(%i1) batch(diffeq.max)
read and interpret file: /home/dennis/mastersource/mine/omnisode/diffeq.max
(%i2) load(stringproc)
(%o2) /usr/local/share/maxima/5.26.0/share/contrib/stringproc/stringproc.mac
(%i3) display_alot(iter) := if iter >= 0
then (ind_var : array_x , omniout_float(ALWAYS,
1
"x[1] ", 33, ind_var, 20, " "),
analytic_val_y : exact_soln_y(ind_var),
omniout_float(ALWAYS, "y[1] (analytic) ", 33, analytic_val_y,
20, " "), term_no : 1, numeric_val : array_y ,
term_no
abserr : abs(numeric_val - analytic_val_y),
omniout_float(ALWAYS, "y[1] (numeric) ", 33, numeric_val,
abserr 100.0
20, " "), if abs(analytic_val_y) # 0.0 then relerr : -------------------
abs(analytic_val_y)
else relerr : - 1.0, if glob_iter = 1 then array_1st_rel_error : relerr
1
else array_last_rel_error : relerr, omniout_float(ALWAYS,
1
"absolute error ", 4, abserr, 20, " "),
omniout_float(ALWAYS, "relative error ", 4, relerr, 20,
"%"), omniout_float(ALWAYS, "h ", 4, glob_h,
20, " "))
(%o3) display_alot(iter) := if iter >= 0
then (ind_var : array_x , omniout_float(ALWAYS,
1
"x[1] ", 33, ind_var, 20, " "),
analytic_val_y : exact_soln_y(ind_var),
omniout_float(ALWAYS, "y[1] (analytic) ", 33, analytic_val_y,
20, " "), term_no : 1, numeric_val : array_y ,
term_no
abserr : abs(numeric_val - analytic_val_y),
omniout_float(ALWAYS, "y[1] (numeric) ", 33, numeric_val,
abserr 100.0
20, " "), if abs(analytic_val_y) # 0.0 then relerr : -------------------
abs(analytic_val_y)
else relerr : - 1.0, if glob_iter = 1 then array_1st_rel_error : relerr
1
else array_last_rel_error : relerr, omniout_float(ALWAYS,
1
"absolute error ", 4, abserr, 20, " "),
omniout_float(ALWAYS, "relative error ", 4, relerr, 20,
"%"), omniout_float(ALWAYS, "h ", 4, glob_h,
20, " "))
(%i4) adjust_for_pole(h_param) := block(hnew : h_param,
glob_normmax : glob_small_float, if !array_y_higher ! > glob_small_float
! 1, 1!
then (tmp : !array_y_higher !, if tmp < glob_normmax
! 1, 1!
then glob_normmax : tmp), if glob_look_poles
and (!array_pole ! > glob_small_float) and (array_pole # glob_large_float)
! 1! 1
array_pole
1
then (sz2 : -----------, if sz2 < hnew
10.0
then (omniout_float(INFO, "glob_h adjusted to ", 20, h_param, 12,
"due to singularity."), omniout_str(INFO, "Reached Optimal"), newline(),
return(hnew))), if not glob_reached_optimal_h
then (glob_reached_optimal_h : true, glob_curr_iter_when_opt :
glob_current_iter, glob_optimal_clock_start_sec : elapsed_time_seconds(),
glob_optimal_start : array_x ), hnew : sz2)
1
(%o4) adjust_for_pole(h_param) := block(hnew : h_param,
glob_normmax : glob_small_float, if !array_y_higher ! > glob_small_float
! 1, 1!
then (tmp : !array_y_higher !, if tmp < glob_normmax
! 1, 1!
then glob_normmax : tmp), if glob_look_poles
and (!array_pole ! > glob_small_float) and (array_pole # glob_large_float)
! 1! 1
array_pole
1
then (sz2 : -----------, if sz2 < hnew
10.0
then (omniout_float(INFO, "glob_h adjusted to ", 20, h_param, 12,
"due to singularity."), omniout_str(INFO, "Reached Optimal"), newline(),
return(hnew))), if not glob_reached_optimal_h
then (glob_reached_optimal_h : true, glob_curr_iter_when_opt :
glob_current_iter, glob_optimal_clock_start_sec : elapsed_time_seconds(),
glob_optimal_start : array_x ), hnew : sz2)
1
(%i5) prog_report(x_start, x_end) := (clock_sec1 : elapsed_time_seconds(),
total_clock_sec : convfloat(clock_sec1) - convfloat(glob_orig_start_sec),
glob_clock_sec : convfloat(clock_sec1) - convfloat(glob_clock_start_sec),
left_sec : - convfloat(clock_sec1) + convfloat(glob_orig_start_sec)
+ convfloat(glob_max_sec), expect_sec :
comp_expect_sec(convfloat(x_end), convfloat(x_start),
convfloat(glob_h) + convfloat(array_x ),
1
convfloat(clock_sec1) - convfloat(glob_orig_start_sec)),
opt_clock_sec : convfloat(clock_sec1)
- convfloat(glob_optimal_clock_start_sec),
glob_optimal_expect_sec : comp_expect_sec(convfloat(x_end),
convfloat(x_start), convfloat(glob_h) + convfloat(array_x ),
1
convfloat(opt_clock_sec)), percent_done :
comp_percent(convfloat(x_end), convfloat(x_start),
convfloat(glob_h) + convfloat(array_x )), glob_percent_done : percent_done,
1
omniout_str_noeol(INFO, "Total Elapsed Time "),
omniout_timestr(convfloat(total_clock_sec)),
omniout_str_noeol(INFO, "Elapsed Time(since restart) "),
omniout_timestr(convfloat(glob_clock_sec)),
if convfloat(percent_done) < convfloat(100.0)
then (omniout_str_noeol(INFO, "Expected Time Remaining "),
omniout_timestr(convfloat(expect_sec)),
omniout_str_noeol(INFO, "Optimized Time Remaining "),
omniout_timestr(convfloat(glob_optimal_expect_sec))),
omniout_str_noeol(INFO, "Time to Timeout "),
omniout_timestr(convfloat(left_sec)), omniout_float(INFO,
"Percent Done ", 33, percent_done, 4, "%"))
(%o5) prog_report(x_start, x_end) := (clock_sec1 : elapsed_time_seconds(),
total_clock_sec : convfloat(clock_sec1) - convfloat(glob_orig_start_sec),
glob_clock_sec : convfloat(clock_sec1) - convfloat(glob_clock_start_sec),
left_sec : - convfloat(clock_sec1) + convfloat(glob_orig_start_sec)
+ convfloat(glob_max_sec), expect_sec :
comp_expect_sec(convfloat(x_end), convfloat(x_start),
convfloat(glob_h) + convfloat(array_x ),
1
convfloat(clock_sec1) - convfloat(glob_orig_start_sec)),
opt_clock_sec : convfloat(clock_sec1)
- convfloat(glob_optimal_clock_start_sec),
glob_optimal_expect_sec : comp_expect_sec(convfloat(x_end),
convfloat(x_start), convfloat(glob_h) + convfloat(array_x ),
1
convfloat(opt_clock_sec)), percent_done :
comp_percent(convfloat(x_end), convfloat(x_start),
convfloat(glob_h) + convfloat(array_x )), glob_percent_done : percent_done,
1
omniout_str_noeol(INFO, "Total Elapsed Time "),
omniout_timestr(convfloat(total_clock_sec)),
omniout_str_noeol(INFO, "Elapsed Time(since restart) "),
omniout_timestr(convfloat(glob_clock_sec)),
if convfloat(percent_done) < convfloat(100.0)
then (omniout_str_noeol(INFO, "Expected Time Remaining "),
omniout_timestr(convfloat(expect_sec)),
omniout_str_noeol(INFO, "Optimized Time Remaining "),
omniout_timestr(convfloat(glob_optimal_expect_sec))),
omniout_str_noeol(INFO, "Time to Timeout "),
omniout_timestr(convfloat(left_sec)), omniout_float(INFO,
"Percent Done ", 33, percent_done, 4, "%"))
(%i6) check_for_pole() := (n : glob_max_terms, m : - 1 - 1 + n,
while (m >= 10) and ((!array_y_higher ! < glob_small_float)
! 1, m!
or (!array_y_higher ! < glob_small_float)
! 1, m - 1!
or (!array_y_higher ! < glob_small_float)) do m : m - 1,
! 1, m - 2!
array_y_higher array_y_higher
1, m 1, m - 1
if m > 10 then (rm0 : ----------------------, rm1 : ----------------------,
array_y_higher array_y_higher
1, m - 1 1, m - 2
hdrc : convfloat(m - 1) rm0 - convfloat(m - 2) rm1,
glob_h
if abs(hdrc) > glob_small_float then (rcs : ------,
hdrc
convfloat(m - 1) rm0
ord_no : 2.0 - convfloat(m) + --------------------, array_real_pole : rcs,
hdrc 1, 1
array_real_pole : ord_no) else (array_real_pole : glob_large_float,
1, 2 1, 1
array_real_pole : glob_large_float))
1, 2
else (array_real_pole : glob_large_float,
1, 1
array_real_pole : glob_large_float), n : - 1 - 1 + glob_max_terms,
1, 2
cnt : 0, while (cnt < 5) and (n >= 10) do (if !array_y_higher ! >
! 1, n!
glob_small_float then cnt : 1 + cnt else cnt : 0, n : n - 1), m : cnt + n,
if m <= 10 then (array_complex_pole : glob_large_float,
1, 1
array_complex_pole : glob_large_float)
1, 2
elseif (!array_y_higher ! >= glob_large_float)
! 1, m!
or (!array_y_higher ! >= glob_large_float)
! 1, m - 1!
or (!array_y_higher ! >= glob_large_float)
! 1, m - 2!
or (!array_y_higher ! >= glob_large_float)
! 1, m - 3!
or (!array_y_higher ! >= glob_large_float)
! 1, m - 4!
or (!array_y_higher ! >= glob_large_float)
! 1, m - 5!
then (array_complex_pole : glob_large_float,
1, 1
array_complex_pole : glob_large_float)
1, 2
array_y_higher array_y_higher
1, m 1, m - 1
else (rm0 : ----------------------, rm1 : ----------------------,
array_y_higher array_y_higher
1, m - 1 1, m - 2
array_y_higher array_y_higher
1, m - 2 1, m - 3
rm2 : ----------------------, rm3 : ----------------------,
array_y_higher array_y_higher
1, m - 3 1, m - 4
array_y_higher
1, m - 4
rm4 : ----------------------, nr1 : convfloat(m - 3) rm2
array_y_higher
1, m - 5
- 2.0 convfloat(m - 2) rm1 + convfloat(m - 1) rm0,
nr2 : convfloat(m - 4) rm3 - 2.0 convfloat(m - 3) rm2 + convfloat(m - 2) rm1,
- 1.0 2.0 - 1.0 - 1.0 2.0 - 1.0 5.0 8.0 3.0
dr1 : ----- + --- + -----, dr2 : ----- + --- + -----, ds1 : --- - --- + ---,
rm3 rm2 rm1 rm4 rm3 rm2 rm3 rm2 rm1
5.0 8.0 3.0
ds2 : --- - --- + ---, if (abs(nr1 dr2 - nr2 dr1) <= glob_small_float)
rm4 rm3 rm2
or (abs(dr1) <= glob_small_float) then (array_complex_pole :
1, 1
glob_large_float, array_complex_pole : glob_large_float)
1, 2
else (if abs(nr1 dr2 - nr2 dr1) > glob_small_float
dr1 dr2 - ds2 dr1 + ds1 dr2
then (rcs : ---------------------------,
nr1 dr2 - nr2 dr1
rcs nr1 - ds1 convfloat(m)
ord_no : ------------- - ------------,
2.0 dr1 2.0
if abs(rcs) > glob_small_float then (if rcs > 0.0 then rad_c : sqrt(rcs) glob_h
else rad_c : glob_large_float) else (rad_c : glob_large_float,
ord_no : glob_large_float)) else (rad_c : glob_large_float,
ord_no : glob_large_float)), array_complex_pole : rad_c,
1, 1
array_complex_pole : ord_no), found : false,
1, 2
if (not found) and ((array_real_pole = glob_large_float)
1, 1
or (array_real_pole = glob_large_float))
1, 2
and ((array_complex_pole # glob_large_float) and (array_complex_pole # glob_large_float))
1, 1 1, 2
and ((array_complex_pole > 0.0) and (array_complex_pole > 0.0))
1, 1 1, 2
then (array_poles : array_complex_pole ,
1, 1 1, 1
array_poles : array_complex_pole , found : true, array_type_pole : 2,
1, 2 1, 2 1
if glob_display_flag then omniout_str(ALWAYS,
"Complex estimate of poles used")), if (not found)
and ((array_real_pole # glob_large_float) and (array_real_pole # glob_large_float)
1, 1 1, 2
and (array_real_pole > 0.0) and (array_real_pole > 0.0)
1, 1 1, 2
and ((array_complex_pole = glob_large_float) or (array_complex_pole = glob_large_float) or (array_complex_pole <= 0.0) or (array_complex_pole <= 0.0)))
1, 1 1, 2 1, 1 1, 2
then (array_poles : array_real_pole ,
1, 1 1, 1
array_poles : array_real_pole , found : true, array_type_pole : 1,
1, 2 1, 2 1
if glob_display_flag then omniout_str(ALWAYS, "Real estimate of pole used")),
if (not found) and (((array_real_pole = glob_large_float)
1, 1
or (array_real_pole = glob_large_float))
1, 2
and ((array_complex_pole = glob_large_float) or (array_complex_pole = glob_large_float)))
1, 1 1, 2
then (array_poles : glob_large_float, array_poles : glob_large_float,
1, 1 1, 2
found : true, array_type_pole : 3, if glob_display_flag
1
then omniout_str(ALWAYS, "NO POLE")),
if (not found) and ((array_real_pole < array_complex_pole )
1, 1 1, 1
and (array_real_pole > 0.0) and (array_real_pole >
1, 1 1, 2
0.0))
then (array_poles : array_real_pole ,
1, 1 1, 1
array_poles : array_real_pole , found : true, array_type_pole : 1,
1, 2 1, 2 1
if glob_display_flag then omniout_str(ALWAYS, "Real estimate of pole used")),
if (not found) and ((array_complex_pole # glob_large_float)
1, 1
and (array_complex_pole # glob_large_float)
1, 2
and (array_complex_pole > 0.0) and (array_complex_pole >
1, 1 1, 2
0.0))
then (array_poles : array_complex_pole ,
1, 1 1, 1
array_poles : array_complex_pole , array_type_pole : 2, found : true,
1, 2 1, 2 1
if glob_display_flag then omniout_str(ALWAYS,
"Complex estimate of poles used")), if not found
then (array_poles : glob_large_float, array_poles : glob_large_float,
1, 1 1, 2
array_type_pole : 3, if glob_display_flag
1
then omniout_str(ALWAYS, "NO POLE")), array_pole : glob_large_float,
1
array_pole : glob_large_float, if array_pole > array_poles
2 1 1, 1
then (array_pole : array_poles , array_pole : array_poles ),
1 1, 1 2 1, 2
display_pole())
(%o6) check_for_pole() := (n : glob_max_terms, m : - 1 - 1 + n,
while (m >= 10) and ((!array_y_higher ! < glob_small_float)
! 1, m!
