700895252037848465052490125502e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.608 y[1] (analytic) = -8.43624544841663228392183670759 y[1] (numeric) = -8.4362454484166322839218367075905 absolute error = 5e-31 relative error = 5.9268071686302483209790632507356e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.609 y[1] (analytic) = -8.433990951590834149695286377824 y[1] (numeric) = -8.4339909515908341496952863778241 absolute error = 1e-31 relative error = 1.1856782936331918259807811623651e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.61 y[1] (analytic) = -8.431736316100592693060012260162 y[1] (numeric) = -8.4317363161005926930600122601624 absolute error = 4e-31 relative error = 4.7439813699604301214688452772134e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2143.9MB, alloc=4.6MB, time=138.28 x[1] = 4.611 y[1] (analytic) = -8.429481541947869612206002259469 y[1] (numeric) = -8.4294815419478696122060022594693 absolute error = 3e-31 relative error = 3.5589377413913469845276784831840e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.612 y[1] (analytic) = -8.427226629134625635825168337061 y[1] (numeric) = -8.4272266291346256358251683370607 absolute error = 3e-31 relative error = 3.5598900231641969696652199458916e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.613 y[1] (analytic) = -8.424971577662820523485341814512 y[1] (numeric) = -8.424971577662820523485341814512 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.614 y[1] (analytic) = -8.422716387534413066004067065173 y[1] (numeric) = -8.4227163875344130660040670651728 absolute error = 2e-31 relative error = 2.3745308615163536649160316380748e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.615 y[1] (analytic) = -8.420461058751361085822193731978 y[1] (numeric) = -8.4204610587513610858221937319778 absolute error = 2e-31 relative error = 2.3751668537453845503860988523710e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.616 y[1] (analytic) = -8.418205591315621437377267610028 y[1] (numeric) = -8.4182055913156214373772676100281 absolute error = 1e-31 relative error = 1.1879016129418586904003917620907e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.617 y[1] (analytic) = -8.415949985229150007476720332301 y[1] (numeric) = -8.4159499852291500074767203323015 absolute error = 5e-31 relative error = 5.9410999456692466195817048189249e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.618 y[1] (analytic) = -8.413694240493901715670857996734 y[1] (numeric) = -8.4136942404939017156708579967339 absolute error = 1e-31 relative error = 1.1885385556170363956843506885617e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2147.7MB, alloc=4.6MB, time=138.65 x[1] = 4.619 y[1] (analytic) = -8.411438357111830514625648872799 y[1] (numeric) = -8.4114383571118305146256488727988 absolute error = 2e-31 relative error = 2.3777146251199827879615881655218e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.62 y[1] (analytic) = -8.409182335084889390495310325596 y[1] (numeric) = -8.4091823350848893904953103255958 absolute error = 2e-31 relative error = 2.3783525202629707403260737136903e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.621 y[1] (analytic) = -8.406926174415030363294695095345 y[1] (numeric) = -8.4069261744150303632946950953445 absolute error = 5e-31 relative error = 5.9474769925024461697045074097057e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.622 y[1] (analytic) = -8.404669875104204487271477070064 y[1] (numeric) = -8.4046698751042044872714770700638 absolute error = 2e-31 relative error = 2.3796294556723480983452141710519e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.623 y[1] (analytic) = -8.402413437154361851278136689102 y[1] (numeric) = -8.4024134371543618512781366891021 absolute error = 1e-31 relative error = 1.1901342483079113301862721932755e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.624 y[1] (analytic) = -8.400156860567451579143746115069 y[1] (numeric) = -8.4001568605674515791437461150689 absolute error = 1e-31 relative error = 1.1904539600852733386280700402800e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.625 y[1] (analytic) = -8.397900145345421830045554311603 y[1] (numeric) = -8.3979001453454218300455543116025 absolute error = 5e-31 relative error = 5.9538693166901669041906437894247e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.626 y[1] (analytic) = -8.395643291490219798880372164294 y[1] (numeric) = -8.3956432914902197988803721642946 absolute error = 6e-31 relative error = 7.1465637494169966345316279941882e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2151.5MB, alloc=4.6MB, time=139.03 x[1] = 4.627 y[1] (analytic) = -8.393386299003791716635757781978 y[1] (numeric) = -8.3933862990037917166357577819778 absolute error = 2e-31 relative error = 2.3828284898996956067033856569790e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.628 y[1] (analytic) = -8.391129167888082850761002115466 y[1] (numeric) = -8.3911291678880828507610021154659 absolute error = 1e-31 relative error = 1.1917347236494567035986749748414e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.629 y[1] (analytic) = -8.388871898145037505537915030725 y[1] (numeric) = -8.388871898145037505537915030725 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.63 y[1] (analytic) = -8.386614489776599022451411973336 y[1] (numeric) = -8.3866144897765990224514119733362 absolute error = 2e-31 relative error = 2.3847525153779610588905095483073e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.631 y[1] (analytic) = -8.384356942784709780559901360998 y[1] (numeric) = -8.3843569427847097805599013609987 absolute error = 7e-31 relative error = 8.3488811935946501919161321287674e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.632 y[1] (analytic) = -8.382099257171311196865472840706 y[1] (numeric) = -8.3820992571713111968654728407062 absolute error = 2e-31 relative error = 2.3860371234436272346109516193485e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.633 y[1] (analytic) = -8.379841432938343726683886547117 y[1] (numeric) = -8.3798414329383437266838865471168 absolute error = 2e-31 relative error = 2.3866800058276417501702639112770e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.634 y[1] (analytic) = -8.377583470087746864014363498521 y[1] (numeric) = -8.3775834700877468640143634985214 absolute error = 4e-31 relative error = 4.7746465484731290583720651736130e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2155.3MB, alloc=4.6MB, time=139.40 x[1] = 4.635 y[1] (analytic) = -8.375325368621459141909177266703 y[1] (numeric) = -8.3753253686214591419091772667032 absolute error = 2e-31 relative error = 2.3879669290139960233467874043381e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.636 y[1] (analytic) = -8.373067128541418132843047056865 y[1] (numeric) = -8.3730671285414181328430470568652 absolute error = 2e-31 relative error = 2.3886109705039453862911076546245e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.637 y[1] (analytic) = -8.370808749849560449082332333691 y[1] (numeric) = -8.3708087498495604490823323336916 absolute error = 6e-31 relative error = 7.1677661971524932435927961732173e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.638 y[1] (analytic) = -8.368550232547821743054029129492 y[1] (numeric) = -8.3685502325478217430540291294924 absolute error = 4e-31 relative error = 4.7798004299989629789184696329989e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.639 y[1] (analytic) = -8.36629157663813670771456817027 y[1] (numeric) = -8.36629157663813670771456817027 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.64 y[1] (analytic) = -8.364032782122439076918414955431 y[1] (numeric) = -8.3640327821224390769184149554315 absolute error = 5e-31 relative error = 5.9779775262086080558659374564720e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.641 y[1] (analytic) = -8.361773849002661625786471926758 y[1] (numeric) = -8.3617738490026616257864719267579 absolute error = 1e-31 relative error = 1.1959184953552331970625439722000e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.642 y[1] (analytic) = -8.359514777280736171074282862128 y[1] (numeric) = -8.3595147772807361710742828621282 absolute error = 2e-31 relative error = 2.3924833597226791985408220671881e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.643 y[1] (analytic) = -8.357255566958593571540039629383 y[1] (numeric) = -8.3572555669585935715400396293831 absolute error = 1e-31 relative error = 1.1965650589334843881423708513569e-30 % memory used=2159.1MB, alloc=4.6MB, time=139.78 Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.644 y[1] (analytic) = -8.354996218038163728312391435601 y[1] (numeric) = -8.3549962180381637283123914356013 absolute error = 3e-31 relative error = 3.5906658982359537918104601714082e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.645 y[1] (analytic) = -8.352736730521375585258056706947 y[1] (numeric) = -8.3527367305213755852580567069472 absolute error = 2e-31 relative error = 2.3944248029413953966450493974421e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.646 y[1] (analytic) = -8.350477104410157129349237734137 y[1] (numeric) = -8.3504771044101571293492377341373 absolute error = 3e-31 relative error = 3.5926090958510657292824027373816e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.647 y[1] (analytic) = -8.348217339706435391030838218459 y[1] (numeric) = -8.3482173397064353910308382184591 absolute error = 1e-31 relative error = 1.1978605243585631727734722212064e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.648 y[1] (analytic) = -8.345957436412136444587483853165 y[1] (numeric) = -8.3459574364121364445874838531655 absolute error = 5e-31 relative error = 5.9909243943490106388221189237785e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.649 y[1] (analytic) = -8.343697394529185408510346074953 y[1] (numeric) = -8.3436973945291854085103460749533 absolute error = 3e-31 relative error = 3.5955282869762832741877300518726e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.65 y[1] (analytic) = -8.341437214059506445863769120124 y[1] (numeric) = -8.3414372140595064458637691201239 absolute error = 1e-31 relative error = 1.1988341749003377008541080812473e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.651 y[1] (analytic) = -8.339176895005022764651700519911 y[1] (numeric) = -8.3391768950050227646517005199117 absolute error = 7e-31 relative error = 8.3941138173874699107022210857056e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2163.0MB, alloc=4.6MB, time=140.15 x[1] = 4.652 y[1] (analytic) = -8.336916437367656618183925169353 y[1] (numeric) = -8.3369164373676566181839251693532 absolute error = 2e-31 relative error = 2.3989685095506257562179383932925e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.653 y[1] (analytic) = -8.334655841149329305442103103959 y[1] (numeric) = -8.3346558411493293054421031039591 absolute error = 1e-31 relative error = 1.1998095890928861290936157072692e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.654 y[1] (analytic) = -8.332395106351961171445611118339 y[1] (numeric) = -8.332395106351961171445611118339 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.655 y[1] (analytic) = -8.330134232977471607617188360817 y[1] (numeric) = -8.3301342329774716076171883608168 absolute error = 2e-31 relative error = 2.4009216947337622699770205853733e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.656 y[1] (analytic) = -8.327873221027779052148386037963 y[1] (numeric) = -8.3278732210277790521483860379638 absolute