(%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 - 2 + 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 - 2 + 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 - 2 + 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 - 2 + 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 : array_y_higher ,
1 2, 1
array_tmp2 : array_tmp1 + array_const_0D0 ,
1 1 1
if not array_y_set_initial then (if 1 <= glob_max_terms
1, 3
2
then (temporary : array_tmp2 glob_h factorial_3(0, 2),
1
array_y : temporary, array_y_higher : temporary,
3 1, 3
temporary 2.0
temporary : -------------, array_y_higher : temporary,
glob_h 2, 2
temporary 3.0
temporary : -------------, array_y_higher : temporary)), kkk : 2,
glob_h 3, 1
array_tmp1 : array_y_higher , array_tmp2 :
2 2, 2 2
array_tmp1 + array_const_0D0 , if not array_y_set_initial
2 2 1, 4
then (if 2 <= glob_max_terms then (temporary :
2
array_tmp2 glob_h factorial_3(1, 3), array_y : temporary,
2 4
temporary 2.0
array_y_higher : temporary, temporary : -------------,
1, 4 glob_h
temporary 3.0
array_y_higher : temporary, temporary : -------------,
2, 3 glob_h
array_y_higher : temporary)), kkk : 3, array_tmp1 : array_y_higher ,
3, 2 3 2, 3
array_tmp2 : array_tmp1 + array_const_0D0 ,
3 3 3
if not array_y_set_initial then (if 3 <= glob_max_terms
1, 5
2
then (temporary : array_tmp2 glob_h factorial_3(2, 4),
3
array_y : temporary, array_y_higher : temporary,
5 1, 5
temporary 2.0
temporary : -------------, array_y_higher : temporary,
glob_h 2, 4
temporary 3.0
temporary : -------------, array_y_higher : temporary)), kkk : 4,
glob_h 3, 3
array_tmp1 : array_y_higher , array_tmp2 :
4 2, 4 4
array_tmp1 + array_const_0D0 , if not array_y_set_initial
4 4 1, 6
then (if 4 <= glob_max_terms then (temporary :
2
array_tmp2 glob_h factorial_3(3, 5), array_y : temporary,
4 6
temporary 2.0
array_y_higher : temporary, temporary : -------------,
1, 6 glob_h
temporary 3.0
array_y_higher : temporary, temporary : -------------,
2, 5 glob_h
array_y_higher : temporary)), kkk : 5, array_tmp1 : array_y_higher ,
3, 4 5 2, 5
array_tmp2 : array_tmp1 + array_const_0D0 ,
5 5 5
if not array_y_set_initial then (if 5 <= glob_max_terms
1, 7
2
then (temporary : array_tmp2 glob_h factorial_3(4, 6),
5
array_y : temporary, array_y_higher : temporary,
7 1, 7
temporary 2.0
temporary : -------------, array_y_higher : temporary,
glob_h 2, 6
temporary 3.0
temporary : -------------, array_y_higher : temporary)), kkk : 6,
glob_h 3, 5
while kkk <= glob_max_terms do (array_tmp1 : array_y_higher ,
kkk 2, kkk
array_tmp2 : array_tmp1 + array_const_0D0 , order_d : 2,
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 : array_y_higher ,
1 2, 1
array_tmp2 : array_tmp1 + array_const_0D0 ,
1 1 1
if not array_y_set_initial then (if 1 <= glob_max_terms
1, 3
2
then (temporary : array_tmp2 glob_h factorial_3(0, 2),
1
array_y : temporary, array_y_higher : temporary,
3 1, 3
temporary 2.0
temporary : -------------, array_y_higher : temporary,
glob_h 2, 2
temporary 3.0
temporary : -------------, array_y_higher : temporary)), kkk : 2,
glob_h 3, 1
array_tmp1 : array_y_higher , array_tmp2 :
2 2, 2 2
array_tmp1 + array_const_0D0 , if not array_y_set_initial
2 2 1, 4
then (if 2 <= glob_max_terms then (temporary :
2
array_tmp2 glob_h factorial_3(1, 3), array_y : temporary,
2 4
temporary 2.0
array_y_higher : temporary, temporary : -------------,
1, 4 glob_h
temporary 3.0
array_y_higher : temporary, temporary : -------------,
2, 3 glob_h
array_y_higher : temporary)), kkk : 3, array_tmp1 : array_y_higher ,
3, 2 3 2, 3
array_tmp2 : array_tmp1 + array_const_0D0 ,
3 3 3
if not array_y_set_initial then (if 3 <= glob_max_terms
1, 5
2
then (temporary : array_tmp2 glob_h factorial_3(2, 4),
3
array_y : temporary, array_y_higher : temporary,
5 1, 5
temporary 2.0
temporary : -------------, array_y_higher : temporary,
glob_h 2, 4
temporary 3.0
temporary : -------------, array_y_higher : temporary)), kkk : 4,
glob_h 3, 3
array_tmp1 : array_y_higher , array_tmp2 :
4 2, 4 4
array_tmp1 + array_const_0D0 , if not array_y_set_initial
4 4 1, 6
then (if 4 <= glob_max_terms then (temporary :
2
array_tmp2 glob_h factorial_3(3, 5), array_y : temporary,
4 6
temporary 2.0
array_y_higher : temporary, temporary : -------------,
1, 6 glob_h
temporary 3.0
array_y_higher : temporary, temporary : -------------,
2, 5 glob_h
array_y_higher : temporary)), kkk : 5, array_tmp1 : array_y_higher ,
3, 4 5 2, 5
array_tmp2 : array_tmp1 + array_const_0D0 ,
5 5 5
if not array_y_set_initial then (if 5 <= glob_max_terms
1, 7
2
then (temporary : array_tmp2 glob_h factorial_3(4, 6),
5
array_y : temporary, array_y_higher : temporary,
7 1, 7
temporary 2.0
temporary : -------------, array_y_higher : temporary,
glob_h 2, 6
temporary 3.0
temporary : -------------, array_y_higher : temporary)), kkk : 6,
glob_h 3, 5
while kkk <= glob_max_terms do (array_tmp1 : array_y_higher ,
kkk 2, kkk
array_tmp2 : array_tmp1 + array_const_0D0 , order_d : 2,
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) := exp(x) + 1.0
(%o47) exact_soln_y(x) := exp(x) + 1.0
(%i48) exact_soln_yp(x) := exp(x)
(%o48) exact_soln_yp(x) := exp(x)
(%i49) mainprog() := (define_variable(DEBUGMASSIVE, 4, fixnum),
define_variable(DEBUGL, 3, fixnum), define_variable(glob_max_terms, 30,
fixnum), define_variable(glob_iolevel, 5, fixnum),
define_variable(ALWAYS, 1, fixnum), define_variable(INFO, 2, fixnum),
define_variable(MAX_UNCHANGED, 10, fixnum),
define_variable(glob_max_rel_trunc_err, 1.0E-11, float),
define_variable(glob_log10_abserr, 1.0E-11, float),
define_variable(glob_last_good_h, 0.1, float),
define_variable(glob_html_log, true, boolean),
define_variable(glob_log10abserr, 0.0, float),
define_variable(glob_orig_start_sec, 0.0, float),
define_variable(glob_clock_start_sec, 0.0, float),
define_variable(sec_in_min, 60.0, float),
define_variable(glob_log10normmin, 0.1, float),
define_variable(glob_max_minutes, 0.0, float),
define_variable(glob_max_iter, 1000, fixnum),
define_variable(glob_abserr, 1.0E-11, float),
define_variable(glob_hmin, 1.0E-11, float),
define_variable(glob_not_yet_finished, true, boolean),
define_variable(glob_optimal_expect_sec, 0.1, float),
define_variable(glob_no_eqs, 0, fixnum),
define_variable(glob_display_flag, true, boolean),
define_variable(glob_current_iter, 0, fixnum),
define_variable(glob_log10_relerr, 1.0E-11, float),
define_variable(glob_hmax, 1.0, float),
define_variable(glob_normmax, 0.0, float),
define_variable(glob_unchanged_h_cnt, 0, fixnum),
define_variable(glob_smallish_float, 1.0E-101, float),
define_variable(glob_small_float, 1.0E-51, float),
define_variable(glob_optimal_start, 0.0, float),
define_variable(glob_max_trunc_err, 1.0E-11, float),
define_variable(glob_not_yet_start_msg, true, boolean),
define_variable(centuries_in_millinium, 10.0, float),
define_variable(djd_debug2, true, boolean),
define_variable(glob_subiter_method, 3, fixnum),
define_variable(glob_percent_done, 0.0, float),
define_variable(glob_iter, 0, fixnum),
define_variable(glob_curr_iter_when_opt, 0, fixnum),
define_variable(glob_warned2, false, boolean),
define_variable(glob_max_hours, 0.0, float),
define_variable(years_in_century, 100.0, float),
define_variable(glob_dump, false, boolean),
define_variable(glob_max_opt_iter, 10, fixnum),
define_variable(glob_log10relerr, 0.0, float),
define_variable(glob_max_sec, 10000.0, float),
define_variable(glob_relerr, 1.0E-11, float),
define_variable(glob_dump_analytic, false, boolean),
define_variable(glob_optimal_done, false, boolean),
define_variable(glob_look_poles, false, boolean),
define_variable(glob_h, 0.1, float), define_variable(djd_debug, true,
boolean), define_variable(glob_start, 0, fixnum),
define_variable(glob_optimal_clock_start_sec, 0.0, float),
define_variable(glob_large_float, 9.0E+100, float),
define_variable(glob_hmin_init, 0.001, float),
define_variable(glob_initial_pass, true, boolean),
define_variable(glob_almost_1, 0.999, float),
define_variable(days_in_year, 365.0, float),
define_variable(hours_in_day, 24.0, float),
define_variable(min_in_hour, 60.0, float),
define_variable(glob_warned, false, boolean),
define_variable(glob_disp_incr, 0.1, float),
define_variable(glob_reached_optimal_h, false, boolean),
define_variable(glob_clock_sec, 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/diffpostode.ode#################"),
omniout_str(ALWAYS, "diff ( y , x , 2 ) = diff ( y , x , 1 ) ;"),
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 : -4.0,"), omniout_str(ALWAYS, "x_end : 1.0 ,"),
omniout_str(ALWAYS, "array_y_init[0 + 1] : exact_soln_y(x_start),"),
omniout_str(ALWAYS, "array_y_init[1 + 1] : exact_soln_yp(x_start),"),
omniout_str(ALWAYS, "glob_h : 0.00001 ,"),
omniout_str(ALWAYS, "glob_look_poles : true,"),
omniout_str(ALWAYS, "glob_max_iter : 10,"),
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 + exp(x) "), omniout_str(ALWAYS, ");"),
omniout_str(ALWAYS, "exact_soln_yp (x) := ("), omniout_str(ALWAYS, "exp(x) "),
omniout_str(ALWAYS, ");"), omniout_str(ALWAYS, ""),
omniout_str(ALWAYS, "/* END USER DEF BLOCK */"),
omniout_str(ALWAYS, "#######END OF ECHO OF PROBLEM#################"),
glob_unchanged_h_cnt : 0, glob_warned : false, glob_warned2 : false,
glob_small_float : 1.0E-200, glob_smallish_float : 1.0E-64,
glob_large_float : 1.0E+100, glob_almost_1 : 0.99, glob_log10_abserr : - 8.0,
glob_log10_relerr : - 8.0, glob_hmax : 0.01, Digits : 32, max_terms : 30,
glob_max_terms : max_terms, glob_html_log : true,
array(array_m1, 1 + max_terms), array(array_1st_rel_error, 1 + max_terms),
array(array_norms, 1 + max_terms), array(array_y_init, 1 + max_terms),
array(array_pole, 1 + max_terms), array(array_last_rel_error, 1 + max_terms),
array(array_y, 1 + max_terms), array(array_x, 1 + max_terms),
array(array_tmp0, 1 + max_terms), array(array_tmp1, 1 + max_terms),
array(array_tmp2, 1 + max_terms), array(array_type_pole, 1 + max_terms),
array(array_fact_1, 1 + max_terms), array(array_y_higher, 1 + 3,
1 + max_terms), array(array_y_higher_work2, 1 + 3, 1 + max_terms),
array(array_y_set_initial, 1 + 2, 1 + max_terms),
array(array_y_higher_work, 1 + 3, 1 + max_terms),
array(array_poles, 1 + 1, 1 + 3), array(array_real_pole, 1 + 1, 1 + 3),
array(array_complex_pole, 1 + 1, 1 + 3),
array(array_fact_2, 1 + max_terms, 1 + max_terms), term : 1,
while term <= max_terms do (array_m1 : 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_y_init : 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_last_rel_error : 0.0, term : 1 + term),
term
term : 1, while term <= max_terms do (array_y : 0.0, term : 1 + term),
term
term : 1, while term <= max_terms do (array_x : 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
term : 1, while term <= max_terms do (array_type_pole : 0.0,
term
term : 1 + term), term : 1, while term <=
max_terms do (array_fact_1 : 0.0, term : 1 + term), ord : 1,
term
while ord <= 3 do (term : 1, while term <=
max_terms do (array_y_higher : 0.0, term : 1 + term), ord : 1 + ord),
ord, term
ord : 1, while ord <= 3 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_set_initial : 0.0, term : 1 + term),
ord, term
ord : 1 + ord), ord : 1, while ord <= 3 do (term : 1,
while term <= max_terms do (array_y_higher_work : 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_real_pole : 0.0, term : 1 + term), ord : 1 + ord),
ord, term
ord : 1, while ord <= 1 do (term : 1,
while term <= 3 do (array_complex_pole : 0.0, term : 1 + term),
ord, term
ord : 1 + ord), ord : 1, while ord <= max_terms do (term : 1,
while term <= max_terms do (array_fact_2 : 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_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_1, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_const_1 : 0.0, term : 1 + term),
term
array_const_1 : 1, array(array_const_0D0, 1 + 1 + max_terms), term : 1,
1
while term <= 1 + max_terms do (array_const_0D0 : 0.0, term : 1 + term),
term
array_const_0D0 : 0.0, array(array_const_2, 1 + 1 + max_terms), term : 1,
1
while term <= 1 + max_terms do (array_const_2 : 0.0, term : 1 + term),
term
array_const_2 : 2, 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 : - 4.0, x_end : 1.0,
array_y_init : exact_soln_y(x_start),
1 + 0
array_y_init : exact_soln_yp(x_start), glob_h : 1.0E-5,
1 + 1
glob_look_poles : true, glob_max_iter : 10, 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 : true,
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 : 2, 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 : 2, ord : 3, calc_term : 1,
2
iii : glob_max_terms, while iii >= calc_term do (array_y_higher_work :
3, iii
array_y_higher
3, iii
--------------------
calc_term - 1
glob_h
-------------------------------------, iii : iii - 1), temp_sum : 0.0,
factorial_3(iii - calc_term, iii - 1)
ord : 3, 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 : 2, calc_term : 2, iii : glob_max_terms,
factorial_1(calc_term - 1)!
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 : 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 : 2, calc_term : 1, iii : glob_max_terms,
factorial_1(calc_term - 1)!
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 : 3, 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 : 3, 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 , 2 ) = diff ( y , x , 1 ) ;"),
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,
"2012-06-16T21:39:24-05:00"), logitem_str(html_log_file, "Maxima"),
logitem_str(html_log_file, "diff"),
logitem_str(html_log_file, "diff ( y , x , 2 ) = diff ( y , x , 1 ) ;"),
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, "diff diffeq.max"), logitem_str(html_log_file, "diff 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))
(%o49) mainprog() := (define_variable(DEBUGMASSIVE, 4, fixnum),
define_variable(DEBUGL, 3, fixnum), define_variable(glob_max_terms, 30,
fixnum), define_variable(glob_iolevel, 5, fixnum),
define_variable(ALWAYS, 1, fixnum), define_variable(INFO, 2, fixnum),
define_variable(MAX_UNCHANGED, 10, fixnum),
define_variable(glob_max_rel_trunc_err, 1.0E-11, float),
define_variable(glob_log10_abserr, 1.0E-11, float),
define_variable(glob_last_good_h, 0.1, float),
define_variable(glob_html_log, true, boolean),
define_variable(glob_log10abserr, 0.0, float),
define_variable(glob_orig_start_sec, 0.0, float),
define_variable(glob_clock_start_sec, 0.0, float),
define_variable(sec_in_min, 60.0, float),
define_variable(glob_log10normmin, 0.1, float),
define_variable(glob_max_minutes, 0.0, float),
define_variable(glob_max_iter, 1000, fixnum),
define_variable(glob_abserr, 1.0E-11, float),
define_variable(glob_hmin, 1.0E-11, float),
define_variable(glob_not_yet_finished, true, boolean),
define_variable(glob_optimal_expect_sec, 0.1, float),
define_variable(glob_no_eqs, 0, fixnum),
define_variable(glob_display_flag, true, boolean),
define_variable(glob_current_iter, 0, fixnum),
define_variable(glob_log10_relerr, 1.0E-11, float),
define_variable(glob_hmax, 1.0, float),
define_variable(glob_normmax, 0.0, float),
define_variable(glob_unchanged_h_cnt, 0, fixnum),
define_variable(glob_smallish_float, 1.0E-101, float),
define_variable(glob_small_float, 1.0E-51, float),
define_variable(glob_optimal_start, 0.0, float),
define_variable(glob_max_trunc_err, 1.0E-11, float),
define_variable(glob_not_yet_start_msg, true, boolean),
define_variable(centuries_in_millinium, 10.0, float),
define_variable(djd_debug2, true, boolean),
define_variable(glob_subiter_method, 3, fixnum),
define_variable(glob_percent_done, 0.0, float),
define_variable(glob_iter, 0, fixnum),
define_variable(glob_curr_iter_when_opt, 0, fixnum),
define_variable(glob_warned2, false, boolean),
define_variable(glob_max_hours, 0.0, float),
define_variable(years_in_century, 100.0, float),
define_variable(glob_dump, false, boolean),
define_variable(glob_max_opt_iter, 10, fixnum),
define_variable(glob_log10relerr, 0.0, float),
define_variable(glob_max_sec, 10000.0, float),
define_variable(glob_relerr, 1.0E-11, float),
define_variable(glob_dump_analytic, false, boolean),
define_variable(glob_optimal_done, false, boolean),
define_variable(glob_look_poles, false, boolean),
define_variable(glob_h, 0.1, float), define_variable(djd_debug, true,
boolean), define_variable(glob_start, 0, fixnum),
define_variable(glob_optimal_clock_start_sec, 0.0, float),
define_variable(glob_large_float, 9.0E+100, float),
define_variable(glob_hmin_init, 0.001, float),
define_variable(glob_initial_pass, true, boolean),
define_variable(glob_almost_1, 0.999, float),
define_variable(days_in_year, 365.0, float),
define_variable(hours_in_day, 24.0, float),
define_variable(min_in_hour, 60.0, float),
define_variable(glob_warned, false, boolean),
define_variable(glob_disp_incr, 0.1, float),
define_variable(glob_reached_optimal_h, false, boolean),
define_variable(glob_clock_sec, 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/diffpostode.ode#################"),
omniout_str(ALWAYS, "diff ( y , x , 2 ) = diff ( y , x , 1 ) ;"),
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 : -4.0,"), omniout_str(ALWAYS, "x_end : 1.0 ,"),
omniout_str(ALWAYS, "array_y_init[0 + 1] : exact_soln_y(x_start),"),
omniout_str(ALWAYS, "array_y_init[1 + 1] : exact_soln_yp(x_start),"),
omniout_str(ALWAYS, "glob_h : 0.00001 ,"),
omniout_str(ALWAYS, "glob_look_poles : true,"),
omniout_str(ALWAYS, "glob_max_iter : 10,"),
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 + exp(x) "), omniout_str(ALWAYS, ");"),
omniout_str(ALWAYS, "exact_soln_yp (x) := ("), omniout_str(ALWAYS, "exp(x) "),
omniout_str(ALWAYS, ");"), omniout_str(ALWAYS, ""),
omniout_str(ALWAYS, "/* END USER DEF BLOCK */"),
omniout_str(ALWAYS, "#######END OF ECHO OF PROBLEM#################"),
glob_unchanged_h_cnt : 0, glob_warned : false, glob_warned2 : false,
glob_small_float : 1.0E-200, glob_smallish_float : 1.0E-64,
glob_large_float : 1.0E+100, glob_almost_1 : 0.99, glob_log10_abserr : - 8.0,
glob_log10_relerr : - 8.0, glob_hmax : 0.01, Digits : 32, max_terms : 30,
glob_max_terms : max_terms, glob_html_log : true,
array(array_m1, 1 + max_terms), array(array_1st_rel_error, 1 + max_terms),
array(array_norms, 1 + max_terms), array(array_y_init, 1 + max_terms),
array(array_pole, 1 + max_terms), array(array_last_rel_error, 1 + max_terms),
array(array_y, 1 + max_terms), array(array_x, 1 + max_terms),
array(array_tmp0, 1 + max_terms), array(array_tmp1, 1 + max_terms),
array(array_tmp2, 1 + max_terms), array(array_type_pole, 1 + max_terms),
array(array_fact_1, 1 + max_terms), array(array_y_higher, 1 + 3,
1 + max_terms), array(array_y_higher_work2, 1 + 3, 1 + max_terms),
array(array_y_set_initial, 1 + 2, 1 + max_terms),
array(array_y_higher_work, 1 + 3, 1 + max_terms),
array(array_poles, 1 + 1, 1 + 3), array(array_real_pole, 1 + 1, 1 + 3),
array(array_complex_pole, 1 + 1, 1 + 3),
array(array_fact_2, 1 + max_terms, 1 + max_terms), term : 1,
while term <= max_terms do (array_m1 : 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_y_init : 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_last_rel_error : 0.0, term : 1 + term),
term
term : 1, while term <= max_terms do (array_y : 0.0, term : 1 + term),
term
term : 1, while term <= max_terms do (array_x : 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
term : 1, while term <= max_terms do (array_type_pole : 0.0,
term
term : 1 + term), term : 1, while term <=
max_terms do (array_fact_1 : 0.0, term : 1 + term), ord : 1,
term
while ord <= 3 do (term : 1, while term <=
max_terms do (array_y_higher : 0.0, term : 1 + term), ord : 1 + ord),
ord, term
ord : 1, while ord <= 3 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_set_initial : 0.0, term : 1 + term),
ord, term
ord : 1 + ord), ord : 1, while ord <= 3 do (term : 1,
while term <= max_terms do (array_y_higher_work : 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_real_pole : 0.0, term : 1 + term), ord : 1 + ord),
ord, term
ord : 1, while ord <= 1 do (term : 1,
while term <= 3 do (array_complex_pole : 0.0, term : 1 + term),
ord, term
ord : 1 + ord), ord : 1, while ord <= max_terms do (term : 1,
while term <= max_terms do (array_fact_2 : 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_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_1, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_const_1 : 0.0, term : 1 + term),
term
array_const_1 : 1, array(array_const_0D0, 1 + 1 + max_terms), term : 1,
1
while term <= 1 + max_terms do (array_const_0D0 : 0.0, term : 1 + term),
term
array_const_0D0 : 0.0, array(array_const_2, 1 + 1 + max_terms), term : 1,
1
while term <= 1 + max_terms do (array_const_2 : 0.0, term : 1 + term),
term
array_const_2 : 2, 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 : - 4.0, x_end : 1.0,
array_y_init : exact_soln_y(x_start),
1 + 0
array_y_init : exact_soln_yp(x_start), glob_h : 1.0E-5,
1 + 1
glob_look_poles : true, glob_max_iter : 10, 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 : true,
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 : 2, 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 : 2, ord : 3, calc_term : 1,
2
iii : glob_max_terms, while iii >= calc_term do (array_y_higher_work :
3, iii
array_y_higher
3, iii
--------------------
calc_term - 1
glob_h
-------------------------------------, iii : iii - 1), temp_sum : 0.0,
factorial_3(iii - calc_term, iii - 1)
ord : 3, 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 : 2, calc_term : 2, iii : glob_max_terms,
factorial_1(calc_term - 1)!
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 : 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 : 2, calc_term : 1, iii : glob_max_terms,
factorial_1(calc_term - 1)!
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 : 3, 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 : 3, 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 , 2 ) = diff ( y , x , 1 ) ;"),
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,
"2012-06-16T21:39:24-05:00"), logitem_str(html_log_file, "Maxima"),
logitem_str(html_log_file, "diff"),
logitem_str(html_log_file, "diff ( y , x , 2 ) = diff ( y , x , 1 ) ;"),
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, "diff diffeq.max"), logitem_str(html_log_file, "diff 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))
(%i50) mainprog()
"##############ECHO OF PROBLEM#################"
"##############temp/diffpostode.ode#################"
"diff ( y , x , 2 ) = diff ( y , x , 1 ) ;"
"!"
"/* BEGIN FIRST INPUT BLOCK */"
"Digits : 32,"
"max_terms : 30,"
"!"
