(%i1) batch(diffeq.max) read and interpret file: /home/dennis/mastersource/mine/omnisode/diffeq.max (%i2) load(stringproc) (%o2) /usr/local/share/maxima/5.26.0/share/contrib/stringproc/stringproc.mac (%i3) display_alot(iter) := if iter >= 0 then (ind_var : array_x , omniout_float(ALWAYS, 1 "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 : abs(numeric_val - analytic_val_y), omniout_float(ALWAYS, "y[1] (numeric) ", 33, numeric_val, abserr 100.0 20, " "), if abs(analytic_val_y) # 0.0 then relerr : ------------------- abs(analytic_val_y) else relerr : - 1.0, if glob_iter = 1 then array_1st_rel_error : relerr 1 else array_last_rel_error : relerr, omniout_float(ALWAYS, 1 "absolute error ", 4, abserr, 20, " "), omniout_float(ALWAYS, "relative error ", 4, relerr, 20, "%"), omniout_float(ALWAYS, "h ", 4, glob_h, 20, " ")) (%o3) display_alot(iter) := if iter >= 0 then (ind_var : array_x , omniout_float(ALWAYS, 1 "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 : abs(numeric_val - analytic_val_y), omniout_float(ALWAYS, "y[1] (numeric) ", 33, numeric_val, abserr 100.0 20, " "), if abs(analytic_val_y) # 0.0 then relerr : ------------------- abs(analytic_val_y) else relerr : - 1.0, if glob_iter = 1 then array_1st_rel_error : relerr 1 else array_last_rel_error : relerr, omniout_float(ALWAYS, 1 "absolute error ", 4, abserr, 20, " "), omniout_float(ALWAYS, "relative error ", 4, relerr, 20, "%"), omniout_float(ALWAYS, "h ", 4, glob_h, 20, " ")) (%i4) adjust_for_pole(h_param) := block(hnew : h_param, glob_normmax : glob_small_float, if !array_y_higher ! > glob_small_float ! 1, 1! then (tmp : !array_y_higher !, if tmp < glob_normmax ! 1, 1! then glob_normmax : tmp), if glob_look_poles and (!array_pole ! > glob_small_float) and (array_pole # glob_large_float) ! 1! 1 array_pole 1 then (sz2 : -----------, if sz2 < hnew 10.0 then (omniout_float(INFO, "glob_h adjusted to ", 20, h_param, 12, "due to singularity."), omniout_str(INFO, "Reached Optimal"), newline(), return(hnew))), 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 ), hnew : sz2) 1 (%o4) adjust_for_pole(h_param) := block(hnew : h_param, glob_normmax : glob_small_float, if !array_y_higher ! > glob_small_float ! 1, 1! then (tmp : !array_y_higher !, if tmp < glob_normmax ! 1, 1! then glob_normmax : tmp), if glob_look_poles and (!array_pole ! > glob_small_float) and (array_pole # glob_large_float) ! 1! 1 array_pole 1 then (sz2 : -----------, if sz2 < hnew 10.0 then (omniout_float(INFO, "glob_h adjusted to ", 20, h_param, 12, "due to singularity."), omniout_str(INFO, "Reached Optimal"), newline(), return(hnew))), 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 ), hnew : sz2) 1 (%i5) prog_report(x_start, x_end) := (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(clock_sec1) + convfloat(glob_orig_start_sec) + convfloat(glob_max_sec), expect_sec : comp_expect_sec(convfloat(x_end), convfloat(x_start), convfloat(glob_h) + convfloat(array_x ), 1 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(glob_h) + convfloat(array_x ), 1 convfloat(opt_clock_sec)), percent_done : comp_percent(convfloat(x_end), convfloat(x_start), convfloat(glob_h) + convfloat(array_x )), glob_percent_done : percent_done, 1 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, "Time to Timeout "), omniout_timestr(convfloat(left_sec)), omniout_float(INFO, "Percent Done ", 33, percent_done, 4, "%")) (%o5) prog_report(x_start, x_end) := (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(clock_sec1) + convfloat(glob_orig_start_sec) + convfloat(glob_max_sec), expect_sec : comp_expect_sec(convfloat(x_end), convfloat(x_start), convfloat(glob_h) + convfloat(array_x ), 1 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(glob_h) + convfloat(array_x ), 1 convfloat(opt_clock_sec)), percent_done : comp_percent(convfloat(x_end), convfloat(x_start), convfloat(glob_h) + convfloat(array_x )), glob_percent_done : percent_done, 1 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, "Time to Timeout "), omniout_timestr(convfloat(left_sec)), omniout_float(INFO, "Percent Done ", 33, percent_done, 4, "%")) (%i6) check_for_pole() := (n : glob_max_terms, m : - 1 - 1 + n, while (m >= 10) and ((!array_y_higher ! < glob_small_float) ! 1, m! or (!array_y_higher ! < glob_small_float) ! 1, m - 1! or (!array_y_higher ! < glob_small_float)) do m : m - 1, ! 1, m - 2! array_y_higher array_y_higher 1, m 1, m - 1 if m > 10 then (rm0 : ----------------------, rm1 : ----------------------, array_y_higher array_y_higher 1, m - 1 1, m - 2 hdrc : convfloat(m - 1) rm0 - convfloat(m - 2) rm1, glob_h if abs(hdrc) > glob_small_float then (rcs : ------, hdrc convfloat(m - 1) rm0 ord_no : 2.0 - convfloat(m) + --------------------, array_real_pole : rcs, hdrc 1, 1 array_real_pole : ord_no) else (array_real_pole : glob_large_float, 1, 2 1, 1 array_real_pole : glob_large_float)) 1, 2 else (array_real_pole : glob_large_float, 1, 1 array_real_pole : glob_large_float), n : - 1 - 1 + glob_max_terms, 1, 2 cnt : 0, while (cnt < 5) and (n >= 10) do (if !array_y_higher ! > ! 1, n! glob_small_float then cnt : 1 + cnt else cnt : 0, n : n - 1), m : cnt + n, if m <= 10 then (array_complex_pole : glob_large_float, 1, 1 array_complex_pole : glob_large_float) 1, 2 elseif (!array_y_higher ! >= glob_large_float) ! 1, m! or (!array_y_higher ! >= glob_large_float) ! 1, m - 1! or (!array_y_higher ! >= glob_large_float) ! 1, m - 2! or (!array_y_higher ! >= glob_large_float) ! 1, m - 3! or (!array_y_higher ! >= glob_large_float) ! 1, m - 4! or (!array_y_higher ! >= glob_large_float) ! 1, m - 5! then (array_complex_pole : glob_large_float, 1, 1 array_complex_pole : glob_large_float) 1, 2 array_y_higher array_y_higher 1, m 1, m - 1 else (rm0 : ----------------------, rm1 : ----------------------, array_y_higher array_y_higher 1, m - 1 1, m - 2 array_y_higher array_y_higher 1, m - 2 1, m - 3 rm2 : ----------------------, rm3 : ----------------------, array_y_higher array_y_higher 1, m - 3 1, m - 4 array_y_higher 1, m - 4 rm4 : ----------------------, nr1 : convfloat(m - 3) rm2 array_y_higher 1, m - 5 - 2.0 convfloat(m - 2) rm1 + convfloat(m - 1) rm0, nr2 : convfloat(m - 4) rm3 - 2.0 convfloat(m - 3) rm2 + convfloat(m - 2) rm1, - 1.0 2.0 - 1.0 - 1.0 2.0 - 1.0 5.0 8.0 3.0 dr1 : ----- + --- + -----, dr2 : ----- + --- + -----, ds1 : --- - --- + ---, rm3 rm2 rm1 rm4 rm3 rm2 rm3 rm2 rm1 5.0 8.0 3.0 ds2 : --- - --- + ---, if (abs(nr1 dr2 - nr2 dr1) <= glob_small_float) rm4 rm3 rm2 or (abs(dr1) <= glob_small_float) then (array_complex_pole : 1, 1 glob_large_float, array_complex_pole : glob_large_float) 1, 2 else (if abs(nr1 dr2 - nr2 dr1) > glob_small_float dr1 dr2 - ds2 dr1 + ds1 dr2 then (rcs : ---------------------------, nr1 dr2 - nr2 dr1 rcs nr1 - ds1 convfloat(m) ord_no : ------------- - ------------, 2.0 dr1 2.0 if abs(rcs) > glob_small_float then (if rcs > 0.0 then rad_c : sqrt(rcs) glob_h else rad_c : glob_large_float) else (rad_c : glob_large_float, ord_no : glob_large_float)) else (rad_c : glob_large_float, ord_no : glob_large_float)), array_complex_pole : rad_c, 1, 1 array_complex_pole : ord_no), found : false, 1, 2 if (not found) and ((array_real_pole = glob_large_float) 1, 1 or (array_real_pole = glob_large_float)) 1, 2 and ((array_complex_pole # glob_large_float) and (array_complex_pole # glob_large_float)) 1, 1 1, 2 and ((array_complex_pole > 0.0) and (array_complex_pole > 0.0)) 1, 1 1, 2 then (array_poles : array_complex_pole , 1, 1 1, 1 array_poles : array_complex_pole , found : true, array_type_pole : 2, 1, 2 1, 2 1 if glob_display_flag then omniout_str(ALWAYS, "Complex estimate of poles used")), if (not found) and ((array_real_pole # glob_large_float) and (array_real_pole # glob_large_float) 1, 1 1, 2 and (array_real_pole > 0.0) and (array_real_pole > 0.0) 1, 1 1, 2 and ((array_complex_pole = glob_large_float) or (array_complex_pole = glob_large_float) or (array_complex_pole <= 0.0) or (array_complex_pole <= 0.0))) 1, 1 1, 2 1, 1 1, 2 then (array_poles : array_real_pole , 1, 1 1, 1 array_poles : array_real_pole , found : true, array_type_pole : 1, 1, 2 1, 2 1 if glob_display_flag then omniout_str(ALWAYS, "Real estimate of pole used")), if (not found) and (((array_real_pole = glob_large_float) 1, 1 or (array_real_pole = glob_large_float)) 1, 2 and ((array_complex_pole = glob_large_float) or (array_complex_pole = glob_large_float))) 1, 1 1, 2 then (array_poles : glob_large_float, array_poles : glob_large_float, 1, 1 1, 2 found : true, array_type_pole : 3, if glob_display_flag 1 then omniout_str(ALWAYS, "NO POLE")), if (not found) and ((array_real_pole < array_complex_pole ) 1, 1 1, 1 and (array_real_pole > 0.0) and (array_real_pole > 1, 1 1, 2 0.0)) then (array_poles : array_real_pole , 1, 1 1, 1 array_poles : array_real_pole , found : true, array_type_pole : 1, 1, 2 1, 2 1 if glob_display_flag then omniout_str(ALWAYS, "Real estimate of pole used")), if (not found) and ((array_complex_pole # glob_large_float) 1, 1 and (array_complex_pole # glob_large_float) 1, 2 and (array_complex_pole > 0.0) and (array_complex_pole > 1, 1 1, 2 0.0)) then (array_poles : array_complex_pole , 1, 1 1, 1 array_poles : array_complex_pole , array_type_pole : 2, found : true, 1, 2 1, 2 1 if glob_display_flag then omniout_str(ALWAYS, "Complex estimate of poles used")), if not found then (array_poles : glob_large_float, array_poles : glob_large_float, 1, 1 1, 2 array_type_pole : 3, if glob_display_flag 1 then omniout_str(ALWAYS, "NO POLE")), array_pole : glob_large_float, 1 array_pole : glob_large_float, if array_pole > array_poles 2 1 1, 1 then (array_pole : array_poles , array_pole : array_poles ), 1 1, 1 2 1, 2 display_pole()) (%o6) check_for_pole() := (n : glob_max_terms, m : - 1 - 1 + n, while (m >= 10) and ((!array_y_higher ! < glob_small_float) ! 1, m! or (!array_y_higher ! < glob_small_float) ! 1, m - 1! or (!array_y_higher ! < glob_small_float)) do m : m - 1, ! 1, m - 2! array_y_higher array_y_higher 1, m 1, m - 1 if m > 10 then (rm0 : ----------------------, rm1 : ----------------------, array_y_higher array_y_higher 1, m - 1 1, m - 2 hdrc : convfloat(m - 1) rm0 - convfloat(m - 2) rm1, glob_h if abs(hdrc) > glob_small_float then (rcs : ------, hdrc convfloat(m - 1) rm0 ord_no : 2.0 - convfloat(m) + --------------------, array_real_pole : rcs, hdrc 1, 1 array_real_pole : ord_no) else (array_real_pole : glob_large_float, 1, 2 1, 1 array_real_pole : glob_large_float)) 1, 2 else (array_real_pole : glob_large_float, 1, 1 array_real_pole : glob_large_float), n : - 1 - 1 + glob_max_terms, 1, 2 cnt : 0, while (cnt < 5) and (n >= 10) do (if !array_y_higher ! > ! 1, n! glob_small_float then cnt : 1 + cnt else cnt : 0, n : n - 1), m : cnt + n, if m <= 10 then (array_complex_pole : glob_large_float, 1, 1 array_complex_pole : glob_large_float) 1, 2 elseif (!array_y_higher ! >= glob_large_float) ! 1, m! or (!array_y_higher ! >= glob_large_float) ! 1, m - 1! or (!array_y_higher ! >= glob_large_float) ! 1, m - 2! or (!array_y_higher ! >= glob_large_float) ! 1, m - 3! or (!array_y_higher ! >= glob_large_float) ! 1, m - 4! or (!array_y_higher ! >= glob_large_float) ! 1, m - 5! then (array_complex_pole : glob_large_float, 1, 1 array_complex_pole : glob_large_float) 1, 2 array_y_higher array_y_higher 1, m 1, m - 1 else (rm0 : ----------------------, rm1 : ----------------------, array_y_higher array_y_higher 1, m - 1 1, m - 2 array_y_higher array_y_higher 1, m - 2 1, m - 3 rm2 : ----------------------, rm3 : ----------------------, array_y_higher array_y_higher 1, m - 3 1, m - 4 array_y_higher 1, m - 4 rm4 : ----------------------, nr1 : convfloat(m - 3) rm2 array_y_higher 1, m - 5 - 2.0 convfloat(m - 2) rm1 + convfloat(m - 1) rm0, nr2 : convfloat(m - 4) rm3 - 2.0 convfloat(m - 3) rm2 + convfloat(m - 2) rm1, - 1.0 2.0 - 1.0 - 1.0 2.0 - 1.0 5.0 8.0 3.0 dr1 : ----- + --- + -----, dr2 : ----- + --- + -----, ds1 : --- - --- + ---, rm3 rm2 rm1 rm4 rm3 rm2 rm3 rm2 rm1 5.0 8.0 3.0 ds2 : --- - --- + ---, if (abs(nr1 dr2 - nr2 dr1) <= glob_small_float) rm4 rm3 rm2 or (abs(dr1) <= glob_small_float) then (array_complex_pole : 1, 1 glob_large_float, array_complex_pole : glob_large_float) 1, 2 else (if abs(nr1 dr2 - nr2 dr1) > glob_small_float dr1 dr2 - ds2 dr1 + ds1 dr2 then (rcs : ---------------------------, nr1 dr2 - nr2 dr1 rcs nr1 - ds1 convfloat(m) ord_no : ------------- - ------------, 2.0 dr1 2.0 if abs(rcs) > glob_small_float then (if rcs > 0.0 then rad_c : sqrt(rcs) glob_h else rad_c : glob_large_float) else (rad_c : glob_large_float, ord_no : glob_large_float)) else (rad_c : glob_large_float, ord_no : glob_large_float)), array_complex_pole : rad_c, 1, 1 array_complex_pole : ord_no), found : false, 1, 2 if (not found) and ((array_real_pole = glob_large_float) 1, 1 or (array_real_pole = glob_large_float)) 1, 2 and ((array_complex_pole # glob_large_float) and (array_complex_pole # glob_large_float)) 1, 1 1, 2 and ((array_complex_pole > 0.0) and (array_complex_pole > 0.0)) 1, 1 1, 2 then (array_poles : array_complex_pole , 1, 1 1, 1 array_poles : array_complex_pole , found : true, array_type_pole : 2, 1, 2 1, 2 1 if glob_display_flag then omniout_str(ALWAYS, "Complex estimate of poles used")), if (not found) and ((array_real_pole # glob_large_float) and (array_real_pole # glob_large_float) 1, 1 1, 2 and (array_real_pole > 0.0) and (array_real_pole > 0.0) 1, 1 1, 2 and ((array_complex_pole = glob_large_float) or (array_complex_pole = glob_large_float) or (array_complex_pole <= 0.0) or (array_complex_pole <= 0.0))) 1, 1 1, 2 1, 1 1, 2 then (array_poles : array_real_pole , 1, 1 1, 1 array_poles : array_real_pole , found : true, array_type_pole : 1, 1, 2 1, 2 1 if glob_display_flag then omniout_str(ALWAYS, "Real estimate of pole used")), if (not found) and (((array_real_pole = glob_large_float) 1, 1 or (array_real_pole = glob_large_float)) 1, 2 and ((array_complex_pole = glob_large_float) or (array_complex_pole = glob_large_float))) 1, 1 1, 2 then (array_poles : glob_large_float, array_poles : glob_large_float, 1, 1 1, 2 found : true, array_type_pole : 3, if glob_display_flag 1 then omniout_str(ALWAYS, "NO POLE")), if (not found) and ((array_real_pole < array_complex_pole ) 1, 1 1, 1 and (array_real_pole > 0.0) and (array_real_pole > 1, 1 1, 2 0.0)) then (array_poles : array_real_pole , 1, 1 1, 1 array_poles : array_real_pole , found : true, array_type_pole : 1, 1, 2 1, 2 1 if glob_display_flag then omniout_str(ALWAYS, "Real estimate of pole used")), if (not found) and ((array_complex_pole # glob_large_float) 1, 1 and (array_complex_pole # glob_large_float) 1, 2 and (array_complex_pole > 0.0) and (array_complex_pole > 1, 1 1, 2 0.0)) then (array_poles : array_complex_pole , 1, 1 1, 1 array_poles : array_complex_pole , array_type_pole : 2, found : true, 1, 2 1, 2 1 if glob_display_flag then omniout_str(ALWAYS, "Complex estimate of poles used")), if not found then (array_poles : glob_large_float, array_poles : glob_large_float, 1, 1 1, 2 array_type_pole : 3, if glob_display_flag 1 then omniout_str(ALWAYS, "NO POLE")), array_pole : glob_large_float, 1 array_pole : glob_large_float, if array_pole > array_poles 2 1 1, 1 then (array_pole : array_poles , array_pole : array_poles ), 1 1, 1 2 1, 2 display_pole()) (%i7) get_norms() := if not glob_initial_pass then (set_z(array_norms, 1 + glob_max_terms), iii : 1, while iii <= glob_max_terms do (if !array_y ! > array_norms ! iii! iii then array_norms : !array_y !, iii : 1 + iii)) iii ! iii! (%o7) get_norms() := if not glob_initial_pass then (set_z(array_norms, 1 + glob_max_terms), iii : 1, while iii <= glob_max_terms do (if !array_y ! > array_norms ! iii! iii then array_norms : !array_y !, iii : 1 + iii)) iii ! iii! (%i8) atomall() := (array_tmp1 : arccos(array_x ), 1 1 array_tmp1_a1 : sin(array_tmp1 ), array_tmp2 : 1 1 1 array_tmp1 + array_const_0D0 , if not array_y_set_initial 1 1 1, 2 then (if 1 <= glob_max_terms then (temporary : 1 array_tmp2 glob_h factorial_3(0, 1), array_y : temporary, 1 2 temporary 2.0 array_y_higher : temporary, temporary : -------------, 1, 2 glob_h array_y_higher : temporary)), kkk : 2, 2, 1 temp : att(1, array_tmp1_a1, array_tmp1, 2), - (temp + array_x ) 2 array_tmp1 : -------------------, array_tmp1_a1 : 2 array_tmp1_a1 2 1 att(1, array_x, array_tmp1, 1), array_tmp2 : array_tmp1 + array_const_0D0 , 2 2 2 if not array_y_set_initial then (if 2 <= glob_max_terms 1, 3 1 then (temporary : array_tmp2 glob_h factorial_3(1, 2), 2 array_y : temporary, array_y_higher : temporary, 3 1, 3 temporary 2.0 temporary : -------------, array_y_higher : temporary)), kkk : 3, glob_h 2, 2 temp : att(2, array_tmp1_a1, array_tmp1, 2), - (temp + array_x ) 3 array_tmp1 : -------------------, array_tmp1_a1 : 3 array_tmp1_a1 3 1 att(2, array_x, array_tmp1, 1), array_tmp2 : array_tmp1 + array_const_0D0 , 3 3 3 if not array_y_set_initial then (if 3 <= glob_max_terms 1, 4 1 then (temporary : array_tmp2 glob_h factorial_3(2, 3), 3 array_y : temporary, array_y_higher : temporary, 4 1, 4 temporary 2.0 temporary : -------------, array_y_higher : temporary)), kkk : 4, glob_h 2, 3 temp : att(3, array_tmp1_a1, array_tmp1, 2), - (temp + array_x ) 4 array_tmp1 : -------------------, array_tmp1_a1 : 4 array_tmp1_a1 4 1 att(3, array_x, array_tmp1, 1), array_tmp2 : array_tmp1 + array_const_0D0 , 4 4 4 if not array_y_set_initial then (if 4 <= glob_max_terms 1, 5 1 then (temporary : array_tmp2 glob_h factorial_3(3, 4), 4 array_y : temporary, array_y_higher : temporary, 5 1, 5 temporary 2.0 temporary : -------------, array_y_higher : temporary)), kkk : 5, glob_h 2, 4 temp : att(4, array_tmp1_a1, array_tmp1, 2), - (temp + array_x ) 5 array_tmp1 : -------------------, array_tmp1_a1 : 5 array_tmp1_a1 5 1 att(4, array_x, array_tmp1, 1), array_tmp2 : array_tmp1 + array_const_0D0 , 5 5 5 if not array_y_set_initial then (if 5 <= glob_max_terms 1, 6 1 then (temporary : array_tmp2 glob_h factorial_3(4, 5), 5 array_y : temporary, array_y_higher : temporary, 6 1, 6 temporary 2.0 temporary : -------------, array_y_higher : temporary)), kkk : 6, glob_h 2, 5 while kkk <= glob_max_terms do (temp : att(kkk - 1, array_tmp1_a1, array_tmp1, 2), - (temp + array_x ) kkk array_tmp1 : ---------------------, kkk array_tmp1_a1 1 array_tmp1_a1 : att(kkk - 1, array_x, array_tmp1, 1), kkk array_tmp2 : array_tmp1 + array_const_0D0 , order_d : 1, kkk kkk kkk if 1 + order_d + kkk <= glob_max_terms then (if not array_y_set_initial 1, order_d + kkk order_d array_tmp2 glob_h kkk then (temporary : -----------------------------------------, factorial_3(kkk - 1, - 1 + order_d + kkk) array_y : temporary, array_y_higher : temporary, order_d + kkk 1, order_d + kkk term : - 1 + order_d + kkk, adj2 : 2, while (adj2 <= 1 + order_d) temporary convfp(adj2) and (term >= 1) do (temporary : ----------------------, glob_h array_y_higher : temporary, adj2 : 1 + adj2, term : term - 1))), adj2, term kkk : 1 + kkk)) (%o8) atomall() := (array_tmp1 : arccos(array_x ), 1 1 array_tmp1_a1 : sin(array_tmp1 ), array_tmp2 : 1 1 1 array_tmp1 + array_const_0D0 , if not array_y_set_initial 1 1 1, 2 then (if 1 <= glob_max_terms then (temporary : 1 array_tmp2 glob_h factorial_3(0, 1), array_y : temporary, 1 2 temporary 2.0 array_y_higher : temporary, temporary : -------------, 1, 2 glob_h array_y_higher : temporary)), kkk : 2, 2, 1 temp : att(1, array_tmp1_a1, array_tmp1, 2), - (temp + array_x ) 2 array_tmp1 : -------------------, array_tmp1_a1 : 2 array_tmp1_a1 2 1 att(1, array_x, array_tmp1, 1), array_tmp2 : array_tmp1 + array_const_0D0 , 2 2 2 if not array_y_set_initial then (if 2 <= glob_max_terms 1, 3 1 then (temporary : array_tmp2 glob_h factorial_3(1, 2), 2 array_y : temporary, array_y_higher : temporary, 3 1, 3 temporary 2.0 temporary : -------------, array_y_higher : temporary)), kkk : 3, glob_h 2, 2 temp : att(2, array_tmp1_a1, array_tmp1, 2), - (temp + array_x ) 3 array_tmp1 : -------------------, array_tmp1_a1 : 3 array_tmp1_a1 3 1 att(2, array_x, array_tmp1, 1), array_tmp2 : array_tmp1 + array_const_0D0 , 3 3 3 if not array_y_set_initial then (if 3 <= glob_max_terms 1, 4 1 then (temporary : array_tmp2 glob_h factorial_3(2, 3), 3 array_y : temporary, array_y_higher : temporary, 4 1, 4 temporary 2.0 temporary : -------------, array_y_higher : temporary)), kkk : 4, glob_h 2, 3 temp : att(3, array_tmp1_a1, array_tmp1, 2), - (temp + array_x ) 4 array_tmp1 : -------------------, array_tmp1_a1 : 4 array_tmp1_a1 4 1 att(3, array_x, array_tmp1, 1), array_tmp2 : array_tmp1 + array_const_0D0 , 4 4 4 if not array_y_set_initial then (if 4 <= glob_max_terms 1, 5 1 then (temporary : array_tmp2 glob_h factorial_3(3, 4), 4 array_y : temporary, array_y_higher : temporary, 5 1, 5 temporary 2.0 temporary : -------------, array_y_higher : temporary)), kkk : 5, glob_h 2, 4 temp : att(4, array_tmp1_a1, array_tmp1, 2), - (temp + array_x ) 5 array_tmp1 : -------------------, array_tmp1_a1 : 5 array_tmp1_a1 5 1 att(4, array_x, array_tmp1, 1), array_tmp2 : array_tmp1 + array_const_0D0 , 5 5 5 if not array_y_set_initial then (if 5 <= glob_max_terms 1, 6 1 then (temporary : array_tmp2 glob_h factorial_3(4, 5), 5 array_y : temporary, array_y_higher : temporary, 6 1, 6 temporary 2.0 temporary : -------------, array_y_higher : temporary)), kkk : 6, glob_h 2, 5 while kkk <= glob_max_terms do (temp : att(kkk - 1, array_tmp1_a1, array_tmp1, 2), - (temp + array_x ) kkk array_tmp1 : ---------------------, kkk array_tmp1_a1 1 array_tmp1_a1 : att(kkk - 1, array_x, array_tmp1, 1), kkk array_tmp2 : array_tmp1 + array_const_0D0 , order_d : 1, kkk kkk kkk if 1 + order_d + kkk <= glob_max_terms then (if not array_y_set_initial 1, order_d + kkk order_d array_tmp2 glob_h kkk then (temporary : -----------------------------------------, factorial_3(kkk - 1, - 1 + order_d + kkk) array_y : temporary, array_y_higher : temporary, order_d + kkk 1, order_d + kkk term : - 1 + order_d + kkk, adj2 : 2, while (adj2 <= 1 + order_d) temporary convfp(adj2) and (term >= 1) do (temporary : ----------------------, glob_h array_y_higher : temporary, adj2 : 1 + adj2, term : term - 1))), adj2, term kkk : 1 + kkk)) log(x) (%i9) log10(x) := --------- log(10.0) log(x) (%o9) log10(x) := --------- log(10.0) (%i10) omniout_str(iolevel, str) := if glob_iolevel >= iolevel then printf(true, "~a~%", string(str)) (%o10) omniout_str(iolevel, str) := if glob_iolevel >= iolevel then printf(true, "~a~%", string(str)) (%i11) omniout_str_noeol(iolevel, str) := if glob_iolevel >= iolevel then printf(true, "~a", string(str)) (%o11) omniout_str_noeol(iolevel, str) := if glob_iolevel >= iolevel then printf(true, "~a", string(str)) (%i12) omniout_labstr(iolevel, label, str) := if glob_iolevel >= iolevel then printf(true, "~a = ~a~%", string(label), string(str)) (%o12) omniout_labstr(iolevel, label, str) := if glob_iolevel >= iolevel then printf(true, "~a = ~a~%", string(label), string(str)) (%i13) omniout_float(iolevel, prelabel, prelen, value, vallen, postlabel) := if glob_iolevel >= iolevel then (if vallen = 4 then printf(true, "~a = ~g ~s ~%", prelabel, value, postlabel) else printf(true, "~a = ~g ~s ~%", prelabel, value, postlabel)) (%o13) omniout_float(iolevel, prelabel, prelen, value, vallen, postlabel) := if glob_iolevel >= iolevel then (if vallen = 4 then printf(true, "~a = ~g ~s ~%", prelabel, value, postlabel) else printf(true, "~a = ~g ~s ~%", prelabel, value, postlabel)) (%i14) omniout_int(iolevel, prelabel, prelen, value, vallen, postlabel) := if glob_iolevel >= iolevel then (printf(true, "~a = ~d ~a~%", prelabel, value, postlabel), newline()) (%o14) omniout_int(iolevel, prelabel, prelen, value, vallen, postlabel) := if glob_iolevel >= iolevel then (printf(true, "~a = ~d ~a~%", prelabel, value, postlabel), newline()) (%i15) omniout_float_arr(iolevel, prelabel, elemnt, prelen, value, vallen, postlabel) := if glob_iolevel >= iolevel then (sprint(prelabel, "[", elemnt, "]=", value, postlabel), newline()) (%o15) omniout_float_arr(iolevel, prelabel, elemnt, prelen, value, vallen, postlabel) := if glob_iolevel >= iolevel then (sprint(prelabel, "[", elemnt, "]=", value, postlabel), newline()) (%i16) dump_series(iolevel, dump_label, series_name, array_series, numb) := if glob_iolevel >= iolevel then (i : 1, while i <= numb do (sprint(dump_label, series_name, "i = ", i, "series = ", array_series ), newline(), i : 1 + i)) i (%o16) dump_series(iolevel, dump_label, series_name, array_series, numb) := if glob_iolevel >= iolevel then (i : 1, while i <= numb do (sprint(dump_label, series_name, "i = ", i, "series = ", array_series ), newline(), i : 1 + i)) i (%i17) dump_series_2(iolevel, dump_label, series_name, array_series2, numb, subnum) := if glob_iolevel >= iolevel then (sub : 1, while sub <= subnum do (i : 1, while i <= num do (sprint(dump_label, series_name, "sub = ", sub, "i = ", i, "series2 = ", array_series2 ), i : 1 + i), sub : 1 + sub)) sub, i (%o17) dump_series_2(iolevel, dump_label, series_name, array_series2, numb, subnum) := if glob_iolevel >= iolevel then (sub : 1, while sub <= subnum do (i : 1, while i <= num do (sprint(dump_label, series_name, "sub = ", sub, "i = ", i, "series2 = ", array_series2 ), i : 1 + i), sub : 1 + sub)) sub, i (%i18) cs_info(iolevel, str) := if glob_iolevel >= iolevel then sprint(concat("cs_info ", str, " glob_correct_start_flag = ", glob_correct_start_flag, "glob_h := ", glob_h, "glob_reached_optimal_h := ", glob_reached_optimal_h)) (%o18) cs_info(iolevel, str) := if glob_iolevel >= iolevel then sprint(concat("cs_info ", str, " glob_correct_start_flag = ", glob_correct_start_flag, "glob_h := ", glob_h, "glob_reached_optimal_h := ", glob_reached_optimal_h)) (%i19) logitem_time(fd, secs_in) := (secs : secs_in, printf(fd, ""), if secs >= 0.0 then (sec_in_millinium : sec_in_min min_in_hour hours_in_day days_in_year years_in_century secs centuries_in_millinium, milliniums : ----------------, sec_in_millinium millinium_int : floor(milliniums), centuries : (milliniums - millinium_int) centuries_in_millinium, cent_int : floor(centuries), years : (centuries - cent_int) years_in_century, years_int : floor(years), days : (years - years_int) days_in_year, days_int : floor(days), hours : (days - days_int) hours_in_day, hours_int : floor(hours), minutes : (hours - hours_int) min_in_hour, minutes_int : floor(minutes), seconds : (minutes - minutes_int) sec_in_min, sec_int : floor(seconds), if millinium_int > 0 then printf(fd, "~d Millinia ~d\ Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", millinium_int, cent_int, years_int, days_int, hours_int, minutes_int, sec_int) elseif cent_int > 0 then printf(fd, "~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", cent_int, years_int, days_int, hours_int, minutes_int, sec_int) elseif years_int > 0 then printf(fd, "~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", years_int, days_int, hours_int, minutes_int, sec_int) elseif days_int > 0 then printf(fd, "~d Days ~d Hours ~d Minutes ~d Seconds", days_int, hours_int, minutes_int, sec_int) elseif hours_int > 0 then printf(fd, "~d Hours ~d Minutes ~d Seconds", hours_int, minutes_int, sec_int) elseif minutes_int > 0 then printf(fd, "~d Minutes ~d Seconds", minutes_int, sec_int) else printf(fd, "~d Seconds", sec_int)) else printf(fd, "Unknown"), printf(fd, "")) (%o19) logitem_time(fd, secs_in) := (secs : secs_in, printf(fd, ""), if secs >= 0.0 then (sec_in_millinium : sec_in_min min_in_hour hours_in_day days_in_year years_in_century secs centuries_in_millinium, milliniums : ----------------, sec_in_millinium millinium_int : floor(milliniums), centuries : (milliniums - millinium_int) centuries_in_millinium, cent_int : floor(centuries), years : (centuries - cent_int) years_in_century, years_int : floor(years), days : (years - years_int) days_in_year, days_int : floor(days), hours : (days - days_int) hours_in_day, hours_int : floor(hours), minutes : (hours - hours_int) min_in_hour, minutes_int : floor(minutes), seconds : (minutes - minutes_int) sec_in_min, sec_int : floor(seconds), if millinium_int > 0 then printf(fd, "~d Millinia ~d\ Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", millinium_int, cent_int, years_int, days_int, hours_int, minutes_int, sec_int) elseif cent_int > 0 then printf(fd, "~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", cent_int, years_int, days_int, hours_int, minutes_int, sec_int) elseif years_int > 0 then printf(fd, "~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", years_int, days_int, hours_int, minutes_int, sec_int) elseif days_int > 0 then printf(fd, "~d Days ~d Hours ~d Minutes ~d Seconds", days_int, hours_int, minutes_int, sec_int) elseif hours_int > 0 then printf(fd, "~d Hours ~d Minutes ~d Seconds", hours_int, minutes_int, sec_int) elseif minutes_int > 0 then printf(fd, "~d Minutes ~d Seconds", minutes_int, sec_int) else printf(fd, "~d Seconds", sec_int)) else printf(fd, "Unknown"), printf(fd, "")) (%i20) omniout_timestr(secs_in) := (secs : convfloat(secs_in), if secs >= convfloat(0.0) then (sec_in_millinium : convfloat(sec_in_min) convfloat(min_in_hour) convfloat(hours_in_day) convfloat(days_in_year) convfloat(years_in_century) secs convfloat(centuries_in_millinium), milliniums : ---------------------------, convfloat(sec_in_millinium) millinium_int : floor(milliniums), centuries : (milliniums - millinium_int) convfloat(centuries_in_millinium), cent_int : floor(centuries), years : (centuries - cent_int) convfloat(years_in_century), years_int : floor(years), days : (years - years_int) convfloat(days_in_year), days_int : floor(days), hours : (days - days_int) convfloat(hours_in_day), hours_int : floor(hours), minutes : (hours - hours_int) convfloat(min_in_hour), minutes_int : floor(minutes), seconds : (minutes - minutes_int) convfloat(sec_in_min), sec_int : floor(seconds), if millinium_int > 0 then printf(true, "= ~d Millinia ~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%", millinium_int, cent_int, years_int, days_int, hours_int, minutes_int, sec_int) elseif cent_int > 0 then printf(true, "= ~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%", cent_int, years_int, days_int, hours_int, minutes_int, sec_int) elseif years_int > 0 then printf(true, "= ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%", years_int, days_int, hours_int, minutes_int, sec_int) elseif days_int > 0 then printf(true, "= ~d Days ~d Hours ~d Minutes ~d Seconds~%", days_int, hours_int, minutes_int, sec_int) elseif hours_int > 0 then printf(true, "= ~d Hours ~d Minutes ~d Seconds~%", hours_int, minutes_int, sec_int) elseif minutes_int > 0 then printf(true, "= ~d Minutes ~d Seconds~%", minutes_int, sec_int) else printf(true, "= ~d Seconds~%", sec_int)) else printf(true, " Unknown~%")) (%o20) omniout_timestr(secs_in) := (secs : convfloat(secs_in), if secs >= convfloat(0.0) then (sec_in_millinium : convfloat(sec_in_min) convfloat(min_in_hour) convfloat(hours_in_day) convfloat(days_in_year) convfloat(years_in_century) secs convfloat(centuries_in_millinium), milliniums : ---------------------------, convfloat(sec_in_millinium) millinium_int : floor(milliniums), centuries : (milliniums - millinium_int) convfloat(centuries_in_millinium), cent_int : floor(centuries), years : (centuries - cent_int) convfloat(years_in_century), years_int : floor(years), days : (years - years_int) convfloat(days_in_year), days_int : floor(days), hours : (days - days_int) convfloat(hours_in_day), hours_int : floor(hours), minutes : (hours - hours_int) convfloat(min_in_hour), minutes_int : floor(minutes), seconds : (minutes - minutes_int) convfloat(sec_in_min), sec_int : floor(seconds), if millinium_int > 0 then printf(true, "= ~d Millinia ~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%", millinium_int, cent_int, years_int, days_int, hours_int, minutes_int, sec_int) elseif cent_int > 0 then printf(true, "= ~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%", cent_int, years_int, days_int, hours_int, minutes_int, sec_int) elseif years_int > 0 then printf(true, "= ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%", years_int, days_int, hours_int, minutes_int, sec_int) elseif days_int > 0 then printf(true, "= ~d Days ~d Hours ~d Minutes ~d Seconds~%", days_int, hours_int, minutes_int, sec_int) elseif hours_int > 0 then printf(true, "= ~d Hours ~d Minutes ~d Seconds~%", hours_int, minutes_int, sec_int) elseif minutes_int > 0 then printf(true, "= ~d Minutes ~d Seconds~%", minutes_int, sec_int) else printf(true, "= ~d Seconds~%", sec_int)) else printf(true, " Unknown~%")) (%i21) mode_declare(ats, bfloat) modedeclare: bfloat is not a built-in type; assuming it is a Maxima extension type. (%o21) [ats] (%i22) ats(mmm_ats, array_a, array_b, jjj_ats) := (ret_ats : 0.0, if jjj_ats <= mmm_ats then (ma_ats : 1 + mmm_ats, iii_ats : jjj_ats, while iii_ats <= mmm_ats do (lll_ats : ma_ats - iii_ats, ret_ats : array_a array_b + ret_ats, iii_ats : 1 + iii_ats)), iii_ats lll_ats ret_ats) (%o22) ats(mmm_ats, array_a, array_b, jjj_ats) := (ret_ats : 0.0, if jjj_ats <= mmm_ats then (ma_ats : 1 + mmm_ats, iii_ats : jjj_ats, while iii_ats <= mmm_ats do (lll_ats : ma_ats - iii_ats, ret_ats : array_a array_b + ret_ats, iii_ats : 1 + iii_ats)), iii_ats lll_ats ret_ats) (%i23) mode_declare(att, bfloat) modedeclare: bfloat is not a built-in type; assuming it is a Maxima extension type. (%o23) [att] (%i24) att(mmm_att, array_aa, array_bb, jjj_att) := (ret_att : 0.0, if jjj_att <= mmm_att then (ma_att : 2 + mmm_att, 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 : array_aa array_bb convfp(al_att) + ret_att, iii_att lll_att ret_att iii_att : 1 + iii_att), ret_att : ---------------), ret_att) convfp(mmm_att) (%o24) att(mmm_att, array_aa, array_bb, jjj_att) := (ret_att : 0.0, if jjj_att <= mmm_att then (ma_att : 2 + mmm_att, 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 : array_aa array_bb convfp(al_att) + ret_att, iii_att lll_att ret_att iii_att : 1 + iii_att), ret_att : ---------------), ret_att) convfp(mmm_att) (%i25) display_pole() := if (array_pole # glob_large_float) 1 and (array_pole > 0.0) and (array_pole # glob_large_float) 1 2 and (array_pole > 0.0) and glob_display_flag 2 then (omniout_float(ALWAYS, "Radius of convergence ", 4, array_pole , 4, " "), omniout_float(ALWAYS, 1 "Order of pole ", 4, array_pole , 4, " ")) 2 (%o25) display_pole() := if (array_pole # glob_large_float) 1 and (array_pole > 0.0) and (array_pole # glob_large_float) 1 2 and (array_pole > 0.0) and glob_display_flag 2 then (omniout_float(ALWAYS, "Radius of convergence ", 4, array_pole , 4, " "), omniout_float(ALWAYS, 1 "Order of pole ", 4, array_pole , 4, " ")) 2 (%i26) logditto(file) := (printf(file, ""), printf(file, "ditto"), printf(file, "")) (%o26) logditto(file) := (printf(file, ""), printf(file, "ditto"), printf(file, "")) (%i27) logitem_integer(file, n) := (printf(file, ""), printf(file, "~d", n), printf(file, "")) (%o27) logitem_integer(file, n) := (printf(file, ""), printf(file, "~d", n), printf(file, "")) (%i28) logitem_str(file, str) := (printf(file, ""), printf(file, str), printf(file, "")) (%o28) logitem_str(file, str) := (printf(file, ""), printf(file, str), printf(file, "")) (%i29) log_revs(file, revs) := printf(file, revs) (%o29) log_revs(file, revs) := printf(file, revs) (%i30) logitem_float(file, x) := (printf(file, ""), printf(file, "~g", x), printf(file, "")) (%o30) logitem_float(file, x) := (printf(file, ""), printf(file, "~g", x), printf(file, "")) (%i31) logitem_pole(file, pole) := (printf(file, ""), if pole = 0 then printf(file, "NA") elseif pole = 1 then printf(file, "Real") elseif pole = 2 then printf(file, "Complex") else printf(file, "No Pole"), printf(file, "")) (%o31) logitem_pole(file, pole) := (printf(file, ""), if pole = 0 then printf(file, "NA") elseif pole = 1 then printf(file, "Real") elseif pole = 2 then printf(file, "Complex") else printf(file, "No Pole"), printf(file, "")) (%i32) logstart(file) := printf(file, "") (%o32) logstart(file) := printf(file, "") (%i33) logend(file) := printf(file, "~%") (%o33) logend(file) := printf(file, "~%") (%i34) chk_data() := (errflag : false, if (glob_max_terms < 15) or (glob_max_terms > 512) then (omniout_str(ALWAYS, "Illegal max_terms = -- Using 30"), glob_max_terms : 30), if glob_max_iter < 2 then (omniout_str(ALWAYS, "Illegal max_iter"), errflag : true), if errflag then quit()) (%o34) chk_data() := (errflag : false, if (glob_max_terms < 15) or (glob_max_terms > 512) then (omniout_str(ALWAYS, "Illegal max_terms = -- Using 30"), glob_max_terms : 30), if glob_max_iter < 2 then (omniout_str(ALWAYS, "Illegal max_iter"), errflag : true), if errflag then quit()) (%i35) mode_declare(comp_expect_sec, bfloat) modedeclare: bfloat is not a built-in type; assuming it is a Maxima extension type. (%o35) [comp_expect_sec] (%i36) comp_expect_sec(t_end2, t_start2, t2, clock_sec) := (ms2 : clock_sec, sub1 : t_end2 - t_start2, sub2 : t2 - t_start2, if sub1 = 0.0 then sec_left : 0.0 else (if abs(sub2) > 0.0 sub1 then (rrr : ----, sec_left : rrr ms2 - ms2) else sec_left : 0.0), sec_left) sub2 (%o36) comp_expect_sec(t_end2, t_start2, t2, clock_sec) := (ms2 : clock_sec, sub1 : t_end2 - t_start2, sub2 : t2 - t_start2, if sub1 = 0.0 then sec_left : 0.0 else (if abs(sub2) > 0.0 sub1 then (rrr : ----, sec_left : rrr ms2 - ms2) else sec_left : 0.0), sec_left) sub2 (%i37) mode_declare(comp_percent, bfloat) modedeclare: bfloat is not a built-in type; assuming it is a Maxima extension type. (%o37) [comp_percent] (%i38) comp_percent(t_end2, t_start2, t2) := (sub1 : t_end2 - t_start2, sub2 : t2 - t_start2, 100.0 sub2 if abs(sub2) > glob_small_float then rrr : ---------- else rrr : 0.0, rrr) sub1 (%o38) comp_percent(t_end2, t_start2, t2) := (sub1 : t_end2 - t_start2, sub2 : t2 - t_start2, 100.0 sub2 if abs(sub2) > glob_small_float then rrr : ---------- else rrr : 0.0, rrr) sub1 (%i39) factorial_1(nnn) := (if nnn <= glob_max_terms then (if array_fact_1 = 0 then (ret : nnn!, array_fact_1 : ret) nnn nnn else ret : array_fact_1 ) else ret : nnn!, ret) nnn (%o39) factorial_1(nnn) := (if nnn <= glob_max_terms then (if array_fact_1 = 0 then (ret : nnn!, array_fact_1 : ret) nnn nnn else ret : array_fact_1 ) else ret : nnn!, ret) nnn (%i40) factorial_3(mmm, nnn) := (if (nnn <= glob_max_terms) and (mmm <= glob_max_terms) then (if array_fact_2 = 0 mmm, nnn factorial_1(mmm) then (ret : ----------------, array_fact_2 : ret) factorial_1(nnn) mmm, nnn mmm! else ret : array_fact_2 ) else ret : ----, ret) mmm, nnn nnn! (%o40) factorial_3(mmm, nnn) := (if (nnn <= glob_max_terms) and (mmm <= glob_max_terms) then (if array_fact_2 = 0 mmm, nnn factorial_1(mmm) then (ret : ----------------, array_fact_2 : ret) factorial_1(nnn) mmm, nnn mmm! else ret : array_fact_2 ) else ret : ----, ret) mmm, nnn nnn! (%i41) convfp(mmm) := mmm (%o41) convfp(mmm) := mmm (%i42) convfloat(mmm) := mmm (%o42) convfloat(mmm) := mmm (%i43) elapsed_time_seconds() := (t : elapsed_real_time(), t) (%o43) elapsed_time_seconds() := (t : elapsed_real_time(), t) (%i44) arcsin(x) := asin(x) (%o44) arcsin(x) := asin(x) (%i45) arccos(x) := acos(x) (%o45) arccos(x) := acos(x) (%i46) arctan(x) := atan(x) (%o46) arctan(x) := atan(x) (%i47) exact_soln_y(x) := - sqrt(1.0 - x x) + x arccos(x) + 2.0 (%o47) exact_soln_y(x) := - sqrt(1.0 - x x) + x arccos(x) + 2.0 (%i48) mainprog() := (define_variable(INFO, 2, fixnum), define_variable(glob_iolevel, 5, fixnum), define_variable(DEBUGMASSIVE, 4, fixnum), define_variable(DEBUGL, 3, fixnum), define_variable(ALWAYS, 1, fixnum), define_variable(glob_max_terms, 30, fixnum), define_variable(glob_max_minutes, 0.0, float), define_variable(glob_log10relerr, 0.0, float), define_variable(glob_log10abserr, 0.0, float), define_variable(glob_optimal_clock_start_sec, 