or (!array_y_higher ! < glob_small_float)
! 1, m - 1!
or (!array_y_higher ! < glob_small_float)) do m : m - 1,
! 1, m - 2!
array_y_higher array_y_higher
1, m 1, m - 1
if m > 10 then (rm0 : ----------------------, rm1 : ----------------------,
array_y_higher array_y_higher
1, m - 1 1, m - 2
hdrc : convfloat(m - 1) rm0 - convfloat(m - 2) rm1,
glob_h
if abs(hdrc) > glob_small_float then (rcs : ------,
hdrc
convfloat(m - 1) rm0
ord_no : 2.0 - convfloat(m) + --------------------, array_real_pole : rcs,
hdrc 1, 1
array_real_pole : ord_no) else (array_real_pole : glob_large_float,
1, 2 1, 1
array_real_pole : glob_large_float))
1, 2
else (array_real_pole : glob_large_float,
1, 1
array_real_pole : glob_large_float), n : - 1 - 1 + glob_max_terms,
1, 2
cnt : 0, while (cnt < 5) and (n >= 10) do (if !array_y_higher ! >
! 1, n!
glob_small_float then cnt : 1 + cnt else cnt : 0, n : n - 1), m : cnt + n,
if m <= 10 then (array_complex_pole : glob_large_float,
1, 1
array_complex_pole : glob_large_float)
1, 2
elseif (!array_y_higher ! >= glob_large_float)
! 1, m!
or (!array_y_higher ! >= glob_large_float)
! 1, m - 1!
or (!array_y_higher ! >= glob_large_float)
! 1, m - 2!
or (!array_y_higher ! >= glob_large_float)
! 1, m - 3!
or (!array_y_higher ! >= glob_large_float)
! 1, m - 4!
or (!array_y_higher ! >= glob_large_float)
! 1, m - 5!
then (array_complex_pole : glob_large_float,
1, 1
array_complex_pole : glob_large_float)
1, 2
array_y_higher array_y_higher
1, m 1, m - 1
else (rm0 : ----------------------, rm1 : ----------------------,
array_y_higher array_y_higher
1, m - 1 1, m - 2
array_y_higher array_y_higher
1, m - 2 1, m - 3
rm2 : ----------------------, rm3 : ----------------------,
array_y_higher array_y_higher
1, m - 3 1, m - 4
array_y_higher
1, m - 4
rm4 : ----------------------, nr1 : convfloat(m - 3) rm2
array_y_higher
1, m - 5
- 2.0 convfloat(m - 2) rm1 + convfloat(m - 1) rm0,
nr2 : convfloat(m - 4) rm3 - 2.0 convfloat(m - 3) rm2 + convfloat(m - 2) rm1,
- 1.0 2.0 - 1.0 - 1.0 2.0 - 1.0 5.0 8.0 3.0
dr1 : ----- + --- + -----, dr2 : ----- + --- + -----, ds1 : --- - --- + ---,
rm3 rm2 rm1 rm4 rm3 rm2 rm3 rm2 rm1
5.0 8.0 3.0
ds2 : --- - --- + ---, if (abs(nr1 dr2 - nr2 dr1) <= glob_small_float)
rm4 rm3 rm2
or (abs(dr1) <= glob_small_float) then (array_complex_pole :
1, 1
glob_large_float, array_complex_pole : glob_large_float)
1, 2
else (if abs(nr1 dr2 - nr2 dr1) > glob_small_float
dr1 dr2 - ds2 dr1 + ds1 dr2
then (rcs : ---------------------------,
nr1 dr2 - nr2 dr1
rcs nr1 - ds1 convfloat(m)
ord_no : ------------- - ------------,
2.0 dr1 2.0
if abs(rcs) > glob_small_float then (if rcs > 0.0 then rad_c : sqrt(rcs) glob_h
else rad_c : glob_large_float) else (rad_c : glob_large_float,
ord_no : glob_large_float)) else (rad_c : glob_large_float,
ord_no : glob_large_float)), array_complex_pole : rad_c,
1, 1
array_complex_pole : ord_no), found : false,
1, 2
if (not found) and ((array_real_pole = glob_large_float)
1, 1
or (array_real_pole = glob_large_float))
1, 2
and ((array_complex_pole # glob_large_float) and (array_complex_pole # glob_large_float))
1, 1 1, 2
and ((array_complex_pole > 0.0) and (array_complex_pole > 0.0))
1, 1 1, 2
then (array_poles : array_complex_pole ,
1, 1 1, 1
array_poles : array_complex_pole , found : true, array_type_pole : 2,
1, 2 1, 2 1
if glob_display_flag then omniout_str(ALWAYS,
"Complex estimate of poles used")), if (not found)
and ((array_real_pole # glob_large_float) and (array_real_pole # glob_large_float)
1, 1 1, 2
and (array_real_pole > 0.0) and (array_real_pole > 0.0)
1, 1 1, 2
and ((array_complex_pole = glob_large_float) or (array_complex_pole = glob_large_float) or (array_complex_pole <= 0.0) or (array_complex_pole <= 0.0)))
1, 1 1, 2 1, 1 1, 2
then (array_poles : array_real_pole ,
1, 1 1, 1
array_poles : array_real_pole , found : true, array_type_pole : 1,
1, 2 1, 2 1
if glob_display_flag then omniout_str(ALWAYS, "Real estimate of pole used")),
if (not found) and (((array_real_pole = glob_large_float)
1, 1
or (array_real_pole = glob_large_float))
1, 2
and ((array_complex_pole = glob_large_float) or (array_complex_pole = glob_large_float)))
1, 1 1, 2
then (array_poles : glob_large_float, array_poles : glob_large_float,
1, 1 1, 2
found : true, array_type_pole : 3, if glob_display_flag
1
then omniout_str(ALWAYS, "NO POLE")),
if (not found) and ((array_real_pole < array_complex_pole )
1, 1 1, 1
and (array_real_pole > 0.0) and (array_real_pole >
1, 1 1, 2
0.0))
then (array_poles : array_real_pole ,
1, 1 1, 1
array_poles : array_real_pole , found : true, array_type_pole : 1,
1, 2 1, 2 1
if glob_display_flag then omniout_str(ALWAYS, "Real estimate of pole used")),
if (not found) and ((array_complex_pole # glob_large_float)
1, 1
and (array_complex_pole # glob_large_float)
1, 2
and (array_complex_pole > 0.0) and (array_complex_pole >
1, 1 1, 2
0.0))
then (array_poles : array_complex_pole ,
1, 1 1, 1
array_poles : array_complex_pole , array_type_pole : 2, found : true,
1, 2 1, 2 1
if glob_display_flag then omniout_str(ALWAYS,
"Complex estimate of poles used")), if not found
then (array_poles : glob_large_float, array_poles : glob_large_float,
1, 1 1, 2
array_type_pole : 3, if glob_display_flag
1
then omniout_str(ALWAYS, "NO POLE")), array_pole : glob_large_float,
1
array_pole : glob_large_float, if array_pole > array_poles
2 1 1, 1
then (array_pole : array_poles , array_pole : array_poles ),
1 1, 1 2 1, 2
display_pole())
(%i7) get_norms() := if not glob_initial_pass
then (set_z(array_norms, 1 + glob_max_terms), iii : 1,
while iii <= glob_max_terms do (if !array_y ! > array_norms
! iii! iii
then array_norms : !array_y !, iii : 1 + iii))
iii ! iii!
(%o7) get_norms() := if not glob_initial_pass
then (set_z(array_norms, 1 + glob_max_terms), iii : 1,
while iii <= glob_max_terms do (if !array_y ! > array_norms
! iii! iii
then array_norms : !array_y !, iii : 1 + iii))
iii ! iii!