"/* END FIRST INPUT BLOCK */"
"/* BEGIN SECOND INPUT BLOCK */"
"x_start : -4.0,"
"x_end : 1.0 ,"
"array_y_init[0 + 1] : exact_soln_y(x_start),"
"array_y_init[1 + 1] : exact_soln_yp(x_start),"
"glob_h : 0.00001 ,"
"glob_look_poles : true,"
"glob_max_iter : 10,"
"/* 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 + exp(x) "
");"
"exact_soln_yp (x) := ("
"exp(x) "
");"
""
"/* END USER DEF BLOCK */"
"#######END OF ECHO OF PROBLEM#################"
"START of Soultion"
x[1] = -4. " "
y[1] (analytic) = 1.0183156388887342 " "
y[1] (numeric) = 1.0183156388887342 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.999 " "
y[1] (analytic) = 1.0183339636884958 " "
y[1] (numeric) = 1.0183339636884956 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.18046940240278400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.998 " "
y[1] (analytic) = 1.0183523068222224 " "
y[1] (numeric) = 1.0183523068222196 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 2.834559164532170000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9970000000000003 " "
y[1] (analytic) = 1.0183706683082576 " "
y[1] (numeric) = 1.0183706683082463 " "
absolute error = 1.132427485117659700000000000000E-14 " "
relative error = 1.1119993145510328000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9960000000000004 " "
y[1] (analytic) = 1.0183890481649625 " "
y[1] (numeric) = 1.0183890481649343 " "
absolute error = 2.819966482547897600000000000000E-14 " "
relative error = 2.76904635574116000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9950000000000006 " "
y[1] (analytic) = 1.0184074464107171 " "
y[1] (numeric) = 1.01840744641066 " "
absolute error = 5.70654634657330500000000000000E-14 " "
relative error = 5.603402024097034000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9940000000000007 " "
y[1] (analytic) = 1.0184258630639198 " "
y[1] (numeric) = 1.018425863063819 " "
absolute error = 1.00808250635964210000000000000E-13 " "
relative error = 9.898437804071867000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9930000000000008 " "
y[1] (analytic) = 1.018444298142987 " "
y[1] (numeric) = 1.0184442981428246 " "
absolute error = 1.62536650805122920000000000000E-13 " "
relative error = 1.595930686651094200000000000E-11 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.992000000000001 " "
y[1] (analytic) = 1.0184627516663538 " "
y[1] (numeric) = 1.018462751666109 " "
absolute error = 2.44915199232309530000000000000E-13 " "
relative error = 2.404753623356303300000000000E-11 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.991000000000001 " "
y[1] (analytic) = 1.0184812236524738 " "
y[1] (numeric) = 1.0184812236521223 " "
absolute error = 3.51496609596324560000000000000E-13 " "
relative error = 3.451183992727805400000000000E-11 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.990000000000001 " "
y[1] (analytic) = 1.0184997141198193 " "
y[1] (numeric) = 1.0184997141193337 " "
absolute error = 4.8561155097104347000000000000E-13 " "
relative error = 4.76791052799367450000000000E-11 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.989000000000001 " "
y[1] (analytic) = 1.0185182230868801 " "
y[1] (numeric) = 1.0185182230862304 " "
absolute error = 6.4970251401064160000000000000E-13 " "
relative error = 6.37889926055080100000000000E-11 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9880000000000013 " "
y[1] (analytic) = 1.0185367505721656 " "
y[1] (numeric) = 1.0185367505713183 " "
absolute error = 8.4732221239391950000000000000E-13 " "
relative error = 8.31901462483247700000000000E-11 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9870000000000014 " "
y[1] (analytic) = 1.0185552965942033 " "
y[1] (numeric) = 1.018555296593122 " "
absolute error = 1.0813572259849025000000000000E-12 " "
relative error = 1.06165784970211550000000000E-10 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9860000000000015 " "
y[1] (analytic) = 1.0185738611715391 " "
y[1] (numeric) = 1.018573861170184 " "
absolute error = 1.355138223857466000000000000E-12 " "
relative error = 1.33042705641279540000000000E-10 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9850000000000017 " "
y[1] (analytic) = 1.0185924443227377 " "
y[1] (numeric) = 1.0185924443210659 " "
absolute error = 1.6717738304805607000000000000E-12 " "
relative error = 1.64125881730069530000000000E-10 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9840000000000018 " "
y[1] (analytic) = 1.0186110460663822 " "
y[1] (numeric) = 1.0186110460643478 " "
absolute error = 2.034372670323136800000000000E-12 " "
relative error = 1.99720263998644870000000000E-10 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.983000000000002 " "
y[1] (analytic) = 1.018629666421074 " "
y[1] (numeric) = 1.0186296664186283 " "
absolute error = 2.44582132324921990000000000E-12 " "
relative error = 2.40108982083993530000000000E-10 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.982000000000002 " "
y[1] (analytic) = 1.0186483054054343 " "
y[1] (numeric) = 1.0186483054025244 " "
absolute error = 2.9098945475425353000000000000E-12 " "
relative error = 2.85662336264758450000000000E-10 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.981000000000002 " "
y[1] (analytic) = 1.0186669630381011 " "
y[1] (numeric) = 1.018666963034672 " "
absolute error = 3.4290348338572585000000000000E-12 " "
relative error = 3.3661981376429530000000000E-10 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.980000000000002 " "
y[1] (analytic) = 1.0186856393377328 " "
y[1] (numeric) = 1.0186856393337258 " "
absolute error = 4.007016940477115000000000000E-12 " "
relative error = 3.9335166667139370000000000E-10 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9790000000000023 " "
y[1] (analytic) = 1.0187043343230051 " "
y[1] (numeric) = 1.0187043343183586 " "
absolute error = 4.646505402661205000000000000E-12 " "
relative error = 4.5611913546525830000000000E-10 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9780000000000024 " "
y[1] (analytic) = 1.0187230480126135 " "
y[1] (numeric) = 1.0187230480072624 " "
absolute error = 5.3510529340883300000000000000E-12 " "
relative error = 5.2527062625386630000000000E-10 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9770000000000025 " "
y[1] (analytic) = 1.0187417804252714 " "
y[1] (numeric) = 1.0187417804191476 " "
absolute error = 6.1237681592274380000000000000E-12 " "
relative error = 6.0111092691919290000000000E-10 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9760000000000026 " "
y[1] (analytic) = 1.0187605315797112 " "
y[1] (numeric) = 1.0187605315727435 " "
absolute error = 6.9677597025474820000000000000E-12 " "
relative error = 6.8394480219440090000000000E-10 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9750000000000028 " "
y[1] (analytic) = 1.0187793014946844 " "
y[1] (numeric) = 1.018779301486798 " "
absolute error = 7.886358233122337000000000000E-12 " "
relative error = 7.7409878877122870000000000E-10 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.974000000000003 " "
y[1] (analytic) = 1.0187980901889604 " "
y[1] (numeric) = 1.018798090180078 " "
absolute error = 8.882450330816027000000000000E-12 " "
relative error = 8.7185580895313270000000000E-10 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.973000000000003 " "
y[1] (analytic) = 1.0188168976813283 " "
y[1] (numeric) = 1.0188168976713687 " "
absolute error = 9.959588709307354000000000000E-12 " "
relative error = 9.7756414641078860000000000E-10 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.972000000000003 " "
y[1] (analytic) = 1.0188357239905954 " "
y[1] (numeric) = 1.0188357239794745 " "
absolute error = 1.112088199306526800000000000E-11 " "
relative error = 1.0915284703118558000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.971000000000003 " "
y[1] (analytic) = 1.0188545691355881 " "
y[1] (numeric) = 1.0188545691232187 " "
absolute error = 1.236943880655871900000000000E-11 " "
relative error = 1.2140534263936353000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9700000000000033 " "
y[1] (analytic) = 1.0188734331351514 " "
y[1] (numeric) = 1.0188734331214429 " "
absolute error = 1.370858981886158300000000000E-11 " "
relative error = 1.3454654300563323000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9690000000000034 " "
y[1] (analytic) = 1.0188923160081496 " "
y[1] (numeric) = 1.018892315993008 " "
absolute error = 1.514166569904773500000000000E-11 " "
relative error = 1.4860908715427612000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9680000000000035 " "
y[1] (analytic) = 1.0189112177734652 " "
y[1] (numeric) = 1.0189112177567936 " "
absolute error = 1.6671553026981200000000000E-11 " "
relative error = 1.6362125311969810000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9670000000000036 " "
y[1] (analytic) = 1.0189301384500002 " "
y[1] (numeric) = 1.0189301384316982 " "
absolute error = 1.830202656094570600000000000E-11 " "
relative error = 1.7962003350678002000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9660000000000037 " "
y[1] (analytic) = 1.0189490780566752 " "
y[1] (numeric) = 1.0189490780366395 " "
absolute error = 2.00357508362003500000000000E-11 " "
relative error = 1.966315222975836800000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.965000000000004 " "
y[1] (analytic) = 1.0189680366124299 " "
y[1] (numeric) = 1.0189680365905536 " "
absolute error = 2.187627856642393500000000000E-11 " "
relative error = 2.1469052787123585000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.964000000000004 " "
y[1] (analytic) = 1.0189870141362227 " "
y[1] (numeric) = 1.0189870141123958 " "
absolute error = 2.382694042069033500000000000E-11 " "
relative error = 2.33829676827511000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.963000000000004 " "
y[1] (analytic) = 1.0190060106470313 " "
y[1] (numeric) = 1.0190060106211403 " "
absolute error = 2.589106706807342600000000000E-11 " "
relative error = 2.540815932148776000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.962000000000004 " "
y[1] (analytic) = 1.019025026163852 " "
y[1] (numeric) = 1.0190250261357803 " "
absolute error = 2.807176713304216000000000000E-11 " "
relative error = 2.754767195337597000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9610000000000043 " "
y[1] (analytic) = 1.0190440607057007 " "
y[1] (numeric) = 1.0190440606753282 " "
absolute error = 3.03725933292753300000000000E-11 " "
relative error = 2.9804985378396620000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9600000000000044 " "
y[1] (analytic) = 1.0190631142916116 " "
y[1] (numeric) = 1.0190631142588151 " "
absolute error = 3.279643223663697400000000000E-11 " "
relative error = 3.218292545053501000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9590000000000045 " "
y[1] (analytic) = 1.0190821869406383 " "
y[1] (numeric) = 1.0190821869052915 " "
absolute error = 3.534683656880588400000000000E-11 " "
relative error = 3.4684971459387154000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9580000000000046 " "
y[1] (analytic) = 1.0191012786718536 " "
y[1] (numeric) = 1.0191012786338265 " "
absolute error = 3.80271369948559370000000000E-11 " "
relative error = 3.731438453733950700000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9570000000000047 " "
y[1] (analytic) = 1.019120389504349 " "
y[1] (numeric) = 1.0191203894635086 " "
absolute error = 4.084044213925608300000000000E-11 " "
relative error = 4.007420767934876000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.956000000000005 " "
y[1] (analytic) = 1.0191395194572357 " "
y[1] (numeric) = 1.0191395194134454 " "
absolute error = 4.379030471568512400000000000E-11 " "
relative error = 4.296791938654932500000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.955000000000005 " "
y[1] (analytic) = 1.0191586685496434 " "
y[1] (numeric) = 1.0191586685027634 " "
absolute error = 4.688005539321693500000000000E-11 " "
relative error = 4.599878001325502000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.954000000000005 " "
y[1] (analytic) = 1.0191778368007212 " "
y[1] (numeric) = 1.0191778367506086 " "
absolute error = 5.01125807517155400000000000E-11 " "
relative error = 4.916961392039572000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.953000000000005 " "
y[1] (analytic) = 1.0191970242296375 " "
y[1] (numeric) = 1.0191970241761457 " "
absolute error = 5.34918775940695900000000000E-11 " "
relative error = 5.248433455199848000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9520000000000053 " "
y[1] (analytic) = 1.0192162308555794 " "
y[1] (numeric) = 1.0192162307985588 " "
absolute error = 5.70206104555381900000000000E-11 " "
relative error = 5.594554789190547000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9510000000000054 " "
y[1] (analytic) = 1.019235456697754 " "
y[1] (numeric) = 1.0192354566370512 " "
absolute error = 6.07027761390099800000000000E-11 " "
relative error = 5.95571668353085100000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9500000000000055 " "
y[1] (analytic) = 1.0192547017753868 " "
y[1] (numeric) = 1.0192547017108453 " "
absolute error = 6.45414832689539300000000000E-11 " "
relative error = 6.332223256516007000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9490000000000056 " "
y[1] (analytic) = 1.019273966107723 " "
y[1] (numeric) = 1.019273966039183 " "
absolute error = 6.85400625144438900000000000E-11 " "
relative error = 6.724400386304006000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9480000000000057 " "
y[1] (analytic) = 1.019293249714027 " "
y[1] (numeric) = 1.0192932496413252 " "
absolute error = 7.27018445445537500000000000E-11 " "
relative error = 7.132573924623850000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.947000000000006 " "
y[1] (analytic) = 1.0193125526135822 " "
y[1] (numeric) = 1.019312552536552 " "
absolute error = 7.70301600283573900000000000E-11 " "
relative error = 7.557069696713453000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.946000000000006 " "
y[1] (analytic) = 1.0193318748256917 " "
y[1] (numeric) = 1.019331874744163 " "
absolute error = 8.1528561679533600000000000E-11 " "
relative error = 7.998235284604946000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.945000000000006 " "
y[1] (analytic) = 1.0193512163696774 " "
y[1] (numeric) = 1.0193512162834772 " "
absolute error = 8.62001581225513300000000000E-11 " "
relative error = 8.45637467619306000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.944000000000006 " "
y[1] (analytic) = 1.0193705772648813 " "
y[1] (numeric) = 1.0193705771738326 " "
absolute error = 9.10487241156943100000000000E-11 " "
relative error = 8.93185718190838900000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9430000000000063 " "
y[1] (analytic) = 1.0193899575306642 " "
y[1] (numeric) = 1.0193899574345866 " "
absolute error = 9.60775903280364200000000000E-11 " "
relative error = 9.42500851791512000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9420000000000064 " "
y[1] (analytic) = 1.019409357186406 " "
y[1] (numeric) = 1.0194093570851162 " "
absolute error = 1.01289865384046600000000000E-10 " "
relative error = 9.936132591877422000000000E-9 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9410000000000065 " "
y[1] (analytic) = 1.0194287762515066 " "
y[1] (numeric) = 1.0194287761448175 " "
absolute error = 1.06689101997403670000000000E-10 " "
relative error = 1.046557684880204500000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9400000000000066 " "
y[1] (analytic) = 1.0194482147453852 " "
y[1] (numeric) = 1.0194482146331063 " "
absolute error = 1.1227885288178640000000000E-10 " "
relative error = 1.101368870510297500000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9390000000000067 " "
y[1] (analytic) = 1.0194676726874803 " "
y[1] (numeric) = 1.0194676725694176 " "
absolute error = 1.18062670750873620000000000E-10 " "
relative error = 1.158081554853441200000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.938000000000007 " "
y[1] (analytic) = 1.0194871500972496 " "
y[1] (numeric) = 1.0194871499732059 " "
absolute error = 1.24043664229134270000000000E-10 " "
relative error = 1.216726117806405500000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.937000000000007 " "
y[1] (analytic) = 1.0195066469941705 " "
y[1] (numeric) = 1.019506646863945 " "
absolute error = 1.30225386030247140000000000E-10 " "
relative error = 1.277337292642406500000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.936000000000007 " "
y[1] (analytic) = 1.01952616339774 " "
y[1] (numeric) = 1.0195261632611288 " "
absolute error = 1.3661116682328610000000000E-10 " "
relative error = 1.339947631829346600000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.935000000000007 " "
y[1] (analytic) = 1.0195456993274745 " "
y[1] (numeric) = 1.0195456991842697 " "
absolute error = 1.43204781366534920000000000E-10 " "
relative error = 1.40459404086543120000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9340000000000073 " "
y[1] (analytic) = 1.0195652548029102 " "
y[1] (numeric) = 1.0195652546529006 " "
absolute error = 1.50009560329067430000000000E-10 " "
relative error = 1.471309066510563300000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9330000000000074 " "
y[1] (analytic) = 1.019584829843602 " "
y[1] (numeric) = 1.0195848296865733 " "
absolute error = 1.57028834379957520000000000E-10 " "
relative error = 1.54012525278592800000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9320000000000075 " "
y[1] (analytic) = 1.0196044244691256 " "
y[1] (numeric) = 1.0196044243048594 " "
absolute error = 1.64266156232884000000000000E-10 " "
relative error = 1.61107731872007080000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9310000000000076 " "
y[1] (analytic) = 1.0196240386990751 " "
y[1] (numeric) = 1.01962403852735 " "
absolute error = 1.71725078601525640000000000E-10 " "
relative error = 1.684199980422464200000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9300000000000077 " "
y[1] (analytic) = 1.019643672553065 " "
y[1] (numeric) = 1.019643672373656 " "
absolute error = 1.79409154199561270000000000E-10 " "
relative error = 1.759527951076696500000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.929000000000008 " "
y[1] (analytic) = 1.0196633260507293 " "
y[1] (numeric) = 1.0196633258634074 " "
absolute error = 1.8732193574066970000000000E-10 " "
relative error = 1.837095940933647400000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.928000000000008 " "
y[1] (analytic) = 1.0196829992117211 " "
y[1] (numeric) = 1.0196829990162546 " "
absolute error = 1.95466531849319840000000000E-10 " "
relative error = 1.91693430213534720000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.927000000000008 " "
y[1] (analytic) = 1.0197026920557137 " "
y[1] (numeric) = 1.019702691851867 " "
absolute error = 2.03846717283795440000000000E-10 " "
relative error = 1.999079916841661200000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.926000000000008 " "
y[1] (analytic) = 1.0197224046024 " "
y[1] (numeric) = 1.019722404389934 " "
absolute error = 2.1246604475777530000000000E-10 " "
relative error = 2.083567486590803500000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9250000000000083 " "
y[1] (analytic) = 1.0197421368714925 " "
y[1] (numeric) = 1.0197421366501647 " "
absolute error = 2.2132784494033330000000000E-10 " "
relative error = 2.170429532502734500000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9240000000000084 " "
y[1] (analytic) = 1.0197618888827238 " "
y[1] (numeric) = 1.0197618886522877 " "
absolute error = 2.3043611463435810000000000E-10 " "
relative error = 2.259705105147924000000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9230000000000085 " "
y[1] (analytic) = 1.0197816606558454 " "
y[1] (numeric) = 1.0197816604160517 " "
absolute error = 2.3979374041971369000000000E-10 " "
relative error = 2.35142236491580700000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9220000000000086 " "
y[1] (analytic) = 1.0198014522106293 " "
y[1] (numeric) = 1.0198014519612246 " "
absolute error = 2.49404719099288740000000000E-10 " "
relative error = 2.44562035638067300000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9210000000000087 " "
y[1] (analytic) = 1.019821263566867 " "
y[1] (numeric) = 1.0198212633075947 " "
absolute error = 2.59272381342157130000000000E-10 " "
relative error = 2.542331588923153500000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.920000000000009 " "
y[1] (analytic) = 1.0198410947443701 " "
y[1] (numeric) = 1.0198410944749696 " "
absolute error = 2.6940050190660260000000000E-10 " "
relative error = 2.641592923592960000000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.919000000000009 " "
y[1] (analytic) = 1.0198609457629695 " "
y[1] (numeric) = 1.019860945483177 " "
absolute error = 2.797924114616990000000000E-10 " "
relative error = 2.743436863859740000000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.918000000000009 " "
y[1] (analytic) = 1.0198808166425164 " "
y[1] (numeric) = 1.0198808163520645 " "
absolute error = 2.90451884765730030000000000E-10 " "
relative error = 2.847900264679042400000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.917000000000009 " "
y[1] (analytic) = 1.0199007074028814 " "
y[1] (numeric) = 1.0199007071014992 " "
absolute error = 3.0138225248776960000000000E-10 " "
relative error = 2.955015623581850300000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9160000000000093 " "
y[1] (analytic) = 1.0199206180639557 " "
y[1] (numeric) = 1.0199206177513682 " "
absolute error = 3.1258751143070640000000000E-10 " "
relative error = 3.064821966478817300000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9150000000000094 " "
y[1] (analytic) = 1.0199405486456496 " "
y[1] (numeric) = 1.0199405483215787 " "
absolute error = 3.24070992263614240000000000E-10 " "
relative error = 3.177351784806859400000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9140000000000095 " "
y[1] (analytic) = 1.0199604991678939 " "
y[1] (numeric) = 1.0199604988320576 " "
absolute error = 3.35836247700171950000000000E-10 " "
relative error = 3.29263974412886130000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9130000000000096 " "
y[1] (analytic) = 1.019980469650639 " "
y[1] (numeric) = 1.0199804693027519 " "
absolute error = 3.47887052498663250000000000E-10 " "
relative error = 3.41072268391394430000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9120000000000097 " "
y[1] (analytic) = 1.0200004601138553 " "
y[1] (numeric) = 1.0200004597536285 " "
absolute error = 3.602267373281620000000000E-10 " "
relative error = 3.53163308659637800000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.91100000000001 " "
y[1] (analytic) = 1.0200204705775333 " "
y[1] (numeric) = 1.0200204702046742 " "
absolute error = 3.72859076946952000000000000E-10 " "
relative error = 3.65540778545199200000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.91000000000001 " "
y[1] (analytic) = 1.0200405010616838 " "
y[1] (numeric) = 1.020040500675896 " "
absolute error = 3.85787846113316850000000000E-10 " "
relative error = 3.78208361052114300000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.90900000000001 " "
y[1] (analytic) = 1.020060551586337 " "
y[1] (numeric) = 1.0200605511873202 " "
absolute error = 3.99016819585540360000000000E-10 " "
relative error = 3.91169738860122900000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.90800000000001 " "
y[1] (analytic) = 1.0200806221715433 " "
y[1] (numeric) = 1.0200806217589942 " "
absolute error = 4.12549105988091470000000000E-10 " "
relative error = 4.04427941303167450000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9070000000000102 " "
y[1] (analytic) = 1.0201007128373736 " "
y[1] (numeric) = 1.0201007124109849 " "
absolute error = 4.2638870212385880000000000E-10 " "
relative error = 4.179868681180252700000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9060000000000104 " "
y[1] (analytic) = 1.0201208236039183 " "
y[1] (numeric) = 1.0201208231633792 " "
absolute error = 4.4053916070652120000000000E-10 " "
relative error = 4.31849983367822150000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9050000000000105 " "
y[1] (analytic) = 1.0201409544912883 " "
y[1] (numeric) = 1.0201409540362842 " "
absolute error = 4.55004034449757460000000000E-10 " "
relative error = 4.460207508056114300000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9040000000000106 " "
y[1] (analytic) = 1.0201611055196145 " "
y[1] (numeric) = 1.0201611050498272 " "
absolute error = 4.6978732015645620000000000E-10 " "
relative error = 4.605030691864812600000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.9030000000000107 " "
y[1] (analytic) = 1.020181276709048 " "
y[1] (numeric) = 1.0201812762241553 " "
absolute error = 4.8489257054029620000000000E-10 " "
relative error = 4.75300401615374800000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.902000000000011 " "
y[1] (analytic) = 1.0202014680797598 " "
y[1] (numeric) = 1.0202014675794364 " "
absolute error = 5.0032333831495630000000000E-10 " "
relative error = 4.9041621088496695000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.901000000000011 " "
y[1] (analytic) = 1.0202216796519412 " "
y[1] (numeric) = 1.0202216791358578 " "
absolute error = 5.1608339823872030000000000E-10 " "
relative error = 5.058541771184349000000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.900000000000011 " "
y[1] (analytic) = 1.0202419114458041 " "
y[1] (numeric) = 1.0202419109136276 " "
absolute error = 5.3217652506987180000000000E-10 " "
relative error = 5.216179801079868000000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.899000000000011 " "
y[1] (analytic) = 1.0202621634815803 " "
y[1] (numeric) = 1.020262162932974 " "
absolute error = 5.4860627152208960000000000E-10 " "
relative error = 5.37711081679247400000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8980000000000112 " "
y[1] (analytic) = 1.0202824357795213 " "
y[1] (numeric) = 1.020282435214145 " "
absolute error = 5.6537619030905260000000000E-10 " "
relative error = 5.54136943342645200000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8970000000000113 " "
y[1] (analytic) = 1.0203027283599 " "
y[1] (numeric) = 1.0203027277774095 " "
absolute error = 5.8249050027825430000000000E-10 " "
relative error = 5.708996791712857000000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8960000000000115 " "
y[1] (analytic) = 1.0203230412430087 " "
y[1] (numeric) = 1.0203230406430561 " "
absolute error = 5.9995253209876860000000000E-10 " "
relative error = 5.880025323821723000000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8950000000000116 " "
y[1] (analytic) = 1.0203433744491603 " "
y[1] (numeric) = 1.020343373831394 " "
absolute error = 6.1776628257348420000000000E-10 " "
relative error = 6.05449398744799700000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8940000000000117 " "
y[1] (analytic) = 1.0203637279986881 " "
y[1] (numeric) = 1.0203637273627528 " "
absolute error = 6.3593530441607980000000000E-10 " "
relative error = 6.23243738449410500000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.893000000000012 " "
y[1] (analytic) = 1.0203841019119457 " "
y[1] (numeric) = 1.0203841012574824 " "
absolute error = 6.5446337238483920000000000E-10 " "
relative error = 6.41389228976164800000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.892000000000012 " "
y[1] (analytic) = 1.0204044962093068 " "
y[1] (numeric) = 1.0204044955359526 " "
absolute error = 6.7335426123804610000000000E-10 " "
relative error = 6.59889547468170600000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.891000000000012 " "
y[1] (analytic) = 1.0204249109111658 " "
y[1] (numeric) = 1.020424910218554 " "
absolute error = 6.9261174573398420000000000E-10 " "
relative error = 6.78748370730710500000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.890000000000012 " "
y[1] (analytic) = 1.0204453460379375 " "
y[1] (numeric) = 1.0204453453256979 " "
absolute error = 7.1223960063093730000000000E-10 " "
relative error = 6.97969375230467300000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8890000000000122 " "
y[1] (analytic) = 1.0204658016100567 " "
y[1] (numeric) = 1.0204658008778154 " "
absolute error = 7.3224137864258410000000000E-10 " "
relative error = 7.1755601950332690000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8880000000000123 " "
y[1] (analytic) = 1.0204862776479795 " "
y[1] (numeric) = 1.0204862768953582 " "
absolute error = 7.5262129861641820000000000E-10 " "
relative error = 7.37512414523654900000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8870000000000124 " "
y[1] (analytic) = 1.0205067741721814 " "
y[1] (numeric) = 1.0205067733987987 " "
absolute error = 7.7338269122151360000000000E-10 " "
relative error = 7.57841800559206700000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8860000000000126 " "
y[1] (analytic) = 1.0205272912031593 " "
y[1] (numeric) = 1.0205272904086296 " "
absolute error = 7.9452977530536370000000000E-10 " "
relative error = 7.78548287884242800000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8850000000000127 " "
y[1] (analytic) = 1.0205478287614302 " "
y[1] (numeric) = 1.020547827945364 " "
absolute error = 8.1606632562625240000000000E-10 " "
relative error = 7.99635551247663500000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8840000000000128 " "
y[1] (analytic) = 1.0205683868675315 " "
y[1] (numeric) = 1.0205683860295356 " "
absolute error = 8.3799589489785830000000000E-10 " "
relative error = 8.21107047485519500000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.883000000000013 " "
y[1] (analytic) = 1.0205889655420215 " "
y[1] (numeric) = 1.020588964681699 " "
absolute error = 8.6032247992307020000000000E-10 " "
relative error = 8.42966668237652500000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.882000000000013 " "
y[1] (analytic) = 1.0206095648054785 " "
y[1] (numeric) = 1.0206095639224289 " "
absolute error = 8.8304963341556690000000000E-10 " "
relative error = 8.65217869659952100000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.881000000000013 " "
y[1] (analytic) = 1.0206301846785022 " "
y[1] (numeric) = 1.0206301837723206 " "
absolute error = 9.0618157422284180000000000E-10 " "
relative error = 8.87864760249363300000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.880000000000013 " "
y[1] (analytic) = 1.0206508251817124 " "
y[1] (numeric) = 1.0206508242519903 " "
absolute error = 9.2972207710317890000000000E-10 " "
relative error = 9.10911013017263000000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8790000000000133 " "
y[1] (analytic) = 1.0206714863357493 " "
y[1] (numeric) = 1.0206714853820746 " "
absolute error = 9.5367469477025680000000000E-10 " "
relative error = 9.34360083080194900000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8780000000000134 " "
y[1] (analytic) = 1.0206921681612742 " "
y[1] (numeric) = 1.0206921671832307 " "
absolute error = 9.7804342402696420000000000E-10 " "
relative error = 9.5821586031061690000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8770000000000135 " "
y[1] (analytic) = 1.0207128706789692 " "
y[1] (numeric) = 1.0207128696761367 " "
absolute error = 1.0028324837207947000000000E-9 " "
relative error = 9.82482451753272500000000E-8 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8760000000000137 " "
y[1] (analytic) = 1.0207335939095366 " "
y[1] (numeric) = 1.0207335928814913 " "
absolute error = 1.0280452045208222000000000E-9 " "
relative error = 1.00716309393059280000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8750000000000138 " "
y[1] (analytic) = 1.0207543378736994 " "
y[1] (numeric) = 1.0207543368200138 " "
absolute error = 1.0536855832299352000000000E-9 " "
relative error = 1.0322616756396391000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.874000000000014 " "
y[1] (analytic) = 1.020775102592202 " "
y[1] (numeric) = 1.0207751015124442 " "
absolute error = 1.0797578386956275000000000E-9 " "
relative error = 1.05778230283403470000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.873000000000014 " "
y[1] (analytic) = 1.0207958880858088 " "
y[1] (numeric) = 1.0207958869795435 " "
absolute error = 1.1062653015869728000000000E-9 " "
relative error = 1.08372821099567290000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.872000000000014 " "
y[1] (analytic) = 1.0208166943753056 " "
y[1] (numeric) = 1.020816693242093 " "
absolute error = 1.1332126348406746000000000E-9 " "
relative error = 1.11010394038877890000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.871000000000014 " "
y[1] (analytic) = 1.0208375214814984 " "
y[1] (numeric) = 1.0208375203208953 " "
absolute error = 1.1606031691258067000000000E-9 " "
relative error = 1.13691272577978160000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8700000000000143 " "
y[1] (analytic) = 1.0208583694252145 " "
y[1] (numeric) = 1.0208583682367736 " "
absolute error = 1.188440901245257900000000E-9 " "
relative error = 1.16415845413933310000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8690000000000144 " "
y[1] (analytic) = 1.0208792382273015 " "
y[1] (numeric) = 1.0208792370105717 " "
absolute error = 1.2167298280019168000000000E-9 " "
relative error = 1.19184501206499070000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8680000000000145 " "
y[1] (analytic) = 1.0209001279086287 " "
y[1] (numeric) = 1.0209001266631548 " "
absolute error = 1.245473946198671900000000E-9 " "
relative error = 1.21997628578036840000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8670000000000146 " "
y[1] (analytic) = 1.0209210384900855 " "
y[1] (numeric) = 1.0209210372154085 " "
absolute error = 1.274677030593807000000000E-9 " "
relative error = 1.2485559436398920000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8660000000000148 " "
y[1] (analytic) = 1.0209419699925826 " "
y[1] (numeric) = 1.0209419686882393 " "
absolute error = 1.304343300034816000000000E-9 " "
relative error = 1.27758808862005390000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.865000000000015 " "
y[1] (analytic) = 1.0209629224370513 " "
y[1] (numeric) = 1.0209629211025748 " "
absolute error = 1.334476529279982000000000E-9 " "
relative error = 1.30707638833207570000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.864000000000015 " "
y[1] (analytic) = 1.0209838958444444 " "
y[1] (numeric) = 1.0209838944793637 " "
absolute error = 1.3650807151321942000000000E-9 " "
relative error = 1.3370247275087050000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.863000000000015 " "
y[1] (analytic) = 1.021004890235735 " "
y[1] (numeric) = 1.0210048888395753 " "
absolute error = 1.396159632349736000000000E-9 " "
relative error = 1.3674367730279760000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.862000000000015 " "
y[1] (analytic) = 1.0210259056319175 " "
y[1] (numeric) = 1.0210259042042 " "
absolute error = 1.4277174997801012000000000E-9 " "