error = 8e-31 relative error = 9.6062941734032368086171534834208e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.657 y[1] (analytic) = -8.325612070504800990364821362865 y[1] (numeric) = -8.3256120705048009903648213628649 absolute error = 1e-31 relative error = 1.2011128930000310502184650327144e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.658 y[1] (analytic) = -8.323350781410453955091235880822 y[1] (numeric) = -8.323350781410453955091235880822 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.659 y[1] (analytic) = -8.321089353746653527016358306087 y[1] (numeric) = -8.3210893537466535270163583060873 absolute error = 3e-31 relative error = 3.6052971822123506697259485797336e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2166.8MB, alloc=4.6MB, time=140.52 x[1] = 4.66 y[1] (analytic) = -8.318827787515314335057572003108 y[1] (numeric) = -8.3188277875153143350575720031083 absolute error = 3e-31 relative error = 3.6062773225121018603334714147473e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.661 y[1] (analytic) = -8.316566082718350056725387245655 y[1] (numeric) = -8.3165660827183500567253872456555 absolute error = 5e-31 relative error = 6.0120967599715165651029025524824e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.662 y[1] (analytic) = -8.314304239357673418487718387093 y[1] (numeric) = -8.3143042393576734184877183870928 absolute error = 2e-31 relative error = 2.4054929221047018175398765821994e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.663 y[1] (analytic) = -8.31204225743519619613396607494 y[1] (numeric) = -8.3120422574351961961339660749396 absolute error = 4e-31 relative error = 4.8122950727565950450222912431644e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.664 y[1] (analytic) = -8.309780136952829215138904642763 y[1] (numeric) = -8.3097801369528292151389046427633 absolute error = 3e-31 relative error = 3.6102038207476458709262708945016e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.665 y[1] (analytic) = -8.30751787791248235102637481233 y[1] (numeric) = -8.3075178779124823510263748123303 absolute error = 3e-31 relative error = 3.6111869322318469033228133109870e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.666 y[1] (analytic) = -8.305255480316064529732781838833 y[1] (numeric) = -8.305255480316064529732781838833 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.667 y[1] (analytic) = -8.3029929441654837279703992319 y[1] (numeric) = -8.3029929441654837279703992319001 absolute error = 1e-31 relative error = 1.2043849810840805025521707341480e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2170.6MB, alloc=4.6MB, time=140.89 x[1] = 4.668 y[1] (analytic) = -8.300730269462646973590478184987 y[1] (numeric) = -8.3007302694626469735904781849874 absolute error = 4e-31 relative error = 4.8188531251467137855354705827231e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.669 y[1] (analytic) = -8.298467456209460345946162845636 y[1] (numeric) = -8.2984674562094603459461628456359 absolute error = 1e-31 relative error = 1.2050417806383443545251052570969e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.67 y[1] (analytic) = -8.296204504407828976255211558975 y[1] (numeric) = -8.2962045044078289762552115589744 absolute error = 6e-31 relative error = 7.2322228759092906213716440543983e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.671 y[1] (analytic) = -8.293941414059657047962524216734 y[1] (numeric) = -8.2939414140596570479625242167335 absolute error = 5e-31 relative error = 6.0284968875282144200637587664741e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.672 y[1] (analytic) = -8.291678185166847797102475843928 y[1] (numeric) = -8.2916781851668477971024758439284 absolute error = 4e-31 relative error = 4.8241139015207820951579571481455e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.673 y[1] (analytic) = -8.289414817731303512661056555258 y[1] (numeric) = -8.289414817731303512661056555258 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.674 y[1] (analytic) = -8.287151311754925536937818013159 y[1] (numeric) = -8.2871513117549255369378180131588 absolute error = 2e-31 relative error = 2.4133745418200536495772492195088e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.675 y[1] (analytic) = -8.284887667239614265907626519342 y[1] (numeric) = -8.2848876672396142659076265193416 absolute error = 4e-31 relative error = 4.8280678757020889925134877686838e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2174.4MB, alloc=4.6MB, time=141.27 x[1] = 4.676 y[1] (analytic) = -8.282623884187269149582222871531 y[1] (numeric) = -8.2826238841872691495822228715309 absolute error = 1e-31 relative error = 1.2073468673485767060457856224268e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.677 y[1] (analytic) = -8.280359962599788692371589117017 y[1] (numeric) = -8.2803599625997886923715891170165 absolute error = 5e-31 relative error = 6.0383848317992054289992853913618e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.678 y[1] (analytic) = -8.278095902479070453445122334518 y[1] (numeric) = -8.2780959024790704534451223345184 absolute error = 4e-31 relative error = 4.8320290645607354604166167292717e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.679 y[1] (analytic) = -8.275831703827011047092615575756 y[1] (numeric) = -8.2758317038270110470926155757568 absolute error = 8e-31 relative error = 9.6667021349655315175794523146363e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.68 y[1] (analytic) = -8.27356736664550614308504609801 y[1] (numeric) = -8.2735673666455061430850460980106 absolute error = 6e-31 relative error = 7.2520108123960107090375021811724e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.681 y[1] (analytic) = -8.271302890936450467035171018837 y[1] (numeric) = -8.2713028909364504670351710188375 absolute error = 5e-31 relative error = 6.0449968595381905870042826254243e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.682 y[1] (analytic) = -8.269038276701737800757930524022 y[1] (numeric) = -8.2690382767017378007579305240222 absolute error = 2e-31 relative error = 2.4186609531546851170911367108762e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.683 y[1] (analytic) = -8.266773523943260982630658759709 y[1] (numeric) = -8.2667735239432609826306587597086 absolute error = 4e-31 relative error = 4.8386471316949725213797152788258e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.684 y[1] (analytic) = -8.264508632662911907953102539565 y[1] (numeric) = -8.264508632662911907953102539565 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 memory used=2178.2MB, alloc=4.6MB, time=141.64 TOP MAIN SOLVE Loop x[1] = 4.685 y[1] (analytic) = -8.262243602862581529307247997722 y[1] (numeric) = -8.2622436028625815293072479977216 absolute error = 4e-31 relative error = 4.8413000055023049703368735935027e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.686 y[1] (analytic) = -8.259978434544159856916955318113 y[1] (numeric) = -8.2599784345441598569169553181127 absolute error = 3e-31 relative error = 3.6319707415380919287468037705114e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.687 y[1] (analytic) = -8.257713127709535959007401670746 y[1] (numeric) = -8.2577131277095359590074016707459 absolute error = 1e-31 relative error = 1.2109890287232255577673598525129e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.688 y[1] (analytic) = -8.255447682360597962164332485315 y[1] (numeric) = -8.255447682360597962164332485315 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.689 y[1] (analytic) = -8.253182098499233051693121192462 y[1] (numeric) = -8.2531820984992330516931211924627 absolute error = 7e-31 relative error = 8.4815770650121570113772127621677e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.69 y[1] (analytic) = -8.250916376127327471977637562894 y[1] (numeric) = -8.2509163761273274719776375628936 absolute error = 4e-31 relative error = 4.8479463585079392938799541522970e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.691 y[1] (analytic) = -8.248650515246766526838924774429 y[1] (numeric) = -8.248650515246766526838924774429 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.692 y[1] (analytic) = -8.246384515859434579893685336987 y[1] (numeric) = -8.246384515859434579893685336987 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2182.0MB, alloc=4.6MB, time=142.02 x[1] = 4.693 y[1] (analytic) = -8.244118377967215054912576005366 y[1] (numeric) = -8.2441183779672150549125760053656 absolute error = 4e-31 relative error = 4.8519439151798010141123219519306e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.694 y[1] (analytic) = -8.241852101571990436178311809597 y[1] (numeric) = -8.2418521015719904361783118095969 absolute error = 1e-31 relative error = 1.2133195156574907872173443918364e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.695 y[1] (analytic) = -8.239585686675642268843579332535 y[1] (numeric) = -8.2395856866756422688435793325348 absolute error = 2e-31 relative error = 2.4273065127949698125775895922781e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.696 y[1] (analytic) = -8.23731913328005115928875936423 y[1] (numeric) = -8.2373191332800511592887593642304 absolute error = 4e-31 relative error = 4.8559488047990972389789948139992e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.697 y[1] (analytic) = -8.235052441387096775479459062543 y[1] (numeric) = -8.2350524413870967754794590625426 absolute error = 4e-31 relative error = 4.8572854009976984533558891566769e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.698 y[1] (analytic) = -8.232785610998657847323853749325 y[1] (numeric) = -8.2327856109986578473238537493246 absolute error = 4e-31 relative error = 4.8586228149269027544477180449370e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.699 y[1] (analytic) = -8.230518642116612167029838471419 y[1] (numeric) = -8.2305186421166121670298384714193 absolute error = 3e-31 relative error = 3.6449707854965760076268583396113e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.7 y[1] (analytic) = -8.22825153474283658946198945559 y[1] (numeric) = -8.2282515347428365894619894555905 absolute error = 5e-31 relative error = 6.0766251236828147890798810880696e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2185.8MB, alloc=4.6MB, time=142.39 x[1] = 4.701 y[1] (analytic) = -8.22598428887920703249833558641 y[1] (numeric) = -8.22598428887920703249833558641 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.702 y[1] (analytic) = -8.223716904527598477386940036013 y[1] (numeric) = -8.2237169045275984773869400360133 absolute error = 3e-31 relative error = 3.6479854971033093828637774346126e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.703 y[1] (analytic) = -8.221449381689884969102292174532 y[1] (numeric) = -8.2214493816898849691022921745317 absolute error = 3e-31 relative error = 3.6489916324016366914643020638738e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.704 y[1] (analytic) = -8.2191817203679396167015098899 y[1] (numeric) = -8.2191817203679396167015098899002 absolute error = 2e-31 relative error = 2.4333322562315462058350432284614e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.705 y[1] (analytic) = -8.216913920563634593680352445637 y[1] (numeric) = -8.2169139205636345936803524456363 absolute error = 7e-31 relative error = 8.5190134248355846631207410200646e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.706 y[1] (analytic) = -8.214645982278841138329044005076 y[1] (numeric) = -8.2146459822788411383290440050767 absolute error = 7e-31 relative