0.0, float), define_variable(glob_relerr, 1.0E-11, float), define_variable(glob_abserr, 1.0E-11, float), define_variable(glob_large_float, 9.0E+100, float), define_variable(glob_clock_start_sec, 0.0, float), define_variable(glob_hmin, 1.0E-11, float), define_variable(days_in_year, 365.0, float), define_variable(glob_percent_done, 0.0, float), define_variable(glob_max_iter, 1000, fixnum), define_variable(glob_disp_incr, 0.1, float), define_variable(glob_not_yet_finished, true, boolean), define_variable(glob_almost_1, 0.999, float), define_variable(glob_dump, false, boolean), define_variable(glob_subiter_method, 3, fixnum), define_variable(glob_max_trunc_err, 1.0E-11, float), define_variable(glob_log10normmin, 0.1, float), define_variable(MAX_UNCHANGED, 10, fixnum), define_variable(glob_current_iter, 0, fixnum), define_variable(glob_max_sec, 10000.0, float), define_variable(glob_log10_relerr, 1.0E-11, float), define_variable(glob_dump_analytic, false, boolean), define_variable(glob_h, 0.1, float), define_variable(years_in_century, 100.0, float), define_variable(hours_in_day, 24.0, float), define_variable(glob_orig_start_sec, 0.0, float), define_variable(glob_small_float, 1.0E-51, float), define_variable(glob_hmin_init, 0.001, float), define_variable(glob_hmax, 1.0, float), define_variable(glob_optimal_done, false, boolean), define_variable(glob_not_yet_start_msg, true, boolean), define_variable(glob_clock_sec, 0.0, float), define_variable(min_in_hour, 60.0, float), define_variable(sec_in_min, 60.0, float), define_variable(glob_smallish_float, 1.0E-101, float), define_variable(glob_max_rel_trunc_err, 1.0E-11, float), define_variable(glob_log10_abserr, 1.0E-11, float), define_variable(glob_reached_optimal_h, false, boolean), define_variable(djd_debug, true, boolean), define_variable(glob_max_opt_iter, 10, fixnum), define_variable(glob_iter, 0, fixnum), define_variable(glob_warned, false, boolean), define_variable(glob_optimal_start, 0.0, float), define_variable(centuries_in_millinium, 10.0, float), define_variable(glob_start, 0, fixnum), define_variable(glob_unchanged_h_cnt, 0, fixnum), define_variable(glob_no_eqs, 0, fixnum), define_variable(glob_initial_pass, true, boolean), define_variable(glob_html_log, true, boolean), define_variable(glob_normmax, 0.0, float), define_variable(djd_debug2, true, boolean), define_variable(glob_curr_iter_when_opt, 0, fixnum), define_variable(glob_warned2, false, boolean), define_variable(glob_max_hours, 0.0, float), define_variable(glob_look_poles, false, boolean), define_variable(glob_last_good_h, 0.1, float), define_variable(glob_display_flag, true, boolean), define_variable(glob_optimal_expect_sec, 0.1, float), ALWAYS : 1, INFO : 2, DEBUGL : 3, DEBUGMASSIVE : 4, glob_iolevel : INFO, 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/arccospostode.ode#################"), omniout_str(ALWAYS, "diff ( y , x , 1 ) = arccos ( x ) ;"), omniout_str(ALWAYS, "!"), omniout_str(ALWAYS, "/* BEGIN FIRST INPUT BLOCK */"), omniout_str(ALWAYS, "max_terms : 30,"), omniout_str(ALWAYS, "Digits : 32,"), omniout_str(ALWAYS, "!"), omniout_str(ALWAYS, "/* END FIRST INPUT BLOCK */"), omniout_str(ALWAYS, "/* BEGIN SECOND INPUT BLOCK */"), omniout_str(ALWAYS, "x_start : -0.8,"), omniout_str(ALWAYS, "x_end : 0.8 ,"), omniout_str(ALWAYS, "array_y_init[0 + 1] : exact_soln_y(x_start),"), omniout_str(ALWAYS, "glob_h : 0.00001 ,"), omniout_str(ALWAYS, "glob_look_poles : true,"), omniout_str(ALWAYS, "glob_max_iter : 100,"), omniout_str(ALWAYS, "/* END SECOND INPUT BLOCK */"), omniout_str(ALWAYS, "/* BEGIN OVERRIDE BLOCK */"), omniout_str(ALWAYS, "glob_h : 0.001 ,"), omniout_str(ALWAYS, "glob_look_poles : true,"), omniout_str(ALWAYS, "glob_max_iter : 1000,"), omniout_str(ALWAYS, "glob_max_minutes : 15,"), omniout_str(ALWAYS, "/* END OVERRIDE BLOCK */"), omniout_str(ALWAYS, "!"), omniout_str(ALWAYS, "/* BEGIN USER DEF BLOCK */"), omniout_str(ALWAYS, "exact_soln_y (x) := ("), omniout_str(ALWAYS, "2.0 + x * arccos(x) - sqrt(1.0-x*x)"), omniout_str(ALWAYS, ");"), omniout_str(ALWAYS, ""), 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 : 1.0E+100, glob_almost_1 : 0.99, glob_log10_abserr : - 8.0, glob_log10_relerr : - 8.0, glob_hmax : 0.01, max_terms : 30, Digits : 32, glob_max_terms : max_terms, glob_html_log : true, array(array_tmp0, 1 + max_terms), array(array_tmp1_a1, 1 + max_terms), array(array_tmp1, 1 + max_terms), array(array_tmp2, 1 + max_terms), array(array_pole, 1 + max_terms), array(array_fact_1, 1 + max_terms), array(array_y_init, 1 + max_terms), array(array_y, 1 + max_terms), array(array_x, 1 + max_terms), array(array_type_pole, 1 + max_terms), array(array_1st_rel_error, 1 + max_terms), array(array_m1, 1 + max_terms), array(array_norms, 1 + max_terms), array(array_last_rel_error, 1 + max_terms), array(array_poles, 1 + 1, 1 + 3), array(array_y_higher_work2, 1 + 2, 1 + max_terms), array(array_fact_2, 1 + max_terms, 1 + max_terms), array(array_y_higher, 1 + 2, 1 + max_terms), array(array_y_set_initial, 1 + 2, 1 + max_terms), array(array_real_pole, 1 + 1, 1 + 3), array(array_complex_pole, 1 + 1, 1 + 3), array(array_y_higher_work, 1 + 2, 1 + max_terms), term : 1, while term <= max_terms do (array_tmp0 : 0.0, term : 1 + term), term : 1, term while term <= max_terms do (array_tmp1_a1 : 0.0, term : 1 + term), term term : 1, while term <= max_terms do (array_tmp1 : 0.0, term : 1 + term), term term : 1, while term <= max_terms do (array_tmp2 : 0.0, term : 1 + term), term term : 1, while term <= max_terms do (array_pole : 0.0, term : 1 + term), term term : 1, while term <= max_terms do (array_fact_1 : 0.0, term term : 1 + term), term : 1, while term <= max_terms do (array_y_init : 0.0, term : 1 + term), term : 1, term while term <= max_terms do (array_y : 0.0, term : 1 + term), term : 1, term while term <= max_terms do (array_x : 0.0, term : 1 + term), term : 1, term while term <= max_terms do (array_type_pole : 0.0, term : 1 + term), term term : 1, while term <= max_terms do (array_1st_rel_error : 0.0, term term : 1 + term), term : 1, while term <= max_terms do (array_m1 : 0.0, term term : 1 + term), term : 1, while term <= max_terms do (array_norms : 0.0, term : 1 + term), term : 1, term while term <= max_terms do (array_last_rel_error : 0.0, term : 1 + term), term ord : 1, while ord <= 1 do (term : 1, while term <= 3 do (array_poles : 0.0, term : 1 + term), ord, term ord : 1 + ord), ord : 1, while ord <= 2 do (term : 1, while term <= max_terms do (array_y_higher_work2 : 0.0, ord, term term : 1 + term), ord : 1 + ord), ord : 1, while ord <= max_terms do (term : 1, while term <= max_terms do (array_fact_2 : 0.0, term : 1 + term), ord : 1 + ord), ord, term ord : 1, while ord <= 2 do (term : 1, while term <= max_terms do (array_y_higher : 0.0, term : 1 + term), ord, term ord : 1 + ord), ord : 1, while ord <= 2 do (term : 1, while term <= max_terms do (array_y_set_initial : 0.0, ord, term term : 1 + term), ord : 1 + ord), ord : 1, while ord <= 1 do (term : 1, while term <= 3 do (array_real_pole : 0.0, term : 1 + term), ord : 1 + ord), ord, term ord : 1, while ord <= 1 do (term : 1, while term <= 3 do (array_complex_pole : 0.0, term : 1 + term), ord, term ord : 1 + ord), ord : 1, while ord <= 2 do (term : 1, while term <= max_terms do (array_y_higher_work : 0.0, ord, term term : 1 + term), ord : 1 + ord), array(array_tmp2, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_tmp2 : 0.0, term term : 1 + term), array(array_tmp1, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_tmp1 : 0.0, term : 1 + term), term array(array_tmp1_a1, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_tmp1_a1 : 0.0, term : 1 + term), term array(array_tmp0, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_tmp0 : 0.0, term : 1 + term), term array(array_x, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_x : 0.0, term : 1 + term), term array(array_y, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_y : 0.0, term : 1 + term), term array(array_const_0D0, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_const_0D0 : 0.0, term : 1 + term), term array_const_0D0 : 0.0, array(array_const_1, 1 + 1 + max_terms), term : 1, 1 while term <= 1 + max_terms do (array_const_1 : 0.0, term : 1 + term), term array_const_1 : 1, array(array_m1, 1 + 1 + max_terms), term : 1, 1 while term <= max_terms do (array_m1 : 0.0, term : 1 + term), term array_m1 : - 1.0, iiif : 0, while iiif <= glob_max_terms do (jjjf : 0, 1 while jjjf <= glob_max_terms do (array_fact_1 : 0, iiif array_fact_2 : 0, jjjf : 1 + jjjf), iiif : 1 + iiif), iiif, jjjf x_start : - 0.8, x_end : 0.8, array_y_init : exact_soln_y(x_start), 1 + 0 glob_h : 1.0E-5, glob_look_poles : true, glob_max_iter : 100, glob_h : 0.001, glob_look_poles : true, glob_max_iter : 1000, glob_max_minutes : 15, glob_last_good_h : glob_h, glob_max_terms : max_terms, glob_max_sec : convfloat(3600.0) convfloat(glob_max_hours) + convfloat(60.0) convfloat(glob_max_minutes), glob_log10_abserr glob_log10_relerr glob_abserr : 10.0 , glob_relerr : 10.0 , chk_data(), array_y_set_initial : true, array_y_set_initial : false, 1, 1 1, 2 array_y_set_initial : false, array_y_set_initial : false, 1, 3 1, 4 array_y_set_initial : false, array_y_set_initial : false, 1, 5 1, 6 array_y_set_initial : false, array_y_set_initial : false, 1, 7 1, 8 array_y_set_initial : false, array_y_set_initial : false, 1, 9 1, 10 array_y_set_initial : false, array_y_set_initial : false, 1, 11 1, 12 array_y_set_initial : false, array_y_set_initial : false, 1, 13 1, 14 array_y_set_initial : false, array_y_set_initial : false, 1, 15 1, 16 array_y_set_initial : false, array_y_set_initial : false, 1, 17 1, 18 array_y_set_initial : false, array_y_set_initial : false, 1, 19 1, 20 array_y_set_initial : false, array_y_set_initial : false, 1, 21 1, 22 array_y_set_initial : false, array_y_set_initial : false, 1, 23 1, 24 array_y_set_initial : false, array_y_set_initial : false, 1, 25 1, 26 array_y_set_initial : false, array_y_set_initial : false, 1, 27 1, 28 array_y_set_initial : false, array_y_set_initial : false, 1, 29 1, 30 if glob_html_log then html_log_file : openw("html/entry.html"), omniout_str(ALWAYS, "START of Soultion"), array_x : x_start, 1 array_x : glob_h, order_diff : 1, term_no : 1, 2 while term_no <= order_diff do (array_y : term_no term_no - 1 array_y_init glob_h term_no -------------------------------------, term_no : 1 + term_no), factorial_1(term_no - 1) rows : order_diff, r_order : 1, while r_order <= rows do (term_no : 1, while term_no <= 1 - r_order + rows do (it : - 1 + r_order + term_no, term_no - 1 array_y_init glob_h it array_y_higher : --------------------------------, r_order, term_no factorial_1(term_no - 1) term_no : 1 + term_no), r_order : 1 + r_order), current_iter : 1, glob_clock_start_sec : elapsed_time_seconds(), start_array_y(), if !array_y_higher ! > glob_small_float ! 1, 1! then (tmp : !array_y_higher !, log10norm : log10(tmp), ! 1, 1! if log10norm < glob_log10normmin then glob_log10normmin : log10norm), display_alot(current_iter), glob_clock_sec : elapsed_time_seconds(), glob_current_iter : 0, glob_iter : 0, omniout_str(DEBUGL, " "), glob_reached_optimal_h : true, glob_optimal_clock_start_sec : elapsed_time_seconds(), while (glob_current_iter < glob_max_iter) and (array_x <= x_end) and (convfloat(glob_clock_sec) - convfloat(glob_orig_start_sec) < 1 convfloat(glob_max_sec)) do (omniout_str (INFO, " "), omniout_str(INFO, "TOP MAIN SOLVE Loop"), glob_iter : 1 + glob_iter, glob_clock_sec : elapsed_time_seconds(), glob_current_iter : 1 + glob_current_iter, atomall(), if glob_look_poles then check_for_pole(), array_x : glob_h + array_x , 1 1 array_x : glob_h, order_diff : 1, ord : 2, calc_term : 1, 2 iii : glob_max_terms, while iii >= calc_term do (array_y_higher_work : 2, iii array_y_higher 2, iii -------------------- calc_term - 1 glob_h -------------------------------------, iii : iii - 1), temp_sum : 0.0, factorial_3(iii - calc_term, iii - 1) ord : 2, calc_term : 1, iii : glob_max_terms, while iii >= calc_term do (temp_sum : array_y_higher_work + temp_sum, ord, iii iii : iii - 1), array_y_higher_work2 : ord, calc_term calc_term - 1 temp_sum glob_h ----------------------------, ord : 1, calc_term : 2, iii : glob_max_terms, factorial_1(calc_term - 1)! while iii >= calc_term do (array_y_higher_work : 1, iii array_y_higher 1, iii -------------------- calc_term - 1 glob_h -------------------------------------, iii : iii - 1), temp_sum : 0.0, factorial_3(iii - calc_term, iii - 1) ord : 1, calc_term : 2, iii : glob_max_terms, while iii >= calc_term do (temp_sum : array_y_higher_work + temp_sum, ord, iii iii : iii - 1), array_y_higher_work2 : ord, calc_term calc_term - 1 temp_sum glob_h ----------------------------, ord : 1, calc_term : 1, iii : glob_max_terms, factorial_1(calc_term - 1)! while iii >= calc_term do (array_y_higher_work : 1, iii array_y_higher 1, iii -------------------- calc_term - 1 glob_h -------------------------------------, iii : iii - 1), temp_sum : 0.0, factorial_3(iii - calc_term, iii - 1) ord : 1, calc_term : 1, iii : glob_max_terms, while iii >= calc_term do (temp_sum : array_y_higher_work + temp_sum, ord, iii iii : iii - 1), array_y_higher_work2 : ord, calc_term calc_term - 1 temp_sum glob_h ----------------------------, term_no : glob_max_terms, factorial_1(calc_term - 1)! while term_no >= 1 do (array_y : array_y_higher_work2 , term_no 1, term_no ord : 1, while ord <= order_diff do (array_y_higher : ord, term_no array_y_higher_work2 , ord : 1 + ord), term_no : term_no - 1), ord, term_no display_alot(current_iter)), omniout_str(ALWAYS, "Finished!"), if glob_iter >= glob_max_iter then omniout_str(ALWAYS, "Maximum Iterations Reached before Solution Completed!"), if elapsed_time_seconds() - convfloat(glob_orig_start_sec) >= convfloat(glob_max_sec) then omniout_str(ALWAYS, "Maximum Time Reached before Solution Completed!"), glob_clock_sec : elapsed_time_seconds(), omniout_str(INFO, "diff ( y , x , 1 ) = arccos ( x ) ;"), omniout_int(INFO, "Iterations ", 32, glob_iter, 4, " "), prog_report(x_start, x_end), if glob_html_log then (logstart(html_log_file), logitem_str(html_log_file, "2012-06-17T19:03:24-05:00"), logitem_str(html_log_file, "Maxima"), logitem_str(html_log_file, "arccos"), logitem_str(html_log_file, "diff ( y , x , 1 ) = arccos ( x ) ;"), logitem_float(html_log_file, x_start), logitem_float(html_log_file, x_end), logitem_float(html_log_file, array_x ), logitem_float(html_log_file, glob_h), 1 logitem_str(html_log_file, "16"), 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) or (array_type_pole = 2) 1 1 then (logitem_float(html_log_file, array_pole ), 1 logitem_float(html_log_file, array_pole ), 0) 2 else (logitem_str(html_log_file, "NA"), logitem_str(html_log_file, "NA"), 0), logitem_time(html_log_file, convfloat(glob_clock_sec)), if glob_percent_done < 100.0 then (logitem_time(html_log_file, convfloat(glob_optimal_expect_sec)), 0) else (logitem_str(html_log_file, "Done"), 0), log_revs(html_log_file, " 092 "), logitem_str(html_log_file, "arccos diffeq.max"), logitem_str(html_log_file, "\ arccos maxima results"), logitem_str(html_log_file, "Mostly affecting speed of factorials"), logend(html_log_file)), if glob_html_log then close(html_log_file)) (%o48) mainprog() := (define_variable(INFO, 2, fixnum), define_variable(glob_iolevel, 5, fixnum), define_variable(DEBUGMASSIVE, 4, fixnum), define_variable(DEBUGL, 3, fixnum), define_variable(ALWAYS, 1, fixnum), define_variable(glob_max_terms, 30, fixnum), define_variable(glob_max_minutes, 0.0, float), define_variable(glob_log10relerr, 0.0, float), define_variable(glob_log10abserr, 0.0, float), define_variable(glob_optimal_clock_start_sec, 0.0, float), define_variable(glob_relerr, 1.0E-11, float), define_variable(glob_abserr, 1.0E-11, float), define_variable(glob_large_float, 9.0E+100, float), define_variable(glob_clock_start_sec, 0.0, float), define_variable(glob_hmin, 1.0E-11, float), define_variable(days_in_year, 365.0, float), define_variable(glob_percent_done, 0.0, float), define_variable(glob_max_iter, 1000, fixnum), define_variable(glob_disp_incr, 0.1, float), define_variable(glob_not_yet_finished, true, boolean), define_variable(glob_almost_1, 0.999, float), define_variable(glob_dump, false, boolean), define_variable(glob_subiter_method, 3, fixnum), define_variable(glob_max_trunc_err, 1.0E-11, float), define_variable(glob_log10normmin, 0.1, float), define_variable(MAX_UNCHANGED, 10, fixnum), define_variable(glob_current_iter, 0, fixnum), define_variable(glob_max_sec, 10000.0, float), define_variable(glob_log10_relerr, 1.0E-11, float), define_variable(glob_dump_analytic, false, boolean), define_variable(glob_h, 0.1, float), define_variable(years_in_century, 100.0, float), define_variable(hours_in_day, 24.0, float), define_variable(glob_orig_start_sec, 0.0, float), define_variable(glob_small_float, 1.0E-51, float), define_variable(glob_hmin_init, 0.001, float), define_variable(glob_hmax, 1.0, float), define_variable(glob_optimal_done, false, boolean), define_variable(glob_not_yet_start_msg, true, boolean), define_variable(glob_clock_sec, 0.0, float), define_variable(min_in_hour, 60.0, float), define_variable(sec_in_min, 60.0, float), define_variable(glob_smallish_float, 1.0E-101, float), define_variable(glob_max_rel_trunc_err, 1.0E-11, float), define_variable(glob_log10_abserr, 1.0E-11, float), define_variable(glob_reached_optimal_h, false, boolean), define_variable(djd_debug, true, boolean), define_variable(glob_max_opt_iter, 10, fixnum), define_variable(glob_iter, 0, fixnum), define_variable(glob_warned, false, boolean), define_variable(glob_optimal_start, 0.0, float), define_variable(centuries_in_millinium, 10.0, float), define_variable(glob_start, 0, fixnum), define_variable(glob_unchanged_h_cnt, 0, fixnum), define_variable(glob_no_eqs, 0, fixnum), define_variable(glob_initial_pass, true, boolean), define_variable(glob_html_log, true, boolean), define_variable(glob_normmax, 0.0, float), define_variable(djd_debug2, true, boolean), define_variable(glob_curr_iter_when_opt, 0, fixnum), define_variable(glob_warned2, false, boolean), define_variable(glob_max_hours, 0.0, float), define_variable(glob_look_poles, false, boolean), define_variable(glob_last_good_h, 0.1, float), define_variable(glob_display_flag, true, boolean), define_variable(glob_optimal_expect_sec, 0.1, float), ALWAYS : 1, INFO : 2, DEBUGL : 3, DEBUGMASSIVE : 4, glob_iolevel : INFO, 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/arccospostode.ode#################"), omniout_str(ALWAYS, "diff ( y , x , 1 ) = arccos ( x ) ;"), omniout_str(ALWAYS, "!"), omniout_str(ALWAYS, "/* BEGIN FIRST INPUT BLOCK */"), omniout_str(ALWAYS, "max_terms : 30,"), omniout_str(ALWAYS, "Digits : 32,"), omniout_str(ALWAYS, "!"), omniout_str(ALWAYS, "/* END FIRST INPUT BLOCK */"), omniout_str(ALWAYS, "/* BEGIN SECOND INPUT BLOCK */"), omniout_str(ALWAYS, "x_start : -0.8,"), omniout_str(ALWAYS, "x_end : 0.8 ,"), omniout_str(ALWAYS, "array_y_init[0 + 1] : exact_soln_y(x_start),"), omniout_str(ALWAYS, "glob_h : 0.00001 ,"), omniout_str(ALWAYS, "glob_look_poles : true,"), omniout_str(ALWAYS, "glob_max_iter : 100,"), omniout_str(ALWAYS, "/* END SECOND INPUT BLOCK */"), omniout_str(ALWAYS, "/* BEGIN OVERRIDE BLOCK */"), omniout_str(ALWAYS, "glob_h : 0.001 ,"), omniout_str(ALWAYS, "glob_look_poles : true,"), omniout_str(ALWAYS, "glob_max_iter : 1000,"), omniout_str(ALWAYS, "glob_max_minutes : 15,"), omniout_str(ALWAYS, "/* END OVERRIDE BLOCK */"), omniout_str(ALWAYS, "!"), omniout_str(ALWAYS, "/* BEGIN USER DEF BLOCK */"), omniout_str(ALWAYS, "exact_soln_y (x) := ("), omniout_str(ALWAYS, "2.0 + x * arccos(x) - sqrt(1.0-x*x)"), omniout_str(ALWAYS, ");"), omniout_str(ALWAYS, ""), 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 : 1.0E+100, glob_almost_1 : 0.99, glob_log10_abserr : - 8.0, glob_log10_relerr : - 8.0, glob_hmax : 0.01, max_terms : 30, Digits : 32, glob_max_terms : max_terms, glob_html_log : true, array(array_tmp0, 1 + max_terms), array(array_tmp1_a1, 1 + max_terms), array(array_tmp1, 1 + max_terms), array(array_tmp2, 1 + max_terms), array(array_pole, 1 + max_terms), array(array_fact_1, 1 + max_terms), array(array_y_init, 1 + max_terms), array(array_y, 1 + max_terms), array(array_x, 1 + max_terms), array(array_type_pole, 1 + max_terms), array(array_1st_rel_error, 1 + max_terms), array(array_m1, 1 + max_terms), array(array_norms, 1 + max_terms), array(array_last_rel_error, 1 + max_terms), array(array_poles, 1 + 1, 1 + 3), array(array_y_higher_work2, 1 + 2, 1 + max_terms), array(array_fact_2, 1 + max_terms, 1 + max_terms), array(array_y_higher, 1 + 2, 1 + max_terms), array(array_y_set_initial, 1 + 2, 1 + max_terms), array(array_real_pole, 1 + 1, 1 + 3), array(array_complex_pole, 1 + 1, 1 + 3), array(array_y_higher_work, 1 + 2, 1 + max_terms), term : 1, while term <= max_terms do (array_tmp0 : 0.0, term : 1 + term), term : 1, term while term <= max_terms do (array_tmp1_a1 : 0.0, term : 1 + term), term term : 1, while term <= max_terms do (array_tmp1 : 0.0, term : 1 + term), term term : 1, while term <= max_terms do (array_tmp2 : 0.0, term : 1 + term), term term : 1, while term <= max_terms do (array_pole : 0.0, term : 1 + term), term term : 1, while term <= max_terms do (array_fact_1 : 0.0, term term : 1 + term), term : 1, while term <= max_terms do (array_y_init : 0.0, term : 1 + term), term : 1, term while term <= max_terms do (array_y : 0.0, term : 1 + term), term : 1, term while term <= max_terms do (array_x : 0.0, term : 1 + term), term : 1, term while term <= max_terms do (array_type_pole : 0.0, term : 1 + term), term term : 1, while term <= max_terms do (array_1st_rel_error : 0.0, term term : 1 + term), term : 1, while term <= max_terms do (array_m1 : 0.0, term term : 1 + term), term : 1, while term <= max_terms do (array_norms : 0.0, term : 1 + term), term : 1, term while term <= max_terms do (array_last_rel_error : 0.0, term : 1 + term), term ord : 1, while ord <= 1 do (term : 1, while term <= 3 do (array_poles : 0.0, term : 1 + term), ord, term ord : 1 + ord), ord : 1, while ord <= 2 do (term : 1, while term <= max_terms do (array_y_higher_work2 : 0.0, ord, term term : 1 + term), ord : 1 + ord), ord : 1, while ord <= max_terms do (term : 1, while term <= max_terms do (array_fact_2 : 0.0, term : 1 + term), ord : 1 + ord), ord, term ord : 1, while ord <= 2 do (term : 1, while term <= max_terms do (array_y_higher : 0.0, term : 1 + term), ord, term ord : 1 + ord), ord : 1, while ord <= 2 do (term : 1, while term <= max_terms do (array_y_set_initial : 0.0, ord, term term : 1 + term), ord : 1 + ord), ord : 1, while ord <= 1 do (term : 1, while term <= 3 do (array_real_pole : 0.0, term : 1 + term), ord : 1 + ord), ord, term ord : 1, while ord <= 1 do (term : 1, while term <= 3 do (array_complex_pole : 0.0, term : 1 + term), ord, term ord : 1 + ord), ord : 1, while ord <= 2 do (term : 1, while term <= max_terms do (array_y_higher_work : 0.0, ord, term term : 1 + term), ord : 1 + ord), array(array_tmp2, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_tmp2 : 0.0, term term : 1 + term), array(array_tmp1, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_tmp1 : 0.0, term : 1 + term), term array(array_tmp1_a1, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_tmp1_a1 : 0.0, term : 1 + term), term array(array_tmp0, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_tmp0 : 0.0, term : 1 + term), term array(array_x, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_x : 0.0, term : 1 + term), term array(array_y, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_y : 0.0, term : 1 + term), term array(array_const_0D0, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_const_0D0 : 0.0, term : 1 + term), term array_const_0D0 : 0.0, array(array_const_1, 1 + 1 + max_terms), term : 1, 1 while term <= 1 + max_terms do (array_const_1 : 0.0, term : 1 + term), term array_const_1 : 1, array(array_m1, 1 + 1 + max_terms), term : 1, 1 while term <= max_terms do (array_m1 : 0.0, term : 1 + term), term array_m1 : - 1.0, iiif : 0, while iiif <= glob_max_terms do (jjjf : 0, 1 while jjjf <= glob_max_terms do (array_fact_1 : 0, iiif array_fact_2 : 0, jjjf : 1 + jjjf), iiif : 1 + iiif), iiif, jjjf x_start : - 0.8, x_end : 0.8, array_y_init : exact_soln_y(x_start), 1 + 0 glob_h : 1.0E-5, glob_look_poles : true, glob_max_iter : 100, glob_h : 0.001, glob_look_poles : true, glob_max_iter : 1000, glob_max_minutes : 15, glob_last_good_h : glob_h, glob_max_terms : max_terms, glob_max_sec : convfloat(3600.0) convfloat(glob_max_hours) + convfloat(60.0) convfloat(glob_max_minutes), glob_log10_abserr glob_log10_relerr glob_abserr : 10.0 , glob_relerr : 10.0 , chk_data(), array_y_set_initial : true, array_y_set_initial : false, 1, 1 1, 2 array_y_set_initial : false, array_y_set_initial : false, 1, 3 1, 4 array_y_set_initial : false, array_y_set_initial : false, 1, 5 1, 6 array_y_set_initial : false, array_y_set_initial : false, 1, 7 1, 8 array_y_set_initial : false, array_y_set_initial : false, 1, 9 1, 10 array_y_set_initial : false, array_y_set_initial : false, 1, 11 1, 12 array_y_set_initial : false, array_y_set_initial : false, 1, 13 1, 14 array_y_set_initial : false, array_y_set_initial : false, 1, 15 1, 16 array_y_set_initial : false, array_y_set_initial : false, 1, 17 1, 18 array_y_set_initial : false, array_y_set_initial : false, 1, 19 1, 20 array_y_set_initial : false, array_y_set_initial : false, 1, 21 1, 22 array_y_set_initial : false, array_y_set_initial : false, 1, 23 1, 24 array_y_set_initial : false, array_y_set_initial : false, 1, 25 1, 26 array_y_set_initial : false, array_y_set_initial : false, 1, 27 1, 28 array_y_set_initial : false, array_y_set_initial : false, 1, 29 1, 30 if glob_html_log then html_log_file : openw("html/entry.html"), omniout_str(ALWAYS, "START of Soultion"), array_x : x_start, 1 array_x : glob_h, order_diff : 1, term_no : 1, 2 while term_no <= order_diff do (array_y : term_no term_no - 1 array_y_init glob_h term_no -------------------------------------, term_no : 1 + term_no), factorial_1(term_no - 1) rows : order_diff, r_order : 1, while r_order <= rows do (term_no : 1, while term_no <= 1 - r_order + rows do (it : - 1 + r_order + term_no, term_no - 1 array_y_init glob_h it array_y_higher : --------------------------------, r_order, term_no factorial_1(term_no - 1) term_no : 1 + term_no), r_order : 1 + r_order), current_iter : 1, glob_clock_start_sec : elapsed_time_seconds(), start_array_y(), if !array_y_higher ! > glob_small_float ! 1, 1! then (tmp : !array_y_higher !, log10norm : log10(tmp), ! 1, 1! if log10norm < glob_log10normmin then glob_log10normmin : log10norm), display_alot(current_iter), glob_clock_sec : elapsed_time_seconds(), glob_current_iter : 0, glob_iter : 0, omniout_str(DEBUGL, " "), glob_reached_optimal_h : true, glob_optimal_clock_start_sec : elapsed_time_seconds(), while (glob_current_iter < glob_max_iter) and (array_x <= x_end) and (convfloat(glob_clock_sec) - convfloat(glob_orig_start_sec) < 1 convfloat(glob_max_sec)) do (omniout_str (INFO, " "), omniout_str(INFO, "TOP MAIN SOLVE Loop"), glob_iter : 1 + glob_iter, glob_clock_sec : elapsed_time_seconds(), glob_current_iter : 1 + glob_current_iter, atomall(), if glob_look_poles then check_for_pole(), array_x : glob_h + array_x , 1 1 array_x : glob_h, order_diff : 1, ord : 2, calc_term : 1, 2 iii : glob_max_terms, while iii >= calc_term do (array_y_higher_work : 2, iii array_y_higher 2, iii -------------------- calc_term - 1 glob_h -------------------------------------, iii : iii - 1), temp_sum : 0.0, factorial_3(iii - calc_term, iii - 1) ord : 2, calc_term : 1, iii : glob_max_terms, while iii >= calc_term do (temp_sum : array_y_higher_work + temp_sum, ord, iii iii : iii - 1), array_y_higher_work2 : ord, calc_term calc_term - 1 temp_sum glob_h ----------------------------, ord : 1, calc_term : 2, iii : glob_max_terms, factorial_1(calc_term - 1)! while iii >= calc_term do (array_y_higher_work : 1, iii array_y_higher 1, iii -------------------- calc_term - 1 glob_h -------------------------------------, iii : iii - 1), temp_sum : 0.0, factorial_3(iii - calc_term, iii - 1) ord : 1, calc_term : 2, iii : glob_max_terms, while iii >= calc_term do (temp_sum : array_y_higher_work + temp_sum, ord, iii iii : iii - 1), array_y_higher_work2 : ord, calc_term calc_term - 1 temp_sum glob_h ----------------------------, ord : 1, calc_term : 1, iii : glob_max_terms, factorial_1(calc_term - 1)! while iii >= calc_term do (array_y_higher_work : 1, iii array_y_higher 1, iii -------------------- calc_term - 1 glob_h -------------------------------------, iii : iii - 1), temp_sum : 0.0, factorial_3(iii - calc_term, iii - 1) ord : 1, calc_term : 1, iii : glob_max_terms, while iii >= calc_term do (temp_sum : array_y_higher_work + temp_sum, ord, iii iii : iii - 1), array_y_higher_work2 : ord, calc_term calc_term - 1 temp_sum glob_h ----------------------------, term_no : glob_max_terms, factorial_1(calc_term - 1)! while term_no >= 1 do (array_y : array_y_higher_work2 , term_no 1, term_no ord : 1, while ord <= order_diff do (array_y_higher : ord, term_no array_y_higher_work2 , ord : 1 + ord), term_no : term_no - 1), ord, term_no display_alot(current_iter)), omniout_str(ALWAYS, "Finished!"), if glob_iter >= glob_max_iter then omniout_str(ALWAYS, "Maximum Iterations Reached before Solution Completed!"), if elapsed_time_seconds() - convfloat(glob_orig_start_sec) >= convfloat(glob_max_sec) then omniout_str(ALWAYS, "Maximum Time Reached before Solution Completed!"), glob_clock_sec : elapsed_time_seconds(), omniout_str(INFO, "diff ( y , x , 1 ) = arccos ( x ) ;"), omniout_int(INFO, "Iterations ", 32, glob_iter, 4, " "), prog_report(x_start, x_end), if glob_html_log then (logstart(html_log_file), logitem_str(html_log_file, "2012-06-17T19:03:24-05:00"), logitem_str(html_log_file, "Maxima"), logitem_str(html_log_file, "arccos"), logitem_str(html_log_file, "diff ( y , x , 1 ) = arccos ( x ) ;"), logitem_float(html_log_file, x_start), logitem_float(html_log_file, x_end), logitem_float(html_log_file, array_x ), logitem_float(html_log_file, glob_h), 1 logitem_str(html_log_file, "16"), 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) or (array_type_pole = 2) 1 1 then (logitem_float(html_log_file, array_pole ), 1 logitem_float(html_log_file, array_pole ), 0) 2 else (logitem_str(html_log_file, "NA"), logitem_str(html_log_file, "NA"), 0), logitem_time(html_log_file, convfloat(glob_clock_sec)), if glob_percent_done < 100.0 then (logitem_time(html_log_file, convfloat(glob_optimal_expect_sec)), 0) else (logitem_str(html_log_file, "Done"), 0), log_revs(html_log_file, " 092 "), logitem_str(html_log_file, "arccos diffeq.max"), logitem_str(html_log_file, "\ arccos maxima results"), logitem_str(html_log_file, "Mostly affecting speed of factorials"), logend(html_log_file)), if glob_html_log then close(html_log_file)) (%i49) mainprog() "##############ECHO OF PROBLEM#################" "##############temp/arccospostode.ode#################" "diff ( y , x , 1 ) = arccos ( x ) ;" "!" "/* BEGIN FIRST INPUT BLOCK */" "max_terms : 30," "Digits : 32," "!" "/* END FIRST INPUT BLOCK */" "/* BEGIN SECOND INPUT BLOCK */" "x_start : -0.8," "x_end : 0.8 ," "array_y_init[0 + 1] : exact_soln_y(x_start)," "glob_h : 0.00001 ," "glob_look_poles : true," "glob_max_iter : 100," "/* END SECOND INPUT BLOCK */" "/* BEGIN OVERRIDE BLOCK */" "glob_h : 0.001 ," "glob_look_poles : true," "glob_max_iter : 1000," "glob_max_minutes : 15," "/* END OVERRIDE BLOCK */" "!" "/* BEGIN USER DEF BLOCK */" "exact_soln_y (x) := (" "2.0 + x * arccos(x) - sqrt(1.0-x*x)" ");" "" "/* END USER DEF BLOCK */" "#######END OF ECHO OF PROBLEM#################" "START of Soultion" x[1] = -0.8 " " y[1] (analytic) = -0.5984732358372071 " " y[1] (numeric) = -0.5984732358372071 " " absolute error = 0.0 " " relative error = 0.0 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.799 " " y[1] (analytic) = -0.5959759770096787 " " y[1] (numeric) = -0.595975977009679 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 3.725730792693096600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.798 " " y[1] (analytic) = -0.593480381162126 " " y[1] (numeric) = -0.5934803811621265 " " absolute error = 5.5511151231257830000000000000000E-16 " " relative error = 9.35349389689317900000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.797 " " y[1] (analytic) = -0.5909864446343727 " " y[1] (numeric) = -0.5909864446343737 " " absolute error = 9.9920072216264090000000000000000E-16 " " relative error = 1.69073374056966620000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.796 " " y[1] (analytic) = -0.5884941637948435 " " y[1] (numeric) = -0.588494163794845 " " absolute error = 1.4432899320127035000000000000000E-15 " " relative error = 2.45251358604102080000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.795 " " y[1] (analytic) = -0.586003535040213 " " y[1] (numeric) = -0.5860035350402149 " " absolute error = 1.887379141862766000000000000000E-15 " " relative error = 3.2207640893040850000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.794 " " y[1] (analytic) = -0.5835145547950598 " " y[1] (numeric) = -0.5835145547950616 " " absolute error = 1.887379141862766000000000000000E-15 " " relative error = 3.23450225251989740000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.793 " " y[1] (analytic) = -0.5810272195115264 " " y[1] (numeric) = -0.5810272195115286 " " absolute error = 2.220446049250313000000000000000E-15 " " relative error = 3.82158696647130800000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.792 " " y[1] (analytic) = -0.578541525668988 " " y[1] (numeric) = -0.5785415256689902 " " absolute error = 2.220446049250313000000000000000E-15 " " relative error = 3.8380063499897143000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.791 " " y[1] (analytic) = -0.5760574697737215 " " y[1] (numeric) = -0.5760574697737242 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 4.6254677682541284000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.79 " " y[1] (analytic) = -0.5735750483585863 " " y[1] (numeric) = -0.573575048358589 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 4.6454867008694695000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.789 " " y[1] (analytic) = -0.5710942579827036 " " y[1] (numeric) = -0.5710942579827066 " " absolute error = 2.9976021664879227000000000000000E-15 " " relative error = 5.2488746377462430000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.788 " " y[1] (analytic) = -0.568615095231148 " " y[1] (numeric) = -0.5686150952311512 " " absolute error = 3.219646771412954000000000000000E-15 " " relative error = 5.6622604612776480000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.787 " " y[1] (analytic) = -0.5661375567146383 " " y[1] (numeric) = -0.5661375567146417 " " absolute error = 3.4416913763379850000000000000000E-15 " " relative error = 6.0792493547160500000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.786 " " y[1] (analytic) = -0.5636616390692373 " " y[1] (numeric) = -0.5636616390692412 " " absolute error = 3.885780586188048000000000000000E-15 " " relative error = 6.8938177034799750000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.785 " " y[1] (analytic) = -0.5611873389560552 " " y[1] (numeric) = -0.5611873389560593 " " absolute error = 4.107825191113079000000000000000E-15 " " relative error = 7.3198821604825090000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.784 " " y[1] (analytic) = -0.5587146530609574 " " y[1] (numeric) = -0.5587146530609616 " " absolute error = 4.218847493575595000000000000000E-15 " " relative error = 7.5509877366959020000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.783 " " y[1] (analytic) = -0.5562435780942768 " " y[1] (numeric) = -0.5562435780942814 " " absolute error = 4.551914400963142000000000000000E-15 " " relative error = 8.1833113769299930000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.782 " " y[1] (analytic) = -0.5537741107905337 " " y[1] (numeric) = -0.5537741107905383 " " absolute error = 4.551914400963142000000000000000E-15 " " relative error = 8.2198035485355380000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.781 " " y[1] (analytic) = -0.5513062479081551 " " y[1] (numeric) = -0.5513062479081599 " " absolute error = 4.773959005888173000000000000000E-15 " " relative error = 8.6593595193274350000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.78 " " y[1] (analytic) = -0.5488399862292035 " " y[1] (numeric) = -0.5488399862292085 " " absolute error = 4.9960036108132044000000000000000E-15 " " relative error = 9.1028418777177090000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.779 " " y[1] (analytic) = -0.546375322559107 " " y[1] (numeric) = -0.5463753225591125 " " absolute error = 5.440092820663267000000000000000E-15 " " relative error = 9.9566956925928090000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.778 " " y[1] (analytic) = -0.5439122537263955 " " y[1] (numeric) = -0.5439122537264011 " " absolute error = 5.551115123125783000000000000000E-15 " " relative error = 1.0205901935642293000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.777 " " y[1] (analytic) = -0.5414507765824381 " " y[1] (numeric) = -0.5414507765824442 " " absolute error = 6.106226635438361000000000000000E-15 " " relative error = 1.1277528631466767000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.776 " " y[1] (analytic) = -0.53899088800119 " " y[1] (numeric) = -0.5389908880011961 " " absolute error = 6.106226635438361000000000000000E-15 " " relative error = 1.1328997894719288000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.775 " " y[1] (analytic) = -0.5365325848789361 " " y[1] (numeric) = -0.5365325848789426 " " absolute error = 6.5503158452884240000000000000000E-15 " " relative error = 1.2208607696709503000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.774 " " y[1] (analytic) = -0.534075864134047 " " y[1] (numeric) = -0.5340758641340533 " " absolute error = 6.328271240363392000000000000000E-15 " " relative error = 1.1849011845206822000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.773 " " y[1] (analytic) = -0.5316207227067297 " " y[1] (numeric) = -0.5316207227067363 " " absolute error = 6.661338147750939000000000000000E-15 " " relative error = 1.2530245461153117000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.772 " " y[1] (analytic) = -0.5291671575587913 " " y[1] (numeric) = -0.5291671575587981 " " absolute error = 6.772360450213455000000000000000E-15 " " relative error = 1.2798149608256887000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.771 " " y[1] (analytic) = -0.5267151656733987 " " y[1] (numeric) = -0.5267151656734058 " " absolute error = 7.105427357601002000000000000000E-15 " " relative error = 1.3490075510768335000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.77 " " y[1] (analytic) = -0.5242647440548474 " " y[1] (numeric) = -0.5242647440548546 " " absolute error = 7.216449660063518000000000000000E-15 " " relative error = 1.3764895965059495000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.769 " " y[1] (analytic) = -0.5218158897283297 " " y[1] (numeric) = -0.5218158897283369 " " absolute error = 7.216449660063518000000000000000E-15 " " relative error = 1.3829493892607560000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.768 " " y[1] (analytic) = -0.5193685997397096 " " y[1] (numeric) = -0.519368599739717 " " absolute error = 7.438494264988549000000000000000E-15 " " relative error = 1.4322187110881320000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.767 " " y[1] (analytic) = -0.5169228711553 " " y[1] (numeric) = -0.5169228711553074 " " absolute error = 7.438494264988549000000000000000E-15 " " relative error = 1.438994999072848200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.766 " " y[1] (analytic) = -0.514478701061642 " " y[1] (numeric) = -0.5144787010616495 " " absolute error = 7.549516567451064000000000000000E-15 " " relative error = 1.4674109058105642000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.765 " " y[1] (analytic) = -0.5120360865652899 " " y[1] (numeric) = -0.5120360865652973 " " absolute error = 7.438494264988549000000000000000E-15 " " relative error = 1.4527285205395507000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.764 " " y[1] (analytic) = -0.5095950247925967 " " y[1] (numeric) = -0.5095950247926048 " " absolute error = 8.104628079763643000000000000000E-15 " " relative error = 1.5904056526184096000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.763 " " y[1] (analytic) = -0.507155512889507 " " y[1] (numeric) = -0.5071555128895152 " " absolute error = 8.215650382226158000000000000000E-15 " " relative error = 1.6199469735461766000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.762 " " y[1] (analytic) = -0.504717548021347 " " y[1] (numeric) = -0.5047175480213554 " " absolute error = 8.326672684688674000000000000000E-15 " " relative error = 1.6497688097693203000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.761 " " y[1] (analytic) = -0.5022811273726231 " " y[1] (numeric) = -0.5022811273726312 " " absolute error = 8.104628079763643000000000000000E-15 " " relative error = 1.613564125365023000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.76 " " y[1] (analytic) = -0.4998462481468189 " " y[1] (numeric) = -0.49984624814682743 " " absolute error = 8.548717289613705000000000000000E-15 " " relative error = 1.7102693720935377000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.759 " " y[1] (analytic) = -0.49741290756620105 " " y[1] (numeric) = -0.4974129075662097 " " absolute error = 8.659739592076221000000000000000E-15 " " relative error = 1.7409559463278887000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.758 " " y[1] (analytic) = -0.4949811028716209 " " y[1] (numeric) = -0.49498110287162983 " " absolute error = 8.93729534823251000000000000000E-15 " " relative error = 1.8055831417367266000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.757 " " y[1] (analytic) = -0.492550831322325 " " y[1] (numeric) = -0.49255083132233374 " " absolute error = 8.715250743307479000000000000000E-15 " " relative error = 1.7694114371729122000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.756 " " y[1] (analytic) = -0.49012209019576325 " " y[1] (numeric) = -0.49012209019577213 " " absolute error = 8.881784197001252000000000000000E-15 " " relative error = 1.8121574959932357000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.755 " " y[1] (analytic) = -0.4876948767874051 " " y[1] (numeric) = -0.4876948767874142 " " absolute error = 9.103828801926284000000000000000E-15 " " relative error = 1.8667058513913415000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.754 " " y[1] (analytic) = -0.48526918841055444 " " y[1] (numeric) = -0.4852691884105636 " " absolute error = 9.159339953157541000000000000000E-15 " " relative error = 1.887476100256426000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.753 " " y[1] (analytic) = -0.482845022396168 " " y[1] (numeric) = -0.48284502239617727 " " absolute error = 9.270362255620057000000000000000E-15 " " relative error = 1.9199457021664906000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.752 " " y[1] (analytic) = -0.4804223760926777 " " y[1] (numeric) = -0.48042237609268695 " " absolute error = 9.270362255620057000000000000000E-15 " " relative error = 1.9296274938350752000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.751 " " y[1] (analytic) = -0.478001246865813 " " y[1] (numeric) = -0.4780012468658229 " " absolute error = 9.880984919163893000000000000000E-15 " " relative error = 2.0671462645656520000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.75 " " y[1] (analytic) = -0.47558163209843096 " " y[1] (numeric) = -0.47558163209844045 " " absolute error = 9.492406860545088000000000000000E-15 " " relative error = 1.99595741716544000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.749 " " y[1] (analytic) = -0.4731635291903391 " " y[1] (numeric) = -0.47316352919034876 " " absolute error = 9.658940314238862000000000000000E-15 " " relative error = 2.041353510649247200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.748 " " y[1] (analytic) = -0.4707469355581322 " " y[1] (numeric) = -0.4707469355581421 " " absolute error = 9.936496070395151000000000000000E-15 " " relative error = 2.1107935750264914000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.747 " " y[1] (analytic) = -0.46833184863502364 " " y[1] (numeric) = -0.4683318486350335 " " absolute error = 9.880984919163893000000000000000E-15 " " relative error = 2.1098255324643228000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.746 " " y[1] (analytic) = -0.4659182658706804 " " y[1] (numeric) = -0.4659182658706905 " " absolute error = 1.010302952408892500000000000000E-14 " " relative error = 2.1684124156860393000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.745 " " y[1] (analytic) = -0.4635061847310632 " " y[1] (numeric) = -0.46350618473107347 " " absolute error = 1.026956297778269800000000000000E-14 " " relative error = 2.2156258785934715000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.744 " " y[1] (analytic) = -0.46109560269826577 " " y[1] (numeric) = -0.461095602698276 " " absolute error = 1.02140518265514400000000000000E-14 " " relative error = 2.2151700789988596000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.743 " " y[1] (analytic) = -0.45868651727035714 " " y[1] (numeric) = -0.4586865172703675 " " absolute error = 1.038058528024521400000000000000E-14 " " relative error = 2.263111055022952000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.742 " " y[1] (analytic) = -0.45627892596122743 " " y[1] (numeric) = -0.45627892596123815 " " absolute error = 1.07136521876327600000000000000E-14 " " relative error = 2.348048874942595700000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.741 " " y[1] (analytic) = -0.4538728263004347 " " y[1] (numeric) = -0.45387282630044534 " " absolute error = 1.065814103640150300000000000000E-14 " " relative error = 2.3482659500188932000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.74 " " y[1] (analytic) = -0.4514682158330523 " " y[1] (numeric) = -0.45146821583306307 " " absolute error = 1.076916333886401800000000000000E-14 " " relative error = 2.3853646748958138000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.739 " " y[1] (analytic) = -0.44906509211952184 " " y[1] (numeric) = -0.44906509211953277 " " absolute error = 1.093569679255779200000000000000E-14 " " relative error = 2.4352141781813624000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.738 " " y[1] (analytic) = -0.44666345273550556 " " y[1] (numeric) = -0.44666345273551633 " " absolute error = 1.076916333886401800000000000000E-14 " " relative error = 2.411024065862188100000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.737 " " y[1] (analytic) = -0.44426329527174035 " " y[1] (numeric) = -0.4442632952717512 " " absolute error = 1.082467449009527600000000000000E-14 " " relative error = 2.4365448609645324000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.736 " " y[1] (analytic) = -0.44186461733389615 " " y[1] (numeric) = -0.4418646173339071 " " absolute error = 1.093569679255779200000000000000E-14 " " relative error = 2.474897596132755200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.735 " " y[1] (analytic) = -0.43946741654243404 " " y[1] (numeric) = -0.43946741654244514 " " absolute error = 1.110223024625156500000000000000E-14 " " relative error = 2.5262920135467104000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.734 " " y[1] (analytic) = -0.4370716905324673 " " y[1] (numeric) = -0.43707169053247835 " " absolute error = 1.104671909502030800000000000000E-14 " " relative error = 2.5274387095541520000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.733 " " y[1] (analytic) = -0.43467743695362304 " " y[1] (numeric) = -0.43467743695363426 " " absolute error = 1.121325254871408100000000000000E-14 " " relative error = 2.5796720960031000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.732 " " y[1] (analytic) = -0.4322846534699074 " " y[1] (numeric) = -0.4322846534699193 " " absolute error = 1.187938636348917500000000000000E-14 " " relative error = 2.7480472110528287000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.731 " " y[1] (analytic) = -0.4298933377595734 " " y[1] (numeric) = -0.429893337759585 " " absolute error = 1.160183060733288600000000000000E-14 " " relative error = 2.6987695756805250000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.73 " " y[1] (analytic) = -0.4275034875149838 " " y[1] (numeric) = -0.4275034875149958 " " absolute error = 1.19904086659516900000000000000E-14 " " relative error = 2.804751075985416600000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.729 " " y[1] (analytic) = -0.4251151004424871 " " y[1] (numeric) = -0.42511510044249873 " " absolute error = 1.160183060733288600000000000000E-14 " " relative error = 2.7291033875900794000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.728 " " y[1] (analytic) = -0.4227281742622828 " " y[1] (numeric) = -0.4227281742622948 " " absolute error = 1.19904086659516900000000000000E-14 " " relative error = 2.8364347105268195000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.727 " " y[1] (analytic) = -0.4203427067082999 " " y[1] (numeric) = -0.42034270670831186 " " absolute error = 1.19904086659516900000000000000E-14 " " relative error = 2.8525316306421680000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.726 " " y[1] (analytic) = -0.4179586955280672 " " y[1] (numeric) = -0.41795869552807924 " " absolute error = 1.204591981718294800000000000000E-14 " " relative error = 2.882083791070218000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.725 " " y[1] (analytic) = -0.41557613848259223 " " y[1] (numeric) = -0.4155761384826041 " " absolute error = 1.187938636348917500000000000000E-14 " " relative error = 2.8585342765022065000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.724 " " y[1] (analytic) = -0.413195033346237 " " y[1] (numeric) = -0.41319503334624913 " " absolute error = 1.215694211964546400000000000000E-14 " " relative error = 2.9421801179925000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.723 " " y[1] (analytic) = -0.41081537790659983 " " y[1] (numeric) = -0.410815377906612 " " absolute error = 1.215694211964546400000000000000E-14 " " relative error = 2.9592227490591605000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.722 " " y[1] (analytic) = -0.40843716996439383 " " y[1] (numeric) = -0.4084371699644062 " " absolute error = 1.237898672457049500000000000000E-14 " " relative error = 3.0308178674457210000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.721 " " y[1] (analytic) = -0.4060604073333315 " " y[1] (numeric) = -0.40606040733334364 " " absolute error = 1.215694211964546400000000000000E-14 " " relative error = 2.9938752707958390000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.72 " " y[1] (analytic) = -0.4036850878400057 " " y[1] (numeric) = -0.4036850878400183 " " absolute error = 1.260103132949552700000000000000E-14 " " relative error = 3.1215003251469500000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.719 " " y[1] (analytic) = -0.40131120932377917 " " y[1] (numeric) = -0.40131120932379166 " " absolute error = 1.249000902703301100000000000000E-14 " " relative error = 3.112300064600496000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.718 " " y[1] (analytic) = -0.3989387696366675 " " y[1] (numeric) = -0.3989387696366798 " " absolute error = 1.22679644221079800000000000000E-14 " " relative error = 3.0751497111401327000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.717 " " y[1] (analytic) = -0.3965677666432288 " " y[1] (numeric) = -0.3965677666432411 " " absolute error = 1.232347557333923800000000000000E-14 " " relative error = 3.1075333423217980000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.716 " " y[1] (analytic) = -0.39419819822045377 " " y[1] (numeric) = -0.39419819822046637 " " absolute error = 1.260103132949552700000000000000E-14 " " relative error = 3.196623268797502000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.715 " " y[1] (analytic) = -0.3918300622576568 " " y[1] (numeric) = -0.3918300622576694 " " absolute error = 1.260103132949552700000000000000E-14 " " relative error = 3.2159429669307580000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.714 " " y[1] (analytic) = -0.389463356656367 " " y[1] (numeric) = -0.3894633566563796 " " absolute error = 1.260103132949552700000000000000E-14 " " relative error = 3.235485730333732500000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.713 " " y[1] (analytic) = -0.38709807933022256 " " y[1] (numeric) = -0.38709807933023543 " " absolute error = 1.287858708565181600000000000000E-14 " " relative error = 3.326957113281218700000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.712 " " y[1] (analytic) = -0.3847342282048667 " " y[1] (numeric) = -0.38473422820487946 " " absolute error = 1.2767564783189300000000000000E-14 " " relative error = 3.3185414364512206000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.711 " " y[1] (analytic) = -0.38237180121784187 " " y[1] (numeric) = -0.3823718012178546 " " absolute error = 1.271205363195804200000000000000E-14 " " relative error = 3.3245269634085360000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.71 " " y[1] (analytic) = -0.3800107963184888 " " y[1] (numeric) = -0.38001079631850154 " " absolute error = 1.2767564783189300000000000000E-14 " " relative error = 3.3597900130418257000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.709 " " y[1] (analytic) = -0.3776512114678451 " " y[1] (numeric) = -0.3776512114678577 " " absolute error = 1.260103132949552700000000000000E-14 " " relative error = 3.3366850010935120000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.708 " " y[1] (analytic) = -0.37529304463854385 " " y[1] (numeric) = -0.3752930446385569 " " absolute error = 1.30451205393455900000000000000E-14 " " relative error = 3.475982495734698000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.707 " " y[1] (analytic) = -0.3729362938147175 " " y[1] (numeric) = -0.3729362938147308 " " absolute error = 1.332267629550187800000000000000E-14 " " relative error = 3.57237322203906000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.706 " " y[1] (analytic) = -0.3705809569918981 " " y[1] (numeric) = -0.3705809569919112 " " absolute error = 1.310063169057684700000000000000E-14 " " relative error = 3.535160521176824000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.705 " " y[1] (analytic) = -0.3682270321769202 " " y[1] (numeric) = -0.36822703217693337 " " absolute error = 1.315614284180810500000000000000E-14 " " relative error = 3.5728346080488300000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.704 " " y[1] (analytic) = -0.36587451738782806 " " y[1] (numeric) = -0.36587451738784116 " " absolute error = 1.310063169057684700000000000000E-14 " " relative error = 3.5806351817309373000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.703 " " y[1] (analytic) = -0.36352341065377936 " " y[1] (numeric) = -0.36352341065379246 " " absolute error = 1.310063169057684700000000000000E-14 " " relative error = 3.6037931276601940000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.702 " " y[1] (analytic) = -0.361173710014953 " " y[1] (numeric) = -0.36117371001496634 " " absolute error = 1.332267629550187800000000000000E-14 " " relative error = 3.68871707050612950000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.701 " " y[1] (analytic) = -0.35882541352245767 " " y[1] (numeric) = -0.35882541352247105 " " absolute error = 1.337818744673313600000000000000E-14 " " relative error = 3.728327744516301000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.7 " " y[1] (analytic) = -0.3564785192382395 " " y[1] (numeric) = -0.356478519238253 " " absolute error = 1.35447209004269100000000000000E-14 " " relative error = 3.799589644102731000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.699 " " y[1] (analytic) = -0.3541330252349939 " " y[1] (numeric) = -0.35413302523500734 " " absolute error = 1.343369859796439400000000000000E-14 " " relative error = 3.7934046363086654000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.698 " " y[1] (analytic) = -0.3517889295960751 " " y[1] (numeric) = -0.35178892959608876 " " absolute error = 1.365574320288942500000000000000E-14 " " relative error = 3.881800151746953000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.697 " " y[1] (analytic) = -0.3494462304154107 " " y[1] (numeric) = -0.34944623041542405 " " absolute error = 1.337818744673313600000000000000E-14 " " relative error = 3.8283965549805954000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.696 " " y[1] (analytic) = -0.3471049257974116 " " y[1] (numeric) = -0.3471049257974253 " " absolute error = 1.371125435412068300000000000000E-14 " " relative error = 3.950175677461657000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.695 " " y[1] (analytic) = -0.3447650138568905 " " y[1] (numeric) = -0.34476501385690433 " " absolute error = 1.382227665658320000000000000000E-14 " " relative error = 4.0091877368742310000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.694 " " y[1] (analytic) = -0.34242649271897396 " " y[1] (numeric) = -0.34242649271898784 " " absolute error = 1.387778780781445700000000000000E-14 " " relative error = 4.052778655535809000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.693 " " y[1] (analytic) = -0.34008936051901995 " " y[1] (numeric) = -0.34008936051903377 " " absolute error = 1.382227665658320000000000000000E-14 " " relative error = 4.064307285440695000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.692 " " y[1] (analytic) = -0.33775361540253457 " " y[1] (numeric) = -0.33775361540254845 " " absolute error = 1.387778780781445700000000000000E-14 " " relative error = 4.108849520759360600000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.691 " " y[1] (analytic) = -0.3354192555250909 " " y[1] (numeric) = -0.335419255525105 " " absolute error = 1.409983241273948800000000000000E-14 " " relative error = 4.203644299033022000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.69 " " y[1] (analytic) = -0.3330862790522482 " " y[1] (numeric) = -0.3330862790522622 " " absolute error = 1.398881011027697200000000000000E-14 " " relative error = 4.199755735985353000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.689 " " y[1] (analytic) = -0.3307546841594704 " " y[1] (numeric) = -0.3307546841594846 " " absolute error = 1.421085471520200400000000000000E-14 " " relative error = 4.2964938656319585000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.688 " " y[1] (analytic) = -0.3284244690320496 " " y[1] (numeric) = -0.3284244690320636 " " absolute error = 1.40443212615082300000000000000E-14 " " relative error = 4.2762712848102996000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6869999999999999 " " y[1] (analytic) = -0.3260956318650252 " " y[1] (numeric) = -0.3260956318650392 " " absolute error = 1.398881011027697200000000000000E-14 " " relative error = 4.289787639985040400000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6859999999999999 " " y[1] (analytic) = -0.3237681708631087 " " y[1] (numeric) = -0.3237681708631226 " " absolute error = 1.387778780781445700000000000000E-14 " " relative error = 4.286334808890796000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6849999999999999 " " y[1] (analytic) = -0.3214420842406057 " " y[1] (numeric) = -0.32144208424061993 " " absolute error = 1.421085471520200400000000000000E-14 " " relative error = 4.420968943371117500000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6839999999999999 " " y[1] (analytic) = -0.31911737022134246 " " y[1] (numeric) = -0.3191173702213567 " " absolute error = 1.42663658664332620000000000000E-14 " " relative error = 4.4705701405529860000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6829999999999999 " " y[1] (analytic) = -0.31679402703858883 " " y[1] (numeric) = -0.31679402703860304 " " absolute error = 1.421085471520200400000000000000E-14 " " relative error = 4.4858341705637567000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6819999999999999 " " y[1] (analytic) = -0.31447205293498537 " " y[1] (numeric) = -0.3144720529349998 " " absolute error = 1.443289932012703500000000000000E-14 " " relative error = 4.589565013941293600000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6809999999999999 " " y[1] (analytic) = -0.31215144616247126 " " y[1] (numeric) = -0.3121514461624856 " " absolute error = 1.43218770176645200000000000000E-14 " " relative error = 4.588118105405203400000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6799999999999999 " " y[1] (analytic) = -0.3098322049822103 " " y[1] (numeric) = -0.3098322049822243 " " absolute error = 1.398881011027697200000000000000E-14 " " relative error = 4.514963223748857400000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6789999999999999 " " y[1] (analytic) = -0.3075143276645196 " " y[1] (numeric) = -0.3075143276645339 " " absolute error = 1.43218770176645200000000000000E-14 " " relative error = 4.6573039787885460000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6779999999999999 " " y[1] (analytic) = -0.3051978124888013 " " y[1] (numeric) = -0.30519781248881567 " " absolute error = 1.437738816889577700000000000000E-14 " " relative error = 4.710842470217026500000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6769999999999999 " " y[1] (analytic) = -0.30288265774346956 " " y[1] (numeric) = -0.3028826577434843 " " absolute error = 1.471045507628332400000000000000E-14 " " relative error = 4.856816559217642000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6759999999999999 " " y[1] (analytic) = -0.3005688617258838 " " y[1] (numeric) = -0.3005688617258986 " " absolute error = 1.476596622751458200000000000000E-14 " " relative error = 4.9126733031251310000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6749999999999999 " " y[1] (analytic) = -0.2982564227422788 " " y[1] (numeric) = -0.2982564227422934 " " absolute error = 1.45994327738208090000000000000E-14 " " relative error = 4.894926533212018000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6739999999999999 " " y[1] (analytic) = -0.2959453391076974 " " y[1] (numeric) = -0.2959453391077118 " " absolute error = 1.443289932012703500000000000000E-14 " " relative error = 4.876880089966466000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6729999999999999 " " y[1] (analytic) = -0.2936356091459237 " " y[1] (numeric) = -0.2936356091459382 " " absolute error = 1.45439216225895500000000000000E-14 " " relative error = 4.953051050208926000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6719999999999999 " " y[1] (analytic) = -0.2913272311894174 " " y[1] (numeric) = -0.29132723118943216 " " absolute error = 1.476596622751458200000000000000E-14 " " relative error = 5.068515623214753000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6709999999999999 " " y[1] (analytic) = -0.28902020357924774 " " y[1] (numeric) = -0.28902020357926284 " " absolute error = 1.50990331349021300000000000000E-14 " " relative error = 5.224213722056305000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6699999999999999 " " y[1] (analytic) = -0.28671452466502945 " " y[1] (numeric) = -0.2867145246650444 " " absolute error = 1.493249968120835500000000000000E-14 " " relative error = 5.20814203558543000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6689999999999999 " " y[1] (analytic) = -0.2844101928048567 " " y[1] (numeric) = -0.28441019280487184 " " absolute error = 1.515454428613338700000000000000E-14 " " relative error = 5.328411101120917000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6679999999999999 " " y[1] (analytic) = -0.28210720636524256 " " y[1] (numeric) = -0.2821072063652576 " " absolute error = 1.50435219836708700000000000000E-14 " " relative error = 5.332555016050923000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6669999999999999 " " y[1] (analytic) = -0.2798055637210535 " " y[1] (numeric) = -0.2798055637210688 " " absolute error = 1.53210777398271600000000000000E-14 " " relative error = 5.475615829820025000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6659999999999999 " " y[1] (analytic) = -0.2775052632554502 " " y[1] (numeric) = -0.27750526325546526 " " absolute error = 1.50435219836708700000000000000E-14 " " relative error = 5.420986184980192000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6649999999999999 " " y[1] (analytic) = -0.2752063033598232 " " y[1] (numeric) = -0.27520630335983814 " " absolute error = 1.493249968120835500000000000000E-14 " " relative error = 5.425929384213487000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6639999999999999 " " y[1] (analytic) = -0.272908682433734 " " y[1] (numeric) = -0.272908682433749 " " absolute error = 1.498801083243961300000000000000E-14 " " relative error = 5.491950896827517000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6629999999999999 " " y[1] (analytic) = -0.27061239888485467 " " y[1] (numeric) = -0.2706123988848698 " " absolute error = 1.515454428613338700000000000000E-14 " " relative error = 5.6000923640537380000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6619999999999999 " " y[1] (analytic) = -0.2683174511289086 " " y[1] (numeric) = -0.2683174511289236 " " absolute error = 1.498801083243961300000000000000E-14 " " relative error = 5.585924720654445000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6609999999999999 " " y[1] (analytic) = -0.26602383758961 " " y[1] (numeric) = -0.2660238375896253 " " absolute error = 1.526556658859590200000000000000E-14 " " relative error = 5.738420559192822000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6599999999999999 " " y[1] (analytic) = -0.2637315566986086 " " y[1] (numeric) = -0.26373155669862375 " " absolute error = 1.515454428613338700000000000000E-14 " " relative error = 5.746200597242878000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6589999999999999 " " y[1] (analytic) = -0.2614406068954288 " " y[1] (numeric) = -0.26144060689544396 " " absolute error = 1.515454428613338700000000000000E-14 " " relative error = 5.796553361044986000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6579999999999999 " " y[1] (analytic) = -0.25915098662741476 " " y[1] (numeric) = -0.2591509866274301 " " absolute error = 1.53210777398271600000000000000E-14 " " relative error = 5.9120275555248040000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6569999999999999 " " y[1] (analytic) = -0.25686269434967357 " " y[1] (numeric) = -0.25686269434968884 " " absolute error = 1.526556658859590200000000000000E-14 " " relative error = 5.943084349887924000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6559999999999999 " " y[1] (analytic) = -0.25457572852501853 " " y[1] (numeric) = -0.2545757285250338 " " absolute error = 1.526556658859590200000000000000E-14 " " relative error = 5.996473692540438000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6549999999999999 " " y[1] (analytic) = -0.2522900876239146 " " y[1] (numeric) = -0.25229008762393 " " absolute error = 1.543210004228967600000000000000E-14 " " relative error = 6.116807912522548000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6539999999999999 " " y[1] (analytic) = -0.25000577012442393 " " y[1] (numeric) = -0.25000577012443936 " " absolute error = 1.543210004228967600000000000000E-14 " " relative error = 6.172697547984338000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6529999999999999 " " y[1] (analytic) = -0.2477227745121512 " " y[1] (numeric) = -0.24772277451216623 " " absolute error = 1.50435219836708700000000000000E-14 " " relative error = 6.072724646854366000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6519999999999999 " " y[1] (analytic) = -0.24544109928018865 " " y[1] (numeric) = -0.24544109928020397 " " absolute error = 1.53210777398271600000000000000E-14 " " relative error = 6.242262516245110000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6509999999999999 " " y[1] (analytic) = -0.24316074292906653 " " y[1] (numeric) = -0.2431607429290818 " " absolute error = 1.526556658859590200000000000000E-14 " " relative error = 6.277973329374589000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6499999999999999 " " y[1] (analytic) = -0.24088170396669673 " " y[1] (numeric) = -0.2408817039667123 " " absolute error = 1.55708779203678200000000000000E-14 " " relative error = 6.464118139300685000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6489999999999999 " " y[1] (analytic) = -0.23860398090832402 " " y[1] (numeric) = -0.23860398090833937 " " absolute error = 1.53488333154427900000000000000E-14 " " relative error = 6.432764976096559000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6479999999999999 " " y[1] (analytic) = -0.23632757227647094 " " y[1] (numeric) = -0.23632757227648674 " " absolute error = 1.579292252529285200000000000000E-14 " " relative error = 6.6826406978942310000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6469999999999999 " " y[1] (analytic) = -0.23405247660089135 " " y[1] (numeric) = -0.23405247660090697 " " absolute error = 1.562638907159907800000000000000E-14 " " relative error = 6.676446794555972000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6459999999999999 " " y[1] (analytic) = -0.23177869241851567 " " y[1] (numeric) = -0.2317786924185311 " " absolute error = 1.543210004228967600000000000000E-14 " " relative error = 6.658118518687821000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6449999999999999 " " y[1] (analytic) = -0.22950621827340323 " " y[1] (numeric) = -0.22950621827341858 " " absolute error = 1.53488333154427900000000000000E-14 " " relative error = 6.687763595650479000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6439999999999999 " " y[1] (analytic) = -0.2272350527166921 " " y[1] (numeric) = -0.2272350527167078 " " absolute error = 1.570965579844596500000000000000E-14 " " relative error = 6.91339457122936000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6429999999999999 " " y[1] (analytic) = -0.2249651943065517 " " y[1] (numeric) = -0.22496519430656722 " " absolute error = 1.551536676913656300000000000000E-14 " " relative error = 6.896785441393369000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6419999999999999 " " y[1] (analytic) = -0.2226966416081314 " " y[1] (numeric) = -0.22269664160814687 " " absolute error = 1.545985561790530500000000000000E-14 " " relative error = 6.9421143966370490000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6409999999999999 " " y[1] (analytic) = -0.2204293931935144 " " y[1] (numeric) = -0.22042939319353025 " " absolute error = 1.58484336765241100000000000000E-14 " " relative error = 7.189800528376363000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6399999999999999 " " y[1] (analytic) = -0.21816344764167106 " " y[1] (numeric) = -0.21816344764168694 " " absolute error = 1.58761892521397390000000000000E-14 " " relative error = 7.277199468453601000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6389999999999999 " " y[1] (analytic) = -0.2158988035384094 " " y[1] (numeric) = -0.2158988035384254 " " absolute error = 1.598721155460225400000000000000E-14 " " relative error = 7.404956068576848000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6379999999999999 " " y[1] (analytic) = -0.21363545947633045 " " y[1] (numeric) = -0.2136354594763464 " " absolute error = 1.595945597898662500000000000000E-14 " " relative error = 7.470415266317172000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6369999999999999 " " y[1] (analytic) = -0.21137341405478127 " " y[1] (numeric) = -0.211373414054797 " " absolute error = 1.573741137406159400000000000000E-14 " " relative error = 7.445312573691485000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6359999999999999 " " y[1] (analytic) = -0.2091126658798088 " " y[1] (numeric) = -0.20911266587982472 " " absolute error = 1.590394482775536700000000000000E-14 " " relative error = 7.60544310448246100000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6349999999999999 " " y[1] (analytic) = -0.2068532135641168 " " y[1] (numeric) = -0.2068532135641323 " " absolute error = 1.551536676913656300000000000000E-14 " " relative error = 7.500665086030862000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6339999999999999 " " y[1] (analytic) = -0.20459505572701697 " " y[1] (numeric) = -0.20459505572703293 " " absolute error = 1.595945597898662500000000000000E-14 " " relative error = 7.80050911898902000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6329999999999999 " " y[1] (analytic) = -0.20233819099439032 " " y[1] (numeric) = -0.2023381909944058 " " absolute error = 1.548761119352093400000000000000E-14 " " relative error = 7.654319294546977000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6319999999999999 " " y[1] (analytic) = -0.20008261799863625 " " y[1] (numeric) = -0.2000826179986523 " " absolute error = 1.604272270583351200000000000000E-14 " " relative error = 8.018049177036887000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6309999999999999 " " y[1] (analytic) = -0.1978283353786363 " " y[1] (numeric) = -0.19782833537865227 " " absolute error = 1.595945597898662500000000000000E-14 " " relative error = 8.067325617657753000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6299999999999999 " " y[1] (analytic) = -0.19557534177970515 " " y[1] (numeric) = -0.1955753417797211 " " absolute error = 1.595945597898662500000000000000E-14 " " relative error = 8.160259792342972000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6289999999999999 " " y[1] (analytic) = -0.19332363585355083 " " y[1] (numeric) = -0.19332363585356688 " " absolute error = 1.604272270583351200000000000000E-14 " " relative error = 8.298376261651945000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6279999999999999 " " y[1] (analytic) = -0.19107321625823237 " " y[1] (numeric) = -0.19107321625824816 " " absolute error = 1.579292252529285200000000000000E-14 " " relative error = 8.265377447747031000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6269999999999999 " " y[1] (analytic) = -0.18882408165811637 " " y[1] (numeric) = -0.18882408165813208 " " absolute error = 1.570965579844596500000000000000E-14 " " relative error = 8.319731074815852000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6259999999999999 " " y[1] (analytic) = -0.1865762307238369 " " y[1] (numeric) = -0.18657623072385285 " " absolute error = 1.595945597898662500000000000000E-14 " " relative error = 8.553852715895635000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6249999999999999 " " y[1] (analytic) = -0.18432966213225488 " " y[1] (numeric) = -0.18432966213227067 " " absolute error = 1.579292252529285200000000000000E-14 " " relative error = 8.567759709753915000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6239999999999999 " " y[1] (analytic) = -0.1820843745664148 " " y[1] (numeric) = -0.182084374566431 " " absolute error = 1.620925615952728500000000000000E-14 " " relative error = 8.902057740058854000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6229999999999999 " " y[1] (analytic) = -0.1798403667155084 " " y[1] (numeric) = -0.17984036671552428 " " absolute error = 1.58761892521397390000000000000E-14 " " relative error = 8.827934207482167000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6219999999999999 " " y[1] (analytic) = -0.1775976372748297 " " y[1] (numeric) = -0.17759763727484587 " " absolute error = 1.618150058391165700000000000000E-14 " " relative error = 9.111326497475317000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6209999999999999 " " y[1] (analytic) = -0.1753561849457408 " " y[1] (numeric) = -0.17535618494575658 " " absolute error = 1.579292252529285200000000000000E-14 " " relative error = 9.006196462462697000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6199999999999999 " " y[1] (analytic) = -0.17311600843562736 " " y[1] (numeric) = -0.17311600843564345 " " absolute error = 1.60982338570647700000000000000E-14 " " relative error = 9.299101800311463000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6189999999999999 " " y[1] (analytic) = -0.1708771064578649 " " y[1] (numeric) = -0.1708771064578809 " " absolute error = 1.598721155460225400000000000000E-14 " " relative error = 9.355970431618000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6179999999999999 " " y[1] (analytic) = -0.16863947773177623 " " y[1] (numeric) = -0.16863947773179225 " " absolute error = 1.601496713021788300000000000000E-14 " " relative error = 9.496570640292152000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6169999999999999 " " y[1] (analytic) = -0.16640312098259546 " " y[1] (numeric) = -0.16640312098261154 " " absolute error = 1.60704782814491400000000000000E-14 " " relative error = 9.657558215587791000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6159999999999999 " " y[1] (analytic) = -0.16416803494142984 " " y[1] (numeric) = -0.16416803494144588 " " absolute error = 1.604272270583351200000000000000E-14 " " relative error = 9.772135429139459000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6149999999999999 " " y[1] (analytic) = -0.16193421834522193 " " y[1] (numeric) = -0.16193421834523797 " " absolute error = 1.604272270583351200000000000000E-14 " " relative error = 9.906938057793684000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6139999999999999 " " y[1] (analytic) = -0.15970166993671286 " " y[1] (numeric) = -0.159701669936729 " " absolute error = 1.6125989432680400000000000000E-14 " " relative error = 1.00975709515566500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6129999999999999 " " y[1] (analytic) = -0.15747038846440575 " " y[1] (numeric) = -0.15747038846442196 " " absolute error = 1.620925615952728500000000000000E-14 " " relative error = 1.029352649573934800000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6119999999999999 " " y[1] (analytic) = -0.1552403726825291 " " y[1] (numeric) = -0.15524037268254523 " " absolute error = 1.6125989432680400000000000000E-14 " " relative error = 1.038775490809887300000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6109999999999999 " " y[1] (analytic) = -0.15301162135100022 " " y[1] (numeric) = -0.15301162135101648 " " absolute error = 1.626476731075854300000000000000E-14 " " relative error = 1.062975947000003600000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6099999999999999 " " y[1] (analytic) = -0.15078413323539053 " " y[1] (numeric) = -0.150784133235407 " " absolute error = 1.645905634006794600000000000000E-14 " " relative error = 1.091564210829368800000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6089999999999999 " " y[1] (analytic) = -0.14855790710688976 " " y[1] (numeric) = -0.1485579071069062 " " absolute error = 1.643130076445231700000000000000E-14 " " relative error = 1.106053597849203400000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6079999999999999 " " y[1] (analytic) = -0.1463329417422704 " " y[1] (numeric) = -0.14633294174228664 " " absolute error = 1.623701173514291400000000000000E-14 " " relative error = 1.109593748463037600000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6069999999999999 " " y[1] (analytic) = -0.14410923592385294 " " y[1] (numeric) = -0.14410923592386918 " " absolute error = 