relative error = 1.39831662635090600000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8610000000000153 " "
y[1] (analytic) = 1.0210469420540074 " "
y[1] (numeric) = 1.0210469405942493 " "
absolute error = 1.4597580921815734000000000E-9 " "
relative error = 1.42966795360556560000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8600000000000154 " "
y[1] (analytic) = 1.0210679995230412 " "
y[1] (numeric) = 1.0210679980307555 " "
absolute error = 1.4922856284016460000000000E-9 " "
relative error = 1.4614948554833948000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8590000000000155 " "
y[1] (analytic) = 1.021089078060076 " "
y[1] (numeric) = 1.0210890765347722 " "
absolute error = 1.5253038831986032000000000E-9 " "
relative error = 1.4938009973590780000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8580000000000156 " "
y[1] (analytic) = 1.0211101776861908 " "
y[1] (numeric) = 1.0211101761273738 " "
absolute error = 1.5588170754199382000000000E-9 " "
relative error = 1.5265904791510132000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8570000000000157 " "
y[1] (analytic) = 1.0211312984224852 " "
y[1] (numeric) = 1.021131296829656 " "
absolute error = 1.5928292018685397000000000E-9 " "
relative error = 1.55986718292667470000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.856000000000016 " "
y[1] (analytic) = 1.0211524402900798 " "
y[1] (numeric) = 1.0211524386627355 " "
absolute error = 1.6273442593472964000000000E-9 " "
relative error = 1.59363499036932730000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.855000000000016 " "
y[1] (analytic) = 1.0211736033101162 " "
y[1] (numeric) = 1.0211736016477502 " "
absolute error = 1.662366022614492000000000E-9 " "
relative error = 1.6278975653365518000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.854000000000016 " "
y[1] (analytic) = 1.0211947875037577 " "
y[1] (numeric) = 1.021194785805859 " "
absolute error = 1.6978987105176202000000000E-9 " "
relative error = 1.66265900619020970000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.853000000000016 " "
y[1] (analytic) = 1.0212159928921887 " "
y[1] (numeric) = 1.0212159911582421 " "
absolute error = 1.7339465419041744000000000E-9 " "
relative error = 1.69792341088730840000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8520000000000163 " "
y[1] (analytic) = 1.0212372194966142 " "
y[1] (numeric) = 1.0212372177261009 " "
absolute error = 1.7705132915324384000000000E-9 " "
relative error = 1.73369444212497030000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8510000000000164 " "
y[1] (analytic) = 1.021258467338261 " "
y[1] (numeric) = 1.0212584655306578 " "
absolute error = 1.8076031782499058000000000E-9 " "
relative error = 1.76997619707488980000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8500000000000165 " "
y[1] (analytic) = 1.0212797364383768 " "
y[1] (numeric) = 1.0212797345931568 " "
absolute error = 1.8452199768148603000000000E-9 " "
relative error = 1.8067723376651950000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8490000000000166 " "
y[1] (analytic) = 1.021301026818231 " "
y[1] (numeric) = 1.0213010249348626 " "
absolute error = 1.8833683501640053000000000E-9 " "
relative error = 1.8440873951056970000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8480000000000167 " "
y[1] (analytic) = 1.0213223384991137 " "
y[1] (numeric) = 1.0213223365770618 " "
absolute error = 1.9220518510110196000000000E-9 " "
relative error = 1.88192481311588170000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.847000000000017 " "
y[1] (analytic) = 1.0213436715023365 " "
y[1] (numeric) = 1.021343669541062 " "
absolute error = 1.961274476158792000000000E-9 " "
relative error = 1.92028846986820070000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.846000000000017 " "
y[1] (analytic) = 1.0213650258492328 " "
y[1] (numeric) = 1.021365023848192 " "
absolute error = 2.0010408885440256000000000E-9 " "
relative error = 1.9591828953416760000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.845000000000017 " "
y[1] (analytic) = 1.0213864015611567 " "
y[1] (numeric) = 1.0213863995198018 " "
absolute error = 2.0413548629250045000000000E-9 " "
relative error = 1.99861174948565800000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.844000000000017 " "
y[1] (analytic) = 1.021407798659484 " "
y[1] (numeric) = 1.0214077965772634 " "
absolute error = 2.082220618149222000000000E-9 " "
relative error = 2.03857912665437820000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8430000000000173 " "
y[1] (analytic) = 1.0214292171656116 " "
y[1] (numeric) = 1.0214292150419697 " "
absolute error = 2.123641928974962000000000E-9 " "
relative error = 2.0790886860157640000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8420000000000174 " "
y[1] (analytic) = 1.0214506571009583 " "
y[1] (numeric) = 1.021450654935335 " "
absolute error = 2.165623236294322900000000E-9 " "
relative error = 2.1201447385042668000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8410000000000175 " "
y[1] (analytic) = 1.0214721184869637 " "
y[1] (numeric) = 1.0214721162787952 " "
absolute error = 2.2081685369101933000000000E-9 " "
relative error = 2.16175115986621480000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8400000000000176 " "
y[1] (analytic) = 1.0214936013450895 " "
y[1] (numeric) = 1.0214935990938072 " "
absolute error = 2.251282271714672000000000E-9 " "
relative error = 2.20391226019449630000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8390000000000177 " "
y[1] (analytic) = 1.0215151056968184 " "
y[1] (numeric) = 1.0215151034018501 " "
absolute error = 2.2949682154660422000000000E-9 " "
relative error = 2.24663169704235360000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.838000000000018 " "
y[1] (analytic) = 1.021536631563655 " "
y[1] (numeric) = 1.021536629224424 " "
absolute error = 2.339231031101007800000000E-9 " "
relative error = 2.2899139970344210000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.837000000000018 " "
y[1] (analytic) = 1.0215581789671246 " "
y[1] (numeric) = 1.0215581765830504 " "
absolute error = 2.3840742713332475000000000E-9 " "
relative error = 2.33376259954546440000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.836000000000018 " "
y[1] (analytic) = 1.0215797479287752 " "
y[1] (numeric) = 1.0215797454992728 " "
absolute error = 2.4295023770548596000000000E-9 " "
relative error = 2.378181813001490000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.835000000000018 " "
y[1] (analytic) = 1.0216013384701754 " "
y[1] (numeric) = 1.0216013359946559 " "
absolute error = 2.475519567113338000000000E-9 " "
relative error = 2.42317572803924850000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8340000000000183 " "
y[1] (analytic) = 1.021622950612916 " "
y[1] (numeric) = 1.021622948090786 " "
absolute error = 2.522130060356176000000000E-9 " "
relative error = 2.4687484348731990000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8330000000000184 " "
y[1] (analytic) = 1.0216445843786088 " "
y[1] (numeric) = 1.021644581809271 " "
absolute error = 2.569337853586262000000000E-9 " "
relative error = 2.5149038059542020000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8320000000000185 " "
y[1] (analytic) = 1.021666239788888 " "
y[1] (numeric) = 1.0216662371717407 " "
absolute error = 2.6171473876956950000000000E-9 " "
relative error = 2.56164614799887060000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8310000000000186 " "
y[1] (analytic) = 1.0216879168654087 " "
y[1] (numeric) = 1.021687914199846 " "
absolute error = 2.665562659487364000000000E-9 " "
relative error = 2.6089793326179760000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8300000000000187 " "
y[1] (analytic) = 1.0217096156298482 " "
y[1] (numeric) = 1.02170961291526 " "
absolute error = 2.7145881098533664000000000E-9 " "
relative error = 2.6569076656677230000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.829000000000019 " "
y[1] (analytic) = 1.021731336103905 " "
y[1] (numeric) = 1.0217313333396774 " "
absolute error = 2.7642277355965916000000000E-9 " "
relative error = 2.7054350179150060000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.828000000000019 " "
y[1] (analytic) = 1.0217530783092998 " "
y[1] (numeric) = 1.0217530754948139 " "
absolute error = 2.814485977609138000000000E-9 " "
relative error = 2.75456569435179270000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.827000000000019 " "
y[1] (analytic) = 1.0217748422677746 " "
y[1] (numeric) = 1.0217748394024078 " "
absolute error = 2.865366832693894000000000E-9 " "
relative error = 2.8043035648972975000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.826000000000019 " "
y[1] (analytic) = 1.0217966280010935 " "
y[1] (numeric) = 1.0217966250842188 " "
absolute error = 2.9168747417429586000000000E-9 " "
relative error = 2.85465293367540560000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8250000000000193 " "
y[1] (analytic) = 1.0218184355310425 " "
y[1] (numeric) = 1.0218184325620283 " "
absolute error = 2.96901414564843000000000E-9 " "
relative error = 2.9056181043606080000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8240000000000194 " "
y[1] (analytic) = 1.0218402648794285 " "
y[1] (numeric) = 1.0218402618576397 " "
absolute error = 3.0217888191685915000000000E-9 " "
relative error = 2.9572027282807706000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8230000000000195 " "
y[1] (analytic) = 1.0218621160680812 " "
y[1] (numeric) = 1.0218621129928778 " "
absolute error = 3.0752034252401470000000000E-9 " "
relative error = 3.00941132554449540000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8220000000000196 " "
y[1] (analytic) = 1.021883989118852 " "
y[1] (numeric) = 1.0218839859895898 " "
absolute error = 3.1292621827105904000000000E-9 " "
relative error = 3.06224798121055240000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8210000000000197 " "
y[1] (analytic) = 1.0219058840536137 " "
y[1] (numeric) = 1.0219058808696444 " "
absolute error = 3.1839693104274147000000000E-9 " "
relative error = 3.11571677990296170000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.82000000000002 " "
y[1] (analytic) = 1.0219278008942612 " "
y[1] (numeric) = 1.0219277976549321 " "
absolute error = 3.2393290272381137000000000E-9 " "
relative error = 3.1698218058100240000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.81900000000002 " "
y[1] (analytic) = 1.0219497396627115 " "
y[1] (numeric) = 1.0219497363673655 " "
absolute error = 3.2953459960793907000000000E-9 " "
relative error = 3.2245675772342780000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.81800000000002 " "
y[1] (analytic) = 1.0219717003809032 " "
y[1] (numeric) = 1.0219716970288792 " "
absolute error = 3.3520239917095296000000000E-9 " "
relative error = 3.2799577429200660000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.81700000000002 " "
y[1] (analytic) = 1.0219936830707972 " "
y[1] (numeric) = 1.0219936796614295 " "
absolute error = 3.4093676770652337000000000E-9 " "
relative error = 3.33599682027491960000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8160000000000203 " "
y[1] (analytic) = 1.022015687754376 " "
y[1] (numeric) = 1.0220156842869947 " "
absolute error = 3.4673812709939966000000000E-9 " "
relative error = 3.3926888917064474000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8150000000000204 " "
y[1] (analytic) = 1.0220377144536446 " "
y[1] (numeric) = 1.0220377109275751 " "
absolute error = 3.526069436432522000000000E-9 " "
relative error = 3.45003847369514060000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8140000000000205 " "
y[1] (analytic) = 1.0220597631906292 " "
y[1] (numeric) = 1.0220597596051932 " "
absolute error = 3.585435948139093000000000E-9 " "
relative error = 3.5080492132340760000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8130000000000206 " "
y[1] (analytic) = 1.022081833987379 " "
y[1] (numeric) = 1.0220818303418933 " "
absolute error = 3.6454856910950184000000000E-9 " "
relative error = 3.56672584314812750000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8120000000000207 " "
y[1] (analytic) = 1.0221039268659646 " "
y[1] (numeric) = 1.0221039231597417 " "
absolute error = 3.7062228841477920000000000E-9 " "
relative error = 3.62607244403417100000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.811000000000021 " "
y[1] (analytic) = 1.0221260418484788 " "
y[1] (numeric) = 1.0221260380808272 " "
absolute error = 3.767651524100301700000000E-9 " "
relative error = 3.68609287880645060000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.810000000000021 " "
y[1] (analytic) = 1.0221481789570368 " "
y[1] (numeric) = 1.0221481751272603 " "
absolute error = 3.8297764959338565000000000E-9 " "
relative error = 3.7467918788855280000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.809000000000021 " "
y[1] (analytic) = 1.0221703382137757 " "
y[1] (numeric) = 1.0221703343211737 " "
absolute error = 3.89260201849595000000000E-9 " "
relative error = 3.80817352350313940000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.808000000000021 " "
y[1] (analytic) = 1.0221925196408546 " "
y[1] (numeric) = 1.0221925156847222 " "
absolute error = 3.956132310634075000000000E-9 " "
relative error = 3.87024189144336060000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8070000000000213 " "
y[1] (analytic) = 1.0222147232604548 " "
y[1] (numeric) = 1.022214719240083 " "
absolute error = 4.020371813240331000000000E-9 " "
relative error = 3.93300127826075300000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8060000000000214 " "
y[1] (analytic) = 1.0222369490947802 " "
y[1] (numeric) = 1.0222369450094553 " "
absolute error = 4.085324967206816000000000E-9 " "
relative error = 3.9964559790413434000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8050000000000215 " "
y[1] (analytic) = 1.0222591971660568 " "
y[1] (numeric) = 1.0222591930150602 " "
absolute error = 4.150996657514838000000000E-9 " "
relative error = 4.06061072282096150000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8040000000000216 " "
y[1] (analytic) = 1.0222814674965321 " "
y[1] (numeric) = 1.0222814632791417 " "
absolute error = 4.217390436878077000000000E-9 " "
relative error = 4.12546893489721100000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.8030000000000217 " "
y[1] (analytic) = 1.022303760108477 " "
y[1] (numeric) = 1.0223037558239656 " "
absolute error = 4.284511412322445000000000E-9 " "
relative error = 4.1910355605733207000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.802000000000022 " "
y[1] (analytic) = 1.0223260750241836 " "
y[1] (numeric) = 1.02232607067182 " "
absolute error = 4.352363580650831000000000E-9 " "
relative error = 4.25731445864556860000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.801000000000022 " "
y[1] (analytic) = 1.0223484122659674 " "
y[1] (numeric) = 1.0223484078450154 " "
absolute error = 4.4209520488891485000000000E-9 " "
relative error = 4.32431057342809570000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.800000000000022 " "
y[1] (analytic) = 1.0223707718561652 " "
y[1] (numeric) = 1.0223707673658846 " "
absolute error = 4.490280591795681000000000E-9 " "
relative error = 4.39202754558735300000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.799000000000022 " "
y[1] (analytic) = 1.0223931538171367 " "
y[1] (numeric) = 1.0223931492567826 " "
absolute error = 4.560354094351737300000000E-9 " "
relative error = 4.46047010127710000000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7980000000000222 " "
y[1] (analytic) = 1.0224155581712637 " "
y[1] (numeric) = 1.0224155535400872 " "
absolute error = 4.631176553360205600000000E-9 " "
relative error = 4.52964209743025260000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7970000000000224 " "
y[1] (analytic) = 1.022437984940951 " "
y[1] (numeric) = 1.022437980238198 " "
absolute error = 4.702753075846999300000000E-9 " "
relative error = 4.5995484763983980000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7960000000000225 " "
y[1] (analytic) = 1.022460434148625 " "
y[1] (numeric) = 1.0224604293735373 " "
absolute error = 4.775087658615007000000000E-9 " "
relative error = 4.67019309416221330000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7950000000000226 " "
y[1] (analytic) = 1.022482905816735 " "
y[1] (numeric) = 1.0224829009685499 " "
absolute error = 4.848185186645537000000000E-9 " "
relative error = 4.74158067490910500000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7940000000000227 " "
y[1] (analytic) = 1.0225053999677527 " "
y[1] (numeric) = 1.0225053950457028 " "
absolute error = 4.922049878786083400000000E-9 " "
relative error = 4.8137152908349556000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.793000000000023 " "
y[1] (analytic) = 1.0225279166241723 " "
y[1] (numeric) = 1.022527911627486 " "
absolute error = 4.996686397973349000000000E-9 " "
relative error = 4.8866014479777464000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.792000000000023 " "
y[1] (analytic) = 1.0225504558085103 " "
y[1] (numeric) = 1.0225504507364112 " "
absolute error = 5.072099185099432000000000E-9 " "
relative error = 4.9602434347252083000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.791000000000023 " "
y[1] (analytic) = 1.022573017543306 " "
y[1] (numeric) = 1.0225730123950132 " "
absolute error = 5.148292903101037000000000E-9 " "
relative error = 5.0346457561237250000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.790000000000023 " "
y[1] (analytic) = 1.0225956018511213 " "
y[1] (numeric) = 1.0225955966258493 " "
absolute error = 5.225271992870262000000000E-9 " "
relative error = 5.109812699576820000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7890000000000232 " "
y[1] (analytic) = 1.0226182087545403 " "
y[1] (numeric) = 1.0226182034514992 " "
absolute error = 5.30304111734381000000000E-9 " "
relative error = 5.1857487691349160000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7880000000000233 " "
y[1] (analytic) = 1.0226408382761698 " "
y[1] (numeric) = 1.0226408328945653 " "
absolute error = 5.381604495369174000000000E-9 " "
relative error = 5.2624580340843410000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7870000000000235 " "
y[1] (analytic) = 1.0226634904386396 " "
y[1] (numeric) = 1.0226634849776723 " "
absolute error = 5.460967233972269000000000E-9 " "
relative error = 5.3399454317372350000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7860000000000236 " "
y[1] (analytic) = 1.0226861652646015 " "
y[1] (numeric) = 1.0226861597234682 " "
absolute error = 5.541133329955983000000000E-9 " "
relative error = 5.4182148132631820000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7850000000000237 " "
y[1] (analytic) = 1.022708862776731 " "
y[1] (numeric) = 1.022708857154623 " "
absolute error = 5.6221078903462280000000000E-9 " "
relative error = 5.4972711149503350000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.784000000000024 " "
y[1] (analytic) = 1.0227315829977246 " "
y[1] (numeric) = 1.0227315772938295 " "
absolute error = 5.7038951339905000000000E-9 " "
relative error = 5.5771184040995740000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.783000000000024 " "
y[1] (analytic) = 1.0227543259503034 " "
y[1] (numeric) = 1.0227543201638034 " "
absolute error = 5.786499945870105000000000E-9 " "
relative error = 5.6577613988515920000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.782000000000024 " "
y[1] (analytic) = 1.02277709165721 " "
y[1] (numeric) = 1.0227770857872833 " "
absolute error = 5.869926766877143000000000E-9 " "
relative error = 5.7392043826148620000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.781000000000024 " "
y[1] (analytic) = 1.0227998801412101 " "
y[1] (numeric) = 1.0227998741870301 " "
absolute error = 5.954180037903711000000000E-9 " "
relative error = 5.8214516383025620000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7800000000000242 " "
y[1] (analytic) = 1.0228226914250924 " "
y[1] (numeric) = 1.0228226853858275 " "
absolute error = 6.039264865975724000000000E-9 " "
relative error = 5.9045080996015590000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7790000000000243 " "
y[1] (analytic) = 1.022845525531668 " "
y[1] (numeric) = 1.0228455194064825 " "
absolute error = 6.125185469940675000000000E-9 " "
relative error = 5.9883778313023830000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7780000000000244 " "
y[1] (analytic) = 1.022868382483771 " "
y[1] (numeric) = 1.0228683762718243 " "
absolute error = 6.211946734779872000000000E-9 " "
relative error = 6.0730655489573040000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7770000000000246 " "
y[1] (analytic) = 1.0228912623042583 " "
y[1] (numeric) = 1.0228912560047052 " "
absolute error = 6.299553101385413000000000E-9 " "
relative error = 6.15857553342910000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7760000000000247 " "
y[1] (analytic) = 1.0229141650160098 " "
y[1] (numeric) = 1.0229141586280006 " "
absolute error = 6.388009232694003000000000E-9 " "
relative error = 6.2449122821503030000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.775000000000025 " "
y[1] (analytic) = 1.0229370906419284 " "
y[1] (numeric) = 1.0229370841646084 " "
absolute error = 6.477320013686949000000000E-9 " "
relative error = 6.3320805090977850000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.774000000000025 " "
y[1] (analytic) = 1.0229600392049394 " "
y[1] (numeric) = 1.0229600326374495 " "
absolute error = 6.56748988525635000000000E-9 " "
relative error = 6.4200844935846240000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.773000000000025 " "
y[1] (analytic) = 1.0229830107279916 " "
y[1] (numeric) = 1.0229830040694678 " "
absolute error = 6.6585237323835140000000000E-9 " "
relative error = 6.5089289485316760000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.772000000000025 " "
y[1] (analytic) = 1.0230060052340564 " "
y[1] (numeric) = 1.0230059984836304 " "
absolute error = 6.750425995960541000000000E-9 " "
relative error = 6.5986181522131850000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.771000000000025 " "
y[1] (analytic) = 1.0230290227461283 " "
y[1] (numeric) = 1.0230290159029267 " "
absolute error = 6.843201560968737000000000E-9 " "
relative error = 6.6891568164893840000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7700000000000253 " "
y[1] (analytic) = 1.023052063287225 " "
y[1] (numeric) = 1.0230520563503698 " "
absolute error = 6.936855312389412000000000E-9 " "
relative error = 6.7805496526738030000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7690000000000254 " "
y[1] (analytic) = 1.0230751268803868 " "
y[1] (numeric) = 1.0230751198489954 " "
absolute error = 7.0313914690700590000000000E-9 " "
relative error = 6.8728007204226900000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7680000000000256 " "
y[1] (analytic) = 1.0230982135486775 " "
y[1] (numeric) = 1.023098206421862 " "
absolute error = 7.126815360081196000000000E-9 " "
relative error = 6.9659151640597730000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7670000000000257 " "
y[1] (analytic) = 1.0231213233151837 " "
y[1] (numeric) = 1.0231213160920523 " "
absolute error = 7.2231314263149220000000000E-9 " "
relative error = 7.0598972592126860000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7660000000000258 " "
y[1] (analytic) = 1.023144456203015 " "
y[1] (numeric) = 1.0231444488826706 " "
absolute error = 7.32034433070794000000000E-9 " "
relative error = 7.1547514980185920000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.765000000000026 " "
y[1] (analytic) = 1.0231676122353044 " "
y[1] (numeric) = 1.0231676048168457 " "
absolute error = 7.418458736196953000000000E-9 " "
relative error = 7.2504823720816560000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.764000000000026 " "
y[1] (analytic) = 1.023190791435208 " "
y[1] (numeric) = 1.0231907839177283 " "
absolute error = 7.517479749807876000000000E-9 " "
relative error = 7.3470948064957330000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.763000000000026 " "
y[1] (analytic) = 1.023213993825905 " "
y[1] (numeric) = 1.0232139862084932 " "
absolute error = 7.617411812432806000000000E-9 " "
relative error = 7.4445930747589750000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.762000000000026 " "
y[1] (analytic) = 1.0232372194305979 " "
y[1] (numeric) = 1.0232372117123378 " "
absolute error = 7.718260031097657000000000E-9 " "
relative error = 7.5429821008589260000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7610000000000263 " "
y[1] (analytic) = 1.023260468272512 " "
y[1] (numeric) = 1.023260460452483 " "
absolute error = 7.820028846694527000000000E-9 " "
relative error = 7.6422661572145460000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7600000000000264 " "
y[1] (analytic) = 1.0232837403748964 " "
y[1] (numeric) = 1.0232837324521729 " "
absolute error = 7.922723588293934000000000E-9 " "
relative error = 7.7424503836944750000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7590000000000265 " "
y[1] (analytic) = 1.023307035761023 " "
y[1] (numeric) = 1.0233070277346745 " "
absolute error = 8.026348474743372000000000E-9 " "
relative error = 7.843538834631640000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7580000000000267 " "
y[1] (analytic) = 1.0233303544541874 " "
y[1] (numeric) = 1.0233303463232788 " "
absolute error = 8.130908613068755000000000E-9 " "
relative error = 7.9455364317865160000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7570000000000268 " "
y[1] (analytic) = 1.0233536964777081 " "
y[1] (numeric) = 1.0233536882412995 " "
absolute error = 8.236408666206785000000000E-9 " "
relative error = 8.0484476623827770000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.756000000000027 " "
y[1] (analytic) = 1.0233770618549274 " "
y[1] (numeric) = 1.0233770535120736 " "
absolute error = 8.342853741183376000000000E-9 " "
relative error = 8.152277447045270000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.755000000000027 " "
y[1] (analytic) = 1.0234004506092105 " "
y[1] (numeric) = 1.023400442158962 " "
absolute error = 8.450248500935231000000000E-9 " "
relative error = 8.2570302718793620000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.754000000000027 " "
y[1] (analytic) = 1.023423862763946 " "
y[1] (numeric) = 1.0234238542053484 " "
absolute error = 8.558597608399054000000000E-9 " "
relative error = 8.3627106224443250000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.753000000000027 " "
y[1] (analytic) = 1.0234472983425462 " "
y[1] (numeric) = 1.02344728967464 " "
absolute error = 8.667906170600759000000000E-9 " "
relative error = 8.4693234176672030000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7520000000000273 " "
y[1] (analytic) = 1.0234707573684467 " "
y[1] (numeric) = 1.0234707485902679 " "
absolute error = 8.778178850477047000000000E-9 " "
relative error = 8.5768731419816480000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7510000000000274 " "
y[1] (analytic) = 1.0234942398651068 " "
y[1] (numeric) = 1.0234942309756858 " "
absolute error = 8.889420977098439000000000E-9 " "
relative error = 8.6853649301143450000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7500000000000275 " "
y[1] (analytic) = 1.0235177458560085 " "
y[1] (numeric) = 1.0235177368543715 " "
absolute error = 9.001636991357032000000000E-9 " "
relative error = 8.7948030484108560000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7490000000000276 " "
y[1] (analytic) = 1.023541275364658 " "
y[1] (numeric) = 1.0235412662498262 " "
absolute error = 9.114831778234134000000000E-9 " "
relative error = 8.9051921965597180000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7480000000000278 " "
y[1] (analytic) = 1.0235648284145848 " "
y[1] (numeric) = 1.0235648191855744 " "
absolute error = 9.229010444755659000000000E-9 " "
relative error = 9.0165372906087580000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.747000000000028 " "
y[1] (analytic) = 1.023588405029342 " "
y[1] (numeric) = 1.0235883956851644 " "
absolute error = 9.34417765385831000000000E-9 " "
relative error = 9.1288428121559770000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.746000000000028 " "
y[1] (analytic) = 1.0236120052325064 " "
y[1] (numeric) = 1.0236119957721677 " "
absolute error = 9.460338734612606000000000E-9 " "
relative error = 9.24211389301140000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.745000000000028 " "
y[1] (analytic) = 1.0236356290476778 " "
y[1] (numeric) = 1.0236356194701794 " "
absolute error = 9.577498349955249000000000E-9 " "
relative error = 9.3563550136150630000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.744000000000028 " "
y[1] (analytic) = 1.0236592764984802 " "
y[1] (numeric) = 1.0236592668028188 " "
absolute error = 9.695661384867549000000000E-9 " "
relative error = 9.4715708707612570000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7430000000000283 " "
y[1] (analytic) = 1.0236829476085612 " "
y[1] (numeric) = 1.0236829377937282 " "
absolute error = 9.814832946375418000000000E-9 " "
relative error = 9.587766377572251000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7420000000000284 " "
y[1] (analytic) = 1.0237066424015917 " "
y[1] (numeric) = 1.0237066324665738 " "
absolute error = 9.935017919460165000000000E-9 " "
relative error = 9.7049462296667790000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7410000000000285 " "
y[1] (analytic) = 1.0237303609012665 " "
y[1] (numeric) = 1.0237303508450453 " "
absolute error = 1.005622118910309800000000E-8 " "
relative error = 9.8231151220814170000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7400000000000286 " "
y[1] (analytic) = 1.0237541031313042 " "
y[1] (numeric) = 1.0237540929528564 " "
absolute error = 1.017844786233013100000000E-8 " "
relative error = 9.942277966161830000000E-7 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7390000000000287 " "
y[1] (analytic) = 1.023777869115447 " "
y[1] (numeric) = 1.0237778588137443 " "
absolute error = 1.030170282412257200000000E-8 " "
relative error = 1.0062439455761366000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.738000000000029 " "
y[1] (analytic) = 1.0238016588774612 " "
y[1] (numeric) = 1.02380164845147 " "
absolute error = 1.042599118150633300000000E-8 " "
relative error = 1.0183604501029841000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.737000000000029 " "
y[1] (analytic) = 1.023825472441136 " "
y[1] (numeric) = 1.0238254618898182 " "
absolute error = 1.055131781946272400000000E-8 " "
relative error = 1.0305777794632243000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.736000000000029 " "
y[1] (analytic) = 1.0238493098302852 " "
y[1] (numeric) = 1.0238492991525976 " "
absolute error = 1.067768762297305300000000E-8 " "
relative error = 1.0428964028644999000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.735000000000029 " "
y[1] (analytic) = 1.0238731710687463 " "
y[1] (numeric) = 1.0238731602636404 " "
absolute error = 1.080510592110783800000000E-8 " "
relative error = 1.0553168328289311000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7340000000000293 " "
y[1] (analytic) = 1.0238970561803804 " "
y[1] (numeric) = 1.0238970452468028 " "
absolute error = 1.093357759884838700000000E-8 " "
relative error = 1.067839538443034000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7330000000000294 " "
y[1] (analytic) = 1.0239209651890728 " "
y[1] (numeric) = 1.023920954125965 " "
absolute error = 1.106310776322061400000000E-8 " "
relative error = 1.0804650104197983000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7320000000000295 " "
y[1] (analytic) = 1.0239448981187322 " "
y[1] (numeric) = 1.0239448869250312 " "
absolute error = 1.119370107716122200000000E-8 " "
relative error = 1.0931936960403946000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7310000000000296 " "
y[1] (analytic) = 1.023968854993292 " "
y[1] (numeric) = 1.0239688436679288 " "
absolute error = 1.132536309178533400000000E-8 " "
relative error = 1.1060261292673328000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7300000000000297 " "
y[1] (analytic) = 1.0239928358367085 " "
y[1] (numeric) = 1.0239928243786098 " "
absolute error = 1.145809869207425900000000E-8 " "
relative error = 1.1189627789448157000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.72900000000003 " "
y[1] (analytic) = 1.0240168406729628 " "
y[1] (numeric) = 1.02401682908105 " "
absolute error = 1.159191276300930400000000E-8 " "
relative error = 1.1320041138572816000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.72800000000003 " "
y[1] (analytic) = 1.02404086952606 " "
y[1] (numeric) = 1.0240408577992492 " "
absolute error = 1.172681085570559400000000E-8 " "
relative error = 1.1451506677788084000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.72700000000003 " "
y[1] (analytic) = 1.0240649224200287 " "
y[1] (numeric) = 1.0240649105572313 " "
absolute error = 1.186279741105522600000000E-8 " "
relative error = 1.1584028660039976000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.72600000000003 " "
y[1] (analytic) = 1.0240889993789217 " "
y[1] (numeric) = 1.0240889873790437 " "
absolute error = 1.199987798017332400000000E-8 " "
relative error = 1.1717612421821617000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7250000000000303 " "
y[1] (analytic) = 1.024113100426816 " "
y[1] (numeric) = 1.0241130882887586 " "
absolute error = 1.213805744804119500000000E-8 " "
relative error = 1.185226264851261000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7240000000000304 " "
y[1] (analytic) = 1.024137225587813 " "
y[1] (numeric) = 1.0241372133104718 " "
absolute error = 1.227734114372935900000000E-8 " "
relative error = 1.198798445851108000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7230000000000305 " "
y[1] (analytic) = 1.0241613748860374 " "
y[1] (numeric) = 1.0241613624683035 " "
absolute error = 1.241773395221912300000000E-8 " "
relative error = 1.2124782535956206000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7220000000000306 " "
y[1] (analytic) = 1.0241855483456388 " "
y[1] (numeric) = 1.0241855357863976 " "
absolute error = 1.255924120258100600000000E-8 " "
relative error = 1.226266199798257100000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7210000000000307 " "
y[1] (analytic) = 1.0242097459907906 " "
y[1] (numeric) = 1.0242097332889224 " "
absolute error = 1.270186822388552600000000E-8 " "
relative error = 1.24016279610756000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.720000000000031 " "
y[1] (analytic) = 1.0242339678456904 " "
y[1] (numeric) = 1.0242339550000705 " "
absolute error = 1.284561990111399200000000E-8 " "
relative error = 1.2541685107488343000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.719000000000031 " "
y[1] (analytic) = 1.02425821393456 " "