error = 8.5213653943223444894803300515089e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.707 y[1] (analytic) = -8.212377905515429554087907950454 y[1] (numeric) = -8.2123779055154295540879079504545 absolute error = 5e-31 relative error = 6.0883705761299685183963037684366e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.708 y[1] (analytic) = -8.210109690275269209902812125092 y[1] (numeric) = -8.2101096902752692099028121250925 absolute error = 5e-31 relative error = 6.0900526163766267571052941878503e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2189.7MB, alloc=4.6MB, time=142.77 x[1] = 4.709 y[1] (analytic) = -8.207841336560228540580425126882 y[1] (numeric) = -8.2078413365602285405804251268821 absolute error = 1e-31 relative error = 1.2183471378103948232880587957891e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.71 y[1] (analytic) = -8.205572844372175047143283781113 y[1] (numeric) = -8.2055728443721750471432837811129 absolute error = 1e-31 relative error = 1.2186839590192097306423305086883e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.711 y[1] (analytic) = -8.203304213712975297184671920611 y[1] (numeric) = -8.2033042137129752971846719206109 absolute error = 1e-31 relative error = 1.2190209870900064046491250818815e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.712 y[1] (analytic) = -8.201035444584494925223310601038 y[1] (numeric) = -8.2010354445844949252233106010382 absolute error = 2e-31 relative error = 2.4387164444225004881196331863968e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.713 y[1] (analytic) = -8.198766536988598633057859879102 y[1] (numeric) = -8.198766536988598633057859879102 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.714 y[1] (analytic) = -8.196497490927150190121232281315 y[1] (numeric) = -8.1964974909271501901212322813147 absolute error = 3e-31 relative error = 3.6600999430802653295158174383274e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.715 y[1] (analytic) = -8.194228306402012433834718090842 y[1] (numeric) = -8.1942283064020124338347180908422 absolute error = 2e-31 relative error = 2.4407423435315241544983916845753e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.716 y[1] (analytic) = -8.191958983415047269961922579872 y[1] (numeric) = -8.1919589834150472699619225798718 absolute error = 2e-31 relative error = 2.4414184739560842510080136284626e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2193.5MB, alloc=4.6MB, time=143.14 x[1] = 4.717 y[1] (analytic) = -8.189689521968115672962515314827 y[1] (numeric) = -8.1896895219681156729625153148267 absolute error = 3e-31 relative error = 3.6631425305596336908886889299712e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.718 y[1] (analytic) = -8.187419922063077686345791661648 y[1] (numeric) = -8.1874199220630776863457916616479 absolute error = 1e-31 relative error = 1.2213859915811165349820813302282e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.719 y[1] (analytic) = -8.185150183701792423024046618262 y[1] (numeric) = -8.1851501837017924230240466182615 absolute error = 5e-31 relative error = 6.1086234067591835141809842451015e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.72 y[1] (analytic) = -8.182880306886118065665761101242 y[1] (numeric) = -8.1828803068861180656657611012421 absolute error = 1e-31 relative error = 1.2220635796890156032847382818923e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.721 y[1] (analytic) = -8.180610291617911867048600813581 y[1] (numeric) = -8.1806102916179118670486008135811 absolute error = 1e-31 relative error = 1.2224026867831959987842634870557e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.722 y[1] (analytic) = -8.178340137899030150412227820361 y[1] (numeric) = -8.1783401378990301504122278203611 absolute error = 1e-31 relative error = 1.2227420028251532323477332763643e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.723 y[1] (analytic) = -8.176069845731328309810924959036 y[1] (numeric) = -8.1760698457313283098109249590363 absolute error = 3e-31 relative error = 3.6692445840176867471571183368630e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.724 y[1] (analytic) = -8.173799415116660810466033210912 y[1] (numeric) = -8.173799415116660810466033210912 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.725 y[1] (analytic) = -8.171528846056881189118202160313 y[1] (numeric) = -8.171528846056881189118202160313 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2197.3MB, alloc=4.6MB, time=143.52 x[1] = 4.726 y[1] (analytic) = -8.169258138553842054379453667827 y[1] (numeric) = -8.1692581385538420543794536678271 absolute error = 1e-31 relative error = 1.2241013602944176162897811409206e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.727 y[1] (analytic) = -8.166987292609395087085058883904 y[1] (numeric) = -8.1669872926093950870850588839043 absolute error = 3e-31 relative error = 3.6733251718351631404764247634901e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.728 y[1] (analytic) = -8.164716308225391040645228728991 y[1] (numeric) = -8.1647163082253910406452287289907 absolute error = 3e-31 relative error = 3.6743468930790724455967643748729e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.729 y[1] (analytic) = -8.162445185403679741396617966269 y[1] (numeric) = -8.1624451854036797413966179662693 absolute error = 3e-31 relative error = 3.6753692451922209010906480343019e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.73 y[1] (analytic) = -8.160173924146110088953642992979 y[1] (numeric) = -8.1601739241461100889536429929791 absolute error = 1e-31 relative error = 1.2254640762508516521674929591320e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.731 y[1] (analytic) = -8.157902524454530056559613476178 y[1] (numeric) = -8.157902524454530056559613476178 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.732 y[1] (analytic) = -8.155630986330786691437677958713 y[1] (numeric) = -8.1556309863307866914376779587129 absolute error = 1e-31 relative error = 1.2261466975100345706977062021544e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.733 y[1] (analytic) = -8.153359309776726115141583561056 y[1] (numeric) = -8.153359309776726115141583561056 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2201.1MB, alloc=4.6MB, time=143.89 x[1] = 4.734 y[1] (analytic) = -8.151087494794193523906249904564 y[1] (numeric) = -8.1510874947941935239062499045635 absolute error = 5e-31 relative error = 6.1341508150824294351510601317499e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.735 y[1] (analytic) = -8.14881554138503318899815738161 y[1] (numeric) = -8.1488155413850331889981573816099 absolute error = 1e-31 relative error = 1.2271722128465710436968840933808e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.736 y[1] (analytic) = -8.146543449551088457065549897947 y[1] (numeric) = -8.1465434495510884570655498979468 absolute error = 2e-31 relative error = 2.4550289486398173980502910448918e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.737 y[1] (analytic) = -8.144271219294201750488452212534 y[1] (numeric) = -8.1442712192942017504884522125338 absolute error = 2e-31 relative error = 2.4557138952616117036162297585051e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.738 y[1] (analytic) = -8.141998850616214567728501999984 y[1] (numeric) = -8.1419988506162145677285019999844 absolute error = 4e-31 relative error = 4.9127985318952313505093360174052e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.739 y[1] (analytic) = -8.139726343518967483678596760668 y[1] (numeric) = -8.139726343518967483678596760668 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.74 y[1] (analytic) = -8.137453698004300150012355703407 y[1] (numeric) = -8.1374536980043001500123557034065 absolute error = 5e-31 relative error = 6.1444282026775076388260559762940e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.741 y[1] (analytic) = -8.1351809140740512955333967256 y[1] (numeric) = -8.1351809140740512955333967256002 absolute error = 2e-31 relative error = 2.4584579262889577584560591771835e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2204.9MB, alloc=4.6MB, time=144.27 x[1] = 4.742 y[1] (analytic) = -8.132907991730058726524428615517 y[1] (numeric) = -8.1329079917300587265244286155171 absolute error = 1e-31 relative error = 1.2295724985661330922005446114312e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.743 y[1] (analytic) = -8.130634930974159327096158601374 y[1] (numeric) = -8.1306349309741593270961586013745 absolute error = 5e-31 relative error = 6.1495812349810334040182655834463e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.744 y[1] (analytic) = -8.128361731808189059536015371743 y[1] (numeric) = -8.1283617318081890595360153717426 absolute error = 4e-31 relative error = 4.9210408345227307940546114400237e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.745 y[1] (analytic) = -8.126088394233982964656687691695 y[1] (numeric) = -8.1260883942339829646566876916951 absolute error = 1e-31 relative error = 1.2306043836657851076275609195682e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.746 y[1] (analytic) = -8.123814918253375162144478739031 y[1] (numeric) = -8.1238149182533751621444787390306 absolute error = 4e-31 relative error = 4.9237950891919165976387905169714e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.747 y[1] (analytic) = -8.121541303868198850907476284787 y[1] (numeric) = -8.1215413038681988509074762847872 absolute error = 2e-31 relative error = 2.4625867494479434298420040067352e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.748 y[1] (analytic) = -8.119267551080286309423538842169 y[1] (numeric) = -8.1192675510802863094235388421687 absolute error = 3e-31 relative error = 3.6949145734221351495976447136542e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.749 y[1] (analytic) = -8.116993659891468896088097907902 y[1] (numeric) = -8.116993659891468896088097907902 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2208.7MB, alloc=4.6MB, time=144.64 x[1] = 4.75 y[1] (analytic) = -8.11471963030357704956177641994 y[1] (numeric) = -8.1147196303035770495617764199404 absolute error = 4e-31 relative error = 4.9293138669417680718945390226576e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.751 y[1] (analytic) = -8.112445462318440289117823555328 y[1] (numeric) = -8.1124454623184402891178235553282 absolute error = 2e-31 relative error = 2.4653478526170872046519046657225e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.752 y[1] (analytic) = -8.110171155937887214989365991939 y[1] (numeric) = -8.1101711559378872149893659919391 absolute error = 1e-31 relative error = 1.2330196006626159396641289405817e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.753 y[1] (analytic) = -8.1078967111637455087164757577 y[1] (numeric) = -8.1078967111637455087164757577 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.754 y[1] (analytic) = -8.10562212799784193349305479081 y[1] (numeric) = -8.1056221279978419334930547908105 absolute error = 5e-31 relative error = 6.1685579725328780041986029588190e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.755 y[1] (analytic) = -8.103347406442002334513536334367 y[1] (numeric) = -8.1033474064420023345135363343668 absolute error = 2e-31 relative error = 2.4681158287870506537957397881971e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.756 y[1] (analytic) = -8.101072546498051639319403288697 y[1] (numeric) = -8.1010725464980516393194032886976 absolute error = 6e-31 relative error = 