(%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_g : sin(array_x ), 1 1 array_tmp1 : cos(array_x ), array_tmp2 : array_tmp1 + array_const_0D0 , 1 1 1 1 1 if not array_y_set_initial then (if 1 <= glob_max_terms 1, 2 1 then (temporary : array_tmp2 glob_h factorial_3(0, 1), 1 array_y : temporary, array_y_higher : temporary, 2 1, 2 temporary 2.0 temporary : -------------, array_y_higher : temporary)), kkk : 2, glob_h 2, 1 array_tmp1_g : att(1, array_tmp1, array_x, 1), 2 array_tmp1 : - att(1, array_tmp1_g, array_x, 1), 2 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 array_tmp1_g : att(2, array_tmp1, array_x, 1), 3 array_tmp1 : - att(2, array_tmp1_g, array_x, 1), 3 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 array_tmp1_g : att(3, array_tmp1, array_x, 1), 4 array_tmp1 : - att(3, array_tmp1_g, array_x, 1), 4 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 array_tmp1_g : att(4, array_tmp1, array_x, 1), 5 array_tmp1 : - att(4, array_tmp1_g, array_x, 1), 5 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 (array_tmp1_g : kkk att(kkk - 1, array_tmp1, array_x, 1), array_tmp1 : kkk - att(kkk - 1, array_tmp1_g, array_x, 1), 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_g : sin(array_x ), 1 1 array_tmp1 : cos(array_x ), array_tmp2 : array_tmp1 + array_const_0D0 , 1 1 1 1 1 if not array_y_set_initial then (if 1 <= glob_max_terms 1, 2 1 then (temporary : array_tmp2 glob_h factorial_3(0, 1), 1 array_y : temporary, array_y_higher : temporary, 2 1, 2 temporary 2.0 temporary : -------------, array_y_higher : temporary)), kkk : 2, glob_h 2, 1 array_tmp1_g : att(1, array_tmp1, array_x, 1), 2 array_tmp1 : - att(1, array_tmp1_g, array_x, 1), 2 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 array_tmp1_g : att(2, array_tmp1, array_x, 1), 3 array_tmp1 : - att(2, array_tmp1_g, array_x, 1), 3 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 array_tmp1_g : att(3, array_tmp1, array_x, 1), 4 array_tmp1 : - att(3, array_tmp1_g, array_x, 1), 4 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 array_tmp1_g : att(4, array_tmp1, array_x, 1), 5 array_tmp1 : - att(4, array_tmp1_g, array_x, 1), 5 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 (array_tmp1_g : kkk att(kkk - 1, array_tmp1, array_x, 1), array_tmp1 : kkk - att(kkk - 1, array_tmp1_g, array_x, 1), 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 ret : array_fact_1 nnn else ret : nnn!, ret) (%o39) factorial_1(nnn) := (if nnn <= glob_max_terms then ret : array_fact_1 nnn else ret : nnn!, ret) (%i40) factorial_3(mmm, nnn) := (if (nnn <= glob_max_terms) mmm! and (mmm <= glob_max_terms) then ret : array_fact_2 else ret : ----, mmm, nnn nnn! ret) (%o40) factorial_3(mmm, nnn) := (if (nnn <= glob_max_terms) mmm! and (mmm <= glob_max_terms) then ret : array_fact_2 else ret : ----, mmm, nnn nnn! ret) (%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) := sin(x) + 1.0 (%o47) exact_soln_y(x) := sin(x) + 1.0 (%i48) mainprog() := (define_variable(ALWAYS, 1, fixnum), define_variable(DEBUGMASSIVE, 4, fixnum), define_variable(glob_iolevel, 5, fixnum), define_variable(DEBUGL, 3, fixnum), define_variable(INFO, 2, fixnum), define_variable(glob_max_terms, 30, fixnum), define_variable(glob_reached_optimal_h, false, boolean), define_variable(hours_in_day, 24.0, float), define_variable(glob_normmax, 0.0, float), define_variable(glob_iter, 0, fixnum), define_variable(glob_orig_start_sec, 0.0, float), define_variable(glob_max_trunc_err, 1.0E-11, float), define_variable(glob_disp_incr, 0.1, float), define_variable(glob_clock_sec, 0.0, float), define_variable(glob_optimal_expect_sec, 0.1, float), define_variable(glob_start, 0, fixnum), define_variable(glob_log10_abserr, 1.0E-11, float), define_variable(glob_not_yet_finished, true, boolean), define_variable(glob_almost_1, 0.999, float), define_variable(glob_display_flag, true, boolean), define_variable(glob_max_minutes, 0.0, float), define_variable(glob_unchanged_h_cnt, 0, fixnum), define_variable(glob_dump_analytic, false, boolean), define_variable(glob_hmin, 1.0E-11, float), define_variable(glob_dump, false, boolean), define_variable(glob_subiter_method, 3, fixnum), define_variable(glob_smallish_float, 1.0E-101, float), define_variable(glob_optimal_clock_start_sec, 0.0, float), define_variable(glob_max_rel_trunc_err, 1.0E-11, float), define_variable(glob_large_float, 9.0E+100, float), define_variable(glob_optimal_done, false, boolean), define_variable(years_in_century, 100.0, float), define_variable(glob_percent_done, 0.0, float), define_variable(glob_max_sec, 10000.0, float), define_variable(glob_warned, false, boolean), define_variable(glob_small_float, 1.0E-51, float), define_variable(glob_max_iter, 1000, fixnum), define_variable(glob_hmin_init, 0.001, float), define_variable(glob_clock_start_sec, 0.0, float), define_variable(min_in_hour, 60.0, float), define_variable(djd_debug, true, boolean), define_variable(glob_html_log, true, boolean), define_variable(glob_curr_iter_when_opt, 0, fixnum), define_variable(glob_hmax, 1.0, float), define_variable(glob_initial_pass, true, boolean), define_variable(centuries_in_millinium, 10.0, float), define_variable(glob_log10relerr, 0.0, float), define_variable(glob_warned2, false, boolean), define_variable(glob_log10_relerr, 1.0E-11, float), define_variable(glob_look_poles, false, boolean), define_variable(glob_last_good_h, 0.1, float), define_variable(glob_not_yet_start_msg, true, boolean), define_variable(days_in_year, 365.0, float), define_variable(sec_in_min, 60.0, float), define_variable(djd_debug2, true, boolean), define_variable(glob_log10abserr, 0.0, float), define_variable(glob_no_eqs, 0, fixnum), define_variable(glob_max_hours, 0.0, float), define_variable(glob_relerr, 1.0E-11, float), define_variable(glob_abserr, 1.0E-11, float), define_variable(glob_h, 0.1, float), define_variable(glob_max_opt_iter, 10, fixnum), define_variable(glob_log10normmin, 0.1, float), define_variable(glob_current_iter, 0, fixnum), define_variable(MAX_UNCHANGED, 10, fixnum), define_variable(glob_optimal_start, 0.0, 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/cospostode.ode#################"), omniout_str(ALWAYS, "diff ( y , x , 1 ) = cos ( x ) ;"), omniout_str(ALWAYS, "!"), omniout_str(ALWAYS, "/* BEGIN FIRST INPUT BLOCK */"), omniout_str(ALWAYS, "Digits : 32,"), omniout_str(ALWAYS, "max_terms : 30,"), omniout_str(ALWAYS, "!"), omniout_str(ALWAYS, "/* END FIRST INPUT BLOCK */"), omniout_str(ALWAYS, "/* BEGIN SECOND INPUT BLOCK */"), omniout_str(ALWAYS, "x_start : 1.6,"), omniout_str(ALWAYS, "x_end : 10.0 ,"), 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, "1.0 + sin(x) "), 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, Digits : 32, max_terms : 30, glob_max_terms : max_terms, glob_html_log : true, array(array_y_init, 1 + max_terms), array(array_last_rel_error, 1 + max_terms), array(array_fact_1, 1 + max_terms), array(array_pole, 1 + max_terms), array(array_y, 1 + max_terms), array(array_x, 1 + max_terms), array(array_1st_rel_error, 1 + max_terms), array(array_norms, 1 + max_terms), array(array_m1, 1 + max_terms), array(array_tmp1_g, 1 + max_terms), array(array_type_pole, 1 + max_terms), array(array_tmp0, 1 + max_terms), array(array_tmp1, 1 + max_terms), array(array_tmp2, 1 + max_terms), array(array_real_pole, 1 + 1, 1 + 3), array(array_y_higher, 1 + 2, 1 + max_terms), array(array_fact_2, 1 + max_terms, 1 + max_terms), array(array_y_set_initial, 1 + 2, 1 + max_terms), array(array_poles, 1 + 1, 1 + 3), array(array_complex_pole, 1 + 1, 1 + 3), array(array_y_higher_work2, 1 + 2, 1 + max_terms), array(array_y_higher_work, 1 + 2, 1 + max_terms), term : 1, while term <= max_terms do (array_y_init : 0.0, term : 1 + term), term term : 1, while term <= max_terms do (array_last_rel_error : 0.0, term term : 1 + term), term : 1, while term <= max_terms do (array_fact_1 : 0.0, term : 1 + term), term : 1, term while term <= max_terms do (array_pole : 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_1st_rel_error : 0.0, term : 1 + term), term term : 1, while term <= max_terms do (array_norms : 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_tmp1_g : 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_tmp0 : 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 ord : 1, while ord <= 1 do (term : 1, while term <= 3 do (array_real_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 : 0.0, term : 1 + term), ord, 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, 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_poles : 0.0, ord, term term : 1 + term), ord : 1 + ord), ord : 1, while ord <= 1 do (term : 1, while term <= 3 do (array_complex_pole : 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_work2 : 0.0, ord, term term : 1 + term), ord : 1 + ord), ord : 1, while ord <= 2 do (term : 1, while term <= max_terms do (array_y_higher_work : 0.0, term : 1 + term), ord, term ord : 1 + ord), 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_tmp1_g, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_tmp1_g : 0.0, term : 1 + term), term array(array_tmp2, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_tmp2 : 0.0, term : 1 + term), 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_tmp0, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_tmp0 : 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 (temp1 : iiif!, temp2 : jjjf!, temp1 array_fact_1 : temp1, array_fact_2 : -----, jjjf : 1 + jjjf), iiif iiif, jjjf temp2 iiif : 1 + iiif), x_start : 1.6, x_end : 10.0, array_y_init : exact_soln_y(x_start), glob_h : 1.0E-5, 1 + 0 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 ) = cos ( 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, "2012-06-16T21:15:32-05:00"), logitem_str(html_log_file, "Maxima"), logitem_str(html_log_file, "cos"), logitem_str(html_log_file, "diff ( y , x , 1 ) = cos ( 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, " 091 "), logitem_str(html_log_file, "cos diffeq.max"), logitem_str(html_log_file, "cos maxima results"), logitem_str(html_log_file, "Test of revised logic - mostly for speeding factorials"), logend(html_log_file)), if glob_html_log then close(html_log_file)) (%o48) mainprog() := (define_variable(ALWAYS, 1, fixnum), define_variable(DEBUGMASSIVE, 4, fixnum), define_variable(glob_iolevel, 5, fixnum), define_variable(DEBUGL, 3, fixnum), define_variable(INFO, 2, fixnum), define_variable(glob_max_terms, 30, fixnum), define_variable(glob_reached_optimal_h, false, boolean), define_variable(hours_in_day, 24.0, float), define_variable(glob_normmax, 0.0, float), define_variable(glob_iter, 0, fixnum), define_variable(glob_orig_start_sec, 0.0, float), define_variable(glob_max_trunc_err, 1.0E-11, float), define_variable(glob_disp_incr, 0.1, float), define_variable(glob_clock_sec, 0.0, float), define_variable(glob_optimal_expect_sec, 0.1, float), define_variable(glob_start, 0, fixnum), define_variable(glob_log10_abserr, 1.0E-11, float), define_variable(glob_not_yet_finished, true, boolean), define_variable(glob_almost_1, 0.999, float), define_variable(glob_display_flag, true, boolean), define_variable(glob_max_minutes, 0.0, float), define_variable(glob_unchanged_h_cnt, 0, fixnum), define_variable(glob_dump_analytic, false, boolean), define_variable(glob_hmin, 1.0E-11, float), define_variable(glob_dump, false, boolean), define_variable(glob_subiter_method, 3, fixnum), define_variable(glob_smallish_float, 1.0E-101, float), define_variable(glob_optimal_clock_start_sec, 0.0, float), define_variable(glob_max_rel_trunc_err, 1.0E-11, float), define_variable(glob_large_float, 9.0E+100, float), define_variable(glob_optimal_done, false, boolean), define_variable(years_in_century, 100.0, float), define_variable(glob_percent_done, 0.0, float), define_variable(glob_max_sec, 10000.0, float), define_variable(glob_warned, false, boolean), define_variable(glob_small_float, 1.0E-51, float), define_variable(glob_max_iter, 1000, fixnum), define_variable(glob_hmin_init, 0.001, float), define_variable(glob_clock_start_sec, 0.0, float), define_variable(min_in_hour, 60.0, float), define_variable(djd_debug, true, boolean), define_variable(glob_html_log, true, boolean), define_variable(glob_curr_iter_when_opt, 0, fixnum), define_variable(glob_hmax, 1.0, float), define_variable(glob_initial_pass, true, boolean), define_variable(centuries_in_millinium, 10.0, float), define_variable(glob_log10relerr, 0.0, float), define_variable(glob_warned2, false, boolean), define_variable(glob_log10_relerr, 1.0E-11, float), define_variable(glob_look_poles, false, boolean), define_variable(glob_last_good_h, 0.1, float), define_variable(glob_not_yet_start_msg, true, boolean), define_variable(days_in_year, 365.0, float), define_variable(sec_in_min, 60.0, float), define_variable(djd_debug2, true, boolean), define_variable(glob_log10abserr, 0.0, float), define_variable(glob_no_eqs, 0, fixnum), define_variable(glob_max_hours, 0.0, float), define_variable(glob_relerr, 1.0E-11, float), define_variable(glob_abserr, 1.0E-11, float), define_variable(glob_h, 0.1, float), define_variable(glob_max_opt_iter, 10, fixnum), define_variable(glob_log10normmin, 0.1, float), define_variable(glob_current_iter, 0, fixnum), define_variable(MAX_UNCHANGED, 10, fixnum), define_variable(glob_optimal_start, 0.0, 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/cospostode.ode#################"), omniout_str(ALWAYS, "diff ( y , x , 1 ) = cos ( x ) ;"), omniout_str(ALWAYS, "!"), omniout_str(ALWAYS, "/* BEGIN FIRST INPUT BLOCK */"), omniout_str(ALWAYS, "Digits : 32,"), omniout_str(ALWAYS, "max_terms : 30,"), omniout_str(ALWAYS, "!"), omniout_str(ALWAYS, "/* END FIRST INPUT BLOCK */"), omniout_str(ALWAYS, "/* BEGIN SECOND INPUT BLOCK */"), omniout_str(ALWAYS, "x_start : 1.6,"), omniout_str(ALWAYS, "x_end : 10.0 ,"), 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, "1.0 + sin(x) "), 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, Digits : 32, max_terms : 30, glob_max_terms : max_terms, glob_html_log : true, array(array_y_init, 1 + max_terms), array(array_last_rel_error, 1 + max_terms), array(array_fact_1, 1 + max_terms), array(array_pole, 1 + max_terms), array(array_y, 1 + max_terms), array(array_x, 1 + max_terms), array(array_1st_rel_error, 1 + max_terms), array(array_norms, 1 + max_terms), array(array_m1, 1 + max_terms), array(array_tmp1_g, 1 + max_terms), array(array_type_pole, 1 + max_terms), array(array_tmp0, 1 + max_terms), array(array_tmp1, 1 + max_terms), array(array_tmp2, 1 + max_terms), array(array_real_pole, 1 + 1, 1 + 3), array(array_y_higher, 1 + 2, 1 + max_terms), array(array_fact_2, 1 + max_terms, 1 + max_terms), array(array_y_set_initial, 1 + 2, 1 + max_terms), array(array_poles, 1 + 1, 1 + 3), array(array_complex_pole, 1 + 1, 1 + 3), array(array_y_higher_work2, 1 + 2, 1 + max_terms), array(array_y_higher_work, 1 + 2, 1 + max_terms), term : 1, while term <= max_terms do (array_y_init : 0.0, term : 1 + term), term term : 1, while term <= max_terms do (array_last_rel_error : 0.0, term term : 1 + term), term : 1, while term <= max_terms do (array_fact_1 : 0.0, term : 1 + term), term : 1, term while term <= max_terms do (array_pole : 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_1st_rel_error : 0.0, term : 1 + term), term term : 1, while term <= max_terms do (array_norms : 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_tmp1_g : 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_tmp0 : 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 ord : 1, while ord <= 1 do (term : 1, while term <= 3 do (array_real_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 : 0.0, term : 1 + term), ord, 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, 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_poles : 0.0, ord, term term : 1 + term), ord : 1 + ord), ord : 1, while ord <= 1 do (term : 1, while term <= 3 do (array_complex_pole : 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_work2 : 0.0, ord, term term : 1 + term), ord : 1 + ord), ord : 1, while ord <= 2 do (term : 1, while term <= max_terms do (array_y_higher_work : 0.0, term : 1 + term), ord, term ord : 1 + ord), 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_tmp1_g, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_tmp1_g : 0.0, term : 1 + term), term array(array_tmp2, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_tmp2 : 0.0, term : 1 + term), 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_tmp0, 1 + 1 + max_terms), term : 1, while term <= 1 + max_terms do (array_tmp0 : 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 (temp1 : iiif!, temp2 : jjjf!, temp1 array_fact_1 : temp1, array_fact_2 : -----, jjjf : 1 + jjjf), iiif iiif, jjjf temp2 iiif : 1 + iiif), x_start : 1.6, x_end : 10.0, array_y_init : exact_soln_y(x_start), glob_h : 1.0E-5, 1 + 0 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 ) = cos ( 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, "2012-06-16T21:15:32-05:00"), logitem_str(html_log_file, "Maxima"), logitem_str(html_log_file, "cos"), logitem_str(html_log_file, "diff ( y , x , 1 ) = cos ( 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, " 091 "), logitem_str(html_log_file, "cos diffeq.max"), logitem_str(html_log_file, "cos maxima results"), logitem_str(html_log_file, "Test of revised logic - mostly for speeding factorials"), logend(html_log_file)), if glob_html_log then close(html_log_file)) (%i49) mainprog() "##############ECHO OF PROBLEM#################" "##############temp/cospostode.ode#################" "diff ( y , x , 1 ) = cos ( x ) ;" "!" "/* BEGIN FIRST INPUT BLOCK */" "Digits : 32," "max_terms : 30," "!" "/* END FIRST INPUT BLOCK */" "/* BEGIN SECOND INPUT BLOCK */" "x_start : 1.6," "x_end : 10.0 ," "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) := (" "1.0 + sin(x) " ");" "/* END USER DEF BLOCK */" "#######END OF ECHO OF PROBLEM#################" "START of Soultion" x[1] = 1.6 " " y[1] (analytic) = 1.999573603041505 " " y[1] (numeric) = 1.999573603041505 " " absolute error = 0.0 " " relative error = 0.0 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.601 " " y[1] (analytic) = 1.9995439037373106 " " y[1] (numeric) = 1.9995439037373104 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.110476266662671600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6019999999999999 " " y[1] (analytic) = 1.9995132048892956 " " y[1] (numeric) = 1.9995132048892954 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.110493315983501900000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6029999999999998 " " y[1] (analytic) = 1.9994815065281588 " " y[1] (numeric) = 1.9994815065281588 " " absolute error = 0.0 " " relative error = 0.0 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6039999999999996 " " y[1] (analytic) = 1.999448808685599 " " y[1] (numeric) = 1.999448808685599 " " absolute error = 0.0 " " relative error = 0.0 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6049999999999995 " " y[1] (analytic) = 1.9994151113943137 " " y[1] (numeric) = 1.9994151113943137 " " absolute error = 0.0 " " relative error = 0.0 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6059999999999994 " " y[1] (analytic) = 1.9993804146880005 " " y[1] (numeric) = 1.9993804146880003 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.110567070147483300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6069999999999993 " " y[1] (analytic) = 1.9993447186013558 " " y[1] (numeric) = 1.9993447186013555 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.110586898093105800000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6079999999999992 " " y[1] (analytic) = 1.9993080231700757 " " y[1] (numeric) = 1.9993080231700755 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.11060728187825900000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.608999999999999 " " y[1] (analytic) = 1.9992703284308557 " " y[1] (numeric) = 1.9992703284308555 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.110628221543731300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.609999999999999 " " y[1] (analytic) = 1.9992316344213905 " " y[1] (numeric) = 1.9992316344213903 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.110649717131424600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6109999999999989 " " y[1] (analytic) = 1.9991919411803742 " " y[1] (numeric) = 1.999191941180374 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.110671768684354000000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6119999999999988 " " y[1] (analytic) = 1.9991512487475 " " y[1] (numeric) = 1.9991512487474998 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.110694376246648400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6129999999999987 " " y[1] (analytic) = 1.9991095571634605 " " y[1] (numeric) = 1.99910955716346 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.221435079727103500000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6139999999999985 " " y[1] (analytic) = 1.999066866469947 " " y[1] (numeric) = 1.9990668664699465 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.22148251916284180000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6149999999999984 " " y[1] (analytic) = 1.99902317670965 " " y[1] (numeric) = 1.9990231767096496 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.221531070895456600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6159999999999983 " " y[1] (analytic) = 1.9989784879262598 " " y[1] (numeric) = 1.9989784879262593 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.2215807350221200000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6169999999999982 " " y[1] (analytic) = 1.9989328001644648 " " y[1] (numeric) = 1.9989328001644644 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.22163151164223530000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.617999999999998 " " y[1] (analytic) = 1.998886113469953 " " y[1] (numeric) = 1.9988861134699525 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.22168340085743520000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.618999999999998 " " y[1] (analytic) = 1.998838427889411 " " y[1] (numeric) = 1.9988384278894105 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.22173640277158300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6199999999999979 " " y[1] (analytic) = 1.9987897434705242 " " y[1] (numeric) = 1.9987897434705237 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.221790517490773400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6209999999999978 " " y[1] (analytic) = 1.9987400602619771 " " y[1] (numeric) = 1.9987400602619767 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.22184574512333230000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6219999999999977 " " y[1] (analytic) = 1.9986893783134532 " " y[1] (numeric) = 1.9986893783134527 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.221902085779816300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6229999999999976 " " y[1] (analytic) = 1.9986376976756342 " " y[1] (numeric) = 1.9986376976756337 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.221959539573016600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6239999999999974 " " y[1] (analytic) = 1.9985850184002003 " " y[1] (numeric) = 1.9985850184002 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.111009053308978100000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6249999999999973 " " y[1] (analytic) = 1.9985313405398317 " " y[1] (numeric) = 1.9985313405398313 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.2220777870318900000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6259999999999972 " " y[1] (analytic) = 1.9984766641482057 " " y[1] (numeric) = 1.9984766641482052 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.222138580934309400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6269999999999971 " " y[1] (analytic) = 1.9984209892799987 " " y[1] (numeric) = 1.9984209892799982 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.22220048844693820000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.627999999999997 " " y[1] (analytic) = 1.9983643159908855 " " y[1] (numeric) = 1.998364315990885 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.222263509693735700000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.628999999999997 " " y[1] (analytic) = 1.9983066443375397 " " y[1] (numeric) = 1.9983066443375392 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.22232764480089600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6299999999999968 " " y[1] (analytic) = 1.9982479743776327 " " y[1] (numeric) = 1.9982479743776322 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.222392893896850400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6309999999999967 " " y[1] (analytic) = 1.9981883061698344 " " y[1] (numeric) = 1.998188306169834 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.222459257112265300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6319999999999966 " " y[1] (analytic) = 1.9981276397738132 " " y[1] (numeric) = 1.9981276397738128 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.222526734580045300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6329999999999965 " " y[1] (analytic) = 1.9980659752502354 " " y[1] (numeric) = 1.998065975250235 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.222595326435331500000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6339999999999963 " " y[1] (analytic) = 1.9980033126607655 " " y[1] (numeric) = 1.998003312660765 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.22266503281550400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6349999999999962 " " y[1] (analytic) = 1.9979396520680661 " " y[1] (numeric) = 1.9979396520680657 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.222735853860181300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6359999999999961 " " y[1] (analytic) = 1.997874993535798 " " y[1] (numeric) = 1.9978749935357973 " " absolute error = 6.6613381477509390000000000000000E-16 " " relative error = 3.33421168456683100000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.636999999999996 " " y[1] (analytic) = 1.9978093371286192 " " y[1] (numeric) = 1.9978093371286187 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.222880840512720400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.637999999999996 " " y[1] (analytic) = 1.9977426829121865 " " y[1] (numeric) = 1.997742682912186 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.222955006411019300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6389999999999958 " " y[1] (analytic) = 1.9976750309531544 " " y[1] (numeric) = 1.9976750309531537 " " absolute error = 6.6613381477509390000000000000000E-16 " " relative error = 3.33454543133204330000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6399999999999957 " " y[1] (analytic) = 1.997606381319174 " " y[1] (numeric) = 1.9976063813191736 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.22310668409457180000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6409999999999956 " " y[1] (analytic) = 1.9975367340788956 " " y[1] (numeric) = 1.9975367340788952 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.223184196183711500000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6419999999999955 " " y[1] (analytic) = 1.9974660893019662 " " y[1] (numeric) = 1.9974660893019658 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.223262823977421600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6429999999999954 " " y[1] (analytic) = 1.9973944470590306 " " y[1] (numeric) = 1.9973944470590304 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.111671283816626400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6439999999999952 " " y[1] (analytic) = 1.9973218074217312 " " y[1] (numeric) = 1.997321807421731 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.111711713655499900000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6449999999999951 " " y[1] (analytic) = 1.9972481704627074 " " y[1] (numeric) = 1.9972481704627072 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.111752701586351500000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.645999999999995 " " y[1] (analytic) = 1.9971735362555962 " " y[1] (numeric) = 1.997173536255596 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.111794247691324600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.646999999999995 " " y[1] (analytic) = 1.997097904875032 " " y[1] (numeric) = 1.9970979048750317 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.111836352053685200000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6479999999999948 " " y[1] (analytic) = 1.9970212763966457 " " y[1] (numeric) = 1.9970212763966455 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.111879014757823200000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6489999999999947 " " y[1] (analytic) = 1.9969436508970664 " " y[1] (numeric) = 1.9969436508970662 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.111922235889252600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6499999999999946 " " y[1] (analytic) = 1.9968650284539193 " " y[1] (numeric) = 1.9968650284539189 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.223932031069223000000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6509999999999945 " " y[1] (analytic) = 1.9967854091458266 " " y[1] (numeric) = 1.9967854091458264 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.112010353781662800000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6519999999999944 " " y[1] (analytic) = 1.996704793052408 " " y[1] (numeric) = 1.9967047930524078 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.112055250719294800000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6529999999999943 " " y[1] (analytic) = 1.9966231802542793 " " y[1] (numeric) = 1.996623180254279 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.112100706437520600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6539999999999941 " " y[1] (analytic) = 1.9965405708330535 " " y[1] (numeric) = 1.9965405708330533 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.112146721027479600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.654999999999994 " " y[1] (analytic) = 1.99645696487134 " " y[1] (numeric) = 1.9964569648713395 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.224386589162875300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.655999999999994 " " y[1] (analytic) = 1.9963723624527443 " " y[1] (numeric) = 1.996372362452744 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.112240427192786700000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6569999999999938 " " y[1] (analytic) = 1.9962867636618693 " " y[1] (numeric) = 1.996286763661869 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.112288118956045900000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6579999999999937 " " y[1] (analytic) = 1.9962001685843138 " " y[1] (numeric) = 1.9962001685843136 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.112336369966861700000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6589999999999936 " " y[1] (analytic) = 1.9961125773066728 " " y[1] (numeric) = 1.9961125773066726 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.112385180322008900000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6599999999999935 " " y[1] (analytic) = 1.9960239899165373 " " y[1] (numeric) = 1.996023989916537 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.112434550119390100000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6609999999999934 " " y[1] (analytic) = 1.9959344065024949 " " y[1] (numeric) = 1.9959344065024947 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.112484479458036600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6619999999999933 " " y[1] (analytic) = 1.995843827154129 " " y[1] (numeric) = 1.9958438271541288 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.112534968438108800000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6629999999999932 " " y[1] (analytic) = 1.9957522519620192 " " y[1] (numeric) = 1.9957522519620188 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.22517203432179300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.663999999999993 " " y[1] (analytic) = 1.9956596810177403 " " y[1] (numeric) = 1.9956596810177398 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.225275251457640400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.664999999999993 " " y[1] (analytic) = 1.995566114413863 " " y[1] (numeric) = 1.9955661144138628 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.112689794245429900000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6659999999999928 " " y[1] (analytic) = 1.9954715522439548 " " y[1] (numeric) = 1.9954715522439543 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.225485045630812600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6669999999999927 " " y[1] (analytic) = 1.9953759946025769 " " y[1] (numeric) = 1.9953759946025766 