y[1] (numeric) = 1.0242582009440588 " "
absolute error = 1.29905011192477100000000E-8 " "
relative error = 1.2682838118862944000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.718000000000031 " "
y[1] (analytic) = 1.0242824842816456 " "
y[1] (numeric) = 1.024282471145128 " "
absolute error = 1.313651765144641000000000E-8 " "
relative error = 1.282509254335182000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.717000000000031 " "
y[1] (analytic) = 1.0243067789112175 " "
y[1] (numeric) = 1.0243067656275433 " "
absolute error = 1.328367416064679700000000E-8 " "
relative error = 1.2968452844534156000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7160000000000313 " "
y[1] (analytic) = 1.0243310978475701 " "
y[1] (numeric) = 1.0243310844155942 " "
absolute error = 1.343197597591938600000000E-8 " "
relative error = 1.3112924135705764000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7150000000000314 " "
y[1] (analytic) = 1.0243554411150229 " "
y[1] (numeric) = 1.0243554275335944 " "
absolute error = 1.358142842633469600000000E-8 " "
relative error = 1.3258511529504985000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7140000000000315 " "
y[1] (analytic) = 1.0243798087379188 " "
y[1] (numeric) = 1.024379795005882 " "
absolute error = 1.373203684096324700000000E-8 " "
relative error = 1.3405220137911272000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7130000000000316 " "
y[1] (analytic) = 1.0244042007406253 " "
y[1] (numeric) = 1.0244041868568192 " "
absolute error = 1.388380610478634500000000E-8 " "
relative error = 1.3553054638734016000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7120000000000317 " "
y[1] (analytic) = 1.0244286171475347 " "
y[1] (numeric) = 1.024428603110793 " "
absolute error = 1.403674176891911400000000E-8 " "
relative error = 1.370202035941133000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.711000000000032 " "
y[1] (analytic) = 1.0244530579830633 " "
y[1] (numeric) = 1.0244530437922146 " "
absolute error = 1.419084871834286300000000E-8 " "
relative error = 1.3852121976463927000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.710000000000032 " "
y[1] (analytic) = 1.0244775232716519 " "
y[1] (numeric) = 1.0244775089255194 " "
absolute error = 1.434613250417271500000000E-8 " "
relative error = 1.400336481600746000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.709000000000032 " "
y[1] (analytic) = 1.0245020130377658 " "
y[1] (numeric) = 1.0245019985351675 " "
absolute error = 1.450259823343458300000000E-8 " "
relative error = 1.4155753770002577000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.708000000000032 " "
y[1] (analytic) = 1.0245265273058948 " "
y[1] (numeric) = 1.0245265126456435 " "
absolute error = 1.466025123519898400000000E-8 " "
relative error = 1.4309293946492266000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7070000000000323 " "
y[1] (analytic) = 1.024551066100553 " "
y[1] (numeric) = 1.0245510512814564 " "
absolute error = 1.481909661649183400000000E-8 " "
relative error = 1.4463990236126928000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7060000000000324 " "
y[1] (analytic) = 1.0245756294462796 " "
y[1] (numeric) = 1.0245756144671396 " "
absolute error = 1.497913992842825300000000E-8 " "
relative error = 1.4619847962344723000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7050000000000325 " "
y[1] (analytic) = 1.0246002173676374 " "
y[1] (numeric) = 1.0246002022272511 " "
absolute error = 1.514038627803415700000000E-8 " "
relative error = 1.477687201446457000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7040000000000326 " "
y[1] (analytic) = 1.0246248298892149 " "
y[1] (numeric) = 1.0246248145863737 " "
absolute error = 1.530284121642466700000000E-8 " "
relative error = 1.493506771456949000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.7030000000000327 " "
y[1] (analytic) = 1.024649467035624 " "
y[1] (numeric) = 1.0246494515691145 " "
absolute error = 1.546650962858109300000000E-8 " "
relative error = 1.509443973393817000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.702000000000033 " "
y[1] (analytic) = 1.0246741288315027 " "
y[1] (numeric) = 1.0246741132001054 " "
absolute error = 1.563139728766316200000000E-8 " "
relative error = 1.5254993610006120000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.701000000000033 " "
y[1] (analytic) = 1.024698815301512 " "
y[1] (numeric) = 1.0246987995040027 " "
absolute error = 1.579750930069678800000000E-8 " "
relative error = 1.5416734229412044000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.700000000000033 " "
y[1] (analytic) = 1.0247235264703385 " "
y[1] (numeric) = 1.0247235105054877 " "
absolute error = 1.596485077470788400000000E-8 " "
relative error = 1.5579666478136628000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.699000000000033 " "
y[1] (analytic) = 1.0247482623626938 " "
y[1] (numeric) = 1.0247482462292663 " "
absolute error = 1.613342748285617700000000E-8 " "
relative error = 1.574379589154746000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6980000000000333 " "
y[1] (analytic) = 1.0247730230033134 " "
y[1] (numeric) = 1.0247730067000689 " "
absolute error = 1.630324453216758200000000E-8 " "
relative error = 1.5909127354257907000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6970000000000334 " "
y[1] (analytic) = 1.024797808416958 " "
y[1] (numeric) = 1.0247977919426507 " "
absolute error = 1.647430725171261700000000E-8 " "
relative error = 1.607566596689064800000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6960000000000335 " "
y[1] (analytic) = 1.0248226186284133 " "
y[1] (numeric) = 1.0248226019817919 " "
absolute error = 1.664662141465100800000000E-8 " "
relative error = 1.6243417262716414000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6950000000000336 " "
y[1] (analytic) = 1.0248474536624892 " "
y[1] (numeric) = 1.0248474368422973 " "
absolute error = 1.682019190596406600000000E-8 " "
relative error = 1.6412385907633260000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6940000000000337 " "
y[1] (analytic) = 1.0248723135440208 " "
y[1] (numeric) = 1.0248722965489965 " "
absolute error = 1.699502427676691200000000E-8 " "
relative error = 1.6582577216861205000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.693000000000034 " "
y[1] (analytic) = 1.0248971982978679 " "
y[1] (numeric) = 1.0248971811267438 " "
absolute error = 1.71711240781746700000000E-8 " "
relative error = 1.6753996504910137000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.692000000000034 " "
y[1] (analytic) = 1.0249221079489155 " "
y[1] (numeric) = 1.0249220906004188 " "
absolute error = 1.73484966392578600000000E-8 " "
relative error = 1.6926648868932925000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.691000000000034 " "
y[1] (analytic) = 1.024947042522073 " "
y[1] (numeric) = 1.0249470249949257 " "
absolute error = 1.752714728908699700000000E-8 " "
relative error = 1.710053940539034000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.690000000000034 " "
y[1] (analytic) = 1.0249720020422752 " "
y[1] (numeric) = 1.0249719843351937 " "
absolute error = 1.770708157877720600000000E-8 " "
relative error = 1.7275673426684363000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6890000000000343 " "
y[1] (analytic) = 1.0249969865344817 " "
y[1] (numeric) = 1.0249969686461766 " "
absolute error = 1.78883050594436100000000E-8 " "
relative error = 1.7452056244500805000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6880000000000344 " "
y[1] (analytic) = 1.0250219960236766 " "
y[1] (numeric) = 1.0250219779528535 " "
absolute error = 1.807082306015672700000000E-8 " "
relative error = 1.7629692953183530000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6870000000000345 " "
y[1] (analytic) = 1.0250470305348696 " "
y[1] (numeric) = 1.0250470122802287 " "
absolute error = 1.825464090998707400000000E-8 " "
relative error = 1.7808588646378304000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6860000000000346 " "
y[1] (analytic) = 1.0250720900930954 " "
y[1] (numeric) = 1.025072071653331 " "
absolute error = 1.84397643820943800000000E-8 " "
relative error = 1.798874885025863000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6850000000000347 " "
y[1] (analytic) = 1.0250971747234132 " "
y[1] (numeric) = 1.0250971560972146 " "
absolute error = 1.86261985835045600000000E-8 " "
relative error = 1.8170178440429505000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.684000000000035 " "
y[1] (analytic) = 1.0251222844509078 " "
y[1] (numeric) = 1.0251222656369585 " "
absolute error = 1.88139492873773400000000E-8 " "
relative error = 1.8352882941623658000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.683000000000035 " "
y[1] (analytic) = 1.025147419300689 " "
y[1] (numeric) = 1.025147400297667 " "
absolute error = 1.900302204482784400000000E-8 " "
relative error = 1.8536867661229522000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.682000000000035 " "
y[1] (analytic) = 1.0251725792978916 " "
y[1] (numeric) = 1.0251725601044694 " "
absolute error = 1.91934221849265900000000E-8 " "
relative error = 1.8722137689316232000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.681000000000035 " "
y[1] (analytic) = 1.0251977644676757 " "
y[1] (numeric) = 1.0251977450825203 " "
absolute error = 1.938515548083330500000000E-8 " "
relative error = 1.8908698548419936000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6800000000000352 " "
y[1] (analytic) = 1.0252229748352264 " "
y[1] (numeric) = 1.0252229552569991 " "
absolute error = 1.957822726161850800000000E-8 " "
relative error = 1.909655532716199000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6790000000000354 " "
y[1] (analytic) = 1.0252482104257539 " "
y[1] (numeric) = 1.025248190653111 " "
absolute error = 1.977264285635271800000000E-8 " "
relative error = 1.928571311345352000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6780000000000355 " "
y[1] (analytic) = 1.025273471264494 " "
y[1] (numeric) = 1.0252734512960857 " "
absolute error = 1.996840826024026700000000E-8 " "
relative error = 1.9476177644207215000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6770000000000356 " "
y[1] (analytic) = 1.0252987573767074 " "
y[1] (numeric) = 1.0252987372111788 " "
absolute error = 2.016552858030706800000000E-8 " "
relative error = 1.966795378929539000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6760000000000357 " "
y[1] (analytic) = 1.0253240687876801 " "
y[1] (numeric) = 1.0253240484236705 " "
absolute error = 2.03640095897128500000000E-8 " "
relative error = 1.986104706757814700000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.675000000000036 " "
y[1] (analytic) = 1.0253494055227241 " "
y[1] (numeric) = 1.0253493849588668 " "
absolute error = 2.056385728366194600000000E-8 " "
relative error = 2.00554632137115000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.674000000000036 " "
y[1] (analytic) = 1.0253747676071754 " "
y[1] (numeric) = 1.025374746842099 " "
absolute error = 2.07650763250910590000000E-8 " "
relative error = 2.025120666227104800000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.673000000000036 " "
y[1] (analytic) = 1.0254001550663967 " "
y[1] (numeric) = 1.0254001340987233 " "
absolute error = 2.096767337533833600000000E-8 " "
relative error = 2.044828379607631000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.672000000000036 " "
y[1] (analytic) = 1.0254255679257749 " "
y[1] (numeric) = 1.0254255467541218 " "
absolute error = 2.11716530973404820000000E-8 " "
relative error = 2.0646699048246264000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6710000000000362 " "
y[1] (analytic) = 1.0254510062107234 " "
y[1] (numeric) = 1.0254509848337015 " "
absolute error = 2.137702193039103800000000E-8 " "
relative error = 2.0846458583510524000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6700000000000363 " "
y[1] (analytic) = 1.02547646994668 " "
y[1] (numeric) = 1.025476448362895 " "
absolute error = 2.15837849815159200000000E-8 " "
relative error = 2.1047567266597714000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6690000000000365 " "
y[1] (analytic) = 1.0255019591591088 " "
y[1] (numeric) = 1.0255019373671608 " "
absolute error = 2.179194802387485200000000E-8 " "
relative error = 2.125003061110074800000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6680000000000366 " "
y[1] (analytic) = 1.025527473873499 " "
y[1] (numeric) = 1.0255274518719821 " "
absolute error = 2.200151683062756500000000E-8 " "
relative error = 2.145385412984216200000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6670000000000367 " "
y[1] (analytic) = 1.025553014115365 " "
y[1] (numeric) = 1.0255529919028683 " "
absolute error = 2.221249673084457800000000E-8 " "
relative error = 2.165904290184835000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.666000000000037 " "
y[1] (analytic) = 1.0255785799102473 " "
y[1] (numeric) = 1.0255785574853538 " "
absolute error = 2.242489349768561600000000E-8 " "
relative error = 2.1865602438428575000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.665000000000037 " "
y[1] (analytic) = 1.0256041712837116 " "
y[1] (numeric) = 1.0256041486449985 " "
absolute error = 2.263871312635501500000000E-8 " "
relative error = 2.2073538466618126000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.664000000000037 " "
y[1] (analytic) = 1.0256297882613494 " "
y[1] (numeric) = 1.0256297654073883 " "
absolute error = 2.285396116796789600000000E-8 " "
relative error = 2.2282856279662075000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.663000000000037 " "
y[1] (analytic) = 1.0256554308687778 " "
y[1] (numeric) = 1.0256554077981346 " "
absolute error = 2.307064317363938200000000E-8 " "
relative error = 2.2493561170048576000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6620000000000372 " "
y[1] (analytic) = 1.025681099131639 " "
y[1] (numeric) = 1.025681075842874 " "
absolute error = 2.328876491652920300000000E-8 " "
relative error = 2.270565864599232000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6610000000000373 " "
y[1] (analytic) = 1.0257067930756012 " "
y[1] (numeric) = 1.0257067695672692 " "
absolute error = 2.35083319477524800000000E-8 " "
relative error = 2.2919153998446576000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6600000000000374 " "
y[1] (analytic) = 1.025732512726359 " "
y[1] (numeric) = 1.0257324889970085 " "
absolute error = 2.372935048455815400000000E-8 " "
relative error = 2.3134053167025406000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6590000000000376 " "
y[1] (analytic) = 1.0257582581096316 " "
y[1] (numeric) = 1.0257582341578058 " "
absolute error = 2.39518258560167400000000E-8 " "
relative error = 2.3350361224639343000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6580000000000377 " "
y[1] (analytic) = 1.0257840292511644 " "
y[1] (numeric) = 1.0257840050754006 " "
absolute error = 2.417576383528796700000000E-8 " "
relative error = 2.3568083676382237000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6570000000000378 " "
y[1] (analytic) = 1.0258098261767286 " "
y[1] (numeric) = 1.0258098017755584 " "
absolute error = 2.440117019553156300000000E-8 " "
relative error = 2.378722602655951000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.656000000000038 " "
y[1] (analytic) = 1.025835648912121 " "
y[1] (numeric) = 1.0258356242840703 " "
absolute error = 2.462805070990725700000000E-8 " "
relative error = 2.400779377868651000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.655000000000038 " "
y[1] (analytic) = 1.0258614974831646 " "
y[1] (numeric) = 1.0258614726267532 " "
absolute error = 2.48564113736193800000000E-8 " "
relative error = 2.4229792651933793000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.654000000000038 " "
y[1] (analytic) = 1.0258873719157078 " "
y[1] (numeric) = 1.02588734682945 " "
absolute error = 2.508625773778306000000000E-8 " "
relative error = 2.445322793177365800000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.653000000000038 " "
y[1] (analytic) = 1.0259132722356252 " "
y[1] (numeric) = 1.0259132469180294 " "
absolute error = 2.53175957976026200000000E-8 " "
relative error = 2.467810533577719200000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6520000000000383 " "
y[1] (analytic) = 1.0259391984688169 " "
y[1] (numeric) = 1.0259391729183858 " "
absolute error = 2.555043110419319400000000E-8 " "
relative error = 2.4904430147835696000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6510000000000384 " "
y[1] (analytic) = 1.0259651506412093 " "
y[1] (numeric) = 1.0259651248564394 " "
absolute error = 2.578476987480371500000000E-8 " "
relative error = 2.513220830033916000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6500000000000385 " "
y[1] (analytic) = 1.0259911287787544 " "
y[1] (numeric) = 1.025991102758137 " "
absolute error = 2.6020617438504700000000E-8 " "
relative error = 2.5361444859155124000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6490000000000387 " "
y[1] (analytic) = 1.0260171329074304 " "
y[1] (numeric) = 1.0260171066494506 " "
absolute error = 2.625797979050048500000000E-8 " "
relative error = 2.5592145538635500000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6480000000000388 " "
y[1] (analytic) = 1.0260431630532416 " "
y[1] (numeric) = 1.0260431365563785 " "
absolute error = 2.649686314804000600000000E-8 " "
relative error = 2.5824316268715375000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.647000000000039 " "
y[1] (analytic) = 1.026069219242218 " "
y[1] (numeric) = 1.026069192504945 " "
absolute error = 2.673727306223838700000000E-8 " "
relative error = 2.6057962329271156000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.646000000000039 " "
y[1] (analytic) = 1.0260953015004157 " "
y[1] (numeric) = 1.0260952745212004 " "
absolute error = 2.697921530625535500000000E-8 " "
relative error = 2.6293089215791937000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.645000000000039 " "
y[1] (analytic) = 1.0261214098539173 " "
y[1] (numeric) = 1.0261213826312212 " "
absolute error = 2.72226960973398500000000E-8 " "
relative error = 2.652970285574236000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.644000000000039 " "
y[1] (analytic) = 1.0261475443288308 " "
y[1] (numeric) = 1.0261475168611098 " "
absolute error = 2.74677209866069900000000E-8 " "
relative error = 2.6767808526572780000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6430000000000393 " "
y[1] (analytic) = 1.0261737049512907 " "
y[1] (numeric) = 1.026173677236995 " "
absolute error = 2.77142957472165100000000E-8 " "
relative error = 2.700741172132453000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6420000000000394 " "
y[1] (analytic) = 1.026199891747458 " "
y[1] (numeric) = 1.0261998637850311 " "
absolute error = 2.79624268184619500000000E-8 " "
relative error = 2.7248518581351930000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6410000000000395 " "
y[1] (analytic) = 1.0262261047435188 " "
y[1] (numeric) = 1.0262260765313993 " "
absolute error = 2.821211952941382600000000E-8 " "
relative error = 2.749113416527713700000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6400000000000396 " "
y[1] (analytic) = 1.026252343965687 " "
y[1] (numeric) = 1.0262523155023064 " "
absolute error = 2.846338054141029000000000E-8 " "
relative error = 2.773526482913638000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6390000000000398 " "
y[1] (analytic) = 1.026278609440201 " "
y[1] (numeric) = 1.0262785807239858 " "
absolute error = 2.871621518352185400000000E-8 " "
relative error = 2.798091562990438000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.63800000000004 " "
y[1] (analytic) = 1.026304901193327 " "
y[1] (numeric) = 1.026304872222697 " "
absolute error = 2.897062989504206600000000E-8 " "
relative error = 2.822809270554659000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.63700000000004 " "
y[1] (analytic) = 1.026331219251356 " "
y[1] (numeric) = 1.0263311900247258 " "
absolute error = 2.922663022708605000000000E-8 " "
relative error = 2.8476801327747814000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.63600000000004 " "
y[1] (analytic) = 1.0263575636406066 " "
y[1] (numeric) = 1.0263575341563844 " "
absolute error = 2.948422217485813000000000E-8 " "
relative error = 2.8727047200075434000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.63500000000004 " "
y[1] (analytic) = 1.026383934387423 " "
y[1] (numeric) = 1.026383904644011 " "
absolute error = 2.974341195560726000000000E-8 " "
relative error = 2.8978836241585393000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6340000000000403 " "
y[1] (analytic) = 1.026410331518176 " "
y[1] (numeric) = 1.0264103015139707 " "
absolute error = 3.00042053424931500000000E-8 " "
relative error = 2.9232173937798894000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6330000000000404 " "
y[1] (analytic) = 1.0264367550592628 " "
y[1] (numeric) = 1.0264367247926542 " "
absolute error = 3.02666085527647500000000E-8 " "
relative error = 2.948706620605891000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6320000000000405 " "
y[1] (analytic) = 1.026463205037107 " "
y[1] (numeric) = 1.0264631745064794 " "
absolute error = 3.05306275816263900000000E-8 " "
relative error = 2.97435187465124000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6310000000000406 " "
y[1] (analytic) = 1.0264896814781581 " "
y[1] (numeric) = 1.02648965068189 " "
absolute error = 3.0796268202237800000000E-8 " "
relative error = 3.000153704213644000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6300000000000407 " "
y[1] (analytic) = 1.026516184408893 " "
y[1] (numeric) = 1.0265161533453564 " "
absolute error = 3.10635366318479100000000E-8 " "
relative error = 3.0261127007691040000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.629000000000041 " "
y[1] (analytic) = 1.0265427138558147 " "
y[1] (numeric) = 1.0265426825233757 " "
absolute error = 3.133243908770566600000000E-8 " "
relative error = 3.0522294557054863000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.628000000000041 " "
y[1] (analytic) = 1.0265692698454523 " "
y[1] (numeric) = 1.0265692382424711 " "
absolute error = 3.16029811209261900000000E-8 " "
relative error = 3.078504495433021000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.627000000000041 " "
y[1] (analytic) = 1.026595852404362 " "
y[1] (numeric) = 1.0265958205291927 " "
absolute error = 3.18751691708030200000000E-8 " "
relative error = 3.1049384327970025000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.626000000000041 " "
y[1] (analytic) = 1.0266224615591264 " "
y[1] (numeric) = 1.026622429410117 " "
absolute error = 3.2149009454585100000000E-8 " "
relative error = 3.1315318589231490000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6250000000000413 " "
y[1] (analytic) = 1.0266490973363545 " "
y[1] (numeric) = 1.0266490649118467 " "
absolute error = 3.24245077454321500000000E-8 " "
relative error = 3.158285321592127000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6240000000000414 " "
y[1] (analytic) = 1.026675759762682 " "
y[1] (numeric) = 1.0266757270610118 " "
absolute error = 3.27016702605931200000000E-8 " "
relative error = 3.1851994117550964000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6230000000000415 " "
y[1] (analytic) = 1.0267024488647716 " "
y[1] (numeric) = 1.0267024158842686 " "
absolute error = 3.29805029952723300000000E-8 " "
relative error = 3.2122746986470120000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6220000000000416 " "
y[1] (analytic) = 1.0267291646693124 " "
y[1] (numeric) = 1.0267291314083 " "
absolute error = 3.326101238876333400000000E-8 " "
relative error = 3.2395117946684604000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6210000000000417 " "
y[1] (analytic) = 1.02675590720302 " "
y[1] (numeric) = 1.0267558736598157 " "
absolute error = 3.35432042142258500000000E-8 " "
relative error = 3.266911247250645000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.620000000000042 " "
y[1] (analytic) = 1.026782676492637 " "
y[1] (numeric) = 1.0267826426655522 " "
absolute error = 3.38270849109534300000000E-8 " "
relative error = 3.294473668615308000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.619000000000042 " "
y[1] (analytic) = 1.0268094725649328 " "
y[1] (numeric) = 1.0268094384522726 " "
absolute error = 3.4112660252105800000000E-8 " "
relative error = 3.3221996060178144000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.618000000000042 " "
y[1] (analytic) = 1.0268362954467034 " "
y[1] (numeric) = 1.0268362610467667 " "
absolute error = 3.439993667697649500000000E-8 " "
relative error = 3.350089671500317000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.617000000000042 " "
y[1] (analytic) = 1.0268631451647716 " "
y[1] (numeric) = 1.0268631104758512 " "
absolute error = 3.46889204028144600000000E-8 " "
relative error = 3.3781444553887696000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6160000000000423 " "
y[1] (analytic) = 1.0268900217459873 " "
y[1] (numeric) = 1.0268899867663699 " "
absolute error = 3.49796174248240300000000E-8 " "
relative error = 3.4063645262955555000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6150000000000424 " "
y[1] (analytic) = 1.026916925217227 " "
y[1] (numeric) = 1.0269168899451928 " "
absolute error = 3.52720341822987400000000E-8 " "
relative error = 3.4347504959894914000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6140000000000425 " "
y[1] (analytic) = 1.026943855605394 " "
y[1] (numeric) = 1.0269438200392174 " "
absolute error = 3.55661766704429300000000E-8 " "
relative error = 3.463302932902432000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6130000000000426 " "
y[1] (analytic) = 1.026970812937419 " "
y[1] (numeric) = 1.0269707770753678 " "
absolute error = 3.58620513285501400000000E-8 " "
relative error = 3.4920224486200150000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6120000000000427 " "
y[1] (analytic) = 1.026997797240259 " "
y[1] (numeric) = 1.0269977610805952 " "
absolute error = 3.615966392978009500000000E-8 " "
relative error = 3.5209095897720594000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.611000000000043 " "
y[1] (analytic) = 1.0270248085408988 " "
y[1] (numeric) = 1.0270247720818777 " "
absolute error = 3.64590211354709500000000E-8 " "
relative error = 3.5499649893821483000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.610000000000043 " "
y[1] (analytic) = 1.0270518468663492 " "
y[1] (numeric) = 1.0270518101062203 " "
absolute error = 3.67601289408270300000000E-8 " "
relative error = 3.5791892155188000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.609000000000043 " "
y[1] (analytic) = 1.0270789122436488 " "
y[1] (numeric) = 1.027078875180655 " "
absolute error = 3.706299378514188400000000E-8 " "
relative error = 3.608582879399009300000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.608000000000043 " "
y[1] (analytic) = 1.0271060046998628 " "
y[1] (numeric) = 1.027105967332241 " "
absolute error = 3.73676218856644500000000E-8 " "
relative error = 3.6381465705269517000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6070000000000433 " "
y[1] (analytic) = 1.0271331242620838 " "
y[1] (numeric) = 1.0271330865880643 " "
absolute error = 3.76740194596436600000000E-8 " "
relative error = 3.6678808783145367000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6060000000000434 " "
y[1] (analytic) = 1.0271602709574315 " "
y[1] (numeric) = 1.0271602329752385 " "
absolute error = 3.79821929463730600000000E-8 " "
relative error = 3.697786413698545000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6050000000000435 " "
y[1] (analytic) = 1.0271874448130522 " "
y[1] (numeric) = 1.0271874065209037 " "
absolute error = 3.82921485631015900000000E-8 " "
relative error = 3.7278637659040653000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6040000000000436 " "
y[1] (analytic) = 1.02721464585612 " "
y[1] (numeric) = 1.0272146072522275 " "
absolute error = 3.86038925270781900000000E-8 " "
relative error = 3.75811352406334000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.6030000000000437 " "
y[1] (analytic) = 1.0272418741138358 " "
y[1] (numeric) = 1.0272418351964046 " "
absolute error = 3.89174312775963900000000E-8 " "
relative error = 3.788536298831182700000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.602000000000044 " "
y[1] (analytic) = 1.0272691296134282 " "
y[1] (numeric) = 1.027269090380657 " "
absolute error = 3.92327712539497500000000E-8 " "
relative error = 3.819132700766880700000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.601000000000044 " "
y[1] (analytic) = 1.0272964123821524 " "
y[1] (numeric) = 1.027296372832234 " "
absolute error = 3.95499184513425900000000E-8 " "
relative error = 3.849903297105070600000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.600000000000044 " "
y[1] (analytic) = 1.0273237224472913 " "
y[1] (numeric) = 1.0273236825784118 " "
absolute error = 3.986887953111306600000000E-8 " "
relative error = 3.880848719830726000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.599000000000044 " "
y[1] (analytic) = 1.027351059836155 " "
y[1] (numeric) = 1.0273510196464941 " "
absolute error = 4.018966093255471600000000E-8 " "
relative error = 3.911969579217086700000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5980000000000443 " "
y[1] (analytic) = 1.0273784245760806 " "
y[1] (numeric) = 1.027378384063812 " "
absolute error = 4.051226865087187400000000E-8 " "
relative error = 3.943266442215598000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5970000000000444 " "
y[1] (analytic) = 1.0274058166944333 " "
y[1] (numeric) = 1.027405775857724 " "
absolute error = 4.08367093474026900000000E-8 " "
relative error = 3.974739940522273000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5960000000000445 " "
y[1] (analytic) = 1.0274332362186047 " "
y[1] (numeric) = 1.0274331950556155 " "
absolute error = 4.1162989239396097000000E-8 " "
relative error = 4.006390662510935000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5950000000000446 " "
y[1] (analytic) = 1.027460683176015 " "
y[1] (numeric) = 1.0274606416848997 " "
absolute error = 4.14911152102348500000000E-8 " "
relative error = 4.038219261293814500000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5940000000000447 " "
y[1] (analytic) = 1.0274881575941104 " "
y[1] (numeric) = 1.0274881157730174 " "
absolute error = 4.18210930330786800000000E-8 " "
relative error = 4.070226281829255600000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.593000000000045 " "
y[1] (analytic) = 1.0275156595003658 " "
y[1] (numeric) = 1.0275156173474362 " "
absolute error = 4.21529295913103400000000E-8 " "
relative error = 4.102412377034466700000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.592000000000045 " "
y[1] (analytic) = 1.027543188922283 " "
y[1] (numeric) = 1.027543146435652 " "
absolute error = 4.24866311021787600000000E-8 " "
relative error = 4.134778134896691700000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.591000000000045 " "
y[1] (analytic) = 1.0275707458873915 " "
y[1] (numeric) = 1.0275707030651873 " "
absolute error = 4.2822204227022100000000E-8 " "
relative error = 4.1673241865251440000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.590000000000045 " "
y[1] (analytic) = 1.027598330423248 " "
y[1] (numeric) = 1.027598287263593 " "
absolute error = 4.315965518308928500000000E-8 " "
relative error = 4.200051119712568400000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5890000000000453 " "
y[1] (analytic) = 1.0276259425574374 " "
y[1] (numeric) = 1.0276258990584468 " "
absolute error = 4.34989906317184700000000E-8 " "
relative error = 4.2329595653709534000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5880000000000454 " "
y[1] (analytic) = 1.0276535823175716 " "
y[1] (numeric) = 1.0276535384773546 " "
absolute error = 4.3840217012203200000000E-8 " "
relative error = 4.266050132704683500000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5870000000000455 " "
y[1] (analytic) = 1.0276812497312904 " "
y[1] (numeric) = 1.0276812055479496 " "
absolute error = 4.41833407638370100000000E-8 " "
relative error = 4.299323430819595000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5860000000000456 " "
y[1] (analytic) = 1.0277089448262613 " "
y[1] (numeric) = 1.0277089002978927 " "
absolute error = 4.45283685479580500000000E-8 " "
relative error = 4.332780090328567400000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5850000000000457 " "
y[1] (analytic) = 1.0277366676301791 " "
y[1] (numeric) = 1.0277366227548725 " "
absolute error = 4.487530658181526600000000E-8 " "
relative error = 4.3664206985327886000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.584000000000046 " "
y[1] (analytic) = 1.027764418170767 " "
y[1] (numeric) = 1.0277643729466055 " "
absolute error = 4.5224161526746800000000E-8 " "
relative error = 4.400245885845858000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.583000000000046 " "
y[1] (analytic) = 1.0277921964757755 " "
y[1] (numeric) = 1.0277921509008354 " "
absolute error = 4.557494004409079500000000E-8 " "
relative error = 4.434256282579684000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.582000000000046 " "
y[1] (analytic) = 1.0278200025729827 " "
y[1] (numeric) = 1.0278199566453339 " "
absolute error = 4.592764879518540500000000E-8 " "
relative error = 4.46845251894426000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.581000000000046 " "
y[1] (analytic) = 1.0278478364901948 " "
y[1] (numeric) = 1.0278477902079006 " "
absolute error = 4.62822942193241700000000E-8 " "
relative error = 4.5028352034445984000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5800000000000463 " "
y[1] (analytic) = 1.0278756982552457 " "
y[1] (numeric) = 1.027875651616363 " "
absolute error = 4.66388827558006370000000E-8 " "
relative error = 4.53740494448572000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5790000000000464 " "
y[1] (analytic) = 1.0279035878959972 " "
y[1] (numeric) = 1.0279035408985762 " "
absolute error = 4.69974210659529500000000E-8 " "
relative error = 4.572162371974143000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5780000000000465 " "
y[1] (analytic) = 1.0279315054403388 " "
y[1] (numeric) = 1.027931458082423 " "
absolute error = 4.735791581111925600000000E-8 " "
relative error = 4.607108115713640700000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5770000000000466 " "
y[1] (analytic) = 1.0279594509161885 " "
y[1] (numeric) = 1.0279594031958148 " "
absolute error = 4.772037365263770400000000E-8 " "
relative error = 4.64224280540502000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5760000000000467 " "
y[1] (analytic) = 1.027987424351491 " "
y[1] (numeric) = 1.02798737626669 " "
absolute error = 4.80848010298018400000000E-8 " "