7.4064266991334281826091425263440e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.757 y[1] (analytic) = -8.098797548167813858145523644619 y[1] (numeric) = -8.0987975481678138581455236446189 absolute error = 1e-31 relative error = 1.2347512010918576473465090327544e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.758 y[1] (analytic) = -8.096522411453112084266303120713 y[1] (numeric) = -8.096522411453112084266303120713 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 memory used=2212.6MB, alloc=4.6MB, time=145.02 TOP MAIN SOLVE Loop x[1] = 4.759 y[1] (analytic) = -8.094247136355768494341655127638 y[1] (numeric) = -8.0942471363557684943416551276374 absolute error = 6e-31 relative error = 7.4126721101097356961572614528979e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.76 y[1] (analytic) = -8.091971722877604348762788182366 y[1] (numeric) = -8.0919717228776043487627881823662 absolute error = 2e-31 relative error = 2.4715855028825724577008342225137e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.761 y[1] (analytic) = -8.089696171020439991997810895168 y[1] (numeric) = -8.0896961710204399919978108951686 absolute error = 6e-31 relative error = 7.4168422066253642252700557514363e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.762 y[1] (analytic) = -8.087420480786094852937154652027 y[1] (numeric) = -8.0874204807860948529371546520268 absolute error = 2e-31 relative error = 2.4729764017483119635138108741615e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.763 y[1] (analytic) = -8.085144652176387445238814115095 y[1] (numeric) = -8.0851446521763874452388141150956 absolute error = 6e-31 relative error = 7.4210175057101780695630360691145e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.764 y[1] (analytic) = -8.082868685193135367673405663706 y[1] (numeric) = -8.0828686851931353676734056637055 absolute error = 5e-31 relative error = 6.1859225910219373514396951899185e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.765 y[1] (analytic) = -8.080592579838155304469043898311 y[1] (numeric) = -8.0805925798381553044690438983114 absolute error = 4e-31 relative error = 4.9501320113334005769428723697974e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.766 y[1] (analytic) = -8.078316336113263025656036329688 y[1] (numeric) = -8.0783163361132630256560363296877 absolute error = 3e-31 relative error = 3.7136451151198619412480463537848e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2216.4MB, alloc=4.6MB, time=145.40 x[1] = 4.767 y[1] (analytic) = -8.076039954020273387411396375571 y[1] (numeric) = -8.0760399540202733874113963755716 absolute error = 6e-31 relative error = 7.4293837501549068271245425684041e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.768 y[1] (analytic) = -8.073763433561000332403174786856 y[1] (numeric) = -8.073763433561000332403174786856 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.769 y[1] (analytic) = -8.071486774737256890134609625333 y[1] (numeric) = -8.071486774737256890134609625333 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.77 y[1] (analytic) = -8.06920997755085517728809491489 y[1] (numeric) = -8.06920997755085517728809491489 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.771 y[1] (analytic) = -8.06693304200360639806896808796 y[1] (numeric) = -8.0669330420036063980689680879606 absolute error = 6e-31 relative error = 7.4377709208179611461951359912459e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.772 y[1] (analytic) = -8.064655968097320844549116348932 y[1] (numeric) = -8.0646559680973208445491163489316 absolute error = 4e-31 relative error = 4.9599139948727564842265075283702e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.773 y[1] (analytic) = -8.06237875583380789701040207611 y[1] (numeric) = -8.0623787558338078970104020761105 absolute error = 5e-31 relative error = 6.2016436481380637582981033148952e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.774 y[1] (analytic) = -8.060101405214876024287907383755 y[1] (numeric) = -8.0601014052148760242879073837553 absolute error = 3e-31 relative error = 3.7220375392039156821657278371220e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2220.2MB, alloc=4.6MB, time=145.77 x[1] = 4.775 y[1] (analytic) = -8.057823916242332784112997965572 y[1] (numeric) = -8.0578239162423327841129979655718 absolute error = 2e-31 relative error = 2.4820596984857860181281319517781e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.776 y[1] (analytic) = -8.055546288917984823456206340983 y[1] (numeric) = -8.0555462889179848234562063409826 absolute error = 4e-31 relative error = 4.9655229534250210602516981950194e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.777 y[1] (analytic) = -8.053268523243637878869934625373 y[1] (numeric) = -8.0532685232436378788699346253738 absolute error = 8e-31 relative error = 9.9338547782308607733021779251641e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.778 y[1] (analytic) = -8.050990619221096776830976945426 y[1] (numeric) = -8.0509906192210967768309769454265 absolute error = 5e-31 relative error = 6.2104158810754288205827942794018e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.779 y[1] (analytic) = -8.048712576852165434082861620539 y[1] (numeric) = -8.0487125768521654340828616205395 absolute error = 5e-31 relative error = 6.2121736268478970672935428934209e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.78 y[1] (analytic) = -8.046434396138646857978013231254 y[1] (numeric) = -8.0464343961386468579780132312537 absolute error = 3e-31 relative error = 3.7283594848416974121333747843330e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.781 y[1] (analytic) = -8.044156077082343146819734695487 y[1] (numeric) = -8.0441560770823431468197346954874 absolute error = 4e-31 relative error = 4.9725539406127741472959329327821e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.782 y[1] (analytic) = -8.041877619685055490204009473294 y[1] (numeric) = -8.041877619685055490204009473294 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2224.0MB, alloc=4.6MB, time=146.15 x[1] = 4.783 y[1] (analytic) = -8.039599023948584169361124020755 y[1] (numeric) = -8.0395990239485841693611240207555 absolute error = 5e-31 relative error = 6.2192156413595492443707216206850e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.784 y[1] (analytic) = -8.037320289874728557497110613526 y[1] (numeric) = -8.0373202898747285574971106135258 absolute error = 2e-31 relative error = 2.4883915631924784722786183264444e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.785 y[1] (analytic) = -8.035041417465287120135010660441 y[1] (numeric) = -8.0350414174652871201350106604403 absolute error = 7e-31 relative error = 8.7118405946041799697995685153487e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.786 y[1] (analytic) = -8.03276240672205741545595862751 y[1] (numeric) = -8.0327624067220574154559586275092 absolute error = 8e-31 relative error = 9.9592140224455775672272765497844e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.787 y[1] (analytic) = -8.030483257646836094640086692514 y[1] (numeric) = -8.0304832576468360946400866925143 absolute error = 3e-31 relative error = 3.7357652133118160386856397763227e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.788 y[1] (analytic) = -8.028203970241418902207250250331 y[1] (numeric) = -8.0282039702414189022072502503311 absolute error = 1e-31 relative error = 1.2456086114736926067958539713633e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.789 y[1] (analytic) = -8.025924544507600676357574389 y[1] (numeric) = -8.0259245445076006763575743889994 absolute error = 6e-31 relative error = 7.4757742447329557073240554048775e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.79 y[1] (analytic) = -8.023644980447175349311821456469 y[1] (numeric) = -8.0236449804471753493118214564682 absolute error = 8e-31 relative error = 9.9705308740543782600872792975507e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2227.8MB, alloc=4.6MB, time=146.52 x[1] = 4.791 y[1] (analytic) = -8.021365278061935947651579837843 y[1] (numeric) = -8.0213652780619359476515798378429 absolute error = 1e-31 relative error = 1.2466705670853238354442431904053e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.792 y[1] (analytic) = -8.019085437353674592659274062865 y[1] (numeric) = -8.0190854373536745926592740628644 absolute error = 6e-31 relative error = 7.4821499868942914781878721481812e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.793 y[1] (analytic) = -8.016805458324182500657996363254 y[1] (numeric) = -8.0168054583241825006579963632536 absolute error = 4e-31 relative error = 4.9895186066248291615990416644052e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.794 y[1] (analytic) = -8.014525340975249983351159799455 y[1] (numeric) = -8.0145253409752499833511597994553 absolute error = 3e-31 relative error = 3.7432035864458868583025338828469e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.795 y[1] (analytic) = -8.01224508530866644816197307622 y[1] (numeric) = -8.0122450853086664481619730762196 absolute error = 4e-31 relative error = 4.9923585180069446700276049634365e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.796 y[1] (analytic) = -8.009964691326220398572737166361 y[1] (numeric) = -8.0099646913262203985727371663612 absolute error = 2e-31 relative error = 2.4968899078490911139360008100611e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.797 y[1] (analytic) = -8.007684159029699434463963861939 y[1] (numeric) = -8.0076841590296994344639638619389 absolute error = 1e-31 relative error = 1.2488005022930015053961100976652e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.798 y[1] (analytic) = -8.005403488420890252453316372002 y[1] (numeric) = -8.0054034884208902524533163720021 absolute error = 1e-31 relative error = 1.2491562748166432332784346953316e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.799 y[1] (analytic) = -8.003122679501578646234372085952 y[1] (numeric) = -8.0031226795015786462343720859523 absolute error = 3e-31 relative error = 3.7485368151158156173647859280591e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=2231.6MB, alloc=4.6MB, time=146.90 TOP MAIN SOLVE Loop x[1] = 4.8 y[1] (analytic) = -8.000841732273549506915207621472 y[1] (numeric) = -8.0008417322735495069152076214719 absolute error = 1e-31 relative error = 1.2498684931689508753283235102906e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.801 y[1] (analytic) = -7.998560646738586823356806275875 y[1] (numeric) = -7.9985606467385868233568062758749 absolute error = 1e-31 relative error = 1.2502249394180064248416775786290e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.802 y[1] (analytic) = -7.996279422898473682511287999639 y[1] (numeric) = -7.9962794228984736825112879996385 absolute error = 5e-31 relative error = 6.2529080533151392261256397228804e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.803 y[1] (analytic) = -7.993998060754992269759962010776 y[1] (numeric) = -7.9939980607549922697599620107757 absolute error = 3e-31 relative error = 3.7528155213446040405405880514879e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.804 y[1] (analytic) = -7.991716560309923869251202168615 y[1] (numeric) = -7.9917165603099238692512021686154 absolute error = 4e-31 relative error = 5.0051825159385750873466726077514e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.805 y[1] (analytic) = -7.989434921565048864238145225457 y[1] (numeric) = -7.9894349215650488642381452254573 absolute error = 3e-31 relative error = 3.7549589294512090214512322026293e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.806 