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.112795811544562600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6679999999999926 " " y[1] (analytic) = 1.9952794415852875 " " y[1] (numeric) = 1.9952794415852873 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.112849660539842300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6689999999999925 " " y[1] (analytic) = 1.9951818932886394 " " y[1] (numeric) = 1.9951818932886392 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.112904069909321800000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6699999999999924 " " y[1] (analytic) = 1.995083349810181 " " y[1] (numeric) = 1.9950833498101808 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.112959039762210400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6709999999999923 " " y[1] (analytic) = 1.9949838112484555 " " y[1] (numeric) = 1.9949838112484555 " " absolute error = 0.0 " " relative error = 0.0 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6719999999999922 " " y[1] (analytic) = 1.9948832777030021 " " y[1] (numeric) = 1.994883277703002 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.113070661360715800000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.672999999999992 " " y[1] (analytic) = 1.9947817492743534 " " y[1] (numeric) = 1.9947817492743534 " " absolute error = 0.0 " " relative error = 0.0 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.673999999999992 " " y[1] (analytic) = 1.9946792260640387 " " y[1] (numeric) = 1.9946792260640385 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.11318452623170100000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6749999999999918 " " y[1] (analytic) = 1.9945757081745807 " " y[1] (numeric) = 1.9945757081745805 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.113242300179443800000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6759999999999917 " " y[1] (analytic) = 1.9944711957094974 " " y[1] (numeric) = 1.9944711957094972 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.11330063528966100000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6769999999999916 " " y[1] (analytic) = 1.9943656887733012 " " y[1] (numeric) = 1.994365688773301 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.113359531679503500000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6779999999999915 " " y[1] (analytic) = 1.9942591874714992 " " y[1] (numeric) = 1.994259187471499 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.113418989467258700000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6789999999999914 " " y[1] (analytic) = 1.9941516919105926 " " y[1] (numeric) = 1.9941516919105924 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.113479008772350800000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6799999999999913 " " y[1] (analytic) = 1.994043202198077 " " y[1] (numeric) = 1.9940432021980767 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.113539589715341900000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6809999999999912 " " y[1] (analytic) = 1.9939337184424417 " " y[1] (numeric) = 1.9939337184424417 " " absolute error = 0.0 " " relative error = 0.0 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.681999999999991 " " y[1] (analytic) = 1.993823240753171 " " y[1] (numeric) = 1.993823240753171 " " absolute error = 0.0 " " relative error = 0.0 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.682999999999991 " " y[1] (analytic) = 1.9937117692407424 " " y[1] (numeric) = 1.9937117692407424 " " absolute error = 0.0 " " relative error = 0.0 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6839999999999908 " " y[1] (analytic) = 1.9935993040166275 " " y[1] (numeric) = 1.9935993040166273 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.113787532317373600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6849999999999907 " " y[1] (analytic) = 1.993485845193291 " " y[1] (numeric) = 1.993485845193291 " " absolute error = 0.0 " " relative error = 0.0 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6859999999999906 " " y[1] (analytic) = 1.9933713928841925 " " y[1] (numeric) = 1.9933713928841923 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.113914876664086200000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6869999999999905 " " y[1] (analytic) = 1.9932559472037839 " " y[1] (numeric) = 1.9932559472037834 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.22795878508752520000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6879999999999904 " " y[1] (analytic) = 1.9931395082675105 " " y[1] (numeric) = 1.9931395082675103 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.114044471066846400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6889999999999903 " " y[1] (analytic) = 1.9930220761918118 " " y[1] (numeric) = 1.9930220761918116 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.114110112364161100000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6899999999999902 " " y[1] (analytic) = 1.9929036510941196 " " y[1] (numeric) = 1.9929036510941194 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.11417631656767300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.69099999999999 " " y[1] (analytic) = 1.9927842330928591 " " y[1] (numeric) = 1.992784233092859 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.114243083810491800000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.69199999999999 " " y[1] (analytic) = 1.9926638223074482 " " y[1] (numeric) = 1.992663822307448 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.114310414226871200000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6929999999999898 " " y[1] (analytic) = 1.9925424188582979 " " y[1] (numeric) = 1.9925424188582974 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.228756615904419500000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6939999999999897 " " y[1] (analytic) = 1.9924200228668112 " " y[1] (numeric) = 1.9924200228668107 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.22889353024610220000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6949999999999896 " " y[1] (analytic) = 1.9922966344553845 " " y[1] (numeric) = 1.992296634455384 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.229031571754168700000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6959999999999895 " " y[1] (analytic) = 1.992172253747406 " " y[1] (numeric) = 1.9921722537474056 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.22917074070629080000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6969999999999894 " " y[1] (analytic) = 1.9920468808672562 " " y[1] (numeric) = 1.992046880867256 " " absolute error = 2.2204460492503130000000000000000E-16 " " relative error = 1.114655518691217300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6979999999999893 " " y[1] (analytic) = 1.9919205159403086 " " y[1] (numeric) = 1.9919205159403082 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.229452462064859300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.6989999999999892 " " y[1] (analytic) = 1.9917931590929276 " " y[1] (numeric) = 1.991793159092927 " " absolute error = 6.6613381477509390000000000000000E-16 " " relative error = 3.34439252255718400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.699999999999989 " " y[1] (analytic) = 1.9916648104524701 " " y[1] (numeric) = 1.9916648104524695 " " absolute error = 6.6613381477509390000000000000000E-16 " " relative error = 3.344608044883618500000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.700999999999989 " " y[1] (analytic) = 1.9915354701472847 " " y[1] (numeric) = 1.991535470147284 " " absolute error = 6.6613381477509390000000000000000E-16 " " relative error = 3.34482526051032300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7019999999999889 " " y[1] (analytic) = 1.9914051383067117 " " y[1] (numeric) = 1.9914051383067113 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.230029446582983400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7029999999999887 " " y[1] (analytic) = 1.9912738150610834 " " y[1] (numeric) = 1.9912738150610827 " " absolute error = 6.6613381477509390000000000000000E-16 " " relative error = 3.345264773416708500000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7039999999999886 " " y[1] (analytic) = 1.9911415005417223 " " y[1] (numeric) = 1.9911415005417217 " " absolute error = 6.6613381477509390000000000000000E-16 " " relative error = 3.34548707158110800000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7049999999999885 " " y[1] (analytic) = 1.9910081948809433 " " y[1] (numeric) = 1.9910081948809428 " " absolute error = 4.4408920985006260000000000000000E-16 " " relative error = 2.23047404321014300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7059999999999884 " " y[1] (analytic) = 1.9908738982120522 " " y[1] (numeric) = 1.9908738982120515 " " absolute error = 6.6613381477509390000000000000000E-16 " " relative error = 3.34593675357002740000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7069999999999883 " " y[1] (analytic) = 1.9907386106693452 " " y[1] (numeric) = 1.9907386106693445 " " absolute error = 6.6613381477509390000000000000000E-16 " " relative error = 3.34616413830000500000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7079999999999882 " " y[1] (analytic) = 1.9906023323881104 " " y[1] (numeric) = 1.9906023323881095 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.461857625950756400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.708999999999988 " " y[1] (analytic) = 1.9904650635046255 " " y[1] (numeric) = 1.9904650635046246 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.46216533002746300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.709999999999988 " " y[1] (analytic) = 1.9903268041561597 " " y[1] (numeric) = 1.9903268041561588 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.462475297249925400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7109999999999879 " " y[1] (analytic) = 1.9901875544809724 " " y[1] (numeric) = 1.9901875544809713 " " absolute error = 1.1102230246251565000000000000000E-15 " " relative error = 5.57848441030320500000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7119999999999878 " " y[1] (analytic) = 1.9900473146183129 " " y[1] (numeric) = 1.990047314618312 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.463102023634429000000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7129999999999876 " " y[1] (analytic) = 1.9899060847084216 " " y[1] (numeric) = 1.9899060847084205 " " absolute error = 1.1102230246251565000000000000000E-15 " " relative error = 5.57927348007399100000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7139999999999875 " " y[1] (analytic) = 1.9897638648925278 " " y[1] (numeric) = 1.9897638648925267 " " absolute error = 1.1102230246251565000000000000000E-15 " " relative error = 5.57967226269395800000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7149999999999874 " " y[1] (analytic) = 1.9896206553128515 " " y[1] (numeric) = 1.9896206553128506 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.4640591025652900000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7159999999999873 " " y[1] (analytic) = 1.9894764561126026 " " y[1] (numeric) = 1.9894764561126017 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.46438266193714200000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7169999999999872 " " y[1] (analytic) = 1.98933126743598 " " y[1] (numeric) = 1.989331267435979 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.464708488922940500000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.717999999999987 " " y[1] (analytic) = 1.9891850894281724 " " y[1] (numeric) = 1.9891850894281715 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.46503658417954640000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.718999999999987 " " y[1] (analytic) = 1.9890379222353578 " " y[1] (numeric) = 1.989037922235357 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.46536694836846500000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7199999999999869 " " y[1] (analytic) = 1.9888897660047036 " " y[1] (numeric) = 1.9888897660047025 " " absolute error = 1.1102230246251565000000000000000E-15 " " relative error = 5.58212447769481300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7209999999999868 " " y[1] (analytic) = 1.9887406208843654 " " y[1] (numeric) = 1.9887406208843645 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.466034486212508400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7219999999999867 " " y[1] (analytic) = 1.988590487023489 " " y[1] (numeric) = 1.988590487023488 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.46637166121389700000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7229999999999865 " " y[1] (analytic) = 1.9884393645722076 " " y[1] (numeric) = 1.988439364572207 " " absolute error = 6.6613381477509390000000000000000E-16 " " relative error = 3.35003333088009840000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7239999999999864 " " y[1] (analytic) = 1.9882872536816443 " " y[1] (numeric) = 1.9882872536816436 " " absolute error = 6.6613381477509390000000000000000E-16 " " relative error = 3.3502896200819904000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7249999999999863 " " y[1] (analytic) = 1.9881341545039097 " " y[1] (numeric) = 1.9881341545039088 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.467396818710900300000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7259999999999862 " " y[1] (analytic) = 1.9879800671921029 " " y[1] (numeric) = 1.987980067192102 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.46774308433897650000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.726999999999986 " " y[1] (analytic) = 1.987824991900311 " " y[1] (numeric) = 1.9878249919003101 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.468091624358987400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.727999999999986 " " y[1] (analytic) = 1.9876689287836098 " " y[1] (numeric) = 1.987668928783609 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.468442439474375500000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7289999999999859 " " y[1] (analytic) = 1.9875118779980623 " " y[1] (numeric) = 1.9875118779980612 " " absolute error = 1.1102230246251565000000000000000E-15 " " relative error = 5.585994412991574000000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7299999999999858 " " y[1] (analytic) = 1.9873538397007187 " " y[1] (numeric) = 1.9873538397007178 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.46915089782843400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7309999999999857 " " y[1] (analytic) = 1.9871948140496178 " " y[1] (numeric) = 1.987194814049617 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.46950854249737630000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7319999999999856 " " y[1] (analytic) = 1.987034801203785 " " y[1] (numeric) = 1.9870348012037842 " " absolute error = 8.8817841970012520000000000000000E-16 " " relative error = 4.46986846512224700000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7329999999999854 " " y[1] (analytic) = 1.9868738013232337 " " y[1] (numeric) = 1.9868738013232325 " " absolute error = 1.1102230246251565000000000000000E-15 " " relative error = 5.587788333037366000000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7339999999999853 " " y[1] (analytic) = 1.9867118145689628 " " y[1] (numeric) = 1.9867118145689617 " " absolute error = 1.1102230246251565000000000000000E-15 " " relative error = 5.588243933939814000000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7349999999999852 " " y[1] (analytic) = 1.9865488411029597 " " y[1] (numeric) = 1.9865488411029586 " " absolute error = 1.1102230246251565000000000000000E-15 " " relative error = 5.588702385030438000000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.735999999999985 " " y[1] (analytic) = 1.9863848810881979 " " y[1] (numeric) = 1.9863848810881966 " " absolute error = 1.3322676295501878000000000000000E-15 " " relative error = 6.70699642468248100000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.736999999999985 " " y[1] (analytic) = 1.9862199346886371 " " y[1] (numeric) = 1.9862199346886358 " " absolute error = 1.3322676295501878000000000000000E-15 " " relative error = 6.70755340978407900000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.737999999999985 " " y[1] (analytic) = 1.9860540020692237 " " y[1] (numeric) = 1.9860540020692223 " " absolute error = 1.3322676295501878000000000000000E-15 " " relative error = 6.70811381846681400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7389999999999848 " " y[1] (analytic) = 1.9858870833958906 " " y[1] (numeric) = 1.985887083395889 " " absolute error = 1.5543122344752192000000000000000E-15 " " relative error = 7.82679059384044500000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7399999999999847 " " y[1] (analytic) = 1.9857191788355562 " " y[1] (numeric) = 1.9857191788355546 " " absolute error = 1.5543122344752192000000000000000E-15 " " relative error = 7.82745239629846300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7409999999999846 " " y[1] (analytic) = 1.985550288556125 " " y[1] (numeric) = 1.9855502885561234 " " absolute error = 1.5543122344752192000000000000000E-15 " " relative error = 7.82811819692314000000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7419999999999844 " " y[1] (analytic) = 1.9853804127264874 " " y[1] (numeric) = 1.9853804127264858 " " absolute error = 1.5543122344752192000000000000000E-15 " " relative error = 7.82878799706052200000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7429999999999843 " " y[1] (analytic) = 1.9852095515165191 " " y[1] (numeric) = 1.9852095515165176 " " absolute error = 1.5543122344752192000000000000000E-15 " " relative error = 7.82946179806492600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7439999999999842 " " y[1] (analytic) = 1.9850377050970816 " " y[1] (numeric) = 1.98503770509708 " " absolute error = 1.5543122344752192000000000000000E-15 " " relative error = 7.83013960129892300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7449999999999841 " " y[1] (analytic) = 1.984864873640021 " " y[1] (numeric) = 1.9848648736400194 " " absolute error = 1.5543122344752192000000000000000E-15 " " relative error = 7.8308214081333590000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.745999999999984 " " y[1] (analytic) = 1.9846910573181686 " " y[1] (numeric) = 1.9846910573181673 " " absolute error = 1.3322676295501878000000000000000E-15 " " relative error = 6.71272047424059200000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.746999999999984 " " y[1] (analytic) = 1.9845162563053413 " " y[1] (numeric) = 1.9845162563053398 " " absolute error = 1.5543122344752192000000000000000E-15 " " relative error = 7.83219703812831700000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7479999999999838 " " y[1] (analytic) = 1.9843404707763397 " " y[1] (numeric) = 1.9843404707763381 " " absolute error = 1.5543122344752192000000000000000E-15 " " relative error = 7.83289086407193400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7489999999999837 " " y[1] (analytic) = 1.984163700906949 " " y[1] (numeric) = 1.9841637009069477 " " absolute error = 1.3322676295501878000000000000000E-15 " " relative error = 6.71450459929902300000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7499999999999836 " " y[1] (analytic) = 1.9839859468739398 " " y[1] (numeric) = 1.9839859468739383 " " absolute error = 1.5543122344752192000000000000000E-15 " " relative error = 7.83429054487137600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7509999999999835 " " y[1] (analytic) = 1.9838072088550656 " " y[1] (numeric) = 1.983807208855064 " " absolute error = 1.5543122344752192000000000000000E-15 " " relative error = 7.8349964025600800000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7519999999999833 " " y[1] (analytic) = 1.9836274870290644 " " y[1] (numeric) = 1.9836274870290629 " " absolute error = 1.5543122344752192000000000000000E-15 " " relative error = 7.83570627367720500000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7529999999999832 " " y[1] (analytic) = 1.9834467815756582 " " y[1] (numeric) = 1.9834467815756567 " " absolute error = 1.5543122344752192000000000000000E-15 " " relative error = 7.83642015965997900000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7539999999999831 " " y[1] (analytic) = 1.9832650926755526 " " y[1] (numeric) = 1.9832650926755508 " " absolute error = 1.7763568394002505000000000000000E-15 " " relative error = 8.95672921366165000000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.754999999999983 " " y[1] (analytic) = 1.983082420510436 " " y[1] (numeric) = 1.9830824205104343 " " absolute error = 1.7763568394002505000000000000000E-15 " " relative error = 8.95755426515769600000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.755999999999983 " " y[1] (analytic) = 1.982898765262981 " " y[1] (numeric) = 1.9828987652629793 " " absolute error = 1.7763568394002505000000000000000E-15 " " relative error = 8.95838391005635700000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7569999999999828 " " y[1] (analytic) = 1.9827141271168425 " " y[1] (numeric) = 1.9827141271168407 " " absolute error = 1.7763568394002505000000000000000E-15 " " relative error = 8.95921815003827200000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7579999999999827 " " y[1] (analytic) = 1.9825285062566589 " " y[1] (numeric) = 1.982528506256657 " " absolute error = 1.7763568394002505000000000000000E-15 " " relative error = 8.96005698679362400000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7589999999999826 " " y[1] (analytic) = 1.982341902868051 " " y[1] (numeric) = 1.9823419028680491 " " absolute error = 1.7763568394002505000000000000000E-15 " " relative error = 8.96090042202214800000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7599999999999825 " " y[1] (analytic) = 1.982154317137622 " " y[1] (numeric) = 1.9821543171376201 " " absolute error = 1.7763568394002505000000000000000E-15 " " relative error = 8.96174845743313200000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7609999999999824 " " y[1] (analytic) = 1.9819657492529574 " " y[1] (numeric) = 1.9819657492529557 " " absolute error = 1.7763568394002505000000000000000E-15 " " relative error = 8.96260109474543200000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7619999999999822 " " y[1] (analytic) = 1.9817761994026255 " " y[1] (numeric) = 1.981776199402624 " " absolute error = 1.5543122344752192000000000000000E-15 " " relative error = 7.84302604372653900000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7629999999999821 " " y[1] (analytic) = 1.9815856677761763 " " y[1] (numeric) = 1.9815856677761745 " " absolute error = 1.7763568394002505000000000000000E-15 " " relative error = 8.96432018199726500000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.763999999999982 " " y[1] (analytic) = 1.981394154564141 " " y[1] (numeric) = 1.9813941545641391 " " absolute error = 1.7763568394002505000000000000000E-15 " " relative error = 8.96518663542240100000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.764999999999982 " " y[1] (analytic) = 1.9812016599580329 " " y[1] (numeric) = 1.981201659958031 " " absolute error = 1.7763568394002505000000000000000E-15 " " relative error = 8.96605769772007200000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7659999999999818 " " y[1] (analytic) = 1.9810081841503466 " " y[1] (numeric) = 1.9810081841503449 " " absolute error = 1.7763568394002505000000000000000E-15 " " relative error = 8.96693337065706900000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7669999999999817 " " y[1] (analytic) = 1.9808137273345578 " " y[1] (numeric) = 1.980813727334556 " " absolute error = 1.7763568394002505000000000000000E-15 " " relative error = 8.96781365600979200000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7679999999999816 " " y[1] (analytic) = 1.9806182897051237 " " y[1] (numeric) = 1.9806182897051217 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.00897858750097980000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7689999999999815 " " y[1] (analytic) = 1.980421871457481 " " y[1] (numeric) = 1.9804218714574793 " " absolute error = 1.7763568394002505000000000000000E-15 " " relative error = 8.96958807111613100000000000000E-14 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7699999999999814 " " y[1] (analytic) = 1.9802244727880491 " " y[1] (numeric) = 1.9802244727880471 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.00917924800295020000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7709999999999813 " " y[1] (analytic) = 1.980026093894226 " " y[1] (numeric) = 1.980026093894224 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.00928035771231480000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7719999999999811 " " y[1] (analytic) = 1.9798267349743908 " " y[1] (numeric) = 1.9798267349743885 " " absolute error = 2.220446049250313000000000000000E-15 " " relative error = 1.12153554148213620000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.772999999999981 " " y[1] (analytic) = 1.979626396227902 " " y[1] (numeric) = 1.9796263962279 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.00948413707412420000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.773999999999981 " " y[1] (analytic) = 1.9794250778550986 " " y[1] (numeric) = 1.9794250778550966 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.00958680714035710000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7749999999999808 " " y[1] (analytic) = 1.9792227800572992 " " y[1] (numeric) = 1.979222780057297 " " absolute error = 2.220446049250313000000000000000E-15 " " relative error = 1.12187777526794150000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7759999999999807 " " y[1] (analytic) = 1.9790195030368012 " " y[1] (numeric) = 1.979019503036799 " " absolute error = 2.220446049250313000000000000000E-15 " " relative error = 1.12199301009567780000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7769999999999806 " " y[1] (analytic) = 1.9788152469968816 " " y[1] (numeric) = 1.9788152469968796 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.00989794138595050000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7779999999999805 " " y[1] (analytic) = 1.9786100121417967 " " y[1] (numeric) = 1.9786100121417947 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.01000269485246440000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7789999999999804 " " y[1] (analytic) = 1.9784037986767813 " " y[1] (numeric) = 1.9784037986767793 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.01010796969853960000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7799999999999803 " " y[1] (analytic) = 1.9781966068080488 " " y[1] (numeric) = 1.9781966068080468 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.0102137661381570000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7809999999999802 " " y[1] (analytic) = 1.977988436742791 " " y[1] (numeric) = 1.977988436742789 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.01032008438639080000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.78199999999998 " " y[1] (analytic) = 1.9777792886891779 " " y[1] (numeric) = 1.9777792886891759 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.01042692465941030000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.78299999999998 " " y[1] (analytic) = 1.9775691628563574 " " y[1] (numeric) = 1.9775691628563554 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.01053428717447980000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7839999999999798 " " y[1] (analytic) = 1.9773580594544558 " " y[1] (numeric) = 1.9773580594544538 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.01064217214996050000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7849999999999797 " " y[1] (analytic) = 1.977145978694576 " " y[1] (numeric) = 1.977145978694574 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.0107505798053111000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7859999999999796 " " y[1] (analytic) = 1.976932920788799 " " y[1] (numeric) = 1.976932920788797 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.01085951036108850000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7869999999999795 " " y[1] (analytic) = 1.9767188859501825 " " y[1] (numeric) = 1.9767188859501805 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.01096896403894910000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7879999999999794 " " y[1] (analytic) = 1.9765038743927617 " " y[1] (numeric) = 1.9765038743927597 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.01107894106164980000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7889999999999793 " " y[1] (analytic) = 1.9762878863315476 " " y[1] (numeric) = 1.9762878863315456 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.01118944165304880000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7899999999999792 " " y[1] (analytic) = 1.9760709219825288 " " y[1] (numeric) = 1.9760709219825268 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.01130046603810630000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.790999999999979 " " y[1] (analytic) = 1.975852981562669 " " y[1] (numeric) = 1.975852981562667 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.01141201444288600000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.791999999999979 " " y[1] (analytic) = 1.9756340652899094 " " y[1] (numeric) = 1.9756340652899071 " " absolute error = 2.220446049250313000000000000000E-15 " " relative error = 1.12391565232728430000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7929999999999788 " " y[1] (analytic) = 1.9754141733831654 " " y[1] (numeric) = 1.9754141733831634 " " absolute error = 1.9984014443252818000000000000000E-15 " " relative error = 1.01163668422138900000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7939999999999787 " " y[1] (analytic) = 1.9751933060623297 " " y[1] (numeric) = 1.9751933060623275 " " absolute error = 2.220446049250313000000000000000E-15 " " relative error = 1.12416645116973900000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7949999999999786 " " y[1] (analytic) = 1.974971463548269 " " y[1] (numeric) = 1.9749714635482667 " " absolute error = 2.220446049250313000000000000000E-15 " " relative error = 1.12429272535463380000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7959999999999785 " " y[1] (analytic) = 1.9747486460628259 " " y[1] (numeric) = 1.9747486460628236 " " absolute error = 2.220446049250313000000000000000E-15 " " relative error = 1.12441958305800020000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7969999999999784 " " y[1] (analytic) = 1.974524853828818 " " y[1] (numeric) = 1.9745248538288158 " " absolute error = 2.220446049250313000000000000000E-15 " " relative error = 1.12454702453839820000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7979999999999783 " " y[1] (analytic) = 1.9743000870700378 " " y[1] (numeric) = 1.9743000870700353 " " absolute error = 2.4424906541753444000000000000000E-15 " " relative error = 1.2371425550611839000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.7989999999999782 " " y[1] (analytic) = 1.9740743460112513 " " y[1] (numeric) = 1.974074346011249 " " absolute error = 2.220446049250313000000000000000E-15 " " relative error = 1.12480365987069950000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.799999999999978 " " y[1] (analytic) = 1.9738476308782 " " y[1] (numeric) = 1.9738476308781978 " " absolute error = 2.220446049250313000000000000000E-15 " " relative error = 1.12493285424589600000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.800999999999978 " " y[1] (analytic) = 1.9736199418975993 " " y[1] (numeric) = 1.9736199418975968 " " absolute error = 2.4424906541753444000000000000000E-15 " " relative error = 1.23756889678918350000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8019999999999778 " " y[1] (analytic) = 1.9733912792971378 " " y[1] (numeric) = 1.973391279297135 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.35023159727826640000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8029999999999777 " " y[1] (analytic) = 1.973161643305478 " " y[1] (numeric) = 1.9731616433054753 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.35038873684808500000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8039999999999776 " " y[1] (analytic) = 1.9729310341522557 " " y[1] (numeric) = 1.9729310341522532 " " absolute error = 2.4424906541753444000000000000000E-15 " " relative error = 1.23800103090012620000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8049999999999775 " " y[1] (analytic) = 1.9726994520680807 " " y[1] (numeric) = 1.972699452068078 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.35070512454748660000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8059999999999774 " " y[1] (analytic) = 1.9724668972845345 " " y[1] (numeric) = 1.9724668972845318 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.35086437332286870000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8069999999999773 " " y[1] (analytic) = 