(%i8) atomall() := (array_tmp1_g : sin(array_x ),
1 1
array_tmp1 : cos(array_x ), array_tmp2 : array_tmp1 + array_const_0D0 ,
1 1 1 1 1
array_tmp3 : sin(array_x ), array_tmp3_g : cos(array_x ),
1 1 1 1
array_tmp4 : array_tmp3 + array_tmp2 ,
1 1 1
if not array_y_set_initial then (if 1 <= glob_max_terms
1, 2
1
then (temporary : array_tmp4 glob_h factorial_3(0, 1),
1
array_y : temporary, array_y_higher : temporary,
2 1, 2
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 2,
glob_h 2, 1
array_tmp1_g : att(1, array_tmp1, array_x, 1),
2
array_tmp1 : - att(1, array_tmp1_g, array_x, 1),
2
array_tmp2 : array_tmp1 + array_const_0D0 ,
2 2 2
array_tmp3 : att(1, array_tmp3_g, array_x, 1),
2
array_tmp3_g : - att(1, array_tmp3, array_x, 1),
2
array_tmp4 : array_tmp3 + array_tmp2 ,
2 2 2
if not array_y_set_initial then (if 2 <= glob_max_terms
1, 3
1
then (temporary : array_tmp4 glob_h factorial_3(1, 2),
2
array_y : temporary, array_y_higher : temporary,
3 1, 3
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 3,
glob_h 2, 2
array_tmp1_g : att(2, array_tmp1, array_x, 1),
3
array_tmp1 : - att(2, array_tmp1_g, array_x, 1),
3
array_tmp2 : array_tmp1 + array_const_0D0 ,
3 3 3
array_tmp3 : att(2, array_tmp3_g, array_x, 1),
3
array_tmp3_g : - att(2, array_tmp3, array_x, 1),
3
array_tmp4 : array_tmp3 + array_tmp2 ,
3 3 3
if not array_y_set_initial then (if 3 <= glob_max_terms
1, 4
1
then (temporary : array_tmp4 glob_h factorial_3(2, 3),
3
array_y : temporary, array_y_higher : temporary,
4 1, 4
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 4,
glob_h 2, 3
array_tmp1_g : att(3, array_tmp1, array_x, 1),
4
array_tmp1 : - att(3, array_tmp1_g, array_x, 1),
4
array_tmp2 : array_tmp1 + array_const_0D0 ,
4 4 4
array_tmp3 : att(3, array_tmp3_g, array_x, 1),
4
array_tmp3_g : - att(3, array_tmp3, array_x, 1),
4
array_tmp4 : array_tmp3 + array_tmp2 ,
4 4 4
if not array_y_set_initial then (if 4 <= glob_max_terms
1, 5
1
then (temporary : array_tmp4 glob_h factorial_3(3, 4),
4
array_y : temporary, array_y_higher : temporary,
5 1, 5
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 5,
glob_h 2, 4
array_tmp1_g : att(4, array_tmp1, array_x, 1),
5
array_tmp1 : - att(4, array_tmp1_g, array_x, 1),
5
array_tmp2 : array_tmp1 + array_const_0D0 ,
5 5 5
array_tmp3 : att(4, array_tmp3_g, array_x, 1),
5
array_tmp3_g : - att(4, array_tmp3, array_x, 1),
5
array_tmp4 : array_tmp3 + array_tmp2 ,
5 5 5
if not array_y_set_initial then (if 5 <= glob_max_terms
1, 6
1
then (temporary : array_tmp4 glob_h factorial_3(4, 5),
5
array_y : temporary, array_y_higher : temporary,
6 1, 6
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 6,
glob_h 2, 5
while kkk <= glob_max_terms do (array_tmp1_g :
kkk
att(kkk - 1, array_tmp1, array_x, 1), array_tmp1 :
kkk
- att(kkk - 1, array_tmp1_g, array_x, 1),
array_tmp2 : array_tmp1 + array_const_0D0 ,
kkk kkk kkk
array_tmp3 : att(kkk - 1, array_tmp3_g, array_x, 1),
kkk
array_tmp3_g : - att(kkk - 1, array_tmp3, array_x, 1),
kkk
array_tmp4 : array_tmp3 + array_tmp2 , order_d : 1,
kkk kkk kkk
if 1 + order_d + kkk <= glob_max_terms
then (if not array_y_set_initial
1, order_d + kkk
order_d
array_tmp4 glob_h
kkk
then (temporary : -----------------------------------------,
factorial_3(kkk - 1, - 1 + order_d + kkk)
array_y : temporary, array_y_higher : temporary,
order_d + kkk 1, order_d + kkk
term : - 1 + order_d + kkk, adj2 : 2, while (adj2 <= 1 + order_d)
temporary convfp(adj2)
and (term >= 1) do (temporary : ----------------------,
glob_h
array_y_higher : temporary, adj2 : 1 + adj2, term : term - 1))),
adj2, term
kkk : 1 + kkk))
(%o8) atomall() := (array_tmp1_g : sin(array_x ),
1 1
array_tmp1 : cos(array_x ), array_tmp2 : array_tmp1 + array_const_0D0 ,
1 1 1 1 1
array_tmp3 : sin(array_x ), array_tmp3_g : cos(array_x ),
1 1 1 1
array_tmp4 : array_tmp3 + array_tmp2 ,
1 1 1
if not array_y_set_initial then (if 1 <= glob_max_terms
1, 2
1
then (temporary : array_tmp4 glob_h factorial_3(0, 1),
1
array_y : temporary, array_y_higher : temporary,
2 1, 2
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 2,
glob_h 2, 1
array_tmp1_g : att(1, array_tmp1, array_x, 1),
2
array_tmp1 : - att(1, array_tmp1_g, array_x, 1),
2
array_tmp2 : array_tmp1 + array_const_0D0 ,
2 2 2
array_tmp3 : att(1, array_tmp3_g, array_x, 1),
2
array_tmp3_g : - att(1, array_tmp3, array_x, 1),
2
array_tmp4 : array_tmp3 + array_tmp2 ,
2 2 2
if not array_y_set_initial then (if 2 <= glob_max_terms
1, 3
1
then (temporary : array_tmp4 glob_h factorial_3(1, 2),
2
array_y : temporary, array_y_higher : temporary,
3 1, 3
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 3,
glob_h 2, 2
array_tmp1_g : att(2, array_tmp1, array_x, 1),
3
array_tmp1 : - att(2, array_tmp1_g, array_x, 1),
3
array_tmp2 : array_tmp1 + array_const_0D0 ,
3 3 3
array_tmp3 : att(2, array_tmp3_g, array_x, 1),
3
array_tmp3_g : - att(2, array_tmp3, array_x, 1),
3
array_tmp4 : array_tmp3 + array_tmp2 ,
3 3 3
if not array_y_set_initial then (if 3 <= glob_max_terms
1, 4
1
then (temporary : array_tmp4 glob_h factorial_3(2, 3),
3
array_y : temporary, array_y_higher : temporary,
4 1, 4
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 4,
glob_h 2, 3
array_tmp1_g : att(3, array_tmp1, array_x, 1),
4
array_tmp1 : - att(3, array_tmp1_g, array_x, 1),
4
array_tmp2 : array_tmp1 + array_const_0D0 ,
4 4 4
array_tmp3 : att(3, array_tmp3_g, array_x, 1),
4
array_tmp3_g : - att(3, array_tmp3, array_x, 1),
4
array_tmp4 : array_tmp3 + array_tmp2 ,
4 4 4
if not array_y_set_initial then (if 4 <= glob_max_terms
1, 5
1
then (temporary : array_tmp4 glob_h factorial_3(3, 4),
4
array_y : temporary, array_y_higher : temporary,
5 1, 5
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 5,
glob_h 2, 4
array_tmp1_g : att(4, array_tmp1, array_x, 1),
5
array_tmp1 : - att(4, array_tmp1_g, array_x, 1),
5
array_tmp2 : array_tmp1 + array_const_0D0 ,
5 5 5
array_tmp3 : att(4, array_tmp3_g, array_x, 1),
5
array_tmp3_g : - att(4, array_tmp3, array_x, 1),
5
array_tmp4 : array_tmp3 + array_tmp2 ,
5 5 5
if not array_y_set_initial then (if 5 <= glob_max_terms
1, 6
1
then (temporary : array_tmp4 glob_h factorial_3(4, 5),
5
array_y : temporary, array_y_higher : temporary,
6 1, 6
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 6,
glob_h 2, 5
while kkk <= glob_max_terms do (array_tmp1_g :
kkk
att(kkk - 1, array_tmp1, array_x, 1), array_tmp1 :
kkk
- att(kkk - 1, array_tmp1_g, array_x, 1),
array_tmp2 : array_tmp1 + array_const_0D0 ,
kkk kkk kkk
array_tmp3 : att(kkk - 1, array_tmp3_g, array_x, 1),
kkk
array_tmp3_g : - att(kkk - 1, array_tmp3, array_x, 1),
kkk
array_tmp4 : array_tmp3 + array_tmp2 , order_d : 1,
kkk kkk kkk
if 1 + order_d + kkk <= glob_max_terms
then (if not array_y_set_initial
1, order_d + kkk
order_d
array_tmp4 glob_h
kkk
then (temporary : -----------------------------------------,
factorial_3(kkk - 1, - 1 + order_d + kkk)
array_y : temporary, array_y_higher : temporary,
order_d + kkk 1, order_d + kkk
term : - 1 + order_d + kkk, adj2 : 2, while (adj2 <= 1 + order_d)
temporary convfp(adj2)
and (term >= 1) do (temporary : ----------------------,
glob_h
array_y_higher : temporary, adj2 : 1 + adj2, term : term - 1))),
adj2, term
kkk : 1 + kkk))
log(x)
(%i9) log10(x) := ---------
log(10.0)
log(x)
(%o9) log10(x) := ---------
log(10.0)
(%i10) omniout_str(iolevel, str) := if glob_iolevel >= iolevel
then printf(true, "~a~%", string(str))
(%o10) omniout_str(iolevel, str) := if glob_iolevel >= iolevel
then printf(true, "~a~%", string(str))
(%i11) omniout_str_noeol(iolevel, str) :=
if glob_iolevel >= iolevel then printf(true, "~a", string(str))
(%o11) omniout_str_noeol(iolevel, str) :=
if glob_iolevel >= iolevel then printf(true, "~a", string(str))
(%i12) omniout_labstr(iolevel, label, str) :=
if glob_iolevel >= iolevel then printf(true, "~a = ~a~%", string(label),
string(str))
(%o12) omniout_labstr(iolevel, label, str) :=
if glob_iolevel >= iolevel then printf(true, "~a = ~a~%", string(label),
string(str))
(%i13) omniout_float(iolevel, prelabel, prelen, value, vallen, postlabel) :=
if glob_iolevel >= iolevel then (if vallen = 4
then printf(true, "~a = ~g ~s ~%", prelabel, value, postlabel)
else printf(true, "~a = ~g ~s ~%", prelabel, value, postlabel))
(%o13) omniout_float(iolevel, prelabel, prelen, value, vallen, postlabel) :=
if glob_iolevel >= iolevel then (if vallen = 4
then printf(true, "~a = ~g ~s ~%", prelabel, value, postlabel)
else printf(true, "~a = ~g ~s ~%", prelabel, value, postlabel))
(%i14) omniout_int(iolevel, prelabel, prelen, value, vallen, postlabel) :=
if glob_iolevel >= iolevel then (printf(true, "~a = ~d ~a~%", prelabel, value,
postlabel), newline())
(%o14) omniout_int(iolevel, prelabel, prelen, value, vallen, postlabel) :=
if glob_iolevel >= iolevel then (printf(true, "~a = ~d ~a~%", prelabel, value,
postlabel), newline())
(%i15) omniout_float_arr(iolevel, prelabel, elemnt, prelen, value, vallen,
postlabel) := if glob_iolevel >= iolevel
then (sprint(prelabel, "[", elemnt, "]=", value, postlabel), newline())
(%o15) omniout_float_arr(iolevel, prelabel, elemnt, prelen, value, vallen,
postlabel) := if glob_iolevel >= iolevel
then (sprint(prelabel, "[", elemnt, "]=", value, postlabel), newline())
(%i16) dump_series(iolevel, dump_label, series_name, array_series, numb) :=
if glob_iolevel >= iolevel then (i : 1,
while i <= numb do (sprint(dump_label, series_name, "i = ", i, "series = ",
array_series ), newline(), i : 1 + i))
i
(%o16) dump_series(iolevel, dump_label, series_name, array_series, numb) :=
if glob_iolevel >= iolevel then (i : 1,
while i <= numb do (sprint(dump_label, series_name, "i = ", i, "series = ",
array_series ), newline(), i : 1 + i))
i
(%i17) dump_series_2(iolevel, dump_label, series_name, array_series2, numb,
subnum) := if glob_iolevel >= iolevel then (sub : 1,
while sub <= subnum do (i : 1, while i <=
num do (sprint(dump_label, series_name, "sub = ", sub, "i = ", i,
"series2 = ", array_series2 ), i : 1 + i), sub : 1 + sub))
sub, i
(%o17) dump_series_2(iolevel, dump_label, series_name, array_series2, numb,
subnum) := if glob_iolevel >= iolevel then (sub : 1,
while sub <= subnum do (i : 1, while i <=
num do (sprint(dump_label, series_name, "sub = ", sub, "i = ", i,
"series2 = ", array_series2 ), i : 1 + i), sub : 1 + sub))
sub, i
(%i18) cs_info(iolevel, str) := if glob_iolevel >= iolevel
then sprint(concat("cs_info ", str, " glob_correct_start_flag = ",
glob_correct_start_flag, "glob_h := ", glob_h, "glob_reached_optimal_h := ",
glob_reached_optimal_h))
(%o18) cs_info(iolevel, str) := if glob_iolevel >= iolevel
then sprint(concat("cs_info ", str, " glob_correct_start_flag = ",
glob_correct_start_flag, "glob_h := ", glob_h, "glob_reached_optimal_h := ",
glob_reached_optimal_h))
(%i19) logitem_time(fd, secs_in) := (secs : secs_in, printf(fd, "
"),
if secs >= 0.0 then (sec_in_millinium :
sec_in_min min_in_hour hours_in_day days_in_year years_in_century
secs
centuries_in_millinium, milliniums : ----------------,
sec_in_millinium
millinium_int : floor(milliniums), centuries :
(milliniums - millinium_int) centuries_in_millinium,
cent_int : floor(centuries), years : (centuries - cent_int) years_in_century,
years_int : floor(years), days : (years - years_int) days_in_year,
days_int : floor(days), hours : (days - days_int) hours_in_day,
hours_int : floor(hours), minutes : (hours - hours_int) min_in_hour,
minutes_int : floor(minutes), seconds : (minutes - minutes_int) sec_in_min,
sec_int : floor(seconds), if millinium_int > 0 then printf(fd, "~d Millinia ~d\
Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", millinium_int,
cent_int, years_int, days_int, hours_int, minutes_int, sec_int)
elseif cent_int > 0 then printf(fd,
"~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", cent_int,
years_int, days_int, hours_int, minutes_int, sec_int) elseif years_int > 0
then printf(fd, "~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", years_int,
days_int, hours_int, minutes_int, sec_int) elseif days_int > 0
then printf(fd, "~d Days ~d Hours ~d Minutes ~d Seconds", days_int,