relative error = 4.677567049045982000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.575000000000047 " "
y[1] (analytic) = 1.0280154257742204 " "
y[1] (numeric) = 1.0280153773230158 " "
absolute error = 4.845120460394980500000000E-8 " "
relative error = 4.713081476132536000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.574000000000047 " "
y[1] (analytic) = 1.028043455212378 " "
y[1] (numeric) = 1.0280434063927868 " "
absolute error = 4.881959125846435700000000E-8 " "
relative error = 4.748786737655849000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.573000000000047 " "
y[1] (analytic) = 1.028071512693993 " "
y[1] (numeric) = 1.0280714635040258 " "
absolute error = 4.91899672105944300000000E-8 " "
relative error = 4.784683419706416400000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.572000000000047 " "
y[1] (analytic) = 1.0280995982471233 " "
y[1] (numeric) = 1.0280995486847835 " "
absolute error = 4.95623397878119930000000E-8 " "
relative error = 4.820772216263306500000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5710000000000472 " "
y[1] (analytic) = 1.0281277118998537 " "
y[1] (numeric) = 1.0281276619631388 " "
absolute error = 4.99367149853213730000000E-8 " "
relative error = 4.857053691612344000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5700000000000474 " "
y[1] (analytic) = 1.0281558536802988 " "
y[1] (numeric) = 1.0281558033671987 " "
absolute error = 5.031310013059453000000000E-8 " "
relative error = 4.893528539520352000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5690000000000475 " "
y[1] (analytic) = 1.0281840236165998 " "
y[1] (numeric) = 1.0281839729250983 " "
absolute error = 5.069150144088042000000000E-8 " "
relative error = 4.930197345663368000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5680000000000476 " "
y[1] (analytic) = 1.0282122217369267 " "
y[1] (numeric) = 1.028212170665001 " "
absolute error = 5.10719257995617700000000E-8 " "
relative error = 4.9670607604029027000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5670000000000477 " "
y[1] (analytic) = 1.0282404480694776 " "
y[1] (numeric) = 1.028240396615098 " "
absolute error = 5.145437964593214000000000E-8 " "
relative error = 5.004119390803754000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.566000000000048 " "
y[1] (analytic) = 1.028268702642479 " "
y[1] (numeric) = 1.0282686508036087 " "
absolute error = 5.18388703074634800000000E-8 " "
relative error = 5.041373930203868000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.565000000000048 " "
y[1] (analytic) = 1.0282969854841855 " "
y[1] (numeric) = 1.0282969332587815 " "
absolute error = 5.22254040014047400000000E-8 " "
relative error = 5.07882496386137000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.564000000000048 " "
y[1] (analytic) = 1.0283252966228797 " "
y[1] (numeric) = 1.028325244008892 " "
absolute error = 5.261398783318327000000000E-8 " "
relative error = 5.116473163304718000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.563000000000048 " "
y[1] (analytic) = 1.028353636086873 " "
y[1] (numeric) = 1.0283535830822448 " "
absolute error = 5.30046282420926200000000E-8 " "
relative error = 5.154319135174906000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5620000000000482 " "
y[1] (analytic) = 1.0283820039045046 " "
y[1] (numeric) = 1.0283819505071725 " "
absolute error = 5.33973321115155400000000E-8 " "
relative error = 5.1923635291924080000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5610000000000483 " "
y[1] (analytic) = 1.0284104001041428 " "
y[1] (numeric) = 1.0284103463120362 " "
absolute error = 5.37921065468793800000000E-8 " "
relative error = 5.230607016559934000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5600000000000485 " "
y[1] (analytic) = 1.0284388247141831 " "
y[1] (numeric) = 1.0284387705252251 " "
absolute error = 5.41889579874776900000000E-8 " "
relative error = 5.269050203597431000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5590000000000486 " "
y[1] (analytic) = 1.0284672777630506 " "
y[1] (numeric) = 1.0284672231751573 " "
absolute error = 5.458789331669323000000000E-8 " "
relative error = 5.3076937397000760000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5580000000000487 " "
y[1] (analytic) = 1.0284957592791983 " "
y[1] (numeric) = 1.0284957042902787 " "
absolute error = 5.49889196399533400000000E-8 " "
relative error = 5.346538295742831000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.557000000000049 " "
y[1] (analytic) = 1.0285242692911076 " "
y[1] (numeric) = 1.0285242138990642 " "
absolute error = 5.53920433965515700000000E-8 " "
relative error = 5.385584477722588000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.556000000000049 " "
y[1] (analytic) = 1.0285528078272885 " "
y[1] (numeric) = 1.0285527520300168 " "
absolute error = 5.579727169191528000000000E-8 " "
relative error = 5.424832956295287000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.555000000000049 " "
y[1] (analytic) = 1.0285813749162798 " "
y[1] (numeric) = 1.0285813187116684 " "
absolute error = 5.62046114094272300000000E-8 " "
relative error = 5.464284380416857000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.554000000000049 " "
y[1] (analytic) = 1.0286099705866483 " "
y[1] (numeric) = 1.028609913972579 " "
absolute error = 5.661406921042555000000000E-8 " "
relative error = 5.503939377345992000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5530000000000492 " "
y[1] (analytic) = 1.0286385948669898 " "
y[1] (numeric) = 1.0286385378413376 " "
absolute error = 5.70256522003376200000000E-8 " "
relative error = 5.543798617405702000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5520000000000493 " "
y[1] (analytic) = 1.0286672477859284 " "
y[1] (numeric) = 1.0286671903465614 " "
absolute error = 5.743936704050157000000000E-8 " "
relative error = 5.58386272763445000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5510000000000495 " "
y[1] (analytic) = 1.0286959293721174 " "
y[1] (numeric) = 1.0286958715168963 " "
absolute error = 5.78552210583893600000000E-8 " "
relative error = 5.624132399717213000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5500000000000496 " "
y[1] (analytic) = 1.028724639654238 " "
y[1] (numeric) = 1.0287245813810173 " "
absolute error = 5.82732206932945500000000E-8 " "
relative error = 5.664608238885054000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5490000000000497 " "
y[1] (analytic) = 1.0287533786610008 " "
y[1] (numeric) = 1.0287533199676275 " "
absolute error = 5.869337327268909000000000E-8 " "
relative error = 5.705290936597738000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.54800000000005 " "
y[1] (analytic) = 1.0287821464211444 " "
y[1] (numeric) = 1.0287820873054592 " "
absolute error = 5.91156852358665200000000E-8 " "
relative error = 5.746181097865476000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.54700000000005 " "
y[1] (analytic) = 1.0288109429634371 " "
y[1] (numeric) = 1.028810883423273 " "
absolute error = 5.95401641323434200000000E-8 " "
relative error = 5.787279435504549000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.54600000000005 " "
y[1] (analytic) = 1.028839768316675 " "
y[1] (numeric) = 1.0288397083498586 " "
absolute error = 5.99668164014133300000000E-8 " "
relative error = 5.8285865543015880000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.54500000000005 " "
y[1] (analytic) = 1.0288686225096837 " "
y[1] (numeric) = 1.0288685621140343 " "
absolute error = 6.0395649370548200000000E-8 " "
relative error = 5.870103145261363000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.54400000000005 " "
y[1] (analytic) = 1.0288975055713172 " "
y[1] (numeric) = 1.0288974447446473 " "
absolute error = 6.0826669923130790000000E-8 " "
relative error = 5.911829856109476000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5430000000000503 " "
y[1] (analytic) = 1.0289264175304587 " "
y[1] (numeric) = 1.0289263562705737 " "
absolute error = 6.12598849425438600000000E-8 " "
relative error = 5.95376733445863100000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5420000000000504 " "
y[1] (analytic) = 1.0289553584160203 " "
y[1] (numeric) = 1.0289552967207185 " "
absolute error = 6.16953017562593700000000E-8 " "
relative error = 5.995916270967622000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5410000000000506 " "
y[1] (analytic) = 1.0289843282569426 " "
y[1] (numeric) = 1.0289842661240154 " "
absolute error = 6.21329272476600600000000E-8 " "
relative error = 6.038277313019014000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5400000000000507 " "
y[1] (analytic) = 1.0290133270821955 " "
y[1] (numeric) = 1.0290132645094272 " "
absolute error = 6.2572768300128700000000E-8 " "
relative error = 6.080851107881766000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5390000000000508 " "
y[1] (analytic) = 1.0290423549207781 " "
y[1] (numeric) = 1.0290422919059459 " "
absolute error = 6.30148322411372400000000E-8 " "
relative error = 6.1236383458665810000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.538000000000051 " "
y[1] (analytic) = 1.029071411801718 " "
y[1] (numeric) = 1.0290713483425922 " "
absolute error = 6.34591257320238400000000E-8 " "
relative error = 6.1666396524336820000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.537000000000051 " "
y[1] (analytic) = 1.029100497754072 " "
y[1] (numeric) = 1.0291004338484158 " "
absolute error = 6.39056563223050500000000E-8 " "
relative error = 6.209855739237706000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.536000000000051 " "
y[1] (analytic) = 1.0291296128069263 " "
y[1] (numeric) = 1.0291295484524956 " "
absolute error = 6.43544306733190300000000E-8 " "
relative error = 6.253287231507592000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.535000000000051 " "
y[1] (analytic) = 1.0291587569893956 " "
y[1] (numeric) = 1.0291586921839395 " "
absolute error = 6.48054561125377400000000E-8 " "
relative error = 6.296934819085982000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5340000000000513 " "
y[1] (analytic) = 1.0291879303306246 " "
y[1] (numeric) = 1.0291878650718849 " "
absolute error = 6.52587397453885400000000E-8 " "
relative error = 6.340799170120883000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5330000000000514 " "
y[1] (analytic) = 1.0292171328597863 " "
y[1] (numeric) = 1.0292170671454977 " "
absolute error = 6.57142886772987800000000E-8 " "
relative error = 6.3848809526426000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5320000000000515 " "
y[1] (analytic) = 1.0292463646060832 " "
y[1] (numeric) = 1.0292462984339734 " "
absolute error = 6.61721097916512200000000E-8 " "
relative error = 6.429180812989983000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5310000000000517 " "
y[1] (analytic) = 1.0292756255987472 " "
y[1] (numeric) = 1.0292755589665366 " "
absolute error = 6.66322106379624300000000E-8 " "
relative error = 6.47369946210485000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5300000000000518 " "
y[1] (analytic) = 1.0293049158670393 " "
y[1] (numeric) = 1.029304848772441 " "
absolute error = 6.70945983216597600000000E-8 " "
relative error = 6.518437567661118000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.529000000000052 " "
y[1] (analytic) = 1.0293342354402495 " "
y[1] (numeric) = 1.02933416788097 " "
absolute error = 6.75592795040813600000000E-8 " "
relative error = 6.563395754070692000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.528000000000052 " "
y[1] (analytic) = 1.0293635843476978 " "
y[1] (numeric) = 1.0293635163214356 " "
absolute error = 6.80262621788330100000000E-8 " "
relative error = 6.608574775057822000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.527000000000052 " "
y[1] (analytic) = 1.0293929626187328 " "
y[1] (numeric) = 1.0293928941231798 " "
absolute error = 6.84955530072528500000000E-8 " "
relative error = 6.6539752547951190000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.526000000000052 " "
y[1] (analytic) = 1.029422370282733 " "
y[1] (numeric) = 1.0294223013155737 " "
absolute error = 6.89671593168128500000000E-8 " "
relative error = 6.699597882050191000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5250000000000523 " "
y[1] (analytic) = 1.0294518073691057 " "
y[1] (numeric) = 1.0294517379280175 " "
absolute error = 6.94410882129403700000000E-8 " "
relative error = 6.745443323899334000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5240000000000524 " "
y[1] (analytic) = 1.0294812739072885 " "
y[1] (numeric) = 1.0294812039899413 " "
absolute error = 6.99173472451519700000000E-8 " "
relative error = 6.7915122904361340000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5230000000000525 " "
y[1] (analytic) = 1.0295107699267474 " "
y[1] (numeric) = 1.0295106995308043 " "
absolute error = 7.0395943074785800000000E-8 " "
relative error = 6.837805405357215000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5220000000000526 " "
y[1] (analytic) = 1.0295402954569788 " "
y[1] (numeric) = 1.0295402245800953 " "
absolute error = 7.08768834734030400000000E-8 " "
relative error = 6.884323400080532000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5210000000000528 " "
y[1] (analytic) = 1.0295698505275082 " "
y[1] (numeric) = 1.0295697791673326 " "
absolute error = 7.13601755464310400000000E-8 " "
relative error = 6.931066941195790000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.520000000000053 " "
y[1] (analytic) = 1.0295994351678905 " "
y[1] (numeric) = 1.029599363322064 " "
absolute error = 7.18458266213417600000000E-8 " "
relative error = 6.9780367167379310000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.519000000000053 " "
y[1] (analytic) = 1.0296290494077103 " "
y[1] (numeric) = 1.0296289770738665 " "
absolute error = 7.23338438035625600000000E-8 " "
relative error = 7.0252333930527990000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.518000000000053 " "
y[1] (analytic) = 1.029658693276582 " "
y[1] (numeric) = 1.0296586204523475 " "
absolute error = 7.28242346426100100000000E-8 " "
relative error = 7.0726576794946070000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.517000000000053 " "
y[1] (analytic) = 1.0296883668041499 " "
y[1] (numeric) = 1.0296882934871434 " "
absolute error = 7.33170064659560700000000E-8 " "
relative error = 7.120310263726735000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5160000000000533 " "
y[1] (analytic) = 1.0297180700200865 " "
y[1] (numeric) = 1.0297179962079204 " "
absolute error = 7.3812166156983490000000E-8 " "
relative error = 7.1681917901609370000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5150000000000534 " "
y[1] (analytic) = 1.029747802954096 " "
y[1] (numeric) = 1.0297477286443744 " "
absolute error = 7.43097217092980600000000E-8 " "
relative error = 7.216303010904372000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5140000000000535 " "
y[1] (analytic) = 1.0297775656359107 " "
y[1] (numeric) = 1.0297774908262307 " "
absolute error = 7.48096800062825200000000E-8 " "
relative error = 7.264644570119942000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5130000000000536 " "
y[1] (analytic) = 1.0298073580952936 " "
y[1] (numeric) = 1.029807282783245 " "
absolute error = 7.53120485974534400000000E-8 " "
relative error = 7.313217176535692000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5120000000000537 " "
y[1] (analytic) = 1.0298371803620372 " "
y[1] (numeric) = 1.0298371045452022 " "
absolute error = 7.58168350323273900000000E-8 " "
relative error = 7.362021538751800000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.511000000000054 " "
y[1] (analytic) = 1.0298670324659633 " "
y[1] (numeric) = 1.0298669561419171 " "
absolute error = 7.63240461942871200000000E-8 " "
relative error = 7.411058300558776000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.510000000000054 " "
y[1] (analytic) = 1.0298969144369248 " "
y[1] (numeric) = 1.0298968376032347 " "
absolute error = 7.68336900769384100000000E-8 " "
relative error = 7.460328213425678000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.509000000000054 " "
y[1] (analytic) = 1.029926826304803 " "
y[1] (numeric) = 1.0299267489590294 " "
absolute error = 7.73457735636640100000000E-8 " "
relative error = 7.509831920891613000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.508000000000054 " "
y[1] (analytic) = 1.0299567680995099 " "
y[1] (numeric) = 1.0299566902392057 " "
absolute error = 7.78603042039804900000000E-8 " "
relative error = 7.559570131050196000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5070000000000543 " "
y[1] (analytic) = 1.0299867398509874 " "
y[1] (numeric) = 1.0299866614736977 " "
absolute error = 7.83772897694490200000000E-8 " "
relative error = 7.609543573423887000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5060000000000544 " "
y[1] (analytic) = 1.0300167415892074 " "
y[1] (numeric) = 1.03001666269247 " "
absolute error = 7.88967373654969600000000E-8 " "
relative error = 7.659752912731068000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5050000000000545 " "
y[1] (analytic) = 1.0300467733441716 " "
y[1] (numeric) = 1.0300466939255168 " "
absolute error = 7.94186547636854800000000E-8 " "
relative error = 7.710198878235713000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5040000000000546 " "
y[1] (analytic) = 1.0300768351459113 " "
y[1] (numeric) = 1.0300767552028625 " "
absolute error = 7.99430488473973400000000E-8 " "
relative error = 7.760882112844848000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.5030000000000547 " "
y[1] (analytic) = 1.030106927024489 " "
y[1] (numeric) = 1.030106846554561 " "
absolute error = 8.0469927832282910000000E-8 " "
relative error = 7.811803388675774000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.502000000000055 " "
y[1] (analytic) = 1.030137049009996 " "
y[1] (numeric) = 1.030136968010697 " "
absolute error = 8.09992988237695500000000E-8 " "
relative error = 7.862963369933467000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.501000000000055 " "
y[1] (analytic) = 1.0301672011325547 " "
y[1] (numeric) = 1.030167119601385 " "
absolute error = 8.15311695934184400000000E-8 " "
relative error = 7.914362785359886000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.500000000000055 " "
y[1] (analytic) = 1.0301973834223168 " "
y[1] (numeric) = 1.0301973013567696 " "
absolute error = 8.20655472466569300000000E-8 " "
relative error = 7.966002298902672000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.499000000000055 " "
y[1] (analytic) = 1.030227595909465 " "
y[1] (numeric) = 1.0302275133070253 " "
absolute error = 8.26024397770908100000000E-8 " "
relative error = 8.017882660595105000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4980000000000553 " "
y[1] (analytic) = 1.0302578386242116 " "
y[1] (numeric) = 1.0302577554823573 " "
absolute error = 8.31418542901474200000000E-8 " "
relative error = 8.070004534124546000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4970000000000554 " "
y[1] (analytic) = 1.0302881115967994 " "
y[1] (numeric) = 1.0302880279130007 " "
absolute error = 8.36837987794325500000000E-8 " "
relative error = 8.122368669258409000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4960000000000555 " "
y[1] (analytic) = 1.0303184148575013 " "
y[1] (numeric) = 1.0303183306292207 " "
absolute error = 8.42282805724181600000000E-8 " "
relative error = 8.174975750973779000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4950000000000556 " "
y[1] (analytic) = 1.0303487484366205 " "
y[1] (numeric) = 1.0303486636613133 " "
absolute error = 8.47753072186208100000000E-8 " "
relative error = 8.227826485668369000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4940000000000557 " "
y[1] (analytic) = 1.0303791123644908 " "
y[1] (numeric) = 1.0303790270396043 " "
absolute error = 8.53248864896016800000000E-8 " "
relative error = 8.280921601157079000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.493000000000056 " "
y[1] (analytic) = 1.0304095066714758 " "
y[1] (numeric) = 1.0304094207944499 " "
absolute error = 8.58770259348773400000000E-8 " "
relative error = 8.334261803570239000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.492000000000056 " "
y[1] (analytic) = 1.0304399313879702 " "
y[1] (numeric) = 1.0304398449562369 " "
absolute error = 8.64317333260089500000000E-8 " "
relative error = 8.387847820453554000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.491000000000056 " "
y[1] (analytic) = 1.0304703865443985 " "
y[1] (numeric) = 1.0304702995553825 " "
absolute error = 8.69890159904684900000000E-8 " "
relative error = 8.441680336120995000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.490000000000056 " "
y[1] (analytic) = 1.0305008721712157 " "
y[1] (numeric) = 1.030500784622334 " "
absolute error = 8.75488816998171200000000E-8 " "
relative error = 8.495760077849895000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4890000000000563 " "
y[1] (analytic) = 1.0305313882989078 " "
y[1] (numeric) = 1.0305313001875696 " "
absolute error = 8.81113382256160100000000E-8 " "
relative error = 8.550087772781078000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4880000000000564 " "
y[1] (analytic) = 1.0305619349579906 " "
y[1] (numeric) = 1.0305618462815975 " "
absolute error = 8.86763931173817400000000E-8 " "
relative error = 8.604664126372619000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4870000000000565 " "
y[1] (analytic) = 1.0305925121790112 " "
y[1] (numeric) = 1.0305924229349568 " "
absolute error = 8.92440543687200700000000E-8 " "
relative error = 8.659489887038752000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4860000000000566 " "
y[1] (analytic) = 1.0306231199925462 " "
y[1] (numeric) = 1.0306230301782169 " "
absolute error = 8.98143293071029800000000E-8 " "
relative error = 8.714565738419740000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4850000000000567 " "
y[1] (analytic) = 1.030653758429204 " "
y[1] (numeric) = 1.030653668041978 " "
absolute error = 9.03872259261362400000000E-8 " "
relative error = 8.769892428655512000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.484000000000057 " "
y[1] (analytic) = 1.0306844275196225 " "
y[1] (numeric) = 1.030684336556871 " "
absolute error = 9.09627515532918100000000E-8 " "
relative error = 8.825470641115322000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.483000000000057 " "
y[1] (analytic) = 1.0307151272944712 " "
y[1] (numeric) = 1.0307150357535568 " "
absolute error = 9.15409144042200800000000E-8 " "
relative error = 8.881301145206458000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.482000000000057 " "
y[1] (analytic) = 1.03074585778445 " "
y[1] (numeric) = 1.030745765662728 " "
absolute error = 9.2121722028437600000000E-8 " "
relative error = 8.937384645566253000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.481000000000057 " "
y[1] (analytic) = 1.0307766190202887 " "
y[1] (numeric) = 1.0307765263151067 " "
absolute error = 9.27051819754609600000000E-8 " "
relative error = 8.99372184669589000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4800000000000573 " "
y[1] (analytic) = 1.0308074110327494 " "
y[1] (numeric) = 1.0308073177414467 " "
absolute error = 9.32913026829851300000000E-8 " "
relative error = 9.050313539123478000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4790000000000574 " "
y[1] (analytic) = 1.0308382338526234 " "
y[1] (numeric) = 1.0308381399725324 " "
absolute error = 9.38800910343928800000000E-8 " "
relative error = 9.107160362448751000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4780000000000575 " "
y[1] (analytic) = 1.030869087510734 " "
y[1] (numeric) = 1.0308689930391786 " "
absolute error = 9.44715554673791800000000E-8 " "
relative error = 9.164263106919043000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4770000000000576 " "
y[1] (analytic) = 1.0308999720379346 " "
y[1] (numeric) = 1.030899876972231 " "
absolute error = 9.5065703531460600000000E-8 " "
relative error = 9.221622476478486000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4760000000000577 " "
y[1] (analytic) = 1.0309308874651097 " "
y[1] (numeric) = 1.0309307918025665 " "
absolute error = 9.56625432202429200000000E-8 " "
relative error = 9.279239218010186000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.475000000000058 " "
y[1] (analytic) = 1.0309618338231752 " "
y[1] (numeric) = 1.0309617375610927 " "
absolute error = 9.62620825273319300000000E-8 " "
relative error = 9.337114078254254000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.474000000000058 " "
y[1] (analytic) = 1.0309928111430768 " "
y[1] (numeric) = 1.0309927142787478 " "
absolute error = 9.68643290022441800000000E-8 " "
relative error = 9.395247760733586000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.473000000000058 " "
y[1] (analytic) = 1.0310238194557921 " "
y[1] (numeric) = 1.0310237219865015 " "
absolute error = 9.74692906385854500000000E-8 " "
relative error = 9.453641011905322000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.472000000000058 " "
y[1] (analytic) = 1.0310548587923296 " "
y[1] (numeric) = 1.0310547607153542 " "
absolute error = 9.80769754299615200000000E-8 " "
relative error = 9.51229457808275000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4710000000000583 " "
y[1] (analytic) = 1.0310859291837284 " "
y[1] (numeric) = 1.0310858304963375 " "
absolute error = 9.86873909258889600000000E-8 " "
relative error = 9.571209162364966000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4700000000000584 " "
y[1] (analytic) = 1.031117030661059 " "
y[1] (numeric) = 1.0311169313605137 " "
absolute error = 9.93005453420181500000000E-8 " "
relative error = 9.630385532314951000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4690000000000585 " "
y[1] (analytic) = 1.031148163255423 " "
y[1] (numeric) = 1.0311480633389765 " "
absolute error = 9.99164464499102700000000E-8 " "
relative error = 9.689824412280917000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4680000000000586 " "
y[1] (analytic) = 1.0311793269979526 " "
y[1] (numeric) = 1.0311792264628503 " "
absolute error = 1.00535102243171080000000E-7 " "
relative error = 9.749526548001743000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4670000000000587 " "
y[1] (analytic) = 1.031210521919812 " "
y[1] (numeric) = 1.031210420763291 " "
absolute error = 1.01156520937450980000000E-7 " "
relative error = 9.809492706603415000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.466000000000059 " "
y[1] (analytic) = 1.0312417480521958 " "
y[1] (numeric) = 1.0312416462714857 " "
absolute error = 1.01780710082266520000000E-7 " "
relative error = 9.869723590468423000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.465000000000059 " "
y[1] (analytic) = 1.0312730054263302 " "
y[1] (numeric) = 1.0312729030186525 " "
absolute error = 1.0240767767122350000000E-7 " "
relative error = 9.930219944900815000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.464000000000059 " "
y[1] (analytic) = 1.0313042940734727 " "
y[1] (numeric) = 1.0313041910360405 " "
absolute error = 1.03037432142016880000000E-7 " "
relative error = 9.990982558119382000000E-6 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.463000000000059 " "
y[1] (analytic) = 1.031335614024912 " "
y[1] (numeric) = 1.0313355103549307 " "
absolute error = 1.03669981266207860000000E-7 " "
relative error = 1.005201215360179600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4620000000000593 " "
y[1] (analytic) = 1.0313669653119677 " "
y[1] (numeric) = 1.0313668610066349 " "
absolute error = 1.04305332815357590000000E-7 " "
relative error = 1.011330945468156700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4610000000000594 " "
y[1] (analytic) = 1.0313983479659914 " "
y[1] (numeric) = 1.0313982430224964 " "
absolute error = 1.04943495005116460000000E-7 " "
relative error = 1.017487522760476500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4600000000000595 " "
y[1] (analytic) = 1.031429762018366 " "
y[1] (numeric) = 1.0314296564338898 " "
absolute error = 1.05584476051134860000000E-7 " "
relative error = 1.023671023846748400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4590000000000596 " "
y[1] (analytic) = 1.0314612075005047 " "
y[1] (numeric) = 1.0314611012722212 " "
absolute error = 1.06228283502929340000000E-7 " "
relative error = 1.029881518863397100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4580000000000597 " "
y[1] (analytic) = 1.031492684443854 " "
y[1] (numeric) = 1.0314925775689279 " "
absolute error = 1.06874926020239510000000E-7 " "
relative error = 1.036119088695843400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.45700000000006 " "
y[1] (analytic) = 1.0315241928798902 " "
y[1] (numeric) = 1.0315240853554786 " "
absolute error = 1.07524411596671140000000E-7 " "
relative error = 1.042383807756132700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.45600000000006 " "
y[1] (analytic) = 1.0315557328401217 " "
y[1] (numeric) = 1.031555624663374 " "
absolute error = 1.0817674778174080000000E-7 " "
relative error = 1.048675746136412100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.45500000000006 " "
y[1] (analytic) = 1.0315873043560888 " "
y[1] (numeric) = 1.0315871955241456 " "
absolute error = 1.08831943235188080000000E-7 " "
relative error = 1.05499498467674900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.45400000000006 " "
y[1] (analytic) = 1.0316189074593631 " "
y[1] (numeric) = 1.031618797969357 " "
absolute error = 1.09490006172663360000000E-7 " "
relative error = 1.061341599896726700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4530000000000602 " "
y[1] (analytic) = 1.0316505421815472 " "
y[1] (numeric) = 1.0316504320306032 " "
absolute error = 1.1015094392163860000000E-7 " "
relative error = 1.067715659691424200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4520000000000604 " "
y[1] (analytic) = 1.0316822085542763 " "
y[1] (numeric) = 1.0316820977395107 " "
absolute error = 1.10814765585942610000000E-7 " "
relative error = 1.074117249159799900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4510000000000605 " "
y[1] (analytic) = 1.0317139066092165 " "
y[1] (numeric) = 1.0317137951277378 " "
absolute error = 1.11481478715091950000000E-7 " "
relative error = 1.080546438319144700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4500000000000606 " "
y[1] (analytic) = 1.031745636378066 " "
y[1] (numeric) = 1.0317455242269742 " "
absolute error = 1.12151091746781620000000E-7 " "
relative error = 1.08700330578074500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4490000000000607 " "
y[1] (analytic) = 1.0317773978925546 " "
y[1] (numeric) = 1.0317772850689417 " "
absolute error = 1.12823612896661980000000E-7 " "
relative error = 1.093487927988232700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.448000000000061 " "
y[1] (analytic) = 1.0318091911844436 " "
y[1] (numeric) = 1.0318090776853934 " "
absolute error = 1.13499050158338830000000E-7 " "
relative error = 1.100000379217886100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.447000000000061 " "
y[1] (analytic) = 1.0318410162855265 " "
y[1] (numeric) = 1.0318409021081145 " "
absolute error = 1.14177411969507150000000E-7 " "
relative error = 1.106540738034709800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.446000000000061 " "
y[1] (analytic) = 1.0318728732276283 " "
y[1] (numeric) = 1.031872758368922 " "
absolute error = 1.14858706323772710000000E-7 " "
relative error = 1.113109078684300100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.445000000000061 " "
y[1] (analytic) = 1.031904762042606 " "
y[1] (numeric) = 1.0319046464996644 " "
absolute error = 1.1554294165883050000000E-7 " "
relative error = 1.119705479700653500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4440000000000612 " "
y[1] (analytic) = 1.0319366827623484 " "
y[1] (numeric) = 1.0319365665322222 " "
absolute error = 1.16230126190330900000000E-7 " "
relative error = 1.126330017450288800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4430000000000613 " "
y[1] (analytic) = 1.0319686354187763 " "
y[1] (numeric) = 1.0319685184985081 " "
absolute error = 1.16920268133924310000000E-7 " "
relative error = 1.132982768284209300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4420000000000615 " "
y[1] (analytic) = 1.0320006200438423 " "
y[1] (numeric) = 1.0320005024304664 " "
absolute error = 1.1761337592730570000000E-7 " "
relative error = 1.13966381068946590000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4410000000000616 " "
y[1] (analytic) = 1.032032636669531 " "
y[1] (numeric) = 1.0320325183600731 " "
absolute error = 1.18309457786125450000000E-7 " "
relative error = 1.146373220985738400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4400000000000617 " "
y[1] (analytic) = 1.0320646853278588 " "
y[1] (numeric) = 1.032064566319337 " "
absolute error = 1.19008521703989350000000E-7 " "
relative error = 1.153111073325637400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.439000000000062 " "
y[1] (analytic) = 1.0320967660508749 " "
y[1] (numeric) = 1.0320966463402983 " "
absolute error = 1.19710576562681580000000E-7 " "
relative error = 1.159877450451973600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.438000000000062 " "
y[1] (analytic) = 1.0321288788706595 " "
y[1] (numeric) = 1.0321287584550292 " "
absolute error = 1.20415630355807930000000E-7 " "
relative error = 1.166672426485779500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.437000000000062 " "
y[1] (analytic) = 1.0321610238193257 " "
y[1] (numeric) = 1.0321609026956342 " "
absolute error = 1.2112369152106339000000E-7 " "
relative error = 1.173496079835169600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.436000000000062 " "
y[1] (analytic) = 1.0321932009290185 " "
y[1] (numeric) = 1.03219307909425 " "
absolute error = 1.21834768496142940000000E-7 " "
relative error = 1.180348488892257600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4350000000000622 " "
y[1] (analytic) = 1.0322254102319148 " "
y[1] (numeric) = 1.0322252876830453 " "
absolute error = 1.22548869496696970000000E-7 " "
relative error = 1.18722972988199700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4340000000000623 " "
y[1] (analytic) = 1.032257651760224 " "
y[1] (numeric) = 1.032257528494221 " "
absolute error = 1.23266002960420450000000E-7 " "
relative error = 1.194139881164601500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4330000000000624 " "
y[1] (analytic) = 1.0322899255461877 " "
y[1] (numeric) = 1.0322898015600102 " "
absolute error = 1.239861775470529900000E-7 " "
relative error = 1.20107902323517810000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4320000000000626 " "
y[1] (analytic) = 1.0323222316220797 " "
y[1] (numeric) = 1.0323221069126782 " "
absolute error = 1.24709401472244960000000E-7 " "