y[1] (analytic) = -7.987153144522146737416212074474 y[1] (numeric) = -7.987153144522146737416212074474 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.807 y[1] (analytic) = -7.984871229182996071260452112136 y[1] (numeric) = -7.9848712291829960712604521121364 absolute error = 4e-31 relative error = 5.0094733968668846580956688926780e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2235.4MB, alloc=4.6MB, time=147.27 x[1] = 4.808 y[1] (analytic) = -7.982589175549374548362710833341 y[1] (numeric) = -7.9825891755493745483627108333412 absolute error = 2e-31 relative error = 2.5054527497494029594930657045996e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.809 y[1] (analytic) = -7.980306983623058951768620777324 y[1] (numeric) = -7.980306983623058951768620777324 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.81 y[1] (analytic) = -7.978024653405825165314415942346 y[1] (numeric) = -7.9780246534058251653144159423462 absolute error = 2e-31 relative error = 2.5068862116717054582814285790807e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.811 y[1] (analytic) = -7.975742184899448173963569787046 y[1] (numeric) = -7.9757421848994481739635697870457 absolute error = 3e-31 relative error = 3.7614054346941276142719057918099e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.812 y[1] (analytic) = -7.973459578105702064143256936248 y[1] (numeric) = -7.9734595781057020641432569362483 absolute error = 3e-31 relative error = 3.7624822332299654459532849955453e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.813 y[1] (analytic) = -7.971176833026360024080638708938 y[1] (numeric) = -7.9711768330263600240806387089383 absolute error = 3e-31 relative error = 3.7635597137556053105460545385885e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.814 y[1] (analytic) = -7.968893949663194344138972585994 y[1] (numeric) = -7.9688939496631943441389725859936 absolute error = 4e-31 relative error = 5.0195171692165136382927590096152e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.815 y[1] (analytic) = -7.966610928017976417153545735193 y[1] (numeric) = -7.9666109280179764171535457351931 absolute error = 1e-31 relative error = 1.2552389077808162921454485420797e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2239.3MB, alloc=4.6MB, time=147.65 x[1] = 4.816 y[1] (analytic) = -7.96432776809247673876743271091 y[1] (numeric) = -7.9643277680924767387674327109094 absolute error = 6e-31 relative error = 7.5335925073774937000703011658339e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.817 y[1] (analytic) = -7.962044469888464907767077445806 y[1] (numeric) = -7.9620444698884649077670774458052 absolute error = 8e-31 relative error = 1.0047670582920101156530216692826e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.818 y[1] (analytic) = -7.959761033407709626417699651755 y[1] (numeric) = -7.959761033407709626417699651755 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.819 y[1] (analytic) = -7.95747745865197870079852574712 y[1] (numeric) = -7.9574774586519787007985257471196 absolute error = 4e-31 relative error = 5.0267186062222441716196747413154e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.82 y[1] (analytic) = -7.955193745623039041137844427405 y[1] (numeric) = -7.9551937456230390411378444274052 absolute error = 2e-31 relative error = 2.5140808180824047922366334559276e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.821 y[1] (analytic) = -7.952909894322656662147886996245 y[1] (numeric) = -7.9529098943226566621478869962447 absolute error = 3e-31 relative error = 3.7722041867236668063488884544711e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.822 y[1] (analytic) = -7.950625904752596683359532573543 y[1] (numeric) = -7.9506259047525966833595325735426 absolute error = 4e-31 relative error = 5.0310504454862410692682184754495e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.823 y[1] (analytic) = -7.948341776914623329456838297531 y[1] (numeric) = -7.9483417769146233294568382975308 absolute error = 2e-31 relative error = 2.5162481132968558916277963026186e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2243.1MB, alloc=4.6MB, time=148.01 x[1] = 4.824 y[1] (analytic) = -7.946057510810499930611394637389 y[1] (numeric) = -7.9460575108104999306113946373885 absolute error = 5e-31 relative error = 6.2924286581082128373906196942626e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.825 y[1] (analytic) = -7.943773106441988922816505932983 y[1] (numeric) = -7.943773106441988922816505932983 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.826 y[1] (analytic) = -7.941488563810851848221196278195 y[1] (numeric) = -7.9414885638108518482211962781952 absolute error = 2e-31 relative error = 2.5184195430488256259322751299575e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.827 y[1] (analytic) = -7.939203882918849355464040864199 y[1] (numeric) = -7.9392038829188493554640408641989 absolute error = 1e-31 relative error = 1.2595721368883020396855099961857e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.828 y[1] (analytic) = -7.936919063767741200006822898967 y[1] (numeric) = -7.9369190637677412000068228989672 absolute error = 2e-31 relative error = 2.5198694656344125544969393786221e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.829 y[1] (analytic) = -7.934634106359286244468016219187 y[1] (numeric) = -7.9346341063592862444680162191871 absolute error = 1e-31 relative error = 1.2602975595289777843380025246301e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.83 y[1] (analytic) = -7.932349010695242458956093710668 y[1] (numeric) = -7.9323490106952424589560937106677 absolute error = 3e-31 relative error = 3.7819818517252313432536712801550e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.831 y[1] (analytic) = -7.930063776777366921402661653234 y[1] (numeric) = -7.9300637767773669214026616532338 absolute error = 2e-31 relative error = 2.5220478123478137657394878295857e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.832 memory used=2246.9MB, alloc=4.6MB, time=148.39 y[1] (analytic) = -7.927778404607415817895420106003 y[1] (numeric) = -7.9277784046074158178954201060024 absolute error = 6e-31 relative error = 7.5683245592648732097098777763467e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.833 y[1] (analytic) = -7.925492894187144443010949448846 y[1] (numeric) = -7.9254928941871444430109494488463 absolute error = 3e-31 relative error = 3.7852535357142433437406764877368e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.834 y[1] (analytic) = -7.923207245518307200147323195754 y[1] (numeric) = -7.9232072455183072001473231957541 absolute error = 1e-31 relative error = 1.2621151624749450339379741076254e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.835 y[1] (analytic) = -7.920921458602657601856547195704 y[1] (numeric) = -7.9209214586026576018565471957035 absolute error = 5e-31 relative error = 6.3123968923712292195382142294184e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.836 y[1] (analytic) = -7.918635533441948270176825336569 y[1] (numeric) = -7.9186355334419482701768253365695 absolute error = 5e-31 relative error = 6.3142191339455150266776860174719e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.837 y[1] (analytic) = -7.916349470037930936964651867497 y[1] (numeric) = -7.9163494700379309369646518674972 absolute error = 2e-31 relative error = 2.5264170152791613222511034771039e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.838 y[1] (analytic) = -7.914063268392356444226730455074 y[1] (numeric) = -7.9140632683923564442267304550741 absolute error = 1e-31 relative error = 1.2635734212460214091657810605632e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.839 y[1] (analytic) = -7.911776928506974744451720088544 y[1] (numeric) = -7.9117769285069747444517200885439 absolute error = 1e-31 relative error = 1.2639385678290467427562179050927e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.84 y[1] (analytic) = -7.909490450383534900941807949211 y[1] (numeric) = -7.9094904503835349009418079492106 absolute error = 4e-31 relative error = 5.0572157904382299674908800832968e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2250.7MB, alloc=4.6MB, time=148.76 x[1] = 4.841 y[1] (analytic) = -7.907203834023785088144109359088 y[1] (numeric) = -7.9072038340237850881441093590886 absolute error = 6e-31 relative error = 7.5880173648524055916145936433178e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.842 y[1] (analytic) = -7.904917079429472591981894923761 y[1] (numeric) = -7.9049170794294725919818949237604 absolute error = 6e-31 relative error = 7.5902124458882273605151304115530e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.843 y[1] (analytic) = -7.902630186602343810185644984312 y[1] (numeric) = -7.9026301866023438101856449843119 absolute error = 1e-31 relative error = 1.2654014883492098723007548914267e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.844 y[1] (analytic) = -7.900343155544144252623931493122 y[1] (numeric) = -7.9003431555441442526239314931215 absolute error = 5e-31 relative error = 6.3288390156713640401155875310577e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.845 y[1] (analytic) = -7.898055986256618541634127428185 y[1] (numeric) = -7.8980559862566185416341274281855 absolute error = 5e-31 relative error = 6.3306717611276543115017453148328e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.846 y[1] (analytic) = -7.895768678741510412352943860572 y[1] (numeric) = -7.895768678741510412352943860572 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.847 y[1] (analytic) = -7.8934812330005627130467947895 y[1] (numeric) = -7.8934812330005627130467947894998 absolute error = 2e-31 relative error = 2.5337363084345188603455448576965e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.848 y[1] (analytic) = -7.891193649035517405441989859449 y[1] (numeric) = -7.8911936490355174054419898594488 absolute error = 2e-31 relative error = 2.5344708151275001327087855947499e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2254.5MB, alloc=4.6MB, time=149.13 x[1] = 4.849 y[1] (analytic) = -7.888905926848115565054755073614 y[1] (numeric) = -7.8889059268481155650547550736137 absolute error = 3e-31 relative error = 3.8028086883254308894779112628542e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.85 y[1] (analytic) = -7.886618066440097381521081617922 y[1] (numeric) = -7.8866180664400973815210816179224 absolute error = 4e-31 relative error = 5.0718824803006350886013657347718e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.851 y[1] (analytic) = -7.884330067813202158926402909746 y[1] (numeric) = -7.8843300678132021589264029097462 absolute error = 2e-31 relative error = 2.5366771593755967823938730674766e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.852 y[1] (analytic) = -7.882041930969168316135099985339 y[1] (numeric) = -7.8820419309691683161350999853386 absolute error = 4e-31 relative error = 5.0748271006827336636807948949840e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.853 y[1] (analytic) = -7.879753655909733387119835339946 y[1] (numeric) = -7.8797536559097333871198353399455 absolute error = 5e-31 relative error = 6.3453760337419329599936490337260e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.854 y[1] (analytic) = -7.877465242636634021290715334439 y[1] (numeric) = -7.8774652426366340212907153344387 absolute error = 3e-31 relative error = 3.8083316239372988050112423724458e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.855 