1.972233370034172 " " y[1] (numeric) = 1.9722333700341694 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.35102432581505730000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8079999999999772 " " y[1] (analytic) = 1.9719988705505207 " " y[1] (numeric) = 1.971998870550518 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.35118498235068470000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.808999999999977 " " y[1] (analytic) = 1.9717633990680798 " " y[1] (numeric) = 1.9717633990680772 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.3513463432578790000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.809999999999977 " " y[1] (analytic) = 1.9715269558223207 " " y[1] (numeric) = 1.971526955822318 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.3515084088662652000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8109999999999769 " " y[1] (analytic) = 1.971289541049687 " " y[1] (numeric) = 1.9712895410496842 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.3516711795069658000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8119999999999767 " " y[1] (analytic) = 1.971051154987593 " " y[1] (numeric) = 1.9710511549875902 " " absolute error = 2.886579864025407000000000000000E-15 " " relative error = 1.4644875434719890000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8129999999999766 " " y[1] (analytic) = 1.9708117978744248 " " y[1] (numeric) = 1.9708117978744222 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.35199883721730860000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8139999999999765 " " y[1] (analytic) = 1.9705714699495398 " " y[1] (numeric) = 1.9705714699495371 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.3521637249567030000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8149999999999764 " " y[1] (analytic) = 1.9703301714532657 " " y[1] (numeric) = 1.970330171453263 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.35232931906792140000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8159999999999763 " " y[1] (analytic) = 1.9700879026269011 " " y[1] (numeric) = 1.9700879026268983 " " absolute error = 2.886579864025407000000000000000E-15 " " relative error = 1.4652035882137350000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8169999999999762 " " y[1] (analytic) = 1.9698446637127147 " " y[1] (numeric) = 1.9698446637127118 " " absolute error = 2.886579864025407000000000000000E-15 " " relative error = 1.46538451340871320000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.817999999999976 " " y[1] (analytic) = 1.9696004549539452 " " y[1] (numeric) = 1.9696004549539425 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.35283034302643880000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.818999999999976 " " y[1] (analytic) = 1.9693552765948017 " " y[1] (numeric) = 1.969355276594799 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.3529987660264150000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8199999999999759 " " y[1] (analytic) = 1.9691091288804623 " " y[1] (numeric) = 1.9691091288804596 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.3531678971064942000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8209999999999757 " " y[1] (analytic) = 1.968862012057075 " " y[1] (numeric) = 1.9688620120570721 " " absolute error = 2.886579864025407000000000000000E-15 " " relative error = 1.46611588133060520000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8219999999999756 " " y[1] (analytic) = 1.9686139263717561 " " y[1] (numeric) = 1.9686139263717533 " " absolute error = 2.886579864025407000000000000000E-15 " " relative error = 1.46630064196767270000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8229999999999755 " " y[1] (analytic) = 1.9683648720725917 " " y[1] (numeric) = 1.9683648720725888 " " absolute error = 2.886579864025407000000000000000E-15 " " relative error = 1.46648617082156120000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8239999999999754 " " y[1] (analytic) = 1.9681148494086358 " " y[1] (numeric) = 1.968114849408633 " " absolute error = 2.886579864025407000000000000000E-15 " " relative error = 1.46667246827223760000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8249999999999753 " " y[1] (analytic) = 1.9678638586299113 " " y[1] (numeric) = 1.9678638586299084 " " absolute error = 2.886579864025407000000000000000E-15 " " relative error = 1.46685953470131550000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8259999999999752 " " y[1] (analytic) = 1.9676118999874088 " " y[1] (numeric) = 1.967611899987406 " " absolute error = 2.886579864025407000000000000000E-15 " " relative error = 1.46704737049205640000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.826999999999975 " " y[1] (analytic) = 1.967358973733087 " " y[1] (numeric) = 1.967358973733084 " " absolute error = 2.886579864025407000000000000000E-15 " " relative error = 1.46723597602937070000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.827999999999975 " " y[1] (analytic) = 1.967105080119872 " " y[1] (numeric) = 1.967105080119869 " " absolute error = 2.886579864025407000000000000000E-15 " " relative error = 1.46742535169982060000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8289999999999749 " " y[1] (analytic) = 1.9668502194016573 " " y[1] (numeric) = 1.9668502194016546 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.3547219980538040000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8299999999999748 " " y[1] (analytic) = 1.9665943918333042 " " y[1] (numeric) = 1.9665943918333013 " " absolute error = 2.886579864025407000000000000000E-15 " " relative error = 1.46780641499464020000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8309999999999746 " " y[1] (analytic) = 1.9663375976706394 " " y[1] (numeric) = 1.9663375976706368 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.35507517236960450000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8319999999999745 " " y[1] (analytic) = 1.9660798371704575 " " y[1] (numeric) = 1.9660798371704549 " " absolute error = 2.6645352591003757000000000000000E-15 " " relative error = 1.35525282784809050000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8329999999999744 " " y[1] (analytic) = 1.9658211105905192 " " y[1] (numeric) = 1.9658211105905163 " " absolute error = 2.886579864025407000000000000000E-15 " " relative error = 1.46838379569456250000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8339999999999743 " " y[1] (analytic) = 1.9655614181895507 " " y[1] (numeric) = 1.9655614181895478 " " absolute error = 2.886579864025407000000000000000E-15 " " relative error = 1.46857780037430360000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8349999999999742 " " y[1] (analytic) = 1.9653007602272443 " " y[1] (numeric) = 1.9653007602272414 " " absolute error = 2.886579864025407000000000000000E-15 " " relative error = 1.4687725779394890000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.835999999999974 " " y[1] (analytic) = 1.9650391369642584 " " y[1] (numeric) = 1.9650391369642553 " " absolute error = 3.1086244689504383000000000000000E-15 " " relative error = 1.58196567715840870000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.836999999999974 " " y[1] (analytic) = 1.9647765486622157 " " y[1] (numeric) = 1.9647765486622126 " " absolute error = 3.1086244689504383000000000000000E-15 " " relative error = 1.58217710358312750000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8379999999999739 " " y[1] (analytic) = 1.9645129955837048 " " y[1] (numeric) = 1.9645129955837017 " " absolute error = 3.1086244689504383000000000000000E-15 " " relative error = 1.5823893636431710000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8389999999999738 " " y[1] (analytic) = 1.9642484779922789 " " y[1] (numeric) = 1.9642484779922755 " " absolute error = 3.3306690738754696000000000000000E-15 " " relative error = 1.69564549047269860000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8399999999999737 " " y[1] (analytic) = 1.9639829961524553 " " y[1] (numeric) = 1.9639829961524518 " " absolute error = 3.552713678800501000000000000000E-15 " " relative error = 1.80893301304565850000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8409999999999735 " " y[1] (analytic) = 1.9637165503297156 " " y[1] (numeric) = 1.9637165503297123 " " absolute error = 3.3306690738754696000000000000000E-15 " " relative error = 1.69610480357576920000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8419999999999734 " " y[1] (analytic) = 1.9634491407905061 " " y[1] (numeric) = 1.9634491407905026 " " absolute error = 3.552713678800501000000000000000E-15 " " relative error = 1.8094248559808070000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8429999999999733 " " y[1] (analytic) = 1.963180767802236 " " y[1] (numeric) = 1.9631807678022326 " " absolute error = 3.3306690738754696000000000000000E-15 " " relative error = 1.69656769692386770000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8439999999999732 " " y[1] (analytic) = 1.9629114316332785 " " y[1] (numeric) = 1.962911431633275 " " absolute error = 3.552713678800501000000000000000E-15 " " relative error = 1.8099205198700160000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.844999999999973 " " y[1] (analytic) = 1.9626411325529696 " " y[1] (numeric) = 1.962641132552966 " " absolute error = 3.552713678800501000000000000000E-15 " " relative error = 1.8101697859451220000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.845999999999973 " " y[1] (analytic) = 1.9623698708316082 " " y[1] (numeric) = 1.9623698708316046 " " absolute error = 3.552713678800501000000000000000E-15 " " relative error = 1.8104200087901579000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8469999999999729 " " y[1] (analytic) = 1.9620976467404563 " " y[1] (numeric) = 1.9620976467404527 " " absolute error = 3.552713678800501000000000000000E-15 " " relative error = 1.81067118891991060000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8479999999999728 " " y[1] (analytic) = 1.9618244605517376 " " y[1] (numeric) = 1.961824460551734 " " absolute error = 3.552713678800501000000000000000E-15 " " relative error = 1.81092332685124450000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8489999999999727 " " y[1] (analytic) = 1.9615503125386389 " " y[1] (numeric) = 1.961550312538635 " " absolute error = 3.774758283725532000000000000000E-15 " " relative error = 1.92437494954704440000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8499999999999726 " " y[1] (analytic) = 1.9612752029753073 " " y[1] (numeric) = 1.9612752029753038 " " absolute error = 3.552713678800501000000000000000E-15 " " relative error = 1.81143047819650130000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8509999999999724 " " y[1] (analytic) = 1.9609991321368532 " " y[1] (numeric) = 1.9609991321368496 " " absolute error = 3.552713678800501000000000000000E-15 " " relative error = 1.81168549265455060000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8519999999999723 " " y[1] (analytic) = 1.9607221002993471 " " y[1] (numeric) = 1.9607221002993434 " " absolute error = 3.774758283725532000000000000000E-15 " " relative error = 1.92518780869009060000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8529999999999722 " " y[1] (analytic) = 1.9604441077398205 " " y[1] (numeric) = 1.960444107739817 " " absolute error = 3.552713678800501000000000000000E-15 " " relative error = 1.81219840176744170000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8539999999999721 " " y[1] (analytic) = 1.9601651547362664 " " y[1] (numeric) = 1.9601651547362626 " " absolute error = 3.774758283725532000000000000000E-15 " " relative error = 1.92573481607135970000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.854999999999972 " " y[1] (analytic) = 1.9598852415676375 " " y[1] (numeric) = 1.9598852415676338 " " absolute error = 3.774758283725532000000000000000E-15 " " relative error = 1.92600985183512430000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.855999999999972 " " y[1] (analytic) = 1.9596043685138471 " " y[1] (numeric) = 1.9596043685138433 " " absolute error = 3.774758283725532000000000000000E-15 " " relative error = 1.92628590973610040000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8569999999999718 " " y[1] (analytic) = 1.959322535855768 " " y[1] (numeric) = 1.9593225358557642 " " absolute error = 3.774758283725532000000000000000E-15 " " relative error = 1.92656299034341560000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8579999999999717 " " y[1] (analytic) = 1.9590397438752332 " " y[1] (numeric) = 1.9590397438752292 " " absolute error = 3.9968028886505635000000000000000E-15 " " relative error = 2.040184688006570200000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8589999999999716 " " y[1] (analytic) = 1.9587559928550342 " " y[1] (numeric) = 1.9587559928550302 " " absolute error = 3.9968028886505635000000000000000E-15 " " relative error = 2.04048023502147540000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8599999999999715 " " y[1] (analytic) = 1.9584712830789224 " " y[1] (numeric) = 1.9584712830789184 " " absolute error = 3.9968028886505635000000000000000E-15 " " relative error = 2.04077686672391230000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8609999999999713 " " y[1] (analytic) = 1.9581856148316072 " " y[1] (numeric) = 1.9581856148316032 " " absolute error = 3.9968028886505635000000000000000E-15 " " relative error = 2.04107458372594860000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8619999999999712 " " y[1] (analytic) = 1.9578989883987572 " " y[1] (numeric) = 1.9578989883987532 " " absolute error = 3.9968028886505635000000000000000E-15 " " relative error = 2.0413733866420240000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8629999999999711 " " y[1] (analytic) = 1.9576114040669985 " " y[1] (numeric) = 1.9576114040669945 " " absolute error = 3.9968028886505635000000000000000E-15 " " relative error = 2.0416732760889528000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.863999999999971 " " y[1] (analytic) = 1.9573228621239158 " " y[1] (numeric) = 1.9573228621239116 " " absolute error = 4.218847493575595000000000000000E-15 " " relative error = 2.15541726672403430000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.864999999999971 " " y[1] (analytic) = 1.9570333628580505 " " y[1] (numeric) = 1.9570333628580463 " " absolute error = 4.218847493575595000000000000000E-15 " " relative error = 2.1557361124464390000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8659999999999708 " " y[1] (analytic) = 1.9567429065589022 " " y[1] (numeric) = 1.956742906558898 " " absolute error = 4.218847493575595000000000000000E-15 " " relative error = 2.15605610703083870000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8669999999999707 " " y[1] (analytic) = 1.956451493516927 " " y[1] (numeric) = 1.9564514935169228 " " absolute error = 4.218847493575595000000000000000E-15 " " relative error = 2.15637725113837280000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8679999999999706 " " y[1] (analytic) = 1.956159124023538 " " y[1] (numeric) = 1.9561591240235339 " " absolute error = 4.218847493575595000000000000000E-15 " " relative error = 2.15669954543270060000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8689999999999705 " " y[1] (analytic) = 1.9558657983711047 " " y[1] (numeric) = 1.9558657983711005 " " absolute error = 4.218847493575595000000000000000E-15 " " relative error = 2.15702299058000760000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8699999999999704 " " y[1] (analytic) = 1.9555715168529528 " " y[1] (numeric) = 1.9555715168529484 " " absolute error = 4.440892098500626000000000000000E-15 " " relative error = 2.2708921971042160000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8709999999999702 " " y[1] (analytic) = 1.9552762797633634 " " y[1] (numeric) = 1.9552762797633592 " " absolute error = 4.218847493575595000000000000000E-15 " " relative error = 2.15767333611093540000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8719999999999701 " " y[1] (analytic) = 1.954980087397574 " " y[1] (numeric) = 1.9549800873975698 " " absolute error = 4.218847493575595000000000000000E-15 " " relative error = 2.15800023783957350000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.87299999999997 " " y[1] (analytic) = 1.954682940051777 " " y[1] (numeric) = 1.9546829400517725 " " absolute error = 4.440892098500626000000000000000E-15 " " relative error = 2.2719245190644538000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.87399999999997 " " y[1] (analytic) = 1.954384838023119 " " y[1] (numeric) = 1.9543848380231148 " " absolute error = 4.218847493575595000000000000000E-15 " " relative error = 2.15865750260476020000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8749999999999698 " " y[1] (analytic) = 1.9540857816097028 " " y[1] (numeric) = 1.9540857816096986 " " absolute error = 4.218847493575595000000000000000E-15 " " relative error = 2.1589878670015530000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8759999999999697 " " y[1] (analytic) = 1.9537857711105846 " " y[1] (numeric) = 1.9537857711105802 " " absolute error = 4.440892098500626000000000000000E-15 " " relative error = 2.27296777577426170000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8769999999999696 " " y[1] (analytic) = 1.9534848068257746 " " y[1] (numeric) = 1.9534848068257702 " " absolute error = 4.440892098500626000000000000000E-15 " " relative error = 2.27331796130866760000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8779999999999695 " " y[1] (analytic) = 1.9531828890562373 " " y[1] (numeric) = 1.9531828890562328 " " absolute error = 4.440892098500626000000000000000E-15 " " relative error = 2.2736693646985770000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8789999999999694 " " y[1] (analytic) = 1.9528800181038903 " " y[1] (numeric) = 1.952880018103886 " " absolute error = 4.440892098500626000000000000000E-15 " " relative error = 2.27402198667198240000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8799999999999693 " " y[1] (analytic) = 1.9525761942716047 " " y[1] (numeric) = 1.9525761942716002 " " absolute error = 4.440892098500626000000000000000E-15 " " relative error = 2.27437582795956940000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8809999999999691 " " y[1] (analytic) = 1.9522714178632041 " " y[1] (numeric) = 1.9522714178631997 " " absolute error = 4.440892098500626000000000000000E-15 " " relative error = 2.2747308892947180000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.881999999999969 " " y[1] (analytic) = 1.9519656891834651 " " y[1] (numeric) = 1.9519656891834607 " " absolute error = 4.440892098500626000000000000000E-15 " " relative error = 2.2750871714135068000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.882999999999969 " " y[1] (analytic) = 1.9516590085381162 " " y[1] (numeric) = 1.9516590085381118 " " absolute error = 4.440892098500626000000000000000E-15 " " relative error = 2.27544467505471750000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8839999999999688 " " y[1] (analytic) = 1.9513513762338381 " " y[1] (numeric) = 1.9513513762338337 " " absolute error = 4.440892098500626000000000000000E-15 " " relative error = 2.27580340095983630000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8849999999999687 " " y[1] (analytic) = 1.9510427925782632 " " y[1] (numeric) = 1.9510427925782585 " " absolute error = 4.6629367034256575000000000000000E-15 " " relative error = 2.3899715173667110000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8859999999999686 " " y[1] (analytic) = 1.9507332578799748 " " y[1] (numeric) = 1.95073325787997 " " absolute error = 4.6629367034256575000000000000000E-15 " " relative error = 2.39035074866835530000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8869999999999685 " " y[1] (analytic) = 1.9504227724485077 " " y[1] (numeric) = 1.950422772448503 " " absolute error = 4.6629367034256575000000000000000E-15 " " relative error = 2.39073126569986330000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8879999999999684 " " y[1] (analytic) = 1.9501113365943472 " " y[1] (numeric) = 1.9501113365943428 " " absolute error = 4.440892098500626000000000000000E-15 " " relative error = 2.2772505421439940000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8889999999999683 " " y[1] (analytic) = 1.9497989506289297 " " y[1] (numeric) = 1.949798950628925 " " absolute error = 4.6629367034256575000000000000000E-15 " " relative error = 2.39149616011516160000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8899999999999681 " " y[1] (analytic) = 1.9494856148646404 " " y[1] (numeric) = 1.9494856148646358 " " absolute error = 4.6629367034256575000000000000000E-15 " " relative error = 2.3918805390874460000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.890999999999968 " " y[1] (analytic) = 1.9491713296148157 " " y[1] (numeric) = 1.9491713296148108 " " absolute error = 4.884981308350689000000000000000E-15 " " relative error = 2.5061836453935693000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.891999999999968 " " y[1] (analytic) = 1.9488560951937401 " " y[1] (numeric) = 1.9488560951937353 " " absolute error = 4.884981308350689000000000000000E-15 " " relative error = 2.5065890295327640000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8929999999999678 " " y[1] (analytic) = 1.9485399119166487 " " y[1] (numeric) = 1.9485399119166436 " " absolute error = 5.10702591327572000000000000000E-15 " " relative error = 2.6209501186210140000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8939999999999677 " " y[1] (analytic) = 1.948222780099724 " " y[1] (numeric) = 1.9482227800997192 " " absolute error = 4.884981308350689000000000000000E-15 " " relative error = 2.50740385455334840000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8949999999999676 " " y[1] (analytic) = 1.9479047000600986 " " y[1] (numeric) = 1.9479047000600935 " " absolute error = 5.10702591327572000000000000000E-15 " " relative error = 2.62180481063480850000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8959999999999675 " " y[1] (analytic) = 1.947585672115852 " " y[1] (numeric) = 1.9475856721158469 " " absolute error = 5.10702591327572000000000000000E-15 " " relative error = 2.6222342803166450000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8969999999999674 " " y[1] (analytic) = 1.9472656965860122 " " y[1] (numeric) = 1.9472656965860071 " " absolute error = 5.10702591327572000000000000000E-15 " " relative error = 2.62266516697206100000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8979999999999673 " " y[1] (analytic) = 1.946944773790555 " " y[1] (numeric) = 1.9469447737905496 " " absolute error = 5.329070518200751000000000000000E-15 " " relative error = 2.73714518764980260000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.8989999999999672 " " y[1] (analytic) = 1.9466229040504026 " " y[1] (numeric) = 1.9466229040503973 " " absolute error = 5.329070518200751000000000000000E-15 " " relative error = 2.737597768480160000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.899999999999967 " " y[1] (analytic) = 1.9463000876874252 " " y[1] (numeric) = 1.94630008768742 " " absolute error = 5.329070518200751000000000000000E-15 " " relative error = 2.73805183070854300000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.900999999999967 " " y[1] (analytic) = 1.9459763250244388 " " y[1] (numeric) = 1.9459763250244335 " " absolute error = 5.329070518200751000000000000000E-15 " " relative error = 2.73850737528054200000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9019999999999668 " " y[1] (analytic) = 1.9456516163852065 " " y[1] (numeric) = 1.9456516163852011 " " absolute error = 5.329070518200751000000000000000E-15 " " relative error = 2.7389644031450720000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9029999999999667 " " y[1] (analytic) = 1.9453259620944365 " " y[1] (numeric) = 1.945325962094431 " " absolute error = 5.551115123125783000000000000000E-15 " " relative error = 2.8535655367233010000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9039999999999666 " " y[1] (analytic) = 1.944999362477783 " " y[1] (numeric) = 1.9449993624777775 " " absolute error = 5.551115123125783000000000000000E-15 " " relative error = 2.85404470058750000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9049999999999665 " " y[1] (analytic) = 1.9446718178618458 " " y[1] (numeric) = 1.9446718178618403 " " absolute error = 5.551115123125783000000000000000E-15 " " relative error = 2.8545254125342334000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9059999999999664 " " y[1] (analytic) = 1.9443433285741698 " " y[1] (numeric) = 1.944343328574164 " " absolute error = 5.773159728050814000000000000000E-15 " " relative error = 2.9692079805084630000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9069999999999663 " " y[1] (analytic) = 1.9440138949432435 " " y[1] (numeric) = 1.944013894943238 " " absolute error = 5.551115123125783000000000000000E-15 " " relative error = 2.8554914846881024000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9079999999999662 " " y[1] (analytic) = 1.9436835172985014 " " y[1] (numeric) = 1.9436835172984956 " " absolute error = 5.773159728050814000000000000000E-15 " " relative error = 2.97021592078675840000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.908999999999966 " " y[1] (analytic) = 1.9433521959703204 " " y[1] (numeric) = 1.9433521959703146 " " absolute error = 5.773159728050814000000000000000E-15 " " relative error = 2.97072231169515900000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.909999999999966 " " y[1] (analytic) = 1.9430199312900218 " " y[1] (numeric) = 1.9430199312900163 " " absolute error = 5.551115123125783000000000000000E-15 " " relative error = 2.85695222870938460000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9109999999999658 " " y[1] (analytic) = 1.9426867235898708 " " y[1] (numeric) = 1.942686723589865 " " absolute error = 5.773159728050814000000000000000E-15 " " relative error = 2.9717399403351310000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9119999999999657 " " y[1] (analytic) = 1.9423525732030746 " " y[1] (numeric) = 1.9423525732030689 " " absolute error = 5.773159728050814000000000000000E-15 " " relative error = 2.9722511801914890000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9129999999999656 " " y[1] (analytic) = 1.9420174804637838 " " y[1] (numeric) = 1.942017480463778 " " absolute error = 5.773159728050814000000000000000E-15 " " relative error = 2.9727640384946970000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9139999999999655 " " y[1] (analytic) = 1.9416814457070912 " " y[1] (numeric) = 1.9416814457070852 " " absolute error = 5.995204332975845000000000000000E-15 " " relative error = 3.0876353823284364000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9149999999999654 " " y[1] (analytic) = 1.9413444692690311 " " y[1] (numeric) = 1.9413444692690252 " " absolute error = 5.995204332975845000000000000000E-15 " " relative error = 3.08817133068259750000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9159999999999653 " " y[1] (analytic) = 1.9410065514865802 " " y[1] (numeric) = 1.9410065514865742 " " absolute error = 5.995204332975845000000000000000E-15 " " relative error = 3.0887089630811560000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9169999999999652 " " y[1] (analytic) = 1.9406676926976565 " " y[1] (numeric) = 1.9406676926976503 " " absolute error = 6.217248937900877000000000000000E-15 " " relative error = 3.2036648836352240000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.917999999999965 " " y[1] (analytic) = 1.9403278932411183 " " y[1] (numeric) = 1.940327893241112 " " absolute error = 6.217248937900877000000000000000E-15 " " relative error = 3.20422592467894730000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.918999999999965 " " y[1] (analytic) = 1.939987153456765 " " y[1] (numeric) = 1.939987153456759 " " absolute error = 5.995204332975845000000000000000E-15 " " relative error = 3.09033197580370300000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9199999999999648 " " y[1] (analytic) = 1.9396454736853368 " " y[1] (numeric) = 1.9396454736853308 " " absolute error = 5.995204332975845000000000000000E-15 " " relative error = 3.09087635565943150000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9209999999999647 " " y[1] (analytic) = 1.9393028542685133 " " y[1] (numeric) = 1.9393028542685071 " " absolute error = 6.217248937900877000000000000000E-15 " " relative error = 3.2059195520784010000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9219999999999646 " " y[1] (analytic) = 1.9389592955489139 " " y[1] (numeric) = 1.9389592955489074 " " absolute error = 6.439293542825908000000000000000E-15 " " relative error = 3.32100501418879030000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9229999999999645 " " y[1] (analytic) = 1.938614797870097 " " y[1] (numeric) = 1.9386147978700905 " " absolute error = 6.439293542825908000000000000000E-15 " " relative error = 3.32159516676576670000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9239999999999644 " " y[1] (analytic) = 1.9382693615765603 " " y[1] (numeric) = 1.9382693615765538 " " absolute error = 6.439293542825908000000000000000E-15 " " relative error = 3.32218713790547600000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9249999999999643 " " y[1] (analytic) = 1.9379229870137404 " " y[1] (numeric) = 1.9379229870137338 " " absolute error = 6.661338147750939000000000000000E-15 " " relative error = 3.4373595815671637000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9259999999999642 " " y[1] (analytic) = 1.9375756745280117 " " y[1] (numeric) = 1.937575674528005 " " absolute error = 6.661338147750939000000000000000E-15 " " relative error = 3.4379757319019930000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.926999999999964 " " y[1] (analytic) = 1.9372274244666865 " " y[1] (numeric) = 1.9372274244666798 " " absolute error = 6.661338147750939000000000000000E-15 " " relative error = 3.4385937673708020000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.927999999999964 " " y[1] (analytic) = 1.936878237178015 " " y[1] (numeric) = 1.9368782371780082 " " absolute error = 6.8833827526759700000000000000000E-15 " " relative error = 3.5538541455785544000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9289999999999639 " " y[1] (analytic) = 1.9365281130111844 " " y[1] (numeric) = 1.9365281130111776 " " absolute error = 6.8833827526759700000000000000000E-15 " " relative error = 3.55449668219519200000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9299999999999637 " " y[1] (analytic) = 1.9361770523163186 " " y[1] (numeric) = 1.936177052316312 " " absolute error = 6.661338147750939000000000000000E-15 " " relative error = 3.4404591975624020000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9309999999999636 " " y[1] (analytic) = 1.935825055444479 " " y[1] (numeric) = 1.935825055444472 " " absolute error = 6.8833827526759700000000000000000E-15 " " relative error = 3.5557876127889550000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9319999999999635 " " y[1] (analytic) = 1.9354721227476617 " " y[1] (numeric) = 1.9354721227476546 " " absolute error = 7.105427357601002000000000000000E-15 " " relative error = 3.67115975171675270000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9329999999999634 " " y[1] (analytic) = 1.9351182545787995 " " y[1] (numeric) = 1.9351182545787924 " " absolute error = 7.105427357601002000000000000000E-15 " " relative error = 3.671831083598340000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9339999999999633 " " y[1] (analytic) = 1.9347634512917606 " " y[1] (numeric) = 1.9347634512917535 " " absolute error = 7.105427357601002000000000000000E-15 " " relative error = 3.67250443606271600000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9349999999999632 " " y[1] (analytic) = 1.9344077132413484 " " y[1] (numeric) = 1.9344077132413413 " " absolute error = 7.105427357601002000000000000000E-15 " " relative error = 3.67317981052450700000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.935999999999963 " " y[1] (analytic) = 1.934051040783301 " " y[1] (numeric) = 1.9340510407832936 " " absolute error = 7.327471962526033000000000000000E-15 " " relative error = 3.78866524616556570000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.936999999999963 " " y[1] (analytic) = 1.9336934342742902 " " y[1] (numeric) = 1.933693434274283 " " absolute error = 7.105427357601002000000000000000E-15 " " relative error = 3.6745366311220110000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9379999999999629 " " y[1] (analytic) = 1.9333348940719233 " " y[1] (numeric) = 1.9333348940719162 " " absolute error = 7.105427357601002000000000000000E-15 " " relative error = 3.67521808011016470000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9389999999999628 " " y[1] (analytic) = 1.93297542053474 " " y[1] (numeric) = 1.932975420534733 " " absolute error = 7.105427357601002000000000000000E-15 " " relative error = 3.6759015568006290000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9399999999999626 " " y[1] (analytic) = 1.9326150140222138 " " y[1] (numeric) = 1.932615014022207 " " absolute error = 6.8833827526759700000000000000000E-15 " " relative error = 3.5616937169240330000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9409999999999625 " " y[1] (analytic) = 1.9322536748947516 " " y[1] (numeric) = 1.9322536748947445 " " absolute error = 7.105427357601002000000000000000E-15 " " relative error = 3.6772745990445740000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9419999999999624 " " y[1] (analytic) = 1.931891403513692 " " y[1] (numeric) = 1.931891403513685 " " absolute error = 7.105427357601002000000000000000E-15 " " relative error = 3.67796416748776300000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9429999999999623 " " y[1] (analytic) = 1.9315282002413066 " " y[1] (numeric) = 1.9315282002412995 " " absolute error = 7.105427357601002000000000000000E-15 " " relative error = 3.6786557694126950000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9439999999999622 " " y[1] (analytic) = 1.9311640654407984 " " y[1] (numeric) = 1.9311640654407913 " " absolute error = 7.105427357601002000000000000000E-15 " " relative error = 3.6793494062759240000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.944999999999962 " " y[1] (analytic) = 1.9307989994763026 " " y[1] (numeric) = 1.9307989994762953 " " absolute error = 7.327471962526033000000000000000E-15 " " relative error = 3.79504648827427850000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.945999999999962 " " y[1] (analytic) = 1.9304330027128849 " " y[1] (numeric) = 1.9304330027128775 " " absolute error = 7.327471962526033000000000000000E-15 " " relative error = 3.7957660028752910000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9469999999999619 " " y[1] (analytic) = 1.930066075516542 " " y[1] (numeric) = 1.9300660755165346 " " absolute error = 7.327471962526033000000000000000E-15 " " relative error = 3.79648762054168900000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9479999999999618 " " y[1] (analytic) = 1.929698218254201 " " y[1] (numeric) = 1.9296982182541935 " " absolute error = 7.549516567451064000000000000000E-15 " " relative error = 3.9122783531826630000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9489999999999617 " " y[1] (analytic) = 1.929329431293719 " " y[1] (numeric) = 1.9293294312937117 " " absolute error = 7.327471962526033000000000000000E-15 " " relative error = 3.79793717116136600000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9499999999999615 " " y[1] (analytic) = 1.9289597150038835 " " y[1] (numeric) = 1.928959715003876 " " absolute error = 7.549516567451064000000000000000E-15 " " relative error = 3.9137761710258760000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9509999999999614 " " y[1] (analytic) = 1.9285890697544104 " " y[1] (numeric) = 1.9285890697544028 " " absolute error = 7.549516567451064000000000000000E-15 " " relative error = 3.91452833879870100000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9519999999999613 " " y[1] (analytic) = 1.9282174959159448 " " y[1] (numeric) = 1.9282174959159373 " " absolute error = 7.549516567451064000000000000000E-15 " " relative error = 3.9152826812542130000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9529999999999612 " " y[1] (analytic) = 1.9278449938600606 " " y[1] (numeric) = 1.927844993860053 " " absolute error = 7.549516567451064000000000000000E-15 " " relative error = 3.9160391999851170000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.953999999999961 " " y[1] (analytic) = 1.92747156395926 " " y[1] (numeric) = 1.9274715639592523 " " absolute error = 7.549516567451064000000000000000E-15 " " relative error = 3.9167978965891690000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.954999999999961 " " y[1] (analytic) = 1.9270972065869727 " " y[1] (numeric) = 1.927097206586965 " " absolute error = 7.771561172376096000000000000000E-15 " " relative error = 4.03278108951239060000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9559999999999609 " " y[1] (analytic) = 1.9267219221175558 " " y[1] (numeric) = 1.9267219221175482 " " absolute error = 7.549516567451064000000000000000E-15 " " relative error = 3.9183218298330250000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9569999999999608 " " y[1] (analytic) = 1.9263457109262943 " " y[1] (numeric) = 1.9263457109262867 " " absolute error = 7.549516567451064000000000000000E-15 " " relative error = 3.91908706969365140000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9579999999999607 " " y[1] (analytic) = 1.9259685733893992 " " y[1] (numeric) = 1.9259685733893914 " " absolute error = 7.771561172376096000000000000000E-15 " " relative error = 4.03514433192405650000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9589999999999606 " " y[1] (analytic) = 1.9255905098840076 " " y[1] (numeric) = 1.9255905098839998 " " absolute error = 7.771561172376096000000000000000E-15 " " relative error = 4.0359365776289760000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9599999999999604 " " y[1] (analytic) = 1.9252115207881833 " " y[1] (numeric) = 1.9252115207881755 " " absolute error = 7.771561172376096000000000000000E-15 " " relative error = 4.0367310752401964000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9609999999999603 " " y[1] (analytic) = 1.9248316064809154 " " y[1] (numeric) = 1.9248316064809075 " " absolute error = 7.993605777301127000000000000000E-15 " " relative error = 4.15288576433731900000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9619999999999602 " " y[1] (analytic) = 1.924450767342118 " " y[1] (numeric) = 1.92445076734211 " " absolute error = 7.993605777301127000000000000000E-15 " " relative error = 4.1537075995668060000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.96299999999996 " " y[1] (analytic) = 1.9240690037526302 " " y[1] (numeric) = 1.9240690037526222 " " absolute error = 7.993605777301127000000000000000E-15 " " relative error = 4.1545317562471540000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.96399999999996 " " y[1] (analytic) = 1.9236863160942157 " " y[1] (numeric) = 1.9236863160942077 " " absolute error = 7.993605777301127000000000000000E-15 " " relative error = 4.15535823612399550000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.96499999999996 " " y[1] (analytic) = 1.9233027047495623 " " y[1] (numeric) = 1.9233027047495541 " " absolute error = 8.215650382226158000000000000000E-15 " " relative error = 4.27163668097473860000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9659999999999598 " " y[1] (analytic) = 1.9229181701022808 " " y[1] (numeric) = 1.9229181701022726 " " absolute error = 8.215650382226158000000000000000E-15 " " relative error = 4.2724908994901040000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9669999999999597 " " y[1] (analytic) = 1.9225327125369063 " " y[1] (numeric) = 1.922532712536898 " " absolute error = 8.215650382226158000000000000000E-15 " " relative error = 4.2733475111510980000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9679999999999596 " " y[1] (analytic) = 1.922146332438896 " " y[1] (numeric) = 1.9221463324388879 " " absolute error = 8.215650382226158000000000000000E-15 " " relative error = 4.27420651777422830000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9689999999999594 " " y[1] (analytic) = 1.9217590301946303 " " y[1] (numeric) = 1.9217590301946221 " " absolute error = 8.215650382226158000000000000000E-15 " " relative error = 4.2750679211816170000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9699999999999593 " " y[1] (analytic) = 1.9213708061914112 " " y[1] (numeric) = 1.921370806191403 " " absolute error = 8.215650382226158000000000000000E-15 " " relative error = 4.2759317232010120000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9709999999999592 " " y[1] (analytic) = 1.9209816608174626 " " y[1] (numeric) = 1.9209816608174544 " " absolute error = 8.215650382226158000000000000000E-15 " " relative error = 4.27679792566579500000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9719999999999591 " " y[1] (analytic) = 1.9205915944619298 " " y[1] (numeric) = 1.9205915944619216 " " absolute error = 8.215650382226158000000000000000E-15 " " relative error = 4.2776665304149910000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.972999999999959 " " y[1] (analytic) = 1.9202006075148796 " " y[1] (numeric) = 1.9202006075148712 " " absolute error = 8.43769498715119000000000000000E-15 " " relative error = 4.39417368900390070000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.973999999999959 " " y[1] (analytic) = 1.9198087003672983 " " y[1] (numeric) = 1.91980870036729 " " absolute error = 8.43769498715119000000000000000E-15 " " relative error = 4.3950707096685660000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9749999999999588 " " y[1] (analytic) = 1.9194158734110933 " " y[1] (numeric) = 1.9194158734110849 " " absolute error = 8.43769498715119000000000000000E-15 " " relative error = 4.39597020324528460000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9759999999999587 " " y[1] (analytic) = 1.9190221270390917 " " y[1] (numeric) = 1.919022127039083 " " absolute error = 8.659739592076221000000000000000E-15 " " relative error = 4.51257933405778630000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9769999999999586 " " y[1] (analytic) = 1.9186274616450394 " " y[1] (numeric) = 1.9186274616450307 " " absolute error = 8.659739592076221000000000000000E-15 " " relative error = 4.51350758038839060000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9779999999999585 " " y[1] (analytic) = 1.9182318776236023 " " y[1] (numeric) = 1.9182318776235934 " " absolute error = 8.881784197001252000000000000000E-15 " " relative error = 4.6301932006282953000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9789999999999583 " " y[1] (analytic) = 1.9178353753703639 " " y[1] (numeric) = 1.917835375370355 " " absolute error = 8.881784197001252000000000000000E-15 " " relative error = 4.6311504684212230000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9799999999999582 " " y[1] (analytic) = 1.9174379552818266 " " y[1] (numeric) = 1.9174379552818177 " " absolute error = 8.881784197001252000000000000000E-15 " " relative error = 4.6321103494041350000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9809999999999581 " " y[1] (analytic) = 1.9170396177554103 " " y[1] (numeric) = 1.9170396177554017 " " absolute error = 8.659739592076221000000000000000E-15 " " relative error = 4.5172460244799660000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.981999999999958 " " y[1] (analytic) = 1.9166403631894529 " " y[1] (numeric) = 1.9166403631894442 " " absolute error = 8.659739592076221000000000000000E-15 " " relative error = 4.51818701014189100000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.982999999999958 " " y[1] (analytic) = 1.9162401919832086 " " y[1] (numeric) = 1.9162401919832 " " absolute error = 8.659739592076221000000000000000E-15 " " relative error = 4.5191305496592480000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9839999999999578 " " y[1] (analytic) = 1.9158391045368488 " " y[1] (numeric) = 1.91583910453684 " " absolute error = 8.881784197001252000000000000000E-15 " " relative error = 4.6359760461974760000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9849999999999577 " " y[1] (analytic) = 1.9154371012514608 " " y[1] (numeric) = 1.9154371012514517 " " absolute error = 9.103828801926284000000000000000E-15 " " relative error = 4.7528727495036255000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9859999999999576 " " y[1] (analytic) = 1.9150341825290478 " " y[1] (numeric) = 1.9150341825290387 " " absolute error = 9.103828801926284000000000000000E-15 " " relative error = 4.753872742837160000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9869999999999575 " " y[1] (analytic) = 1.9146303487725285 " " y[1] (numeric) = 1.9146303487725194 " " absolute error = 9.103828801926284000000000000000E-15 " " relative error = 4.7548754294857790000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9879999999999574 " " y[1] (analytic) = 1.9142256003857363 " " y[1] (numeric) = 1.9142256003857274 " " absolute error = 8.881784197001252000000000000000E-15 " " relative error = 4.6398837186230710000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9889999999999572 " " y[1] (analytic) = 1.9138199377734204 " " y[1] (numeric) = 1.9138199377734113 " " absolute error = 9.103828801926284000000000000000E-15 " " relative error = 4.7568888912913490000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9899999999999571 " " y[1] (analytic) = 1.9134133613412425 " " y[1] (numeric) = 1.9134133613412336 " " absolute error = 8.881784197001252000000000000000E-15 " " relative error = 4.6418533373130627000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.990999999999957 " " y[1] (analytic) = 1.9130058714957796 " " y[1] (numeric) = 1.9130058714957707 " " absolute error = 8.881784197001252000000000000000E-15 " " relative error = 4.6428420996202086000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.991999999999957 " " y[1] (analytic) = 1.9125974686445213 " " y[1] (numeric) = 1.9125974686445124 " " absolute error = 8.881784197001252000000000000000E-15 " " relative error = 4.6438335000494746000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9929999999999568 " " y[1] (analytic) = 1.9121881531958704 " " y[1] (numeric) = 1.9121881531958613 " " absolute error = 9.103828801926284000000000000000E-15 " " relative error = 4.7609482292372274000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9939999999999567 " " y[1] (analytic) = 1.9117779255591423 " " y[1] (numeric) = 1.9117779255591332 " " absolute error = 9.103828801926284000000000000000E-15 " " relative error = 4.7619698293480740000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9949999999999566 " " y[1] (analytic) = 1.9113667861445647 " " y[1] (numeric) = 1.9113667861445554 " " absolute error = 9.325873406851315000000000000000E-15 " " relative error = 4.8791647288496720000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9959999999999565 " " y[1] (analytic) = 1.9109547353632768 " " y[1] (numeric) = 1.9109547353632674 " " absolute error = 9.325873406851315000000000000000E-15 " " relative error = 4.8802168017226460000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9969999999999564 " " y[1] (analytic) = 1.9105417736273294 " " y[1] (numeric) = 1.91054177362732 " " absolute error = 9.325873406851315000000000000000E-15 " " relative error = 4.881271655811710000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9979999999999563 " " y[1] (analytic) = 1.9101279013496844 " " y[1] (numeric) = 1.9101279013496748 " " absolute error = 9.547918011776346000000000000000E-15 " " relative error = 4.9985752289309254000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.9989999999999561 " " y[1] (analytic) = 1.9097131189442136 " " y[1] (numeric) = 1.9097131189442043 " " absolute error = 9.325873406851315000000000000000E-15 " " relative error = 4.8833897166748960000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 1.999999999999956 " " y[1] (analytic) = 1.9092974268257001 " " y[1] (numeric) = 1.9092974268256906 " " absolute error = 9.547918011776346000000000000000E-15 " " relative error = 5.0007494262694440000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.000999999999956 " " y[1] (analytic) = 1.908880825409835 " " y[1] (numeric) = 1.9088808254098257 " " absolute error = 9.325873406851315000000000000000E-15 " " relative error = 4.8855189295796180000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.001999999999956 " " y[1] (analytic) = 1.9084633151132206 " " y[1] (numeric) = 1.9084633151132113 " " absolute error = 9.325873406851315000000000000000E-15 " " relative error = 4.8865877237457150000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0029999999999557 " " y[1] (analytic) = 1.908044896353367 " " y[1] (numeric) = 1.9080448963533574 " " absolute error = 9.547918011776346000000000000000E-15 " " relative error = 5.0040321535537320000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0039999999999556 " " y[1] (analytic) = 1.9076255695486923 " " y[1] (numeric) = 1.9076255695486828 " " absolute error = 9.547918011776346000000000000000E-15 " " relative error = 5.0051321203642710000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0049999999999555 " " y[1] (analytic) = 1.9072053351185239 " " y[1] (numeric) = 1.9072053351185143 " " absolute error = 9.547918011776346000000000000000E-15 " " relative error = 5.0062349532925290000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0059999999999554 " " y[1] (analytic) = 1.9067841934830958 " " y[1] (numeric) = 1.9067841934830863 " " absolute error = 9.547918011776346000000000000000E-15 " " relative error = 5.0073406547047670000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0069999999999553 " " y[1] (analytic) = 1.9063621450635502 " " y[1] (numeric) = 1.9063621450635404 " " absolute error = 9.769962616701378000000000000000E-15 " " relative error = 5.1249247903921670000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.007999999999955 " " y[1] (analytic) = 1.9059391902819347 " " y[1] (numeric) = 1.905939190281925 " " absolute error = 9.769962616701378000000000000000E-15 " " relative error = 5.1260620834687610000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.008999999999955 " " y[1] (analytic) = 1.9055153295612044 " " y[1] (numeric) = 1.9055153295611946 " " absolute error = 9.769962616701378000000000000000E-15 " " relative error = 5.1272023190446700000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.009999999999955 " " y[1] (analytic) = 1.9050905633252202 " " y[1] (numeric) = 1.9050905633252102 " " absolute error = 9.992007221626409000000000000000E-15 " " relative error = 5.2448988063779840000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.010999999999955 " " y[1] (analytic) = 1.9046648919987479 " " y[1] (numeric) = 1.904664891998738 " " absolute error = 9.992007221626409000000000000000E-15 " " relative error = 5.2460709826707810000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0119999999999547 " " y[1] (analytic) = 1.9042383160074592 " " y[1] (numeric) = 1.904238316007449 " " absolute error = 1.02140518265514400000000000000E-14 " " relative error = 5.3638516464508690000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0129999999999546 " " y[1] (analytic) = 1.9038108357779295 " " y[1] (numeric) = 1.9038108357779195 " " absolute error = 9.992007221626409000000000000000E-15 " " relative error = 5.2484243885204620000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0139999999999545 " " y[1] (analytic) = 1.9033824517376396 " " y[1] (numeric) = 1.9033824517376297 " " absolute error = 9.992007221626409000000000000000E-15 " " relative error = 5.249605623139210000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0149999999999544 " " y[1] (analytic) = 1.9029531643149733 " " y[1] (numeric) = 1.9029531643149633 " " absolute error = 9.992007221626409000000000000000E-15 " " relative error = 5.2507898822740300000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0159999999999543 " " y[1] (analytic) = 1.902522973939218 " " y[1] (numeric) = 1.9025229739392078 " " absolute error = 1.02140518265514400000000000000E-14 " " relative error = 5.3686877722180710000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.016999999999954 " " y[1] (analytic) = 1.9020918810405636 " " y[1] (numeric) = 1.9020918810405536 " " absolute error = 9.992007221626409000000000000000E-15 " " relative error = 5.2531674842963700000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.017999999999954 " " y[1] (analytic) = 1.9016598860501035 " " y[1] (numeric) = 1.9016598860500935 " " absolute error = 9.992007221626409000000000000000E-15 " " relative error = 5.2543608323045550000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.018999999999954 " " y[1] (analytic) = 1.9012269893998326 " " y[1] (numeric) = 1.9012269893998226 " " absolute error = 9.992007221626409000000000000000E-15 " " relative error = 5.255557215070160000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.019999999999954 " " y[1] (analytic) = 1.9007931915226473 " " y[1] (numeric) = 1.9007931915226373 " " absolute error = 9.992007221626409000000000000000E-15 " " relative error = 5.2567566351719840000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0209999999999537 " " y[1] (analytic) = 1.9003584928523456 " " y[1] (numeric) = 1.9003584928523356 " " absolute error = 9.992007221626409000000000000000E-15 " " relative error = 5.2579590951962400000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0219999999999536 " " y[1] (analytic) = 1.8999228938236261 " " y[1] (numeric) = 1.8999228938236161 " " absolute error = 9.992007221626409000000000000000E-15 " " relative error = 5.2591645977365590000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0229999999999535 " " y[1] (analytic) = 1.8994863948720877 " " y[1] (numeric) = 1.8994863948720777 " " absolute error = 9.992007221626409000000000000000E-15 " " relative error = 5.2603731453940080000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0239999999999534 " " y[1] (analytic) = 1.8990489964342294 " " y[1] (numeric) = 1.8990489964342194 " " absolute error = 9.992007221626409000000000000000E-15 " " relative error = 5.2615847407771010000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0249999999999533 " " y[1] (analytic) = 1.8986106989474496 " " y[1] (numeric) = 1.8986106989474396 " " absolute error = 9.992007221626409000000000000000E-15 " " relative error = 5.2627993865018100000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.025999999999953 " " y[1] (analytic) = 1.8981715028500457 " " y[1] (numeric) = 1.8981715028500357 " " absolute error = 9.992007221626409000000000000000E-15 " " relative error = 5.2640170851915750000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.026999999999953 " " y[1] (analytic) = 1.897731408581214 " " y[1] (numeric) = 1.8977314085812038 " " absolute error = 1.02140518265514400000000000000E-14 " " relative error = 5.3822431247990420000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.027999999999953 " " y[1] (analytic) = 1.8972904165810482 " " y[1] (numeric) = 1.897290416581038 " " absolute error = 1.02140518265514400000000000000E-14 " " relative error = 5.3834941331529760000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.028999999999953 " " y[1] (analytic) = 1.8968485272905409 " " y[1] (numeric) = 1.8968485272905304 " " absolute error = 1.043609643147647100000000000000E-14 " " relative error = 5.5018080154156510000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0299999999999527 " " y[1] (analytic) = 1.896405741151581 " " y[1] (numeric) = 1.8964057411515705 " " absolute error = 1.043609643147647100000000000000E-14 " " relative error = 5.5030926162136660000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0309999999999526 " " y[1] (analytic) = 1.8959620586069543 " " y[1] (numeric) = 1.895962058606944 " " absolute error = 1.043609643147647100000000000000E-14 " " relative error = 5.5043804194817710000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0319999999999525 " " y[1] (analytic) = 1.895517480100344 " " y[1] (numeric) = 1.8955174801003334 " " absolute error = 1.065814103640150300000000000000E-14 " " relative error = 5.6228133732838410000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0329999999999524 " " y[1] (analytic) = 1.8950720060763282 " " y[1] (numeric) = 1.8950720060763175 " " absolute error = 1.065814103640150300000000000000E-14 " " relative error = 5.6241351263843330000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0339999999999523 " " y[1] (analytic) = 1.894625636980381 " " y[1] (numeric) = 1.8946256369803702 " " absolute error = 1.065814103640150300000000000000E-14 " " relative error = 5.6254601586560660000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.034999999999952 " " y[1] (analytic) = 1.894178373258871 " " y[1] (numeric) = 1.8941783732588604 " " absolute error = 1.065814103640150300000000000000E-14 " " relative error = 5.6267884729696950000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.035999999999952 " " y[1] (analytic) = 1.8937302153590625 " " y[1] (numeric) = 1.8937302153590518 " " absolute error = 1.065814103640150300000000000000E-14 " " relative error = 5.6281200722039780000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.036999999999952 " " y[1] (analytic) = 1.8932811637291131 " " y[1] (numeric) = 1.8932811637291025 " " absolute error = 1.065814103640150300000000000000E-14 " " relative error = 5.6294549592457930000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.037999999999952 " " y[1] (analytic) = 1.8928312188180745 " " y[1] (numeric) = 1.8928312188180638 " " absolute error = 1.065814103640150300000000000000E-14 " " relative error = 5.6307931369901440000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0389999999999517 " " y[1] (analytic) = 1.8923803810758915 " " y[1] (numeric) = 1.8923803810758806 " " absolute error = 1.088018564132653400000000000000E-14 " " relative error = 5.7494707460139320000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0399999999999516 " " y[1] (analytic) = 1.8919286509534015 " " y[1] (numeric) = 1.8919286509533908 " " absolute error = 1.065814103640150300000000000000E-14 " " relative error = 5.6334793762072020000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0409999999999515 " " y[1] (analytic) = 1.8914760289023351 " " y[1] (numeric) = 1.8914760289023242 " " absolute error = 1.088018564132653400000000000000E-14 " " relative error = 5.7522196819171660000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0419999999999514 " " y[1] (analytic) = 1.891022515375314 " " y[1] (numeric) = 1.891022515375303 " " absolute error = 1.088018564132653400000000000000E-14 " " relative error = 5.7535992051195270000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0429999999999513 " " y[1] (analytic) = 1.8905681108258519 " " y[1] (numeric) = 1.8905681108258408 " " absolute error = 1.110223024625156500000000000000E-14 " " relative error = 5.8724307168186640000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.043999999999951 " " y[1] (analytic) = 1.890112815708353 " " y[1] (numeric) = 1.890112815708342 " " absolute error = 1.110223024625156500000000000000E-14 " " relative error = 5.8738452826641510000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.044999999999951 " " y[1] (analytic) = 1.8896566304781128 " " y[1] (numeric) = 1.8896566304781017 " " absolute error = 1.110223024625156500000000000000E-14 " " relative error = 5.8752632976725120000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.045999999999951 " " y[1] (analytic) = 1.8891995555913161 " " y[1] (numeric) = 1.889199555591305 " " absolute error = 1.110223024625156500000000000000E-14 " " relative error = 5.8766847649276450000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.046999999999951 " " y[1] (analytic) = 1.8887415915050378 " " y[1] (numeric) = 1.8887415915050267 " " absolute error = 1.110223024625156500000000000000E-14 " " relative error = 5.8781096875220430000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0479999999999507 " " y[1] (analytic) = 1.8882827386772423 " " y[1] (numeric) = 1.8882827386772312 " " absolute error = 1.110223024625156500000000000000E-14 " " relative error = 5.8795380685568150000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0489999999999506 " " y[1] (analytic) = 1.887822997566782 " " y[1] (numeric) = 1.8878229975667709 " " absolute error = 1.110223024625156500000000000000E-14 " " relative error = 5.8809699111416950000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0499999999999505 " " y[1] (analytic) = 1.8873623686333982 " " y[1] (numeric) = 1.887362368633387 " " absolute error = 1.132427485117659700000000000000E-14 " " relative error = 6.0000533227629630000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0509999999999504 " " y[1] (analytic) = 1.8869008523377198 " " y[1] (numeric) = 1.8869008523377084 " " absolute error = 1.132427485117659700000000000000E-14 " " relative error = 6.001520873312830000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0519999999999503 " " y[1] (analytic) = 1.886438449141263 " " y[1] (numeric) = 1.8864384491412514 " " absolute error = 1.154631945610162800000000000000E-14 " " relative error = 6.1206976890010370000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.05299999999995 " " y[1] (analytic) = 1.8859751595064305 " " y[1] (numeric) = 1.8859751595064191 " " absolute error = 1.132427485117659700000000000000E-14 " " relative error = 6.0044665986694210000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.05399999999995 " " y[1] (analytic) = 1.8855109838965127 " " y[1] (numeric) = 1.8855109838965012 " " absolute error = 1.154631945610162800000000000000E-14 " " relative error = 6.1237084030348740000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.05499999999995 " " y[1] (analytic) = 1.8850459227756846 " " y[1] (numeric) = 1.885045922775673 " " absolute error = 1.154631945610162800000000000000E-14 " " relative error = 6.1252191878168950000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.05599999999995 " " y[1] (analytic) = 1.8845799766090077 " " y[1] (numeric) = 1.884579976608996 " " absolute error = 1.17683640610266600000000000000E-14 " " relative error = 6.2445553954159580000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0569999999999498 " " y[1] (analytic) = 1.8841131458624276 " " y[1] (numeric) = 1.8841131458624159 " " absolute error = 1.17683640610266600000000000000E-14 " " relative error = 6.2461026222710470000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0579999999999496 " " y[1] (analytic) = 1.8836454310027757 " " y[1] (numeric) = 1.8836454310027637 " " absolute error = 1.19904086659516900000000000000E-14 " " relative error = 6.3655338040814220000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0589999999999495 " " y[1] (analytic) = 1.883176832497766 " " y[1] (numeric) = 1.8831768324977542 " " absolute error = 1.17683640610266600000000000000E-14 " " relative error = 6.2492081773423260000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0599999999999494 " " y[1] (analytic) = 1.882707350815998 " " y[1] (numeric) = 1.8827073508159857 " " absolute error = 1.221245327087672200000000000000E-14 " " relative error = 6.4866444939430620000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0609999999999493 " " y[1] (analytic) = 1.8822369864269521 " " y[1] (numeric) = 1.8822369864269402 " " absolute error = 1.19904086659516900000000000000E-14 " " relative error = 6.3702970202031080000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.061999999999949 " " y[1] (analytic) = 1.8817657398009937 " " y[1] (numeric) = 1.8817657398009815 " " absolute error = 1.221245327087672200000000000000E-14 " " relative error = 6.4898903261828180000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.062999999999949 " " y[1] (analytic) = 1.8812936114093688 " " y[1] (numeric) = 1.8812936114093566 " " absolute error = 1.221245327087672200000000000000E-14 " " relative error = 6.4915190254262210000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.063999999999949 " " y[1] (analytic) = 1.880820601724206 " " y[1] (numeric) = 1.8808206017241937 " " absolute error = 1.221245327087672200000000000000E-14 " " relative error = 6.4931515848354650000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.064999999999949 " " y[1] (analytic) = 1.8803467112185148 " " y[1] (numeric) = 1.8803467112185026 " " absolute error = 1.221245327087672200000000000000E-14 " " relative error = 6.494788007985360000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0659999999999488 " " y[1] (analytic) = 1.8798719403661859 " " y[1] (numeric) = 1.8798719403661737 " " absolute error = 1.221245327087672200000000000000E-14 " " relative error = 6.4964282984604900000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0669999999999487 " " y[1] (analytic) = 1.8793962896419898 " " y[1] (numeric) = 1.8793962896419776 " " absolute error = 1.221245327087672200000000000000E-14 " " relative error = 6.4980724598552320000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0679999999999485 " " y[1] (analytic) = 1.8789197595215774 " " y[1] (numeric) = 1.8789197595215652 " " absolute error = 1.221245327087672200000000000000E-14 " " relative error = 6.4997204957737710000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0689999999999484 " " y[1] (analytic) = 1.8784423504814787 " " y[1] (numeric) = 1.8784423504814665 " " absolute error = 1.221245327087672200000000000000E-14 " " relative error = 6.5013724098301180000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0699999999999483 " " y[1] (analytic) = 1.8779640629991028 " " y[1] (numeric) = 1.8779640629990904 " " absolute error = 1.243449787580175300000000000000E-14 " " relative error = 6.6212650821144570000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.070999999999948 " " y[1] (analytic) = 1.877484897552737 " " y[1] (numeric) = 1.8774848975527245 " " absolute error = 1.243449787580175300000000000000E-14 " " relative