relative error = 1.208047232270587400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4310000000000627 " "
y[1] (analytic) = 1.032354570020206 " "
y[1] (numeric) = 1.032354444584523 " "
absolute error = 1.25435682951646750000000E-7 " "
relative error = 1.215044584431796800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4300000000000628 " "
y[1] (analytic) = 1.032386940772905 " "
y[1] (numeric) = 1.032386814607874 " "
absolute error = 1.26165030867042560000000E-7 " "
relative error = 1.222071162316215300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.429000000000063 " "
y[1] (analytic) = 1.0324193439125475 " "
y[1] (numeric) = 1.032419217015094 " "
absolute error = 1.26897453434082760000000E-7 " "
relative error = 1.229127042052321200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.428000000000063 " "
y[1] (analytic) = 1.0324517794715367 " "
y[1] (numeric) = 1.0324516518385776 " "
absolute error = 1.27632959090462350000000E-7 " "
relative error = 1.236212301903258200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.427000000000063 " "
y[1] (analytic) = 1.0324842474823077 " "
y[1] (numeric) = 1.0324841191107514 " "
absolute error = 1.2837155627387630000000E-7 " "
relative error = 1.243327020115878600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.426000000000063 " "
y[1] (analytic) = 1.0325167479773292 " "
y[1] (numeric) = 1.0325166188640753 " "
absolute error = 1.29113253866108830000000E-7 " "
relative error = 1.250471279221746500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4250000000000633 " "
y[1] (analytic) = 1.0325492809891013 " "
y[1] (numeric) = 1.0325491511310412 " "
absolute error = 1.2985806008281030000000E-7 " "
relative error = 1.257645155284176600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4240000000000634 " "
y[1] (analytic) = 1.0325818465501573 " "
y[1] (numeric) = 1.0325817159441737 " "
absolute error = 1.30605983583720330000000E-7 " "
relative error = 1.264848728651130600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4230000000000635 " "
y[1] (analytic) = 1.0326144446930623 " "
y[1] (numeric) = 1.0326143133360297 " "
absolute error = 1.31357032584489270000000E-7 " "
relative error = 1.272082075353248300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4220000000000637 " "
y[1] (analytic) = 1.032647075450415 " "
y[1] (numeric) = 1.0326469433391987 " "
absolute error = 1.32111216188945950000000E-7 " "
relative error = 1.279345280005972400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4210000000000638 " "
y[1] (analytic) = 1.0326797388548454 " "
y[1] (numeric) = 1.032679605986303 " "
absolute error = 1.32868542390696120000000E-7 " "
relative error = 1.286638416456549500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.420000000000064 " "
y[1] (analytic) = 1.0327124349390178 " "
y[1] (numeric) = 1.0327123013099975 " "
absolute error = 1.3362902029356860000000E-7 " "
relative error = 1.293961569286802000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.419000000000064 " "
y[1] (analytic) = 1.0327451637356277 " "
y[1] (numeric) = 1.0327450293429694 " "
absolute error = 1.34392658335258370000000E-7 " "
relative error = 1.301314816611056400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.418000000000064 " "
y[1] (analytic) = 1.032777925277404 " "
y[1] (numeric) = 1.0327777901179391 " "
absolute error = 1.35159464953460430000000E-7 " "
relative error = 1.308698236527050300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.417000000000064 " "
y[1] (analytic) = 1.0328107195971084 " "
y[1] (numeric) = 1.0328105836676595 " "
absolute error = 1.35929448807914350000000E-7 " "
relative error = 1.316111909265808000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4160000000000643 " "
y[1] (analytic) = 1.0328435467275352 " "
y[1] (numeric) = 1.0328434100249162 " "
absolute error = 1.36702619002448960000000E-7 " "
relative error = 1.323555919341104200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4150000000000644 " "
y[1] (analytic) = 1.0328764067015113 " "
y[1] (numeric) = 1.0328762692225277 " "
absolute error = 1.37478983530670000000E-7 " "
relative error = 1.331030340500359300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4140000000000645 " "
y[1] (analytic) = 1.032909299551897 " "
y[1] (numeric) = 1.0329091612933454 " "
absolute error = 1.3825855149640630000000E-7 " "
relative error = 1.338535257223325300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4130000000000646 " "
y[1] (analytic) = 1.032942225311585 " "
y[1] (numeric) = 1.0329420862702534 " "
absolute error = 1.39041331559397460000000E-7 " "
relative error = 1.346070749672915500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4120000000000648 " "
y[1] (analytic) = 1.0329751840135009 " "
y[1] (numeric) = 1.0329750441861687 " "
absolute error = 1.39827332157338450000000E-7 " "
relative error = 1.353636895845417900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.411000000000065 " "
y[1] (analytic) = 1.0330081756906035 " "
y[1] (numeric) = 1.0330080350740414 " "
absolute error = 1.40616562172013460000000E-7 " "
relative error = 1.361233778019289900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.410000000000065 " "
y[1] (analytic) = 1.0330412003758849 " "
y[1] (numeric) = 1.0330410589668544 " "
absolute error = 1.4140903048520670000000E-7 " "
relative error = 1.36886147845558580000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.409000000000065 " "
y[1] (analytic) = 1.033074258102369 " "
y[1] (numeric) = 1.0330741158976235 " "
absolute error = 1.42204745534613150000000E-7 " "
relative error = 1.37652007509920800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.408000000000065 " "
y[1] (analytic) = 1.0331073489031142 " "
y[1] (numeric) = 1.033107205899398 " "
absolute error = 1.43003716202017020000000E-7 " "
relative error = 1.384209650176712300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4070000000000653 " "
y[1] (analytic) = 1.033140472811211 " "
y[1] (numeric) = 1.0331403290052596 " "
absolute error = 1.4380595136920250000000E-7 " "
relative error = 1.391930285897149000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4060000000000654 " "
y[1] (analytic) = 1.0331736298597836 " "
y[1] (numeric) = 1.0331734852483236 " "
absolute error = 1.44611459917953770000000E-7 " "
relative error = 1.399682064452028300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4050000000000655 " "
y[1] (analytic) = 1.0332068200819886 " "
y[1] (numeric) = 1.0332066746617383 " "
absolute error = 1.45420250285965840000000E-7 " "
relative error = 1.407465063717119300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4040000000000656 " "
y[1] (analytic) = 1.0332400435110165 " "
y[1] (numeric) = 1.033239897278685 " "
absolute error = 1.4623233157706750000000E-7 " "
relative error = 1.415279367998171800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.4030000000000658 " "
y[1] (analytic) = 1.0332733001800907 " "
y[1] (numeric) = 1.0332731531323782 " "
absolute error = 1.47047712450998350000000E-7 " "
relative error = 1.423125057285126700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.402000000000066 " "
y[1] (analytic) = 1.0333065901224676 " "
y[1] (numeric) = 1.0333064422560658 " "
absolute error = 1.47866401789542580000000E-7 " "
relative error = 1.431002213699396000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.401000000000066 " "
y[1] (analytic) = 1.0333399133714378 " "
y[1] (numeric) = 1.0333397646830291 " "
absolute error = 1.486884086965290000000E-7 " "
relative error = 1.438910921493481700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.400000000000066 " "
y[1] (analytic) = 1.033373269960324 " "
y[1] (numeric) = 1.0333731204465824 " "
absolute error = 1.49513741609652580000000E-7 " "
relative error = 1.446851258455651000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.399000000000066 " "
y[1] (analytic) = 1.0334066599224827 " "
y[1] (numeric) = 1.033406509580073 " "
absolute error = 1.50342409632742150000000E-7 " "
relative error = 1.454823308802940500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3980000000000663 " "
y[1] (analytic) = 1.0334400832913044 " "
y[1] (numeric) = 1.0334399321168826 " "
absolute error = 1.51174421869626490000000E-7 " "
relative error = 1.462827156734288200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3970000000000664 " "
y[1] (analytic) = 1.033473540100212 " "
y[1] (numeric) = 1.0334733880904252 " "
absolute error = 1.5200978675800060000000E-7 " "
relative error = 1.470862879984917400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3960000000000665 " "
y[1] (analytic) = 1.0335070303826626 " "
y[1] (numeric) = 1.0335068775341487 " "
absolute error = 1.52848513845782460000000E-7 " "
relative error = 1.478930567015004400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3950000000000666 " "
y[1] (analytic) = 1.0335405541721463 " "
y[1] (numeric) = 1.0335404004815347 " "
absolute error = 1.5369061157066710000000E-7 " "
relative error = 1.487030295524024700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3940000000000667 " "
y[1] (analytic) = 1.033574111502187 " "
y[1] (numeric) = 1.0335739569660978 " "
absolute error = 1.5453608925852790000000E-7 " "
relative error = 1.495162151787321800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.393000000000067 " "
y[1] (analytic) = 1.0336077024063421 " "
y[1] (numeric) = 1.0336075470213866 " "
absolute error = 1.55384955569104480000000E-7 " "
relative error = 1.503326215616938300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.392000000000067 " "
y[1] (analytic) = 1.0336413269182023 " "
y[1] (numeric) = 1.0336411706809827 " "
absolute error = 1.5623721960622560000000E-7 " "
relative error = 1.511522571103520700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.391000000000067 " "
y[1] (analytic) = 1.0336749850713922 " "
y[1] (numeric) = 1.0336748279785017 " "
absolute error = 1.5709289047372010000000E-7 " "
relative error = 1.519751302319367600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.390000000000067 " "
y[1] (analytic) = 1.0337086768995702 " "
y[1] (numeric) = 1.033708518947593 " "
absolute error = 1.57951977275416770000000E-7 " "
relative error = 1.52801249331839100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3890000000000673 " "
y[1] (analytic) = 1.0337424024364277 " "
y[1] (numeric) = 1.0337422436219392 " "
absolute error = 1.58814488449010580000000E-7 " "
relative error = 1.536306221692180500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3880000000000674 " "
y[1] (analytic) = 1.0337761617156904 " "
y[1] (numeric) = 1.0337760020352569 " "
absolute error = 1.59680433542419560000000E-7 " "
relative error = 1.544632575754198400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3870000000000675 " "
y[1] (analytic) = 1.0338099547711177 " "
y[1] (numeric) = 1.033809794221296 " "
absolute error = 1.60549821659472500000000E-7 " "
relative error = 1.55299163950319800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3860000000000676 " "
y[1] (analytic) = 1.0338437816365027 " "
y[1] (numeric) = 1.0338436202138408 " "
absolute error = 1.61422661903998230000000E-7 " "
relative error = 1.56138349691940300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3850000000000677 " "
y[1] (analytic) = 1.033877642345672 " "
y[1] (numeric) = 1.033877480046709 " "
absolute error = 1.6229896293573630000000E-7 " "
relative error = 1.569808227669096400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.384000000000068 " "
y[1] (analytic) = 1.0339115369324865 " "
y[1] (numeric) = 1.0339113737537522 " "
absolute error = 1.63178734302604770000000E-7 " "
relative error = 1.578265919990988500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.383000000000068 " "
y[1] (analytic) = 1.0339454654308409 " "
y[1] (numeric) = 1.0339453013688558 " "
absolute error = 1.6406198510843240000000E-7 " "
relative error = 1.586756657809495200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.382000000000068 " "
y[1] (analytic) = 1.0339794278746635 " "
y[1] (numeric) = 1.0339792629259392 " "
absolute error = 1.6494872423500340000000E-7 " "
relative error = 1.595280522882879800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.381000000000068 " "
y[1] (analytic) = 1.0340134242979167 " "
y[1] (numeric) = 1.0340132584589559 " "
absolute error = 1.65838960786146570000000E-7 " "
relative error = 1.603837599098380500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3800000000000683 " "
y[1] (analytic) = 1.034047454734597 " "
y[1] (numeric) = 1.0340472880018927 " "
absolute error = 1.66732704309779930000000E-7 " "
relative error = 1.612427974619155800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3790000000000684 " "
y[1] (analytic) = 1.034081519218735 " "
y[1] (numeric) = 1.0340813515887712 " "
absolute error = 1.67629963687687680000000E-7 " "
relative error = 1.621051731147219200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3780000000000685 " "
y[1] (analytic) = 1.034115617784395 " "
y[1] (numeric) = 1.0341154492536466 " "
absolute error = 1.68530748467787820000000E-7 " "
relative error = 1.62970895680762400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3770000000000686 " "
y[1] (analytic) = 1.0341497504656756 " "
y[1] (numeric) = 1.0341495810306083 " "
absolute error = 1.69435067309819940000000E-7 " "
relative error = 1.638399731117506600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3760000000000687 " "
y[1] (analytic) = 1.0341839172967096 " "
y[1] (numeric) = 1.0341837469537798 " "
absolute error = 1.70342929761702070000000E-7 " "
relative error = 1.64712414216387700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.375000000000069 " "
y[1] (analytic) = 1.0342181183116637 " "
y[1] (numeric) = 1.0342179470573185 " "
absolute error = 1.7125434514930760000000E-7 " "
relative error = 1.65588227586726300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.374000000000069 " "
y[1] (analytic) = 1.034252353544739 " "
y[1] (numeric) = 1.0342521813754164 " "
absolute error = 1.72169322576465330000000E-7 " "
relative error = 1.66467421598202600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.373000000000069 " "
y[1] (analytic) = 1.0342866230301706 " "
y[1] (numeric) = 1.0342864499422995 " "
absolute error = 1.73087871147004080000000E-7 " "
relative error = 1.673500046243516200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.372000000000069 " "
y[1] (analytic) = 1.0343209268022282 " "
y[1] (numeric) = 1.0343207527922278 " "
absolute error = 1.74010000408841850000000E-7 " "
relative error = 1.682359854661571500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3710000000000693 " "
y[1] (analytic) = 1.0343552648952155 " "
y[1] (numeric) = 1.0343550899594958 " "
absolute error = 1.74935719687852040000000E-7 " "
relative error = 1.691253727079678000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3700000000000694 " "
y[1] (analytic) = 1.0343896373434702 " "
y[1] (numeric) = 1.0343894614784324 " "
absolute error = 1.75865037865818860000000E-7 " "
relative error = 1.700181745028664600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3690000000000695 " "
y[1] (analytic) = 1.0344240441813655 " "
y[1] (numeric) = 1.0344238673834005 " "
absolute error = 1.76797964934749530000000E-7 " "
relative error = 1.709144000753250000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3680000000000696 " "
y[1] (analytic) = 1.0344584854433077 " "
y[1] (numeric) = 1.0344583077087979 " "
absolute error = 1.77734509776428240000000E-7 " "
relative error = 1.71814057574540300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3670000000000697 " "
y[1] (analytic) = 1.0344929611637383 " "
y[1] (numeric) = 1.0344927824890562 " "
absolute error = 1.7867468216081760000000E-7 " "
relative error = 1.727171560063782700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.36600000000007 " "
y[1] (analytic) = 1.0345274713771329 " "
y[1] (numeric) = 1.0345272917586419 " "
absolute error = 1.79618490969701840000000E-7 " "
relative error = 1.736237035161559700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.36500000000007 " "
y[1] (analytic) = 1.0345620161180018 " "
y[1] (numeric) = 1.0345618355520558 " "
absolute error = 1.80565945973043540000000E-7 " "
relative error = 1.745337091057944000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.36400000000007 " "
y[1] (analytic) = 1.0345965954208896 " "
y[1] (numeric) = 1.0345964139038333 " "
absolute error = 1.81517056274671520000000E-7 " "
relative error = 1.75447181131335200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.36300000000007 " "
y[1] (analytic) = 1.0346312093203756 " "
y[1] (numeric) = 1.0346310268485441 " "
absolute error = 1.82471831422503780000000E-7 " "
relative error = 1.763641283761052700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3620000000000703 " "
y[1] (analytic) = 1.034665857851074 " "
y[1] (numeric) = 1.034665674420793 " "
absolute error = 1.83430280964458350000000E-7 " "
relative error = 1.772845596214315800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3610000000000704 " "
y[1] (analytic) = 1.034700541047633 " "
y[1] (numeric) = 1.0347003566552189 " "
absolute error = 1.84392414226408620000000E-7 " "
relative error = 1.78208483432038700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3600000000000705 " "
y[1] (analytic) = 1.034735258944736 " "
y[1] (numeric) = 1.0347350735864955 " "
absolute error = 1.853582405342280000000E-7 " "
relative error = 1.79135908370672200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3590000000000706 " "
y[1] (analytic) = 1.034770011577101 " "
y[1] (numeric) = 1.0347698252493311 " "
absolute error = 1.86327769879923720000000E-7 " "
relative error = 1.800668436418447200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3580000000000707 " "
y[1] (analytic) = 1.0348047989794804 " "
y[1] (numeric) = 1.034804611678469 " "
absolute error = 1.87301011367324580000000E-7 " "
relative error = 1.810012975896902700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.357000000000071 " "
y[1] (analytic) = 1.0348396211866615 " "
y[1] (numeric) = 1.0348394329086872 " "
absolute error = 1.88277974322303980000000E-7 " "
relative error = 1.81939278770949700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.356000000000071 " "
y[1] (analytic) = 1.034874478233467 " "
y[1] (numeric) = 1.0348742889747982 " "
absolute error = 1.89258668736869140000000E-7 " "
relative error = 1.828807963840543300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.355000000000071 " "
y[1] (analytic) = 1.0349093701547534 " "
y[1] (numeric) = 1.0349091799116494 " "
absolute error = 1.90243103936893480000000E-7 " "
relative error = 1.83825858981686300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.354000000000071 " "
y[1] (analytic) = 1.0349442969854128 " "
y[1] (numeric) = 1.0349441057541235 " "
absolute error = 1.9123128924825040000000E-7 " "
relative error = 1.84774475114524700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3530000000000713 " "
y[1] (analytic) = 1.0349792587603721 " "
y[1] (numeric) = 1.0349790665371377 " "
absolute error = 1.9222323444090250000000E-7 " "
relative error = 1.857266537603221600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3520000000000714 " "
y[1] (analytic) = 1.0350142555145934 " "
y[1] (numeric) = 1.0350140622956439 " "
absolute error = 1.93218949506857030000000E-7 " "
relative error = 1.86682404109295600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3510000000000715 " "
y[1] (analytic) = 1.0350492872830728 " "
y[1] (numeric) = 1.0350490930646294 " "
absolute error = 1.94218443327898170000000E-7 " "
relative error = 1.8764173427693198000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3500000000000716 " "
y[1] (analytic) = 1.0350843541008425 " "
y[1] (numeric) = 1.0350841588791164 " "
absolute error = 1.95221726118077750000000E-7 " "
relative error = 1.886046536638678600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3490000000000717 " "
y[1] (analytic) = 1.0351194560029693 " "
y[1] (numeric) = 1.035119259774162 " "
absolute error = 1.96228807203269180000000E-7 " "
relative error = 1.895711708105564700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.348000000000072 " "
y[1] (analytic) = 1.035154593024555 " "
y[1] (numeric) = 1.0351543957848588 " "
absolute error = 1.97239696131390470000000E-7 " "
relative error = 1.905412944699282600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.347000000000072 " "
y[1] (analytic) = 1.0351897652007365 " "
y[1] (numeric) = 1.0351895669463338 " "
absolute error = 1.98254402672404240000000E-7 " "
relative error = 1.91515033607350420000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.346000000000072 " "
y[1] (analytic) = 1.0352249725666862 " "
y[1] (numeric) = 1.0352247732937494 " "
absolute error = 1.9927293681831770000000E-7 " "
relative error = 1.924923974005863800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.345000000000072 " "
y[1] (analytic) = 1.0352602151576116 " "
y[1] (numeric) = 1.0352600148623035 " "
absolute error = 2.00295308117048880000000E-7 " "
relative error = 1.93473394596309500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3440000000000722 " "
y[1] (analytic) = 1.035295493008755 " "
y[1] (numeric) = 1.035295291687229 " "
absolute error = 2.01321526116515770000000E-7 " "
relative error = 1.944580339391212800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3430000000000724 " "
y[1] (analytic) = 1.0353308061553943 " "
y[1] (numeric) = 1.0353306038037937 " "
absolute error = 2.023516005866810000000E-7 " "
relative error = 1.954463243860144200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3420000000000725 " "
y[1] (analytic) = 1.0353661546328428 " "
y[1] (numeric) = 1.0353659512473015 " "
absolute error = 2.0338554129750720000000E-7 " "
relative error = 1.964382748918723800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3410000000000726 " "
y[1] (analytic) = 1.0354015384764486 " "
y[1] (numeric) = 1.0354013340530908 " "
absolute error = 2.04423357796912340000000E-7 " "
relative error = 1.974338941950125300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3400000000000727 " "
y[1] (analytic) = 1.035436957721596 " "
y[1] (numeric) = 1.0354367522565358 " "
absolute error = 2.0546506029894830000000E-7 " "
relative error = 1.984331916749999500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.339000000000073 " "
y[1] (analytic) = 1.0354724124037042 " "
y[1] (numeric) = 1.035472205893046 " "
absolute error = 2.06510658351533040000000E-7 " "
relative error = 1.994361760659054700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.338000000000073 " "
y[1] (analytic) = 1.0355079025582277 " "
y[1] (numeric) = 1.035507694998066 " "
absolute error = 2.0756016172462920000000E-7 " "
relative error = 2.004428563141341000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.337000000000073 " "
y[1] (analytic) = 1.0355434282206566 " "
y[1] (numeric) = 1.0355432196070764 " "
absolute error = 2.08613580188199420000000E-7 " "
relative error = 2.014532413639608700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.336000000000073 " "
y[1] (analytic) = 1.0355789894265168 " "
y[1] (numeric) = 1.0355787797555929 " "
absolute error = 2.0967092395629550000000E-7 " "
relative error = 2.024673405863584600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3350000000000732 " "
y[1] (analytic) = 1.0356145862113693 " "
y[1] (numeric) = 1.035614375479167 " "
absolute error = 2.10732202354790840000000E-7 " "
relative error = 2.034851624924683400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3340000000000733 " "
y[1] (analytic) = 1.035650218610811 " "
y[1] (numeric) = 1.0356500068133854 " "
absolute error = 2.1179742559773730000000E-7 " "
relative error = 2.0450671644895300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3330000000000735 " "
y[1] (analytic) = 1.0356858866604743 " "
y[1] (numeric) = 1.0356856737938707 " "
absolute error = 2.12866603677142050000000E-7 " "
relative error = 2.055320116058754800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3320000000000736 " "
y[1] (analytic) = 1.0357215903960273 " "
y[1] (numeric) = 1.0357213764562812 " "
absolute error = 2.13939746140923150000000E-7 " "
relative error = 2.065610566823458000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3310000000000737 " "
y[1] (analytic) = 1.0357573298531735 " "
y[1] (numeric) = 1.0357571148363105 " "
absolute error = 2.1501686298108780000000E-7 " "
relative error = 2.075938608241064000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.330000000000074 " "
y[1] (analytic) = 1.0357931050676528 " "
y[1] (numeric) = 1.0357928889696884 " "
absolute error = 2.16097964411687830000000E-7 " "
relative error = 2.086304333890824600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.329000000000074 " "
y[1] (analytic) = 1.0358289160752399 " "
y[1] (numeric) = 1.0358286988921799 " "
absolute error = 2.17183059980641250000000E-7 " "
relative error = 2.096707830898840000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.328000000000074 " "
y[1] (analytic) = 1.0358647629117461 " "
y[1] (numeric) = 1.0358645446395862 " "
absolute error = 2.18272159901999880000000E-7 " "
relative error = 2.107149192800530600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.327000000000074 " "
y[1] (analytic) = 1.0359006456130182 " "
y[1] (numeric) = 1.035900426247744 " "
absolute error = 2.19365274167770960000000E-7 " "
relative error = 2.117628510965513200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3260000000000742 " "
y[1] (analytic) = 1.035936564214939 " "
y[1] (numeric) = 1.0359363437525262 " "
absolute error = 2.2046241276996170000000E-7 " "
relative error = 2.12814587674134410000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3250000000000743 " "
y[1] (analytic) = 1.035972518753427 " "
y[1] (numeric) = 1.0359722971898413 " "
absolute error = 2.21563585700579320000000E-7 " "
relative error = 2.13870138145347800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3240000000000745 " "
y[1] (analytic) = 1.0360085092644367 " "
y[1] (numeric) = 1.0360082865956337 " "
absolute error = 2.22668802951631050000000E-7 " "
relative error = 2.149295116405224600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3230000000000746 " "
y[1] (analytic) = 1.0360445357839587 " "
y[1] (numeric) = 1.0360443120058842 " "
absolute error = 2.2377807451512410000000E-7 " "
relative error = 2.159927172877705600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3220000000000747 " "
y[1] (analytic) = 1.0360805983480195 " "
y[1] (numeric) = 1.0360803734566089 " "
absolute error = 2.2489141060511030000000E-7 " "
relative error = 2.170597644272934000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.321000000000075 " "
y[1] (analytic) = 1.0361166969926816 " "
y[1] (numeric) = 1.0361164709838604 " "
absolute error = 2.2600882121359690000000E-7 " "
relative error = 2.18130662182730220000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.320000000000075 " "
y[1] (analytic) = 1.0361528317540438 " "
y[1] (numeric) = 1.0361526046237273 " "
absolute error = 2.27130316554635670000000E-7 " "
relative error = 2.192054198897857300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.319000000000075 " "
y[1] (analytic) = 1.0361890026682405 " "
y[1] (numeric) = 1.0361887744123344 " "
absolute error = 2.28255906176144660000000E-7 " "
relative error = 2.20284046239029590000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.318000000000075 " "
y[1] (analytic) = 1.0362252097714433 " "
y[1] (numeric) = 1.0362249803858423 " "
absolute error = 2.2938560095830950000000E-7 " "
relative error = 2.213665512045439600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.317000000000075 " "
y[1] (analytic) = 1.0362614530998586 " "
y[1] (numeric) = 1.036261222580448 " "
absolute error = 2.30519410671092830000000E-7 " "
relative error = 2.224529436866730400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3160000000000753 " "
y[1] (analytic) = 1.03629773268973 " "
y[1] (numeric) = 1.0362975010323845 " "
absolute error = 2.31657345528546440000000E-7 " "
relative error = 2.235432330120760700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3150000000000754 " "
y[1] (analytic) = 1.0363340485773374 " "
y[1] (numeric) = 1.0363338157779216 " "
absolute error = 2.32799415744722180000000E-7 " "
relative error = 2.246374285051287000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3140000000000756 " "
y[1] (analytic) = 1.036370400798996 " "
y[1] (numeric) = 1.0363701668533647 " "
absolute error = 2.33945631311627270000000E-7 " "
relative error = 2.25735539273666520000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3130000000000757 " "
y[1] (analytic) = 1.0364067893910587 " "
y[1] (numeric) = 1.036406554295056 " "
absolute error = 2.35096002665358130000000E-7 " "
relative error = 2.26837574851751900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3120000000000758 " "
y[1] (analytic) = 1.0364432143899138 " "
y[1] (numeric) = 1.0364429781393738 " "
absolute error = 2.3625054001996660000000E-7 " "
relative error = 2.279435445568832300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.311000000000076 " "
y[1] (analytic) = 1.0364796758319863 " "
y[1] (numeric) = 1.0364794384227327 " "
absolute error = 2.3740925358950450000000E-7 " "
relative error = 2.290534577042575800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.310000000000076 " "
y[1] (analytic) = 1.0365161737537376 " "
y[1] (numeric) = 1.036515935181584 " "
absolute error = 2.38572153588023640000000E-7 " "
relative error = 2.30167323606766200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.309000000000076 " "
y[1] (analytic) = 1.036552708191666 " "
y[1] (numeric) = 1.0365524684524154 " "
absolute error = 2.3973925045162048000000E-7 " "
relative error = 2.31285151789204530000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.308000000000076 " "
y[1] (analytic) = 1.0365892791823053 " "
y[1] (numeric) = 1.036589038271751 " "
absolute error = 2.40910554172302230000000E-7 " "
relative error = 2.32406951345609300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3070000000000763 " "
y[1] (analytic) = 1.036625886762227 " "
y[1] (numeric) = 1.0366256446761517 " "
absolute error = 2.4208607518616532000000E-7 " "
relative error = 2.335327317961268800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3060000000000764 " "
y[1] (analytic) = 1.0366625309680382 " "
y[1] (numeric) = 1.0366622877022145 " "
absolute error = 2.4326582370726157000000E-7 " "
relative error = 2.346625024443580000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3050000000000765 " "
y[1] (analytic) = 1.0366992118363838 " "
y[1] (numeric) = 1.0366989673865734 " "
absolute error = 2.44449810393732040000000E-7 " "
relative error = 2.357962730199433500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3040000000000767 " "
y[1] (analytic) = 1.036735929403944 " "
y[1] (numeric) = 1.036735683765899 " "
absolute error = 2.4563804501553932000000E-7 " "
relative error = 2.369340523934241300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.3030000000000768 " "
y[1] (analytic) = 1.036772683707437 " "
y[1] (numeric) = 1.0367724368768982 " "
absolute error = 2.46830538674913670000000E-7 " "
relative error = 2.38075850718078800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.302000000000077 " "
y[1] (analytic) = 1.0368094747836165 " "
y[1] (numeric) = 1.0368092267563151 " "
absolute error = 2.4802730136386230000000E-7 " "
relative error = 2.392216770739155600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.301000000000077 " "
y[1] (analytic) = 1.036846302669274 " "
y[1] (numeric) = 1.0368460534409305 " "
absolute error = 2.49228343518481670000000E-7 " "
relative error = 2.40371540966934200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.300000000000077 " "
y[1] (analytic) = 1.036883167401237 " "
y[1] (numeric) = 1.0368829169675617 " "
absolute error = 2.50433675352823570000000E-7 " "
relative error = 2.415254516866070500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.299000000000077 " "
y[1] (analytic) = 1.036920069016371 " "
y[1] (numeric) = 1.0369198173730632 " "
absolute error = 2.51643307747073660000000E-7 " "
relative error = 2.426834191624665200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2980000000000773 " "
y[1] (analytic) = 1.0369570075515766 " "
y[1] (numeric) = 1.036956754694326 " "
absolute error = 2.52857250693239170000000E-7 " "
relative error = 2.438454524650699700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2970000000000774 " "
y[1] (analytic) = 1.0369939830437929 " "
y[1] (numeric) = 1.036993728968278 " "
absolute error = 2.5407551484946110000000E-7 " "
relative error = 2.450115613050103700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2960000000000775 " "
y[1] (analytic) = 1.0370309955299954 " "
y[1] (numeric) = 1.0370307402318844 " "
absolute error = 2.55298111095925150000000E-7 " "
relative error = 2.461817556045660400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2950000000000776 " "
y[1] (analytic) = 1.0370680450471965 " "
y[1] (numeric) = 1.037067788522147 " "
absolute error = 2.5652504942463850000000E-7 " "
relative error = 2.473560444271177500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2940000000000778 " "
y[1] (analytic) = 1.037105131632446 " "
y[1] (numeric) = 1.0371048738761053 " "
absolute error = 2.5775634071578680000000E-7 " "
relative error = 2.48534437690099700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.293000000000078 " "
y[1] (analytic) = 1.0371422553228298 " "
y[1] (numeric) = 1.0371419963308348 " "
absolute error = 2.58991994961377260000000E-7 " "
relative error = 2.497169444521004400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.292000000000078 " "
y[1] (analytic) = 1.0371794161554724 " "
y[1] (numeric) = 1.037179155923449 " "
absolute error = 2.60232023485684750000000E-7 " "
relative error = 2.509035750538614600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.291000000000078 " "
y[1] (analytic) = 1.0372166141675339 " "
y[1] (numeric) = 1.0372163526910978 " "
absolute error = 2.6147643605867190000000E-7 " "
relative error = 2.520943383350371000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.290000000000078 " "
y[1] (analytic) = 1.037253849396213 " "
y[1] (numeric) = 1.0372535866709691 " "
absolute error = 2.6272524378256890000000E-7 " "
relative error = 2.532892444173638300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2890000000000783 " "
y[1] (analytic) = 1.0372911218787444 " "
y[1] (numeric) = 1.0372908579002873 " "
absolute error = 2.63978457093472230000000E-7 " "
relative error = 2.544883027778679400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2880000000000784 " "
y[1] (analytic) = 1.0373284316524007 " "
y[1] (numeric) = 1.0373281664163143 " "
absolute error = 2.6523608642747830000000E-7 " "
relative error = 2.55691522891138200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2870000000000785 " "