1.623701173514291400000000000000E-14 " " relative error = 1.12671555234131700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6059999999999999 " " y[1] (analytic) = -0.1418867884394721 " " y[1] (numeric) = -0.14188678843948851 " " absolute error = 1.640354518883668800000000000000E-14 " " relative error = 1.156100956914274100000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6049999999999999 " " y[1] (analytic) = -0.1396655980824426 " " y[1] (numeric) = -0.13966559808245904 " " absolute error = 1.643130076445231700000000000000E-14 " " relative error = 1.176474449688974500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6039999999999999 " " y[1] (analytic) = -0.13744566365152477 " " y[1] (numeric) = -0.13744566365154104 " " absolute error = 1.626476731075854300000000000000E-14 " " relative error = 1.183359800422347400000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6029999999999999 " " y[1] (analytic) = -0.13522698395089083 " " y[1] (numeric) = -0.1352269839509071 " " absolute error = 1.626476731075854300000000000000E-14 " " relative error = 1.202775277208376800000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6019999999999999 " " y[1] (analytic) = -0.1330095577900925 " " y[1] (numeric) = -0.13300955779010892 " " absolute error = 1.643130076445231700000000000000E-14 " " relative error = 1.23534737183196910000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.6009999999999999 " " y[1] (analytic) = -0.13079338398402818 " " y[1] (numeric) = -0.13079338398404433 " " absolute error = 1.615374500829602800000000000000E-14 " " relative error = 1.23505826642337200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5999999999999999 " " y[1] (analytic) = -0.12857846135290818 " " y[1] (numeric) = -0.1285784613529247 " " absolute error = 1.651456749129920400000000000000E-14 " " relative error = 1.284396104723310700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5989999999999999 " " y[1] (analytic) = -0.12636478872222612 " " y[1] (numeric) = -0.12636478872224247 " " absolute error = 1.63480340376054300000000000000E-14 " " relative error = 1.293717514421009000000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5979999999999999 " " y[1] (analytic) = -0.12415236492272286 " " y[1] (numeric) = -0.12415236492273922 " " absolute error = 1.636191182541324500000000000000E-14 " " relative error = 1.317889662077522000000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5969999999999999 " " y[1] (analytic) = -0.12194118879035731 " " y[1] (numeric) = -0.12194118879037377 " " absolute error = 1.645905634006794600000000000000E-14 " " relative error = 1.349753639712709700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5959999999999999 " " y[1] (analytic) = -0.11973125916627447 " " y[1] (numeric) = -0.11973125916629075 " " absolute error = 1.627864509856635800000000000000E-14 " " relative error = 1.359598588699355800000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5949999999999999 " " y[1] (analytic) = -0.11752257489677254 " " y[1] (numeric) = -0.1175225748967893 " " absolute error = 1.676436767183986400000000000000E-14 " " relative error = 1.42648063034400500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5939999999999999 " " y[1] (analytic) = -0.1153151348332756 " " y[1] (numeric) = -0.11531513483329214 " " absolute error = 1.654232306691483200000000000000E-14 " " relative error = 1.43453182367015200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5929999999999999 " " y[1] (analytic) = -0.11310893783229847 " " y[1] (numeric) = -0.11310893783231493 " " absolute error = 1.645905634006794600000000000000E-14 " " relative error = 1.455150817919539400000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5919999999999999 " " y[1] (analytic) = -0.11090398275541946 " " y[1] (numeric) = -0.1109039827554358 " " absolute error = 1.633415624979761600000000000000E-14 " " relative error = 1.472819626849643200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5909999999999999 " " y[1] (analytic) = -0.1087002684692484 " " y[1] (numeric) = -0.10870026846926516 " " absolute error = 1.67504898840320500000000000000E-14 " " relative error = 1.54097962405408500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5899999999999999 " " y[1] (analytic) = -0.10649779384539937 " " y[1] (numeric) = -0.10649779384541593 " " absolute error = 1.655620085472264700000000000000E-14 " " relative error = 1.554605053956041600000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5889999999999999 " " y[1] (analytic) = -0.10429655776045732 " " y[1] (numeric) = -0.10429655776047377 " " absolute error = 1.64451785522601300000000000000E-14 " " relative error = 1.576770979348189600000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5879999999999999 " " y[1] (analytic) = -0.10209655909595128 " " y[1] (numeric) = -0.1020965590959678 " " absolute error = 1.652844527910701800000000000000E-14 " " relative error = 1.618903264269017700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5869999999999999 " " y[1] (analytic) = -9.989779673832500E-2 " " y[1] (numeric) = -9.98977967383414800E-2 " " absolute error = 1.648681191568357500000000000000E-14 " " relative error = 1.650367921413680400000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5859999999999999 " " y[1] (analytic) = -9.77002695789067600E-2 " " y[1] (numeric) = -9.77002695789236400E-2 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 1.72726135219853420000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5849999999999999 " " y[1] (analytic) = -9.55039765138834300E-2 " " y[1] (numeric) = -9.55039765138999600E-2 " " absolute error = 1.652844527910701800000000000000E-14 " " relative error = 1.730655191797618500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5839999999999999 " " y[1] (analytic) = -9.33089164442678600E-2 " " y[1] (numeric) = -9.33089164442845400E-2 " " absolute error = 1.668110094499297700000000000000E-14 " " relative error = 1.78772850234054200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5829999999999999 " " y[1] (analytic) = -9.11150882758752200E-2 " " y[1] (numeric) = -9.1115088275891810E-2 " " absolute error = 1.658395643033827600000000000000E-14 " " relative error = 1.82011088878341700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5819999999999999 " " y[1] (analytic) = -8.89224909192919400E-2 " " y[1] (numeric) = -8.89224909193085500E-2 " " absolute error = 1.661171200595390500000000000000E-14 " " relative error = 1.868111411884656700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5809999999999998 " " y[1] (analytic) = -8.67311232898496700E-2 " " y[1] (numeric) = -8.67311232898663400E-2 " " absolute error = 1.668110094499297700000000000000E-14 " " relative error = 1.923311991388125300000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5799999999999998 " " y[1] (analytic) = -8.45409843075972700E-2 " " y[1] (numeric) = -8.45409843076140800E-2 " " absolute error = 1.680600103526330700000000000000E-14 " " relative error = 1.98791168247056200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5789999999999998 " " y[1] (analytic) = -8.23520728972740900E-2 " " y[1] (numeric) = -8.23520728972907400E-2 " " absolute error = 1.665334536937734800000000000000E-14 " " relative error = 2.02221325869364800000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5779999999999998 " " y[1] (analytic) = -8.01643879882817400E-2 " " y[1] (numeric) = -8.01643879882985500E-2 " " absolute error = 1.680600103526330700000000000000E-14 " " relative error = 2.096442255346597800000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5769999999999998 " " y[1] (analytic) = -7.79779285146595700E-2 " " y[1] (numeric) = -7.79779285146761100E-2 " " absolute error = 1.654232306691483200000000000000E-14 " " relative error = 2.121410940507984200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5759999999999998 " " y[1] (analytic) = -7.57926934150552300E-2 " " y[1] (numeric) = -7.57926934150720100E-2 " " absolute error = 1.677824545964767800000000000000E-14 " " relative error = 2.213702232188373100000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5749999999999998 " " y[1] (analytic) = -7.36086816327017300E-2 " " y[1] (numeric) = -7.36086816327184800E-2 " " absolute error = 1.673661209622423500000000000000E-14 " " relative error = 2.27372800666881500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5739999999999998 " " y[1] (analytic) = -7.14258921153885200E-2 " " y[1] (numeric) = -7.14258921154052800E-2 " " absolute error = 1.67504898840320500000000000000E-14 " " relative error = 2.345156551488588300000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5729999999999998 " " y[1] (analytic) = -6.9244323815437100E-2 " " y[1] (numeric) = -6.92443238154539600E-2 " " absolute error = 1.68476343986867500000000000000E-14 " " relative error = 2.433070823767766500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5719999999999998 " " y[1] (analytic) = -6.70639756896754800E-2 " " y[1] (numeric) = -6.70639756896921600E-2 " " absolute error = 1.668110094499297700000000000000E-14 " " relative error = 2.487341493469054400000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5709999999999998 " " y[1] (analytic) = -6.48848466994111900E-2 " " y[1] (numeric) = -6.48848466994282200E-2 " " absolute error = 1.70280456401883380000000000000E-14 " " relative error = 2.624348596995739000000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5699999999999998 " " y[1] (analytic) = -6.2706935810409200E-2 " " y[1] (numeric) = -6.27069358104259500E-2 " " absolute error = 1.673661209622423500000000000000E-14 " " relative error = 2.669020879416978000000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5689999999999998 " " y[1] (analytic) = -6.05302419928627200E-2 " " y[1] (numeric) = -6.05302419928796300E-2 " " absolute error = 1.691008444382191600000000000000E-14 " " relative error = 2.793658820299418000000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5679999999999998 " " y[1] (analytic) = -5.83547642213723100E-2 " " y[1] (numeric) = -5.83547642213892800E-2 " " absolute error = 1.696559559505317300000000000000E-14 " " relative error = 2.907319705841525700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5669999999999998 " " y[1] (analytic) = -5.61805014749189300E-2 " " y[1] (numeric) = -5.61805014749359800E-2 " " absolute error = 1.70488623219000600000000000000E-14 " " relative error = 3.03465826653599900000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5659999999999998 " " y[1] (analytic) = -5.40074527368407100E-2 " " y[1] (numeric) = -5.400745273685756000E-2 " " absolute error = 1.685457329259065800000000000000E-14 " " relative error = 3.12078656527591700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5649999999999998 " " y[1] (analytic) = -5.18356169948075400E-2 " " y[1] (numeric) = -5.183561699482441000E-2 " " absolute error = 1.686151218649456500000000000000E-14 " " relative error = 3.2528815443990200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5639999999999998 " " y[1] (analytic) = -4.96649932407985400E-2 " " y[1] (numeric) = -4.96649932408154250E-2 " " absolute error = 1.688926776211019400000000000000E-14 " " relative error = 3.400638288668101000000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5629999999999998 " " y[1] (analytic) = -4.7495580471077603E-2 " " y[1] (numeric) = -4.749558047109432300E-2 " " absolute error = 1.67227343084164200000000000000E-14 " " relative error = 3.520903238270709500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5619999999999998 " " y[1] (analytic) = -4.532737768616923500E-2 " " y[1] (numeric) = -4.53273776861859700E-2 " " absolute error = 1.673661209622423500000000000000E-14 " " relative error = 3.69238481257456200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5609999999999998 " " y[1] (analytic) = -4.316038389083609600E-2 " " y[1] (numeric) = -4.31603838908530160E-2 " " absolute error = 1.691702333772582300000000000000E-14 " " relative error = 3.91957202709628360000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5599999999999998 " " y[1] (analytic) = -4.0994598094055700E-2 " " y[1] (numeric) = -4.09945980940726600E-2 " " absolute error = 1.695865670114926600000000000000E-14 " " relative error = 4.136802771487179000000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5589999999999998 " " y[1] (analytic) = -3.883001930899676600E-2 " " y[1] (numeric) = -3.88300193090136640E-2 " " absolute error = 1.6896206656014100000000000000E-14 " " relative error = 4.351325844460580700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5579999999999998 " " y[1] (analytic) = -3.666664655299678400E-2 " " y[1] (numeric) = -3.666664655301346600E-2 " " absolute error = 1.668110094499297700000000000000E-14 " " relative error = 4.54939366240723800000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5569999999999998 " " y[1] (analytic) = -3.45044788475387100E-2 " " y[1] (numeric) = -3.45044788475555800E-2 " " absolute error = 1.686845108039847200000000000000E-14 " " relative error = 4.888771441798414600000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5559999999999998 " " y[1] (analytic) = -3.23435152182303100E-2 " " y[1] (numeric) = -3.23435152182470800E-2 " " absolute error = 1.67713065657437700000000000000E-14 " " relative error = 5.185369138939692000000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5549999999999998 " " y[1] (analytic) = -3.018375469477929700E-2 " " y[1] (numeric) = -3.018375469479635000E-2 " " absolute error = 1.705580121580396700000000000000E-14 " " relative error = 5.65065592013773200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5539999999999998 " " y[1] (analytic) = -2.802519631097389000E-2 " " y[1] (numeric) = -2.80251963109909500E-2 " " absolute error = 1.706274010970787500000000000000E-14 " " relative error = 6.0883570342829600000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5529999999999998 " " y[1] (analytic) = -2.58678391046586200E-2 " " y[1] (numeric) = -2.58678391046756900E-2 " " absolute error = 1.706967900361178200000000000000E-14 " " relative error = 6.59880360881696200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5519999999999998 " " y[1] (analytic) = -2.371168211771379500E-2 " " y[1] (numeric) = -2.371168211773087600E-2 " " absolute error = 1.708008734446764300000000000000E-14 " " relative error = 7.20323731554581500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5509999999999998 " " y[1] (analytic) = -2.155672439603384400E-2 " " y[1] (numeric) = -2.155672439605072500E-2 " " absolute error = 1.688232886820628700000000000000E-14 " " relative error = 7.83158357366781400000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5499999999999998 " " y[1] (analytic) = -1.940296498950500E-2 " " y[1] (numeric) = -1.94029649895219600E-2 " " absolute error = 1.695865670114926600000000000000E-14 " " relative error = 8.74023980887567800000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5489999999999998 " " y[1] (analytic) = -1.725040295198543300E-2 " " y[1] (numeric) = -1.72504029520025530E-2 " " absolute error = 1.711825126093913200000000000000E-14 " " relative error = 9.92339211355576500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5479999999999998 " " y[1] (analytic) = -1.509903734128370500E-2 " " y[1] (numeric) = -1.509903734130066400E-2 " " absolute error = 1.695865670114926600000000000000E-14 " " relative error = 1.12316145180865270000000000E-10 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5469999999999998 " " y[1] (analytic) = -1.294886721913668400E-2 " " y[1] (numeric) = -1.294886721915374200E-2 " " absolute error = 1.705753593927994400000000000000E-14 " " relative error = 1.31729947111290160000000000E-10 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5459999999999998 " " y[1] (analytic) = -1.079989165119077400E-2 " " y[1] (numeric) = -1.079989165120776600E-2 " " absolute error = 1.699161644719282500000000000000E-14 " " relative error = 1.57331360313409860000000000E-10 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5449999999999998 " " y[1] (analytic) = -8.652109706979827000E-3 " " y[1] (numeric) = -8.652109706996683000E-3 " " absolute error = 1.685630801606663500000000000000E-14 " " relative error = 1.94823096180441640000000000E-10 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5439999999999998 " " y[1] (analytic) = -6.505520459904823000E-3 " " y[1] (numeric) = -6.505520459921985000E-3 " " absolute error = 1.716161934783855300000000000000E-14 " " relative error = 2.638008665657110000000000E-10 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5429999999999998 " " y[1] (analytic) = -4.360122987215442300E-3 " " y[1] (numeric) = -4.360122987232458000E-3 " " absolute error = 1.7015902575856500000000000000E-14 " " relative error = 3.90261986318958700000000000E-10 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5419999999999998 " " y[1] (analytic) = -2.215916369987081000E-3 " " y[1] (numeric) = -2.2159163700040846000E-3 " " absolute error = 1.700375951152466300000000000000E-14 " " relative error = 7.6734662651658640000000000E-10 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5409999999999998 " " y[1] (analytic) = -7.28996931027570100000E-5 " " y[1] (numeric) = -7.28996931201042500000E-5 " " absolute error = 1.73472347597680700000000000000E-14 " " relative error = 2.37960326325598900000000E-8 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5399999999999998 " " y[1] (analytic) = 2.0689279547660977000E-3 " " y[1] (numeric) = 2.068927954748769000E-3 " " absolute error = 1.73285864824013200000000000000E-14 " " relative error = 8.3756355278018380000000000E-10 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5389999999999998 " " y[1] (analytic) = 4.209567481181064600E-3 " " y[1] (numeric) = 4.209567481163976000E-3 " " absolute error = 1.708876096184752700000000000000E-14 " " relative error = 4.05950517202612660000000000E-10 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5379999999999998 " " y[1] (analytic) = 6.349019789955945000E-3 " " y[1] (numeric) = 6.349019789938588000E-3 " " absolute error = 1.735764310062393200000000000000E-14 " " relative error = 2.7339091190239260000000000E-10 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5369999999999998 " " y[1] (analytic) = 8.48728578117397000E-3 " " y[1] (numeric) = 8.487285781156633000E-3 " " absolute error = 1.73368264189122100000000000000E-14 " " relative error = 2.04268206183981730000000000E-10 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5359999999999998 " " y[1] (analytic) = 1.062436635120933600E-2 " " y[1] (numeric) = 1.062436635119227100E-2 " " absolute error = 1.70644748331838500000000000000E-14 " " relative error = 1.6061640072531440000000000E-10 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5349999999999998 " " y[1] (analytic) = 1.276026239274585800E-2 " " y[1] (numeric) = 1.276026239272882200E-2 " " absolute error = 1.703498453409224600000000000000E-14 " " relative error = 1.33500268331288720000000000E-10 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5339999999999998 " " y[1] (analytic) = 1.489497479479484600E-2 " " y[1] (numeric) = 1.489497479477764600E-2 " " absolute error = 1.719978326431004200000000000000E-14 " " relative error = 1.15473731921457350000000000E-10 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5329999999999998 " " y[1] (analytic) = 1.702850444271386500E-2 " " y[1] (numeric) = 1.70285044426968800E-2 " " absolute error = 1.698641227676489500000000000000E-14 " " relative error = 9.97528134893432700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5319999999999998 " " y[1] (analytic) = 1.916085221822716500E-2 " " y[1] (numeric) = 1.916085221821002300E-2 " " absolute error = 1.714253738960280800000000000000E-14 " " relative error = 8.94664662842898400000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5309999999999998 " " y[1] (analytic) = 2.129201899944155300E-2 " " y[1] (numeric) = 2.129201899942439500E-2 " " absolute error = 1.715988462436257600000000000000E-14 " " relative error = 8.05930364086780400000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5299999999999998 " " y[1] (analytic) = 2.342200566086671800E-2 " " y[1] (numeric) = 2.342200566084943200E-2 " " absolute error = 1.728478471463290600000000000000E-14 " " relative error = 7.37972015074361200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5289999999999998 " " y[1] (analytic) = 2.55508130734322100E-2 " " y[1] (numeric) = 2.555081307341487400E-2 " " absolute error = 1.73368264189122100000000000000E-14 " " relative error = 6.78523472778996600000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5279999999999998 " " y[1] (analytic) = 2.767844210450598500E-2 " " y[1] (numeric) = 2.767844210448876500E-2 " " absolute error = 1.72223346694977400000000000000E-14 " " relative error = 6.22229192108105900000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5269999999999998 " " y[1] (analytic) = 2.98048936179126100E-2 " " y[1] (numeric) = 2.980489361789536000E-2 " " absolute error = 1.724662079816141600000000000000E-14 " " relative error = 5.786506410409152000000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5259999999999998 " " y[1] (analytic) = 3.193016847394991600E-2 " " y[1] (numeric) = 3.1930168473932900E-2 " " absolute error = 1.701416785238052400000000000000E-14 " " relative error = 5.32855561543981700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5249999999999998 " " y[1] (analytic) = 3.40542675294083200E-2 " " y[1] (numeric) = 3.4054267529391197E-2 " " absolute error = 1.71251901548430400000000000000E-14 " " relative error = 5.028794156284290000000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5239999999999998 " " y[1] (analytic) = 3.61771916375862600E-2 " " y[1] (numeric) = 3.617719163756913400E-2 " " absolute error = 1.71251901548430400000000000000E-14 " " relative error = 4.73369805108112400000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5229999999999998 " " y[1] (analytic) = 3.82989416483093800E-2 " " y[1] (numeric) = 3.82989416482920400E-2 " " absolute error = 1.734029586586416400000000000000E-14 " " relative error = 4.527617505751522000000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5219999999999998 " " y[1] (analytic) = 4.04195184079461100E-2 " " y[1] (numeric) = 4.041951840792889500E-2 " " absolute error = 1.721539577559383400000000000000E-14 " " relative error = 4.259178845685960300000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5209999999999998 " " y[1] (analytic) = 4.25389227594267200E-2 " " y[1] (numeric) = 4.253892275940942500E-2 " " absolute error = 1.72986625024407200000000000000E-14 " " relative error = 4.06654926366401600000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5199999999999998 " " y[1] (analytic) = 4.46571555422583530E-2 " " y[1] (numeric) = 4.465715554224108000E-2 " " absolute error = 1.727784582072900000000000000E-14 " " relative error = 3.86899828502942800000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5189999999999998 " " y[1] (analytic) = 4.67742175925431900E-2 " " y[1] (numeric) = 4.67742175925258630E-2 " " absolute error = 1.73264180780563500000000000000E-14 " " relative error = 3.704266788380989000000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5179999999999998 " " y[1] (analytic) = 4.88901097429945700E-2 " " y[1] (numeric) = 4.889010974297705600E-2 " " absolute error = 1.751376821346184400000000000000E-14 " " relative error = 3.58227222346772900000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5169999999999998 " " y[1] (analytic) = 5.100483282295298000E-2 " " y[1] (numeric) = 5.10048328229357900E-2 " " absolute error = 1.719457909388211200000000000000E-14 " " relative error = 3.37116664092746100000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5159999999999998 " " y[1] (analytic) = 5.31183876584049300E-2 " " y[1] (numeric) = 5.31183876583875200E-2 " " absolute error = 1.740968480490323600000000000000E-14 " " relative error = 3.27752508544910600000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5149999999999998 " " y[1] (analytic) = 5.52307750719958100E-2 " " y[1] (numeric) = 5.52307750719783800E-2 " " absolute error = 1.743050148661495800000000000000E-14 " " relative error = 3.155940046811494500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5139999999999998 " " y[1] (analytic) = 5.73419958830488900E-2 " " y[1] (numeric) = 5.73419958830313700E-2 " " absolute error = 1.751376821346184400000000000000E-14 " " relative error = 3.05426554199156600000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5129999999999998 " " y[1] (analytic) = 5.94520509075799900E-2 " " y[1] (numeric) = 5.94520509075625100E-2 " " absolute error = 1.7472134850038400000000000000E-14 " " relative error = 2.93886158396778700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5119999999999998 " " y[1] (analytic) = 6.156094095831421000E-2 " " y[1] (numeric) = 6.15609409582967600E-2 " " absolute error = 1.74513181683266800000000000000E-14 " " relative error = 2.834803675295311500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5109999999999998 " " y[1] (analytic) = 6.3668666844701290E-2 " " y[1] (numeric) = 6.36686668446839200E-2 " " absolute error = 1.7374990335383700000000000000E-14 " " relative error = 2.72897033917236800000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5099999999999998 " " y[1] (analytic) = 6.57752293729316800E-2 " " y[1] (numeric) = 6.57752293729143700E-2 " " absolute error = 1.730560139634462800000000000000E-14 " " relative error = 2.63102106390621870000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5089999999999998 " " y[1] (analytic) = 6.78806293459519600E-2 " " y[1] (numeric) = 6.7880629345934700E-2 " " absolute error = 1.726396803292118400000000000000E-14 " " relative error = 2.543283437302238000000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5079999999999998 " " y[1] (analytic) = 6.99848675634806600E-2 " " y[1] (numeric) = 6.9984867563463200E-2 " " absolute error = 1.745825706223058700000000000000E-14 " " relative error = 2.49457599478842380000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5069999999999998 " " y[1] (analytic) = 7.20879448220227400E-2 " " y[1] (numeric) = 7.20879448220053300E-2 " " absolute error = 1.74027459109993300000000000000E-14 " " relative error = 2.41409932742080600000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5059999999999998 " " y[1] (analytic) = 7.41898619148864100E-2 " " y[1] (numeric) = 7.41898619148689600E-2 " " absolute error = 1.745825706223058700000000000000E-14 " " relative error = 2.353186353448049300000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5049999999999998 " " y[1] (analytic) = 7.62906196321969700E-2 " " y[1] (numeric) = 7.62906196321794800E-2 " " absolute error = 1.748601263784621600000000000000E-14 " " relative error = 2.292026558723424500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5039999999999998 " " y[1] (analytic) = 7.83902187609122300E-2 " " y[1] (numeric) = 7.83902187608950100E-2 " " absolute error = 1.72223346694977400000000000000E-14 " " relative error = 2.197000460226464500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5029999999999998 " " y[1] (analytic) = 8.04886600848390100E-2 " " y[1] (numeric) = 8.04886600848212600E-2 " " absolute error = 1.77496906061946900000000000000E-14 " " relative error = 2.20524115912547700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5019999999999998 " " y[1] (analytic) = 8.25859443846436200E-2 " " y[1] (numeric) = 8.25859443846264100E-2 " " absolute error = 1.720845688168992600000000000000E-14 " " relative error = 2.083702863715116700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.5009999999999998 " " y[1] (analytic) = 8.46820724378732900E-2 " " y[1] (numeric) = 8.4682072437855800E-2 " " absolute error = 1.748601263784621600000000000000E-14 " " relative error = 2.06490135803829880000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4999999999999998 " " y[1] (analytic) = 8.677704501896399E-2 " " y[1] (numeric) = 8.67770450189466600E-2 " " absolute error = 1.733335697196025600000000000000E-14 " " relative error = 1.997458771288222200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4989999999999998 " " y[1] (analytic) = 8.88708628992601600E-2 " " y[1] (numeric) = 8.88708628992425300E-2 " " absolute error = 1.76247905159243600000000000000E-14 " " relative error = 1.983191109093088700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4979999999999998 " " y[1] (analytic) = 9.09635268470251300E-2 " " y[1] (numeric) = 9.09635268470077700E-2 " " absolute error = 1.736111254757588500000000000000E-14 " " relative error = 1.908579531747087700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4969999999999998 " " y[1] (analytic) = 9.30550376274593700E-2 " " y[1] (numeric) = 9.30550376274418200E-2 " " absolute error = 1.755540157688528800000000000000E-14 " " relative error = 1.886561117428951500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4959999999999998 " " y[1] (analytic) = 9.51453960027109900E-2 " " y[1] (numeric) = 9.51453960026934300E-2 " " absolute error = 1.756927936469310200000000000000E-14 " " relative error = 1.846571679011404500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4949999999999998 " " y[1] (analytic) = 9.72346027318923300E-2 " " y[1] (numeric) = 9.72346027318747800E-2 " " absolute error = 1.755540157688528800000000000000E-14 " " relative error = 1.805468535238559700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4939999999999998 " " y[1] (analytic) = 9.9322658571092900E-2 " " y[1] (numeric) = 9.93226585710754700E-2 " " absolute error = 1.743050148661495800000000000000E-14 " " relative error = 1.754937064450263500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.49299999999999977 " " y[1] (analytic) = 0.10140956427339398 " " y[1] (numeric) = 0.10140956427337651 " " absolute error = 1.7472134850038400000000000000E-14 " " relative error = 1.722927711525768200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.49199999999999977 " " y[1] (analytic) = 0.10349532058888156 " " y[1] (numeric) = 0.103495320588864 " " absolute error = 1.755540157688528800000000000000E-14 " " relative error = 1.696250755782600400000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.49099999999999977 " " y[1] (analytic) = 0.10557992826466045 " " y[1] (numeric) = 0.10557992826464295 " " absolute error = 1.74998904256540300000000000000E-14 " " relative error = 1.657501640064247600000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.48999999999999977 " " y[1] (analytic) = 0.1076633880448683 " " y[1] (numeric) = 0.10766338804485086 " " absolute error = 1.744437927442277200000000000000E-14 " " relative error = 1.620270325057288000000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.48899999999999977 " " y[1] (analytic) = 0.10974570067068878 " " y[1] (numeric) = 0.10974570067067121 " " absolute error = 1.756927936469310200000000000000E-14 " " relative error = 1.60090821392746880000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.48799999999999977 " " y[1] (analytic) = 0.11182686688036436 " " y[1] (numeric) = 0.11182686688034695 " " absolute error = 1.741662369880714300000000000000E-14 " " relative error = 1.55746326304929500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.48699999999999977 " " y[1] (analytic) = 0.11390688740921129 " " y[1] (numeric) = 0.11390688740919375 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.539987983874884500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.48599999999999977 " " y[1] (analytic) = 0.1159857629896307 " " y[1] (numeric) = 0.11598576298961327 " " absolute error = 1.743050148661495800000000000000E-14 " " relative error = 1.502813883129196500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.48499999999999976 " " y[1] (analytic) = 0.11806349435112407 " " y[1] (numeric) = 0.11806349435110634 " " absolute error = 1.77219350305790600000000000000E-14 " " relative error = 1.50105120367465480000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.48399999999999976 " " y[1] (analytic) = 0.12014008222030348 " " y[1] (numeric) = 0.12014008222028592 " " absolute error = 1.755540157688528800000000000000E-14 " " relative error = 1.461244345138166800000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.48299999999999976 " " y[1] (analytic) = 0.1222155273209079 " " y[1] (numeric) = 0.12221552732089012 " " absolute error = 1.77774461818103200000000000000E-14 " " relative error = 1.454598001703263000000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.48199999999999976 " " y[1] (analytic) = 0.12428983037381258 " " y[1] (numeric) = 0.12428983037379504 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.411340230839466200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.48099999999999976 " " y[1] (analytic) = 0.12636299209704516 " " y[1] (numeric) = 0.12636299209702753 " " absolute error = 1.76247905159243600000000000000E-14 " " relative error = 1.394774706061783200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.47999999999999976 " " y[1] (analytic) = 0.12843501320579542 " " y[1] (numeric) = 0.1284350132057779 " " absolute error = 1.751376821346184400000000000000E-14 " " relative error = 1.363628793761946200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.47899999999999976 " " y[1] (analytic) = 0.13050589441243 " " y[1] (numeric) = 0.13050589441241253 " " absolute error = 1.745825706223058700000000000000E-14 " " relative error = 1.337737053244376600000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.47799999999999976 " " y[1] (analytic) = 0.13257563642650394 " " y[1] (numeric) = 0.13257563642648632 " " absolute error = 1.76247905159243600000000000000E-14 " " relative error = 1.329413985177814500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.47699999999999976 " " y[1] (analytic) = 0.13464423995477282 " " y[1] (numeric) = 0.1346442399547551 " " absolute error = 1.770805724277124700000000000000E-14 " " relative error = 1.315173768199769000000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.47599999999999976 " " y[1] (analytic) = 0.1367117057012055 " " y[1] (numeric) = 0.1367117057011881 " " absolute error = 1.74027459109993300000000000000E-14 " " relative error = 1.272952145665890400000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.47499999999999976 " " y[1] (analytic) = 0.13877803436699776 " " y[1] (numeric) = 0.13877803436698002 " " absolute error = 1.773581281838687600000000000000E-14 " " relative error = 1.277998560743742500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.47399999999999975 " " y[1] (analytic) = 0.1408432266505809 " " y[1] (numeric) = 0.1408432266505633 " " absolute error = 1.75970349403087300000000000000E-14 " " relative error = 1.249405836459949600000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.47299999999999975 " " y[1] (analytic) = 0.1429072832476378 " " y[1] (numeric) = 0.1429072832476202 " " absolute error = 1.75970349403087300000000000000E-14 " " relative error = 1.23136025963180600000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.47199999999999975 " " y[1] (analytic) = 0.14497020485111245 " " y[1] (numeric) = 0.14497020485109466 " " absolute error = 1.779132396961813400000000000000E-14 " " relative error = 1.227240037902285500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.47099999999999975 " " y[1] (analytic) = 0.14703199215122198 " " y[1] (numeric) = 0.1470319921512044 " " absolute error = 1.756927936469310200000000000000E-14 " " relative error = 1.194929015626962900000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.46999999999999975 " " y[1] (analytic) = 0.14909264583547033 " " y[1] (numeric) = 0.14909264583545268 " " absolute error = 1.76525460915399900000000000000E-14 " " relative error = 1.183998445571908300000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.46899999999999975 " " y[1] (analytic) = 0.1511521665886576 " " y[1] (numeric) = 0.15115216658863995 " " absolute error = 1.76525460915399900000000000000E-14 " " relative error = 1.16786589897710610000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.46799999999999975 " " y[1] (analytic) = 0.1532105550928935 " " y[1] (numeric) = 0.15321055509287565 " " absolute error = 1.78468351208493900000000000000E-14 " " relative error = 1.164856762644625200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.46699999999999975 " " y[1] (analytic) = 0.15526781202760742 " " y[1] (numeric) = 0.15526781202758974 " " absolute error = 1.768030166715561800000000000000E-14 " " relative error = 1.138697160491446100000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.46599999999999975 " " y[1] (analytic) = 0.15732393806956202 " " y[1] (numeric) = 0.15732393806954417 " " absolute error = 1.78468351208493900000000000000E-14 " " relative error = 1.134400482204956800000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.46499999999999975 " " y[1] (analytic) = 0.15937893389286206 " " y[1] (numeric) = 0.1593789338928444 " " absolute error = 1.76525460915399900000000000000E-14 " " relative error = 1.107583396398322500000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.46399999999999975 " " y[1] (analytic) = 0.16143280016896844 " " y[1] (numeric) = 0.16143280016895065 " " absolute error = 1.779132396961813400000000000000E-14 " " relative error = 1.102088544025521100000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.46299999999999975 " " y[1] (analytic) = 0.16348553756670714 " " y[1] (numeric) = 0.1634855375666892 " " absolute error = 1.793010184769627800000000000000E-14 " " relative error = 1.096739327194629900000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.46199999999999974 " " y[1] (analytic) = 0.16553714675228148 " " y[1] (numeric) = 0.1655371467522637 " " absolute error = 1.779132396961813400000000000000E-14 " " relative error = 1.074763237054098300000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.46099999999999974 " " y[1] (analytic) = 0.16758762838928387 " " y[1] (numeric) = 0.16758762838926605 " " absolute error = 1.781907954523376200000000000000E-14 " " relative error = 1.063269390258474200000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.45999999999999974 " " y[1] (analytic) = 0.16963698313870545 " " y[1] (numeric) = 0.16963698313868772 " " absolute error = 1.773581281838687600000000000000E-14 " " relative error = 1.045515694174129600000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.45899999999999974 " " y[1] (analytic) = 0.17168521165894823 " " y[1] (numeric) = 0.1716852116589305 " " absolute error = 1.773581281838687600000000000000E-14 " " relative error = 1.033042546123248700000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.45799999999999974 " " y[1] (analytic) = 0.17373231460583516 " " y[1] (numeric) = 0.1737323146058175 " " absolute error = 1.76525460915399900000000000000E-14 " " relative error = 1.01607729866433800000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.45699999999999974 " " y[1] (analytic) = 0.1757782926326219 " " y[1] (numeric) = 0.17577829263260394 " " absolute error = 1.795785742331190700000000000000E-14 " " relative error = 1.02161974350518800000000000E-11 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.45599999999999974 " " y[1] (analytic) = 0.17782314639000552 " " y[1] (numeric) = 0.17782314638998792 " " absolute error = 1.75970349403087300000000000000E-14 " " relative error = 9.895806759438696000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.45499999999999974 " " y[1] (analytic) = 0.17986687652613875 " " y[1] (numeric) = 0.17986687652612104 " " absolute error = 1.770805724277124700000000000000E-14 " " relative error = 9.845090760887185000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.45399999999999974 " " y[1] (analytic) = 0.18190948368663695 " " y[1] (numeric) = 0.18190948368661908 " " absolute error = 1.78745906964650200000000000000E-14 " " relative error = 