hours_int, minutes_int, sec_int) elseif hours_int > 0
then printf(fd, "~d Hours ~d Minutes ~d Seconds", hours_int, minutes_int,
sec_int) elseif minutes_int > 0 then printf(fd, "~d Minutes ~d Seconds",
minutes_int, sec_int) else printf(fd, "~d Seconds", sec_int))
else printf(fd, "Unknown"), printf(fd, " | "))
(%o19) logitem_time(fd, secs_in) := (secs : secs_in, printf(fd, ""),
if secs >= 0.0 then (sec_in_millinium :
sec_in_min min_in_hour hours_in_day days_in_year years_in_century
secs
centuries_in_millinium, milliniums : ----------------,
sec_in_millinium
millinium_int : floor(milliniums), centuries :
(milliniums - millinium_int) centuries_in_millinium,
cent_int : floor(centuries), years : (centuries - cent_int) years_in_century,
years_int : floor(years), days : (years - years_int) days_in_year,
days_int : floor(days), hours : (days - days_int) hours_in_day,
hours_int : floor(hours), minutes : (hours - hours_int) min_in_hour,
minutes_int : floor(minutes), seconds : (minutes - minutes_int) sec_in_min,
sec_int : floor(seconds), if millinium_int > 0 then printf(fd, "~d Millinia ~d\
Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", millinium_int,
cent_int, years_int, days_int, hours_int, minutes_int, sec_int)
elseif cent_int > 0 then printf(fd,
"~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", cent_int,
years_int, days_int, hours_int, minutes_int, sec_int) elseif years_int > 0
then printf(fd, "~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", years_int,
days_int, hours_int, minutes_int, sec_int) elseif days_int > 0
then printf(fd, "~d Days ~d Hours ~d Minutes ~d Seconds", days_int,
hours_int, minutes_int, sec_int) elseif hours_int > 0
then printf(fd, "~d Hours ~d Minutes ~d Seconds", hours_int, minutes_int,
sec_int) elseif minutes_int > 0 then printf(fd, "~d Minutes ~d Seconds",
minutes_int, sec_int) else printf(fd, "~d Seconds", sec_int))
else printf(fd, "Unknown"), printf(fd, " | "))
(%i20) omniout_timestr(secs_in) := (secs : convfloat(secs_in),
if secs >= convfloat(0.0) then (sec_in_millinium :
convfloat(sec_in_min) convfloat(min_in_hour) convfloat(hours_in_day)
convfloat(days_in_year) convfloat(years_in_century)
secs
convfloat(centuries_in_millinium), milliniums : ---------------------------,
convfloat(sec_in_millinium)
millinium_int : floor(milliniums), centuries :
(milliniums - millinium_int) convfloat(centuries_in_millinium),
cent_int : floor(centuries), years : (centuries - cent_int)
convfloat(years_in_century), years_int : floor(years),
days : (years - years_int) convfloat(days_in_year), days_int : floor(days),
hours : (days - days_int) convfloat(hours_in_day), hours_int : floor(hours),
minutes : (hours - hours_int) convfloat(min_in_hour),
minutes_int : floor(minutes), seconds :
(minutes - minutes_int) convfloat(sec_in_min), sec_int : floor(seconds),
if millinium_int > 0 then printf(true,
"= ~d Millinia ~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%",
millinium_int, cent_int, years_int, days_int, hours_int, minutes_int, sec_int)
elseif cent_int > 0 then printf(true,
"= ~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%", cent_int,
years_int, days_int, hours_int, minutes_int, sec_int) elseif years_int > 0
then printf(true, "= ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%",
years_int, days_int, hours_int, minutes_int, sec_int) elseif days_int > 0
then printf(true, "= ~d Days ~d Hours ~d Minutes ~d Seconds~%", days_int,
hours_int, minutes_int, sec_int) elseif hours_int > 0
then printf(true, "= ~d Hours ~d Minutes ~d Seconds~%", hours_int,
minutes_int, sec_int) elseif minutes_int > 0
then printf(true, "= ~d Minutes ~d Seconds~%", minutes_int, sec_int)
else printf(true, "= ~d Seconds~%", sec_int)) else printf(true, " Unknown~%"))
(%o20) omniout_timestr(secs_in) := (secs : convfloat(secs_in),
if secs >= convfloat(0.0) then (sec_in_millinium :
convfloat(sec_in_min) convfloat(min_in_hour) convfloat(hours_in_day)
convfloat(days_in_year) convfloat(years_in_century)
secs
convfloat(centuries_in_millinium), milliniums : ---------------------------,
convfloat(sec_in_millinium)
millinium_int : floor(milliniums), centuries :
(milliniums - millinium_int) convfloat(centuries_in_millinium),
cent_int : floor(centuries), years : (centuries - cent_int)
convfloat(years_in_century), years_int : floor(years),
days : (years - years_int) convfloat(days_in_year), days_int : floor(days),
hours : (days - days_int) convfloat(hours_in_day), hours_int : floor(hours),
minutes : (hours - hours_int) convfloat(min_in_hour),
minutes_int : floor(minutes), seconds :
(minutes - minutes_int) convfloat(sec_in_min), sec_int : floor(seconds),
if millinium_int > 0 then printf(true,
"= ~d Millinia ~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%",
millinium_int, cent_int, years_int, days_int, hours_int, minutes_int, sec_int)
elseif cent_int > 0 then printf(true,
"= ~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%", cent_int,
years_int, days_int, hours_int, minutes_int, sec_int) elseif years_int > 0
then printf(true, "= ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%",
years_int, days_int, hours_int, minutes_int, sec_int) elseif days_int > 0
then printf(true, "= ~d Days ~d Hours ~d Minutes ~d Seconds~%", days_int,
hours_int, minutes_int, sec_int) elseif hours_int > 0
then printf(true, "= ~d Hours ~d Minutes ~d Seconds~%", hours_int,
minutes_int, sec_int) elseif minutes_int > 0
then printf(true, "= ~d Minutes ~d Seconds~%", minutes_int, sec_int)
else printf(true, "= ~d Seconds~%", sec_int)) else printf(true, " Unknown~%"))
(%i21) mode_declare(ats, bfloat)
modedeclare: bfloat
is not a built-in type; assuming it is a Maxima extension type.
(%o21) [ats]
(%i22) ats(mmm_ats, array_a, array_b, jjj_ats) :=
(ret_ats : 0.0, if jjj_ats <= mmm_ats then (ma_ats : 1 + mmm_ats,
iii_ats : jjj_ats, while iii_ats <= mmm_ats do (lll_ats : ma_ats - iii_ats,
ret_ats : array_a array_b + ret_ats, iii_ats : 1 + iii_ats)),
iii_ats lll_ats
ret_ats)
(%o22) ats(mmm_ats, array_a, array_b, jjj_ats) :=
(ret_ats : 0.0, if jjj_ats <= mmm_ats then (ma_ats : 1 + mmm_ats,
iii_ats : jjj_ats, while iii_ats <= mmm_ats do (lll_ats : ma_ats - iii_ats,
ret_ats : array_a array_b + ret_ats, iii_ats : 1 + iii_ats)),
iii_ats lll_ats
ret_ats)
(%i23) mode_declare(att, bfloat)
modedeclare: bfloat
is not a built-in type; assuming it is a Maxima extension type.
(%o23) [att]
(%i24) att(mmm_att, array_aa, array_bb, jjj_att) :=
(ret_att : 0.0, if jjj_att <= mmm_att then (ma_att : 2 + mmm_att,
iii_att : jjj_att, while iii_att <= mmm_att do (lll_att : ma_att - iii_att,
al_att : lll_att - 1, if lll_att <= glob_max_terms
then ret_att : array_aa array_bb convfp(al_att) + ret_att,
iii_att lll_att
ret_att
iii_att : 1 + iii_att), ret_att : ---------------), ret_att)
convfp(mmm_att)
(%o24) att(mmm_att, array_aa, array_bb, jjj_att) :=
(ret_att : 0.0, if jjj_att <= mmm_att then (ma_att : 2 + mmm_att,
iii_att : jjj_att, while iii_att <= mmm_att do (lll_att : ma_att - iii_att,
al_att : lll_att - 1, if lll_att <= glob_max_terms
then ret_att : array_aa array_bb convfp(al_att) + ret_att,
iii_att lll_att
ret_att
iii_att : 1 + iii_att), ret_att : ---------------), ret_att)
convfp(mmm_att)
(%i25) display_pole() := if (array_pole # glob_large_float)
1
and (array_pole > 0.0) and (array_pole # glob_large_float)
1 2
and (array_pole > 0.0) and glob_display_flag
2
then (omniout_float(ALWAYS, "Radius of convergence ", 4,
array_pole , 4, " "), omniout_float(ALWAYS,
1
"Order of pole ", 4, array_pole , 4, " "))
2
(%o25) display_pole() := if (array_pole # glob_large_float)
1
and (array_pole > 0.0) and (array_pole # glob_large_float)
1 2
and (array_pole > 0.0) and glob_display_flag
2
then (omniout_float(ALWAYS, "Radius of convergence ", 4,
array_pole , 4, " "), omniout_float(ALWAYS,
1
"Order of pole ", 4, array_pole , 4, " "))
2
(%i26) logditto(file) := (printf(file, ""), printf(file, "ditto"),
printf(file, " | "))
(%o26) logditto(file) := (printf(file, ""), printf(file, "ditto"),
printf(file, " | "))
(%i27) logitem_integer(file, n) := (printf(file, ""),
printf(file, "~d", n), printf(file, " | "))
(%o27) logitem_integer(file, n) := (printf(file, ""),
printf(file, "~d", n), printf(file, " | "))
(%i28) logitem_str(file, str) := (printf(file, ""), printf(file, str),
printf(file, " | "))
(%o28) logitem_str(file, str) := (printf(file, ""), printf(file, str),
printf(file, " | "))
(%i29) log_revs(file, revs) := printf(file, revs)
(%o29) log_revs(file, revs) := printf(file, revs)
(%i30) logitem_float(file, x) := (printf(file, ""), printf(file, "~g", x),
printf(file, " | "))
(%o30) logitem_float(file, x) := (printf(file, ""), printf(file, "~g", x),
printf(file, " | "))
(%i31) logitem_pole(file, pole) := (printf(file, ""),
if pole = 0 then printf(file, "NA") elseif pole = 1 then printf(file, "Real")
elseif pole = 2 then printf(file, "Complex") else printf(file, "No Pole"),
printf(file, " | "))
(%o31) logitem_pole(file, pole) := (printf(file, ""),
if pole = 0 then printf(file, "NA") elseif pole = 1 then printf(file, "Real")
elseif pole = 2 then printf(file, "Complex") else printf(file, "No Pole"),
printf(file, " | "))
(%i32) logstart(file) := printf(file, "")
(%o32) logstart(file) := printf(file, "
")
(%i33) logend(file) := printf(file, "
~%")
(%o33) logend(file) := printf(file, "~%")
(%i34) chk_data() := (errflag : false,
if (glob_max_terms < 15) or (glob_max_terms > 512)
then (omniout_str(ALWAYS, "Illegal max_terms = -- Using 30"),
glob_max_terms : 30), if glob_max_iter < 2
then (omniout_str(ALWAYS, "Illegal max_iter"), errflag : true),
if errflag then quit())
(%o34) chk_data() := (errflag : false,
if (glob_max_terms < 15) or (glob_max_terms > 512)
then (omniout_str(ALWAYS, "Illegal max_terms = -- Using 30"),
glob_max_terms : 30), if glob_max_iter < 2
then (omniout_str(ALWAYS, "Illegal max_iter"), errflag : true),
if errflag then quit())
(%i35) mode_declare(comp_expect_sec, bfloat)
modedeclare: bfloat
is not a built-in type; assuming it is a Maxima extension type.
(%o35) [comp_expect_sec]
(%i36) comp_expect_sec(t_end2, t_start2, t2, clock_sec) :=
(ms2 : clock_sec, sub1 : t_end2 - t_start2, sub2 : t2 - t_start2,
if sub1 = 0.0 then sec_left : 0.0 else (if abs(sub2) > 0.0
sub1
then (rrr : ----, sec_left : rrr ms2 - ms2) else sec_left : 0.0), sec_left)
sub2
(%o36) comp_expect_sec(t_end2, t_start2, t2, clock_sec) :=
(ms2 : clock_sec, sub1 : t_end2 - t_start2, sub2 : t2 - t_start2,
if sub1 = 0.0 then sec_left : 0.0 else (if abs(sub2) > 0.0
sub1
then (rrr : ----, sec_left : rrr ms2 - ms2) else sec_left : 0.0), sec_left)
sub2
(%i37) mode_declare(comp_percent, bfloat)
modedeclare: bfloat
is not a built-in type; assuming it is a Maxima extension type.
(%o37) [comp_percent]
(%i38) comp_percent(t_end2, t_start2, t2) :=
(sub1 : t_end2 - t_start2, sub2 : t2 - t_start2,
100.0 sub2
if abs(sub2) > glob_small_float then rrr : ---------- else rrr : 0.0, rrr)
sub1
(%o38) comp_percent(t_end2, t_start2, t2) :=
(sub1 : t_end2 - t_start2, sub2 : t2 - t_start2,
100.0 sub2
if abs(sub2) > glob_small_float then rrr : ---------- else rrr : 0.0, rrr)
sub1
(%i39) factorial_1(nnn) := (if nnn <= glob_max_terms
then (if array_fact_1 = 0 then (ret : nnn!, array_fact_1 : ret)
nnn nnn
else ret : array_fact_1 ) else ret : nnn!, ret)
nnn
(%o39) factorial_1(nnn) := (if nnn <= glob_max_terms
then (if array_fact_1 = 0 then (ret : nnn!, array_fact_1 : ret)
nnn nnn
else ret : array_fact_1 ) else ret : nnn!, ret)
nnn
(%i40) factorial_3(mmm, nnn) := (if (nnn <= glob_max_terms)
and (mmm <= glob_max_terms) then (if array_fact_2 = 0
mmm, nnn
factorial_1(mmm)
then (ret : ----------------, array_fact_2 : ret)
factorial_1(nnn) mmm, nnn
mmm!
else ret : array_fact_2 ) else ret : ----, ret)
mmm, nnn nnn!
(%o40) factorial_3(mmm, nnn) := (if (nnn <= glob_max_terms)
and (mmm <= glob_max_terms) then (if array_fact_2 = 0
mmm, nnn
factorial_1(mmm)
then (ret : ----------------, array_fact_2 : ret)
factorial_1(nnn) mmm, nnn
mmm!
else ret : array_fact_2 ) else ret : ----, ret)
mmm, nnn nnn!