y[1] (analytic) = 1.0373657787544919 " "
y[1] (numeric) = 1.0373655122563492 " "
absolute error = 2.6649814266477280000000E-7 " "
relative error = 2.568989146574147700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2860000000000786 " "
y[1] (analytic) = 1.037403163222365 " "
y[1] (numeric) = 1.0374028954577283 " "
absolute error = 2.6776463668554130000000E-7 " "
relative error = 2.58110487974429400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2850000000000787 " "
y[1] (analytic) = 1.0374405850934043 " "
y[1] (numeric) = 1.0374403160578256 " "
absolute error = 2.69035578703835650000000E-7 " "
relative error = 2.59326252095307700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.284000000000079 " "
y[1] (analytic) = 1.037478044405032 " "
y[1] (numeric) = 1.0374777740940522 " "
absolute error = 2.7031097982188610000000E-7 " "
relative error = 2.60546217126843200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.283000000000079 " "
y[1] (analytic) = 1.037515541194707 " "
y[1] (numeric) = 1.0375152696038568 " "
absolute error = 2.7159085025374450000000E-7 " "
relative error = 2.617703923172134400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.282000000000079 " "
y[1] (analytic) = 1.0375530754999265 " "
y[1] (numeric) = 1.0375528026247254 " "
absolute error = 2.7287520110164110000000E-7 " "
relative error = 2.6299878776819300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.281000000000079 " "
y[1] (analytic) = 1.0375906473582246 " "
y[1] (numeric) = 1.0375903731941816 " "
absolute error = 2.7416404302371690000000E-7 " "
relative error = 2.642314131509926000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2800000000000793 " "
y[1] (analytic) = 1.0376282568071733 " "
y[1] (numeric) = 1.0376279813497864 " "
absolute error = 2.75457386900157530000000E-7 " "
relative error = 2.654682783483091600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2790000000000794 " "
y[1] (analytic) = 1.0376659038843818 " "
y[1] (numeric) = 1.0376656271291387 " "
absolute error = 2.76755243167059460000000E-7 " "
relative error = 2.667093928123284700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2780000000000795 " "
y[1] (analytic) = 1.0377035886274972 " "
y[1] (numeric) = 1.0377033105698745 " "
absolute error = 2.7805762270460830000000E-7 " "
relative error = 2.679547664207049000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2770000000000796 " "
y[1] (analytic) = 1.0377413110742046 " "
y[1] (numeric) = 1.037741031709668 " "
absolute error = 2.79364536615034350000000E-7 " "
relative error = 2.692044092625105000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2760000000000797 " "
y[1] (analytic) = 1.0377790712622261 " "
y[1] (numeric) = 1.0377787905862308 " "
absolute error = 2.806759953344340000000E-7 " "
relative error = 2.704583307823450500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.27500000000008 " "
y[1] (analytic) = 1.0378168692293221 " "
y[1] (numeric) = 1.0378165872373122 " "
absolute error = 2.8199200996503750000000E-7 " "
relative error = 2.717165410641700400E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.27400000000008 " "
y[1] (analytic) = 1.0378547050132905 " "
y[1] (numeric) = 1.037854421700699 " "
absolute error = 2.83312591387030470000000E-7 " "
relative error = 2.72979049975403300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.27300000000008 " "
y[1] (analytic) = 1.0378925786519668 " "
y[1] (numeric) = 1.0378922940142168 " "
absolute error = 2.8463775003650940000000E-7 " "
relative error = 2.74245866953015400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.27200000000008 " "
y[1] (analytic) = 1.0379304901832251 " "
y[1] (numeric) = 1.0379302042157277 " "
absolute error = 2.85967497459793660000000E-7 " "
relative error = 2.755170025011135500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2710000000000803 " "
y[1] (analytic) = 1.0379684396449769 " "
y[1] (numeric) = 1.0379681523431326 " "
absolute error = 2.87301844315024370000000E-7 " "
relative error = 2.767924662654407000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2700000000000804 " "
y[1] (analytic) = 1.0380064270751712 " "
y[1] (numeric) = 1.03800613843437 " "
absolute error = 2.88640801260342500000000E-7 " "
relative error = 2.780722678891847700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2690000000000805 " "
y[1] (analytic) = 1.038044452511796 " "
y[1] (numeric) = 1.0380441625274164 " "
absolute error = 2.899843796200230000000E-7 " "
relative error = 2.793564176546935500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2680000000000806 " "
y[1] (analytic) = 1.0380825159928764 " "
y[1] (numeric) = 1.0380822246602863 " "
absolute error = 2.9133259005220680000000E-7 " "
relative error = 2.806449251999597000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2670000000000807 " "
y[1] (analytic) = 1.0381206175564759 " "
y[1] (numeric) = 1.0381203248710322 " "
absolute error = 2.9268544365912420000000E-7 " "
relative error = 2.81937800588187900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.266000000000081 " "
y[1] (analytic) = 1.038158757240696 " "
y[1] (numeric) = 1.0381584631977447 " "
absolute error = 2.9404295132096080000000E-7 " "
relative error = 2.8323505366606200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.265000000000081 " "
y[1] (analytic) = 1.0381969350836768 " "
y[1] (numeric) = 1.0381966396785525 " "
absolute error = 2.9540512436199150000000E-7 " "
relative error = 2.845366947054051600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.264000000000081 " "
y[1] (analytic) = 1.0382351511235959 " "
y[1] (numeric) = 1.0382348543516222 " "
absolute error = 2.96771973662401930000000E-7 " "
relative error = 2.858427335476267000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.263000000000081 " "
y[1] (analytic) = 1.038273405398669 " "
y[1] (numeric) = 1.038273107255159 " "
absolute error = 2.9814351010237770000000E-7 " "
relative error = 2.871531800315146000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2620000000000813 " "
y[1] (analytic) = 1.038311697947151 " "
y[1] (numeric) = 1.038311398427406 " "
absolute error = 2.9951974500619370000000E-7 " "
relative error = 2.88468044420933600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2610000000000814 " "
y[1] (analytic) = 1.038350028807334 " "
y[1] (numeric) = 1.0383497279066447 " "
absolute error = 3.00900689254035570000000E-7 " "
relative error = 2.897873365493668000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2600000000000815 " "
y[1] (analytic) = 1.038388398017549 " "
y[1] (numeric) = 1.038388095731195 " "
absolute error = 3.0228635394813350000000E-7 " "
relative error = 2.911110664614964000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2590000000000816 " "
y[1] (analytic) = 1.0384268056161652 " "
y[1] (numeric) = 1.038426501939415 " "
absolute error = 3.0367675019071780000000E-7 " "
relative error = 2.924392441993318000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2580000000000817 " "
y[1] (analytic) = 1.0384652516415902 " "
y[1] (numeric) = 1.038464946569701 " "
absolute error = 3.0507188930606330000000E-7 " "
relative error = 2.93771880016023900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.257000000000082 " "
y[1] (analytic) = 1.03850373613227 " "
y[1] (numeric) = 1.0385034296604878 " "
absolute error = 3.06471782174355670000000E-7 " "
relative error = 2.951089837343845400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.256000000000082 " "
y[1] (analytic) = 1.0385422591266893 " "
y[1] (numeric) = 1.038541951250249 " "
absolute error = 3.0787644034191430000000E-7 " "
relative error = 2.96450565815981060000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.255000000000082 " "
y[1] (analytic) = 1.0385808206633709 " "
y[1] (numeric) = 1.038580511377496 " "
absolute error = 3.0928587491096950000000E-7 " "
relative error = 2.977966362920315000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.254000000000082 " "
y[1] (analytic) = 1.0386194207808763 " "
y[1] (numeric) = 1.0386191100807796 " "
absolute error = 3.10700096761706850000000E-7 " "
relative error = 2.99147204977266700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2530000000000823 " "
y[1] (analytic) = 1.0386580595178057 " "
y[1] (numeric) = 1.0386577473986884 " "
absolute error = 3.12119117218401240000000E-7 " "
relative error = 3.005022821113059000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2520000000000824 " "
y[1] (analytic) = 1.038696736912798 " "
y[1] (numeric) = 1.03869642336985 " "
absolute error = 3.13542948049416740000000E-7 " "
relative error = 3.018618783585720300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2510000000000825 " "
y[1] (analytic) = 1.0387354530045303 " "
y[1] (numeric) = 1.0387351380329304 " "
absolute error = 3.14971599912894360000000E-7 " "
relative error = 3.03226003311856400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2500000000000826 " "
y[1] (analytic) = 1.0387742078317188 " "
y[1] (numeric) = 1.0387738914266347 " "
absolute error = 3.16405084133108970000000E-7 " "
relative error = 3.045946672025635600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2490000000000827 " "
y[1] (analytic) = 1.0388130014331185 " "
y[1] (numeric) = 1.0388126835897062 " "
absolute error = 3.17843412256380000000E-7 " "
relative error = 3.05967880473089760000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.248000000000083 " "
y[1] (analytic) = 1.0388518338475228 " "
y[1] (numeric) = 1.0388515145609274 " "
absolute error = 3.19286595384937750000000E-7 " "
relative error = 3.07345653135556730000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.247000000000083 " "
y[1] (analytic) = 1.0388907051137641 " "
y[1] (numeric) = 1.038890384379119 " "
absolute error = 3.20734645065101630000000E-7 " "
relative error = 3.087279956268156300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.246000000000083 " "
y[1] (analytic) = 1.0389296152707137 " "
y[1] (numeric) = 1.0389292930831413 " "
absolute error = 3.2218757239910190000000E-7 " "
relative error = 3.101149179534646000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.245000000000083 " "
y[1] (analytic) = 1.0389685643572821 " "
y[1] (numeric) = 1.038968240711893 " "
absolute error = 3.2364538915530260000000E-7 " "
relative error = 3.115064307605046600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2440000000000833 " "
y[1] (analytic) = 1.0390075524124178 " "
y[1] (numeric) = 1.0390072273043118 " "
absolute error = 3.2510810599184480000000E-7 " "
relative error = 3.12902543621548400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2430000000000834 " "
y[1] (analytic) = 1.0390465794751094 " "
y[1] (numeric) = 1.0390462528993745 " "
absolute error = 3.26575734899137160000000E-7 " "
relative error = 3.1430326738971800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2420000000000835 " "
y[1] (analytic) = 1.0390856455843835 " "
y[1] (numeric) = 1.0390853175360963 " "
absolute error = 3.2804828720145450000000E-7 " "
relative error = 3.15708612274168800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2410000000000836 " "
y[1] (analytic) = 1.0391247507793067 " "
y[1] (numeric) = 1.0391244212535322 " "
absolute error = 3.2952577444511630000000E-7 " "
relative error = 3.17118588694941300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2400000000000837 " "
y[1] (analytic) = 1.0391638950989839 " "
y[1] (numeric) = 1.039163564090776 " "
absolute error = 3.31008207954397450000000E-7 " "
relative error = 3.185332068555632400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.239000000000084 " "
y[1] (analytic) = 1.0392030785825592 " "
y[1] (numeric) = 1.0392027460869604 " "
absolute error = 3.32495598831528100000000E-7 " "
relative error = 3.19952476743084500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.238000000000084 " "
y[1] (analytic) = 1.0392423012692167 " "
y[1] (numeric) = 1.0392419672812574 " "
absolute error = 3.33987959288961630000000E-7 " "
relative error = 3.213764094100724500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.237000000000084 " "
y[1] (analytic) = 1.0392815631981784 " "
y[1] (numeric) = 1.0392812277128782 " "
absolute error = 3.3548530020688360000000E-7 " "
relative error = 3.22805014624232940000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.236000000000084 " "
y[1] (analytic) = 1.0393208644087069 " "
y[1] (numeric) = 1.0393205274210733 " "
absolute error = 3.3698763357570270000000E-7 " "
relative error = 3.24238303218729900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2350000000000843 " "
y[1] (analytic) = 1.0393602049401027 " "
y[1] (numeric) = 1.0393598664451325 " "
absolute error = 3.3849497027560460000000E-7 " "
relative error = 3.25676284955620100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2340000000000844 " "
y[1] (analytic) = 1.039399584831707 " "
y[1] (numeric) = 1.0393992448243843 " "
absolute error = 3.40007322741087140000000E-7 " "
relative error = 3.27118971089582400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2330000000000845 " "
y[1] (analytic) = 1.0394390041228994 " "
y[1] (numeric) = 1.0394386625981975 " "
absolute error = 3.41524701852335970000000E-7 " "
relative error = 3.28566371376954160000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2320000000000846 " "
y[1] (analytic) = 1.0394784628530993 " "
y[1] (numeric) = 1.0394781198059795 " "
absolute error = 3.43047119821804360000000E-7 " "
relative error = 3.300184968529591400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2310000000000847 " "
y[1] (analytic) = 1.039517961061765 " "
y[1] (numeric) = 1.0395176164871776 " "
absolute error = 3.44574587529677960000000E-7 " "
relative error = 3.314753572682178600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.230000000000085 " "
y[1] (analytic) = 1.0395574987883953 " "
y[1] (numeric) = 1.0395571526812781 " "
absolute error = 3.46107117188410030000000E-7 " "
relative error = 3.32936963652128900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.229000000000085 " "
y[1] (analytic) = 1.0395970760725277 " "
y[1] (numeric) = 1.0395967284278074 " "
absolute error = 3.47644720344320040000000E-7 " "
relative error = 3.34403326390335600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.228000000000085 " "
y[1] (analytic) = 1.0396366929537395 " "
y[1] (numeric) = 1.039636343766331 " "
absolute error = 3.49187408543727430000000E-7 " "
relative error = 3.358744558655791000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.227000000000085 " "
y[1] (analytic) = 1.0396763494716474 " "
y[1] (numeric) = 1.0396759987364539 " "
absolute error = 3.50735193554996270000000E-7 " "
relative error = 3.373503626712641700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2260000000000852 " "
y[1] (analytic) = 1.0397160456659083 " "
y[1] (numeric) = 1.039715693377821 " "
absolute error = 3.5228808714649060000000E-7 " "
relative error = 3.388310573978496300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2250000000000854 " "
y[1] (analytic) = 1.039755781576218 " "
y[1] (numeric) = 1.039755427730117 " "
absolute error = 3.53846100864529940000000E-7 " "
relative error = 3.403165504192887700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2240000000000855 " "
y[1] (analytic) = 1.0397955572423125 " "
y[1] (numeric) = 1.039795201833066 " "
absolute error = 3.5540924647747830000000E-7 " "
relative error = 3.41806852320156840000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2230000000000856 " "
y[1] (analytic) = 1.0398353727039678 " "
y[1] (numeric) = 1.0398350157264318 " "
absolute error = 3.56977535975744330000000E-7 " "
relative error = 3.43301973895605130000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2220000000000857 " "
y[1] (analytic) = 1.0398752280009989 " "
y[1] (numeric) = 1.039874869450018 " "
absolute error = 3.5855098090564750000000E-7 " "
relative error = 3.4480192551072397000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.221000000000086 " "
y[1] (analytic) = 1.0399151231732615 " "
y[1] (numeric) = 1.0399147630436683 " "
absolute error = 3.6012959325759650000000E-7 " "
relative error = 3.46306717954706500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.220000000000086 " "
y[1] (analytic) = 1.0399550582606505 " "
y[1] (numeric) = 1.039954696547266 " "
absolute error = 3.6171338457791080000000E-7 " "
relative error = 3.47816361586706500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.219000000000086 " "
y[1] (analytic) = 1.0399950333031012 " "
y[1] (numeric) = 1.039994670000734 " "
absolute error = 3.6330236707904360000000E-7 " "
relative error = 3.493308674034417700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.218000000000086 " "
y[1] (analytic) = 1.0400350483405882 " "
y[1] (numeric) = 1.0400346834440362 " "
absolute error = 3.64896552085269830000000E-7 " "
relative error = 3.50850245544585100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2170000000000862 " "
y[1] (analytic) = 1.0400751034131273 " "
y[1] (numeric) = 1.040074736917175 " "
absolute error = 3.6649595225313190000000E-7 " "
relative error = 3.523745074278125700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2160000000000863 " "
y[1] (analytic) = 1.040115198560773 " "
y[1] (numeric) = 1.0401148304601942 " "
absolute error = 3.68100578906904730000000E-7 " "
relative error = 3.5390366318678200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2150000000000865 " "
y[1] (analytic) = 1.0401553338236205 " "
y[1] (numeric) = 1.0401549641131766 " "
absolute error = 3.69710443814952300000000E-7 " "
relative error = 3.55437723379154750000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2140000000000866 " "
y[1] (analytic) = 1.0401955092418054 " "
y[1] (numeric) = 1.040195137916246 " "
absolute error = 3.7132555941177260000000E-7 " "
relative error = 3.5697669919997100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2130000000000867 " "
y[1] (analytic) = 1.0402357248555028 " "
y[1] (numeric) = 1.0402353519095653 " "
absolute error = 3.72945937465729570000000E-7 " "
relative error = 3.585206012007853000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.212000000000087 " "
y[1] (analytic) = 1.0402759807049282 " "
y[1] (numeric) = 1.0402756061333385 " "
absolute error = 3.74571589745187340000000E-7 " "
relative error = 3.60069439930127200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.211000000000087 " "
y[1] (analytic) = 1.0403162768303378 " "
y[1] (numeric) = 1.0403159006278093 " "
absolute error = 3.76202528462599160000000E-7 " "
relative error = 3.61623226360374360000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.210000000000087 " "
y[1] (analytic) = 1.0403566132720277 " "
y[1] (numeric) = 1.040356235433262 " "
absolute error = 3.7783876560837370000000E-7 " "
relative error = 3.631819712473708400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.209000000000087 " "
y[1] (analytic) = 1.040396990070334 " "
y[1] (numeric) = 1.040396610590021 " "
absolute error = 3.79480312950875030000000E-7 " "
relative error = 3.647456851304625000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2080000000000872 " "
y[1] (analytic) = 1.040437407265634 " "
y[1] (numeric) = 1.0404370261384512 " "
absolute error = 3.8112718270255640000000E-7 " "
relative error = 3.663143789727764700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2070000000000873 " "
y[1] (analytic) = 1.0404778648983444 " "
y[1] (numeric) = 1.0404774821189575 " "
absolute error = 3.8277938685382650000000E-7 " "
relative error = 3.67888063520913400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2060000000000874 " "
y[1] (analytic) = 1.0405183630089232 " "
y[1] (numeric) = 1.0405179785719854 " "
absolute error = 3.8443693783918320000000E-7 " "
relative error = 3.69466749945177500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2050000000000876 " "
y[1] (analytic) = 1.0405589016378685 " "
y[1] (numeric) = 1.040558515538021 " "
absolute error = 3.86099847426990550000000E-7 " "
relative error = 3.71050448772538230000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2040000000000877 " "
y[1] (analytic) = 1.0405994808257186 " "
y[1] (numeric) = 1.0405990930575908 " "
absolute error = 3.8776812782970180000000E-7 " "
relative error = 3.72639170953657100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.2030000000000878 " "
y[1] (analytic) = 1.040640100613053 " "
y[1] (numeric) = 1.040639711171262 " "
absolute error = 3.8944179103772570000000E-7 " "
relative error = 3.74232927222678700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.202000000000088 " "
y[1] (analytic) = 1.0406807610404913 " "
y[1] (numeric) = 1.040680369919642 " "
absolute error = 3.9112084926351540000000E-7 " "
relative error = 3.75831728523995930000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.201000000000088 " "
y[1] (analytic) = 1.0407214621486942 " "
y[1] (numeric) = 1.0407210693433793 " "
absolute error = 3.9280531494156890000000E-7 " "
relative error = 3.77435586012202730000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.200000000000088 " "
y[1] (analytic) = 1.0407622039783626 " "
y[1] (numeric) = 1.0407618094831625 " "
absolute error = 3.94495200062294770000000E-7 " "
relative error = 3.79044510412002160000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.199000000000088 " "
y[1] (analytic) = 1.0408029865702384 " "
y[1] (numeric) = 1.0408025903797216 " "
absolute error = 3.9619051683814630000000E-7 " "
relative error = 3.80658512658302700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1980000000000883 " "
y[1] (analytic) = 1.040843809965104 " "
y[1] (numeric) = 1.0408434120738268 " "
absolute error = 3.9789127725953220000000E-7 " "
relative error = 3.822776034695082300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1970000000000884 " "
y[1] (analytic) = 1.0408846742037832 " "
y[1] (numeric) = 1.0408842746062892 " "
absolute error = 3.99597493982994930000000E-7 " "
relative error = 3.83901794200845500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1960000000000885 " "
y[1] (analytic) = 1.04092557932714 " "
y[1] (numeric) = 1.0409251780179607 " "
absolute error = 4.01309179220987740000000E-7 " "
relative error = 3.855310957776600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1950000000000887 " "
y[1] (analytic) = 1.0409665253760794 " "
y[1] (numeric) = 1.0409661223497344 " "
absolute error = 4.0302634496391930000000E-7 " "
relative error = 3.871655189087991000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1940000000000888 " "
y[1] (analytic) = 1.0410075123915474 " "
y[1] (numeric) = 1.0410071076425438 " "
absolute error = 4.0474900364628750000000E-7 " "
relative error = 3.88805074726542300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.193000000000089 " "
y[1] (analytic) = 1.0410485404145315 " "
y[1] (numeric) = 1.0410481339373636 " "
absolute error = 4.06477167924634840000000E-7 " "
relative error = 3.90449774573221200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.192000000000089 " "
y[1] (analytic) = 1.0410896094860593 " "
y[1] (numeric) = 1.0410892012752095 " "
absolute error = 4.08210849789369950000000E-7 " "
relative error = 3.920996291480479000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.191000000000089 " "
y[1] (analytic) = 1.0411307196472002 " "
y[1] (numeric) = 1.0411303096971385 " "
absolute error = 4.0995006167499070000000E-7 " "
relative error = 3.93754649573597500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.190000000000089 " "
y[1] (analytic) = 1.041171870939064 " "
y[1] (numeric) = 1.041171459244248 " "
absolute error = 4.116948160159950000000E-7 " "
relative error = 3.954148469691897000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1890000000000893 " "
y[1] (analytic) = 1.0412130634028023 " "
y[1] (numeric) = 1.041212649957677 " "
absolute error = 4.1344512524688070000000E-7 " "
relative error = 3.9708023245088303000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1880000000000894 " "
y[1] (analytic) = 1.0412542970796073 " "
y[1] (numeric) = 1.0412538818786057 " "
absolute error = 4.1520100158010110000000E-7 " "
relative error = 3.987508169182208000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1870000000000895 " "
y[1] (analytic) = 1.0412955720107129 " "
y[1] (numeric) = 1.0412951550482552 " "
absolute error = 4.16962457672198640000000E-7 " "
relative error = 4.0042661169398397000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1860000000000896 " "
y[1] (analytic) = 1.041336888237394 " "
y[1] (numeric) = 1.041336469507888 " "
absolute error = 4.1872950595767120000000E-7 " "
relative error = 4.02107627884409850000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1850000000000898 " "
y[1] (analytic) = 1.0413782458009666 " "
y[1] (numeric) = 1.0413778252988077 " "
absolute error = 4.2050215887101670000000E-7 " "
relative error = 4.037938765924491400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.18400000000009 " "
y[1] (analytic) = 1.0414196447427886 " "
y[1] (numeric) = 1.0414192224623597 " "
absolute error = 4.222804288467330000000E-7 " "
relative error = 4.05485368917760770000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.18300000000009 " "
y[1] (analytic) = 1.0414610851042587 " "
y[1] (numeric) = 1.0414606610399302 " "
absolute error = 4.24064328541362560000000E-7 " "
relative error = 4.07182116169909800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.18200000000009 " "
y[1] (analytic) = 1.0415025669268174 " "
y[1] (numeric) = 1.041502141072947 " "
absolute error = 4.25853870389403260000000E-7 " "
relative error = 4.088841294419262600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.18100000000009 " "
y[1] (analytic) = 1.0415440902519466 " "
y[1] (numeric) = 1.0415436626028793 " "
absolute error = 4.2764906726944220000000E-7 " "
relative error = 4.10591420249905200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1800000000000903 " "
y[1] (analytic) = 1.0415856551211695 " "
y[1] (numeric) = 1.0415852256712381 " "
absolute error = 4.2944993139393260000000E-7 " "
relative error = 4.12303999467018300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1790000000000904 " "
y[1] (analytic) = 1.041627261576051 " "
y[1] (numeric) = 1.0416268303195755 " "
absolute error = 4.31256475419417030000000E-7 " "
relative error = 4.14021878389489800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1780000000000905 " "
y[1] (analytic) = 1.0416689096581973 " "
y[1] (numeric) = 1.0416684765894855 " "
absolute error = 4.3306871178039330000000E-7 " "
relative error = 4.15745068097017600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1770000000000906 " "
y[1] (analytic) = 1.0417105994092568 " "
y[1] (numeric) = 1.0417101645226032 " "
absolute error = 4.3488665357749310000000E-7 " "
relative error = 4.174735803054253600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1760000000000908 " "
y[1] (analytic) = 1.0417523308709193 " "
y[1] (numeric) = 1.041751894160606 " "
absolute error = 4.36710313245214370000000E-7 " "
relative error = 4.19207426087656100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.175000000000091 " "
y[1] (analytic) = 1.0417941040849161 " "
y[1] (numeric) = 1.041793665545213 " "
absolute error = 4.3853970321805490000000E-7 " "
relative error = 4.20946616513304600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.174000000000091 " "
y[1] (analytic) = 1.0418359190930204 " "
y[1] (numeric) = 1.041835478718184 " "
absolute error = 4.40374836374601840000000E-7 " "
relative error = 4.2269116307486700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.173000000000091 " "
y[1] (analytic) = 1.0418777759370474 " "
y[1] (numeric) = 1.0418773337213219 " "
absolute error = 4.42215725593442240000000E-7 " "
relative error = 4.244410772614098400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.172000000000091 " "
y[1] (analytic) = 1.041919674658854 " "
y[1] (numeric) = 1.0419192305964704 " "
absolute error = 4.4406238353111860000000E-7 " "
relative error = 4.26196370345452770000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1710000000000913 " "
y[1] (analytic) = 1.0419616153003384 " "
y[1] (numeric) = 1.0419611693855155 " "
absolute error = 4.4591482284417340000000E-7 " "
relative error = 4.279570535961072500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1700000000000914 " "
y[1] (analytic) = 1.0420035979034417 " "
y[1] (numeric) = 1.0420031501303852 " "
absolute error = 4.4777305641119370000000E-7 " "
relative error = 4.297231384921638700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1690000000000915 " "
y[1] (analytic) = 1.0420456225101464 " "
y[1] (numeric) = 1.0420451728730495 " "
absolute error = 4.496370968887220000000E-7 " "
relative error = 4.31494636295872800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1680000000000916 " "
y[1] (analytic) = 1.0420876891624773 " "
y[1] (numeric) = 1.04208723765552 " "
absolute error = 4.51506957377390000000E-7 " "
relative error = 4.33271558692210200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1670000000000917 " "
y[1] (analytic) = 1.0421297979025006 " "
y[1] (numeric) = 1.0421293445198503 " "
absolute error = 4.53382650311695560000000E-7 " "
relative error = 4.350539167234454600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.166000000000092 " "
y[1] (analytic) = 1.0421719487723256 " "
y[1] (numeric) = 1.0421714935081365 " "
absolute error = 4.552641890143150000000E-7 " "
relative error = 4.368417222806796300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.165000000000092 " "
y[1] (analytic) = 1.0422141418141027 " "
y[1] (numeric) = 1.0422136846625167 " "
absolute error = 4.57151585919746140000000E-7 " "
relative error = 4.38634986399260740000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.164000000000092 " "
y[1] (analytic) = 1.042256377070025 " "
y[1] (numeric) = 1.0422559180251711 " "
absolute error = 4.5904485390657610000000E-7 " "
relative error = 4.40433720537202100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.163000000000092 " "
y[1] (analytic) = 1.042298654582328 " "
y[1] (numeric) = 1.0422981936383218 " "
absolute error = 4.6094400629748120000000E-7 " "
relative error = 4.422379365750900000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1620000000000923 " "
y[1] (analytic) = 1.0423409743932892 " "
y[1] (numeric) = 1.0423405115442335 " "
absolute error = 4.6284905574900390000000E-7 " "
relative error = 4.440476457508661400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1610000000000924 " "
y[1] (analytic) = 1.0423833365452284 " "
y[1] (numeric) = 1.042382871785213 " "
absolute error = 4.6476001536177590000000E-7 " "
relative error = 4.458628597250319000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1600000000000925 " "
y[1] (analytic) = 1.0424257410805076 " "
y[1] (numeric) = 1.0424252744036098 " "
absolute error = 4.66676897792339700000000E-7 " "
relative error = 4.47683589728525100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1590000000000926 " "
y[1] (analytic) = 1.0424681880415312 " "
y[1] (numeric) = 1.042467719441815 " "
absolute error = 4.6859971614132690000000E-7 " "
relative error = 4.49509847414795400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1580000000000927 " "
y[1] (analytic) = 1.0425106774707467 " "
y[1] (numeric) = 1.0425102069422627 " "
absolute error = 4.7052848395345850000000E-7 " "
relative error = 4.5134164485971100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.157000000000093 " "
y[1] (analytic) = 1.042553209410643 " "
y[1] (numeric) = 1.0425527369474294 " "
absolute error = 4.7246321344118770000000E-7 " "
relative error = 4.53178992857613400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.156000000000093 " "
y[1] (analytic) = 1.0425957839037523 " "
y[1] (numeric) = 1.042595309499834 " "
absolute error = 4.74403918371280040000000E-7 " "
relative error = 4.550219036902175600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.155000000000093 " "
y[1] (analytic) = 1.042638400992649 " "
y[1] (numeric) = 1.0426379246420376 " "
absolute error = 4.763506114002780000000E-7 " "
relative error = 4.568703885707317600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.154000000000093 " "
y[1] (analytic) = 1.0426810607199504 " "
y[1] (numeric) = 1.0426805824166445 " "
absolute error = 4.7830330585085790000000E-7 " "
relative error = 4.58724459347711830000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1530000000000933 " "
y[1] (analytic) = 1.042723763128316 " "
y[1] (numeric) = 1.0427232828663013 " "
absolute error = 4.8026201460160680000000E-7 " "
relative error = 4.605841274401900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1520000000000934 " "
y[1] (analytic) = 1.0427665082604483 " "
y[1] (numeric) = 1.0427660260336973 " "
absolute error = 4.822267509752009600000E-7 " "
relative error = 4.624494046895078000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1510000000000935 " "
y[1] (analytic) = 1.0428092961590922 " "
y[1] (numeric) = 1.0428088119615644 " "
absolute error = 4.8419752785022750000000E-7 " "
relative error = 4.643203025075044500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1500000000000936 " "
y[1] (analytic) = 1.042852126867036 " "
y[1] (numeric) = 1.0428516406926773 " "
absolute error = 4.8617435877140736000000E-7 " "
relative error = 4.66196832941200570000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1490000000000937 " "
y[1] (analytic) = 1.0428950004271105 " "
y[1] (numeric) = 1.0428945122698536 " "
absolute error = 4.8815725683937217000000E-7 " "
relative error = 4.68079007608101170000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.148000000000094 " "
y[1] (analytic) = 1.0429379168821886 " "
y[1] (numeric) = 1.0429374267359537 " "
absolute error = 4.901462349327090400000E-7 " "
relative error = 4.69966837909179650000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.147000000000094 " "
y[1] (analytic) = 1.0429808762751875 " "
y[1] (numeric) = 1.0429803841338807 " "
absolute error = 4.9214130681818347000000E-7 " "
relative error = 4.71860336093385240000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.146000000000094 " "
y[1] (analytic) = 1.043023878649066 " "
y[1] (numeric) = 1.0430233845065808 " "
absolute error = 4.9414248515233794000000E-7 " "
relative error = 4.7375951334149300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.145000000000094 " "
y[1] (analytic) = 1.0430669240468269 " "
y[1] (numeric) = 1.043066427897043 " "
absolute error = 4.9614978392398257000000E-7 " "
relative error = 4.75664382107958250000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1440000000000943 " "
y[1] (analytic) = 1.0431100125115154 " "
y[1] (numeric) = 1.0431095143482993 " "
absolute error = 4.9816321601170444000000E-7 " "
relative error = 4.7757495377910103000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1430000000000944 " "
y[1] (analytic) = 1.0431531440862198 " "
y[1] (numeric) = 1.0431526439034253 " "
absolute error = 5.0018279451613520000000E-7 " "