9.826090610677758000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.45299999999999974 " " y[1] (analytic) = 0.18395096851459003 " " y[1] (numeric) = 0.18395096851457246 " " absolute error = 1.756927936469310200000000000000E-14 " " relative error = 9.551066518738985000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.45199999999999974 " " y[1] (analytic) = 0.1859913316505747 " " y[1] (numeric) = 0.18599133165055676 " " absolute error = 1.793010184769627800000000000000E-14 " " relative error = 9.6402889793713000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.45099999999999973 " " y[1] (analytic) = 0.18803057373266097 " " y[1] (numeric) = 0.18803057373264306 " " absolute error = 1.79023462720806500000000000000E-14 " " relative error = 9.520976252263069000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.44999999999999973 " " y[1] (analytic) = 0.190068695396426 " " y[1] (numeric) = 0.1900686953964083 " " absolute error = 1.770805724277124700000000000000E-14 " " relative error = 9.316661644800359000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.44899999999999973 " " y[1] (analytic) = 0.1921056972749633 " " y[1] (numeric) = 0.19210569727494547 " " absolute error = 1.781907954523376200000000000000E-14 " " relative error = 9.27566428169440900000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.44799999999999973 " " y[1] (analytic) = 0.19414157999889192 " " y[1] (numeric) = 0.19414157999887388 " " absolute error = 1.804112415015879400000000000000E-14 " " relative error = 9.29276672738615000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.44699999999999973 " " y[1] (analytic) = 0.1961763441963672 " " y[1] (numeric) = 0.19617634419634922 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 9.168084496938338000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.44599999999999973 " " y[1] (analytic) = 0.19820999049309151 " " y[1] (numeric) = 0.19820999049307358 " " absolute error = 1.793010184769627800000000000000E-14 " " relative error = 9.04601317173324900000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.44499999999999973 " " y[1] (analytic) = 0.2002425195123233 " " y[1] (numeric) = 0.2002425195123055 " " absolute error = 1.779132396961813400000000000000E-14 " " relative error = 8.88488819105336100000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.44399999999999973 " " y[1] (analytic) = 0.20227393187488762 " " y[1] (numeric) = 0.20227393187486986 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 8.781936569557461000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4429999999999997 " " y[1] (analytic) = 0.2043042281991856 " " y[1] (numeric) = 0.2043042281991677 " " absolute error = 1.79023462720806500000000000000E-14 " " relative error = 8.762592154787334000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4419999999999997 " " y[1] (analytic) = 0.2063334091012039 " " y[1] (numeric) = 0.20633340910118597 " " absolute error = 1.793010184769627800000000000000E-14 " " relative error = 8.689868463764776000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4409999999999997 " " y[1] (analytic) = 0.2083614751945253 " " y[1] (numeric) = 0.20836147519450737 " " absolute error = 1.793010184769627800000000000000E-14 " " relative error = 8.605286476761992000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4399999999999997 " " y[1] (analytic) = 0.2103884270903379 " " y[1] (numeric) = 0.21038842709031993 " " absolute error = 1.795785742331190700000000000000E-14 " " relative error = 8.53557283148519000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4389999999999997 " " y[1] (analytic) = 0.21241426539744457 " " y[1] (numeric) = 0.21241426539742655 " " absolute error = 1.801336857454316500000000000000E-14 " " relative error = 8.48030076550587000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4379999999999997 " " y[1] (analytic) = 0.21443899072227246 " " y[1] (numeric) = 0.2144389907222546 " " absolute error = 1.78468351208493900000000000000E-14 " " relative error = 8.322570004987321000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4369999999999997 " " y[1] (analytic) = 0.21646260366888315 " " y[1] (numeric) = 0.2164626036688654 " " absolute error = 1.773581281838687600000000000000E-14 " " relative error = 8.19347661802907100000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4359999999999997 " " y[1] (analytic) = 0.21848510483898154 " " y[1] (numeric) = 0.21848510483896355 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 8.231963003694241000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4349999999999997 " " y[1] (analytic) = 0.2205064948319242 " " y[1] (numeric) = 0.22050649483190626 " " absolute error = 1.793010184769627800000000000000E-14 " " relative error = 8.131325955438669000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4339999999999997 " " y[1] (analytic) = 0.22252677424473066 " " y[1] (numeric) = 0.22252677424471273 " " absolute error = 1.793010184769627800000000000000E-14 " " relative error = 8.05750315149812000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4329999999999997 " " y[1] (analytic) = 0.22454594367209113 " " y[1] (numeric) = 0.22454594367207328 " " absolute error = 1.78468351208493900000000000000E-14 " " relative error = 7.947965939171663000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4319999999999997 " " y[1] (analytic) = 0.2265640037063763 " " y[1] (numeric) = 0.22656400370635854 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 7.840419529760708000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4309999999999997 " " y[1] (analytic) = 0.2285809549376464 " " y[1] (numeric) = 0.22858095493762853 " " absolute error = 1.78745906964650200000000000000E-14 " " relative error = 7.8198075169215000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4299999999999997 " " y[1] (analytic) = 0.23059679795365962 " " y[1] (numeric) = 0.23059679795364174 " " absolute error = 1.78745906964650200000000000000E-14 " " relative error = 7.751447919089090000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4289999999999997 " " y[1] (analytic) = 0.23261153333988183 " " y[1] (numeric) = 0.23261153333986406 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 7.636581101095772000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4279999999999997 " " y[1] (analytic) = 0.23462516167949576 " " y[1] (numeric) = 0.2346251616794777 " " absolute error = 1.806887972577442300000000000000E-14 " " relative error = 7.701168790437316000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4269999999999997 " " y[1] (analytic) = 0.23663768355340808 " " y[1] (numeric) = 0.2366376835533901 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 7.600485573071569000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4259999999999997 " " y[1] (analytic) = 0.2386490995402608 " " y[1] (numeric) = 0.2386490995402427 " " absolute error = 1.81243908770056800000000000000E-14 " " relative error = 7.594577524876871000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4249999999999997 " " y[1] (analytic) = 0.24065941021643755 " " y[1] (numeric) = 0.24065941021641965 " " absolute error = 1.79023462720806500000000000000E-14 " " relative error = 7.43887232831666000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4239999999999997 " " y[1] (analytic) = 0.2426686161560747 " " y[1] (numeric) = 0.24266861615605664 " " absolute error = 1.806887972577442300000000000000E-14 " " relative error = 7.445907102446755000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4229999999999997 " " y[1] (analytic) = 0.24467671793106716 " " y[1] (numeric) = 0.24467671793104934 " " absolute error = 1.781907954523376200000000000000E-14 " " relative error = 7.282703354821826000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4219999999999997 " " y[1] (analytic) = 0.2466837161110801 " " y[1] (numeric) = 0.2466837161110621 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 7.290960782684469000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4209999999999997 " " y[1] (analytic) = 0.2486896112635546 " " y[1] (numeric) = 0.2486896112635365 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 7.276795845811075000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4199999999999997 " " y[1] (analytic) = 0.25069440395371767 " " y[1] (numeric) = 0.25069440395369974 " " absolute error = 1.793010184769627800000000000000E-14 " " relative error = 7.152174745394984000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4189999999999997 " " y[1] (analytic) = 0.25269809474459104 " " y[1] (numeric) = 0.252698094744573 " " absolute error = 1.804112415015879400000000000000E-14 " " relative error = 7.139398565071675000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4179999999999997 " " y[1] (analytic) = 0.254700684196998 " " y[1] (numeric) = 0.25470068419698 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 7.061470233435487000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4169999999999997 " " y[1] (analytic) = 0.2567021728695731 " " y[1] (numeric) = 0.25670217286955516 " " absolute error = 1.793010184769627800000000000000E-14 " " relative error = 6.984787720050317000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4159999999999997 " " y[1] (analytic) = 0.2587025613187697 " " y[1] (numeric) = 0.25870256131875186 " " absolute error = 1.781907954523376200000000000000E-14 " " relative error = 6.887863596865337000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4149999999999997 " " y[1] (analytic) = 0.2607018500988687 " " y[1] (numeric) = 0.2607018500988506 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 6.941506281803169000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4139999999999997 " " y[1] (analytic) = 0.2627000397619853 " " y[1] (numeric) = 0.2627000397619673 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 6.846444718936122000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4129999999999997 " " y[1] (analytic) = 0.26469713085807933 " " y[1] (numeric) = 0.2646971308580613 " " absolute error = 1.804112415015879400000000000000E-14 " " relative error = 6.815761127320933000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4119999999999997 " " y[1] (analytic) = 0.2666931239349615 " " y[1] (numeric) = 0.26669312393494327 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 6.827194243033005000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4109999999999997 " " y[1] (analytic) = 0.2686880195383017 " " y[1] (numeric) = 0.2686880195382835 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 6.776505195557129000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4099999999999997 " " y[1] (analytic) = 0.2706818182116375 " " y[1] (numeric) = 0.2706818182116196 " " absolute error = 1.793010184769627800000000000000E-14 " " relative error = 6.62405105971221900000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4089999999999997 " " y[1] (analytic) = 0.2726745204963825 " " y[1] (numeric) = 0.2726745204963644 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 6.636716649742905000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4079999999999997 " " y[1] (analytic) = 0.2746661269318321 " " y[1] (numeric) = 0.274666126931814 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 6.588593760555468000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4069999999999997 " " y[1] (analytic) = 0.2766566380551734 " " y[1] (numeric) = 0.27665663805515534 " " absolute error = 1.804112415015879400000000000000E-14 " " relative error = 6.521124624727374000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4059999999999997 " " y[1] (analytic) = 0.2786460544014919 " " y[1] (numeric) = 0.27864605440147394 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 6.45464477778417000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4049999999999997 " " y[1] (analytic) = 0.28063437650377987 " " y[1] (numeric) = 0.28063437650376183 " " absolute error = 1.804112415015879400000000000000E-14 " " relative error = 6.428693581634607000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4039999999999997 " " y[1] (analytic) = 0.2826216048929431 " " y[1] (numeric) = 0.28262160489292487 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 6.442415331534763000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4029999999999997 " " y[1] (analytic) = 0.28460774009780887 " " y[1] (numeric) = 0.28460774009779055 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 6.436465817837438000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4019999999999997 " " y[1] (analytic) = 0.28659278264513377 " " y[1] (numeric) = 0.28659278264511556 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 6.353145894255731000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.4009999999999997 " " y[1] (analytic) = 0.2885767330596113 " " y[1] (numeric) = 0.28857673305959314 " " absolute error = 1.81521464526213100000000000000E-14 " " relative error = 6.290232154257434000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3999999999999997 " " y[1] (analytic) = 0.2905595918638787 " " y[1] (numeric) = 0.2905595918638606 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 6.2282009639757340000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3989999999999997 " " y[1] (analytic) = 0.292541359578525 " " y[1] (numeric) = 0.2925413595785068 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 6.223960136811083000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3979999999999997 " " y[1] (analytic) = 0.29452203672209754 " " y[1] (numeric) = 0.2945220367220794 " " absolute error = 1.81521464526213100000000000000E-14 " " relative error = 6.163255780330334000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3969999999999997 " " y[1] (analytic) = 0.29650162381111034 " " y[1] (numeric) = 0.2965016238110922 " " absolute error = 1.81521464526213100000000000000E-14 " " relative error = 6.122106927881561000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3959999999999997 " " y[1] (analytic) = 0.29848012136005064 " " y[1] (numeric) = 0.2984801213600324 " " absolute error = 1.826316875508382500000000000000E-14 " " relative error = 6.11872196776995000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3949999999999997 " " y[1] (analytic) = 0.30045752988138585 " " y[1] (numeric) = 0.3004575298813678 " " absolute error = 1.804112415015879400000000000000E-14 " " relative error = 6.0045505124404910000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3939999999999997 " " y[1] (analytic) = 0.3024338498855724 " " y[1] (numeric) = 0.3024338498855542 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 6.020376889273982000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3929999999999997 " " y[1] (analytic) = 0.3044090818810602 " " y[1] (numeric) = 0.30440908188104215 " " absolute error = 1.804112415015879400000000000000E-14 " " relative error = 5.92660509294788000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3919999999999997 " " y[1] (analytic) = 0.3063832263743024 " " y[1] (numeric) = 0.3063832263742842 " " absolute error = 1.81521464526213100000000000000E-14 " " relative error = 5.924654122691818000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3909999999999997 " " y[1] (analytic) = 0.3083562838697602 " " y[1] (numeric) = 0.3083562838697421 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 5.8687421817009210000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3899999999999997 " " y[1] (analytic) = 0.31032825486991167 " " y[1] (numeric) = 0.3103282548698936 " " absolute error = 1.804112415015879400000000000000E-14 " " relative error = 5.81356156490538000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3889999999999997 " " y[1] (analytic) = 0.3122991398752576 " " y[1] (numeric) = 0.31229913987523944 " " absolute error = 1.81521464526213100000000000000E-14 " " relative error = 5.81242281354725000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3879999999999997 " " y[1] (analytic) = 0.31426893938432854 " " y[1] (numeric) = 0.3142689393843103 " " absolute error = 1.826316875508382500000000000000E-14 " " relative error = 5.8113184175510490000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3869999999999997 " " y[1] (analytic) = 0.31623765389369174 " " y[1] (numeric) = 0.31623765389367353 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 5.757586859018805000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3859999999999997 " " y[1] (analytic) = 0.31820528389795844 " " y[1] (numeric) = 0.3182052838979403 " " absolute error = 1.81521464526213100000000000000E-14 " " relative error = 5.704539607344268000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3849999999999997 " " y[1] (analytic) = 0.3201718298897903 " " y[1] (numeric) = 0.320171829889772 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 5.721515197830098000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3839999999999997 " " y[1] (analytic) = 0.3221372923599055 " " y[1] (numeric) = 0.32213729235988725 " " absolute error = 1.826316875508382500000000000000E-14 " " relative error = 5.669374266261428000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3829999999999997 " " y[1] (analytic) = 0.3241016717970867 " " y[1] (numeric) = 0.32410167179706845 " " absolute error = 1.826316875508382500000000000000E-14 " " relative error = 5.63501220275038000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3819999999999997 " " y[1] (analytic) = 0.3260649686881869 " " y[1] (numeric) = 0.3260649686881685 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 5.6521564652968780000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3809999999999997 " " y[1] (analytic) = 0.32802718351813565 " " y[1] (numeric) = 0.32802718351811727 " " absolute error = 1.83741910575463400000000000000E-14 " " relative error = 5.601423290740929000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.37999999999999967 " " y[1] (analytic) = 0.32998831676994667 " " y[1] (numeric) = 0.32998831676992846 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 5.517667347158277000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.37899999999999967 " " y[1] (analytic) = 0.3319483689247241 " " y[1] (numeric) = 0.33194836892470586 " " absolute error = 1.826316875508382500000000000000E-14 " " relative error = 5.501810059872703000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.37799999999999967 " " y[1] (analytic) = 0.33390734046166837 " " y[1] (numeric) = 0.33390734046165005 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 5.4861566927481230000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.37699999999999967 " " y[1] (analytic) = 0.33586523185808304 " " y[1] (numeric) = 0.3358652318580646 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 5.487231323951064000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.37599999999999967 " " y[1] (analytic) = 0.33782204358938106 " " y[1] (numeric) = 0.33782204358936274 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 5.42258276330281000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.37499999999999967 " " y[1] (analytic) = 0.339777776129092 " " y[1] (numeric) = 0.3397777761290736 " " absolute error = 1.83741910575463400000000000000E-14 " " relative error = 5.407708316557296000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.37399999999999967 " " y[1] (analytic) = 0.3417324299488669 " " y[1] (numeric) = 0.3417324299488486 " " absolute error = 1.826316875508382500000000000000E-14 " " relative error = 5.344289026890578000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.37299999999999967 " " y[1] (analytic) = 0.34368600551848605 " " y[1] (numeric) = 0.3436860055184676 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 5.362366204284192000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.37199999999999966 " " y[1] (analytic) = 0.3456385033058639 " " y[1] (numeric) = 0.3456385033058454 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 5.348134881735338000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.37099999999999966 " " y[1] (analytic) = 0.347589923777056 " " y[1] (numeric) = 0.3475899237770377 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 5.2701987754008300000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.36999999999999966 " " y[1] (analytic) = 0.34954026739626587 " " y[1] (numeric) = 0.34954026739624744 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 5.272554817807089000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.36899999999999966 " " y[1] (analytic) = 0.3514895346258493 " " y[1] (numeric) = 0.35148953462583093 " " absolute error = 1.83741910575463400000000000000E-14 " " relative error = 5.227521518415946000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.36799999999999966 " " y[1] (analytic) = 0.35343772592632217 " " y[1] (numeric) = 0.35343772592630396 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 5.151588601961565000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.36699999999999966 " " y[1] (analytic) = 0.3553848417563662 " " y[1] (numeric) = 0.35538484175634766 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 5.21708366052109000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.36599999999999966 " " y[1] (analytic) = 0.3573308825728332 " " y[1] (numeric) = 0.35733088257281487 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 5.126531402608692000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.36499999999999966 " " y[1] (analytic) = 0.35927584883075414 " " y[1] (numeric) = 0.3592758488307358 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 5.098778547439896000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.36399999999999966 " " y[1] (analytic) = 0.36121974098334275 " " y[1] (numeric) = 0.3612197409833243 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 5.102075030176013000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.36299999999999966 " " y[1] (analytic) = 0.3631625594820018 " " y[1] (numeric) = 0.3631625594819835 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 5.044209384481703000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.36199999999999966 " " y[1] (analytic) = 0.36510430477633016 " " y[1] (numeric) = 0.36510430477631184 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 5.017382612768002000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.36099999999999965 " " y[1] (analytic) = 0.3670449773141272 " " y[1] (numeric) = 0.36704497731410884 " " absolute error = 1.83741910575463400000000000000E-14 " " relative error = 5.005978066230614000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.35999999999999965 " " y[1] (analytic) = 0.36898457754139935 " " y[1] (numeric) = 0.3689845775413811 " " absolute error = 1.826316875508382500000000000000E-14 " " relative error = 4.949575095190729000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.35899999999999965 " " y[1] (analytic) = 0.3709231059023659 " " y[1] (numeric) = 0.3709231059023477 " " absolute error = 1.81521464526213100000000000000E-14 " " relative error = 4.893776139521301000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.35799999999999965 " " y[1] (analytic) = 0.3728605628394649 " " y[1] (numeric) = 0.3728605628394464 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 4.9576745846322356000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.35699999999999965 " " y[1] (analytic) = 0.37479694879335734 " " y[1] (numeric) = 0.3747969487933389 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 4.91724979835381000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.35599999999999965 " " y[1] (analytic) = 0.37673226420293515 " " y[1] (numeric) = 0.3767322642029169 " " absolute error = 1.826316875508382500000000000000E-14 " " relative error = 4.847784618002870500000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.35499999999999965 " " y[1] (analytic) = 0.37866650950532554 " " y[1] (numeric) = 0.3786665095053074 " " absolute error = 1.81521464526213100000000000000E-14 " " relative error = 4.7937026372716546000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.35399999999999965 " " y[1] (analytic) = 0.3805996851358969 " " y[1] (numeric) = 0.38059968513587855 " " absolute error = 1.83741910575463400000000000000E-14 " " relative error = 4.827694760437243000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.35299999999999965 " " y[1] (analytic) = 0.38253179152826355 " " y[1] (numeric) = 0.3825317915282451 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 4.817822365861037000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.35199999999999965 " " y[1] (analytic) = 0.3844628291142922 " " y[1] (numeric) = 0.38446282911427404 " " absolute error = 1.81521464526213100000000000000E-14 " " relative error = 4.721430806312118500000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.35099999999999965 " " y[1] (analytic) = 0.3863927983241081 " " y[1] (numeric) = 0.38639279832408985 " " absolute error = 1.826316875508382500000000000000E-14 " " relative error = 4.726581042477037000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.34999999999999964 " " y[1] (analytic) = 0.38832169958609863 " " y[1] (numeric) = 0.3883216995860802 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 4.745988243361447500000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.34899999999999964 " " y[1] (analytic) = 0.3902495333269197 " " y[1] (numeric) = 0.3902495333269014 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 4.6940939942057950000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.34799999999999964 " " y[1] (analytic) = 0.39217629997150194 " " y[1] (numeric) = 0.3921762999714835 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 4.699341140736148000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.34699999999999964 " " y[1] (analytic) = 0.3941019999430545 " " y[1] (numeric) = 0.39410199994303613 " " absolute error = 1.83741910575463400000000000000E-14 " " relative error = 4.662293279455903500000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.34599999999999964 " " y[1] (analytic) = 0.3960266336630719 " " y[1] (numeric) = 0.3960266336630534 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 4.667669239573302000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.34499999999999964 " " y[1] (analytic) = 0.39795020155133776 " " y[1] (numeric) = 0.39795020155131944 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 4.603259361322844500000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.34399999999999964 " " y[1] (analytic) = 0.3998727040259318 " " y[1] (numeric) = 0.3998727040259135 " " absolute error = 1.826316875508382500000000000000E-14 " " relative error = 4.567245668736483000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.34299999999999964 " " y[1] (analytic) = 0.4017941415032338 " " y[1] (numeric) = 0.40179414150321546 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 4.559220260847841600000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.34199999999999964 " " y[1] (analytic) = 0.40371451439792905 " " y[1] (numeric) = 0.4037145143979108 " " absolute error = 1.826316875508382500000000000000E-14 " " relative error = 4.5237830456307000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.34099999999999964 " " y[1] (analytic) = 0.4056338231230141 " " y[1] (numeric) = 0.4056338231229958 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 4.516063223051222000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.33999999999999964 " " y[1] (analytic) = 0.40755206808980116 " " y[1] (numeric) = 0.4075520680897827 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 4.522048506625844000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.33899999999999963 " " y[1] (analytic) = 0.4094692497079233 " " y[1] (numeric) = 0.40946924970790505 " " absolute error = 1.826316875508382500000000000000E-14 " " relative error = 4.460205196876455000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.33799999999999963 " " y[1] (analytic) = 0.41138536838534057 " " y[1] (numeric) = 0.4113853683853223 " " absolute error = 1.826316875508382500000000000000E-14 " " relative error = 4.439430801043196000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.33699999999999963 " " y[1] (analytic) = 0.4133004245283438 " " y[1] (numeric) = 0.4133004245283253 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 4.472585137337829000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.33599999999999963 " " y[1] (analytic) = 0.4152144185415597 " " y[1] (numeric) = 0.41521441854154123 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 4.451968075901157600000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.33499999999999963 " " y[1] (analytic) = 0.4171273508279568 " " y[1] (numeric) = 0.4171273508279383 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 4.4448594594525150000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.33399999999999963 " " y[1] (analytic) = 0.41903922178884934 " " y[1] (numeric) = 0.419039221788831 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 4.3715907613883753000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.33299999999999963 " " y[1] (analytic) = 0.42095003182390356 " " y[1] (numeric) = 0.4209500318238851 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 4.39130822247848000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.33199999999999963 " " y[1] (analytic) = 0.42285978133114044 " " y[1] (numeric) = 0.4228597813311222 " " absolute error = 1.826316875508382500000000000000E-14 " " relative error = 4.318965662232603000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.33099999999999963 " " y[1] (analytic) = 0.42476847070694346 " " y[1] (numeric) = 0.4247684707069249 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 4.364901302675015500000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3299999999999996 " " y[1] (analytic) = 0.42667610034605996 " " y[1] (numeric) = 0.42667610034604164 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 4.293345676370795600000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3289999999999996 " " y[1] (analytic) = 0.4285826706416096 " " y[1] (numeric) = 0.4285826706415912 " " absolute error = 1.83741910575463400000000000000E-14 " " relative error = 4.287198787118308000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3279999999999996 " " y[1] (analytic) = 0.4304881819850863 " " y[1] (numeric) = 0.43048818198506794 " " absolute error = 1.83741910575463400000000000000E-14 " " relative error = 4.268221945796154000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3269999999999996 " " y[1] (analytic) = 0.43239263476636447 " " y[1] (numeric) = 0.43239263476634615 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 4.236584630127488400000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3259999999999996 " " y[1] (analytic) = 0.4342960293737036 " " y[1] (numeric) = 0.43429602937368506 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 4.269144375549003000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3249999999999996 " " y[1] (analytic) = 0.43619836619375163 " " y[1] (numeric) = 0.4361983661937333 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 4.199621393854155000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3239999999999996 " " y[1] (analytic) = 0.43809964561155246 " " y[1] (numeric) = 0.43809964561153386 " " absolute error = 1.859623566247137200000000000000E-14 " " relative error = 4.244750218072534000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3229999999999996 " " y[1] (analytic) = 0.4399998680105468 " " y[1] (numeric) = 0.4399998680105284 " " absolute error = 1.83741910575463400000000000000E-14 " " relative error = 4.175953765764745500000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3219999999999996 " " y[1] (analytic) = 0.4418990337725808 " " y[1] (numeric) = 0.4418990337725622 " " absolute error = 1.859623566247137200000000000000E-14 " " relative error = 4.208254429459049000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3209999999999996 " " y[1] (analytic) = 0.44379714327790687 " " y[1] (numeric) = 0.4437971432778884 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 4.165239375692279500000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3199999999999996 " " y[1] (analytic) = 0.4456941969051913 " " y[1] (numeric) = 0.4456941969051728 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 4.147510442892542000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3189999999999996 " " y[1] (analytic) = 0.447590195031517 " " y[1] (numeric) = 0.4475901950314984 " " absolute error = 1.859623566247137200000000000000E-14 " " relative error = 4.154745986149656600000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3179999999999996 " " y[1] (analytic) = 0.4494851380323882 " " y[1] (numeric) = 0.4494851380323697 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 4.112530492315606400000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3169999999999996 " " y[1] (analytic) = 0.451379026281736 " " y[1] (numeric) = 0.45137902628171744 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 4.107573332321295000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3159999999999996 " " y[1] (analytic) = 0.45327186015192134 " " y[1] (numeric) = 0.4532718601519028 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 4.090420372671247000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3149999999999996 " " y[1] (analytic) = 0.45516364001374066 " " y[1] (numeric) = 0.455163640013722 " " absolute error = 1.86517468137026300000000000000E-14 " " relative error = 4.0978112428179814000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3139999999999996 " " y[1] (analytic) = 0.45705436623642925 " " y[1] (numeric) = 0.45705436623641066 " " absolute error = 1.859623566247137200000000000000E-14 " " relative error = 4.068714147859543400000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3129999999999996 " " y[1] (analytic) = 0.4589440391876667 " " y[1] (numeric) = 0.45894403918764803 " " absolute error = 1.86517468137026300000000000000E-14 " " relative error = 4.064056882995216000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3119999999999996 " " y[1] (analytic) = 0.4608326592335801 " " y[1] (numeric) = 0.4608326592335616 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 4.011263739586508600000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3109999999999996 " " y[1] (analytic) = 0.4627202267387497 " " y[1] (numeric) = 0.4627202267387312 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 3.994900653099296400000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3099999999999996 " " y[1] (analytic) = 0.4646067420662118 " " y[1] (numeric) = 0.46460674206619335 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 3.966731547376287000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3089999999999996 " " y[1] (analytic) = 0.46649220557746407 " " y[1] (numeric) = 0.46649220557744553 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 3.974498242320858000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3079999999999996 " " y[1] (analytic) = 0.46837661763246896 " " y[1] (numeric) = 0.4683766176324505 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 3.946655888470086400000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3069999999999996 " " y[1] (analytic) = 0.47025997858965884 " " y[1] (numeric) = 0.4702599785896403 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 3.9426541392795084000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3059999999999996 " " y[1] (analytic) = 0.4721422888059392 " " y[1] (numeric) = 0.47214228880592074 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 3.915178495609547000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3049999999999996 " " y[1] (analytic) = 0.4740235486366938 " " y[1] (numeric) = 0.47402354863667534 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 3.899640305460117500000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3039999999999996 " " y[1] (analytic) = 0.47590375843578814 " " y[1] (numeric) = 0.47590375843576954 " " absolute error = 1.859623566247137200000000000000E-14 " " relative error = 3.907562260822214000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3029999999999996 " " y[1] (analytic) = 0.47778291855557353 " " y[1] (numeric) = 0.4777829185555548 " " absolute error = 1.870725796493388800000000000000E-14 " " relative error = 3.915430468190324600000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3019999999999996 " " y[1] (analytic) = 0.47966102934689137 " " y[1] (numeric) = 0.4796610293468728 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 3.865380628583741700000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.3009999999999996 " " y[1] (analytic) = 0.48153809115907786 " " y[1] (numeric) = 0.4815380911590593 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 3.850313163515681000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2999999999999996 " " y[1] (analytic) = 0.4834141043399668 " " y[1] (numeric) = 0.4834141043399483 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 3.8238878828841344000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2989999999999996 " " y[1] (analytic) = 0.48528906923589465 " " y[1] (numeric) = 0.4852890692358761 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 3.820552673983192000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2979999999999996 " " y[1] (analytic) = 0.48716298619170395 " " y[1] (numeric) = 0.48716298619168524 " " absolute error = 1.870725796493388800000000000000E-14 " " relative error = 3.8400409093420695000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2969999999999996 " " y[1] (analytic) = 0.4890358555507469 " " y[1] (numeric) = 0.4890358555507284 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 3.7799300706061745000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2959999999999996 " " y[1] (analytic) = 0.4909076776548911 " " y[1] (numeric) = 0.4909076776548726 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 3.765517265550692000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2949999999999996 " " y[1] (analytic) = 0.49277845284452115 " " y[1] (numeric) = 0.49277845284450267 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 3.751221924031896000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2939999999999996 " " y[1] (analytic) = 0.49464818145854406 " " y[1] (numeric) = 0.4946481814585256 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 3.725820269759179000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2929999999999996 " " y[1] (analytic) = 0.496516863834393 " " y[1] (numeric) = 0.4965168638343743 " " absolute error = 1.86517468137026300000000000000E-14 " " relative error = 3.756518292181046400000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2919999999999996 " " y[1] (analytic) = 0.4983845003080297 " " y[1] (numeric) = 0.49838450030801124 " " absolute error = 1.848521336000885600000000000000E-14 " " relative error = 3.709026534449597000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2909999999999996 " " y[1] (analytic) = 0.500251091213951 " " y[1] (numeric) = 0.5002510912139324 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 3.706283671715267500000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2899999999999996 " " y[1] (analytic) = 0.5021166368851896 " " y[1] (numeric) = 0.5021166368851713 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.64829176343418000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2889999999999996 " " y[1] (analytic) = 0.5039811376533209 " " y[1] (numeric) = 0.5039811376533023 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 3.678852862940662000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2879999999999996 " " y[1] (analytic) = 0.5058445938484633 " " y[1] (numeric) = 0.5058445938484449 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.6214047019750970000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2869999999999996 " " y[1] (analytic) = 0.5077070057992855 " " y[1] (numeric) = 0.5077070057992671 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 3.6299877681939080000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2859999999999996 " " y[1] (analytic) = 0.5095683738330075 " " y[1] (numeric) = 0.5095683738329891 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.5949405118140954000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2849999999999996 " " y[1] (analytic) = 0.5114286982754059 " " y[1] (numeric) = 0.5114286982753875 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 3.6035721638078955000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2839999999999996 " " y[1] (analytic) = 0.5132879794508167 " " y[1] (numeric) = 0.5132879794507983 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 3.5905189575053226000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2829999999999996 " " y[1] (analytic) = 0.5151462176821391 " " y[1] (numeric) = 0.5151462176821209 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.5344639985471554000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2819999999999996 " " y[1] (analytic) = 0.5170034132908398 " " y[1] (numeric) = 0.5170034132908216 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.521767387947566000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2809999999999996 " " y[1] (analytic) = 0.5188595665969556 " " y[1] (numeric) = 0.5188595665969374 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.5091687184783227000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2799999999999996 " " y[1] (analytic) = 0.520714677919098 " " y[1] (numeric) = 0.5207146779190795 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 3.5393091438150265000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2789999999999996 " " y[1] (analytic) = 0.5225687475744553 " " y[1] (numeric) = 0.5225687475744368 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 3.526751703832374000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2779999999999996 " " y[1] (analytic) = 0.5244217758787977 " " y[1] (numeric) = 0.5244217758787793 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 3.5142900345612266000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2769999999999996 " " y[1] (analytic) = 0.5262737631464802 " " y[1] (numeric) = 0.5262737631464618 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 3.5019230482990990000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2759999999999996 " " y[1] (analytic) = 0.5281247096904459 " " y[1] (numeric) = 0.5281247096904276 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.468627687777071000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2749999999999996 " " y[1] (analytic) = 0.5299746158222298 " " y[1] (numeric) = 0.5299746158222115 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.4565202482187835000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2739999999999996 " " y[1] (analytic) = 0.5318234818519619 " " y[1] (numeric) = 0.5318234818519436 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.444503774546431300000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2729999999999996 " " y[1] (analytic) = 0.533671308088371 " " y[1] (numeric) = 0.5336713080883527 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.432577249081129000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2719999999999996 " " y[1] (analytic) = 0.5355180948387879 " " y[1] (numeric) = 0.5355180948387696 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.4207396692785386000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2709999999999996 " " y[1] (analytic) = 0.5373638424091488 " " y[1] (numeric) = 0.5373638424091305 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.4089900474485670000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2699999999999996 " " y[1] (analytic) = 0.5392085511039986 " " y[1] (numeric) = 0.5392085511039805 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 3.3561476842936244000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2689999999999996 " " y[1] (analytic) = 0.541052221226495 " " y[1] (numeric) = 0.5410522212264767 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.3857507995788316000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.26799999999999957 " " y[1] (analytic) = 0.5428948530784101 " " y[1] (numeric) = 0.5428948530783919 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.3538092138115816000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.26699999999999957 " " y[1] (analytic) = 0.544736446960136 " " y[1] (numeric) = 0.5447364469601177 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.3628518907705196000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.26599999999999957 " " y[1] (analytic) = 0.5465770031706859 " " y[1] (numeric) = 0.5465770031706676 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.351527744498701300000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.26499999999999957 " " y[1] (analytic) = 0.5484165220076989 " " y[1] (numeric) = 0.5484165220076807 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.3200417699299295000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.26399999999999957 " " y[1] (analytic) = 0.5502550037674429 " " y[1] (numeric) = 0.5502550037674245 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.3291255474084164000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.26299999999999957 " " y[1] (analytic) = 0.552092448744817 " " y[1] (numeric) = 0.5520924487447987 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.318045727298503700000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.26199999999999957 " " y[1] (analytic) = 0.553928857233356 " " y[1] (numeric) = 0.5539288572333376 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 3.3270883017047150000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.26099999999999957 " " y[1] (analytic) = 0.5557642295252324 " " y[1] (numeric) = 0.5557642295252142 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.276147804511753700000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.25999999999999956 " " y[1] (analytic) = 0.557598565911261 " " y[1] (numeric) = 0.5575985659112426 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 3.3051918235583466000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.25899999999999956 " " y[1] (analytic) = 0.5594318666809 " " y[1] (numeric) = 0.5594318666808816 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.2745149136747450000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.25799999999999956 " " y[1] (analytic) = 0.5612641321222562 " " y[1] (numeric) = 0.5612641321222378 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 3.283605909234048000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.25699999999999956 " " y[1] (analytic) = 0.5630953625220869 " " y[1] (numeric) = 0.5630953625220685 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 3.272927364599759000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.25599999999999956 " " y[1] (analytic) = 0.5649255581658035 " " y[1] (numeric) = 0.564925558165785 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 3.2623240252423760000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.25499999999999956 " " y[1] (analytic) = 0.5667547193374741 " " y[1] (numeric) = 0.5667547193374557 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 3.2517951028835870000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.25399999999999956 " " y[1] (analytic) = 0.568582846319827 " " y[1] (numeric) = 0.5685828463198088 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.20228753324204000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.25299999999999956 " " y[1] (analytic) = 0.570409939394254 " " y[1] (numeric) = 0.5704099393942358 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.1920302130759090000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.25199999999999956 " " y[1] (analytic) = 0.5722359988408124 " " y[1] (numeric) = 0.5722359988407942 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.1818441413570814000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.25099999999999956 " " y[1] (analytic) = 0.5740610249382291 " " y[1] (numeric) = 0.5740610249382109 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.1717285816106006000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.24999999999999956 " " y[1] (analytic) = 0.5758850179639029 " " y[1] (numeric) = 0.5758850179638845 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 3.2002399148943990000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.24899999999999956 " " y[1] (analytic) = 0.5777079781939072 " " y[1] (numeric) = 0.577707978193889 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.151706102584095300000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.24799999999999955 " " y[1] (analytic) = 0.5795299059029944 " " y[1] (numeric) = 0.5795299059029762 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.1417977602868160000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.24699999999999955 " " y[1] (analytic) = 0.5813508013645972 " " y[1] (numeric) = 0.581350801364579 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.131957083591176000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.24599999999999955 " " y[1] (analytic) = 0.5831706648508324 " " y[1] (numeric) = 0.583170664850814 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.1412210885128744000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.24499999999999955 " " y[1] (analytic) = 0.584989496632503 " " y[1] (numeric) = 0.5849894966324848 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.1124759860929300000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.24399999999999955 " " y[1] (analytic) = 0.5868072969791025 " " y[1] (numeric) = 0.5868072969790844 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 3.083914497067768000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.24299999999999955 " " y[1] (analytic) = 0.5886240661588165 " " y[1] (numeric) = 0.5886240661587984 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 3.0743960945197585000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.24199999999999955 " " y[1] (analytic) = 0.5904398044385257 " " y[1] (numeric) = 0.5904398044385075 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.083744941817904700000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.24099999999999955 " " y[1] (analytic) = 0.5922545120838091 " " y[1] (numeric) = 0.592254512083791 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 3.0555504318098337000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.23999999999999955 " " y[1] (analytic) = 0.5940681893589468 " " y[1] (numeric) = 0.5940681893589286 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.0649103806585360000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.23899999999999955 " " y[1] (analytic) = 0.5958808365269224 " " y[1] (numeric) = 0.5958808365269042 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.05558703816949000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.23799999999999955 " " y[1] (analytic) = 0.5976924538494259 " " y[1] (numeric) = 0.5976924538494078 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 3.0277503396335430000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.23699999999999954 " " y[1] (analytic) = 0.5995030415868573 " " y[1] (numeric) = 0.5995030415868391 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 3.03712514212734000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.23599999999999954 " " y[1] (analytic) = 0.6013125999983274 " " y[1] (numeric) = 0.6013125999983093 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 3.009522052496552700000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.23499999999999954 " " y[1] (analytic) = 0.6031211293416631 " " y[1] (numeric) = 0.6031211293416447 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.0373135702128096000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.23399999999999954 " " y[1] (analytic) = 0.6049286298734072 " " y[1] (numeric) = 0.6049286298733889 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.0282382088856685000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.23299999999999954 " " y[1] (analytic) = 0.6067351018488238 " " y[1] (numeric) = 0.6067351018488055 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 3.019222037837433000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.23199999999999954 " " y[1] (analytic) = 0.6085405455218992 " " y[1] (numeric) = 0.608540545521881 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.992020455800071000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.23099999999999954 " " y[1] (analytic) = 0.6103449611453452 " " y[1] (numeric) = 0.610344961145327 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.9831748868189095000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.22999999999999954 " " y[1] (analytic) = 0.6121483489706019 " " y[1] (numeric) = 0.6121483489705836 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.992522962304816600000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.22899999999999954 " " y[1] (analytic) = 0.6139507092478392 " " y[1] (numeric) = 0.6139507092478211 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 2.9475713650629265000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.22799999999999954 " " y[1] (analytic) = 0.6157520422259618 " " y[1] (numeric) = 0.6157520422259435 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.975009200146948000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.22699999999999954 " " y[1] (analytic) = 0.6175523481526085 " " y[1] (numeric) = 0.6175523481525902 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.966336369882639000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.22599999999999953 " " y[1] (analytic) = 0.6193516272741576 " " y[1] (numeric) = 0.6193516272741394 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.9397932938332140000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.22499999999999953 " " y[1] (analytic) = 0.6211498798357282 " " y[1] (numeric) = 0.62114987983571 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.931282480271563000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.22399999999999953 " " y[1] (analytic) = 0.6229471060811826 " " y[1] (numeric) = 0.6229471060811645 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 2.9050035106883850000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.22299999999999953 " " y[1] (analytic) = 0.6247433062531299 " " y[1] (numeric) = 0.6247433062531115 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.9499639330765964000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.22199999999999953 " " y[1] (analytic) = 0.6265384805929263 " " y[1] (numeric) = 0.6265384805929078 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.9415116197390784000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.22099999999999953 " " y[1] (analytic) = 0.6283326293406802 " " y[1] (numeric) = 0.6283326293406617 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 2.9507817428955110000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.21999999999999953 " " y[1] (analytic) = 0.630125752735253 " " y[1] (numeric) = 0.6301257527352345 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.9247657517214390000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.21899999999999953 " " y[1] (analytic) = 0.6319178510142621 " " y[1] (numeric) = 0.6319178510142438 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.89890210838523000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.21799999999999953 " " y[1] (analytic) = 0.6337089244140836 " " y[1] (numeric) = 0.6337089244140652 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.8907088413268317000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.21699999999999953 " " y[1] (analytic) = 0.6354989731698538 " " y[1] (numeric) = 0.6354989731698355 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.882566405251914000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.21599999999999953 " " y[1] (analytic) = 0.6372879975154726 " " y[1] (numeric) = 0.6372879975154543 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.8744743315003870000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.21499999999999952 " " y[1] (analytic) = 0.6390759976836056 " " y[1] (numeric) = 0.6390759976835871 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.883804473267324000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.21399999999999952 " " y[1] (analytic) = 0.6408629739056858 " " y[1] (numeric) = 0.6408629739056673 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 2.8930871756009274000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.21299999999999952 " " y[1] (analytic) = 0.6426489264119167 " " y[1] (numeric) = 0.6426489264118984 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.850495683326391000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.21199999999999952 " " y[1] (analytic) = 0.6444338554312755 " " y[1] (numeric) = 0.644433855431257 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 2.8770562494473656000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.21099999999999952 " " y[1] (analytic) = 0.646217761191513 " " y[1] (numeric) = 0.6462177611914943 " " absolute error = 1.86517468137026300000000000000E-14 " " relative error = 2.8862943629577836000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.20999999999999952 " " y[1] (analytic) = 0.6480006439191578 " " y[1] (numeric) = 0.6480006439191393 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 2.8612200751999856000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.20899999999999952 " " y[1] (analytic) = 0.6497825038395184 " " y[1] (numeric) = 0.6497825038395 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.836287850146441700000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.20799999999999952 " " y[1] (analytic) = 0.6515633411766852 " " y[1] (numeric) = 0.6515633411766668 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.8285357760451400000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.20699999999999952 " " y[1] (analytic) = 0.6533431561535326 " " y[1] (numeric) = 0.6533431561535141 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.8208303760737190000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.20599999999999952 " " y[1] (analytic) = 0.6551219489917213 " " y[1] (numeric) = 0.6551219489917028 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.813171232797528000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.20499999999999952 " " y[1] (analytic) = 0.6568997199117008 " " y[1] (numeric) = 0.6568997199116825 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.788656982343887000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.20399999999999952 " " y[1] (analytic) = 0.6586764691327118 " " y[1] (numeric) = 0.6586764691326935 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.7811347094933475000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.20299999999999951 " " y[1] (analytic) = 0.6604521968727878 " " y[1] (numeric) = 0.6604521968727695 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.7736571992724424000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2019999999999995 " " y[1] (analytic) = 0.6622269033487577 " " y[1] (numeric) = 0.6622269033487393 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.766224056087263000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.2009999999999995 " " y[1] (analytic) = 0.6640005887762478 " " y[1] (numeric) = 0.6640005887762295 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.7588348889985753000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1999999999999995 " " y[1] (analytic) = 0.6657732533696842 " " y[1] (numeric) = 0.6657732533696659 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.7514893116535670000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1989999999999995 " " y[1] (analytic) = 0.6675448973422947 " " y[1] (numeric) = 0.6675448973422764 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.744186942218791000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1979999999999995 " " y[1] (analytic) = 0.6693155209061112 " " y[1] (numeric) = 0.6693155209060929 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.7369274033142810000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1969999999999995 " " y[1] (analytic) = 0.6710851242719715 " " y[1] (numeric) = 0.6710851242719533 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.7131666230279194000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1959999999999995 " " y[1] (analytic) = 0.6728537076495221 " " y[1] (numeric) = 0.6728537076495038 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.722535329456335000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1949999999999995 " " y[1] (analytic) = 0.6746212712472189 " " y[1] (numeric) = 0.6746212712472007 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.6989450792428790000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1939999999999995 " " y[1] (analytic) = 0.676387815272331 " " y[1] (numeric) = 0.6763878152723128 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.6918961567221167000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1929999999999995 " " y[1] (analytic) = 0.6781533399309416 " " y[1] (numeric) = 0.6781533399309233 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.701259262128020700000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1919999999999995 " " y[1] (analytic) = 0.6799178454279502 " " y[1] (numeric) = 0.6799178454279319 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.694249022804371000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1909999999999995 " " y[1] (analytic) = 0.681681331967075 " " y[1] (numeric) = 0.6816813319670567 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.6872790917501416000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1899999999999995 " " y[1] (analytic) = 0.6834437997508549 " " y[1] (numeric) = 0.6834437997508367 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.6641045848232225000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1889999999999995 " " y[1] (analytic) = 0.6852052489806513 " " y[1] (numeric) = 0.6852052489806331 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.6572560018971353000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1879999999999995 " " y[1] (analytic) = 0.6869656798566501 " " y[1] (numeric) = 0.6869656798566318 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.6666077277889140000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1869999999999995 " " y[1] (analytic) = 0.6887250925778637 " " y[1] (numeric) = 0.6887250925778455 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.6436756552171214000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1859999999999995 " " y[1] (analytic) = 0.6904834873421333 " " y[1] (numeric) = 0.6904834873421151 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.6369432343616217000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1849999999999995 " " y[1] (analytic) = 0.6922408643461303 " " y[1] (numeric) = 0.692240864346112 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.64628698619495000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1839999999999995 " " y[1] (analytic) = 0.6939972237853584 " " y[1] (numeric) = 0.6939972237853402 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.6235922824792000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1829999999999995 " " y[1] (analytic) = 0.6957525658541565 " " y[1] (numeric) = 0.6957525658541381 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.632930269373242000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1819999999999995 " " y[1] (analytic) = 0.6975068907456986 " " y[1] (numeric) = 0.6975068907456802 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.642225109643657000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1809999999999995 " " y[1] (analytic) = 0.6992601986519974 " " y[1] (numeric) = 0.6992601986519791 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.619722950287892000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1799999999999995 " " y[1] (analytic) = 0.7010124897639058 " " y[1] (numeric) = 0.7010124897638876 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.5973371187701270000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1789999999999995 " " y[1] (analytic) = 0.702763764271119 " " y[1] (numeric) = 0.7027637642711007 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.6066625568429175000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1779999999999995 " " y[1] (analytic) = 0.7045140223621751 " " y[1] (numeric) = 0.7045140223621568 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.6001866996052286000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1769999999999995 " " y[1] (analytic) = 0.7062632642244583 " " y[1] (numeric) = 0.7062632642244401 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.5780269944871400000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1759999999999995 " " y[1] (analytic) = 0.7080114900442006 " " y[1] (numeric) = 0.7080114900441823 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.5873421779032796000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1749999999999995 " " y[1] (analytic) = 0.7097587000064829 " " y[1] (numeric) = 0.7097587000064646 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.5809729287077090000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1739999999999995 " " y[1] (analytic) = 0.7115048942952372 " " y[1] (numeric) = 0.711504894295219 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.559034765584809000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1729999999999995 " " y[1] (analytic) = 0.713250073093249 " " y[1] (numeric) = 0.7132500730932307 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.5527733246333834000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.1719999999999995 " " y[1] (analytic) = 0.7149942365821577 " " y[1] (numeric) = 0.7149942365821396 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 2.531018346091329000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.17099999999999949 " " y[1] (analytic) = 0.71673738494246 " " y[1] (numeric) = 0.7167373849424418 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.5403527130532316000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.16999999999999948 " " y[1] (analytic) = 0.7184795183535103 " " y[1] (numeric) = 0.718479518353492 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.5496453884022650000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.16899999999999948 " " y[1] (analytic) = 0.720220636993523 " " y[1] (numeric) = 0.7202206369935048 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.5280666324500656000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.16799999999999948 " " y[1] (analytic) = 0.7219607410395746 " " y[1] (numeric) = 0.7219607410395564 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.521973366257391000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.16699999999999948 " " y[1] (analytic) = 0.7236998306676049 " " y[1] (numeric) = 0.7236998306675867 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.515912928576508000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.16599999999999948 " " y[1] (analytic) = 0.7254379060524189 " " y[1] (numeric) = 0.7254379060524005 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.5251892344582566000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.16499999999999948 " " y[1] (analytic) = 0.7271749673676879 " " y[1] (numeric) = 0.7271749673676696 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.5191571118883754000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.16399999999999948 " " y[1] (analytic) = 0.7289110147859524 " " y[1] (numeric) = 0.7289110147859343 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 2.4826947232652533000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.16299999999999948 " " y[1] (analytic) = 0.7306460484786236 " " y[1] (numeric) = 0.7306460484786053 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.507189348995847000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.16199999999999948 " " y[1] (analytic) = 0.732380068615983 " " y[1] (numeric) = 0.7323800686159647 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.5012532005319116000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.16099999999999948 " " y[1] (analytic) = 0.7341130753671868 " " y[1] (numeric) = 0.7341130753671686 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.48022521527021000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.15999999999999948 " " y[1] (analytic) = 0.7358450689002666 " " y[1] (numeric) = 0.7358450689002481 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.504562847220151000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.15899999999999948 " " y[1] (analytic) = 0.7375760493821295 " " y[1] (numeric) = 0.7375760493821111 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.4986850134594576000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.15799999999999947 " " y[1] (analytic) = 0.7393060169785621 " " y[1] (numeric) = 0.7393060169785437 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.4928381191995640000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.15699999999999947 " " y[1] (analytic) = 0.7410349718542308 " " y[1] (numeric) = 0.7410349718542123 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 2.5020039830032830000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.15599999999999947 " " y[1] (analytic) = 0.742762914172683 " " y[1] (numeric) = 0.7427629141726646 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.4812361868262212000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.15499999999999947 " " y[1] (analytic) = 0.7444898440963501 " " y[1] (numeric) = 0.7444898440963316 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 2.4903932079482627000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.15399999999999947 " " y[1] (analytic) = 0.7462157617865475 " " y[1] (numeric) = 0.7462157617865289 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 2.4846331933341856000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.15299999999999947 " " y[1] (analytic) = 0.7479406674034771 " " y[1] (numeric) = 0.7479406674034584 " " absolute error = 1.86517468137026300000000000000E-14 " " relative error = 2.493746847387419000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.15199999999999947 " " y[1] (analytic) = 0.7496645611062284 " " y[1] (numeric) = 0.7496645611062099 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.4583931487413727000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.15099999999999947 " " y[1] (analytic) = 0.7513874430527808 " " y[1] (numeric) = 0.7513874430527624 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.4527562150759838000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.14999999999999947 " " y[1] (analytic) = 0.7531093134000041 " " y[1] (numeric) = 0.7531093133999857 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.447148359588657000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.14899999999999947 " " y[1] (analytic) = 0.7548301723036603 " " y[1] (numeric) = 0.7548301723036419 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.441569360235314200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.14799999999999947 " " y[1] (analytic) = 0.7565500199184054 " " y[1] (numeric) = 0.7565500199183871 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.4213441839960256000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.14699999999999946 " " y[1] (analytic) = 0.758268856397791 " " y[1] (numeric) = 0.7582688563977725 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.4304970530280230000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.14599999999999946 " " y[1] (analytic) = 0.7599866818942648 " " y[1] (numeric) = 0.7599866818942463 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.425003312274053900000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.14499999999999946 " " y[1] (analytic) = 0.7617034965591731 " " y[1] (numeric) = 0.7617034965591547 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.4195375617979564000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.14399999999999946 " " y[1] (analytic) = 0.763419300542762 " " y[1] (numeric) = 0.7634193005427437 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.3995568219576321000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.14299999999999946 " " y[1] (analytic) = 0.7651340939941786 " " y[1] (numeric) = 0.7651340939941602 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.408689189704023000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.14199999999999946 " " y[1] (analytic) = 0.7668478770614724 " " y[1] (numeric) = 0.766847877061454 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.403306152375281000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.14099999999999946 " " y[1] (analytic) = 0.7685606498915968 " " y[1] (numeric) = 0.7685606498915784 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.3979502738498323000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.13999999999999946 " " y[1] (analytic) = 0.7702724126304105 " " y[1] (numeric) = 0.7702724126303921 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.378207969795835000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.13899999999999946 " " y[1] (analytic) = 0.7719831654226793 " " y[1] (numeric) = 0.7719831654226609 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.387319184439325700000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.13799999999999946 " " y[1] (analytic) = 0.7736929084120766 " " y[1] (numeric) = 0.7736929084120582 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.3820435741879326000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.13699999999999946 " " y[1] (analytic) = 0.7754016417411854 " " y[1] (numeric) = 0.775401641741167 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.3767943239574787000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.13599999999999945 " " y[1] (analytic) = 0.7771093655514998 " " y[1] (numeric) = 0.7771093655514812 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 2.3858578127008045000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.13499999999999945 " " y[1] (analytic) = 0.7788160799834252 " " y[1] (numeric) = 0.7788160799834067 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.366374126375231000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.13399999999999945 " " y[1] (analytic) = 0.7805217851762813 " " y[1] (numeric) = 0.7805217851762629 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.361202795206445000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.13299999999999945 " " y[1] (analytic) = 0.7822264812683026 " " y[1] (numeric) = 0.782226481268284 " " absolute error = 1.86517468137026300000000000000E-14 " " relative error = 2.3844432859727113000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.13199999999999945 " " y[1] (analytic) = 0.7839301683966389 " " y[1] (numeric) = 0.7839301683966202 " " absolute error = 1.86517468137026300000000000000E-14 " " relative error = 2.3792612614782743000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.13099999999999945 " " y[1] (analytic) = 0.7856328466973579 " " y[1] (numeric) = 0.7856328466973392 " " absolute error = 1.86517468137026300000000000000E-14 " " relative error = 2.374104760526601000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.12999999999999945 " " y[1] (analytic) = 0.787334516305446 " " y[1] (numeric) = 0.7873345163054274 " " absolute error = 1.86517468137026300000000000000E-14 " " relative error = 2.3689735972996126000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.12899999999999945 " " y[1] (analytic) = 0.7890351773548094 " " y[1] (numeric) = 0.7890351773547909 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 2.3497969473803082000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.12799999999999945 " " y[1] (analytic) = 0.7907348299782757 " " y[1] (numeric) = 0.7907348299782571 " " absolute error = 1.86517468137026300000000000000E-14 " " relative error = 2.3587865497482968000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.12699999999999945 " " y[1] (analytic) = 0.7924334743075945 " " y[1] (numeric) = 0.7924334743075759 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 2.339720003302544200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.12599999999999945 " " y[1] (analytic) = 0.7941311104734395 " " y[1] (numeric) = 0.794131110473421 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 2.3347183187656045000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.12499999999999944 " " y[1] (analytic) = 0.7958277386054092 " " y[1] (numeric) = 0.7958277386053907 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 2.3297409240510347000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.12399999999999944 " " y[1] (analytic) = 0.7975233588320281 " " y[1] (numeric) = 0.7975233588320096 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.310866760789035000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.12299999999999944 " " y[1] (analytic) = 0.7992179712807483 " " y[1] (numeric) = 0.7992179712807298 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 2.319858308682494800000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.12199999999999944 " " y[1] (analytic) = 0.80091157607795 " " y[1] (numeric) = 0.8009115760779316 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.301090751993812900000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.12099999999999944 " " y[1] (analytic) = 0.8026041733489439 " " y[1] (numeric) = 0.8026041733489252 " " absolute error = 1.86517468137026300000000000000E-14 " " relative error = 2.32390354212542980000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.11999999999999944 " " y[1] (analytic) = 0.8042957632179704 " " y[1] (numeric) = 0.8042957632179518 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 2.3052122563793034000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.11899999999999944 " " y[1] (analytic) = 0.8059863458082028 " " y[1] (numeric) = 0.8059863458081844 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.28660228608429020000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.11799999999999944 " " y[1] (analytic) = 0.8076759212417479 " " y[1] (numeric) = 0.8076759212417295 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.281818947931883200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.11699999999999944 " " y[1] (analytic) = 0.809364489639646 " " y[1] (numeric) = 0.8093644896396276 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.2770584136923364000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.11599999999999944 " " y[1] (analytic) = 0.8110520511218736 " " y[1] (numeric) = 0.8110520511218551 " " absolute error = 1.854072451124011400000000000000E-14 " " relative error = 2.286009200715784000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.11499999999999944 " " y[1] (analytic) = 0.812738605807343 " " y[1] (numeric) = 0.8127386058073246 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.2676051164654895000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.11399999999999944 " " y[1] (analytic) = 0.814424153813905 " " y[1] (numeric) = 0.8144241538138867 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.2492800367633597000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.11299999999999943 " " y[1] (analytic) = 0.8161086952583488 " " y[1] (numeric) = 0.8161086952583305 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.244637266181325000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.11199999999999943 " " y[1] (analytic) = 0.8177922302564038 " " y[1] (numeric) = 0.8177922302563854 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.2535922361354915000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.11099999999999943 " " y[1] (analytic) = 0.8194747589227399 " " y[1] (numeric) = 0.8194747589227215 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.2489652070558955000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.10999999999999943 " " y[1] (analytic) = 0.8211562813709693 " " y[1] (numeric) = 0.821156281370951 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.230839649150702000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.10899999999999943 " " y[1] (analytic) = 0.8228367977136476 " " y[1] (numeric) = 0.8228367977136292 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.2397761330055696000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.10799999999999943 " " y[1] (analytic) = 0.8245163080622738 " " y[1] (numeric) = 0.8245163080622555 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.221748645501808000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.10699999999999943 " " y[1] (analytic) = 0.8261948125272931 " " y[1] (numeric) = 0.8261948125272748 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.2172349219040793000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.10599999999999943 " " y[1] (analytic) = 0.8278723112180961 " " y[1] (numeric) = 0.8278723112180777 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.22615274832189010000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.10499999999999943 " " y[1] (analytic) = 0.8295488042430207 " " y[1] (numeric) = 0.8295488042430024 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.2082703046062770000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.10399999999999943 " " y[1] (analytic) = 0.8312242917093534 " " y[1] (numeric) = 0.8312242917093352 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.19046264473453000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.10299999999999943 " " y[1] (analytic) = 0.8328987737233299 " " y[1] (numeric) = 0.8328987737233117 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.186058879935479000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.10199999999999942 " " y[1] (analytic) = 0.8345722503901357 " " y[1] (numeric) = 0.8345722503901175 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.18167541460203980000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -0.10099999999999942 " " y[1] (analytic) = 0.836244721813908 " " y[1] (numeric) = 0.8362447218138896 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.1905884041432064000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -9.99999999999994200E-2 " " y[1] (analytic) = 0.8379161880977354 " " y[1] (numeric) = 0.8379161880977172 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.172968831785931000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -9.89999999999994200E-2 " " y[1] (analytic) = 0.8395866493436605 " " y[1] (numeric) = 0.8395866493436422 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.1686454421453993000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -9.79999999999994200E-2 " " y[1] (analytic) = 0.8412561056526793 " " y[1] (numeric) = 0.8412561056526612 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 2.1511446014825625000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -9.69999999999994200E-2 " " y[1] (analytic) = 0.8429245571247432 " " y[1] (numeric) = 0.842924557124725 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.1600577952029032000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -9.59999999999994200E-2 " " y[1] (analytic) = 0.8445920038587593 " " y[1] (numeric) = 0.844592003858741 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.1689383539769463000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -9.49999999999994200E-2 " " y[1] (analytic) = 0.8462584459525914 " " y[1] (numeric) = 0.846258445952573 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.1646673062972682000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -9.39999999999994200E-2 " " y[1] (analytic) = 0.847923883503061 " " y[1] (numeric) = 0.8479238835030428 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.1473221780981758000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -9.29999999999994200E-2 " " y[1] (analytic) = 0.8495883166059487 " " y[1] (numeric) = 0.8495883166059305 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.143115347512192800000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -9.19999999999994200E-2 " " y[1] (analytic) = 0.8512517453559941 " " y[1] (numeric) = 0.8512517453559759 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.1389274915657425000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -9.09999999999994100E-2 " " y[1] (analytic) = 0.8529141698468974 " " y[1] (numeric) = 0.8529141698468791 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.147775304237633000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -8.99999999999994100E-2 " " y[1] (analytic) = 0.8545755901713198 " " y[1] (numeric) = 0.8545755901713014 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.1565912273580073000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -8.89999999999994100E-2 " " y[1] (analytic) = 0.8562360064208845 " " y[1] (numeric) = 0.8562360064208663 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.1264765166746044000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -8.79999999999994100E-2 " " y[1] (analytic) = 0.8578954186861785 " " y[1] (numeric) = 0.85789541868616 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.1482457893296264000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -8.69999999999994100E-2 " " y[1] (analytic) = 0.8595538270567512 " " y[1] (numeric) = 0.8595538270567329 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.1311847297616196000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -8.59999999999994100E-2 " " y[1] (analytic) = 0.8612112316211179 " " y[1] (numeric) = 0.8612112316210995 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.1399746696389557000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -8.49999999999994100E-2 " " y[1] (analytic) = 0.8628676324667581 " " y[1] (numeric) = 0.8628676324667398 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.1230000080019001000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -8.39999999999994100E-2 " " y[1] (analytic) = 0.8645230296801186 " " y[1] (numeric) = 0.8645230296801002 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.1317768961686023000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -8.29999999999994100E-2 " " y[1] (analytic) = 0.8661774233466124 " " y[1] (numeric) = 0.866177423346594 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.1277052151245815000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -8.1999999999999410E-2 " " y[1] (analytic) = 0.8678308135506205 " " y[1] (numeric) = 0.8678308135506021 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.123651513752409000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -8.0999999999999410E-2 " " y[1] (analytic) = 0.8694832003754926 " " y[1] (numeric) = 0.8694832003754742 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.119615675244628000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -7.9999999999999400E-2 " " y[1] (analytic) = 0.8711345839035474 " " y[1] (numeric) = 0.8711345839035293 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 2.0773638925341673000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -7.8999999999999400E-2 " " y[1] (analytic) = 0.8727849642160743 " " y[1] (numeric) = 0.8727849642160561 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.086156195438871000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -7.7999999999999400E-2 " " y[1] (analytic) = 0.8744343413933328 " " y[1] (numeric) = 0.8744343413933146 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.082221242002035000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -7.6999999999999400E-2 " " y[1] (analytic) = 0.8760827155145543 " " y[1] (numeric) = 0.876082715514536 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.090976066746833800000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -7.5999999999999400E-2 " " y[1] (analytic) = 0.8777300866579423 " " y[1] (numeric) = 0.877730086657924 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.0870516101442477000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -7.4999999999999400E-2 " " y[1] (analytic) = 0.8793764549006734 " " y[1] (numeric) = 0.8793764549006551 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.0831442329649594000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -7.3999999999999400E-2 " " y[1] (analytic) = 0.8810218203188981 " " y[1] (numeric) = 0.8810218203188797 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.0918553642753945000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -7.2999999999999400E-2 " " y[1] (analytic) = 0.8826661829877407 " " y[1] (numeric) = 0.8826661829877223 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.0879583430278043000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -7.1999999999999400E-2 " " y[1] (analytic) = 0.8843095429813009 " " y[1] (numeric) = 0.8843095429812826 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.0715234899034035000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -7.0999999999999400E-2 " " y[1] (analytic) = 0.8859519003726547 " " y[1] (numeric) = 0.8859519003726363 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.080214761210578000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -6.9999999999999400E-2 " " y[1] (analytic) = 0.8875932552338536 " " y[1] (numeric) = 0.8875932552338351 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.0763679872625823000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -6.8999999999999400E-2 " " y[1] (analytic) = 0.8892336076359265 " " y[1] (numeric) = 0.8892336076359081 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.0725377505438547000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -6.7999999999999390E-2 " " y[1] (analytic) = 0.8908729576488802 " " y[1] (numeric) = 0.8908729576488619 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.056261754163047000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -6.6999999999999390E-2 " " y[1] (analytic) = 0.8925113053417 " " y[1] (numeric) = 0.8925113053416815 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 2.0649264719085822000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -6.59999999999993900E-2 " " y[1] (analytic) = 0.8941486507823494 " " y[1] (numeric) = 0.8941486507823312 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.0363121487597718000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -6.49999999999993900E-2 " " y[1] (analytic) = 0.8957849940377726 " " y[1] (numeric) = 0.8957849940377544 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.032592388244986200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -6.39999999999993900E-2 " " y[1] (analytic) = 0.8974203351738933 " " y[1] (numeric) = 0.897420335173875 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 2.0412597295074073000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -6.29999999999993900E-2 " " y[1] (analytic) = 0.8990546742556159 " " y[1] (numeric) = 0.8990546742555977 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.0252002603654598000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -6.19999999999993900E-2 " " y[1] (analytic) = 0.9006880113468269 " " y[1] (numeric) = 0.9006880113468086 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.0215276959916553000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -6.09999999999993900E-2 " " y[1] (analytic) = 0.9023203465103941 " " y[1] (numeric) = 0.9023203465103758 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 2.0178706680247543000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -5.99999999999993900E-2 " " y[1] (analytic) = 0.903951679808168 " " y[1] (numeric) = 0.9039516798081499 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 2.0019471953667287000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -5.899999999999939000E-2 " " y[1] (analytic) = 0.9055820113009828 " " y[1] (numeric) = 0.9055820113009647 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.9983430628653887000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -5.799999999999939000E-2 " " y[1] (analytic) = 0.9072113410486556 " " y[1] (numeric) = 0.9072113410486377 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.982516331656278300000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -5.699999999999938000E-2 " " y[1] (analytic) = 0.9088396691099884 " " y[1] (numeric) = 0.9088396691099703 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.991180173628621000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -5.599999999999938000E-2 " " y[1] (analytic) = 0.9104669955427673 " " y[1] (numeric) = 0.9104669955427491 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.999815225921311200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -5.49999999999993800E-2 " " y[1] (analytic) = 0.912093320403764 " " y[1] (numeric) = 0.9120933204037459 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.9840771658517425000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -5.39999999999993800E-2 " " y[1] (analytic) = 0.913718643748736 " " y[1] (numeric) = 0.913718643748718 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.9683972874995215000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -5.29999999999993800E-2 " " y[1] (analytic) = 0.9153429656324273 " " y[1] (numeric) = 0.9153429656324092 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.9770333067329307000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -5.19999999999993800E-2 " " y[1] (analytic) = 0.9169662861085683 " " y[1] (numeric) = 0.9169662861085502 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.973533332200113000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -5.09999999999993800E-2 " " y[1] (analytic) = 0.9185886052298768 " " y[1] (numeric) = 0.9185886052298589 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.95796169215779000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -4.99999999999993800E-2 " " y[1] (analytic) = 0.9202099230480588 " " y[1] (numeric) = 0.9202099230480406 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.978641736827006200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -4.89999999999993800E-2 " " y[1] (analytic) = 0.9218302396138076 " " y[1] (numeric) = 0.9218302396137895 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.9631201628806916000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -4.799999999999937600E-2 " " y[1] (analytic) = 0.923449554976806 " " y[1] (numeric) = 0.923449554976788 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.9476551699003497000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -4.699999999999937600E-2 " " y[1] (analytic) = 0.9250678691857259 " " y[1] (numeric) = 0.9250678691857078 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.9562494714381642000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -4.599999999999937500E-2 " " y[1] (analytic) = 0.9266851822882285 " " y[1] (numeric) = 0.9266851822882103 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.9648158783431816000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -4.499999999999937400E-2 " " y[1] (analytic) = 0.9283014943309646 " " y[1] (numeric) = 0.9283014943309466 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.9494351147665082000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -4.39999999999993730E-2 " " y[1] (analytic) = 0.9299168053595764 " " y[1] (numeric) = 0.9299168053595583 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.946048850508999800000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -4.29999999999993700E-2 " " y[1] (analytic) = 0.9315311154186965 " " y[1] (numeric) = 0.9315311154186783 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.954594677781509000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -4.19999999999993700E-2 " " y[1] (analytic) = 0.9331444245519483 " " y[1] (numeric) = 0.9331444245519301 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.951215387971162200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -4.09999999999993700E-2 " " y[1] (analytic) = 0.9347567328019477 " " y[1] (numeric) = 0.9347567328019295 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.947849848513509000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -3.99999999999993700E-2 " " y[1] (analytic) = 0.9363680402103017 " " y[1] (numeric) = 0.9363680402102837 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.920784587531211800000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -3.89999999999993700E-2 " " y[1] (analytic) = 0.9379783468176109 " " y[1] (numeric) = 0.9379783468175927 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.9411596936781986000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -3.79999999999993700E-2 " " y[1] (analytic) = 0.9395876526634673 " " y[1] (numeric) = 0.9395876526634491 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.937834916437968000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -3.69999999999993670E-2 " " y[1] (analytic) = 0.941195957786457 " " y[1] (numeric) = 0.9411959577864388 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.9345235658123816000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -3.599999999999936600E-2 " " y[1] (analytic) = 0.9428032622241592 " " y[1] (numeric) = 0.942803262224141 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.9312255624677238000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -3.499999999999936500E-2 " " y[1] (analytic) = 0.9444095660131472 " " y[1] (numeric) = 0.9444095660131289 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 1.9396965644522143000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -3.399999999999936400E-2 " " y[1] (analytic) = 0.9460148691889878 " " y[1] (numeric) = 0.9460148691889696 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.924669283418544000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -3.29999999999993630E-2 " " y[1] (analytic) = 0.9476191717862433 " " y[1] (numeric) = 0.947619171786225 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 1.93312677199055980000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -3.19999999999993600E-2 " " y[1] (analytic) = 0.9492224738384698 " " y[1] (numeric) = 0.9492224738384515 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 1.9298615878991915000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -3.09999999999993600E-2 " " y[1] (analytic) = 0.950824775378219 " " y[1] (numeric) = 0.9508247753782008 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.9149330218714514000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -2.99999999999993600E-2 " " y[1] (analytic) = 0.952426076437038 " " y[1] (numeric) = 0.9524260764370197 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 1.9233702603822053000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -2.89999999999993600E-2 " " y[1] (analytic) = 0.9540263770454693 " " y[1] (numeric) = 0.954026377045451 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 1.92014396531114000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -2.79999999999993600E-2 " " y[1] (analytic) = 0.9556256772330515 " " y[1] (numeric) = 0.9556256772330333 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.905312722087123800000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -2.699999999999936000E-2 " " y[1] (analytic) = 0.9572239770283194 " " y[1] (numeric) = 0.9572239770283012 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.9021313758121516000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -2.599999999999935700E-2 " " y[1] (analytic) = 0.9588212764588044 " " y[1] (numeric) = 0.9588212764587861 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 1.91054165735361000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -2.499999999999935600E-2 " " y[1] (analytic) = 0.9604175755510342 " " y[1] (numeric) = 0.960417575551016 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.895806372910869000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -2.399999999999935500E-2 " " y[1] (analytic) = 0.9620128743305342 " " y[1] (numeric) = 0.9620128743305159 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 1.9042031967673065000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -2.299999999999935400E-2 " " y[1] (analytic) = 0.963607172821826 " " y[1] (numeric) = 0.9636071728218076 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 1.901052671979463000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -2.199999999999935300E-2 " " y[1] (analytic) = 0.965200471048429 " " y[1] (numeric) = 0.9652004710484109 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.8749094974780686000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -2.099999999999935300E-2 " " y[1] (analytic) = 0.966792769032861 " " y[1] (numeric) = 0.9667927690328427 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 1.8947886758234986000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -1.99999999999993520E-2 " " y[1] (analytic) = 0.9683840667966362 " " y[1] (numeric) = 0.9683840667966181 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.8687456683640793000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -1.89999999999993500E-2 " " y[1] (analytic) = 0.9699743643602682 " " y[1] (numeric) = 0.96997436436025 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.8771277131495273000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -1.79999999999993500E-2 " " y[1] (analytic) = 0.9715636617432677 " " y[1] (numeric) = 0.9715636617432495 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.8740570814662555000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -1.69999999999993500E-2 " " y[1] (analytic) = 0.9731519589641443 " " y[1] (numeric) = 0.9731519589641262 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.8595898754242574000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -1.599999999999934800E-2 " " y[1] (analytic) = 0.9747392560404065 " " y[1] (numeric) = 0.9747392560403881 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 1.8793415565029536000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -1.499999999999934700E-2 " " y[1] (analytic) = 0.9763255529885603 " " y[1] (numeric) = 0.9763255529885421 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.8649166303307754000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -1.399999999999934600E-2 " " y[1] (analytic) = 0.9779108498241117 " " y[1] (numeric) = 0.9779108498240936 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.8505403948268837000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -1.299999999999934500E-2 " " y[1] (analytic) = 0.9794951465615653 " " y[1] (numeric) = 0.9794951465615472 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.8475472150032346000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -1.199999999999934500E-2 " " y[1] (analytic) = 0.981078443214425 " " y[1] (numeric) = 0.9810784432144068 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.8445655825540186000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -1.099999999999934400E-2 " " y[1] (analytic) = 0.9826607397951934 " " y[1] (numeric) = 0.9826607397951752 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.8528935640236746000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -9.999999999999343000E-3 " " y[1] (analytic) = 0.9842420363153729 " " y[1] (numeric) = 0.9842420363153548 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.838636700494622200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -8.999999999999342000E-3 " " y[1] (analytic) = 0.9858223327854653 " " y[1] (numeric) = 0.9858223327854472 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.8356893224621484000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -7.999999999999341000E-3 " " y[1] (analytic) = 0.987401629214972 " " y[1] (numeric) = 0.9874016292149538 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.8439971198273655000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -6.999999999999341000E-3 " " y[1] (analytic) = 0.9889799256123936 " " y[1] (numeric) = 0.9889799256123755 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.8298283749474792000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -5.999999999999341000E-3 " " y[1] (analytic) = 0.990557221985231 " " y[1] (numeric) = 0.9905572219852129 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.8269146799133495000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -4.999999999999341000E-3 " " y[1] (analytic) = 0.9921335183399846 " " y[1] (numeric) = 0.9921335183399665 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.8240120877751345000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -3.999999999999341000E-3 " " y[1] (analytic) = 0.9937088146821548 " " y[1] (numeric) = 0.9937088146821366 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.83229305555435000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -2.999999999999341000E-3 " " y[1] (analytic) = 0.9952831110162413 " " y[1] (numeric) = 0.9952831110162231 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.8293948126238677000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -1.999999999999341000E-3 " " y[1] (analytic) = 0.9968564073457447 " " y[1] (numeric) = 0.9968564073457263 " " absolute error = 1.831867990631508300000000000000E-14 " " relative error = 1.837644797317486100000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = -9.9999999999934090000E-4 " " y[1] (analytic) = 0.9984287036731644 " " y[1] (numeric) = 0.9984287036731462 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.8236312254312798000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 6.5919492087118670000000000000000E-16 " " y[1] (analytic) = 1.0000000000000009 " " y[1] (numeric) = 0.9999999999999828 " " absolute error = 1.809663530139005200000000000000E-14 " " relative error = 1.8096635301390035000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.0000000000006593000E-3 " " y[1] (analytic) = 1.0015702963267543 " " y[1] (numeric) = 1.001570296326736 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.8179111012605814000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0000000000006593000E-3 " " y[1] (analytic) = 1.003139592652924 " " y[1] (numeric) = 1.003139592652906 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.7929322230580497000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 3.0000000000006594000E-3 " " y[1] (analytic) = 1.0047078889770105 " " y[1] (numeric) = 1.0047078889769927 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.7680331356897475000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 4.000000000000659000E-3 " " y[1] (analytic) = 1.0062751852965142 " " y[1] (numeric) = 1.006275185296496 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.8094113687686145000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 5.000000000000660000E-3 " " y[1] (analytic) = 1.0078414816079335 " " y[1] (numeric) = 1.0078414816079158 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.762535946194842000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 6.000000000000659000E-3 " " y[1] (analytic) = 1.0094067779067697 " " y[1] (numeric) = 1.009406777906752 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.7598027656243037000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 7.000000000000659000E-3 " " y[1] (analytic) = 1.010971074187522 " " y[1] (numeric) = 1.0109710741875042 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.7570797867068938000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 8.00000000000066000E-3 " " y[1] (analytic) = 1.0125343704436902 " " y[1] (numeric) = 1.0125343704436722 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.7762965410296425000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 9.00000000000066100E-3 " " y[1] (analytic) = 1.0140966666677733 " " y[1] (numeric) = 1.0140966666677553 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.7735600155384176000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.000000000000066100E-2 " " y[1] (analytic) = 1.0156579628512707 " " y[1] (numeric) = 1.0156579628512528 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.7708336523485005000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.100000000000066200E-2 " " y[1] (analytic) = 1.0172182589846812 " " y[1] (numeric) = 1.017218258984663 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.7899460064771375000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.200000000000066300E-2 " " y[1] (analytic) = 1.0187775550575027 " " y[1] (numeric) = 1.0187775550574845 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.7872063939242240000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.300000000000066400E-2 " " y[1] (analytic) = 1.0203358510582328 " " y[1] (numeric) = 1.0203358510582148 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.762714990390067000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.400000000000066500E-2 " " y[1] (analytic) = 1.021893146974369 " " y[1] (numeric) = 1.0218931469743509 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.7817574819600240000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.500000000000066600E-2 " " y[1] (analytic) = 1.0234494427924075 " " y[1] (numeric) = 1.0234494427923893 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.7790480743410536000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.600000000000066600E-2 " " y[1] (analytic) = 1.0250047384978431 " " y[1] (numeric) = 1.0250047384978251 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.7546858393343304000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.700000000000066700E-2 " " y[1] (analytic) = 1.026559034075171 " " y[1] (numeric) = 1.026559034075153 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.7520290993426219000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.800000000000066800E-2 " " y[1] (analytic) = 1.0281123295078838 " " y[1] (numeric) = 1.028112329507866 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.7277847842273436000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.90000000000006700E-2 " " y[1] (analytic) = 1.0296646247784742 " " y[1] (numeric) = 1.0296646247784562 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.7467447716577644000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.00000000000006700E-2 " " y[1] (analytic) = 1.031215919868432 " " y[1] (numeric) = 1.031215919868414 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.7441170808556014000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.10000000000006700E-2 " " y[1] (analytic) = 1.0327662147582466 " " y[1] (numeric) = 1.0327662147582286 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.7414989706201484000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.200000000000067200E-2 " " y[1] (analytic) = 1.0343155094274046 " " y[1] (numeric) = 1.0343155094273866 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.7388903903108194000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.300000000000067300E-2 " " y[1] (analytic) = 1.035863803854391 " " y[1] (numeric) = 1.0358638038543733 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.7148555947128633000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.400000000000067400E-2 " " y[1] (analytic) = 1.037411098016689 " " y[1] (numeric) = 1.0374110980166713 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.7122978950160350000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.500000000000068000E-2 " " y[1] (analytic) = 1.038957391890779 " " y[1] (numeric) = 1.0389573918907613 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.709749459665032000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.600000000000068000E-2 " " y[1] (analytic) = 1.040502685452139 " " y[1] (numeric) = 1.040502685452121 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.7285503680475447000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.700000000000068000E-2 " " y[1] (analytic) = 1.042046978675244 " " y[1] (numeric) = 1.042046978675226 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.725988690240499200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.800000000000068000E-2 " " y[1] (analytic) = 1.0435902715335654 " " y[1] (numeric) = 1.0435902715335479 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.680882264578803000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.900000000000068000E-2 " " y[1] (analytic) = 1.0451325639995734 " " y[1] (numeric) = 1.0451325639995555 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.7208929870196712000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 3.00000000000006800E-2 " " y[1] (analytic) = 1.0466738560447317 " " y[1] (numeric) = 1.046673856044714 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.6971445585857206000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 3.10000000000006800E-2 " " y[1] (analytic) = 1.0482141476395026 " " y[1] (numeric) = 1.0482141476394848 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.6946507003368244000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 3.20000000000006830E-2 " " y[1] (analytic) = 1.0497534387533431 " " y[1] (numeric) = 1.0497534387533254 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.6921657732408102000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 3.30000000000006840E-2 " " y[1] (analytic) = 1.0512917293547064 " " y[1] (numeric) = 1.0512917293546886 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.6896897310231830000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 3.40000000000006850E-2 " " y[1] (analytic) = 1.0528290194110408 " " y[1] (numeric) = 1.052829019411023 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.6872225277319539000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 3.50000000000006860E-2 " " y[1] (analytic) = 1.0543653088887899 " " y[1] (numeric) = 1.0543653088887721 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.684764117734846000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 3.600000000000068700E-2 " " y[1] (analytic) = 1.055900597753392 " " y[1] (numeric) = 1.055900597753374 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.7033433864129810000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 3.700000000000069000E-2 " " y[1] (analytic) = 1.0574348859692793 " " y[1] (numeric) = 1.0574348859692615 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.6798734966758583000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 3.800000000000069000E-2 " " y[1] (analytic) = 1.0589681734998795 " " y[1] (numeric) = 1.0589681734998615 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.6984092108722457000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 3.90000000000006900E-2 " " y[1] (analytic) = 1.0605004603076131 " " y[1] (numeric) = 1.060500460307595 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.7168929468046792000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 4.00000000000006900E-2 " " y[1] (analytic) = 1.0620317463538937 " " y[1] (numeric) = 1.0620317463538758 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.6935099219655822000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 4.10000000000006900E-2 " " y[1] (analytic) = 1.0635620315991292 " " y[1] (numeric) = 1.0635620315991114 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.6701958011131626000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 4.20000000000006900E-2 " " y[1] (analytic) = 1.0650913160027198 " " y[1] (numeric) = 1.065091316002702 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.667797692752679000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 4.30000000000006930E-2 " " y[1] (analytic) = 1.0666195995230576 " " y[1] (numeric) = 1.0666195995230399 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.6654080238114452000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 4.40000000000006940E-2 " " y[1] (analytic) = 1.0681468821175273 " " y[1] (numeric) = 1.0681468821175097 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.6422389170207205000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 4.50000000000006950E-2 " " y[1] (analytic) = 1.0696731637425052 " " y[1] (numeric) = 1.0696731637424877 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.6398956600635180000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 4.60000000000006960E-2 " " y[1] (analytic) = 1.0711984443533589 " " y[1] (numeric) = 1.071198444353341 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.6582892262064183000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 4.700000000000069700E-2 " " y[1] (analytic) = 1.0727227239044461 " " y[1] (numeric) = 1.0727227239044286 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.6352337279880352000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 4.800000000000070000E-2 " " y[1] (analytic) = 1.0742460023491165 " " y[1] (numeric) = 1.0742460023490985 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.6742545896933610000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 4.900000000000070000E-2 " " y[1] (analytic) = 1.0757682796397077 " " y[1] (numeric) = 1.0757682796396897 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.6718854180150403000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 5.0000000000000700E-2 " " y[1] (analytic) = 1.0772895557275484 " " y[1] (numeric) = 1.0772895557275306 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.6489130800127236000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 5.1000000000000700E-2 " " y[1] (analytic) = 1.0788098305629563 " " y[1] (numeric) = 1.0788098305629386 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.6465894072111790000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 5.2000000000000700E-2 " " y[1] (analytic) = 1.0803291040952376 " " y[1] (numeric) = 1.0803291040952197 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.664827220774568200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 5.3000000000000700E-2 " " y[1] (analytic) = 1.0818473762726863 " " y[1] (numeric) = 1.0818473762726684 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.6624907906042888000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 5.4000000000000700E-2 " " y[1] (analytic) = 1.0833646470425848 " " y[1] (numeric) = 1.0833646470425669 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.6601624437372430000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 5.5000000000000700E-2 " " y[1] (analytic) = 1.0848809163512028 " " y[1] (numeric) = 1.0848809163511846 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.6783093268052565000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 5.6000000000000700E-2 " " y[1] (analytic) = 1.0863961841437955 " " y[1] (numeric) = 1.0863961841437777 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.6350911990732211000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 5.7000000000000710E-2 " " y[1] (analytic) = 1.0879104503646064 " " y[1] (numeric) = 1.0879104503645887 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.6328153101249424000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 5.800000000000071000E-2 " " y[1] (analytic) = 1.089423714956864 " " y[1] (numeric) = 1.0894237149568458 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.6713109283263128000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 5.900000000000071000E-2 " " y[1] (analytic) = 1.090935977862781 " " y[1] (numeric) = 1.0909359778627628 