(%i41) convfp(mmm) := mmm
(%o41) convfp(mmm) := mmm
(%i42) convfloat(mmm) := mmm
(%o42) convfloat(mmm) := mmm
(%i43) elapsed_time_seconds() := (t : elapsed_real_time(), t)
(%o43) elapsed_time_seconds() := (t : elapsed_real_time(), t)
(%i44) arcsin(x) := asin(x)
(%o44) arcsin(x) := asin(x)
(%i45) arccos(x) := acos(x)
(%o45) arccos(x) := acos(x)
(%i46) arctan(x) := atan(x)
(%o46) arctan(x) := atan(x)
(%i47) exact_soln_y(x) := - cos(x) + sin(x) + 2.0
(%o47) exact_soln_y(x) := - cos(x) + sin(x) + 2.0
(%i48) mainprog() := (define_variable(INFO, 2, fixnum),
define_variable(glob_max_terms, 30, fixnum),
define_variable(DEBUGMASSIVE, 4, fixnum), define_variable(ALWAYS, 1, fixnum),
define_variable(glob_iolevel, 5, fixnum), define_variable(DEBUGL, 3, fixnum),
define_variable(glob_warned2, false, boolean),
define_variable(glob_small_float, 1.0E-51, float),
define_variable(glob_look_poles, false, boolean),
define_variable(glob_large_float, 9.0E+100, float),
define_variable(glob_initial_pass, true, boolean),
define_variable(years_in_century, 100.0, float),
define_variable(hours_in_day, 24.0, float),
define_variable(glob_max_minutes, 0.0, float),
define_variable(glob_log10relerr, 0.0, float),
define_variable(glob_warned, false, boolean),
define_variable(glob_relerr, 1.0E-11, float),
define_variable(glob_last_good_h, 0.1, float),
define_variable(glob_log10abserr, 0.0, float),
define_variable(glob_iter, 0, fixnum),
define_variable(glob_log10_abserr, 1.0E-11, float),
define_variable(glob_not_yet_start_msg, true, boolean),
define_variable(glob_optimal_expect_sec, 0.1, float),
define_variable(glob_max_hours, 0.0, float),
define_variable(glob_abserr, 1.0E-11, float),
define_variable(glob_log10_relerr, 1.0E-11, float),
define_variable(glob_hmin, 1.0E-11, float),
define_variable(glob_display_flag, true, boolean),
define_variable(glob_log10normmin, 0.1, float),
define_variable(glob_subiter_method, 3, fixnum),
define_variable(glob_normmax, 0.0, float),
define_variable(glob_no_eqs, 0, fixnum),
define_variable(glob_max_rel_trunc_err, 1.0E-11, float),
define_variable(glob_disp_incr, 0.1, float),
define_variable(djd_debug, true, boolean),
define_variable(glob_dump, false, boolean),
define_variable(glob_html_log, true, boolean),
define_variable(MAX_UNCHANGED, 10, fixnum),
define_variable(glob_curr_iter_when_opt, 0, fixnum),
define_variable(glob_reached_optimal_h, false, boolean),
define_variable(glob_smallish_float, 1.0E-101, float),
define_variable(glob_optimal_start, 0.0, float),
define_variable(glob_max_trunc_err, 1.0E-11, float),
define_variable(glob_hmax, 1.0, float),
define_variable(glob_not_yet_finished, true, boolean),
define_variable(glob_almost_1, 0.999, float),
define_variable(glob_current_iter, 0, fixnum),
define_variable(glob_unchanged_h_cnt, 0, fixnum),
define_variable(glob_optimal_clock_start_sec, 0.0, float),
define_variable(glob_dump_analytic, false, boolean),
define_variable(glob_clock_start_sec, 0.0, float),
define_variable(glob_clock_sec, 0.0, float),
define_variable(centuries_in_millinium, 10.0, float),
define_variable(days_in_year, 365.0, float),
define_variable(glob_max_iter, 1000, fixnum),
define_variable(glob_orig_start_sec, 0.0, float),
define_variable(glob_max_sec, 10000.0, float),
define_variable(min_in_hour, 60.0, float),
define_variable(djd_debug2, true, boolean),
define_variable(glob_max_opt_iter, 10, fixnum),
define_variable(glob_start, 0, fixnum),
define_variable(glob_hmin_init, 0.001, float),
define_variable(glob_h, 0.1, float), define_variable(glob_optimal_done, false,
boolean), define_variable(sec_in_min, 60.0, float),
define_variable(glob_percent_done, 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/addpostode.ode#################"),
omniout_str(ALWAYS, "diff ( y , x , 1 ) = cos ( x ) + sin ( x ) ;"),
omniout_str(ALWAYS, "!"), omniout_str(ALWAYS,
"/* BEGIN FIRST INPUT BLOCK */"), omniout_str(ALWAYS, "max_terms : 30,"),
omniout_str(ALWAYS, "Digits : 32,"), omniout_str(ALWAYS, "!"),
omniout_str(ALWAYS, "/* END FIRST INPUT BLOCK */"),
omniout_str(ALWAYS, "/* BEGIN SECOND INPUT BLOCK */"),
omniout_str(ALWAYS, "x_start : 0.0,"), omniout_str(ALWAYS, "x_end : 10.0 ,"),
omniout_str(ALWAYS, "array_y_init[0 + 1] : exact_soln_y(x_start),"),
omniout_str(ALWAYS, "glob_h : 0.00001 ,"),
omniout_str(ALWAYS, "glob_look_poles : true,"),
omniout_str(ALWAYS, "glob_max_iter : 100,"),
omniout_str(ALWAYS, "/* END SECOND INPUT BLOCK */"),
omniout_str(ALWAYS, "/* BEGIN OVERRIDE BLOCK */"),
omniout_str(ALWAYS, "glob_h : 0.001 ,"),
omniout_str(ALWAYS, "glob_look_poles : true,"),
omniout_str(ALWAYS, "glob_max_iter : 1000,"),
omniout_str(ALWAYS, "glob_max_minutes : 15,"),
omniout_str(ALWAYS, "/* END OVERRIDE BLOCK */"), omniout_str(ALWAYS, "!"),
omniout_str(ALWAYS, "/* BEGIN USER DEF BLOCK */"),
omniout_str(ALWAYS, "exact_soln_y (x) := ("),
omniout_str(ALWAYS, "2.0 + sin(x) - cos(x) "), omniout_str(ALWAYS, ");"),
omniout_str(ALWAYS, "/* END USER DEF BLOCK */"),
omniout_str(ALWAYS, "#######END OF ECHO OF PROBLEM#################"),
glob_unchanged_h_cnt : 0, glob_warned : false, glob_warned2 : false,
glob_small_float : 1.0E-200, glob_smallish_float : 1.0E-64,
glob_large_float : 1.0E+100, glob_almost_1 : 0.99, glob_log10_abserr : - 8.0,
glob_log10_relerr : - 8.0, glob_hmax : 0.01, max_terms : 30, Digits : 32,
glob_max_terms : max_terms, glob_html_log : true,
array(array_m1, 1 + max_terms), array(array_y_init, 1 + max_terms),
array(array_tmp1_g, 1 + max_terms), array(array_tmp0, 1 + max_terms),
array(array_tmp1, 1 + max_terms), array(array_tmp2, 1 + max_terms),
array(array_tmp3, 1 + max_terms), array(array_tmp4, 1 + max_terms),
array(array_type_pole, 1 + max_terms), array(array_tmp3_g, 1 + max_terms),
array(array_fact_1, 1 + max_terms), array(array_1st_rel_error, 1 + max_terms),
array(array_y, 1 + max_terms), array(array_x, 1 + max_terms),
array(array_pole, 1 + max_terms), array(array_norms, 1 + max_terms),
array(array_last_rel_error, 1 + max_terms),
array(array_y_higher_work, 1 + 2, 1 + max_terms),
array(array_y_higher, 1 + 2, 1 + max_terms),
array(array_fact_2, 1 + max_terms, 1 + max_terms),
array(array_complex_pole, 1 + 1, 1 + 3),
array(array_y_higher_work2, 1 + 2, 1 + max_terms),
array(array_poles, 1 + 1, 1 + 3), array(array_y_set_initial, 1 + 2,
1 + max_terms), array(array_real_pole, 1 + 1, 1 + 3), term : 1,
while term <= max_terms do (array_m1 : 0.0, term : 1 + term), term : 1,
term
while term <= max_terms do (array_y_init : 0.0, term : 1 + term),
term
term : 1, while term <= max_terms do (array_tmp1_g : 0.0,
term
term : 1 + term), term : 1, while term <= max_terms do (array_tmp0 : 0.0,
term
term : 1 + term), term : 1, while term <= max_terms do (array_tmp1 : 0.0,
term
term : 1 + term), term : 1, while term <= max_terms do (array_tmp2 : 0.0,
term
term : 1 + term), term : 1, while term <= max_terms do (array_tmp3 : 0.0,
term
term : 1 + term), term : 1, while term <= max_terms do (array_tmp4 : 0.0,
term
term : 1 + term), term : 1, while term <=
max_terms do (array_type_pole : 0.0, term : 1 + term), term : 1,
term
while term <= max_terms do (array_tmp3_g : 0.0, term : 1 + term),
term
term : 1, while term <= max_terms do (array_fact_1 : 0.0,
term
term : 1 + term), term : 1, while term <=
max_terms do (array_1st_rel_error : 0.0, term : 1 + term), term : 1,
term
while term <= max_terms do (array_y : 0.0, term : 1 + term), term : 1,
term
while term <= max_terms do (array_x : 0.0, term : 1 + term), term : 1,
term
while term <= max_terms do (array_pole : 0.0, term : 1 + term), term : 1,
term
while term <= max_terms do (array_norms : 0.0, term : 1 + term),
term
term : 1, while term <= max_terms do (array_last_rel_error : 0.0,
term
term : 1 + term), ord : 1, while ord <= 2 do (term : 1,
while term <= max_terms do (array_y_higher_work : 0.0,
ord, term
term : 1 + term), ord : 1 + ord), ord : 1,
while ord <= 2 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 <= max_terms do (term : 1,
while term <= max_terms do (array_fact_2 : 0.0, term : 1 + term),
ord, term
ord : 1 + ord), ord : 1, while ord <= 1 do (term : 1,
while term <= 3 do (array_complex_pole : 0.0, term : 1 + term),
ord, term
ord : 1 + ord), ord : 1, while ord <= 2 do (term : 1,
while term <= max_terms do (array_y_higher_work2 : 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 <= 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 <= 1 do (term : 1,
while term <= 3 do (array_real_pole : 0.0, term : 1 + term),
ord, term
ord : 1 + ord), array(array_tmp1_g, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_tmp1_g : 0.0, term : 1 + term),
term
array(array_tmp4, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_tmp4 : 0.0, term : 1 + term),
term
array(array_tmp3, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_tmp3 : 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_tmp3_g, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_tmp3_g : 0.0, term : 1 + term),
term
array(array_x, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_x : 0.0, term : 1 + term),
term
array(array_y, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_y : 0.0, term : 1 + term),
term
array(array_const_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_m1, 1 + 1 + max_terms), term : 1,
1
while term <= max_terms do (array_m1 : 0.0, term : 1 + term),
term
array_m1 : - 1.0, iiif : 0, while iiif <= glob_max_terms do (jjjf : 0,
1
while jjjf <= glob_max_terms do (array_fact_1 : 0,
iiif
array_fact_2 : 0, jjjf : 1 + jjjf), iiif : 1 + iiif), x_start : 0.0,
iiif, jjjf
x_end : 10.0, array_y_init : exact_soln_y(x_start), glob_h : 1.0E-5,
1 + 0
glob_look_poles : true, glob_max_iter : 100, glob_h : 0.001,
glob_look_poles : true, glob_max_iter : 1000, glob_max_minutes : 15,
glob_last_good_h : glob_h, glob_max_terms : max_terms,
glob_max_sec : convfloat(3600.0) convfloat(glob_max_hours)
+ convfloat(60.0) convfloat(glob_max_minutes),
glob_log10_abserr glob_log10_relerr
glob_abserr : 10.0 , glob_relerr : 10.0 ,
chk_data(), array_y_set_initial : true, array_y_set_initial : false,
1, 1 1, 2
array_y_set_initial : false, array_y_set_initial : false,
1, 3 1, 4
array_y_set_initial : false, array_y_set_initial : false,
1, 5 1, 6
array_y_set_initial : false, array_y_set_initial : false,
1, 7 1, 8
array_y_set_initial : false, array_y_set_initial : false,
1, 9 1, 10
array_y_set_initial : false, array_y_set_initial : false,
1, 11 1, 12
array_y_set_initial : false, array_y_set_initial : false,
1, 13 1, 14
array_y_set_initial : false, array_y_set_initial : false,
1, 15 1, 16
array_y_set_initial : false, array_y_set_initial : false,
1, 17 1, 18
array_y_set_initial : false, array_y_set_initial : false,
1, 19 1, 20
array_y_set_initial : false, array_y_set_initial : false,
1, 21 1, 22
array_y_set_initial : false, array_y_set_initial : false,
1, 23 1, 24
array_y_set_initial : false, array_y_set_initial : false,
1, 25 1, 26
array_y_set_initial : false, array_y_set_initial : false,
1, 27 1, 28
array_y_set_initial : false, array_y_set_initial : false,
1, 29 1, 30
if glob_html_log then html_log_file : openw("html/entry.html"),
omniout_str(ALWAYS, "START of Soultion"), array_x : x_start,
1
array_x : glob_h, order_diff : 1, term_no : 1,
2
while term_no <= order_diff do (array_y :
term_no
term_no - 1
array_y_init glob_h
term_no
-------------------------------------, term_no : 1 + term_no),
factorial_1(term_no - 1)
rows : order_diff, r_order : 1, while r_order <= rows do (term_no : 1,
while term_no <= 1 - r_order + rows do (it : - 1 + r_order + term_no,
term_no - 1
array_y_init glob_h
it
array_y_higher : --------------------------------,
r_order, term_no factorial_1(term_no - 1)
term_no : 1 + term_no), r_order : 1 + r_order), current_iter : 1,
glob_clock_start_sec : elapsed_time_seconds(), start_array_y(),
if !array_y_higher ! > glob_small_float
! 1, 1!