relative error = 4.794912399504722700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1420000000000945 " "
y[1] (analytic) = 1.043196318814072 " "
y[1] (numeric) = 1.0431958166055388 " "
absolute error = 5.0220853320404050000000E-7 " "
relative error = 4.81413252852504200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1410000000000946 " "
y[1] (analytic) = 1.0432395367382468 " "
y[1] (numeric) = 1.0432390324978014 " "
absolute error = 5.0424044539809640000000E-7 " "
relative error = 4.83341004286163700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1400000000000947 " "
y[1] (analytic) = 1.0432827979019619 " "
y[1] (numeric) = 1.0432822916234175 " "
absolute error = 5.0627854442097940000000E-7 " "
relative error = 4.852745060486991500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.139000000000095 " "
y[1] (analytic) = 1.0433261023484783 " "
y[1] (numeric) = 1.043325594025635 " "
absolute error = 5.0832284337332110000000E-7 " "
relative error = 4.872137697208093000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.138000000000095 " "
y[1] (analytic) = 1.0433694501211008 " "
y[1] (numeric) = 1.0433689397477448 " "
absolute error = 5.103733560218870000000E-7 " "
relative error = 4.891588075179405500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.137000000000095 " "
y[1] (analytic) = 1.043412841263177 " "
y[1] (numeric) = 1.0434123288330814 " "
absolute error = 5.1243009546730890000000E-7 " "
relative error = 4.91109631013310600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.136000000000095 " "
y[1] (analytic) = 1.043456275818098 " "
y[1] (numeric) = 1.0434557613250224 " "
absolute error = 5.1449307569839680000000E-7 " "
relative error = 4.93066252627615050000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1350000000000953 " "
y[1] (analytic) = 1.0434997538292987 " "
y[1] (numeric) = 1.043499237266989 " "
absolute error = 5.1656230981578230000000E-7 " "
relative error = 4.950286839265362600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1340000000000954 " "
y[1] (analytic) = 1.0435432753402565 " "
y[1] (numeric) = 1.0435427567024453 " "
absolute error = 5.1863781114214190000000E-7 " "
relative error = 4.969969366848111500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1330000000000955 " "
y[1] (analytic) = 1.0435868403944935 " "
y[1] (numeric) = 1.0435863196748998 " "
absolute error = 5.2071959366628560000000E-7 " "
relative error = 4.98971023311720600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1320000000000956 " "
y[1] (analytic) = 1.0436304490355746 " "
y[1] (numeric) = 1.0436299262279036 " "
absolute error = 5.2280767093293430000000E-7 " "
relative error = 5.00950955787141100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1310000000000957 " "
y[1] (analytic) = 1.0436741013071082 " "
y[1] (numeric) = 1.0436735764050522 " "
absolute error = 5.2490205604271980000000E-7 " "
relative error = 5.029367456616265000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.130000000000096 " "
y[1] (analytic) = 1.0437177972527467 " "
y[1] (numeric) = 1.043717270249984 " "
absolute error = 5.2700276276240740000000E-7 " "
relative error = 5.049284051202093000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.129000000000096 " "
y[1] (analytic) = 1.0437615369161863 " "
y[1] (numeric) = 1.0437610078063813 " "
absolute error = 5.2910980508080740000000E-7 " "
relative error = 5.069259465567898000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.128000000000096 " "
y[1] (analytic) = 1.0438053203411664 " "
y[1] (numeric) = 1.0438047891179703 " "
absolute error = 5.3122319609855140000000E-7 " "
relative error = 5.08929381510454300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.127000000000096 " "
y[1] (analytic) = 1.0438491475714704 " "
y[1] (numeric) = 1.0438486142285206 " "
absolute error = 5.3334294980444950000000E-7 " "
relative error = 5.109387223673836000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1260000000000963 " "
y[1] (analytic) = 1.0438930186509257 " "
y[1] (numeric) = 1.043892483181846 " "
absolute error = 5.3546907974322270000000E-7 " "
relative error = 5.12953981084417800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1250000000000964 " "
y[1] (analytic) = 1.0439369336234032 " "
y[1] (numeric) = 1.0439363960218038 " "
absolute error = 5.3760159945959170000000E-7 " "
relative error = 5.1497516961453690000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1240000000000965 " "
y[1] (analytic) = 1.043980892532818 " "
y[1] (numeric) = 1.0439803527922953 " "
absolute error = 5.3974052272032220000000E-7 " "
relative error = 5.17002300119544800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1230000000000966 " "
y[1] (analytic) = 1.044024895423129 " "
y[1] (numeric) = 1.0440243535372655 " "
absolute error = 5.4188586351422430000000E-7 " "
relative error = 5.19035384970015800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1220000000000967 " "
y[1] (analytic) = 1.0440689423383394 " "
y[1] (numeric) = 1.0440683983007037 " "
absolute error = 5.4403763560806340000000E-7 " "
relative error = 5.21074436319899100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.121000000000097 " "
y[1] (analytic) = 1.0441130333224955 " "
y[1] (numeric) = 1.044112487126643 " "
absolute error = 5.4619585254656040000000E-7 " "
relative error = 5.23119466106555900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.120000000000097 " "
y[1] (analytic) = 1.0441571684196886 " "
y[1] (numeric) = 1.0441566200591605 " "
absolute error = 5.483605280964810000000E-7 " "
relative error = 5.25170486476105600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.119000000000097 " "
y[1] (analytic) = 1.044201347674054 " "
y[1] (numeric) = 1.0442007971423777 " "
absolute error = 5.505316762466350000000E-7 " "
relative error = 5.27227509783374400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.118000000000097 " "
y[1] (analytic) = 1.0442455711297705 " "
y[1] (numeric) = 1.04424501842046 " "
absolute error = 5.5270931054174350000000E-7 " "
relative error = 5.29290547953932700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1170000000000972 " "
y[1] (analytic) = 1.044289838831062 " "
y[1] (numeric) = 1.0442892839376166 " "
absolute error = 5.5489344541470590000000E-7 " "
relative error = 5.31359613759942700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1160000000000974 " "
y[1] (analytic) = 1.044334150822196 " "
y[1] (numeric) = 1.0443335937381018 " "
absolute error = 5.5708409418819830000000E-7 " "
relative error = 5.3343471890640590000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1150000000000975 " "
y[1] (analytic) = 1.0443785071474843 " "
y[1] (numeric) = 1.0443779478662134 " "
absolute error = 5.5928127085103090000000E-7 " "
relative error = 5.355158757322557000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1140000000000976 " "
y[1] (analytic) = 1.0444229078512837 " "
y[1] (numeric) = 1.044422346366294 " "
absolute error = 5.6148498961405830000000E-7 " "
relative error = 5.3760309678501310000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1130000000000977 " "
y[1] (analytic) = 1.0444673529779944 " "
y[1] (numeric) = 1.0444667892827302 " "
absolute error = 5.6369526424404630000000E-7 " "
relative error = 5.39696394182961700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.112000000000098 " "
y[1] (analytic) = 1.044511842572062 " "
y[1] (numeric) = 1.0445112766599531 " "
absolute error = 5.6591210895184930000000E-7 " "
relative error = 5.417957804655589000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.111000000000098 " "
y[1] (analytic) = 1.044556376677976 " "
y[1] (numeric) = 1.0445558085424387 " "
absolute error = 5.6813553728218840000000E-7 " "
relative error = 5.439012675304721000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.110000000000098 " "
y[1] (analytic) = 1.0446009553402702 " "
y[1] (numeric) = 1.0446003849747068 " "
absolute error = 5.7036556344591820000000E-7 " "
relative error = 5.46012867909091900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.109000000000098 " "
y[1] (analytic) = 1.0446455786035234 " "
y[1] (numeric) = 1.044645006001322 " "
absolute error = 5.7260220143184880000000E-7 " "
relative error = 5.481305939161686000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1080000000000982 " "
y[1] (analytic) = 1.044690246512359 " "
y[1] (numeric) = 1.0446896716668936 " "
absolute error = 5.748454654508350000000E-7 " "
relative error = 5.502544580749413000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1070000000000983 " "
y[1] (analytic) = 1.044734959111445 " "
y[1] (numeric) = 1.0447343820160755 " "
absolute error = 5.7709536949168690000000E-7 " "
relative error = 5.523844726920126000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1060000000000985 " "
y[1] (analytic) = 1.0447797164454935 " "
y[1] (numeric) = 1.0447791370935662 " "
absolute error = 5.79351927321170000000E-7 " "
relative error = 5.54520649857385500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1050000000000986 " "
y[1] (analytic) = 1.0448245185592624 " "
y[1] (numeric) = 1.0448239369441088 " "
absolute error = 5.8161515359422820000000E-7 " "
relative error = 5.566630025070942000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.1040000000000987 " "
y[1] (analytic) = 1.0448693654975536 " "
y[1] (numeric) = 1.0448687816124913 " "
absolute error = 5.8388506229967160000000E-7 " "
relative error = 5.58811542935449100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.103000000000099 " "
y[1] (analytic) = 1.044914257305214 " "
y[1] (numeric) = 1.0449136711435465 " "
absolute error = 5.8616166742631040000000E-7 " "
relative error = 5.609662834326661000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.102000000000099 " "
y[1] (analytic) = 1.0449591940271354 " "
y[1] (numeric) = 1.044958605582152 " "
absolute error = 5.8844498340704380000000E-7 " "
relative error = 5.63127236709841400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.101000000000099 " "
y[1] (analytic) = 1.0450041757082547 " "
y[1] (numeric) = 1.0450035849732304 " "
absolute error = 5.9073502423068190000000E-7 " "
relative error = 5.65294415048925100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.100000000000099 " "
y[1] (analytic) = 1.0450492023935534 " "
y[1] (numeric) = 1.0450486093617493 " "
absolute error = 5.9303180410807950000000E-7 " "
relative error = 5.674678309402227000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0990000000000992 " "
y[1] (analytic) = 1.0450942741280582 " "
y[1] (numeric) = 1.0450936787927207 " "
absolute error = 5.953353374721360000000E-7 " "
relative error = 5.696474970823425000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0980000000000993 " "
y[1] (analytic) = 1.045139390956841 " "
y[1] (numeric) = 1.0451387933112026 " "
absolute error = 5.9764563831166130000000E-7 " "
relative error = 5.71833425744778100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0970000000000995 " "
y[1] (analytic) = 1.0451845529250183 " "
y[1] (numeric) = 1.0451839529622973 " "
absolute error = 5.9996272105955480000000E-7 " "
relative error = 5.74025629617773600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0960000000000996 " "
y[1] (analytic) = 1.0452297600777525 " "
y[1] (numeric) = 1.0452291577911523 " "
absolute error = 6.0228660014871590000000E-7 " "
relative error = 5.76224121387352200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0950000000000997 " "
y[1] (analytic) = 1.0452750124602503 " "
y[1] (numeric) = 1.0452744078429606 " "
absolute error = 6.0461728978999930000000E-7 " "
relative error = 5.784289135228817000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0940000000001 " "
y[1] (analytic) = 1.0453203101177646 " "
y[1] (numeric) = 1.0453197031629602 " "
absolute error = 6.0695480441630420000000E-7 " "
relative error = 5.80640018701947400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0930000000001 " "
y[1] (analytic) = 1.0453656530955926 " "
y[1] (numeric) = 1.0453650437964344 " "
absolute error = 6.0929915823848550000000E-7 " "
relative error = 5.82857449385481800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0920000000001 " "
y[1] (analytic) = 1.0454110414390776 " "
y[1] (numeric) = 1.0454104297887117 " "
absolute error = 6.1165036591148690000000E-7 " "
relative error = 5.85081218455000900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0910000000001 " "
y[1] (analytic) = 1.0454564751936077 " "
y[1] (numeric) = 1.045455861185166 " "
absolute error = 6.1400844164616330000000E-7 " "
relative error = 5.87311338362943600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0900000000001002 " "
y[1] (analytic) = 1.045501954404617 " "
y[1] (numeric) = 1.0455013380312168 " "
absolute error = 6.1637340009745860000000E-7 " "
relative error = 5.89547821982279600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0890000000001003 " "
y[1] (analytic) = 1.0455474791175843 " "
y[1] (numeric) = 1.0455468603723288 " "
absolute error = 6.1874525547622740000000E-7 " "
relative error = 5.917906817569230000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0880000000001004 " "
y[1] (analytic) = 1.0455930493780348 " "
y[1] (numeric) = 1.045592428254012 " "
absolute error = 6.2112402265945830000000E-7 " "
relative error = 5.94039930763627900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0870000000001006 " "
y[1] (analytic) = 1.0456386652315381 " "
y[1] (numeric) = 1.0456380417218225 " "
absolute error = 6.2350971563596150000000E-7 " "
relative error = 5.96295581225371300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0860000000001007 " "
y[1] (analytic) = 1.0456843267237106 " "
y[1] (numeric) = 1.0456837008213615 " "
absolute error = 6.2590234906068080000000E-7 " "
relative error = 5.9855764599793590000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0850000000001008 " "
y[1] (analytic) = 1.0457300339002136 " "
y[1] (numeric) = 1.0457294055982758 " "
absolute error = 6.2830193781060470000000E-7 " "
relative error = 6.00826138145095100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.084000000000101 " "
y[1] (analytic) = 1.0457757868067543 " "
y[1] (numeric) = 1.045775156098258 " "
absolute error = 6.3070849631863270000000E-7 " "
relative error = 6.03101070301582100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.083000000000101 " "
y[1] (analytic) = 1.0458215854890858 " "
y[1] (numeric) = 1.0458209523670465 " "
absolute error = 6.3312203923970860000000E-7 " "
relative error = 6.05382455310123100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.082000000000101 " "
y[1] (analytic) = 1.0458674299930064 " "
y[1] (numeric) = 1.0458667944504256 " "
absolute error = 6.3554258078468710000000E-7 " "
relative error = 6.07670305584462900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.081000000000101 " "
y[1] (analytic) = 1.045913320364361 " "
y[1] (numeric) = 1.0459126823942249 " "
absolute error = 6.3797013605260130000000E-7 " "
relative error = 6.099646343832337000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0800000000001013 " "
y[1] (analytic) = 1.0459592566490397 " "
y[1] (numeric) = 1.0459586162443202 " "
absolute error = 6.4040471947635070000000E-7 " "
relative error = 6.12265454323744800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0790000000001014 " "
y[1] (analytic) = 1.0460052388929788 " "
y[1] (numeric) = 1.0460045960466329 " "
absolute error = 6.4284634593292370000000E-7 " "
relative error = 6.14572778443508300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0780000000001015 " "
y[1] (analytic) = 1.0460512671421607 " "
y[1] (numeric) = 1.0460506218471308 " "
absolute error = 6.4529502985521960000000E-7 " "
relative error = 6.16886619351059500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0770000000001017 " "
y[1] (analytic) = 1.0460973414426133 " "
y[1] (numeric) = 1.0460966936918272 " "
absolute error = 6.477507861202270000000E-7 " "
relative error = 6.19206990075083000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0760000000001018 " "
y[1] (analytic) = 1.0461434618404115 " "
y[1] (numeric) = 1.046142811626782 " "
absolute error = 6.5021362960493430000000E-7 " "
relative error = 6.21533903639808900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.075000000000102 " "
y[1] (analytic) = 1.0461896283816754 " "
y[1] (numeric) = 1.0461889756981004 " "
absolute error = 6.5268357496428560000000E-7 " "
relative error = 6.23867372852764300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.074000000000102 " "
y[1] (analytic) = 1.0462358411125714 " "
y[1] (numeric) = 1.0462351859519343 " "
absolute error = 6.5516063707526940000000E-7 " "
relative error = 6.26207410729275900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.073000000000102 " "
y[1] (analytic) = 1.0462821000793125 " "
y[1] (numeric) = 1.0462814424344817 " "
absolute error = 6.5764483081487410000000E-7 " "
relative error = 6.2855403028019100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.072000000000102 " "
y[1] (analytic) = 1.0463284053281574 " "
y[1] (numeric) = 1.0463277451919868 " "
absolute error = 6.6013617061599920000000E-7 " "
relative error = 6.30907244087445400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0710000000001023 " "
y[1] (analytic) = 1.0463747569054116 " "
y[1] (numeric) = 1.0463740942707398 " "
absolute error = 6.6263467179972220000000E-7 " "
relative error = 6.33267065577368400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0700000000001024 " "
y[1] (analytic) = 1.0464211548574265 " "
y[1] (numeric) = 1.0464204897170775 " "
absolute error = 6.6514034902098730000000E-7 " "
relative error = 6.35633507535129800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0690000000001025 " "
y[1] (analytic) = 1.0464675992306 " "
y[1] (numeric) = 1.0464669315773827 " "
absolute error = 6.6765321737882740000000E-7 " "
relative error = 6.38006583165794700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0680000000001026 " "
y[1] (analytic) = 1.046514090071377 " "
y[1] (numeric) = 1.046513419898085 " "
absolute error = 6.7017329197227580000000E-7 " "
relative error = 6.4038630566987110000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0670000000001028 " "
y[1] (analytic) = 1.0465606274262476 " "
y[1] (numeric) = 1.0465599547256603 " "
absolute error = 6.7270058723423180000000E-7 " "
relative error = 6.42772687606803600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.066000000000103 " "
y[1] (analytic) = 1.0466072113417495 " "
y[1] (numeric) = 1.0466065361066312 " "
absolute error = 6.7523511826372840000000E-7 " "
relative error = 6.45165742168045600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.065000000000103 " "
y[1] (analytic) = 1.0466538418644669 " "
y[1] (numeric) = 1.0466531640875663 " "
absolute error = 6.7777690060388810000000E-7 " "
relative error = 6.4756548296476300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.064000000000103 " "
y[1] (analytic) = 1.04670051904103 " "
y[1] (numeric) = 1.0466998387150812 " "
absolute error = 6.8032594868761010000000E-7 " "
relative error = 6.49971922542766800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.063000000000103 " "
y[1] (analytic) = 1.0467472429181157 " "
y[1] (numeric) = 1.046746560035838 " "
absolute error = 6.8288227761392760000000E-7 " "
relative error = 6.52385074079767800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0620000000001033 " "
y[1] (analytic) = 1.0467940135424485 " "
y[1] (numeric) = 1.0467933280965458 " "
absolute error = 6.8544590270391840000000E-7 " "
relative error = 6.54804950960987700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0610000000001034 " "
y[1] (analytic) = 1.0468408309607986 " "
y[1] (numeric) = 1.0468401429439598 " "
absolute error = 6.8801683883457090000000E-7 " "
relative error = 6.57231566142776100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0600000000001035 " "
y[1] (analytic) = 1.0468876952199837 " "
y[1] (numeric) = 1.0468870046248822 " "
absolute error = 6.9059510154900750000000E-7 " "
relative error = 6.59664933213196200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0590000000001036 " "
y[1] (analytic) = 1.0469346063668679 " "
y[1] (numeric) = 1.0469339131861624 " "
absolute error = 6.9318070550217210000000E-7 " "
relative error = 6.62105064907241200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0580000000001037 " "
y[1] (analytic) = 1.0469815644483622 " "
y[1] (numeric) = 1.0469808686746962 " "
absolute error = 6.9577366601514260000000E-7 " "
relative error = 6.64551974591581800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.057000000000104 " "
y[1] (analytic) = 1.047028569511425 " "
y[1] (numeric) = 1.0470278711374268 " "
absolute error = 6.9837399818695190000000E-7 " "
relative error = 6.67005675416129400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.056000000000104 " "
y[1] (analytic) = 1.0470756216030612 " "
y[1] (numeric) = 1.0470749206213437 " "
absolute error = 7.0098171756072250000000E-7 " "
relative error = 6.69466180950261400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.055000000000104 " "
y[1] (analytic) = 1.047122720770323 " "
y[1] (numeric) = 1.0471220171734839 " "
absolute error = 7.0359683923548740000000E-7 " "
relative error = 6.71933504334507700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.054000000000104 " "
y[1] (analytic) = 1.0471698670603096 " "
y[1] (numeric) = 1.0471691608409313 " "
absolute error = 7.0621937831027990000000E-7 " "
relative error = 6.74407658704723500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0530000000001043 " "
y[1] (analytic) = 1.047217060520167 " "
y[1] (numeric) = 1.047216351670817 " "
absolute error = 7.0884934988413310000000E-7 " "
relative error = 6.76888657192080100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0520000000001044 " "
y[1] (analytic) = 1.0472643011970888 " "
y[1] (numeric) = 1.0472635897103193 " "
absolute error = 7.1148676950016920000000E-7 " "
relative error = 6.79376513347103700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0510000000001045 " "
y[1] (analytic) = 1.0473115891383158 " "
y[1] (numeric) = 1.0473108750066633 " "
absolute error = 7.1413165247946610000000E-7 " "
relative error = 6.81871240503529300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0500000000001046 " "
y[1] (analytic) = 1.0473589243911359 " "
y[1] (numeric) = 1.0473582076071215 " "
absolute error = 7.167840143651460000000E-7 " "
relative error = 6.8437285220234900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0490000000001047 " "
y[1] (analytic) = 1.0474063070028845 " "
y[1] (numeric) = 1.047405587559014 " "
absolute error = 7.1944387047828680000000E-7 " "
relative error = 6.86881361767764800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.048000000000105 " "
y[1] (analytic) = 1.0474537370209438 " "
y[1] (numeric) = 1.047453014909708 " "
absolute error = 7.221112356958770000000E-7 " "
relative error = 6.89396782095244500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.047000000000105 " "
y[1] (analytic) = 1.0475012144927442 " "
y[1] (numeric) = 1.0475004897066182 " "
absolute error = 7.247861260051280000000E-7 " "
relative error = 6.91919127135435400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.046000000000105 " "
y[1] (analytic) = 1.047548739465763 " "
y[1] (numeric) = 1.0475480119972065 " "
absolute error = 7.2746855650507310000000E-7 " "
relative error = 6.94448409986224700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.045000000000105 " "
y[1] (analytic) = 1.0475963119875253 " "
y[1] (numeric) = 1.0475955818289822 " "
absolute error = 7.3015854318292380000000E-7 " "
relative error = 6.96984644588571700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0440000000001053 " "
y[1] (analytic) = 1.0476439321056035 " "
y[1] (numeric) = 1.0476431992495026 " "
absolute error = 7.3285610091566870000000E-7 " "
relative error = 6.99527843818787200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0430000000001054 " "
y[1] (analytic) = 1.0476915998676177 " "
y[1] (numeric) = 1.0476908643063723 " "
absolute error = 7.3556124546847460000000E-7 " "
relative error = 7.02078021396198300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0420000000001055 " "
y[1] (analytic) = 1.047739315321236 " "
y[1] (numeric) = 1.0477385770472434 " "
absolute error = 7.3827399260650850000000E-7 " "
relative error = 7.04635191035237900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0410000000001056 " "
y[1] (analytic) = 1.0477870785141734 " "
y[1] (numeric) = 1.047786337519816 " "
absolute error = 7.4099435742880360000000E-7 " "
relative error = 7.07199365809682700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0400000000001057 " "
y[1] (analytic) = 1.0478348894941933 " "
y[1] (numeric) = 1.0478341457718376 " "
absolute error = 7.4372235570052680000000E-7 " "
relative error = 7.09770559424236600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.039000000000106 " "
y[1] (analytic) = 1.0478827483091067 " "
y[1] (numeric) = 1.0478820018511037 " "
absolute error = 7.4645800296480050000000E-7 " "
relative error = 7.12348785366784800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.038000000000106 " "
y[1] (analytic) = 1.0479306550067724 " "
y[1] (numeric) = 1.0479299058054572 " "
absolute error = 7.4920131520883610000000E-7 " "
relative error = 7.1493405754409800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.037000000000106 " "
y[1] (analytic) = 1.0479786096350971 " "
y[1] (numeric) = 1.0479778576827894 " "
absolute error = 7.5195230775371160000000E-7 " "
relative error = 7.17526389222332500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.036000000000106 " "
y[1] (analytic) = 1.0480266122420354 " "
y[1] (numeric) = 1.048025857531039 " "
absolute error = 7.5471099636459370000000E-7 " "
relative error = 7.2012579408651290000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0350000000001063 " "
y[1] (analytic) = 1.0480746628755901 " "
y[1] (numeric) = 1.0480739053981933 " "
absolute error = 7.5747739680664950000000E-7 " "
relative error = 7.22732285816706700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0340000000001064 " "
y[1] (analytic) = 1.0481227615838116 " "
y[1] (numeric) = 1.048122001332287 " "
absolute error = 7.6025152462300130000000E-7 " "
relative error = 7.2534587787616600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0330000000001065 " "
y[1] (analytic) = 1.0481709084147985 " "
y[1] (numeric) = 1.048170145381403 " "
absolute error = 7.630333955788160000000E-7 " "
relative error = 7.27966583935047100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0320000000001066 " "
y[1] (analytic) = 1.048219103416698 " "
y[1] (numeric) = 1.0482183375936724 " "
absolute error = 7.6582302566130520000000E-7 " "
relative error = 7.30594417870352400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0310000000001067 " "
y[1] (analytic) = 1.048267346637705 " "
y[1] (numeric) = 1.0482665780172746 " "
absolute error = 7.6862043041359130000000E-7 " "
relative error = 7.33229393130411700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.030000000000107 " "
y[1] (analytic) = 1.0483156381260625 " "
y[1] (numeric) = 1.0483148667004367 " "
absolute error = 7.7142562582288580000000E-7 " "
relative error = 7.35871523582213200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.029000000000107 " "
y[1] (analytic) = 1.0483639779300624 " "
y[1] (numeric) = 1.0483632036914345 " "
absolute error = 7.7423862787640020000000E-7 " "
relative error = 7.38520823087695400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.028000000000107 " "
y[1] (analytic) = 1.048412366098044 " "
y[1] (numeric) = 1.048411589038592 " "
absolute error = 7.7705945189521230000000E-7 " "
relative error = 7.41177304868363500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.027000000000107 " "
y[1] (analytic) = 1.048460802678396 " "
y[1] (numeric) = 1.0484600227902814 " "
absolute error = 7.7988811453266750000000E-7 " "
relative error = 7.43840983411460700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0260000000001073 " "
y[1] (analytic) = 1.0485092877195545 " "
y[1] (numeric) = 1.0485085049949234 " "
absolute error = 7.8272463110984350000000E-7 " "
relative error = 7.46511871928405200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0250000000001074 " "
y[1] (analytic) = 1.0485578212700049 " "
y[1] (numeric) = 1.048557035700987 " "
absolute error = 7.8556901783599640000000E-7 " "
relative error = 7.49189984472693700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0240000000001075 " "
y[1] (analytic) = 1.0486064033782805 " "
y[1] (numeric) = 1.04860561495699 " "
absolute error = 7.8842129047629330000000E-7 " "
relative error = 7.51875334669183300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0230000000001076 " "
y[1] (analytic) = 1.0486550340929635 " "
y[1] (numeric) = 1.0486542428114984 " "
absolute error = 7.9128146501794560000000E-7 " "
relative error = 7.54567936349408100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0220000000001077 " "
y[1] (analytic) = 1.0487037134626847 " "
y[1] (numeric) = 1.048702919313127 " "
absolute error = 7.9414955767020960000000E-7 " "
relative error = 7.57267803551519800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.021000000000108 " "
y[1] (analytic) = 1.0487524415361233 " "
y[1] (numeric) = 1.048751644510539 " "
absolute error = 7.9702558442029670000000E-7 " "
relative error = 7.5997495009678500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.020000000000108 " "
y[1] (analytic) = 1.0488012183620077 " "
y[1] (numeric) = 1.0488004184524464 " "
absolute error = 7.9990956125541860000000E-7 " "
relative error = 7.62689389801337200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.019000000000108 " "
y[1] (analytic) = 1.0488500439891144 " "
y[1] (numeric) = 1.04884924118761 " "
absolute error = 8.0280150438483130000000E-7 " "
relative error = 7.65411136687870900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.018000000000108 " "
y[1] (analytic) = 1.0488989184662691 " "
y[1] (numeric) = 1.0488981127648394 " "
absolute error = 8.0570142979574650000000E-7 " "
relative error = 7.68140204562196400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0170000000001083 " "
y[1] (analytic) = 1.0489478418423466 " "
y[1] (numeric) = 1.0489470332329929 " "
absolute error = 8.0860935369742040000000E-7 " "
relative error = 7.70876607436646800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0160000000001084 " "
y[1] (analytic) = 1.04899681416627 " "
y[1] (numeric) = 1.0489960026409777 " "
absolute error = 8.115252922991090000000E-7 " "
relative error = 7.7362035931834500000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0150000000001085 " "
y[1] (analytic) = 1.0490458354870114 " "
y[1] (numeric) = 1.04904502103775 " "
absolute error = 8.1444926136597930000000E-7 " "
relative error = 7.7637147378586900000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0140000000001086 " "
y[1] (analytic) = 1.0490949058535926 " "
y[1] (numeric) = 1.0490940884723148 " "
absolute error = 8.1738127777342130000000E-7 " "
relative error = 7.7912996547091400000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0130000000001087 " "
y[1] (analytic) = 1.0491440253150837 " "
y[1] (numeric) = 1.0491432049937264 " "
absolute error = 8.2032135728660190000000E-7 " "
relative error = 7.81895847941601200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.012000000000109 " "
y[1] (analytic) = 1.049193193920604 " "
y[1] (numeric) = 1.049192370651088 " "
absolute error = 8.2326951611477740000000E-7 " "
relative error = 7.84669135184150800000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.011000000000109 " "
y[1] (analytic) = 1.0492424117193224 " "
y[1] (numeric) = 1.0492415854935517 " "
absolute error = 8.2622577068924840000000E-7 " "
relative error = 7.87449841391150300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.010000000000109 " "
y[1] (analytic) = 1.0492916787604567 " "
y[1] (numeric) = 1.0492908495703193 " "
absolute error = 8.2919013744131580000000E-7 " "
relative error = 7.90237980749880700000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.009000000000109 " "
y[1] (analytic) = 1.049340995093274 " "
y[1] (numeric) = 1.0493401629306414 " "
absolute error = 8.3216263258023560000000E-7 " "
relative error = 7.93033567230704000000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0080000000001093 " "
y[1] (analytic) = 1.0493903607670902 " "
y[1] (numeric) = 1.049389525623818 " "
absolute error = 8.3514327231526410000000E-7 " "
relative error = 7.95836614798696600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0070000000001094 " "
y[1] (analytic) = 1.0494397758312717 " "
y[1] (numeric) = 1.0494389376991982 " "
absolute error = 8.3813207352179120000000E-7 " "
relative error = 7.9864713804839200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0060000000001095 " "
y[1] (analytic) = 1.0494892403352327 " "
y[1] (numeric) = 1.049488399206181 " "
absolute error = 8.4112905174293930000000E-7 " "
relative error = 8.01465150299456100000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0050000000001096 " "
y[1] (analytic) = 1.0495387543284385 " "
y[1] (numeric) = 1.0495379101942142 " "
absolute error = 8.4413422429818750000000E-7 " "
relative error = 8.04290666558871600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.0040000000001097 " "
y[1] (analytic) = 1.0495883178604026 " "
y[1] (numeric) = 1.0495874707127955 " "
absolute error = 8.4714760717474750000000E-7 " "
relative error = 8.07123700558774600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.00300000000011 " "
y[1] (analytic) = 1.0496379309806887 " "
y[1] (numeric) = 1.049637080811472 " "
absolute error = 8.5016921680391990000000E-7 " "
relative error = 8.09964266449095600000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.00200000000011 " "
y[1] (analytic) = 1.0496875937389099 " "
y[1] (numeric) = 1.04968674053984 " "
absolute error = 8.5319906983905010000000E-7 " "
relative error = 8.12812378585916200000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.00100000000011 " "
y[1] (analytic) = 1.049737306184729 " "
y[1] (numeric) = 1.0497364499475463 " "
absolute error = 8.562371827114390000000E-7 " "
relative error = 8.15668051108361300000E-5 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = -3.00000000000011 " "
y[1] (analytic) = 1.0497870683678585 " "
y[1] (numeric) = 1.0497862090842864 " "
absolute error = 8.5928357207443180000000E-7 " "
relative error = 8.18531298361667500000E-5 "%"
h = 1.000E-3 " "
"Finished!"
"Maximum Iterations Reached before Solution Completed!"
"diff ( y , x , 2 ) = diff ( y , x , 1 ) ;"
Iterations = 1000
"Total Elapsed Time "= 5 Minutes 0 Seconds
"Elapsed Time(since restart) "= 4 Minutes 59 Seconds
"Expected Time Remaining "= 20 Minutes 0 Seconds
"Optimized Time Remaining "= 19 Minutes 58 Seconds
"Time to Timeout "= 9 Minutes 59 Seconds
Percent Done = 20.019999999997797 "%"
(%o50) true
(%o50) diffeq.max