error = 6.6229549393499080000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.071999999999948 " " y[1] (analytic) = 1.8770048546215468 " " y[1] (numeric) = 1.8770048546215343 " " absolute error = 1.243449787580175300000000000000E-14 " " relative error = 6.6246487563341290000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.072999999999948 " " y[1] (analytic) = 1.876523934685575 " " y[1] (numeric) = 1.8765239346855624 " " absolute error = 1.265654248072678500000000000000E-14 " " relative error = 6.7446741535153810000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.073999999999948 " " y[1] (analytic) = 1.8760421382257417 " " y[1] (numeric) = 1.876042138225729 " " absolute error = 1.265654248072678500000000000000E-14 " " relative error = 6.7464062895179170000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0749999999999478 " " y[1] (analytic) = 1.875559465723843 " " y[1] (numeric) = 1.8755594657238304 " " absolute error = 1.265654248072678500000000000000E-14 " " relative error = 6.7481424673688970000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0759999999999477 " " y[1] (analytic) = 1.8750759176625516 " " y[1] (numeric) = 1.875075917662539 " " absolute error = 1.265654248072678500000000000000E-14 " " relative error = 6.7498826908855440000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0769999999999476 " " y[1] (analytic) = 1.8745914945254154 " " y[1] (numeric) = 1.8745914945254027 " " absolute error = 1.265654248072678500000000000000E-14 " " relative error = 6.7516269638954070000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0779999999999474 " " y[1] (analytic) = 1.8741061967968577 " " y[1] (numeric) = 1.8741061967968449 " " absolute error = 1.287858708565181600000000000000E-14 " " relative error = 6.8718555584861450000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0789999999999473 " " y[1] (analytic) = 1.8736200249621762 " " y[1] (numeric) = 1.873620024962163 " " absolute error = 1.310063169057684700000000000000E-14 " " relative error = 6.9921496973973240000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0799999999999472 " " y[1] (analytic) = 1.8731329795075422 " " y[1] (numeric) = 1.873132979507529 " " absolute error = 1.310063169057684700000000000000E-14 " " relative error = 6.993967771589330000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.080999999999947 " " y[1] (analytic) = 1.8726450609200016 " " y[1] (numeric) = 1.8726450609199885 " " absolute error = 1.310063169057684700000000000000E-14 " " relative error = 6.9957900533167280000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.081999999999947 " " y[1] (analytic) = 1.8721562696874727 " " y[1] (numeric) = 1.8721562696874596 " " absolute error = 1.310063169057684700000000000000E-14 " " relative error = 6.9976165465951160000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.082999999999947 " " y[1] (analytic) = 1.871666606298747 " " y[1] (numeric) = 1.8716666062987337 " " absolute error = 1.332267629550187800000000000000E-14 " " relative error = 7.1180819546958210000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.083999999999947 " " y[1] (analytic) = 1.8711760712434875 " " y[1] (numeric) = 1.8711760712434742 " " absolute error = 1.332267629550187800000000000000E-14 " " relative error = 7.1199479836487610000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0849999999999467 " " y[1] (analytic) = 1.8706846650122293 " " y[1] (numeric) = 1.870684665012216 " " absolute error = 1.332267629550187800000000000000E-14 " " relative error = 7.1218183078518920000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0859999999999466 " " y[1] (analytic) = 1.8701923880963789 " " y[1] (numeric) = 1.8701923880963653 " " absolute error = 1.35447209004269100000000000000E-14 " " relative error = 7.242421146956830000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0869999999999465 " " y[1] (analytic) = 1.8696992409882127 " " y[1] (numeric) = 1.8696992409881992 " " absolute error = 1.35447209004269100000000000000E-14 " " relative error = 7.2443313895062440000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0879999999999463 " " y[1] (analytic) = 1.8692052241808779 " " y[1] (numeric) = 1.8692052241808645 " " absolute error = 1.332267629550187800000000000000E-14 " " relative error = 7.1274550932951390000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0889999999999462 " " y[1] (analytic) = 1.8687103381683916 " " y[1] (numeric) = 1.868710338168378 " " absolute error = 1.35447209004269100000000000000E-14 " " relative error = 7.2481650172186180000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.089999999999946 " " y[1] (analytic) = 1.8682145834456394 " " y[1] (numeric) = 1.8682145834456259 " " absolute error = 1.35447209004269100000000000000E-14 " " relative error = 7.2500884108535970000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.090999999999946 " " y[1] (analytic) = 1.867717960508376 " " y[1] (numeric) = 1.8677179605083625 " " absolute error = 1.35447209004269100000000000000E-14 " " relative error = 7.2520161966746620000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.091999999999946 " " y[1] (analytic) = 1.8672204698532244 " " y[1] (numeric) = 1.8672204698532109 " " absolute error = 1.35447209004269100000000000000E-14 " " relative error = 7.2539483789461730000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.092999999999946 " " y[1] (analytic) = 1.8667221119776753 " " y[1] (numeric) = 1.8667221119776618 " " absolute error = 1.35447209004269100000000000000E-14 " " relative error = 7.2558849619438670000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0939999999999457 " " y[1] (analytic) = 1.8662228873800866 " " y[1] (numeric) = 1.866222887380073 " " absolute error = 1.35447209004269100000000000000E-14 " " relative error = 7.2578259499548770000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0949999999999456 " " y[1] (analytic) = 1.8657227965596825 " " y[1] (numeric) = 1.865722796559669 " " absolute error = 1.35447209004269100000000000000E-14 " " relative error = 7.2597713472777560000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0959999999999455 " " y[1] (analytic) = 1.8652218400165541 " " y[1] (numeric) = 1.8652218400165406 " " absolute error = 1.35447209004269100000000000000E-14 " " relative error = 7.2617211582224980000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0969999999999454 " " y[1] (analytic) = 1.8647200182516577 " " y[1] (numeric) = 1.8647200182516441 " " absolute error = 1.35447209004269100000000000000E-14 " " relative error = 7.2636753871105550000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.0979999999999452 " " y[1] (analytic) = 1.8642173317668154 " " y[1] (numeric) = 1.8642173317668016 " " absolute error = 1.376676550535194000000000000000E-14 " " relative error = 7.3847427930006760000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.098999999999945 " " y[1] (analytic) = 1.8637137810647129 " " y[1] (numeric) = 1.8637137810646993 " " absolute error = 1.35447209004269100000000000000E-14 " " relative error = 7.2675971160598520000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.099999999999945 " " y[1] (analytic) = 1.8632093666489016 " " y[1] (numeric) = 1.8632093666488878 " " absolute error = 1.376676550535194000000000000000E-14 " " relative error = 7.3887378153923360000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.100999999999945 " " y[1] (analytic) = 1.8627040890237954 " " y[1] (numeric) = 1.8627040890237816 " " absolute error = 1.376676550535194000000000000000E-14 " " relative error = 7.3907420864506810000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.101999999999945 " " y[1] (analytic) = 1.8621979486946723 " " y[1] (numeric) = 1.8621979486946583 " " absolute error = 1.398881011027697200000000000000E-14 " " relative error = 7.51198878727290000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1029999999999447 " " y[1] (analytic) = 1.861690946167672 " " y[1] (numeric) = 1.861690946167658 " " absolute error = 1.398881011027697200000000000000E-14 " " relative error = 7.5140345603942570000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1039999999999446 " " y[1] (analytic) = 1.8611830819497976 " " y[1] (numeric) = 1.8611830819497837 " " absolute error = 1.398881011027697200000000000000E-14 " " relative error = 7.5160849278847550000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1049999999999445 " " y[1] (analytic) = 1.860674356548913 " " y[1] (numeric) = 1.860674356548899 " " absolute error = 1.398881011027697200000000000000E-14 " " relative error = 7.5181398943030140000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1059999999999444 " " y[1] (analytic) = 1.8601647704737436 " " y[1] (numeric) = 1.8601647704737294 " " absolute error = 1.421085471520200400000000000000E-14 " " relative error = 7.6395677096834850000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1069999999999443 " " y[1] (analytic) = 1.8596543242338752 " " y[1] (numeric) = 1.859654324233861 " " absolute error = 1.421085471520200400000000000000E-14 " " relative error = 7.6416646524113950000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.107999999999944 " " y[1] (analytic) = 1.8591430183397546 " " y[1] (numeric) = 1.8591430183397402 " " absolute error = 1.443289932012703500000000000000E-14 " " relative error = 7.7632001291734140000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.108999999999944 " " y[1] (analytic) = 1.858630853302687 " " y[1] (numeric) = 1.8586308533026725 " " absolute error = 1.443289932012703500000000000000E-14 " " relative error = 7.7653393596047050000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.109999999999944 " " y[1] (analytic) = 1.8581178296348377 " " y[1] (numeric) = 1.858117829634823 " " absolute error = 1.465494392505206600000000000000E-14 " " relative error = 7.8869831026443000000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.110999999999944 " " y[1] (analytic) = 1.8576039478492303 " " y[1] (numeric) = 1.8576039478492157 " " absolute error = 1.465494392505206600000000000000E-14 " " relative error = 7.8891649331494170000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1119999999999437 " " y[1] (analytic) = 1.8570892084597463 " " y[1] (numeric) = 1.8570892084597317 " " absolute error = 1.465494392505206600000000000000E-14 " " relative error = 7.8913516153630280000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1129999999999436 " " y[1] (analytic) = 1.8565736119811254 " " y[1] (numeric) = 1.8565736119811107 " " absolute error = 1.465494392505206600000000000000E-14 " " relative error = 7.8935431541623420000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1139999999999435 " " y[1] (analytic) = 1.856057158928964 " " y[1] (numeric) = 1.8560571589289492 " " absolute error = 1.487698852997709800000000000000E-14 " " relative error = 8.0153719719288440000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1149999999999434 " " y[1] (analytic) = 1.8555398498197149 " " y[1] (numeric) = 1.8555398498197 " " absolute error = 1.487698852997709800000000000000E-14 " " relative error = 8.0176065911074620000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1159999999999433 " " y[1] (analytic) = 1.8550216851706873 " " y[1] (numeric) = 1.8550216851706725 " " absolute error = 1.487698852997709800000000000000E-14 " " relative error = 8.019846155387780000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.116999999999943 " " y[1] (analytic) = 1.8545026655000458 " " y[1] (numeric) = 1.854502665500031 " " absolute error = 1.487698852997709800000000000000E-14 " " relative error = 8.0220906697730110000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.117999999999943 " " y[1] (analytic) = 1.85398279132681 " " y[1] (numeric) = 1.853982791326795 " " absolute error = 1.50990331349021300000000000000E-14 " " relative error = 8.1441064100149750000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.118999999999943 " " y[1] (analytic) = 1.8534620631708543 " " y[1] (numeric) = 1.853462063170839 " " absolute error = 1.53210777398271600000000000000E-14 " " relative error = 8.2661944068152450000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.119999999999943 " " y[1] (analytic) = 1.8529404815529062 " " y[1] (numeric) = 1.852940481552891 " " absolute error = 1.53210777398271600000000000000E-14 " " relative error = 8.2685212462879120000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1209999999999427 " " y[1] (analytic) = 1.8524180469945475 " " y[1] (numeric) = 1.8524180469945324 " " absolute error = 1.50990331349021300000000000000E-14 " " relative error = 8.1509857666305560000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1219999999999426 " " y[1] (analytic) = 1.8518947600182132 " " y[1] (numeric) = 1.8518947600181979 " " absolute error = 1.53210777398271600000000000000E-14 " " relative error = 8.2731902862970900000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1229999999999425 " " y[1] (analytic) = 1.8513706211471899 " " y[1] (numeric) = 1.8513706211471743 " " absolute error = 1.55431223447521920000000000000E-14 " " relative error = 8.3954677508715110000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1239999999999424 " " y[1] (analytic) = 1.850845630905616 " " y[1] (numeric) = 1.8508456309056005 " " absolute error = 1.55431223447521920000000000000E-14 " " relative error = 8.3978491156752840000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1249999999999423 " " y[1] (analytic) = 1.8503197898184824 " " y[1] (numeric) = 1.8503197898184667 " " absolute error = 1.576516694967722300000000000000E-14 " " relative error = 8.5202390616077210000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.125999999999942 " " y[1] (analytic) = 1.8497930984116298 " " y[1] (numeric) = 1.849793098411614 " " absolute error = 1.576516694967722300000000000000E-14 " " relative error = 8.5226650284371640000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.126999999999942 " " y[1] (analytic) = 1.8492655572117496 " " y[1] (numeric) = 1.8492655572117338 " " absolute error = 1.576516694967722300000000000000E-14 " " relative error = 8.5250962946864840000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.127999999999942 " " y[1] (analytic) = 1.8487371667463828 " " y[1] (numeric) = 1.848737166746367 " " absolute error = 1.576516694967722300000000000000E-14 " " relative error = 8.5275328658116120000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.128999999999942 " " y[1] (analytic) = 1.8482079275439203 " " y[1] (numeric) = 1.8482079275439043 " " absolute error = 1.598721155460225400000000000000E-14 " " relative error = 8.6501152366809870000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1299999999999417 " " y[1] (analytic) = 1.8476778401336007 " " y[1] (numeric) = 1.8476778401335847 " " absolute error = 1.598721155460225400000000000000E-14 " " relative error = 8.6525969015498180000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1309999999999416 " " y[1] (analytic) = 1.8471469050455116 " " y[1] (numeric) = 1.8471469050454956 " " absolute error = 1.598721155460225400000000000000E-14 " " relative error = 8.6550839626956190000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1319999999999415 " " y[1] (analytic) = 1.8466151228105883 " " y[1] (numeric) = 1.846615122810572 " " absolute error = 1.620925615952728500000000000000E-14 " " relative error = 8.7778205427325030000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1329999999999414 " " y[1] (analytic) = 1.8460824939606124 " " y[1] (numeric) = 1.8460824939605962 " " absolute error = 1.620925615952728500000000000000E-14 " " relative error = 8.7803531058634920000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1339999999999413 " " y[1] (analytic) = 1.8455490190282133 " " y[1] (numeric) = 1.845549019028197 " " absolute error = 1.643130076445231700000000000000E-14 " " relative error = 8.903204734764690000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.134999999999941 " " y[1] (analytic) = 1.8450146985468656 " " y[1] (numeric) = 1.8450146985468492 " " absolute error = 1.643130076445231700000000000000E-14 " " relative error = 8.9057831232421170000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.135999999999941 " " y[1] (analytic) = 1.8444795330508894 " " y[1] (numeric) = 1.8444795330508732 " " absolute error = 1.620925615952728500000000000000E-14 " " relative error = 8.7879837477600620000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.136999999999941 " " y[1] (analytic) = 1.8439435230754508 " " y[1] (numeric) = 1.8439435230754346 " " absolute error = 1.620925615952728500000000000000E-14 " " relative error = 8.7905382983164350000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.137999999999941 " " y[1] (analytic) = 1.8434066691565598 " " y[1] (numeric) = 1.8434066691565432 " " absolute error = 1.665334536937734800000000000000E-14 " " relative error = 9.0340051644692110000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1389999999999407 " " y[1] (analytic) = 1.8428689718310696 " " y[1] (numeric) = 1.842868971831053 " " absolute error = 1.665334536937734800000000000000E-14 " " relative error = 9.0366410330467660000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1399999999999406 " " y[1] (analytic) = 1.8423304316366778 " " y[1] (numeric) = 1.842330431636661 " " absolute error = 1.665334536937734800000000000000E-14 " " relative error = 9.0392825757011220000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1409999999999405 " " y[1] (analytic) = 1.8417910491119245 " " y[1] (numeric) = 1.8417910491119078 " " absolute error = 1.665334536937734800000000000000E-14 " " relative error = 9.0419297983923120000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1419999999999404 " " y[1] (analytic) = 1.8412508247961923 " " y[1] (numeric) = 1.8412508247961756 " " absolute error = 1.665334536937734800000000000000E-14 " " relative error = 9.0445827070957060000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1429999999999403 " " y[1] (analytic) = 1.8407097592297055 " " y[1] (numeric) = 1.8407097592296886 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 9.1678711919060730000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.14399999999994 " " y[1] (analytic) = 1.8401678529535292 " " y[1] (numeric) = 1.8401678529535126 " " absolute error = 1.665334536937734800000000000000E-14 " " relative error = 9.0499056065174640000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.14499999999994 " " y[1] (analytic) = 1.8396251065095703 " " y[1] (numeric) = 1.8396251065095535 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 9.1732766173870380000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.14599999999994 " " y[1] (analytic) = 1.8390815204405748 " " y[1] (numeric) = 1.839081520440558 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 9.175988006371610000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.14699999999994 " " y[1] (analytic) = 1.8385370952901288 " " y[1] (numeric) = 1.838537095290112 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 9.1787051876912880000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1479999999999397 " " y[1] (analytic) = 1.8379918316026576 " " y[1] (numeric) = 1.8379918316026405 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 9.3022364328567840000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1489999999999396 " " y[1] (analytic) = 1.8374457299234241 " " y[1] (numeric) = 1.8374457299234073 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 9.1841569519474540000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1499999999999395 " " y[1] (analytic) = 1.8368987907985308 " " y[1] (numeric) = 1.836898790798514 " " absolute error = 1.68753899743023800000000000000E-14 " " relative error = 9.1868915472291020000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1509999999999394 " " y[1] (analytic) = 1.8363510147749165 " " y[1] (numeric) = 1.8363510147748994 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 9.3105481695301380000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1519999999999393 " " y[1] (analytic) = 1.835802402400357 " " y[1] (numeric) = 1.8358024024003399 " " absolute error = 1.70974345792274100000000000000E-14 " " relative error = 9.313330539753131000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.152999999999939 " " y[1] (analytic) = 1.8352529542234648 " " y[1] (numeric) = 1.8352529542234475 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 9.4371073721991040000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.153999999999939 " " y[1] (analytic) = 1.8347026707936878 " " y[1] (numeric) = 1.8347026707936704 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 9.439937849253841000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.154999999999939 " " y[1] (analytic) = 1.8341515526613097 " " y[1] (numeric) = 1.8341515526612924 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 9.4427743220140640000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.155999999999939 " " y[1] (analytic) = 1.8335996003774486 " " y[1] (numeric) = 1.833599600377431 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 9.5667144481633460000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1569999999999387 " " y[1] (analytic) = 1.8330468144940562 " " y[1] (numeric) = 1.8330468144940388 " " absolute error = 1.731947918415244200000000000000E-14 " " relative error = 9.4484652804313860000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1579999999999386 " " y[1] (analytic) = 1.8324931955639192 " " y[1] (numeric) = 1.8324931955639014 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 9.6936613118151640000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1589999999999385 " " y[1] (analytic) = 1.8319387441406556 " " y[1] (numeric) = 1.831938744140638 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 9.5753877389093740000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1599999999999384 " " y[1] (analytic) = 1.8313834607787174 " " y[1] (numeric) = 1.8313834607786998 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 9.578291037759340000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1609999999999383 " " y[1] (analytic) = 1.8308273460333877 " " y[1] (numeric) = 1.8308273460333702 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 9.5812004485744560000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.161999999999938 " " y[1] (analytic) = 1.830270400460781 " " y[1] (numeric) = 1.8302704004607635 " " absolute error = 1.754152378907747300000000000000E-14 " " relative error = 9.5841159779786070000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.162999999999938 " " y[1] (analytic) = 1.8297126246178435 " " y[1] (numeric) = 1.8297126246178257 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 9.7083925393544410000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.163999999999938 " " y[1] (analytic) = 1.82915401906235 " " y[1] (numeric) = 1.8291540190623323 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 9.7113573864645670000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.164999999999938 " " y[1] (analytic) = 1.8285945843529068 " " y[1] (numeric) = 1.828594584352889 " " absolute error = 1.776356839400250500000000000000E-14 " " relative error = 9.7143284498398430000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1659999999999378 " " y[1] (analytic) = 1.8280343210489485 " " y[1] (numeric) = 1.8280343210489305 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 9.8387720579595970000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1669999999999376 " " y[1] (analytic) = 1.827473229710738 " " y[1] (numeric) = 1.82747322971072 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 9.841792868163871000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1679999999999375 " " y[1] (analytic) = 1.8269113108993664 " " y[1] (numeric) = 1.8269113108993484 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 9.8448199929713250000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1689999999999374 " " y[1] (analytic) = 1.826348565176753 " " y[1] (numeric) = 1.826348565176735 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 9.8478534392950870000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1699999999999373 " " y[1] (analytic) = 1.8257849931056436 " " y[1] (numeric) = 1.8257849931056254 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 9.9725091796715380000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.170999999999937 " " y[1] (analytic) = 1.8252205952496094 " " y[1] (numeric) = 1.8252205952495915 " " absolute error = 1.798561299892753600000000000000E-14 " " relative error = 9.85393932423160000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.171999999999937 " " y[1] (analytic) = 1.8246553721730492 " " y[1] (numeric) = 1.824655372173031 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 9.9786830332614530000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.172999999999937 " " y[1] (analytic) = 1.8240893244411853 " " y[1] (numeric) = 1.8240893244411671 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 9.9817795981183820000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.173999999999937 " " y[1] (analytic) = 1.8235224526200655 " " y[1] (numeric) = 1.8235224526200473 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 9.9848825977939140000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1749999999999368 " " y[1] (analytic) = 1.8229547572765619 " " y[1] (numeric) = 1.8229547572765437 " " absolute error = 1.820765760385256700000000000000E-14 " " relative error = 9.9879920393933660000000000000E-13 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1759999999999367 " " y[1] (analytic) = 1.8223862389783696 " " y[1] (numeric) = 1.8223862389783512 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 1.011295070967464000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1769999999999365 " " y[1] (analytic) = 1.8218168982940068 " " y[1] (numeric) = 1.8218168982939884 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 1.0116111133910116000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1779999999999364 " " y[1] (analytic) = 1.8212467357928142 " " y[1] (numeric) = 1.8212467357927957 " " absolute error = 1.8429702208777599000000000000E-14 " " relative error = 1.0119278100314558000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1789999999999363 " " y[1] (analytic) = 1.8206757520449544 " " y[1] (numeric) = 1.8206757520449357 " " absolute error = 1.86517468137026300000000000000E-14 " " relative error = 1.0244408864540147000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.179999999999936 " " y[1] (analytic) = 1.8201039476214107 " " y[1] (numeric) = 1.820103947621392 " " absolute error = 1.86517468137026300000000000000E-14 " " relative error = 1.0247627251222396000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.180999999999936 " " y[1] (analytic) = 1.8195313230939878 " " y[1] (numeric) = 1.8195313230939691 " " absolute error = 1.86517468137026300000000000000E-14 " " relative error = 1.0250852281007516000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.181999999999936 " " y[1] (analytic) = 1.81895787903531 " " y[1] (numeric) = 1.8189578790352914 " " absolute error = 1.86517468137026300000000000000E-14 " " relative error = 1.0254083961303515000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.182999999999936 " " y[1] (analytic) = 1.8183836160188216 " " y[1] (numeric) = 1.818383616018803 " " absolute error = 1.86517468137026300000000000000E-14 " " relative error = 1.0257322299537025000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1839999999999358 " " y[1] (analytic) = 1.8178085346187856 " " y[1] (numeric) = 1.8178085346187667 " " absolute error = 1.88737914186276600000000000000E-14 " " relative error = 1.0382716913905184000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1849999999999357 " " y[1] (analytic) = 1.8172326354102828 " " y[1] (numeric) = 1.817232635410264 " " absolute error = 1.88737914186276600000000000000E-14 " " relative error = 1.0386007300802443000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1859999999999356 " " y[1] (analytic) = 1.8166559189692126 " " y[1] (numeric) = 1.8166559189691938 " " absolute error = 1.88737914186276600000000000000E-14 " " relative error = 1.038930444755703900000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1869999999999354 " " y[1] (analytic) = 1.8160783858722915 " " y[1] (numeric) = 1.8160783858722727 " " absolute error = 1.88737914186276600000000000000E-14 " " relative error = 1.0392608361759824000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1879999999999353 " " y[1] (analytic) = 1.8155000366970528 " " y[1] (numeric) = 1.8155000366970337 " " absolute error = 1.909583602355269200000000000000E-14 " " relative error = 1.0518223981032702000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.188999999999935 " " y[1] (analytic) = 1.8149208720218453 " " y[1] (numeric) = 1.8149208720218262 " " absolute error = 1.909583602355269200000000000000E-14 " " relative error = 1.0521580482062386000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.189999999999935 " " y[1] (analytic) = 1.8143408924258337 " " y[1] (numeric) = 1.8143408924258144 " " absolute error = 1.931788062847772400000000000000E-14 " " relative error = 1.0647326921375332000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.190999999999935 " " y[1] (analytic) = 1.8137600984889972 " " y[1] (numeric) = 1.8137600984889781 " " absolute error = 1.909583602355269200000000000000E-14 " " relative error = 1.0528314102543662000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.191999999999935 " " y[1] (analytic) = 1.8131784907921304 " " y[1] (numeric) = 1.8131784907921111 " " absolute error = 1.931788062847772400000000000000E-14 " " relative error = 1.0654152763547424000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.192999999999935 " " y[1] (analytic) = 1.8125960699168404 " " y[1] (numeric) = 1.812596069916821 " " absolute error = 1.931788062847772400000000000000E-14 " " relative error = 1.0657576141254683000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1939999999999347 " " y[1] (analytic) = 1.8120128364455483 " " y[1] (numeric) = 1.8120128364455288 " " absolute error = 1.953992523340275500000000000000E-14 " " relative error = 1.0783546805182877000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1949999999999346 " " y[1] (analytic) = 1.8114287909614872 " " y[1] (numeric) = 1.8114287909614677 " " absolute error = 1.953992523340275500000000000000E-14 " " relative error = 1.0787023663806938000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1959999999999344 " " y[1] (analytic) = 1.810843934048703 " " y[1] (numeric) = 1.8108439340486833 " " absolute error = 1.976196983832778600000000000000E-14 " " relative error = 1.0913127004900845000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1969999999999343 " " y[1] (analytic) = 1.8102582662920523 " " y[1] (numeric) = 1.8102582662920323 " " absolute error = 1.998401444325281800000000000000E-14 " " relative error = 1.1039316773393902000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.1979999999999342 " " y[1] (analytic) = 1.8096717882772029 " " y[1] (numeric) = 1.8096717882771827 " " absolute error = 2.02060590481778500000000000000E-14 " " relative error = 1.1165593219206837000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.198999999999934 " " y[1] (analytic) = 1.8090845005906324 " " y[1] (numeric) = 1.8090845005906122 " " absolute error = 2.02060590481778500000000000000E-14 " " relative error = 1.1169217934032902000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.199999999999934 " " y[1] (analytic) = 1.8084964038196292 " " y[1] (numeric) = 1.8084964038196087 " " absolute error = 2.04281036531028800000000000000E-14 " " relative error = 1.1295628572972424000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.200999999999934 " " y[1] (analytic) = 1.807907498552289 " " y[1] (numeric) = 1.8079074985522687 " " absolute error = 2.02060590481778500000000000000E-14 " " relative error = 1.1176489430105345000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.201999999999934 " " y[1] (analytic) = 1.807317785377518 " " y[1] (numeric) = 1.8073177853774975 " " absolute error = 2.04281036531028800000000000000E-14 " " relative error = 1.1302994868075067000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2029999999999337 " " y[1] (analytic) = 1.8067272648850285 " " y[1] (numeric) = 1.8067272648850081 " " absolute error = 2.04281036531028800000000000000E-14 " " relative error = 1.130668919993457000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2039999999999336 " " y[1] (analytic) = 1.8061359376653416 " " y[1] (numeric) = 1.8061359376653212 " " absolute error = 2.04281036531028800000000000000E-14 " " relative error = 1.1310390999422103000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2049999999999335 " " y[1] (analytic) = 1.8055438043097842 " " y[1] (numeric) = 1.8055438043097638 " " absolute error = 2.04281036531028800000000000000E-14 " " relative error = 1.1314100275131266000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2059999999999333 " " y[1] (analytic) = 1.8049508654104898 " " y[1] (numeric) = 