then (tmp : !array_y_higher !, log10norm : log10(tmp),
! 1, 1!
if log10norm < glob_log10normmin then glob_log10normmin : log10norm),
display_alot(current_iter), glob_clock_sec : elapsed_time_seconds(),
glob_current_iter : 0, glob_iter : 0, omniout_str(DEBUGL, " "),
glob_reached_optimal_h : true, glob_optimal_clock_start_sec :
elapsed_time_seconds(), while (glob_current_iter < glob_max_iter)
and (array_x <= x_end) and (convfloat(glob_clock_sec) - convfloat(glob_orig_start_sec) <
1
convfloat(glob_max_sec)) do (omniout_str
(INFO, " "), omniout_str(INFO, "TOP MAIN SOLVE Loop"),
glob_iter : 1 + glob_iter, glob_clock_sec : elapsed_time_seconds(),
glob_current_iter : 1 + glob_current_iter, atomall(),
if glob_look_poles then check_for_pole(), array_x : glob_h + array_x ,
1 1
array_x : glob_h, order_diff : 1, ord : 2, calc_term : 1,
2
iii : glob_max_terms, while iii >= calc_term do (array_y_higher_work :
2, iii
array_y_higher
2, iii
--------------------
calc_term - 1
glob_h
-------------------------------------, iii : iii - 1), temp_sum : 0.0,
factorial_3(iii - calc_term, iii - 1)
ord : 2, calc_term : 1, iii : glob_max_terms,
while iii >= calc_term do (temp_sum : array_y_higher_work + temp_sum,
ord, iii
iii : iii - 1), array_y_higher_work2 :
ord, calc_term
calc_term - 1
temp_sum glob_h
----------------------------, ord : 1, calc_term : 2, iii : glob_max_terms,
factorial_1(calc_term - 1)!
while iii >= calc_term do (array_y_higher_work :
1, iii
array_y_higher
1, iii
--------------------
calc_term - 1
glob_h
-------------------------------------, iii : iii - 1), temp_sum : 0.0,
factorial_3(iii - calc_term, iii - 1)
ord : 1, calc_term : 2, iii : glob_max_terms,
while iii >= calc_term do (temp_sum : array_y_higher_work + temp_sum,
ord, iii
iii : iii - 1), array_y_higher_work2 :
ord, calc_term
calc_term - 1
temp_sum glob_h
----------------------------, ord : 1, calc_term : 1, iii : glob_max_terms,
factorial_1(calc_term - 1)!
while iii >= calc_term do (array_y_higher_work :
1, iii
array_y_higher
1, iii
--------------------
calc_term - 1
glob_h
-------------------------------------, iii : iii - 1), temp_sum : 0.0,
factorial_3(iii - calc_term, iii - 1)
ord : 1, calc_term : 1, iii : glob_max_terms,
while iii >= calc_term do (temp_sum : array_y_higher_work + temp_sum,
ord, iii
iii : iii - 1), array_y_higher_work2 :
ord, calc_term
calc_term - 1
temp_sum glob_h
----------------------------, term_no : glob_max_terms,
factorial_1(calc_term - 1)!
while term_no >= 1 do (array_y : array_y_higher_work2 ,
term_no 1, term_no
ord : 1, while ord <= order_diff do (array_y_higher :
ord, term_no
array_y_higher_work2 , ord : 1 + ord), term_no : term_no - 1),
ord, term_no
display_alot(current_iter)), omniout_str(ALWAYS, "Finished!"),
if glob_iter >= glob_max_iter then omniout_str(ALWAYS,
"Maximum Iterations Reached before Solution Completed!"),
if elapsed_time_seconds() - convfloat(glob_orig_start_sec) >=
convfloat(glob_max_sec) then omniout_str(ALWAYS,
"Maximum Time Reached before Solution Completed!"),
glob_clock_sec : elapsed_time_seconds(),
omniout_str(INFO, "diff ( y , x , 1 ) = cos ( x ) + sin ( x ) ;"),
omniout_int(INFO, "Iterations ", 32, glob_iter, 4, " "),
prog_report(x_start, x_end), if glob_html_log
then (logstart(html_log_file), logitem_str(html_log_file,
"2012-06-17T18:47:32-05:00"), logitem_str(html_log_file, "Maxima"),
logitem_str(html_log_file, "add"),
logitem_str(html_log_file, "diff ( y , x , 1 ) = cos ( x ) + sin ( x ) ;"),
logitem_float(html_log_file, x_start), logitem_float(html_log_file, x_end),
logitem_float(html_log_file, array_x ), logitem_float(html_log_file, glob_h),
1
logitem_str(html_log_file, "16"), logitem_integer(html_log_file,
glob_max_terms), logitem_float(html_log_file, array_1st_rel_error ),
1
logitem_float(html_log_file, array_last_rel_error ),
1
logitem_integer(html_log_file, glob_iter),
logitem_pole(html_log_file, array_type_pole ),
1
if (array_type_pole = 1) or (array_type_pole = 2)
1 1
then (logitem_float(html_log_file, array_pole ),
1
logitem_float(html_log_file, array_pole ), 0)
2
else (logitem_str(html_log_file, "NA"), logitem_str(html_log_file, "NA"), 0),
logitem_time(html_log_file, convfloat(glob_clock_sec)),
if glob_percent_done < 100.0 then (logitem_time(html_log_file,
convfloat(glob_optimal_expect_sec)), 0)
else (logitem_str(html_log_file, "Done"), 0),
log_revs(html_log_file, " 092 | "),
logitem_str(html_log_file, "add diffeq.max"),
logitem_str(html_log_file,
"add maxima results"),
logitem_str(html_log_file, "Mostly affecting speed of factorials"),
logend(html_log_file)), if glob_html_log then close(html_log_file))
(%o48) mainprog() := (define_variable(INFO, 2, fixnum),
define_variable(glob_max_terms, 30, fixnum),
define_variable(DEBUGMASSIVE, 4, fixnum), define_variable(ALWAYS, 1, fixnum),
define_variable(glob_iolevel, 5, fixnum), define_variable(DEBUGL, 3, fixnum),
define_variable(glob_warned2, false, boolean),
define_variable(glob_small_float, 1.0E-51, float),
define_variable(glob_look_poles, false, boolean),
define_variable(glob_large_float, 9.0E+100, float),
define_variable(glob_initial_pass, true, boolean),
define_variable(years_in_century, 100.0, float),
define_variable(hours_in_day, 24.0, float),
define_variable(glob_max_minutes, 0.0, float),
define_variable(glob_log10relerr, 0.0, float),
define_variable(glob_warned, false, boolean),
define_variable(glob_relerr, 1.0E-11, float),
define_variable(glob_last_good_h, 0.1, float),
define_variable(glob_log10abserr, 0.0, float),
define_variable(glob_iter, 0, fixnum),
define_variable(glob_log10_abserr, 1.0E-11, float),
define_variable(glob_not_yet_start_msg, true, boolean),
define_variable(glob_optimal_expect_sec, 0.1, float),
define_variable(glob_max_hours, 0.0, float),
define_variable(glob_abserr, 1.0E-11, float),
define_variable(glob_log10_relerr, 1.0E-11, float),
define_variable(glob_hmin, 1.0E-11, float),
define_variable(glob_display_flag, true, boolean),
define_variable(glob_log10normmin, 0.1, float),
define_variable(glob_subiter_method, 3, fixnum),
define_variable(glob_normmax, 0.0, float),
define_variable(glob_no_eqs, 0, fixnum),
define_variable(glob_max_rel_trunc_err, 1.0E-11, float),
define_variable(glob_disp_incr, 0.1, float),
define_variable(djd_debug, true, boolean),
define_variable(glob_dump, false, boolean),
define_variable(glob_html_log, true, boolean),
define_variable(MAX_UNCHANGED, 10, fixnum),
define_variable(glob_curr_iter_when_opt, 0, fixnum),
define_variable(glob_reached_optimal_h, false, boolean),
define_variable(glob_smallish_float, 1.0E-101, float),
define_variable(glob_optimal_start, 0.0, float),
define_variable(glob_max_trunc_err, 1.0E-11, float),
define_variable(glob_hmax, 1.0, float),
define_variable(glob_not_yet_finished, true, boolean),
define_variable(glob_almost_1, 0.999, float),
define_variable(glob_current_iter, 0, fixnum),
define_variable(glob_unchanged_h_cnt, 0, fixnum),
define_variable(glob_optimal_clock_start_sec, 0.0, float),
define_variable(glob_dump_analytic, false, boolean),
define_variable(glob_clock_start_sec, 0.0, float),
define_variable(glob_clock_sec, 0.0, float),
define_variable(centuries_in_millinium, 10.0, float),
define_variable(days_in_year, 365.0, float),
define_variable(glob_max_iter, 1000, fixnum),
define_variable(glob_orig_start_sec, 0.0, float),
define_variable(glob_max_sec, 10000.0, float),
define_variable(min_in_hour, 60.0, float),
define_variable(djd_debug2, true, boolean),
define_variable(glob_max_opt_iter, 10, fixnum),
define_variable(glob_start, 0, fixnum),
define_variable(glob_hmin_init, 0.001, float),
define_variable(glob_h, 0.1, float), define_variable(glob_optimal_done, false,
boolean), define_variable(sec_in_min, 60.0, float),
define_variable(glob_percent_done, 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/addpostode.ode#################"),
omniout_str(ALWAYS, "diff ( y , x , 1 ) = cos ( x ) + sin ( x ) ;"),
omniout_str(ALWAYS, "!"), omniout_str(ALWAYS,
"/* BEGIN FIRST INPUT BLOCK */"), omniout_str(ALWAYS, "max_terms : 30,"),
omniout_str(ALWAYS, "Digits : 32,"), omniout_str(ALWAYS, "!"),
omniout_str(ALWAYS, "/* END FIRST INPUT BLOCK */"),
omniout_str(ALWAYS, "/* BEGIN SECOND INPUT BLOCK */"),
omniout_str(ALWAYS, "x_start : 0.0,"), omniout_str(ALWAYS, "x_end : 10.0 ,"),
omniout_str(ALWAYS, "array_y_init[0 + 1] : exact_soln_y(x_start),"),
omniout_str(ALWAYS, "glob_h : 0.00001 ,"),
omniout_str(ALWAYS, "glob_look_poles : true,"),
omniout_str(ALWAYS, "glob_max_iter : 100,"),
omniout_str(ALWAYS, "/* END SECOND INPUT BLOCK */"),
omniout_str(ALWAYS, "/* BEGIN OVERRIDE BLOCK */"),
omniout_str(ALWAYS, "glob_h : 0.001 ,"),
omniout_str(ALWAYS, "glob_look_poles : true,"),
omniout_str(ALWAYS, "glob_max_iter : 1000,"),
omniout_str(ALWAYS, "glob_max_minutes : 15,"),
omniout_str(ALWAYS, "/* END OVERRIDE BLOCK */"), omniout_str(ALWAYS, "!"),
omniout_str(ALWAYS, "/* BEGIN USER DEF BLOCK */"),
omniout_str(ALWAYS, "exact_soln_y (x) := ("),
omniout_str(ALWAYS, "2.0 + sin(x) - cos(x) "), omniout_str(ALWAYS, ");"),
omniout_str(ALWAYS, "/* END USER DEF BLOCK */"),
omniout_str(ALWAYS, "#######END OF ECHO OF PROBLEM#################"),
glob_unchanged_h_cnt : 0, glob_warned : false, glob_warned2 : false,
glob_small_float : 1.0E-200, glob_smallish_float : 1.0E-64,
glob_large_float : 1.0E+100, glob_almost_1 : 0.99, glob_log10_abserr : - 8.0,
glob_log10_relerr : - 8.0, glob_hmax : 0.01, max_terms : 30, Digits : 32,
glob_max_terms : max_terms, glob_html_log : true,
array(array_m1, 1 + max_terms), array(array_y_init, 1 + max_terms),
array(array_tmp1_g, 1 + max_terms), array(array_tmp0, 1 + max_terms),
array(array_tmp1, 1 + max_terms), array(array_tmp2, 1 + max_terms),
array(array_tmp3, 1 + max_terms), array(array_tmp4, 1 + max_terms),
array(array_type_pole, 1 + max_terms), array(array_tmp3_g, 1 + max_terms),
array(array_fact_1, 1 + max_terms), array(array_1st_rel_error, 1 + max_terms),
array(array_y, 1 + max_terms), array(array_x, 1 + max_terms),
array(array_pole, 1 + max_terms), array(array_norms, 1 + max_terms),
array(array_last_rel_error, 1 + max_terms),
array(array_y_higher_work, 1 + 2, 1 + max_terms),
array(array_y_higher, 1 + 2, 1 + max_terms),
array(array_fact_2, 1 + max_terms, 1 + max_terms),
array(array_complex_pole, 1 + 1, 1 + 3),
array(array_y_higher_work2, 1 + 2, 1 + max_terms),
array(array_poles, 1 + 1, 1 + 3), array(array_y_set_initial, 1 + 2,
1 + max_terms), array(array_real_pole, 1 + 1, 1 + 3), term : 1,
while term <= max_terms do (array_m1 : 0.0, term : 1 + term), term : 1,
term
while term <= max_terms do (array_y_init : 0.0, term : 1 + term),