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.668994145698873000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 6.000000000000071000E-2 " " y[1] (analytic) = 1.0924472390235556 " " y[1] (numeric) = 1.0924472390235378 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.6260344444533384000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 6.100000000000071000E-2 " " y[1] (analytic) = 1.0939574983793714 " " y[1] (numeric) = 1.0939574983793534 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.644086998404607200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 6.20000000000007100E-2 " " y[1] (analytic) = 1.0954667558693938 " " y[1] (numeric) = 1.095466755869376 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.6215524842563414000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 6.30000000000007100E-2 " " y[1] (analytic) = 1.0969750114317731 " " y[1] (numeric) = 1.096975011431755 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 1.6598060497374423000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 6.40000000000007100E-2 " " y[1] (analytic) = 1.09848226500364 " " y[1] (numeric) = 1.0984822650036221 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.6373148271873042000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 6.50000000000007100E-2 " " y[1] (analytic) = 1.0999885165211092 " " y[1] (numeric) = 1.0999885165210914 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.6148867126524785000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 6.60000000000007100E-2 " " y[1] (analytic) = 1.101493765919276 " " y[1] (numeric) = 1.101493765919258 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.6328383832401670000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 6.70000000000007100E-2 " " y[1] (analytic) = 1.1029980131322161 " " y[1] (numeric) = 1.1029980131321984 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.6104805432567165000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 6.80000000000007200E-2 " " y[1] (analytic) = 1.104501258092986 " " y[1] (numeric) = 1.1045012580929685 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.588185043751275000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 6.90000000000007200E-2 " " y[1] (analytic) = 1.1060035007336224 " " y[1] (numeric) = 1.1060035007336044 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.6261804765534207000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 7.00000000000007200E-2 " " y[1] (analytic) = 1.107504740985139 " " y[1] (numeric) = 1.1075047409851213 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.603927074677946000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 7.10000000000007200E-2 " " y[1] (analytic) = 1.1090049787775302 " " y[1] (numeric) = 1.1090049787775123 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.6217792835117203000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 7.20000000000007200E-2 " " y[1] (analytic) = 1.1105042140397663 " " y[1] (numeric) = 1.1105042140397483 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.6195898017802104000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 7.30000000000007200E-2 " " y[1] (analytic) = 1.1120024466997958 " " y[1] (numeric) = 1.1120024466997778 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.6174076821777950000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 7.40000000000007200E-2 " " y[1] (analytic) = 1.1134996766845426 " " y[1] (numeric) = 1.1134996766845249 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.5952917424182575000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 7.50000000000007200E-2 " " y[1] (analytic) = 1.114995903919908 " " y[1] (numeric) = 1.1149959039198902 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.5931510000666774000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 7.60000000000007200E-2 " " y[1] (analytic) = 1.1164911283307668 " " y[1] (numeric) = 1.1164911283307488 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.610905142239446000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 7.70000000000007200E-2 " " y[1] (analytic) = 1.1179853498409686 " " y[1] (numeric) = 1.1179853498409507 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.6087521183963596000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 7.80000000000007200E-2 " " y[1] (analytic) = 1.119478568373337 " " y[1] (numeric) = 1.119478568373319 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.6066062814459775000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 7.90000000000007300E-2 " " y[1] (analytic) = 1.120970783849668 " " y[1] (numeric) = 1.1209707838496503 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.58465935508135000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 8.00000000000007300E-2 " " y[1] (analytic) = 1.1224619961907307 " " y[1] (numeric) = 1.1224619961907132 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.562772178355051000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 8.10000000000007300E-2 " " y[1] (analytic) = 1.1239522053162658 " " y[1] (numeric) = 1.123952205316248 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.5804558512347120000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 8.20000000000007300E-2 " " y[1] (analytic) = 1.1254414111449837 " " y[1] (numeric) = 1.1254414111449658 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 1.5980941185227596000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 8.30000000000007300E-2 " " y[1] (analytic) = 1.126929613594565 " " y[1] (numeric) = 1.1269296135945475 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.5565766998637398000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 8.40000000000007300E-2 " " y[1] (analytic) = 1.1284168125816612 " " y[1] (numeric) = 1.1284168125816436 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.554525206775757000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 8.50000000000007300E-2 " " y[1] (analytic) = 1.1299030080218908 " " y[1] (numeric) = 1.129903008021873 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.5721321447847983000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 8.60000000000007300E-2 " " y[1] (analytic) = 1.1313881998298403 " " y[1] (numeric) = 1.1313881998298225 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.5700683811864158000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 8.70000000000007300E-2 " " y[1] (analytic) = 1.1328723879190634 " " y[1] (numeric) = 1.1328723879190459 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.5484112752804338000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 8.80000000000007300E-2 " " y[1] (analytic) = 1.1343555722020806 " " y[1] (numeric) = 1.1343555722020628 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.5659612232096481000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 8.90000000000007300E-2 " " y[1] (analytic) = 1.1358377525903762 " " y[1] (numeric) = 1.135837752590359 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.524819820846232000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 9.00000000000007300E-2 " " y[1] (analytic) = 1.137318928994401 " " y[1] (numeric) = 1.1373189289943837 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.522833986370564000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 9.10000000000007400E-2 " " y[1] (analytic) = 1.1387991013235688 " " y[1] (numeric) = 1.1387991013235512 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.5403527952111873000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 9.20000000000007400E-2 " " y[1] (analytic) = 1.1402782694862554 " " y[1] (numeric) = 1.140278269486238 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.538354650657395000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 9.30000000000007400E-2 " " y[1] (analytic) = 1.1417564333897998 " " y[1] (numeric) = 1.1417564333897823 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.5363630347146667000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 9.40000000000007400E-2 " " y[1] (analytic) = 1.1432335929405015 " " y[1] (numeric) = 1.1432335929404844 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.4955329063810346000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 9.50000000000007400E-2 " " y[1] (analytic) = 1.144709748043622 " " y[1] (numeric) = 1.1447097480436044 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.5323992670680928000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 40.55682942690155 " " Order of pole = 1138.1692505546816 " " x[1] = 9.60000000000007400E-2 " " y[1] (analytic) = 1.1461848986033796 " " y[1] (numeric) = 1.146184898603362 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.5304270550459817000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 12.99801131309396 " " Order of pole = 347.8297111848114 " " x[1] = 9.70000000000007400E-2 " " y[1] (analytic) = 1.1476590445229533 " " y[1] (numeric) = 1.1476590445229358 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.5284612509954076000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 7.885574012525102 " " Order of pole = 201.2258220645667 " " x[1] = 9.80000000000007400E-2 " " y[1] (analytic) = 1.1491321857044794 " " y[1] (numeric) = 1.1491321857044616 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.5458246331437048000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 5.7337199549660065 " " Order of pole = 139.52815554799878 " " x[1] = 9.90000000000007400E-2 " " y[1] (analytic) = 1.15060432204905 " " y[1] (numeric) = 1.1506043220490325 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.5245487482472433000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 4.549144393238099 " " Order of pole = 105.57110970436187 " " x[1] = 0.10000000000000074 " " y[1] (analytic) = 1.1520754534567148 " " y[1] (numeric) = 1.1520754534566973 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.522601990732939000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 3.7999605235068126 " " Order of pole = 84.10080562682664 " " x[1] = 0.10100000000000074 " " y[1] (analytic) = 1.1535455798264769 " " y[1] (numeric) = 1.1535455798264596 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.501412643508871000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 3.2838365409265986 " " Order of pole = 69.31460848752353 " " x[1] = 0.10200000000000074 " " y[1] (analytic) = 1.1550147010562948 " " y[1] (numeric) = 1.1550147010562772 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.5187273177592660000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 2.906990085094474 " " Order of pole = 58.52295189180188 " " x[1] = 0.10300000000000074 " " y[1] (analytic) = 1.156482817043079 " " y[1] (numeric) = 1.1564828170430612 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.53599933628247000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 2.620001922319977 " " Order of pole = 50.308550861276586 " " x[1] = 0.10400000000000074 " " y[1] (analytic) = 1.1579499276826921 " " y[1] (numeric) = 1.1579499276826746 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.51487757542175000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 2.394357815069656 " " Order of pole = 43.85365063699412 " " x[1] = 0.10500000000000075 " " y[1] (analytic) = 1.159416032869949 " " y[1] (numeric) = 1.1594160328699317 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.4938105643822122000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 2.2124516935607423 " " Order of pole = 38.65332956921908 " " x[1] = 0.10600000000000075 " " y[1] (analytic) = 1.1608811324986141 " " y[1] (numeric) = 1.1608811324985968 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.4919252884121725000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 2.0628246846824494 " " Order of pole = 34.37896014919942 " " x[1] = 0.10700000000000075 " " y[1] (analytic) = 1.162345226461401 " " y[1] (numeric) = 1.1623452264613836 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.490046054293112000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.9376975153603129 " " Order of pole = 30.807441284122206 " " x[1] = 0.10800000000000075 " " y[1] (analytic) = 1.1638083146499718 " " y[1] (numeric) = 1.1638083146499543 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.5072519733933400000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.8316032277411187 " " Order of pole = 27.781986202550357 " " x[1] = 0.10900000000000075 " " y[1] (analytic) = 1.1652703969549352 " " y[1] (numeric) = 1.1652703969549176 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.5053608016574252000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.7405873973103176 " " Order of pole = 25.189185667060613 " " x[1] = 0.11000000000000075 " " y[1] (analytic) = 1.1667314732658465 " " y[1] (numeric) = 1.1667314732658292 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.48444432853712000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.661718829472825 " " Order of pole = 22.944975338930057 " " x[1] = 0.11100000000000075 " " y[1] (analytic) = 1.1681915434712071 " " y[1] (numeric) = 1.1681915434711894 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.520604090423321200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.5927786627177813 " " Order of pole = 20.985719630924493 " " x[1] = 0.11200000000000075 " " y[1] (analytic) = 1.1696506074584607 " " y[1] (numeric) = 1.1696506074584432 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.4997233940820612000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.5320563350533174 " " Order of pole = 19.262360271289012 " " x[1] = 0.11300000000000075 " " y[1] (analytic) = 1.1711086651139957 " " y[1] (numeric) = 1.1711086651139782 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.497856203409611000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.4782118821232688 " " Order of pole = 17.73646718134161 " " x[1] = 0.11400000000000075 " " y[1] (analytic) = 1.1725657163231418 " " y[1] (numeric) = 1.172565716323124 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.5149315852167664000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.4301807015363996 " " Order of pole = 16.37750723347277 " " x[1] = 0.11500000000000075 " " y[1] (analytic) = 1.1740217609701693 " " y[1] (numeric) = 1.1740217609701518 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.4941395783483427000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.3871062514073131 " " Order of pole = 15.160914129095467 " " x[1] = 0.11600000000000076 " " y[1] (analytic) = 1.1754767989382895 " " y[1] (numeric) = 1.1754767989382722 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.473400342720136100000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.3482915695045496 " " Order of pole = 14.066698029234296 " " x[1] = 0.11700000000000076 " " y[1] (analytic) = 1.1769308301096522 " " y[1] (numeric) = 1.1769308301096346 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.4904464510835497000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.313163746168816 " " Order of pole = 13.078426683858098 " " x[1] = 0.11800000000000076 " " y[1] (analytic) = 1.1783838543653435 " " y[1] (numeric) = 1.1783838543653262 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.469765486007987000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.2812474851507432 " " Order of pole = 12.182467191965571 " " x[1] = 0.11900000000000076 " " y[1] (analytic) = 1.1798358715853885 " " y[1] (numeric) = 1.179835871585371 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.4867766111829000000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.252145151114365 " " Order of pole = 11.367413791559471 " " x[1] = 0.12000000000000076 " " y[1] (analytic) = 1.1812868816487456 " " y[1] (numeric) = 1.181286881648728 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.4849503589335064000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.2255215200502712 " " Order of pole = 10.623650523505681 " " x[1] = 0.12100000000000076 " " y[1] (analytic) = 1.1827368844333088 " " y[1] (numeric) = 1.1827368844332913 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.4831298507683086000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.201091988235046 " " Order of pole = 9.943013082412484 " " x[1] = 0.12200000000000076 " " y[1] (analytic) = 1.1841858798159048 " " y[1] (numeric) = 1.1841858798158875 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.4625642375371806000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.1786133579505376 " " Order of pole = 9.318524565936698 " " x[1] = 0.12300000000000076 " " y[1] (analytic) = 1.1856338676722933 " " y[1] (numeric) = 1.1856338676722755 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 1.4982338880785342000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.1578765660833257 " " Order of pole = 8.744186943598457 " " x[1] = 0.12400000000000076 " " y[1] (analytic) = 1.1870808478771628 " " y[1] (numeric) = 1.1870808478771453 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.4777025356315615000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.1387008938794934 " " Order of pole = 8.214815003376174 " " x[1] = 0.12500000000000075 " " y[1] (analytic) = 1.1885268203041337 " " y[1] (numeric) = 1.1885268203041162 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.4759047494265842000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.1209293174149002 " " Order of pole = 7.725903012665945 " " x[1] = 0.12600000000000075 " " y[1] (analytic) = 1.1899717848257536 " " y[1] (numeric) = 1.1899717848257363 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.455452927960684000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.104424744925185 " " Order of pole = 7.2735168133181105 " " x[1] = 0.12700000000000075 " " y[1] (analytic) = 1.1914157413134983 " " y[1] (numeric) = 1.1914157413134812 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.435051929092193100000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.0890669497097856 " " Order of pole = 6.854205864895171 " " x[1] = 0.12800000000000075 " " y[1] (analytic) = 1.1928586896377693 " " y[1] (numeric) = 1.1928586896377522 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.4333160103330697000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.0747500530677534 " " Order of pole = 6.464931062167608 " " x[1] = 0.12900000000000075 " " y[1] (analytic) = 1.194300629667893 " " y[1] (numeric) = 1.1943006296678758 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.4501775142636056000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.061380445513687 " " Order of pole = 6.103005121934224 " " x[1] = 0.13000000000000075 " " y[1] (analytic) = 1.1957415612721194 " " y[1] (numeric) = 1.195741561272102 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.4484299739256940000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.0488750597380356 " " Order of pole = 5.766043057417857 " " x[1] = 0.13100000000000075 " " y[1] (analytic) = 1.1971814843176212 " " y[1] (numeric) = 1.1971814843176036 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.4652351392717977000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.0371599277670598 " " Order of pole = 5.4519208031287825 " " x[1] = 0.13200000000000076 " " y[1] (analytic) = 1.1986203986704913 " " y[1] (numeric) = 1.1986203986704744 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 1.407901116401869000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.0261689692018032 " " Order of pole = 5.158740466750167 " " x[1] = 0.13300000000000076 " " y[1] (analytic) = 1.200058304195745 " " y[1] (numeric) = 1.200058304195728 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.4247169924536100000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.0158429684698511 " " Order of pole = 4.884801001632052 " " x[1] = 0.13400000000000076 " " y[1] (analytic) = 1.2014952007573139 " " y[1] (numeric) = 1.2014952007572968 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.423013139665538000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 1.0061287075505143 " " Order of pole = 4.628573338017425 " " x[1] = 0.13500000000000076 " " y[1] (analytic) = 1.2029310882180473 " " y[1] (numeric) = 1.2029310882180304 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 1.4028559191450116000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.9969782272682853 " " Order of pole = 4.388679201387510 " " x[1] = 0.13600000000000076 " " y[1] (analytic) = 1.2043659664397115 " " y[1] (numeric) = 1.2043659664396946 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 1.4011845605525200000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.988348195441444 " " Order of pole = 4.163872995214610 " " x[1] = 0.13700000000000076 " " y[1] (analytic) = 1.2057998352829875 " " y[1] (numeric) = 1.2057998352829702 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.436347781560921900000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.980199364263505 " " Order of pole = 3.9530262427296314 " " x[1] = 0.13800000000000076 " " y[1] (analytic) = 1.2072326946074683 " " y[1] (numeric) = 1.2072326946074512 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.4162501277176429000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.9724961025411704 " " Order of pole = 3.755114175404209 " " x[1] = 0.13900000000000076 " " y[1] (analytic) = 1.2086645442716608 " " y[1] (numeric) = 1.2086645442716437 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.4145723608969019000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.9652059909990164 " " Order of pole = 3.5692041300266695 " " x[1] = 0.14000000000000076 " " y[1] (analytic) = 1.2100953841329816 " " y[1] (numeric) = 1.2100953841329647 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 1.3945503962394987000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.9582994709359902 " " Order of pole = 3.3944454757545195 " " x[1] = 0.14100000000000076 " " y[1] (analytic) = 1.2115252140477577 " " y[1] (numeric) = 1.2115252140477406 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.4112322534422660000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.9517495381928645 " " Order of pole = 3.230060840538414 " " x[1] = 0.14200000000000076 " " y[1] (analytic) = 1.212954033871223 " " y[1] (numeric) = 1.212954033871206 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.4095698684194832000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.9455314757453442 " " Order of pole = 3.0753384451880734 " " x[1] = 0.14300000000000077 " " y[1] (analytic) = 1.2143818434575193 " " y[1] (numeric) = 1.214381843457502 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.4261971452769254000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.9396226193409157 " " Order of pole = 2.929625384993887 " " x[1] = 0.14400000000000077 " " y[1] (analytic) = 1.2158086426596924 " " y[1] (numeric) = 1.2158086426596753 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.4062603257882106000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.9340021515017282 " " Order of pole = 2.7923217247514813 " " x[1] = 0.14500000000000077 " " y[1] (analytic) = 1.2172344313296932 " " y[1] (numeric) = 1.2172344313296761 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.4046131245688118000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.9286509199568247 " " Order of pole = 2.662875294287389 " " x[1] = 0.14600000000000077 " " y[1] (analytic) = 1.2186592093183748 " " y[1] (numeric) = 1.2186592093183575 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.421191343053128000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.9235512771795901 " " Order of pole = 2.5407770891516073 " " x[1] = 0.14700000000000077 " " y[1] (analytic) = 1.2200829764754908 " " y[1] (numeric) = 1.2200829764754735 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.4195328939171015000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.9186869382141234 " " Order of pole = 2.4255571957088655 " " x[1] = 0.14800000000000077 " " y[1] (analytic) = 1.221505732649695 " " y[1] (numeric) = 1.2215057326496779 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3997015423038245000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.9140428543946167 " " Order of pole = 2.3167811719141156 " " x[1] = 0.14900000000000077 " " y[1] (analytic) = 1.2229274776885397 " " y[1] (numeric) = 1.2229274776885224 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.4162310930234442000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.9096051009150034 " " Order of pole = 2.214046825189101 " " x[1] = 0.15000000000000077 " " y[1] (analytic) = 1.2243482114384734 " " y[1] (numeric) = 1.224348211438456 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.4145876983643382000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.905360776500974 " " Order of pole = 2.1169813372720157 " " x[1] = 0.15100000000000077 " " y[1] (analytic) = 1.22576793374484 " " y[1] (numeric) = 1.2257679337448226 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.41294927917063000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.9012979136836452 " " Order of pole = 2.025238693000876 " " x[1] = 0.15200000000000077 " " y[1] (analytic) = 1.2271866444518773 " " y[1] (numeric) = 1.22718664445186 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.4113158143020849000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8974053983838644 " " Order of pole = 1.9384973760064739 " " x[1] = 0.15300000000000077 " " y[1] (analytic) = 1.2286043434027154 " " y[1] (numeric) = 1.2286043434026983 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3916143688597693000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8936728976929095 " " Order of pole = 1.856458299360277 " " x[1] = 0.15400000000000078 " " y[1] (analytic) = 1.2300210304393755 " " y[1] (numeric) = 1.2300210304393586 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 1.3719594670893004000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8900907948849865 " " Order of pole = 1.7788429435143378 " " x[1] = 0.15500000000000078 " " y[1] (analytic) = 1.2314367054027682 " " y[1] (numeric) = 1.231436705402751 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3884135907444242000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8866501308252888 " " Order of pole = 1.7053916775522424 " " x[1] = 0.15600000000000078 " " y[1] (analytic) = 1.232851368132691 " " y[1] (numeric) = 1.2328513681326738 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3868204246813334000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8833425510456989 " " Order of pole = 1.63586224287614 " " x[1] = 0.15700000000000078 " " y[1] (analytic) = 1.2342650184678285 " " y[1] (numeric) = 1.2342650184678112 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.4032220734613550000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8801602578545571 " " Order of pole = 1.5700283811622349 " " x[1] = 0.15800000000000078 " " y[1] (analytic) = 1.2356776562457497 " " y[1] (numeric) = 1.2356776562457323 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.4016178974031696000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8770959669251657 " " Order of pole = 1.5076785906582089 " " x[1] = 0.15900000000000078 " " y[1] (analytic) = 1.2370892813029064 " " y[1] (numeric) = 1.2370892813028895 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 1.3641206200193703000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8741428678788244 " " Order of pole = 1.4486149969400444 " " x[1] = 0.16000000000000078 " " y[1] (analytic) = 1.2384998934746339 " " y[1] (numeric) = 1.2384998934746163 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.4163524665201555000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8712945884359584 " " Order of pole = 1.392652325899686 " " x[1] = 0.16100000000000078 " " y[1] (analytic) = 1.2399094925951437 " " y[1] (numeric) = 1.2399094925951266 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3789260168854986000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8685451617602903 " " Order of pole = 1.3396169682091212 " " x[1] = 0.16200000000000078 " " y[1] (analytic) = 1.2413180784975295 " " y[1] (numeric) = 1.2413180784975124 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3773612803514354000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.865888996667169 " " Order of pole = 1.289346125833294 " " x[1] = 0.16300000000000078 " " y[1] (analytic) = 1.2427256510137599 " " y[1] (numeric) = 1.2427256510137428 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3758012128646488000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8633208504028902 " " Order of pole = 1.2416870321835027 " " x[1] = 0.16400000000000078 " " y[1] (analytic) = 1.2441322099746785 " " y[1] (numeric) = 1.2441322099746617 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 1.356398446966166000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8608358037386986 " " Order of pole = 1.1964962385664926 " " x[1] = 0.16500000000000078 " " y[1] (analytic) = 1.2455377552100038 " " y[1] (numeric) = 1.2455377552099867 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3726950072536900000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8584292381497713 " " Order of pole = 1.1536389603419224 " " x[1] = 0.16600000000000079 " " y[1] (analytic) = 1.2469422865483244 " " y[1] (numeric) = 1.2469422865483073 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3711488305168493000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8560968148768259 " " Order of pole = 1.112988476988935 " " x[1] = 0.1670000000000008 " " y[1] (analytic) = 1.2483458038171005 " " y[1] (numeric) = 1.2483458038170834 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3696072456003877000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8538344556898307 " " Order of pole = 1.0744255809075902 " " x[1] = 0.1680000000000008 " " y[1] (analytic) = 1.24974830684266 " " y[1] (numeric) = 1.249748306842643 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3680702334714132000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8516383251921782 " " Order of pole = 1.0378380703205288 " " x[1] = 0.1690000000000008 " " y[1] (analytic) = 1.2511497954501984 " " y[1] (numeric) = 1.2511497954501811 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.3842850190388603000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8495048145231896 " " Order of pole = 1.003120282205014 " " x[1] = 0.1700000000000008 " " y[1] (analytic) = 1.2525502694637751 " " y[1] (numeric) = 1.252550269463758 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.36500985198358020000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8474305263290409 " " Order of pole = 0.9701726615289736 " " x[1] = 0.1710000000000008 " " y[1] (analytic) = 1.2539497287063148 " " y[1] (numeric) = 1.2539497287062975 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.3811940612659765000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8454122608884738 " " Order of pole = 0.9389013635380046 " " x[1] = 0.1720000000000008 " " y[1] (analytic) = 1.2553481729996023 " " y[1] (numeric) = 1.255348172999585 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.3796554260136665000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.843447003289398 " " Order of pole = 0.9092178861148987 " " x[1] = 0.1730000000000008 " " y[1] (analytic) = 1.2567456021642835 " " y[1] (numeric) = 1.256745602164266 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.3957895503169956000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8415319115642259 " " Order of pole = 0.8810387295724027 " " x[1] = 0.1740000000000008 " " y[1] (analytic) = 1.2581420160198613 " " y[1] (numeric) = 1.2581420160198442 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3589431369055802000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8396643057007649 " " Order of pole = 0.8542850814973377 " " x[1] = 0.1750000000000008 " " y[1] (analytic) = 1.259537414384697 " " y[1] (numeric) = 1.2595374143846796 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.375066670219818000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8378416574533543 " " Order of pole = 0.8288825244878879 " " x[1] = 0.1760000000000008 " " y[1] (analytic) = 1.2609317970760041 " " y[1] (numeric) = 1.2609317970759872 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 1.3383269430935918000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8360615808868717 " " Order of pole = 0.8047607648558284 " " x[1] = 0.1770000000000008 " " y[1] (analytic) = 1.2623251639098516 " " y[1] (numeric) = 1.2623251639098347 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 1.3368496847542470000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.834321823592456 " " Order of pole = 0.7818533805423371 " " x[1] = 0.1780000000000008 " " y[1] (analytic) = 1.2637175147011583 " " y[1] (numeric) = 1.2637175147011412 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3529475045117642000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8326202585195805 " " Order of pole = 0.7600975866623259 " " x[1] = 0.1790000000000008 " " y[1] (analytic) = 1.2651088492636924 " " y[1] (numeric) = 1.265108849263675 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.369010990179428000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8309548763748277 " " Order of pole = 0.7394340172571283 " " x[1] = 0.1800000000000008 " " y[1] (analytic) = 1.2664991674100687 " " y[1] (numeric) = 1.2664991674100519 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 1.3324438269321376000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8293237785411824 " " Order of pole = 0.7198065219319254 " " x[1] = 0.1810000000000008 " " y[1] (analytic) = 1.26788846895175 " " y[1] (numeric) = 1.2678884689517331 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 1.3309837882076817000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8277251704775495 " " Order of pole = 0.7011619762271089 " " x[1] = 0.1820000000000008 " " y[1] (analytic) = 1.269276753699041 " " y[1] (numeric) = 1.269276753699024 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3470218003599704000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8261573555604909 " " Order of pole = 0.6834501046354085 " " x[1] = 0.1830000000000008 " " y[1] (analytic) = 1.2706640214610887 " " y[1] (numeric) = 1.2706640214610716 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3455511677719270000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8246187293339087 " " Order of pole = 0.6666233152833847 " " x[1] = 0.1840000000000008 " " y[1] (analytic) = 1.2720502720458806 " " y[1] (numeric) = 1.2720502720458635 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3440848176329573000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8231077741362423 " " Order of pole = 0.6506365454092595 " " x[1] = 0.1850000000000008 " " y[1] (analytic) = 1.2734355052602422 " " y[1] (numeric) = 1.273435505260225 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3426227326474094000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8216230540762351 " " Order of pole = 0.6354471168077005 " " x[1] = 0.1860000000000008 " " y[1] (analytic) = 1.274819720909835 " " y[1] (numeric) = 1.274819720909818 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3411648956155950000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8201632103314314 " " Order of pole = 0.6210146005029564 " " x[1] = 0.1870000000000008 " " y[1] (analytic) = 1.2762029187991555 " " y[1] (numeric) = 1.2762029187991382 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.3571101373478464000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8187269567461005 " " Order of pole = 0.6073006899857454 " " x[1] = 0.1880000000000008 " " y[1] (analytic) = 1.2775850987315316 " " y[1] (numeric) = 1.2775850987315143 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.3556419217278232000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8173130757062882 " " Order of pole = 0.594269082374467 " " x[1] = 0.1890000000000008 " " y[1] (analytic) = 1.2789662605091228 " " y[1] (numeric) = 1.2789662605091052 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.3715392134030693000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8159204142725572 " " Order of pole = 0.5818853669470663 " " x[1] = 0.1900000000000008 " " y[1] (analytic) = 1.280346403932916 " " y[1] (numeric) = 1.2803464039328987 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.3527182277351793000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8145478805520551 " " Order of pole = 0.5701169205184691 " " x[1] = 0.1910000000000008 " " y[1] (analytic) = 1.2817255288027256 " " y[1] (numeric) = 1.2817255288027085 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.3339388344085115000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8131944402929226 " " Order of pole = 0.5589328091778256 " " x[1] = 0.1920000000000008 " " y[1] (analytic) = 1.283103634917191 " " y[1] (numeric) = 1.2831036349171734 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 1.367116678007819000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8118591136860333 " " Order of pole = 0.5483036959581788 " " x[1] = 0.1930000000000008 " " y[1] (analytic) = 1.2844807220737717 " " y[1] (numeric) = 1.2844807220737546 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.331077554174881000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8105409723594401 " " Order of pole = 0.5382017540197808 " " x[1] = 0.1940000000000008 " " y[1] (analytic) = 1.2858567900687512 " " y[1] (numeric) = 1.2858567900687339 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.3469213148710300000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.809239136552581 " " Order of pole = 0.5286005849775144 " " x[1] = 0.1950000000000008 " " y[1] (analytic) = 1.287231838697229 " " y[1] (numeric) = 1.2872318386972117 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.3454825046652820000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.807952772458551 " " Order of pole = 0.5194751420404025 " " x[1] = 0.1960000000000008 " " y[1] (analytic) = 1.288605867753122 " " y[1] (numeric) = 1.2886058677531047 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.3440478285537807000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8066810897224841 " " Order of pole = 0.5108016576186856 " " x[1] = 0.1970000000000008 " " y[1] (analytic) = 1.2899788770291614 " " y[1] (numeric) = 1.289978877029144 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.3426172701400688000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8054233390868608 " " Order of pole = 0.5025575751406706 " " x[1] = 0.19800000000000081 " " y[1] (analytic) = 1.2913508663168907 " " y[1] (numeric) = 1.2913508663168733 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.341190813117272000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8041788101730076 " " Order of pole = 0.49472148476851885 " " x[1] = 0.19900000000000082 " " y[1] (analytic) = 1.2927218354066636 " " y[1] (numeric) = 1.2927218354066465 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 1.322591922789709000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "Real estimate of pole used" Radius of convergence = 0.8029468293909879 " " Order of pole = 0.4872730627942836 " " x[1] = 0.20000000000000082 " " y[1] (analytic) = 1.2940917840876431 " " y[1] (numeric) = 1.2940917840876258 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 1.3383501384612354000000000000E-12 "%" h = 1.000E-3 " " "Finished!" "Maximum Iterations Reached before Solution Completed!" "diff ( y , x , 1 ) = arccos ( x ) ;" Iterations = 1000 "Total Elapsed Time "= 11 Minutes 16 Seconds "Elapsed Time(since restart) "= 11 Minutes 16 Seconds "Expected Time Remaining "= 6 Minutes 45 Seconds "Optimized Time Remaining "= 6 Minutes 44 Seconds "Time to Timeout "= 3 Minutes 43 Seconds Percent Done = 62.56250000000005 "%" (%o49) true (%o49) diffeq.max