1.8049508654104691 " " absolute error = 2.065014825802791200000000000000E-14 " " relative error = 1.1440836786064847000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2069999999999332 " " y[1] (analytic) = 1.8043571215603968 " " y[1] (numeric) = 1.8043571215603762 " " absolute error = 2.065014825802791200000000000000E-14 " " relative error = 1.1444601521105639000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.207999999999933 " " y[1] (analytic) = 1.8037625733532494 " " y[1] (numeric) = 1.8037625733532288 " " absolute error = 2.065014825802791200000000000000E-14 " " relative error = 1.144837383982231000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.208999999999933 " " y[1] (analytic) = 1.8031672213835956 " " y[1] (numeric) = 1.8031672213835748 " " absolute error = 2.087219286295294300000000000000E-14 " " relative error = 1.1575295189171317000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.209999999999933 " " y[1] (analytic) = 1.8025710662467873 " " y[1] (numeric) = 1.8025710662467664 " " absolute error = 2.087219286295294300000000000000E-14 " " relative error = 1.1579123427522808000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.210999999999933 " " y[1] (analytic) = 1.8019741085389795 " " y[1] (numeric) = 1.8019741085389587 " " absolute error = 2.087219286295294300000000000000E-14 " " relative error = 1.1582959357765624000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2119999999999327 " " y[1] (analytic) = 1.8013763488571302 " " y[1] (numeric) = 1.8013763488571093 " " absolute error = 2.087219286295294300000000000000E-14 " " relative error = 1.1586802988834148000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2129999999999326 " " y[1] (analytic) = 1.800777787798999 " " y[1] (numeric) = 1.800777787798978 " " absolute error = 2.109423746787797400000000000000E-14 " " relative error = 1.1713959162979463000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2139999999999325 " " y[1] (analytic) = 1.8001784259631464 " " y[1] (numeric) = 1.8001784259631253 " " absolute error = 2.109423746787797400000000000000E-14 " " relative error = 1.171785927641698100000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2149999999999324 " " y[1] (analytic) = 1.7995782639489346 " " y[1] (numeric) = 1.7995782639489135 " " absolute error = 2.109423746787797400000000000000E-14 " " relative error = 1.1721767199826853000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2159999999999322 " " y[1] (analytic) = 1.7989773023565254 " " y[1] (numeric) = 1.7989773023565043 " " absolute error = 2.109423746787797400000000000000E-14 " " relative error = 1.1725682942328458000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.216999999999932 " " y[1] (analytic) = 1.7983755417868807 " " y[1] (numeric) = 1.7983755417868594 " " absolute error = 2.131628207280300600000000000000E-14 " " relative error = 1.1853076055306541000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.217999999999932 " " y[1] (analytic) = 1.7977729828417606 " " y[1] (numeric) = 1.7977729828417393 " " absolute error = 2.131628207280300600000000000000E-14 " " relative error = 1.1857048846683696000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.218999999999932 " " y[1] (analytic) = 1.797169626123724 " " y[1] (numeric) = 1.7971696261237027 " " absolute error = 2.131628207280300600000000000000E-14 " " relative error = 1.1861029567242147000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.219999999999932 " " y[1] (analytic) = 1.7965654722361277 " " y[1] (numeric) = 1.7965654722361064 " " absolute error = 2.131628207280300600000000000000E-14 " " relative error = 1.1865018226288915000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2209999999999317 " " y[1] (analytic) = 1.7959605217831258 " " y[1] (numeric) = 1.7959605217831043 " " absolute error = 2.153832667772803700000000000000E-14 " " relative error = 1.1992650404332737000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2219999999999316 " " y[1] (analytic) = 1.7953547753696684 " " y[1] (numeric) = 1.7953547753696468 " " absolute error = 2.153832667772803700000000000000E-14 " " relative error = 1.1996696682578092000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2229999999999315 " " y[1] (analytic) = 1.794748233601502 " " y[1] (numeric) = 1.7947482336014802 " " absolute error = 2.176037128265306800000000000000E-14 " " relative error = 1.2124470092937083000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2239999999999314 " " y[1] (analytic) = 1.794140897085168 " " y[1] (numeric) = 1.7941408970851462 " " absolute error = 2.176037128265306800000000000000E-14 " " relative error = 1.2128574360021459000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2249999999999313 " " y[1] (analytic) = 1.793532766428003 " " y[1] (numeric) = 1.7935327664279812 " " absolute error = 2.176037128265306800000000000000E-14 " " relative error = 1.2132686778837606000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.225999999999931 " " y[1] (analytic) = 1.792923842238138 " " y[1] (numeric) = 1.792923842238116 " " absolute error = 2.1982415887578100000000000000E-14 " " relative error = 1.2260652332079576000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.226999999999931 " " y[1] (analytic) = 1.7923141251244965 " " y[1] (numeric) = 1.7923141251244745 " " absolute error = 2.1982415887578100000000000000E-14 " " relative error = 1.2264823213425924000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.227999999999931 " " y[1] (analytic) = 1.7917036156967963 " " y[1] (numeric) = 1.791703615696774 " " absolute error = 2.22044604925031300000000000000E-14 " " relative error = 1.2392931675737999000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.228999999999931 " " y[1] (analytic) = 1.791092314565546 " " y[1] (numeric) = 1.7910923145655238 " " absolute error = 2.22044604925031300000000000000E-14 " " relative error = 1.2397161392481955000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2299999999999307 " " y[1] (analytic) = 1.790480222342047 " " y[1] (numeric) = 1.7904802223420249 " " absolute error = 2.22044604925031300000000000000E-14 " " relative error = 1.2401399476760748000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2309999999999306 " " y[1] (analytic) = 1.789867339638392 " " y[1] (numeric) = 1.7898673396383695 " " absolute error = 2.242650509742816200000000000000E-14 " " relative error = 1.2529702397921290000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2319999999999305 " " y[1] (analytic) = 1.789253667067463 " " y[1] (numeric) = 1.7892536670674404 " " absolute error = 2.264854970235319300000000000000E-14 " " relative error = 1.2658098803549492000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2329999999999304 " " y[1] (analytic) = 1.7886392052429325 " " y[1] (numeric) = 1.7886392052429099 " " absolute error = 2.264854970235319300000000000000E-14 " " relative error = 1.2662447315235426000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2339999999999303 " " y[1] (analytic) = 1.7880239547792627 " " y[1] (numeric) = 1.78802395477924 " " absolute error = 2.264854970235319300000000000000E-14 " " relative error = 1.266680440260054000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.23499999999993 " " y[1] (analytic) = 1.7874079162917038 " " y[1] (numeric) = 1.787407916291681 " " absolute error = 2.287059430727822500000000000000E-14 " " relative error = 1.2795397233513067000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.23599999999993 " " y[1] (analytic) = 1.786791090396294 " " y[1] (numeric) = 1.7867910903962712 " " absolute error = 2.287059430727822500000000000000E-14 " " relative error = 1.2799814388041153000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.23699999999993 " " y[1] (analytic) = 1.7861734777098595 " " y[1] (numeric) = 1.7861734777098366 " " absolute error = 2.287059430727822500000000000000E-14 " " relative error = 1.2804240233486017000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.23799999999993 " " y[1] (analytic) = 1.7855550788500127 " " y[1] (numeric) = 1.7855550788499899 " " absolute error = 2.287059430727822500000000000000E-14 " " relative error = 1.2808674780286272000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2389999999999297 " " y[1] (analytic) = 1.7849358944351528 " " y[1] (numeric) = 1.7849358944351297 " " absolute error = 2.309263891220325600000000000000E-14 " " relative error = 1.2937517243167423000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2399999999999296 " " y[1] (analytic) = 1.7843159250844636 " " y[1] (numeric) = 1.7843159250844405 " " absolute error = 2.309263891220325600000000000000E-14 " " relative error = 1.294201244721285800000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2409999999999295 " " y[1] (analytic) = 1.7836951714179148 " " y[1] (numeric) = 1.7836951714178917 " " absolute error = 2.309263891220325600000000000000E-14 " " relative error = 1.29465164688685000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2419999999999294 " " y[1] (analytic) = 1.7830736340562598 " " y[1] (numeric) = 1.7830736340562368 " " absolute error = 2.309263891220325600000000000000E-14 " " relative error = 1.2951029318778337000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2429999999999293 " " y[1] (analytic) = 1.7824513136210363 " " y[1] (numeric) = 1.782451313621013 " " absolute error = 2.331468351712828700000000000000E-14 " " relative error = 1.3080123613454936000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.243999999999929 " " y[1] (analytic) = 1.781828210734564 " " y[1] (numeric) = 1.7818282107345407 " " absolute error = 2.331468351712828700000000000000E-14 " " relative error = 1.3084697714779553000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.244999999999929 " " y[1] (analytic) = 1.7812043260199464 " " y[1] (numeric) = 1.7812043260199228 " " absolute error = 2.35367281220533200000000000000E-14 " " relative error = 1.321394057842062000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.245999999999929 " " y[1] (analytic) = 1.7805796601010677 " " y[1] (numeric) = 1.7805796601010442 " " absolute error = 2.35367281220533200000000000000E-14 " " relative error = 1.3218576315039646000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.246999999999929 " " y[1] (analytic) = 1.7799542136025939 " " y[1] (numeric) = 1.7799542136025703 " " absolute error = 2.35367281220533200000000000000E-14 " " relative error = 1.3223221104331342000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2479999999999287 " " y[1] (analytic) = 1.7793279871499716 " " y[1] (numeric) = 1.7793279871499479 " " absolute error = 2.37587727269783500000000000000E-14 " " relative error = 1.335266623048729200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2489999999999286 " " y[1] (analytic) = 1.7787009813694272 " " y[1] (numeric) = 1.7787009813694032 " " absolute error = 2.39808173319033800000000000000E-14 " " relative error = 1.3482208411129610000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2499999999999285 " " y[1] (analytic) = 1.7780731968879662 " " y[1] (numeric) = 1.7780731968879422 " " absolute error = 2.39808173319033800000000000000E-14 " " relative error = 1.3486968575801764000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2509999999999284 " " y[1] (analytic) = 1.777444634333373 " " y[1] (numeric) = 1.777444634333349 " " absolute error = 2.39808173319033800000000000000E-14 " " relative error = 1.349173800898577000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2519999999999283 " " y[1] (analytic) = 1.7768152943342104 " " y[1] (numeric) = 1.7768152943341864 " " absolute error = 2.39808173319033800000000000000E-14 " " relative error = 1.3496516722009208000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.252999999999928 " " y[1] (analytic) = 1.7761851775198183 " " y[1] (numeric) = 1.776185177519794 " " absolute error = 2.420286193682841300000000000000E-14 " " relative error = 1.3626316807025804000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.253999999999928 " " y[1] (analytic) = 1.7755542845203132 " " y[1] (numeric) = 1.775554284520289 " " absolute error = 2.420286193682841300000000000000E-14 " " relative error = 1.363115853332926800000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.254999999999928 " " y[1] (analytic) = 1.7749226159665885 " " y[1] (numeric) = 1.774922615966564 " " absolute error = 2.442490654175344400000000000000E-14 " " relative error = 1.3761110665916054000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.255999999999928 " " y[1] (analytic) = 1.774290172490312 " " y[1] (numeric) = 1.7742901724902878 " " absolute error = 2.420286193682841300000000000000E-14 " " relative error = 1.3640870198169666000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2569999999999277 " " y[1] (analytic) = 1.7736569547239278 " " y[1] (numeric) = 1.7736569547239034 " " absolute error = 2.442490654175344400000000000000E-14 " " relative error = 1.3770930436520185000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2579999999999276 " " y[1] (analytic) = 1.7730229633006533 " " y[1] (numeric) = 1.7730229633006287 " " absolute error = 2.464695114667847500000000000000E-14 " " relative error = 1.3901089640032520000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2589999999999275 " " y[1] (analytic) = 1.7723881988544798 " " y[1] (numeric) = 1.7723881988544552 " " absolute error = 2.464695114667847500000000000000E-14 " " relative error = 1.3906068186759626000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2599999999999274 " " y[1] (analytic) = 1.771752662020172 " " y[1] (numeric) = 1.7717526620201471 " " absolute error = 2.486899575160350700000000000000E-14 " " relative error = 1.4036381197388806000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2609999999999273 " " y[1] (analytic) = 1.7711163534332663 " " y[1] (numeric) = 1.7711163534332415 " " absolute error = 2.486899575160350700000000000000E-14 " " relative error = 1.4041424045007295000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.261999999999927 " " y[1] (analytic) = 1.7704792737300716 " " y[1] (numeric) = 1.7704792737300465 " " absolute error = 2.509104035652854000000000000000E-14 " " relative error = 1.4171891605184606000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.262999999999927 " " y[1] (analytic) = 1.7698414235476674 " " y[1] (numeric) = 1.769841423547642 " " absolute error = 2.53130849614535700000000000000E-14 " " relative error = 1.4302459319046337000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.263999999999927 " " y[1] (analytic) = 1.7692028035239038 " " y[1] (numeric) = 1.7692028035238783 " " absolute error = 2.5535129566378600000000000000E-14 " " relative error = 1.4433127460298870000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.264999999999927 " " y[1] (analytic) = 1.7685634142974005 " " y[1] (numeric) = 1.7685634142973752 " " absolute error = 2.53130849614535700000000000000E-14 " " relative error = 1.431279464271273000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2659999999999267 " " y[1] (analytic) = 1.7679232565075473 " " y[1] (numeric) = 1.7679232565075218 " " absolute error = 2.5535129566378600000000000000E-14 " " relative error = 1.4443573538832277000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2669999999999266 " " y[1] (analytic) = 1.7672823307945014 " " y[1] (numeric) = 1.7672823307944758 " " absolute error = 2.5535129566378600000000000000E-14 " " relative error = 1.4448811670571615000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2679999999999265 " " y[1] (analytic) = 1.7666406377991886 " " y[1] (numeric) = 1.766640637799163 " " absolute error = 2.5535129566378600000000000000E-14 " " relative error = 1.4454059880672313000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2689999999999264 " " y[1] (analytic) = 1.765998178163302 " " y[1] (numeric) = 1.7659981781632763 " " absolute error = 2.575717417130363000000000000000E-14 " " relative error = 1.4585051383287362000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2699999999999263 " " y[1] (analytic) = 1.765354952529301 " " y[1] (numeric) = 1.7653549525292753 " " absolute error = 2.575717417130363000000000000000E-14 " " relative error = 1.4590365600073915000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.270999999999926 " " y[1] (analytic) = 1.7647109615404113 " " y[1] (numeric) = 1.7647109615403855 " " absolute error = 2.575717417130363000000000000000E-14 " " relative error = 1.4595690020999397000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.271999999999926 " " y[1] (analytic) = 1.7640662058406238 " " y[1] (numeric) = 1.764066205840598 " " absolute error = 2.575717417130363000000000000000E-14 " " relative error = 1.4601024658839074000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.272999999999926 " " y[1] (analytic) = 1.763420686074694 " " y[1] (numeric) = 1.7634206860746682 " " absolute error = 2.575717417130363000000000000000E-14 " " relative error = 1.4606369526399343000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.273999999999926 " " y[1] (analytic) = 1.7627744028881418 " " y[1] (numeric) = 1.762774402888116 " " absolute error = 2.575717417130363000000000000000E-14 " " relative error = 1.4611724636517810000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2749999999999257 " " y[1] (analytic) = 1.7621273569272504 " " y[1] (numeric) = 1.7621273569272244 " " absolute error = 2.597921877622866300000000000000E-14 " " relative error = 1.4743099398632864000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2759999999999256 " " y[1] (analytic) = 1.7614795488390653 " " y[1] (numeric) = 1.7614795488390396 " " absolute error = 2.575717417130363000000000000000E-14 " " relative error = 1.4622465635936200000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2769999999999255 " " y[1] (analytic) = 1.7608309792713952 " " y[1] (numeric) = 1.7608309792713692 " " absolute error = 2.597921877622866300000000000000E-14 " " relative error = 1.4753953719611670000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2779999999999254 " " y[1] (analytic) = 1.760181648872809 " " y[1] (numeric) = 1.760181648872783 " " absolute error = 2.597921877622866300000000000000E-14 " " relative error = 1.475939644801167200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2789999999999253 " " y[1] (analytic) = 1.7595315582926374 " " y[1] (numeric) = 1.7595315582926112 " " absolute error = 2.620126338115369400000000000000E-14 " " relative error = 1.4891044867975034000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.279999999999925 " " y[1] (analytic) = 1.7588807081809708 " " y[1] (numeric) = 1.7588807081809446 " " absolute error = 2.620126338115369400000000000000E-14 " " relative error = 1.4896555098526815000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.280999999999925 " " y[1] (analytic) = 1.758229099188659 " " y[1] (numeric) = 1.758229099188633 " " absolute error = 2.620126338115369400000000000000E-14 " " relative error = 1.4902075840539983000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.281999999999925 " " y[1] (analytic) = 1.7575767319673115 " " y[1] (numeric) = 1.7575767319672853 " " absolute error = 2.620126338115369400000000000000E-14 " " relative error = 1.4907607107329982000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.282999999999925 " " y[1] (analytic) = 1.7569236071692949 " " y[1] (numeric) = 1.7569236071692687 " " absolute error = 2.620126338115369400000000000000E-14 " " relative error = 1.4913148912244636000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2839999999999248 " " y[1] (analytic) = 1.7562697254477344 " " y[1] (numeric) = 1.756269725447708 " " absolute error = 2.642330798607872600000000000000E-14 " " relative error = 1.5045130940432572000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2849999999999246 " " y[1] (analytic) = 1.7556150874565115 " " y[1] (numeric) = 1.7556150874564849 " " absolute error = 2.664535259100375700000000000000E-14 " " relative error = 1.5177217820340583000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2859999999999245 " " y[1] (analytic) = 1.7549596938502638 " " y[1] (numeric) = 1.7549596938502374 " " absolute error = 2.642330798607872600000000000000E-14 " " relative error = 1.5056361737919896000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2869999999999244 " " y[1] (analytic) = 1.7543035452843856 " " y[1] (numeric) = 1.754303545284359 " " absolute error = 2.664535259100375700000000000000E-14 " " relative error = 1.5188564523298817000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2879999999999243 " " y[1] (analytic) = 1.7536466424150248 " " y[1] (numeric) = 1.7536466424149981 " " absolute error = 2.664535259100375700000000000000E-14 " " relative error = 1.5194254045563738000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.288999999999924 " " y[1] (analytic) = 1.7529889858990844 " " y[1] (numeric) = 1.7529889858990577 " " absolute error = 2.664535259100375700000000000000E-14 " " relative error = 1.5199954366705684000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.289999999999924 " " y[1] (analytic) = 1.7523305763942207 " " y[1] (numeric) = 1.752330576394194 " " absolute error = 2.664535259100375700000000000000E-14 " " relative error = 1.5205665500531315000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.290999999999924 " " y[1] (analytic) = 1.7516714145588435 " " y[1] (numeric) = 1.7516714145588168 " " absolute error = 2.664535259100375700000000000000E-14 " " relative error = 1.5211387460880818000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.291999999999924 " " y[1] (analytic) = 1.7510115010521141 " " y[1] (numeric) = 1.7510115010520875 " " absolute error = 2.664535259100375700000000000000E-14 " " relative error = 1.5217120261627984000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2929999999999238 " " y[1] (analytic) = 1.7503508365339466 " " y[1] (numeric) = 1.7503508365339198 " " absolute error = 2.686739719592879000000000000000E-14 " " relative error = 1.5349721115985948000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2939999999999237 " " y[1] (analytic) = 1.749689421665005 " " y[1] (numeric) = 1.749689421664978 " " absolute error = 2.686739719592879000000000000000E-14 " " relative error = 1.5355523593645415000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2949999999999235 " " y[1] (analytic) = 1.749027257106704 " " y[1] (numeric) = 1.7490272571066772 " " absolute error = 2.686739719592879000000000000000E-14 " " relative error = 1.5361337044211468000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2959999999999234 " " y[1] (analytic) = 1.7483643435212084 " " y[1] (numeric) = 1.7483643435211815 " " absolute error = 2.686739719592879000000000000000E-14 " " relative error = 1.5367161481809800000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.2969999999999233 " " y[1] (analytic) = 1.7477006815714318 " " y[1] (numeric) = 1.7477006815714047 " " absolute error = 2.70894418008538200000000000000E-14 " " relative error = 1.5500046481927646000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.297999999999923 " " y[1] (analytic) = 1.747036271921036 " " y[1] (numeric) = 1.7470362719210086 " " absolute error = 2.73114864057788500000000000000E-14 " " relative error = 1.5633039133038273000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.298999999999923 " " y[1] (analytic) = 1.7463711152344301 " " y[1] (numeric) = 1.746371115234403 " " absolute error = 2.70894418008538200000000000000E-14 " " relative error = 1.5511847146657243000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.299999999999923 " " y[1] (analytic) = 1.7457052121767713 " " y[1] (numeric) = 1.7457052121767442 " " absolute error = 2.70894418008538200000000000000E-14 " " relative error = 1.5517764174556822000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.300999999999923 " " y[1] (analytic) = 1.7450385634139627 " " y[1] (numeric) = 1.7450385634139354 " " absolute error = 2.73114864057788500000000000000E-14 " " relative error = 1.5650935731957202000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3019999999999228 " " y[1] (analytic) = 1.7443711696126527 " " y[1] (numeric) = 1.7443711696126252 " " absolute error = 2.753353101070388000000000000000E-14 " " relative error = 1.578421581962849000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3029999999999227 " " y[1] (analytic) = 1.743703031440235 " " y[1] (numeric) = 1.7437030314402076 " " absolute error = 2.753353101070388000000000000000E-14 " " relative error = 1.579026388912233000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3039999999999226 " " y[1] (analytic) = 1.743034149564848 " " y[1] (numeric) = 1.7430341495648205 " " absolute error = 2.753353101070388000000000000000E-14 " " relative error = 1.5796323335132410000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3049999999999224 " " y[1] (analytic) = 1.7423645246553732 " " y[1] (numeric) = 1.7423645246553456 " " absolute error = 2.753353101070388000000000000000E-14 " " relative error = 1.5802394172453557000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3059999999999223 " " y[1] (analytic) = 1.7416941573814357 " " y[1] (numeric) = 1.741694157381408 " " absolute error = 2.775557561562891400000000000000E-14 " " relative error = 1.5935964128948024000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3069999999999222 " " y[1] (analytic) = 1.7410230484134028 " " y[1] (numeric) = 1.7410230484133749 " " absolute error = 2.797762022055394500000000000000E-14 " " relative error = 1.6069643791361635000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.307999999999922 " " y[1] (analytic) = 1.740351198422383 " " y[1] (numeric) = 1.740351198422355 " " absolute error = 2.797762022055394500000000000000E-14 " " relative error = 1.6075847361104745000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.308999999999922 " " y[1] (analytic) = 1.7396786080802265 " " y[1] (numeric) = 1.7396786080801985 " " absolute error = 2.797762022055394500000000000000E-14 " " relative error = 1.6082062566388547000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.309999999999922 " " y[1] (analytic) = 1.7390052780595235 " " y[1] (numeric) = 1.7390052780594956 " " absolute error = 2.797762022055394500000000000000E-14 " " relative error = 1.6088289422429408000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.310999999999922 " " y[1] (analytic) = 1.738331209033604 " " y[1] (numeric) = 1.738331209033576 " " absolute error = 2.797762022055394500000000000000E-14 " " relative error = 1.6094527944480516000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3119999999999217 " " y[1] (analytic) = 1.7376564016765372 " " y[1] (numeric) = 1.737656401676509 " " absolute error = 2.819966482547897600000000000000E-14 " " relative error = 1.6228562101386204000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3129999999999216 " " y[1] (analytic) = 1.7369808566631302 " " y[1] (numeric) = 1.7369808566631018 " " absolute error = 2.84217094304040100000000000000E-14 " " relative error = 1.6362707350157119000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3139999999999215 " " y[1] (analytic) = 1.7363045746689276 " " y[1] (numeric) = 1.7363045746688994 " " absolute error = 2.819966482547897600000000000000E-14 " " relative error = 1.6241197101525800000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3149999999999213 " " y[1] (analytic) = 1.7356275563702122 " " y[1] (numeric) = 1.7356275563701837 " " absolute error = 2.84217094304040100000000000000E-14 " " relative error = 1.6375465649925192000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3159999999999212 " " y[1] (analytic) = 1.7349498024440013 " " y[1] (numeric) = 1.734949802443973 " " absolute error = 2.84217094304040100000000000000E-14 " " relative error = 1.6381862685806076000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.316999999999921 " " y[1] (analytic) = 1.7342713135680494 " " y[1] (numeric) = 1.734271313568021 " " absolute error = 2.84217094304040100000000000000E-14 " " relative error = 1.6388271666634355000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.317999999999921 " " y[1] (analytic) = 1.733592090420845 " " y[1] (numeric) = 1.7335920904208166 " " absolute error = 2.84217094304040100000000000000E-14 " " relative error = 1.6394692608169653000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.318999999999921 " " y[1] (analytic) = 1.7329121336816113 " " y[1] (numeric) = 1.732912133681583 " " absolute error = 2.84217094304040100000000000000E-14 " " relative error = 1.6401125526209710000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.319999999999921 " " y[1] (analytic) = 1.7322314440303053 " " y[1] (numeric) = 1.7322314440302766 " " absolute error = 2.86437540353290400000000000000E-14 " " relative error = 1.6535754580626305000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3209999999999207 " " y[1] (analytic) = 1.731550022147616 " " y[1] (numeric) = 1.7315500221475872 " " absolute error = 2.88657986402540700000000000000E-14 " " relative error = 1.6670496532610846000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3219999999999206 " " y[1] (analytic) = 1.7308678687149657 " " y[1] (numeric) = 1.7308678687149368 " " absolute error = 2.88657986402540700000000000000E-14 " " relative error = 1.6677066552563988000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3229999999999205 " " y[1] (analytic) = 1.7301849844145074 " " y[1] (numeric) = 1.7301849844144785 " " absolute error = 2.88657986402540700000000000000E-14 " " relative error = 1.6683648800721862000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3239999999999204 " " y[1] (analytic) = 1.7295013699291255 " " y[1] (numeric) = 1.7295013699290966 " " absolute error = 2.88657986402540700000000000000E-14 " " relative error = 1.6690243293323892000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3249999999999202 " " y[1] (analytic) = 1.7288170259424347 " " y[1] (numeric) = 1.7288170259424056 " " absolute error = 2.9087843245179100000000000000E-14 " " relative error = 1.682528735469988000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.32599999999992 " " y[1] (analytic) = 1.7281319531387787 " " y[1] (numeric) = 1.7281319531387493 " " absolute error = 2.93098878501041300000000000000E-14 " " relative error = 1.6960445524353074000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.32699999999992 " " y[1] (analytic) = 1.72744615220323 " " y[1] (numeric) = 1.7274461522032007 " " absolute error = 2.93098878501041300000000000000E-14 " " relative error = 1.6967178868482550000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.32799999999992 " " y[1] (analytic) = 1.7267596238215899 " " y[1] (numeric) = 1.7267596238215606 " " absolute error = 2.93098878501041300000000000000E-14 " " relative error = 1.6973924711788635000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.32899999999992 " " y[1] (analytic) = 1.7260723686803865 " " y[1] (numeric) = 1.726072368680357 " " absolute error = 2.953193245502916400000000000000E-14 " " relative error = 1.7109324609377102000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3299999999999197 " " y[1] (analytic) = 1.7253843874668748 " " y[1] (numeric) = 1.7253843874668453 " " absolute error = 2.953193245502916400000000000000E-14 " " relative error = 1.7116146795779522000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3309999999999196 " " y[1] (analytic) = 1.7246956808690364 " " y[1] (numeric) = 1.7246956808690066 " " absolute error = 2.975397705995419500000000000000E-14 " " relative error = 1.7251725849375246000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3319999999999195 " " y[1] (analytic) = 1.7240062495755772 " " y[1] (numeric) = 1.7240062495755475 " " absolute error = 2.975397705995419500000000000000E-14 " " relative error = 1.725862482649303000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3329999999999194 " " y[1] (analytic) = 1.723316094275929 " " y[1] (numeric) = 1.7233160942758992 " " absolute error = 2.975397705995419500000000000000E-14 " " relative error = 1.726553657729035000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3339999999999193 " " y[1] (analytic) = 1.7226252156602464 " " y[1] (numeric) = 1.7226252156602166 " " absolute error = 2.975397705995419500000000000000E-14 " " relative error = 1.7272461118915014000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.334999999999919 " " y[1] (analytic) = 1.7219336144194086 " " y[1] (numeric) = 1.7219336144193789 " " absolute error = 2.975397705995419500000000000000E-14 " " relative error = 1.7279398468556215000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.335999999999919 " " y[1] (analytic) = 1.7212412912450166 " " y[1] (numeric) = 1.7212412912449868 " " absolute error = 2.975397705995419500000000000000E-14 " " relative error = 1.7286348643444640000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.336999999999919 " " y[1] (analytic) = 1.7205482468293933 " " y[1] (numeric) = 1.7205482468293636 " " absolute error = 2.975397705995419500000000000000E-14 " " relative error = 1.7293311660852573000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.337999999999919 " " y[1] (analytic) = 1.7198544818655837 " " y[1] (numeric) = 