term
term : 1, while term <= max_terms do (array_tmp1_g : 0.0,
term
term : 1 + term), term : 1, while term <= max_terms do (array_tmp0 : 0.0,
term
term : 1 + term), term : 1, while term <= max_terms do (array_tmp1 : 0.0,
term
term : 1 + term), term : 1, while term <= max_terms do (array_tmp2 : 0.0,
term
term : 1 + term), term : 1, while term <= max_terms do (array_tmp3 : 0.0,
term
term : 1 + term), term : 1, while term <= max_terms do (array_tmp4 : 0.0,
term
term : 1 + term), term : 1, while term <=
max_terms do (array_type_pole : 0.0, term : 1 + term), term : 1,
term
while term <= max_terms do (array_tmp3_g : 0.0, term : 1 + term),
term
term : 1, while term <= max_terms do (array_fact_1 : 0.0,
term
term : 1 + term), term : 1, while term <=
max_terms do (array_1st_rel_error : 0.0, term : 1 + term), term : 1,
term
while term <= max_terms do (array_y : 0.0, term : 1 + term), term : 1,
term
while term <= max_terms do (array_x : 0.0, term : 1 + term), term : 1,
term
while term <= max_terms do (array_pole : 0.0, term : 1 + term), term : 1,
term
while term <= max_terms do (array_norms : 0.0, term : 1 + term),
term
term : 1, while term <= max_terms do (array_last_rel_error : 0.0,
term
term : 1 + term), ord : 1, while ord <= 2 do (term : 1,
while term <= max_terms do (array_y_higher_work : 0.0,
ord, term
term : 1 + term), ord : 1 + ord), ord : 1,
while ord <= 2 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 <= max_terms do (term : 1,
while term <= max_terms do (array_fact_2 : 0.0, term : 1 + term),
ord, term
ord : 1 + ord), ord : 1, while ord <= 1 do (term : 1,
while term <= 3 do (array_complex_pole : 0.0, term : 1 + term),
ord, term
ord : 1 + ord), ord : 1, while ord <= 2 do (term : 1,
while term <= max_terms do (array_y_higher_work2 : 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 <= 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 <= 1 do (term : 1,
while term <= 3 do (array_real_pole : 0.0, term : 1 + term),
ord, term
ord : 1 + ord), array(array_tmp1_g, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_tmp1_g : 0.0, term : 1 + term),
term
array(array_tmp4, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_tmp4 : 0.0, term : 1 + term),
term
array(array_tmp3, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_tmp3 : 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_tmp3_g, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_tmp3_g : 0.0, term : 1 + term),
term
array(array_x, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_x : 0.0, term : 1 + term),
term
array(array_y, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_y : 0.0, term : 1 + term),
term
array(array_const_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_m1, 1 + 1 + max_terms), term : 1,
1
while term <= max_terms do (array_m1 : 0.0, term : 1 + term),
term
array_m1 : - 1.0, iiif : 0, while iiif <= glob_max_terms do (jjjf : 0,
1
while jjjf <= glob_max_terms do (array_fact_1 : 0,
iiif
array_fact_2 : 0, jjjf : 1 + jjjf), iiif : 1 + iiif), x_start : 0.0,
iiif, jjjf
x_end : 10.0, array_y_init : exact_soln_y(x_start), glob_h : 1.0E-5,
1 + 0
glob_look_poles : true, glob_max_iter : 100, glob_h : 0.001,
glob_look_poles : true, glob_max_iter : 1000, glob_max_minutes : 15,
glob_last_good_h : glob_h, glob_max_terms : max_terms,
glob_max_sec : convfloat(3600.0) convfloat(glob_max_hours)
+ convfloat(60.0) convfloat(glob_max_minutes),
glob_log10_abserr glob_log10_relerr
glob_abserr : 10.0 , glob_relerr : 10.0 ,
chk_data(), array_y_set_initial : true, array_y_set_initial : false,
1, 1 1, 2
array_y_set_initial : false, array_y_set_initial : false,
1, 3 1, 4
array_y_set_initial : false, array_y_set_initial : false,
1, 5 1, 6
array_y_set_initial : false, array_y_set_initial : false,
1, 7 1, 8
array_y_set_initial : false, array_y_set_initial : false,
1, 9 1, 10
array_y_set_initial : false, array_y_set_initial : false,
1, 11 1, 12
array_y_set_initial : false, array_y_set_initial : false,
1, 13 1, 14
array_y_set_initial : false, array_y_set_initial : false,
1, 15 1, 16
array_y_set_initial : false, array_y_set_initial : false,
1, 17 1, 18
array_y_set_initial : false, array_y_set_initial : false,
1, 19 1, 20
array_y_set_initial : false, array_y_set_initial : false,
1, 21 1, 22
array_y_set_initial : false, array_y_set_initial : false,
1, 23 1, 24
array_y_set_initial : false, array_y_set_initial : false,
1, 25 1, 26
array_y_set_initial : false, array_y_set_initial : false,
1, 27 1, 28
array_y_set_initial : false, array_y_set_initial : false,
1, 29 1, 30
if glob_html_log then html_log_file : openw("html/entry.html"),
omniout_str(ALWAYS, "START of Soultion"), array_x : x_start,
1
array_x : glob_h, order_diff : 1, term_no : 1,
2
while term_no <= order_diff do (array_y :
term_no
term_no - 1
array_y_init glob_h
term_no
-------------------------------------, term_no : 1 + term_no),
factorial_1(term_no - 1)
rows : order_diff, r_order : 1, while r_order <= rows do (term_no : 1,
while term_no <= 1 - r_order + rows do (it : - 1 + r_order + term_no,
term_no - 1
array_y_init glob_h
it
array_y_higher : --------------------------------,
r_order, term_no factorial_1(term_no - 1)
term_no : 1 + term_no), r_order : 1 + r_order), current_iter : 1,
glob_clock_start_sec : elapsed_time_seconds(), start_array_y(),
if !array_y_higher ! > glob_small_float
! 1, 1!
then (tmp : !array_y_higher !, log10norm : log10(tmp),
! 1, 1!
if log10norm < glob_log10normmin then glob_log10normmin : log10norm),
display_alot(current_iter), glob_clock_sec : elapsed_time_seconds(),
glob_current_iter : 0, glob_iter : 0, omniout_str(DEBUGL, " "),
glob_reached_optimal_h : true, glob_optimal_clock_start_sec :
elapsed_time_seconds(), while (glob_current_iter < glob_max_iter)
and (array_x <= x_end) and (convfloat(glob_clock_sec) - convfloat(glob_orig_start_sec) <
1
convfloat(glob_max_sec)) do (omniout_str
(INFO, " "), omniout_str(INFO, "TOP MAIN SOLVE Loop"),
glob_iter : 1 + glob_iter, glob_clock_sec : elapsed_time_seconds(),
glob_current_iter : 1 + glob_current_iter, atomall(),
if glob_look_poles then check_for_pole(), array_x : glob_h + array_x ,
1 1
array_x : glob_h, order_diff : 1, ord : 2, calc_term : 1,
2
iii : glob_max_terms, while iii >= calc_term do (array_y_higher_work :
2, iii
array_y_higher
2, iii
--------------------
calc_term - 1
glob_h
-------------------------------------, iii : iii - 1), temp_sum : 0.0,
factorial_3(iii - calc_term, iii - 1)
ord : 2, calc_term : 1, iii : glob_max_terms,
while iii >= calc_term do (temp_sum : array_y_higher_work + temp_sum,
ord, iii
iii : iii - 1), array_y_higher_work2 :
ord, calc_term
calc_term - 1
temp_sum glob_h
----------------------------, ord : 1, calc_term : 2, iii : glob_max_terms,
factorial_1(calc_term - 1)!
while iii >= calc_term do (array_y_higher_work :
1, iii
array_y_higher
1, iii
--------------------
calc_term - 1
glob_h
-------------------------------------, iii : iii - 1), temp_sum : 0.0,
factorial_3(iii - calc_term, iii - 1)
ord : 1, calc_term : 2, iii : glob_max_terms,
while iii >= calc_term do (temp_sum : array_y_higher_work + temp_sum,
ord, iii
iii : iii - 1), array_y_higher_work2 :
ord, calc_term
calc_term - 1
temp_sum glob_h
----------------------------, ord : 1, calc_term : 1, iii : glob_max_terms,
factorial_1(calc_term - 1)!
while iii >= calc_term do (array_y_higher_work :
1, iii
array_y_higher
1, iii
--------------------
calc_term - 1
glob_h
-------------------------------------, iii : iii - 1), temp_sum : 0.0,
factorial_3(iii - calc_term, iii - 1)
ord : 1, calc_term : 1, iii : glob_max_terms,
while iii >= calc_term do (temp_sum : array_y_higher_work + temp_sum,
ord, iii
iii : iii - 1), array_y_higher_work2 :
ord, calc_term
calc_term - 1
temp_sum glob_h
----------------------------, term_no : glob_max_terms,
factorial_1(calc_term - 1)!
while term_no >= 1 do (array_y : array_y_higher_work2 ,
term_no 1, term_no
ord : 1, while ord <= order_diff do (array_y_higher :
ord, term_no
array_y_higher_work2 , ord : 1 + ord), term_no : term_no - 1),
ord, term_no
display_alot(current_iter)), omniout_str(ALWAYS, "Finished!"),
if glob_iter >= glob_max_iter then omniout_str(ALWAYS,
"Maximum Iterations Reached before Solution Completed!"),
if elapsed_time_seconds() - convfloat(glob_orig_start_sec) >=
convfloat(glob_max_sec) then omniout_str(ALWAYS,
"Maximum Time Reached before Solution Completed!"),
glob_clock_sec : elapsed_time_seconds(),
omniout_str(INFO, "diff ( y , x , 1 ) = cos ( x ) + sin ( x ) ;"),
omniout_int(INFO, "Iterations ", 32, glob_iter, 4, " "),
prog_report(x_start, x_end), if glob_html_log
then (logstart(html_log_file), logitem_str(html_log_file,
"2012-06-17T18:47:32-05:00"), logitem_str(html_log_file, "Maxima"),
logitem_str(html_log_file, "add"),
logitem_str(html_log_file, "diff ( y , x , 1 ) = cos ( x ) + sin ( x ) ;"),
logitem_float(html_log_file, x_start), logitem_float(html_log_file, x_end),
logitem_float(html_log_file, array_x ), logitem_float(html_log_file, glob_h),
1
logitem_str(html_log_file, "16"), logitem_integer(html_log_file,
glob_max_terms), logitem_float(html_log_file, array_1st_rel_error ),
1
logitem_float(html_log_file, array_last_rel_error ),
1
logitem_integer(html_log_file, glob_iter),
logitem_pole(html_log_file, array_type_pole ),
1
if (array_type_pole = 1) or (array_type_pole = 2)
1 1
then (logitem_float(html_log_file, array_pole ),
1
logitem_float(html_log_file, array_pole ), 0)
2
else (logitem_str(html_log_file, "NA"), logitem_str(html_log_file, "NA"), 0),
logitem_time(html_log_file, convfloat(glob_clock_sec)),
if glob_percent_done < 100.0 then (logitem_time(html_log_file,
convfloat(glob_optimal_expect_sec)), 0)
else (logitem_str(html_log_file, "Done"), 0),
log_revs(html_log_file, " 092 | "),
logitem_str(html_log_file, "add diffeq.max"),
logitem_str(html_log_file,
"add maxima results"),
logitem_str(html_log_file, "Mostly affecting speed of factorials"),
logend(html_log_file)), if glob_html_log then close(html_log_file))
(%i49) mainprog()
"##############ECHO OF PROBLEM#################"
"##############temp/addpostode.ode#################"
"diff ( y , x , 1 ) = cos ( x ) + sin ( x ) ;"
"!"
"/* BEGIN FIRST INPUT BLOCK */"
"max_terms : 30,"
"Digits : 32,"
"!"
"/* END FIRST INPUT BLOCK */"
"/* BEGIN SECOND INPUT BLOCK */"
"x_start : 0.0,"
"x_end : 10.0 ,"
"array_y_init[0 + 1] : exact_soln_y(x_start),"
"glob_h : 0.00001 ,"
"glob_look_poles : true,"
"glob_max_iter : 100,"
"/* END SECOND INPUT BLOCK */"
"/* BEGIN OVERRIDE BLOCK */"
"glob_h : 0.001 ,"
"glob_look_poles : true,"
"glob_max_iter : 1000,"
"glob_max_minutes : 15,"
"/* END OVERRIDE BLOCK */"
"!"