y[1] (analytic) = -7.875176691151605983824281282232 y[1] (numeric) = -7.8751766911516059838242812822323 absolute error = 3e-31 relative error = 3.8094383372639005532963186830648e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.856 y[1] (analytic) = -7.87288800145638415599232933015 y[1] (numeric) = -7.8728880014563841559923293301501 absolute error = 1e-31 relative error = 1.2701819203004192586058073959352e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2258.3MB, alloc=4.6MB, time=149.50 x[1] = 4.857 y[1] (analytic) = -7.870599173552702535490559246819 y[1] (numeric) = -7.8705991735527025354905592468186 absolute error = 4e-31 relative error = 5.0822051940353655084263765558266e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.858 y[1] (analytic) = -7.868310207442294236767052232071 y[1] (numeric) = -7.8683102074422942367670522320713 absolute error = 3e-31 relative error = 3.8127627418177155522427002447601e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.859 y[1] (analytic) = -7.866021103126891491350577860756 y[1] (numeric) = -7.8660211031268914913505778607558 absolute error = 2e-31 relative error = 2.5425815336358077448341817535814e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.86 y[1] (analytic) = -7.863731860608225648178730274245 y[1] (numeric) = -7.863731860608225648178730274245 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.861 y[1] (analytic) = -7.861442479888027173925893732862 y[1] (numeric) = -7.8614424798880271739258937328614 absolute error = 6e-31 relative error = 7.6321871149599249577398730228265e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.862 y[1] (analytic) = -7.859152960968025653331037642333 y[1] (numeric) = -7.8591529609680256533310376423336 absolute error = 6e-31 relative error = 7.6344105144646141069556239717735e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.863 y[1] (analytic) = -7.856863303849949789525341167311 y[1] (numeric) = -7.8568633038499497895253411673109 absolute error = 1e-31 relative error = 1.2727725573512128638806873240124e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.864 y[1] (analytic) = -7.854573508535527404359647544872 y[1] (numeric) = -7.8545735085355274043596475448721 absolute error = 1e-31 relative error = 1.2731436008757251943775338323198e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2262.1MB, alloc=4.6MB, time=149.88 x[1] = 4.865 y[1] (analytic) = -7.852283575026485438731748210873 y[1] (numeric) = -7.8522835750264854387317482108726 absolute error = 4e-31 relative error = 5.0940595328493446058902477641171e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.866 y[1] (analytic) = -7.849993503324549952913496851883 y[1] (numeric) = -7.8499935033245499529134968518835 absolute error = 5e-31 relative error = 6.3694320229468349327966170831064e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.867 y[1] (analytic) = -7.847703293431446126877753495385 y[1] (numeric) = -7.8477032934314461268777534953856 absolute error = 6e-31 relative error = 7.6455489914125831489690758854451e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.868 y[1] (analytic) = -7.845412945348898260625158750789 y[1] (numeric) = -7.8454129453488982606251587507891 absolute error = 1e-31 relative error = 1.2746301653794316307156165713273e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.869 y[1] (analytic) = -7.843122459078629774510738313761 y[1] (numeric) = -7.8431224590786297745107383137608 absolute error = 2e-31 relative error = 2.5500048105011353484910565953726e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.87 y[1] (analytic) = -7.840831834622363209570337846248 y[1] (numeric) = -7.8408318346223632095703378462481 absolute error = 1e-31 relative error = 1.2753748850783289982644525600175e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.871 y[1] (analytic) = -7.838541071981820227846888344501 y[1] (numeric) = -7.8385410719818202278468883445006 absolute error = 4e-31 relative error = 5.1029904203699975462910782362857e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.872 y[1] (analytic) = -7.836250171158721612716502107297 y[1] (numeric) = -7.8362501711587216127165021072968 absolute error = 2e-31 relative error = 2.5522411310463130659077244248942e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.873 y[1] (analytic) = -7.833959132154787269214399416496 y[1] (numeric) = -7.8339591321547872692143994164962 absolute error = 2e-31 relative error = 2.5529875332013450222065005711911e-30 % Correct digits = 31 h = 0.001 memory used=2266.0MB, alloc=4.6MB, time=150.26 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.874 y[1] (analytic) = -7.831667954971736224360666041944 y[1] (numeric) = -7.8316679549717362243606660419442 absolute error = 2e-31 relative error = 2.5537344171114284909194267158523e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.875 y[1] (analytic) = -7.829376639611286627485841682668 y[1] (numeric) = -7.8293766396112866274858416826678 absolute error = 2e-31 relative error = 2.5544817832384879658808461400989e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.876 y[1] (analytic) = -7.82708518607515575055633945621 y[1] (numeric) = -7.8270851860751557505563394562106 absolute error = 6e-31 relative error = 7.6656888961351185934926616331854e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.877 y[1] (analytic) = -7.824793594365059988499696547864 y[1] (numeric) = -7.8247935943650599884996965478646 absolute error = 6e-31 relative error = 7.6679338919825754245417872966624e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.878 y[1] (analytic) = -7.822501864482714859529656131466 y[1] (numeric) = -7.8225018644827148595296561314665 absolute error = 5e-31 relative error = 6.3918169488741172614931773494288e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.879 y[1] (analytic) = -7.820209996429835005471080673336 y[1] (numeric) = -7.8202099964298350054710806733366 absolute error = 6e-31 relative error = 7.6724282375271040952422607250059e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.88 y[1] (analytic) = -7.817917990208134192084696730848 y[1] (numeric) = -7.8179179902081341920846967308485 absolute error = 5e-31 relative error = 6.3955646583431178096702336599255e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.881 y[1] (analytic) = -7.815625845819325309391671357027 y[1] (numeric) = -7.8156258458193253093916713570276 absolute error = 6e-31 relative error = 7.6769283974993173775120966015401e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2269.8MB, alloc=4.6MB, time=150.64 x[1] = 4.882 y[1] (analytic) = -7.813333563265120371998020222487 y[1] (numeric) = -7.8133335632651203719980202224874 absolute error = 4e-31 relative error = 5.1194537742587258988294978473220e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.883 y[1] (analytic) = -7.811041142547230519418847565922 y[1] (numeric) = -7.8110411425472305194188475659228 absolute error = 8e-31 relative error = 1.0241912510770809725289307223887e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.884 y[1] (analytic) = -7.808748583667366016402418084289 y[1] (numeric) = -7.8087485836673660164024180842894 absolute error = 4e-31 relative error = 5.1224597093141479196748174504957e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.885 y[1] (analytic) = -7.80645588662723625325406087371 y[1] (numeric) = -7.8064558866272362532540608737101 absolute error = 1e-31 relative error = 1.2809910342451803849504272559800e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.886 y[1] (analytic) = -7.804163051428549746159905532058 y[1] (numeric) = -7.8041630514285497461599055320586 absolute error = 6e-31 relative error = 7.6882043089831417202356684457889e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.887 y[1] (analytic) = -7.801870078073014137510450534083 y[1] (numeric) = -7.801870078073014137510450534083 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.888 y[1] (analytic) = -7.799576966562336196223963989841 y[1] (numeric) = -7.7995769665623361962239639898408 absolute error = 2e-31 relative error = 2.5642416358915681879397996941349e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.889 y[1] (analytic) = -7.797283716898221818069716897129 y[1] (numeric) = -7.797283716898221818069716897129 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2273.6MB, alloc=4.6MB, time=151.02 x[1] = 4.89 y[1] (analytic) = -7.794990329082376025991048998504 y[1] (numeric) = -7.7949903290823760259910489985045 absolute error = 5e-31 relative error = 6.4143761427714285986700030678317e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.891 y[1] (analytic) = -7.7926968031165029704282673534 y[1] (numeric) = -7.7926968031165029704282673533999 absolute error = 1e-31 relative error = 1.2832528010073148019630776789784e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.892 y[1] (analytic) = -7.790403139002305929641377735751 y[1] (numeric) = -7.7904031390023059296413777357512 absolute error = 2e-31 relative error = 2.5672612370816719137461640029827e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.893 y[1] (analytic) = -7.788109336741487310032648967466 y[1] (numeric) = -7.788109336741487310032648967466 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.894 y[1] (analytic) = -7.785815396335748646469010297971 y[1] (numeric) = -7.7858153963357486464690102979715 absolute error = 5e-31 relative error = 6.4219349489754899440682097749705e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.895 y[1] (analytic) = -7.783521317786790602604281939993 y[1] (numeric) = -7.7835213177867906026042819399931 absolute error = 1e-31 relative error = 1.2847655439894722579635359435268e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.896 y[1] (analytic) = -7.781227101096312971201238871626 y[1] (numeric) = -7.7812271010963129712012388716258 absolute error = 2e-31 relative error = 2.5702886884232127309521415137920e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.897 y[1] (analytic) = -7.778932746266014674453508014673 y[1] (numeric) = -7.7789327462660146744535080146729 absolute error = 1e-31 relative error = 1.2855233906990808573987399032962e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2277.4MB, alloc=4.6MB, time=151.39 x[1] = 4.898 y[1] (analytic) = -7.776638253297593764307298899137 y[1] (numeric) = -7.7766382532975937643072988991374 absolute error = 4e-31 relative error = 5.1436107347591308255896056668310e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.899 y[1] (analytic) = -7.774343622192747422782967923663 y[1] (numeric) = -7.7743436221927474227829679236634 absolute error = 4e-31 relative error = 5.1451288936876232232297806791677e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.9 y[1] (analytic) = -7.772048852953171962296416321637 y[1] (numeric) = -7.7720488529531719622964163216375 absolute error = 5e-31 relative error = 6.4333100506697573232060083166608e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.901 y[1] (analytic) = -7.76975394558056282598032194257 y[1] (numeric) = -7.7697539455805628259803219425704 absolute error = 4e-31 relative error = 5.1481681762589156142150089403311e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.902 y[1] (analytic) = -7.767458900076614588005204958293 y[1] (numeric) = -7.7674589000766145880052049582933 absolute error = 3e-31 relative error = 3.8622669763600672553079186256208e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.903 y[1] (analytic) = -7.765163716443020953900327603414 y[1] (numeric) = -7.7651637164430209539003276034137 absolute error = 3e-31 relative error = 