1.7198544818655535 " " absolute error = 3.01980662698042600000000000000E-14 " " relative error = 1.755850078493118000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3389999999999187 " " y[1] (analytic) = 1.7191599970473517 " " y[1] (numeric) = 1.7191599970473215 " " absolute error = 3.01980662698042600000000000000E-14 " " relative error = 1.756559384912938800000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3399999999999186 " " y[1] (analytic) = 1.7184647930691828 " " y[1] (numeric) = 1.7184647930691523 " " absolute error = 3.04201108747292900000000000000E-14 " " relative error = 1.7701911029785422000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3409999999999185 " " y[1] (analytic) = 1.7177688706262806 " " y[1] (numeric) = 1.7177688706262502 " " absolute error = 3.04201108747292900000000000000E-14 " " relative error = 1.7709082633240660000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3419999999999184 " " y[1] (analytic) = 1.7170722304145678 " " y[1] (numeric) = 1.7170722304145372 " " absolute error = 3.06421554796543200000000000000E-14 " " relative error = 1.7845583276514884000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3429999999999183 " " y[1] (analytic) = 1.716374873130684 " " y[1] (numeric) = 1.7163748731306534 " " absolute error = 3.06421554796543200000000000000E-14 " " relative error = 1.785283387641462000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.343999999999918 " " y[1] (analytic) = 1.715676799471987 " " y[1] (numeric) = 1.7156767994719562 " " absolute error = 3.08642000845793500000000000000E-14 " " relative error = 1.7989518826668316000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.344999999999918 " " y[1] (analytic) = 1.7149780101365502 " " y[1] (numeric) = 1.7149780101365193 " " absolute error = 3.08642000845793500000000000000E-14 " " relative error = 1.7996848882115918000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.345999999999918 " " y[1] (analytic) = 1.7142785058231627 " " y[1] (numeric) = 1.7142785058231318 " " absolute error = 3.08642000845793500000000000000E-14 " " relative error = 1.8004192422490284000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.346999999999918 " " y[1] (analytic) = 1.713578287231329 " " y[1] (numeric) = 1.713578287231298 " " absolute error = 3.10862446895043830000000000000E-14 " " relative error = 1.8141128958707340000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3479999999999177 " " y[1] (analytic) = 1.7128773550612673 " " y[1] (numeric) = 1.7128773550612364 " " absolute error = 3.08642000845793500000000000000E-14 " " relative error = 1.8018920031478483000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3489999999999176 " " y[1] (analytic) = 1.7121757100139101 " " y[1] (numeric) = 1.7121757100138792 " " absolute error = 3.08642000845793500000000000000E-14 " " relative error = 1.8026304136932653000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3499999999999175 " " y[1] (analytic) = 1.7114733527909025 " " y[1] (numeric) = 1.7114733527908714 " " absolute error = 3.10862446895043830000000000000E-14 " " relative error = 1.8163440662872132000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3509999999999174 " " y[1] (analytic) = 1.710770284094601 " " y[1] (numeric) = 1.71077028409457 " " absolute error = 3.10862446895043830000000000000E-14 " " relative error = 1.8170905222355027000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3519999999999173 " " y[1] (analytic) = 1.7100665046280747 " " y[1] (numeric) = 1.7100665046280437 " " absolute error = 3.10862446895043830000000000000E-14 " " relative error = 1.817838347536395000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.352999999999917 " " y[1] (analytic) = 1.7093620150951032 " " y[1] (numeric) = 1.709362015095072 " " absolute error = 3.130828929442941400000000000000E-14 " " relative error = 1.83157745509440970000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.353999999999917 " " y[1] (analytic) = 1.7086568162001756 " " y[1] (numeric) = 1.708656816200144 " " absolute error = 3.153033389935444600000000000000E-14 " " relative error = 1.8453286581838999000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.354999999999917 " " y[1] (analytic) = 1.707950908648491 " " y[1] (numeric) = 1.7079509086484592 " " absolute error = 3.17523785042794770000000000000E-14 " " relative error = 1.859091988153527800000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.355999999999917 " " y[1] (analytic) = 1.7072442931459564 " " y[1] (numeric) = 1.7072442931459246 " " absolute error = 3.17523785042794770000000000000E-14 " " relative error = 1.8598614522687343000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3569999999999167 " " y[1] (analytic) = 1.7065369703991877 " " y[1] (numeric) = 1.706536970399156 " " absolute error = 3.17523785042794770000000000000E-14 " " relative error = 1.8606323247044604000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3579999999999166 " " y[1] (analytic) = 1.7058289411155076 " " y[1] (numeric) = 1.7058289411154757 " " absolute error = 3.19744231092045100000000000000E-14 " " relative error = 1.8744214228359377000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3589999999999165 " " y[1] (analytic) = 1.7051202060029451 " " y[1] (numeric) = 1.7051202060029131 " " absolute error = 3.19744231092045100000000000000E-14 " " relative error = 1.8752005281878223000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3599999999999164 " " y[1] (analytic) = 1.7044107657702354 " " y[1] (numeric) = 1.7044107657702035 " " absolute error = 3.19744231092045100000000000000E-14 " " relative error = 1.8759810575800392000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3609999999999163 " " y[1] (analytic) = 1.7037006211268189 " " y[1] (numeric) = 1.7037006211267867 " " absolute error = 3.21964677141295400000000000000E-14 " " relative error = 1.8897960894581914000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.361999999999916 " " y[1] (analytic) = 1.7029897727828396 " " y[1] (numeric) = 1.7029897727828074 " " absolute error = 3.21964677141295400000000000000E-14 " " relative error = 1.8905849129978974000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.362999999999916 " " y[1] (analytic) = 1.7022782214491459 " " y[1] (numeric) = 1.702278221449114 " " absolute error = 3.19744231092045100000000000000E-14 " " relative error = 1.8783312096881993000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.363999999999916 " " y[1] (analytic) = 1.7015659678372896 " " y[1] (numeric) = 1.7015659678372574 " " absolute error = 3.21964677141295400000000000000E-14 " " relative error = 1.892166881725522000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.364999999999916 " " y[1] (analytic) = 1.700853012659524 " " y[1] (numeric) = 1.7008530126594916 " " absolute error = 3.24185123190545700000000000000E-14 " " relative error = 1.9060149276723007000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3659999999999157 " " y[1] (analytic) = 1.7001393566288039 " " y[1] (numeric) = 1.7001393566287715 " " absolute error = 3.24185123190545700000000000000E-14 " " relative error = 1.9068150027028988000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3669999999999156 " " y[1] (analytic) = 1.6994250004587856 " " y[1] (numeric) = 1.699425000458753 " " absolute error = 3.2640556923979600000000000000E-14 " " relative error = 1.9206824022929983000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3679999999999155 " " y[1] (analytic) = 1.698709944863825 " " y[1] (numeric) = 1.6987099448637926 " " absolute error = 3.24185123190545700000000000000E-14 " " relative error = 1.9084195284235744000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3689999999999154 " " y[1] (analytic) = 1.697994190558978 " " y[1] (numeric) = 1.6979941905589453 " " absolute error = 3.2640556923979600000000000000E-14 " " relative error = 1.922300859771161000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3699999999999153 " " y[1] (analytic) = 1.6972777382599986 " " y[1] (numeric) = 1.6972777382599658 " " absolute error = 3.286260152890463400000000000000E-14 " " relative error = 1.9361946950765083000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.370999999999915 " " y[1] (analytic) = 1.6965605886833388 " " y[1] (numeric) = 1.696560588683306 " " absolute error = 3.286260152890463400000000000000E-14 " " relative error = 1.937013139884885300000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.371999999999915 " " y[1] (analytic) = 1.6958427425461486 " " y[1] (numeric) = 1.6958427425461156 " " absolute error = 3.308464613382966500000000000000E-14 " " relative error = 1.950926539577377000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.372999999999915 " " y[1] (analytic) = 1.6951242005662737 " " y[1] (numeric) = 1.6951242005662406 " " absolute error = 3.308464613382966500000000000000E-14 " " relative error = 1.951753512974294000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.373999999999915 " " y[1] (analytic) = 1.6944049634622562 " " y[1] (numeric) = 1.694404963462223 " " absolute error = 3.330669073875469600000000000000E-14 " " relative error = 1.9656865659020256000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3749999999999147 " " y[1] (analytic) = 1.6936850319533332 " " y[1] (numeric) = 1.6936850319532997 " " absolute error = 3.35287353436797300000000000000E-14 " " relative error = 1.9796322640350025000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3759999999999146 " " y[1] (analytic) = 1.692964406759436 " " y[1] (numeric) = 1.6929644067594023 " " absolute error = 3.37507799486047600000000000000E-14 " " relative error = 1.9935906398178999000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3769999999999145 " " y[1] (analytic) = 1.6922430886011899 " " y[1] (numeric) = 1.692243088601156 " " absolute error = 3.39728245535297900000000000000E-14 " " relative error = 2.0075617257572473000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3779999999999144 " " y[1] (analytic) = 1.6915210781999126 " " y[1] (numeric) = 1.6915210781998786 " " absolute error = 3.39728245535297900000000000000E-14 " " relative error = 2.0084186352370545000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3789999999999143 " " y[1] (analytic) = 1.6907983762776149 " " y[1] (numeric) = 1.690798376277581 " " absolute error = 3.39728245535297900000000000000E-14 " " relative error = 2.0092770983328495000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.379999999999914 " " y[1] (analytic) = 1.6900749835569986 " " y[1] (numeric) = 1.6900749835569644 " " absolute error = 3.41948691584548200000000000000E-14 " " relative error = 2.023275268324897200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.380999999999914 " " y[1] (analytic) = 1.689350900761456 " " y[1] (numeric) = 1.6893509007614218 " " absolute error = 3.41948691584548200000000000000E-14 " " relative error = 2.02414247644121000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.381999999999914 " " y[1] (analytic) = 1.6886261286150703 " " y[1] (numeric) = 1.688626128615036 " " absolute error = 3.44169137633798500000000000000E-14 " " relative error = 2.0381606786818435000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.382999999999914 " " y[1] (analytic) = 1.6879006678426132 " " y[1] (numeric) = 1.6879006678425788 " " absolute error = 3.44169137633798500000000000000E-14 " " relative error = 2.0390366814280460000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3839999999999137 " " y[1] (analytic) = 1.6871745191695457 " " y[1] (numeric) = 1.687174519169511 " " absolute error = 3.463895836830488400000000000000E-14 " " relative error = 2.053075006452488000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3849999999999136 " " y[1] (analytic) = 1.6864476833220161 " " y[1] (numeric) = 1.6864476833219815 " " absolute error = 3.463895836830488400000000000000E-14 " " relative error = 2.053959853653569000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3859999999999135 " " y[1] (analytic) = 1.6857201610268606 " " y[1] (numeric) = 1.6857201610268258 " " absolute error = 3.486100297322991500000000000000E-14 " " relative error = 2.0680183923287865000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3869999999999134 " " y[1] (analytic) = 1.6849919530116013 " " y[1] (numeric) = 1.6849919530115662 " " absolute error = 3.508304757815494700000000000000E-14 " " relative error = 2.082089918319829000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3879999999999133 " " y[1] (analytic) = 1.684263060004446 " " y[1] (numeric) = 1.6842630600044108 " " absolute error = 3.508304757815494700000000000000E-14 " " relative error = 2.0829909775532532000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.388999999999913 " " y[1] (analytic) = 1.6835334827342874 " " y[1] (numeric) = 1.6835334827342523 " " absolute error = 3.508304757815494700000000000000E-14 " " relative error = 2.083893664008113800000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.389999999999913 " " y[1] (analytic) = 1.6828032219307034 " " y[1] (numeric) = 1.6828032219306681 " " absolute error = 3.53050921830799800000000000000E-14 " " relative error = 2.0979929039221804000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.390999999999913 " " y[1] (analytic) = 1.6820722783239541 " " y[1] (numeric) = 1.6820722783239188 " " absolute error = 3.53050921830799800000000000000E-14 " " relative error = 2.098904585613799000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.391999999999913 " " y[1] (analytic) = 1.6813406526449834 " " y[1] (numeric) = 1.6813406526449481 " " absolute error = 3.53050921830799800000000000000E-14 " " relative error = 2.099817911827692000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3929999999999128 " " y[1] (analytic) = 1.680608345625417 " " y[1] (numeric) = 1.6806083456253815 " " absolute error = 3.55271367880050100000000000000E-14 " " relative error = 2.1139450414179656000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3939999999999126 " " y[1] (analytic) = 1.6798753579975614 " " y[1] (numeric) = 1.679875357997526 " " absolute error = 3.53050921830799800000000000000E-14 " " relative error = 2.101649507208929000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3949999999999125 " " y[1] (analytic) = 1.6791416904944048 " " y[1] (numeric) = 1.6791416904943692 " " absolute error = 3.55271367880050100000000000000E-14 " " relative error = 2.115791477820102000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3959999999999124 " " y[1] (analytic) = 1.678407343849614 " " y[1] (numeric) = 1.6784073438495786 " " absolute error = 3.55271367880050100000000000000E-14 " " relative error = 2.116717191341618000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.3969999999999123 " " y[1] (analytic) = 1.6776723187975362 " " y[1] (numeric) = 1.6776723187975005 " " absolute error = 3.57491813929300400000000000000E-14 " " relative error = 2.1308798501576937000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.397999999999912 " " y[1] (analytic) = 1.6769366160731958 " " y[1] (numeric) = 1.67693661607316 " " absolute error = 3.57491813929300400000000000000E-14 " " relative error = 2.131814706070539000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.398999999999912 " " y[1] (analytic) = 1.6762002364122959 " " y[1] (numeric) = 1.67620023641226 " " absolute error = 3.59712259978550700000000000000E-14 " " relative error = 2.145998146071565700000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.399999999999912 " " y[1] (analytic) = 1.675463180551216 " " y[1] (numeric) = 1.6754631805511797 " " absolute error = 3.619327060278010300000000000000E-14 " " relative error = 2.1601949253741742000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.400999999999912 " " y[1] (analytic) = 1.6747254492270116 " " y[1] (numeric) = 1.6747254492269754 " " absolute error = 3.619327060278010300000000000000E-14 " " relative error = 2.161146510282358000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4019999999999118 " " y[1] (analytic) = 1.6739870431774142 " " y[1] (numeric) = 1.673987043177378 " " absolute error = 3.619327060278010300000000000000E-14 " " relative error = 2.1620998053892482000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4029999999999117 " " y[1] (analytic) = 1.67324796314083 " " y[1] (numeric) = 1.6732479631407937 " " absolute error = 3.619327060278010300000000000000E-14 " " relative error = 2.1630548131576524000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4039999999999115 " " y[1] (analytic) = 1.6725082098563386 " " y[1] (numeric) = 1.6725082098563022 " " absolute error = 3.641531520770513500000000000000E-14 " " relative error = 2.177287680449297000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4049999999999114 " " y[1] (analytic) = 1.6717677840636935 " " y[1] (numeric) = 1.671767784063657 " " absolute error = 3.663735981263016600000000000000E-14 " " relative error = 2.19153402535207000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4059999999999113 " " y[1] (analytic) = 1.6710266865033203 " " y[1] (numeric) = 1.6710266865032837 " " absolute error = 3.663735981263016600000000000000E-14 " " relative error = 2.192505967052811000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.406999999999911 " " y[1] (analytic) = 1.6702849179163164 " " y[1] (numeric) = 1.6702849179162798 " " absolute error = 3.663735981263016600000000000000E-14 " " relative error = 2.1934796524616498000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.407999999999911 " " y[1] (analytic) = 1.6695424790444506 " " y[1] (numeric) = 1.6695424790444138 " " absolute error = 3.6859404417555197000000000000E-14 " " relative error = 2.2077548118842344000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.408999999999911 " " y[1] (analytic) = 1.6687993706301614 " " y[1] (numeric) = 1.6687993706301245 " " absolute error = 3.6859404417555197000000000000E-14 " " relative error = 2.208737914590451200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.409999999999911 " " y[1] (analytic) = 1.6680555934165575 " " y[1] (numeric) = 1.6680555934165204 " " absolute error = 3.70814490224802300000000000000E-14 " " relative error = 2.2230343622138507000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4109999999999108 " " y[1] (analytic) = 1.6673111481474157 " " y[1] (numeric) = 1.6673111481473786 " " absolute error = 3.70814490224802300000000000000E-14 " " relative error = 2.2240269348454966000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4119999999999107 " " y[1] (analytic) = 1.6665660355671812 " " y[1] (numeric) = 1.666566035567144 " " absolute error = 3.70814490224802300000000000000E-14 " " relative error = 2.225021285151796000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4129999999999105 " " y[1] (analytic) = 1.665820256420967 " " y[1] (numeric) = 1.6658202564209297 " " absolute error = 3.73034936274052600000000000000E-14 " " relative error = 2.2393468613205736000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4139999999999104 " " y[1] (analytic) = 1.6650738114545516 " " y[1] (numeric) = 1.6650738114545143 " " absolute error = 3.73034936274052600000000000000E-14 " " relative error = 2.2403507502660316000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4149999999999103 " " y[1] (analytic) = 1.6643267014143803 " " y[1] (numeric) = 1.6643267014143428 " " absolute error = 3.75255382323302900000000000000E-14 " " relative error = 2.2546978427036163000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.41599999999991 " " y[1] (analytic) = 1.663578927047563 " " y[1] (numeric) = 1.6635789270475254 " " absolute error = 3.75255382323302900000000000000E-14 " " relative error = 2.2557113234734674000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.41699999999991 " " y[1] (analytic) = 1.662830489101874 " " y[1] (numeric) = 1.6628304891018362 " " absolute error = 3.77475828372553200000000000000E-14 " " relative error = 2.2700800282801828000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.41799999999991 " " y[1] (analytic) = 1.662081388325751 " " y[1] (numeric) = 1.662081388325713 " " absolute error = 3.796962744218035400000000000000E-14 " " relative error = 2.2844625846167466000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.41899999999991 " " y[1] (analytic) = 1.661331625468295 " " y[1] (numeric) = 1.6613316254682569 " " absolute error = 3.819167204710538500000000000000E-14 " " relative error = 2.298859027398575000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.41999999999991 " " y[1] (analytic) = 1.6605812012792684 " " y[1] (numeric) = 1.6605812012792303 " " absolute error = 3.819167204710538500000000000000E-14 " " relative error = 2.299897892236978000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4209999999999097 " " y[1] (analytic) = 1.6598301165090956 " " y[1] (numeric) = 1.6598301165090574 " " absolute error = 3.819167204710538500000000000000E-14 " " relative error = 2.300938612165259000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4219999999999096 " " y[1] (analytic) = 1.6590783719088615 " " y[1] (numeric) = 1.6590783719088231 " " absolute error = 3.841371665203041600000000000000E-14 " " relative error = 2.3153648014730796000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4229999999999094 " " y[1] (analytic) = 1.6583259682303102 " " y[1] (numeric) = 1.6583259682302718 " " absolute error = 3.841371665203041600000000000000E-14 " " relative error = 2.3164153120645986000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4239999999999093 " " y[1] (analytic) = 1.6575729062258457 " " y[1] (numeric) = 1.657572906225807 " " absolute error = 3.86357612569554500000000000000E-14 " " relative error = 2.330863463793326000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4249999999999092 " " y[1] (analytic) = 1.6568191866485296 " " y[1] (numeric) = 1.656819186648491 " " absolute error = 3.86357612569554500000000000000E-14 " " relative error = 2.3319238193462247000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.425999999999909 " " y[1] (analytic) = 1.6560648102520816 " " y[1] (numeric) = 1.656064810252043 " " absolute error = 3.86357612569554500000000000000E-14 " " relative error = 2.332986065386802000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.426999999999909 " " y[1] (analytic) = 1.6553097777908783 " " y[1] (numeric) = 1.6553097777908394 " " absolute error = 3.88578058618804800000000000000E-14 " " relative error = 2.3474642863367137000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.427999999999909 " " y[1] (analytic) = 1.6545540900199516 " " y[1] (numeric) = 1.6545540900199127 " " absolute error = 3.88578058618804800000000000000E-14 " " relative error = 2.348536448355817000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.428999999999909 " " y[1] (analytic) = 1.6537977476949894 " " y[1] (numeric) = 1.6537977476949506 " " absolute error = 3.88578058618804800000000000000E-14 " " relative error = 2.3496105201521317000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4299999999999087 " " y[1] (analytic) = 1.653040751572334 " " y[1] (numeric) = 1.6530407515722951 " " absolute error = 3.88578058618804800000000000000E-14 " " relative error = 2.350686504547443200000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4309999999999086 " " y[1] (analytic) = 1.6522831024089815 " " y[1] (numeric) = 1.6522831024089426 " " absolute error = 3.88578058618804800000000000000E-14 " " relative error = 2.351764404370347300000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4319999999999085 " " y[1] (analytic) = 1.651524800962581 " " y[1] (numeric) = 1.6515248009625418 " " absolute error = 3.90798504668055100000000000000E-14 " " relative error = 2.3662890465845904000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4329999999999083 " " y[1] (analytic) = 1.6507658479914338 " " y[1] (numeric) = 1.6507658479913945 " " absolute error = 3.93018950717305400000000000000E-14 " " relative error = 2.3808279726377335000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4339999999999082 " " y[1] (analytic) = 1.6500062442544927 " " y[1] (numeric) = 1.6500062442544534 " " absolute error = 3.93018950717305400000000000000E-14 " " relative error = 2.381924020505023000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.434999999999908 " " y[1] (analytic) = 1.6492459905113617 " " y[1] (numeric) = 1.6492459905113221 " " absolute error = 3.95239396766555730000000000000E-14 " " relative error = 2.396485418430568000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.435999999999908 " " y[1] (analytic) = 1.6484850875222943 " " y[1] (numeric) = 1.6484850875222545 " " absolute error = 3.974598428158060400000000000000E-14 " " relative error = 2.4110611968786205000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.436999999999908 " " y[1] (analytic) = 1.647723536048193 " " y[1] (numeric) = 1.6477235360481535 " " absolute error = 3.95239396766555730000000000000E-14 " " relative error = 2.3986997097490975000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.437999999999908 " " y[1] (analytic) = 1.6469613368506102 " " y[1] (numeric) = 1.6469613368505704 " " absolute error = 3.974598428158060400000000000000E-14 " " relative error = 2.4132918844096593000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4389999999999077 " " y[1] (analytic) = 1.6461984906917442 " " y[1] (numeric) = 1.6461984906917044 " " absolute error = 3.974598428158060400000000000000E-14 " " relative error = 2.4144102006118998000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4399999999999076 " " y[1] (analytic) = 1.6454349983344412 " " y[1] (numeric) = 1.6454349983344014 " " absolute error = 3.974598428158060400000000000000E-14 " " relative error = 2.4155305023785617000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4409999999999075 " " y[1] (analytic) = 1.644670860542194 " " y[1] (numeric) = 1.644670860542154 " " absolute error = 3.996802888650563500000000000000E-14 " " relative error = 2.4301536462638787000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4419999999999074 " " y[1] (analytic) = 1.6439060780791397 " " y[1] (numeric) = 1.6439060780790997 " " absolute error = 3.996802888650563500000000000000E-14 " " relative error = 2.4312842089620598000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4429999999999072 " " y[1] (analytic) = 1.643140651710061 " " y[1] (numeric) = 1.643140651710021 " " absolute error = 3.996802888650563500000000000000E-14 " " relative error = 2.4324167772801328000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.443999999999907 " " y[1] (analytic) = 1.6423745822003843 " " y[1] (numeric) = 1.6423745822003444 " " absolute error = 3.996802888650563500000000000000E-14 " " relative error = 2.4335513542201898000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.444999999999907 " " y[1] (analytic) = 1.641607870316179 " " y[1] (numeric) = 1.641607870316139 " " absolute error = 3.996802888650563500000000000000E-14 " " relative error = 2.4346879427915794000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.445999999999907 " " y[1] (analytic) = 1.6408405168241567 " " y[1] (numeric) = 1.6408405168241167 " " absolute error = 3.996802888650563500000000000000E-14 " " relative error = 2.4358265460109232000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.446999999999907 " " y[1] (analytic) = 1.640072522491671 " " y[1] (numeric) = 1.640072522491631 " " absolute error = 3.996802888650563500000000000000E-14 " " relative error = 2.436967166902134000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4479999999999067 " " y[1] (analytic) = 1.6393038880867161 " " y[1] (numeric) = 1.6393038880866762 " " absolute error = 3.996802888650563500000000000000E-14 " " relative error = 2.4381098084964345000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4489999999999066 " " y[1] (analytic) = 1.6385346143779267 " " y[1] (numeric) = 1.6385346143778865 " " absolute error = 4.019007349143066700000000000000E-14 " " relative error = 2.4528058875758885000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4499999999999065 " " y[1] (analytic) = 1.6377647021345758 " " y[1] (numeric) = 1.6377647021345356 " " absolute error = 4.019007349143066700000000000000E-14 " " relative error = 2.453958950211166000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4509999999999064 " " y[1] (analytic) = 1.6369941521265758 " " y[1] (numeric) = 1.6369941521265357 " " absolute error = 4.019007349143066700000000000000E-14 " " relative error = 2.4551140539641395000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4519999999999063 " " y[1] (analytic) = 1.6362229651244773 " " y[1] (numeric) = 1.6362229651244367 " " absolute error = 4.06341627012807300000000000000E-14 " " relative error = 2.483412320165635000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.452999999999906 " " y[1] (analytic) = 1.6354511418994662 " " y[1] (numeric) = 1.6354511418994255 " " absolute error = 4.06341627012807300000000000000E-14 " " relative error = 2.4845843241814541000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.453999999999906 " " y[1] (analytic) = 1.6346786832233664 " " y[1] (numeric) = 1.6346786832233255 " " absolute error = 4.08562073062057600000000000000E-14 " " relative error = 2.499341780468001000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.454999999999906 " " y[1] (analytic) = 1.633905589868636 " " y[1] (numeric) = 1.6339055898685952 " " absolute error = 4.08562073062057600000000000000E-14 " " relative error = 2.500524360742933000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.455999999999906 " " y[1] (analytic) = 1.6331318626083688 " " y[1] (numeric) = 1.633131862608328 " " absolute error = 4.08562073062057600000000000000E-14 " " relative error = 2.5017090316854124000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4569999999999057 " " y[1] (analytic) = 1.6323575022162917 " " y[1] (numeric) = 1.6323575022162509 " " absolute error = 4.08562073062057600000000000000E-14 " " relative error = 2.5028957964621285000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4579999999999056 " " y[1] (analytic) = 1.631582509466765 " " y[1] (numeric) = 1.6315825094667242 " " absolute error = 4.08562073062057600000000000000E-14 " " relative error = 2.5040846582474346000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4589999999999055 " " y[1] (analytic) = 1.6308068851347817 " " y[1] (numeric) = 1.6308068851347406 " " absolute error = 4.10782519111307900000000000000E-14 " " relative error = 2.5188912485941456000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4599999999999054 " " y[1] (analytic) = 1.6300306299959657 " " y[1] (numeric) = 1.6300306299959244 " " absolute error = 4.130029651605582300000000000000E-14 " " relative error = 2.533712910422919000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4609999999999053 " " y[1] (analytic) = 1.6292537448265723 " " y[1] (numeric) = 1.6292537448265307 " " absolute error = 4.152234112098085500000000000000E-14 " " relative error = 2.548549681277593000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.461999999999905 " " y[1] (analytic) = 1.628476230403486 " " y[1] (numeric) = 1.6284762304034448 " " absolute error = 4.130029651605582300000000000000E-14 " " relative error = 2.5361313690051770000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.462999999999905 " " y[1] (analytic) = 1.6276980875042222 " " y[1] (numeric) = 1.6276980875041809 " " absolute error = 4.130029651605582300000000000000E-14 " " relative error = 2.5373438006173665000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.463999999999905 " " y[1] (analytic) = 1.6269193169069232 " " y[1] (numeric) = 1.6269193169068816 " " absolute error = 4.152234112098085500000000000000E-14 " " relative error = 2.5522065347360046000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.464999999999905 " " y[1] (analytic) = 1.6261399193903594 " " y[1] (numeric) = 1.6261399193903177 " " absolute error = 4.174438572590588600000000000000E-14 " " relative error = 2.567084494276229000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4659999999999047 " " y[1] (analytic) = 1.6253598957339284 " " y[1] (numeric) = 1.6253598957338866 " " absolute error = 4.174438572590588600000000000000E-14 " " relative error = 2.568316459355992600000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4669999999999046 " " y[1] (analytic) = 1.6245792467176536 " " y[1] (numeric) = 1.624579246717612 " " absolute error = 4.174438572590588600000000000000E-14 " " relative error = 2.5695505965773870000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4679999999999045 " " y[1] (analytic) = 1.6237979731221843 " " y[1] (numeric) = 1.6237979731221426 " " absolute error = 4.174438572590588600000000000000E-14 " " relative error = 2.5707869092631750000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4689999999999044 " " y[1] (analytic) = 1.6230160757287941 " " y[1] (numeric) = 1.623016075728752 " " absolute error = 4.21884749357559500000000000000E-14 " " relative error = 2.5993873730925160000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4699999999999043 " " y[1] (analytic) = 1.6222335553193798 " " y[1] (numeric) = 1.6222335553193377 " " absolute error = 4.21884749357559500000000000000E-14 " " relative error = 2.600641245363096000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.470999999999904 " " y[1] (analytic) = 1.6214504126764622 " " y[1] (numeric) = 1.6214504126764198 " " absolute error = 4.24105195406809800000000000000E-14 " " relative error = 2.6155915228191073000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.471999999999904 " " y[1] (analytic) = 1.6206666485831835 " " y[1] (numeric) = 1.6206666485831411 " " absolute error = 4.24105195406809800000000000000E-14 " " relative error = 2.6168564385376250000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.472999999999904 " " y[1] (analytic) = 1.619882263823308 " " y[1] (numeric) = 1.6198822638232655 " " absolute error = 4.24105195406809800000000000000E-14 " " relative error = 2.618123581437459000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.473999999999904 " " y[1] (analytic) = 1.6190972591812203 " " y[1] (numeric) = 1.6190972591811779 " " absolute error = 4.24105195406809800000000000000E-14 " " relative error = 2.6193929549437960000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4749999999999037 " " y[1] (analytic) = 1.6183116354419251 " " y[1] (numeric) = 1.6183116354418825 " " absolute error = 4.26325641456060100000000000000E-14 " " relative error = 2.634385319361805000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4759999999999036 " " y[1] (analytic) = 1.617525393391046 " " y[1] (numeric) = 1.6175253933910032 " " absolute error = 4.28546087505310400000000000000E-14 " " relative error = 2.649393259953025700000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4769999999999035 " " y[1] (analytic) = 1.616738533814825 " " y[1] (numeric) = 1.616738533814782 " " absolute error = 4.307665335545607400000000000000E-14 " " relative error = 2.6644168153655146000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4779999999999034 " " y[1] (analytic) = 1.6159510575001215 " " y[1] (numeric) = 1.6159510575000784 " " absolute error = 4.307665335545607400000000000000E-14 " " relative error = 2.665715224203369000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4789999999999033 " " y[1] (analytic) = 1.6151629652344117 " " y[1] (numeric) = 1.6151629652343686 " " absolute error = 4.307665335545607400000000000000E-14 " " relative error = 2.6670159162053514000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.479999999999903 " " y[1] (analytic) = 1.614374257805788 " " y[1] (numeric) = 1.614374257805745 " " absolute error = 4.307665335545607400000000000000E-14 " " relative error = 2.6683188949014000000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.480999999999903 " " y[1] (analytic) = 1.6135849360029577 " " y[1] (numeric) = 1.6135849360029146 " " absolute error = 4.307665335545607400000000000000E-14 " " relative error = 2.669624163830016700000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.481999999999903 " " y[1] (analytic) = 1.6127950006152427 " " y[1] (numeric) = 1.6127950006151994 " " absolute error = 4.329869796038110500000000000000E-14 " " relative error = 2.6846994158503523000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.482999999999903 " " y[1] (analytic) = 1.612004452432578 " " y[1] (numeric) = 1.6120044524325348 " " absolute error = 4.329869796038110500000000000000E-14 " " relative error = 2.686016027749903000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4839999999999027 " " y[1] (analytic) = 1.611213292245512 " " y[1] (numeric) = 1.6112132922454685 " " absolute error = 4.352074256530613600000000000000E-14 " " relative error = 2.7011161572936290000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4849999999999026 " " y[1] (analytic) = 1.6104215208452046 " " y[1] (numeric) = 1.610421520845161 " " absolute error = 4.352074256530613600000000000000E-14 " " relative error = 2.7024441738995736000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4859999999999025 " " y[1] (analytic) = 1.6096291390234272 " " y[1] (numeric) = 1.6096291390233837 " " absolute error = 4.352074256530613600000000000000E-14 " " relative error = 2.70377452235428970000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4869999999999024 " " y[1] (analytic) = 1.6088361475725617 " " y[1] (numeric) = 1.608836147572518 " " absolute error = 4.37427871702311700000000000000E-14 " " relative error = 2.7189087736641790000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4879999999999023 " " y[1] (analytic) = 1.6080425472855993 " " y[1] (numeric) = 1.6080425472855553 " " absolute error = 4.3964831775156200000000000000E-14 " " relative error = 2.7340589867705620000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.488999999999902 " " y[1] (analytic) = 1.6072483389561403 " " y[1] (numeric) = 1.607248338956096 " " absolute error = 4.41868763800812300000000000000E-14 " " relative error = 2.7492252011770185000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.489999999999902 " " y[1] (analytic) = 1.6064535233783928 " " y[1] (numeric) = 1.6064535233783486 " " absolute error = 4.41868763800812300000000000000E-14 " " relative error = 2.7505854191882034000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.490999999999902 " " y[1] (analytic) = 1.6056581013471725 " " y[1] (numeric) = 1.6056581013471283 " " absolute error = 4.41868763800812300000000000000E-14 " " relative error = 2.751948023244036000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.491999999999902 " " y[1] (analytic) = 1.6048620736579013 " " y[1] (numeric) = 1.6048620736578572 " " absolute error = 4.41868763800812300000000000000E-14 " " relative error = 2.7533130170724110000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4929999999999017 " " y[1] (analytic) = 1.604065441106607 " " y[1] (numeric) = 1.6040654411065627 " " absolute error = 4.44089209850062600000000000000E-14 " " relative error = 2.768523019507832000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4939999999999016 " " y[1] (analytic) = 1.6032682044899218 " " y[1] (numeric) = 1.6032682044898774 " " absolute error = 4.44089209850062600000000000000E-14 " " relative error = 2.7698996874409365000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4949999999999015 " " y[1] (analytic) = 1.6024703646050824 " " y[1] (numeric) = 1.602470364605038 " " absolute error = 4.44089209850062600000000000000E-14 " " relative error = 2.771278768450144000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4959999999999014 " " y[1] (analytic) = 1.601671922249929 " " y[1] (numeric) = 1.601671922249884 " " absolute error = 4.485301019485632400000000000000E-14 " " relative error = 2.800386868981858000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.4969999999999013 " " y[1] (analytic) = 1.600872878222903 " " y[1] (numeric) = 1.600872878222858 " " absolute error = 4.485301019485632400000000000000E-14 " " relative error = 2.801784626687333000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.497999999999901 " " y[1] (analytic) = 1.600073233323049 " " y[1] (numeric) = 1.6000732333230039 " " absolute error = 4.507505479978135600000000000000E-14 " " relative error = 2.8170619857298035000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.498999999999901 " " y[1] (analytic) = 1.5992729883500116 " " y[1] (numeric) = 1.5992729883499666 " " absolute error = 4.507505479978135600000000000000E-14 " " relative error = 2.818471588536352000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.499999999999901 " " y[1] (analytic) = 1.598472144104036 " " y[1] (numeric) = 1.5984721441039906 " " absolute error = 4.52970994047063870000000000000E-14 " " relative error = 2.8337747124205276000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.500999999999901 " " y[1] (analytic) = 1.597670701385966 " " y[1] (numeric) = 1.5976707013859206 " " absolute error = 4.52970994047063870000000000000E-14 " " relative error = 2.835196224441715600000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5019999999999007 " " y[1] (analytic) = 1.5968686609972442 " " y[1] (numeric) = 1.596868660997199 " " absolute error = 4.52970994047063870000000000000E-14 " " relative error = 2.836620225010763000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5029999999999006 " " y[1] (analytic) = 1.5960660237399114 " " y[1] (numeric) = 1.596066023739866 " " absolute error = 4.52970994047063870000000000000E-14 " " relative error = 2.8380467180528010000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5039999999999005 " " y[1] (analytic) = 1.5952627904166046 " " y[1] (numeric) = 1.595262790416559 " " absolute error = 4.55191440096314200000000000000E-14 " " relative error = 2.853394706068712600000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5049999999999004 " " y[1] (analytic) = 1.594458961830557 " " y[1] (numeric) = 1.5944589618305112 " " absolute error = 4.57411886145564500000000000000E-14 " " relative error = 2.8687592286503366000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5059999999999003 " " y[1] (analytic) = 1.593654538785597 " " y[1] (numeric) = 1.5936545387855512 " " absolute error = 4.57411886145564500000000000000E-14 " " relative error = 2.8702072815236570000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5069999999999 " " y[1] (analytic) = 1.5928495220861476 " " y[1] (numeric) = 1.5928495220861019 " " absolute error = 4.57411886145564500000000000000E-14 " " relative error = 2.8716578672572550000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5079999999999 " " y[1] (analytic) = 1.5920439125372257 " " y[1] (numeric) = 1.5920439125371797 " " absolute error = 4.59632332194814800000000000000E-14 " " relative error = 2.887058130590776000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5089999999999 " " y[1] (analytic) = 1.5912377109444404 " " y[1] (numeric) = 1.5912377109443945 " " absolute error = 4.59632332194814800000000000000E-14 " " relative error = 2.8885208604188445000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5099999999999 " " y[1] (analytic) = 1.5904309181139937 " " y[1] (numeric) = 1.5904309181139475 " " absolute error = 4.61852778244065100000000000000E-14 " " relative error = 2.9039474332638815000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5109999999998998 " " y[1] (analytic) = 1.589623534852678 " " y[1] (numeric) = 1.5896235348526317 " " absolute error = 4.61852778244065100000000000000E-14 " " relative error = 2.9054223727687095000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5119999999998996 " " y[1] (analytic) = 1.5888155619678765 " " y[1] (numeric) = 1.5888155619678301 " " absolute error = 4.640732242933154300000000000000E-14 " " relative error = 2.920875370320034000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5129999999998995 " " y[1] (analytic) = 1.5880070002675621 " " y[1] (numeric) = 1.5880070002675157 " " absolute error = 4.640732242933154300000000000000E-14 " " relative error = 2.9223625853987045000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5139999999998994 " " y[1] (analytic) = 1.5871978505602964 " " y[1] (numeric) = 1.58719785056025 " " absolute error = 4.640732242933154300000000000000E-14 " " relative error = 2.9238523989274120000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5149999999998993 " " y[1] (analytic) = 1.5863881136552291 " " y[1] (numeric) = 1.5863881136551825 " " absolute error = 4.662936703425657500000000000000E-14 " " relative error = 2.939341680190537000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.515999999999899 " " y[1] (analytic) = 1.585577790362097 " " y[1] (numeric) = 1.5855777903620503 " " absolute error = 4.662936703425657500000000000000E-14 " " relative error = 2.940843856270708000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.516999999999899 " " y[1] (analytic) = 1.5847668814912232 " " y[1] (numeric) = 1.5847668814911766 " " absolute error = 4.662936703425657500000000000000E-14 " " relative error = 2.94234865574548030000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.517999999999899 " " y[1] (analytic) = 1.5839553878535169 " " y[1] (numeric) = 1.5839553878534702 " " absolute error = 4.662936703425657500000000000000E-14 " " relative error = 2.943856082805839000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.518999999999899 " " y[1] (analytic) = 1.5831433102604713 " " y[1] (numeric) = 1.5831433102604247 " " absolute error = 4.662936703425657500000000000000E-14 " " relative error = 2.9453661416530097000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5199999999998988 " " y[1] (analytic) = 1.5823306495241642 " " y[1] (numeric) = 1.5823306495241174 " " absolute error = 4.685141163918160600000000000000E-14 " " relative error = 2.9609115928627610000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5209999999998987 " " y[1] (analytic) = 1.581517406457256 " " y[1] (numeric) = 1.581517406457209 " " absolute error = 4.685141163918160600000000000000E-14 " " relative error = 2.962434143809588000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5219999999998985 " " y[1] (analytic) = 1.5807035818729898 " " y[1] (numeric) = 1.5807035818729427 " " absolute error = 4.70734562441066400000000000000E-14 " " relative error = 2.9780065525206745000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5229999999998984 " " y[1] (analytic) = 1.5798891765851901 " " y[1] (numeric) = 1.5798891765851428 " " absolute error = 4.72955008490316700000000000000E-14 " " relative error = 2.9935961047126920000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5239999999998983 " " y[1] (analytic) = 1.579074191408262 " " y[1] (numeric) = 1.5790741914082147 " " absolute error = 4.72955008490316700000000000000E-14 " " relative error = 2.9951411470319983000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.524999999999898 " " y[1] (analytic) = 1.578258627157191 " " y[1] (numeric) = 1.5782586271571435 " " absolute error = 4.7517545453956700000000000000E-14 " " relative error = 3.0107578464213310000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.525999999999898 " " y[1] (analytic) = 1.5774424846475408 " " y[1] (numeric) = 1.5774424846474933 " " absolute error = 4.7517545453956700000000000000E-14 " " relative error = 3.0123155624640024000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.526999999999898 " " y[1] (analytic) = 1.576625764695454 " " y[1] (numeric) = 1.5766257646954065 " " absolute error = 4.7517545453956700000000000000E-14 " " relative error = 3.0138759950517074000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.527999999999898 " " y[1] (analytic) = 1.5758084681176507 " " y[1] (numeric) = 1.5758084681176032 " " absolute error = 4.7517545453956700000000000000E-14 " " relative error = 3.0154391485608530000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5289999999998978 " " y[1] (analytic) = 1.5749905957314274 " " y[1] (numeric) = 1.5749905957313797 " " absolute error = 4.77395900588817300000000000000E-14 " " relative error = 3.0311031817121050000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5299999999998977 " " y[1] (analytic) = 1.5741721483546562 " " y[1] (numeric) = 1.5741721483546083 " " absolute error = 4.79616346638067600000000000000E-14 " " relative error = 3.0467846044625324000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5309999999998976 " " y[1] (analytic) = 1.5733531268057845 " " y[1] (numeric) = 1.5733531268057364 " " absolute error = 4.818367926873179400000000000000E-14 " " relative error = 3.0624834595494854000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5319999999998974 " " y[1] (analytic) = 1.5725335319038338 " " y[1] (numeric) = 1.5725335319037854 " " absolute error = 4.840572387365682500000000000000E-14 " " relative error = 3.07819978980372000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5329999999998973 " " y[1] (analytic) = 1.571713364468399 " " y[1] (numeric) = 1.5717133644683503 " " absolute error = 4.862776847858185600000000000000E-14 " " relative error = 3.093933638149679000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5339999999998972 " " y[1] (analytic) = 1.570892625319647 " " y[1] (numeric) = 1.5708926253195985 " " absolute error = 4.840572387365682500000000000000E-14 " " relative error = 3.081415183536632700000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.534999999999897 " " y[1] (analytic) = 1.5700713152783177 " " y[1] (numeric) = 1.5700713152782688 " " absolute error = 4.88498130835068900000000000000E-14 " " relative error = 3.111311735215515000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.535999999999897 " " y[1] (analytic) = 1.5692494351657202 " " y[1] (numeric) = 1.5692494351656714 " " absolute error = 4.88498130835068900000000000000E-14 " " relative error = 3.112941256426077000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.536999999999897 " " y[1] (analytic) = 1.5684269858037352 " " y[1] (numeric) = 1.5684269858036863 " " absolute error = 4.88498130835068900000000000000E-14 " " relative error = 3.114573615836759300000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.537999999999897 " " y[1] (analytic) = 1.567603968014812 " " y[1] (numeric) = 1.5676039680147629 " " absolute error = 4.90718576884319200000000000000E-14 " " relative error = 3.1303734035947690000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5389999999998967 " " y[1] (analytic) = 1.5667803826219675 " " y[1] (numeric) = 1.5667803826219187 " " absolute error = 4.88498130835068900000000000000E-14 " " relative error = 3.117846867712114000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5399999999998966 " " y[1] (analytic) = 1.565956230448788 " " y[1] (numeric) = 1.565956230448739 " " absolute error = 4.88498130835068900000000000000E-14 " " relative error = 3.119487769431908000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5409999999998965 " " y[1] (analytic) = 1.5651315123194252 " " y[1] (numeric) = 1.565131512319376 " " absolute error = 4.90718576884319200000000000000E-14 " " relative error = 3.135318489352409000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5419999999998963 " " y[1] (analytic) = 1.5643062290585972 " " y[1] (numeric) = 1.5643062290585479 " " absolute error = 4.92939022933569500000000000000E-14 " " relative error = 3.151167039910217600000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5429999999998962 " " y[1] (analytic) = 1.563480381491587 " " y[1] (numeric) = 1.5634803814915377 " " absolute error = 4.92939022933569500000000000000E-14 " " relative error = 3.152831521066463700000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.543999999999896 " " y[1] (analytic) = 1.5626539704442424 " " y[1] (numeric) = 1.5626539704441929 " " absolute error = 4.95159468982819800000000000000E-14 " " relative error = 3.168708353533011300000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.544999999999896 " " y[1] (analytic) = 1.5618269967429743 " " y[1] (numeric) = 1.5618269967429246 " " absolute error = 4.97379915032070130000000000000E-14 " " relative error = 3.1846031351058957000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.545999999999896 " " y[1] (analytic) = 1.560999461214756 " " y[1] (numeric) = 1.5609994612147065 " " absolute error = 4.95159468982819800000000000000E-14 " " relative error = 3.1720668794945717000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.546999999999896 " " y[1] (analytic) = 1.5601713646871236 " " y[1] (numeric) = 1.5601713646870738 " " absolute error = 4.97379915032070130000000000000E-14 " " relative error = 3.18798259146241050000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5479999999998957 " " y[1] (analytic) = 1.559342707988173 " " y[1] (numeric) = 1.5593427079881232 " " absolute error = 4.97379915032070130000000000000E-14 " " relative error = 3.18967673035633000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5489999999998956 " " y[1] (analytic) = 1.5585134919465609 " " y[1] (numeric) = 1.5585134919465111 " " absolute error = 4.97379915032070130000000000000E-14 " " relative error = 3.1913738161538130000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5499999999998955 " " y[1] (analytic) = 1.5576837173915037 " " y[1] (numeric) = 1.5576837173914537 " " absolute error = 4.996003610813204400000000000000E-14 " " relative error = 3.2073286476792023000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5509999999998954 " " y[1] (analytic) = 1.5568533851527753 " " y[1] (numeric) = 1.5568533851527253 " " absolute error = 4.996003610813204400000000000000E-14 " " relative error = 3.2090392444520030000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5519999999998952 " " y[1] (analytic) = 1.5560224960607083 " " y[1] (numeric) = 1.5560224960606581 " " absolute error = 5.018208071305708000000000000000E-14 " " relative error = 3.2250228284038390000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.552999999999895 " " y[1] (analytic) = 1.5551910509461915 " " y[1] (numeric) = 1.5551910509461413 " " absolute error = 5.018208071305708000000000000000E-14 " " relative error = 3.22674700851229000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.553999999999895 " " y[1] (analytic) = 1.5543590506406701 " " y[1] (numeric) = 1.5543590506406197 " " absolute error = 5.04041253179821100000000000000E-14 " " relative error = 3.242759470355753300000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.554999999999895 " " y[1] (analytic) = 1.5535264959761443 " " y[1] (numeric) = 1.5535264959760937 " " absolute error = 5.06261699229071400000000000000E-14 " " relative error = 3.2587902461938145000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.555999999999895 " " y[1] (analytic) = 1.5526933877851685 " " y[1] (numeric) = 1.552693387785118 " " absolute error = 5.06261699229071400000000000000E-14 " " relative error = 3.260538772250623000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5569999999998947 " " y[1] (analytic) = 1.551859726900851 " " y[1] (numeric) = 1.5518597269008003 " " absolute error = 5.06261699229071400000000000000E-14 " " relative error = 3.262290337542967000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5579999999998946 " " y[1] (analytic) = 1.5510255141568527 " " y[1] (numeric) = 1.551025514156802 " " absolute error = 5.08482145278321700000000000000E-14 " " relative error = 3.2783609336996355000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5589999999998945 " " y[1] (analytic) = 1.5501907503873862 " " y[1] (numeric) = 1.5501907503873351 " " absolute error = 5.1070259132757200000000000000E-14 " " relative error = 3.2944499972016317000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5599999999998944 " " y[1] (analytic) = 1.549355436427215 " " y[1] (numeric) = 1.5493554364271638 " " absolute error = 5.12923037376822300000000000000E-14 " " relative error = 3.310557573281011000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5609999999998942 " " y[1] (analytic) = 1.548519573111653 " " y[1] (numeric) = 1.548519573111602 " " absolute error = 5.1070259132757200000000000000E-14 " " relative error = 3.2980053994496640000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.561999999999894 " " y[1] (analytic) = 1.5476831612765638 " " y[1] (numeric) = 1.5476831612765127 " " absolute error = 5.1070259132757200000000000000E-14 " " relative error = 3.2997877350189236000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.562999999999894 " " y[1] (analytic) = 1.5468462017583593 " " y[1] (numeric) = 1.5468462017583078 " " absolute error = 5.151434834260726000000000000000E-14 " " relative error = 3.330282498935507300000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.563999999999894 " " y[1] (analytic) = 1.546008695393998 " " y[1] (numeric) = 1.5460086953939467 " " absolute error = 5.12923037376822300000000000000E-14 " " relative error = 3.31772414285227970000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.564999999999894 " " y[1] (analytic) = 1.5451706430209873 " " y[1] (numeric) = 1.5451706430209358 " " absolute error = 5.151434834260726000000000000000E-14 " " relative error = 3.333893804886867000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5659999999998937 " " y[1] (analytic) = 1.5443320454773786 " " y[1] (numeric) = 1.5443320454773273 " " absolute error = 5.12923037376822300000000000000E-14 " " relative error = 3.3213261285287216000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5669999999998936 " " y[1] (analytic) = 1.54349290360177 " " y[1] (numeric) = 1.5434929036017186 " " absolute error = 5.12923037376822300000000000000E-14 " " relative error = 3.3231318147294797000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5679999999998935 " " y[1] (analytic) = 1.542653218233303 " " y[1] (numeric) = 1.5426532182332515 " " absolute error = 5.151434834260726000000000000000E-14 " " relative error = 3.3393343191934727000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5689999999998934 " " y[1] (analytic) = 1.541812990211663 " " y[1] (numeric) = 1.5418129902116116 " " absolute error = 5.151434834260726000000000000000E-14 " " relative error = 3.3411541263208110000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5699999999998933 " " y[1] (analytic) = 1.5409722203770784 " " y[1] (numeric) = 1.5409722203770264 " " absolute error = 5.195843755245733000000000000000E-14 " " relative error = 3.3717958614298066000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.570999999999893 " " y[1] (analytic) = 1.540130909570318 " " y[1] (numeric) = 1.540130909570266 " " absolute error = 5.195843755245733000000000000000E-14 " " relative error = 3.373637736220309000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.571999999999893 " " y[1] (analytic) = 1.539289058632693 " " y[1] (numeric) = 1.539289058632641 " " absolute error = 5.195843755245733000000000000000E-14 " " relative error = 3.3754828088371225000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.572999999999893 " " y[1] (analytic) = 1.5384466684060545 " " y[1] (numeric) = 1.5384466684060025 " " absolute error = 5.195843755245733000000000000000E-14 " " relative error = 3.377331084625127000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.573999999999893 " " y[1] (analytic) = 1.5376037397327924 " " y[1] (numeric) = 1.5376037397327404 " " absolute error = 5.195843755245733000000000000000E-14 " " relative error = 3.379182568942422000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5749999999998927 " " y[1] (analytic) = 1.5367602734558354 " " y[1] (numeric) = 1.5367602734557833 " " absolute error = 5.21804821573823600000000000000E-14 " " relative error = 3.395486144370452000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5759999999998926 " " y[1] (analytic) = 1.5359162704186495 " " y[1] (numeric) = 1.5359162704185974 " " absolute error = 5.21804821573823600000000000000E-14 " " relative error = 3.3973520016920816000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5769999999998925 " " y[1] (analytic) = 1.5350717314652382 " " y[1] (numeric) = 1.5350717314651858 " " absolute error = 5.24025267623073900000000000000E-14 " " relative error = 3.4136858681052484000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5779999999998924 " " y[1] (analytic) = 1.53422665744014 " " y[1] (numeric) = 1.5342266574400873 " " absolute error = 5.26245713672324200000000000000E-14 " " relative error = 3.4300389132226794000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5789999999998923 " " y[1] (analytic) = 1.5333810491884285 " " y[1] (numeric) = 1.533381049188376 " " absolute error = 5.26245713672324200000000000000E-14 " " relative error = 3.431930464712929000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.579999999999892 " " y[1] (analytic) = 1.5325349075557124 " " y[1] (numeric) = 1.5325349075556598 " " absolute error = 5.26245713672324200000000000000E-14 " " relative error = 3.4338252987114654000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.580999999999892 " " y[1] (analytic) = 1.5316882333881332 " " y[1] (numeric) = 1.5316882333880806 " " absolute error = 5.26245713672324200000000000000E-14 " " relative error = 3.4357234207398410000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.581999999999892 " " y[1] (analytic) = 1.530841027532365 " " y[1] (numeric) = 1.530841027532312 " " absolute error = 5.28466159721574500000000000000E-14 " " relative error = 3.452129582478163000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.582999999999892 " " y[1] (analytic) = 1.5299932908356135 " " y[1] (numeric) = 1.5299932908355605 " " absolute error = 5.30686605770824800000000000000E-14 " " relative error = 3.46855511687236000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5839999999998917 " " y[1] (analytic) = 1.529145024145615 " " y[1] (numeric) = 1.5291450241455622 " " absolute error = 5.28466159721574500000000000000E-14 " " relative error = 3.455958404055537000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5849999999998916 " " y[1] (analytic) = 1.5282962283106367 " " y[1] (numeric) = 1.5282962283105839 " " absolute error = 5.28466159721574500000000000000E-14 " " relative error = 3.4578777983750940000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5859999999998915 " " y[1] (analytic) = 1.5274469041794743 " " y[1] (numeric) = 1.5274469041794212 " " absolute error = 5.30686605770824800000000000000E-14 " " relative error = 3.474337499514611000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5869999999998914 " " y[1] (analytic) = 1.5265970526014514 " " y[1] (numeric) = 1.5265970526013983 " " absolute error = 5.30686605770824800000000000000E-14 " " relative error = 3.4762716518185965000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5879999999998913 " " y[1] (analytic) = 1.5257466744264199 " " y[1] (numeric) = 1.5257466744263668 " " absolute error = 5.30686605770824800000000000000E-14 " " relative error = 3.4782091592651054000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.588999999999891 " " y[1] (analytic) = 1.5248957705047577 " " y[1] (numeric) = 1.5248957705047046 " " absolute error = 5.30686605770824800000000000000E-14 " " relative error = 3.480150027533761000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.589999999999891 " " y[1] (analytic) = 1.5240443416873688 " " y[1] (numeric) = 1.5240443416873155 " " absolute error = 5.329070518200751000000000000000E-14 " " relative error = 3.496663694378203000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.590999999999891 " " y[1] (analytic) = 1.5231923888256818 " " y[1] (numeric) = 1.5231923888256285 " " absolute error = 5.329070518200751000000000000000E-14 " " relative error = 3.498619450369788000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.591999999999891 " " y[1] (analytic) = 1.5223399127716497 " " y[1] (numeric) = 1.5223399127715962 " " absolute error = 5.351274978693255000000000000000E-14 " " relative error = 3.5151643426010226000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5929999999998907 " " y[1] (analytic) = 1.5214869143777483 " " y[1] (numeric) = 1.5214869143776948 " " absolute error = 5.351274978693255000000000000000E-14 " " relative error = 3.5171350657864825000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5939999999998906 " " y[1] (analytic) = 1.520633394496976 " " y[1] (numeric) = 1.5206333944969224 " " absolute error = 5.373479439185758000000000000000E-14 " " relative error = 3.5337113196591996000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5949999999998905 " " y[1] (analytic) = 1.5197793539828526 " " y[1] (numeric) = 1.5197793539827988 " " absolute error = 5.373479439185758000000000000000E-14 " " relative error = 3.5356970899121626000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5959999999998904 " " y[1] (analytic) = 1.5189247936894184 " " y[1] (numeric) = 1.5189247936893646 " " absolute error = 5.373479439185758000000000000000E-14 " " relative error = 3.5376863038319050000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.5969999999998903 " " y[1] (analytic) = 1.5180697144712338 " " y[1] (numeric) = 1.5180697144711799 " " absolute error = 5.39568389967826100000000000000E-14 " " relative error = 3.554305739876813000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.59799999999989 " " y[1] (analytic) = 1.5172141171833782 " " y[1] (numeric) = 1.517214117183324 " " absolute error = 5.41788836017076400000000000000E-14 " " relative error = 3.5709451281858395000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.59899999999989 " " y[1] (analytic) = 1.5163580026814483 " " y[1] (numeric) = 1.5163580026813939 " " absolute error = 5.44009282066326700000000000000E-14 " " relative error = 3.5876045175633270000000000000E-12 "%" h = 1.000E-3 " " " " "TOP MAIN SOLVE Loop" "NO POLE" x[1] = 2.59999999999989 " " y[1] (analytic) = 1.5155013718215584 " " y[1] (numeric) = 1.5155013718215042 " " absolute error = 5.41788836017076400000000000000E-14 " " relative error = 3.574980835324964000000000000E-12 "%" h = 1.000E-3 " " "Finished!" "Maximum Iterations Reached before Solution Completed!" "diff ( y , x , 1 ) = cos ( x ) ;" Iterations = 1000 "Total Elapsed Time "= 11 Minutes 11 Seconds "Elapsed Time(since restart) "= 11 Minutes 11 Seconds "Expected Time Remaining "= 1 Hours 22 Minutes 44 Seconds "Optimized Time Remaining "= 1 Hours 22 Minutes 40 Seconds "Time to Timeout "= 3 Minutes 48 Seconds Percent Done = 11.916666666665355 "%" (%o49) true (%o49) diffeq.max