3.8634085636177756349109482880336e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.904 y[1] (analytic) = -7.762868394681474760874428059388 y[1] (numeric) = -7.7628683946814747608744280593882 absolute error = 2e-31 relative error = 2.5763672631243464483030151609474e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.905 y[1] (analytic) = -7.760572934793667978136288591483 y[1] (numeric) = -7.7605729347936679781362885914828 absolute error = 2e-31 relative error = 2.5771293135242912708820132543253e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2281.2MB, alloc=4.6MB, time=151.76 x[1] = 4.906 y[1] (analytic) = -7.758277336781291707215138047802 y[1] (numeric) = -7.7582773367812917072151380478023 absolute error = 3e-31 relative error = 3.8668377911385960926722551558474e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.907 y[1] (analytic) = -7.755981600646036182280888829484 y[1] (numeric) = -7.7559816006460361822808888294839 absolute error = 1e-31 relative error = 1.2893274526549995702383848661314e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.908 y[1] (analytic) = -7.753685726389590770464208441062 y[1] (numeric) = -7.7536857263895907704642084410624 absolute error = 4e-31 relative error = 5.1588368953181072945712829051664e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.909 y[1] (analytic) = -7.751389714013643972176425729926 y[1] (numeric) = -7.7513897140136439721764257299259 absolute error = 1e-31 relative error = 1.2900912441444042753956988434152e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.91 y[1] (analytic) = -7.749093563519883421429271923696 y[1] (numeric) = -7.7490935635198834214292719236961 absolute error = 1e-31 relative error = 1.2904735138412348286109297476129e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.911 y[1] (analytic) = -7.746797274909995886154456574277 y[1] (numeric) = -7.7467972749099958861544565742769 absolute error = 1e-31 relative error = 1.2908560331619343108945513635390e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.912 y[1] (analytic) = -7.74450084818566726852307851723 y[1] (numeric) = -7.7445008481856672685230785172305 absolute error = 5e-31 relative error = 6.4561940117436599049855896353190e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.913 y[1] (analytic) = -7.742204283348582605264871955052 y[1] (numeric) = -7.7422042833485826052648719550517 absolute error = 3e-31 relative error = 3.8748654649325131093525480978174e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.914 y[1] (analytic) = -7.739907580400426067987287772824 y[1] (numeric) = -7.7399075804004260679872877728246 absolute error = 6e-31 relative error = 7.7520305477466547331626492571691e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=2285.0MB, alloc=4.6MB, time=152.14 TOP MAIN SOLVE Loop x[1] = 4.915 y[1] (analytic) = -7.737610739342880963494410194659 y[1] (numeric) = -7.7376107393428809634944101946591 absolute error = 1e-31 relative error = 1.2923886115327188401831102184975e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.916 y[1] (analytic) = -7.735313760177629734105708889217 y[1] (numeric) = -7.7353137601776297341057088892172 absolute error = 2e-31 relative error = 2.5855447652249765200002281362461e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.917 y[1] (analytic) = -7.733016642906353957974626632553 y[1] (numeric) = -7.7330166429063539579746266325532 absolute error = 2e-31 relative error = 2.5863128095484428608973491570999e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.918 y[1] (analytic) = -7.730719387530734349407002636404 y[1] (numeric) = -7.7307193875307343494070026364045 absolute error = 5e-31 relative error = 6.4677033913101944607494158103592e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.919 y[1] (analytic) = -7.728421994052450759179331649984 y[1] (numeric) = -7.7284219940524507591793316499838 absolute error = 2e-31 relative error = 2.5878504066407563822697167025428e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.92 y[1] (analytic) = -7.726124462473182174856858943236 y[1] (numeric) = -7.7261244624731821748568589432364 absolute error = 4e-31 relative error = 5.1772399207759775737523539311165e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.921 y[1] (analytic) = -7.72382679279460672111151127944 y[1] (numeric) = -7.7238267927946067211115112794403 absolute error = 3e-31 relative error = 3.8840850273838818020807035184664e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.922 y[1] (analytic) = -7.72152898501840166003966398494 y[1] (numeric) = -7.7215289850184016600396639849402 absolute error = 2e-31 relative error = 2.5901605807353369334720135988065e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2288.9MB, alloc=4.6MB, time=152.51 x[1] = 4.923 y[1] (analytic) = -7.71923103914624339147974422372 y[1] (numeric) = -7.7192310391462433914797442237206 absolute error = 6e-31 relative error = 7.7727949449529722912564148113454e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.924 y[1] (analytic) = -7.716932955179807453329670584436 y[1] (numeric) = -7.7169329551798074533296705844367 absolute error = 7e-31 relative error = 9.0709612752323016072968355547495e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.925 y[1] (analytic) = -7.714634733120768521864129087436 y[1] (numeric) = -7.714634733120768521864129087436 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.926 y[1] (analytic) = -7.712336372970800412051685719217 y[1] (numeric) = -7.7123363729708004120516857192171 absolute error = 1e-31 relative error = 1.2966239433029279368632595187620e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.927 y[1] (analytic) = -7.710037874731576077871735601686 y[1] (numeric) = -7.7100378747315760778717356016868 absolute error = 8e-31 relative error = 1.0376083918107236164729003138461e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.928 y[1] (analytic) = -7.70773923840476761263128890349 y[1] (numeric) = -7.7077392384047676126312889034905 absolute error = 5e-31 relative error = 6.4869864500434566960689375327184e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.929 y[1] (analytic) = -7.705440463992046249281593600604 y[1] (numeric) = -7.7054404639920462492815936006048 absolute error = 8e-31 relative error = 1.0382274754291395693701856861465e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.93 y[1] (analytic) = -7.703141551495082360734595193296 y[1] (numeric) = -7.7031415514950823607345951932965 absolute error = 5e-31 relative error = 6.4908582642228133926906872567794e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2292.7MB, alloc=4.6MB, time=152.89 x[1] = 4.931 y[1] (analytic) = -7.700842500915545460179233486465 y[1] (numeric) = -7.7008425009155454601792334864653 absolute error = 3e-31 relative error = 3.8956776477941640820780762849260e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.932 y[1] (analytic) = -7.698543312255104201397576540303 y[1] (numeric) = -7.6985433122551042013975765403034 absolute error = 4e-31 relative error = 5.1957881351820252793744866808915e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.933 y[1] (analytic) = -7.696243985515426379080791898118 y[1] (numeric) = -7.696243985515426379080791898118 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.934 y[1] (analytic) = -7.693944520698178929144955198079 y[1] (numeric) = -7.6939445206981789291449551980797 absolute error = 7e-31 relative error = 9.0980640439616691424354878562933e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.935 y[1] (analytic) = -7.691644917805027929046696275572 y[1] (numeric) = -7.6916449178050279290466962755721 absolute error = 1e-31 relative error = 1.3001120185425446771419096271157e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.936 y[1] (analytic) = -7.689345176837638598098682862734 y[1] (numeric) = -7.6893451768376385980986828627343 absolute error = 3e-31 relative error = 3.9015025740251605078178846854433e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.937 y[1] (analytic) = -7.687045297797675297784941991702 y[1] (numeric) = -7.6870452977976752977849419917025 absolute error = 5e-31 relative error = 6.5044497674971305811448673790237e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.938 y[1] (analytic) = -7.684745280686801532076019207971 y[1] (numeric) = -7.6847452806868015320760192079716 absolute error = 6e-31 relative error = 7.8076758315973325633645523584037e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2296.5MB, alloc=4.6MB, time=153.26 x[1] = 4.939 y[1] (analytic) = -7.682445125506679947743975700212 y[1] (numeric) = -7.6824451255066799477439757002127 absolute error = 7e-31 relative error = 9.1116823949176328467798109303072e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.94 y[1] (analytic) = -7.680144832258972334677223452798 y[1] (numeric) = -7.6801448322589723346772234527986 absolute error = 6e-31 relative error = 7.8123526717857625929294189464677e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.941 y[1] (analytic) = -7.677844400945339626195198527202 y[1] (numeric) = -7.6778444009453396261951985272024 absolute error = 4e-31 relative error = 5.2097956029266461524247528892508e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.942 y[1] (analytic) = -7.675543831567441899362872578352 y[1] (numeric) = -7.6755438315674418993628725783523 absolute error = 3e-31 relative error = 3.9085178403409137164216239581655e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.943 y[1] (analytic) = -7.673243124126938375305102711939 y[1] (numeric) = -7.673243124126938375305102711939 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.944 y[1] (analytic) = -7.670942278625487419520819788588 y[1] (numeric) = -7.6709422786254874195208197885885 absolute error = 5e-31 relative error = 6.5181040586527807936381254499113e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.945 y[1] (analytic) = -7.668641295064746542197055280728 y[1] (numeric) = -7.6686412950647465421970552807279 absolute error = 1e-31 relative error = 1.3040119644708938931165537476141e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.946 y[1] (analytic) = -7.666340173446372398522806787888 y[1] (numeric) = -7.6663401734463723985228067878888 absolute error = 8e-31 relative error = 1.0435227004026397341693172196839e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.947 memory used=2300.3MB, alloc=4.6MB, time=153.63 y[1] (analytic) = -7.664038913772020789002742316107 y[1] (numeric) = -7.664038913772020789002742316107 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.948 y[1] (analytic) = -7.661737516043346659770743426994 y[1] (numeric) = -7.6617375160433466597707434269939 absolute error = 1e-31 relative error = 1.3051869734587530477237347712192e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.949 y[1] (analytic) = -7.65943598026200410290328736197 y[1] (numeric) = -7.6594359802620041029032873619705 absolute error = 5e-31 relative error = 6.5278958044492545671631998773028e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.95 y[1] (analytic) = -7.65713430642964635673266824707 y[1] (numeric) = -7.6571343064296463567326682470709 absolute error = 9e-31 relative error = 1.1753744468662065872228491096575e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.951 y[1] (analytic) = -7.654832494547925806160057483638 y[1] (numeric) = -7.6548324945479258061600574836383 absolute error = 3e-31 relative error = 3.9190929417942437657801996763154e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.952 y[1] (analytic) = -7.652530544618493982968403430153 y[1] (numeric) = -7.6525305446184939829684034301529 absolute error = 1e-31 relative error = 1.3067572800519329080495235742406e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.953 y[1] (analytic) = -7.650228456643001566135170480345 y[1] (numeric) = -7.6502284566430015661351704803457 absolute error = 7e-31 relative error = 9.1500535437234139039108949527862e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.954 y[1] (analytic) = -7.64792623062309838214491764267 y[1] (numeric) = -7.647926230623098382144917642671 absolute error = 1.0e-30 relative error = 1.3075439927700860490022866619291e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.955 y[1] (analytic) = -7.645623866560433405301716726124 y[1] (numeric) = -7.6456238665604334053017167261246 absolute error = 6e-31 relative error = 7.8476264392787130068712230537602e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2304.1MB, alloc=4.6MB, time=154.01 x[1] = 4.956 y[1] (analytic) = -7.643321364456654758041410237311 y[1] (numeric) = -7.6433213644566547580414102373116 absolute error = 6e-31 relative error = 7.8499904869910248737168944476120e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.957 y[1] (analytic) = -7.641018724313409711243709093585 y[1] (numeric) = -7.6410187243134097112437090935849 absolute error = 1e-31 relative error = 1.3087260168831164032822926159266e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.958 y[1] (analytic) = -7.638715946132344684544130256991 y[1] (numeric) = -7.6387159461323446845441302569913 absolute error = 3e-31 relative error = 3.9273616418725036018528324057457e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.959 y[1] (analytic) = -7.636413029915105246645774393679 y[1] (numeric) = -7.6364130299151052466457743936792 absolute error = 2e-31 relative error = 2.6190306786250850503680818722117e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.96 y[1] (analytic) = -7.634109975663336115630943663337 y[1] (numeric) = -7.6341099756633361156309436633379 absolute error = 9e-31 relative error = 1.1789193538855169839430351294075e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.961 y[1] (analytic) = -7.631806783378681159272599743156 y[1] (numeric) = -7.6318067833786811592725997431563 absolute error = 3e-31 relative error = 3.9309171276894780559438634386473e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.962 y[1] (analytic) = -7.629503453062783395345662190705 y[1] (numeric) = -7.6295034530627833953456621907049 absolute error = 1e-31 relative error = 1.3107012876421998157627534495136e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.963 y[1] (analytic) = -7.627199984717284991938147250062 y[1] (numeric) = -7.6271999847172849919381472500621 absolute error = 1e-31 relative error = 1.3110971287021611818024073340168e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2307.9MB, alloc=4.6MB, time=154.39 x[1] = 4.964 y[1] (analytic) = -7.624896378343827267762147205423 y[1] (numeric) = -7.6248963783438272677621472054233 absolute error = 3e-31 relative error = 3.9344796980068833396241408236381e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.965 y[1] (analytic) = -7.622592633944050692464650386347 y[1] (numeric) = -7.6225926339440506924646503863473 absolute error = 3e-31 relative error = 3.9356687994065770698793030593861e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.966 y[1] (analytic) = -7.620288751519594886938201928713 y[1] (numeric) = -7.6202887515195948869382019287131 absolute error = 1e-31 relative error = 1.3122862303617899720850888434201e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.967 y[1] (analytic) = -7.617984731072098623631405395376 y[1] (numeric) = -7.6179847310720986236314053953766 absolute error = 6e-31 relative error = 7.8760987476481913836891267023224e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.968 y[1] (analytic) = -7.615680572603199826859265360433 y[1] (numeric) = -7.6156805726031998268592653604337 absolute error = 7e-31 relative error = 9.1915619796107765909240360922109e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.969 y[1] (analytic) = -7.613376276114535573113371060914 y[1] (numeric) = -7.6133762761145355731133710609146 absolute error = 6e-31 relative error = 7.8808662312196692574947996077697e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.97 y[1] (analytic) = -7.611071841607742091371921219651 y[1] (numeric) = -7.6110718416077420913719212196514 absolute error = 4e-31 relative error = 5.2555015682982318187362936402113e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.971 y[1] (analytic) = -7.608767269084454763409590142977 y[1] (numeric) = -7.6087672690844547634095901429775 absolute error = 5e-31 relative error = 6.5713667183851693096806067849647e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2311.7MB, alloc=4.6MB, time=154.77 x[1] = 4.972 y[1] (analytic) = -7.606462558546308124107235196837 y[1] (numeric) = -7.6064625585463081241072351968372 absolute error = 2e-31 relative error = 2.6293431205454135217976275950557e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.973 y[1] (analytic) = -7.604157709994935861761445764799 y[1] (numeric) = -7.604157709994935861761445764799 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.974 y[1] (analytic) = -7.601852723431970818393933791386 y[1] (numeric) = -7.6018527234319708183939337913864 absolute error = 4e-31 relative error = 5.2618751579735154363531163722392e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.975 y[1] (analytic) = -7.599547598859044990060766014055 y[1] (numeric) = -7.5995475988590449900607660140554 absolute error = 4e-31 relative error = 5.2634712105764537677714038857803e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.976 y[1] (analytic) = -7.597242336277789527161437987068 y[1] (numeric) = -7.5972423362777895271614379870683 absolute error = 3e-31 relative error = 3.9488012455185507944751315591928e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.977 y[1] (analytic) = -7.594936935689834734747790000429 y[1] (numeric) = -7.5949369356898347347477900004296 absolute error = 6e-31 relative error = 7.8999997640599639499510987291141e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.978 y[1] (analytic) = -7.592631397096810072832764996968 y[1] (numeric) = -7.5926313970968100728327649969684 absolute error = 4e-31 relative error = 5.2682657576785271152939626787725e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.979 y[1] (analytic) = -7.59032572050034415669900859057 y[1] (numeric) = -7.5903257205003441566990085905707 absolute error = 7e-31 relative error = 9.2222656283300703044584150448518e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2315.6MB, alloc=4.6MB, time=155.14 x[1] = 4.98 y[1] (analytic) = -7.588019905902064757207311288482 y[1] (numeric) = -7.5880199059020647572073112884821 absolute error = 1e-31 relative error = 1.3178668643478207569330990609364e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.981 y[1] (analytic) = -7.58571395330359880110489302052 y[1] (numeric) = -7.58571395330359880110489302052 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.982 y[1] (analytic) = -7.583407862706572371333530077954 y[1] (numeric) = -7.583407862706572371333530077954 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.983 y[1] (analytic) = -7.581101634112610707337524564729 y[1] (numeric) = -7.5811016341126107073375245647293 absolute error = 3e-31 relative error = 3.9572085229683884157707690952706e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.984 y[1] (analytic) = -7.578795267523338205371516463629 y[1] (numeric) = -7.5787952675233382053715164636292 absolute error = 2e-31 relative error = 2.6389418494657088760253517169106e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.985 y[1] (analytic) = -7.576488762940378418808138419889 y[1] (numeric) = -7.5764887629403784188081384198894 absolute error = 4e-31 relative error = 5.2794904409620347994935018758513e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.986 y[1] (analytic) = -7.574182120365354058445513344696 y[1] (numeric) = -7.5741821203653540584455133446964 absolute error = 4e-31 relative error = 5.2810982577839743465884729923305e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.987 y[1] (analytic) = -7.571875339799886992814594940921 y[1] (numeric) = -7.571875339799886992814594940921 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.988 y[1] (analytic) = -7.569568421245598248486351253356 y[1] (numeric) = -7.5695684212455982484863512533564 absolute error = 4e-31 relative error = 5.2843171200793325877332836702504e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 memory used=2319.4MB, alloc=4.6MB, time=155.51 TOP MAIN SOLVE Loop x[1] = 4.989 y[1] (analytic) = -7.56726136470410801037879134565 y[1] (numeric) = -7.5672613647041080103787913456501 absolute error = 1e-31 relative error = 1.3214820419237648402056376238232e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.99 y[1] (analytic) = -7.564954170177035622063835206036 y[1] (numeric) = -7.5649541701770356220638352060371 absolute error = 1.1e-30 relative error = 1.4540735809563506158119665154889e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.991 y[1] (analytic) = -7.562646837665999586074026983901 y[1] (numeric) = -7.5626468376659995860740269839011 absolute error = 1e-31 relative error = 1.3222883753072649912734334222287e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.992 y[1] (analytic) = -7.56033936717261756420909165911 y[1] (numeric) = -7.56033936717261756420909165911 absolute error = 0 relative error = 0 % Correct digits = 32 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.993 y[1] (analytic) = -7.55803175869850637784233524599 y[1] (numeric) = -7.558031758698506377842335245991 absolute error = 1.0e-30 relative error = 1.3230957899179297351989220836583e-29 % Correct digits = 30 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.994 y[1] (analytic) = -7.555724012245282008226888633729 y[1] (numeric) = -7.5557240122452820082268886337291 absolute error = 1e-31 relative error = 1.3234999033571594787647813964462e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.995 y[1] (analytic) = -7.553416127814559596801795164894 y[1] (numeric) = -7.5534161278145595968017951648945 absolute error = 5e-31 relative error = 6.6195214395617535775637188464217e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.996 y[1] (analytic) = -7.55110810540795344549794205372 y[1] (numeric) = -7.5511081054079534454979420537207 absolute error = 7e-31 relative error = 9.2701626069778278222858538050880e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop memory used=2323.2MB, alloc=4.6MB, time=155.88 x[1] = 4.997 y[1] (analytic) = -7.548799945027077017043835745677 y[1] (numeric) = -7.5487999450270770170438357456775 absolute error = 5e-31 relative error = 6.6235693572643291846598705409664e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.998 y[1] (analytic) = -7.5464916466735429352712213198 y[1] (numeric) = -7.5464916466735429352712213198007 absolute error = 7e-31 relative error = 9.2758334968615067462352271521158e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 TOP MAIN SOLVE Loop x[1] = 4.999 y[1] (analytic) = -7.544183210348962985420546035161 y[1] (numeric) = -7.5441832103489629854205460351617 absolute error = 7e-31 relative error = 9.2786717989530488865606321282705e-30 % Correct digits = 31 h = 0.001 NO POLE for equation 1 Finished! diff ( y , x , 1 ) = exp(sqrt(0.1 * x + 0.2)); Iterations = 5000 Total Elapsed Time = 2 Minutes 35 Seconds Elapsed Time(since restart) = 2 Minutes 35 Seconds Time to Timeout = 24 Seconds Percent Done = 100 % > quit memory used=2324.5MB, alloc=4.6MB, time=156.01