"/* BEGIN USER DEF BLOCK */"
"exact_soln_y (x) := ("
"2.0 + sin(x) - cos(x) "
");"
"/* END USER DEF BLOCK */"
"#######END OF ECHO OF PROBLEM#################"
"START of Soultion"
x[1] = 0.0 " "
y[1] (analytic) = 1. " "
y[1] (numeric) = 1. " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.000E-3 " "
y[1] (analytic) = 1.0010004998332915 " "
y[1] (numeric) = 1.0010004998332918 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.218226713792960400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 2.000E-3 " "
y[1] (analytic) = 1.002001998666 " "
y[1] (numeric) = 1.0020019986660003 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.216009600985297300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 3.000E-3 " "
y[1] (analytic) = 1.003004495496627 " "
y[1] (numeric) = 1.003004495496627 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 4.000E-3 " "
y[1] (analytic) = 1.004007989322675 " "
y[1] (numeric) = 1.0040079893226752 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.211582051999678700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 5.000E-3 " "
y[1] (analytic) = 1.0050124791406512 " "
y[1] (numeric) = 1.0050124791406512 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 6.000E-3 " "
y[1] (analytic) = 1.0060179639460647 " "
y[1] (numeric) = 1.006017963946065 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.20716341936947470000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 7.000E-3 " "
y[1] (analytic) = 1.007024442733432 " "
y[1] (numeric) = 1.0070244427334318 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.204957451899788600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 8.000E-3 " "
y[1] (analytic) = 1.0080319144962735 " "
y[1] (numeric) = 1.0080319144962733 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.202753719717196200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 9.000000000000001000E-3 " "
y[1] (analytic) = 1.0090403782271178 " "
y[1] (numeric) = 1.0090403782271176 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.200552224829330500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.000000000000000200E-2 " "
y[1] (analytic) = 1.0100498329175014 " "
y[1] (numeric) = 1.0100498329175012 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.19835296921599920000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.100000000000000300E-2 " "
y[1] (analytic) = 1.0110602775579696 " "
y[1] (numeric) = 1.0110602775579693 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.196155954829313300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.200000000000000400E-2 " "
y[1] (analytic) = 1.012071711138078 " "
y[1] (numeric) = 1.0120717111380775 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.38792236718762600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.300000000000000600E-2 " "
y[1] (analytic) = 1.0130841326463926 " "
y[1] (numeric) = 1.0130841326463922 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.383537314813198400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.400000000000000700E-2 " "
y[1] (analytic) = 1.0140975410704924 " "
y[1] (numeric) = 1.014097541070492 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.37915675627491560000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.500000000000000800E-2 " "
y[1] (analytic) = 1.0151119353969689 " "
y[1] (numeric) = 1.0151119353969686 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.187390347628990500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.600000000000001000E-2 " "
y[1] (analytic) = 1.0161273146114282 " "
y[1] (numeric) = 1.0161273146114278 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.37040913539347540000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.700000000000001000E-2 " "
y[1] (analytic) = 1.0171436776984906 " "
y[1] (numeric) = 1.0171436776984903 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.183021040129312600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.80000000000000100E-2 " "
y[1] (analytic) = 1.0181610236417935 " "
y[1] (numeric) = 1.0181610236417933 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.180839766688519600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.90000000000000100E-2 " "
y[1] (analytic) = 1.0191793514239909 " "
y[1] (numeric) = 1.0191793514239909 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 2.00000000000000120E-2 " "
y[1] (analytic) = 1.0201986600267554 " "
y[1] (numeric) = 1.0201986600267552 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.176483989100789800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 2.10000000000000130E-2 " "
y[1] (analytic) = 1.0212189484307779 " "
y[1] (numeric) = 1.0212189484307779 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 2.200000000000001400E-2 " "
y[1] (analytic) = 1.0222402156157706 " "
y[1] (numeric) = 1.0222402156157706 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 2.300000000000001500E-2 " "
y[1] (analytic) = 1.023262460560466 " "
y[1] (numeric) = 1.023262460560466 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 2.400000000000001600E-2 " "
y[1] (analytic) = 1.0242856822426198 " "
y[1] (numeric) = 1.0242856822426196 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.16779955801858220000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 2.500000000000001700E-2 " "
y[1] (analytic) = 1.0253098796390099 " "
y[1] (numeric) = 1.0253098796390097 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.165634110569660500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 2.600000000000002000E-2 " "
y[1] (analytic) = 1.026335051725439 " "
y[1] (numeric) = 1.0263350517254388 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.16347093039195720000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 2.700000000000002000E-2 " "
y[1] (analytic) = 1.027361197476735 " "
y[1] (numeric) = 1.0273611974767352 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.161310019011688500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 2.800000000000002000E-2 " "
y[1] (analytic) = 1.0283883158667528 " "
y[1] (numeric) = 1.0283883158667528 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 2.90000000000000200E-2 " "
y[1] (analytic) = 1.0294164058683741 " "
y[1] (numeric) = 1.0294164058683737 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.313990017241341000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 3.00000000000000200E-2 " "
y[1] (analytic) = 1.0304454664535083 " "
y[1] (numeric) = 1.0304454664535079 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.30968182507015800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 3.10000000000000200E-2 " "
y[1] (analytic) = 1.0314754965930955 " "
y[1] (numeric) = 1.0314754965930948 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 6.45806727329244200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 3.20000000000000230E-2 " "
y[1] (analytic) = 1.0325064952571048 " "
y[1] (numeric) = 1.0325064952571044 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.30107909141510800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 3.30000000000000240E-2 " "
y[1] (analytic) = 1.0335384614145386 " "
y[1] (numeric) = 1.0335384614145382 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.29678455548007200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 3.40000000000000250E-2 " "
y[1] (analytic) = 1.0345713940334302 " "
y[1] (numeric) = 1.03457139403343 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.14624728854484800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 3.500000000000002600E-2 " "
y[1] (analytic) = 1.0356052920808474 " "
y[1] (numeric) = 1.0356052920808474 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 3.600000000000002600E-2 " "
y[1] (analytic) = 1.0366401545228923 " "
y[1] (numeric) = 1.0366401545228923 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 3.700000000000003000E-2 " "
y[1] (analytic) = 1.0376759803247027 " "
y[1] (numeric) = 1.0376759803247024 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.1398260067227400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 3.80000000000000300E-2 " "
y[1] (analytic) = 1.038712768450452 " "
y[1] (numeric) = 1.038712768450452 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 3.90000000000000300E-2 " "
y[1] (analytic) = 1.0397505178633528 " "
y[1] (numeric) = 1.039750517863353 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.13555656967908400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 4.00000000000000300E-2 " "
y[1] (analytic) = 1.0407892275256563 " "
y[1] (numeric) = 1.040789227525656 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.133425280091667300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 4.10000000000000300E-2 " "
y[1] (analytic) = 1.041828896398652 " "
y[1] (numeric) = 1.0418288963986517 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.131296278041291400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 4.20000000000000300E-2 " "
y[1] (analytic) = 1.0428695234426715 " "
y[1] (numeric) = 1.042869523442671 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.25833912936736670000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 4.30000000000000300E-2 " "
y[1] (analytic) = 1.0439111076170873 " "
y[1] (numeric) = 1.0439111076170873 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 4.40000000000000340E-2 " "
y[1] (analytic) = 1.0449536478803163 " "
y[1] (numeric) = 1.044953647880316 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.124923008551123600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 4.50000000000000340E-2 " "
y[1] (analytic) = 1.0459971431898178 " "
y[1] (numeric) = 1.0459971431898176 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.122803167969424500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 4.600000000000003500E-2 " "
y[1] (analytic) = 1.0470415925020964 " "
y[1] (numeric) = 1.0470415925020964 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 4.700000000000003600E-2 " "
y[1] (analytic) = 1.0480869947727034 " "
y[1] (numeric) = 1.0480869947727032 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.118570367082798200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 4.800000000000003700E-2 " "
y[1] (analytic) = 1.0491333489562362 " "
y[1] (numeric) = 1.049133348956236 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.116457408831198300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 4.90000000000000400E-2 " "
y[1] (analytic) = 1.0501806540063408 " "
y[1] (numeric) = 1.0501806540063405 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.114346746704502000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 5.00000000000000300E-2 " "
y[1] (analytic) = 1.051228908875712 " "
y[1] (numeric) = 1.0512289088757119 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.112238381671863700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 5.10000000000000300E-2 " "
y[1] (analytic) = 1.0522781125160954 " "
y[1] (numeric) = 1.0522781125160954 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 5.20000000000000400E-2 " "
y[1] (analytic) = 1.0533282638782875 " "
y[1] (numeric) = 1.0533282638782873 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.10802854665151800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 5.30000000000000400E-2 " "
y[1] (analytic) = 1.0543793619121367 " "
y[1] (numeric) = 1.0543793619121364 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.105927078488612200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 5.40000000000000400E-2 " "
y[1] (analytic) = 1.0554314055665452 " "
y[1] (numeric) = 1.0554314055665448 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.20765582213919300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 5.50000000000000400E-2 " "
y[1] (analytic) = 1.0564843937894692 " "
y[1] (numeric) = 1.056484393789469 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.101731045250813400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 5.60000000000000400E-2 " "
y[1] (analytic) = 1.0575383255279212 " "
y[1] (numeric) = 1.0575383255279207 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.19927296373277200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 5.700000000000004000E-2 " "
y[1] (analytic) = 1.058593199727969 " "
y[1] (numeric) = 1.0585931997279685 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.19508844345667500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 5.800000000000004000E-2 " "
y[1] (analytic) = 1.0596490153347382 " "
y[1] (numeric) = 1.059649015334738 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.095454265626703300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 5.900000000000004000E-2 " "
y[1] (analytic) = 1.0607057712924144 " "
y[1] (numeric) = 1.0607057712924137 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 6.28009984298892700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 6.000000000000004000E-2 " "
y[1] (analytic) = 1.0617634665442401 " "
y[1] (numeric) = 1.06176346654424 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.091281268583556600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 6.10000000000000400E-2 " "
y[1] (analytic) = 1.062822100032522 " "
y[1] (numeric) = 1.0628221000325215 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.17839645822639200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 6.20000000000000400E-2 " "
y[1] (analytic) = 1.0638816706986254 " "
y[1] (numeric) = 1.063881670698625 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.17423499324356240000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 6.30000000000000400E-2 " "
y[1] (analytic) = 1.0649421774829801 " "
y[1] (numeric) = 1.0649421774829797 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.170078143582214000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 6.40000000000000500E-2 " "
y[1] (analytic) = 1.0660036193250795 " "
y[1] (numeric) = 1.066003619325079 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.1659259105633200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 6.50000000000000500E-2 " "
y[1] (analytic) = 1.0670659951634818 " "
y[1] (numeric) = 1.067065995163481 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 6.24266744319818400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 6.60000000000000500E-2 " "
y[1] (analytic) = 1.068129303935811 " "
y[1] (numeric) = 1.0681293039358104 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 6.23645294928754300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 6.70000000000000500E-2 " "
y[1] (analytic) = 1.0691935445787584 " "
y[1] (numeric) = 1.069193544578758 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.153496923936490500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 6.80000000000000500E-2 " "
y[1] (analytic) = 1.0702587160280836 " "
y[1] (numeric) = 1.0702587160280834 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.07468158492628290000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 6.90000000000000500E-2 " "
y[1] (analytic) = 1.0713248172186156 " "
y[1] (numeric) = 1.0713248172186154 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.07261701919223500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 7.00000000000000500E-2 " "
y[1] (analytic) = 1.072391847084253 " "
y[1] (numeric) = 1.0723918470842528 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.070554765301066700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 7.10000000000000500E-2 " "
y[1] (analytic) = 1.0734598045579662 " "
y[1] (numeric) = 1.0734598045579657 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.136989647534418700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 7.20000000000000500E-2 " "
y[1] (analytic) = 1.0745286885717973 " "
y[1] (numeric) = 1.074528688571797 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.066437195084669400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 7.30000000000000500E-2 " "
y[1] (analytic) = 1.0755984980568631 " "
y[1] (numeric) = 1.0755984980568627 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.12876375945427530000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 7.40000000000000500E-2 " "
y[1] (analytic) = 1.0766692319433533 " "
y[1] (numeric) = 1.076669231943353 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.062328878148100600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 7.50000000000000600E-2 " "
y[1] (analytic) = 1.0777408891605353 " "
y[1] (numeric) = 1.0777408891605347 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 6.1808345723428300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 7.60000000000000600E-2 " "
y[1] (analytic) = 1.0788134686367503 " "
y[1] (numeric) = 1.0788134686367503 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 7.70000000000000600E-2 " "
y[1] (analytic) = 1.0798869692994209 " "
y[1] (numeric) = 1.0798869692994204 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.11236752063196500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 7.80000000000000600E-2 " "
y[1] (analytic) = 1.080961390075045 " "
y[1] (numeric) = 1.0809613900750445 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.10828003597086900000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 7.90000000000000600E-2 " "
y[1] (analytic) = 1.0820367298892022 " "
y[1] (numeric) = 1.082036729889202 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.052098591401496400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 8.00000000000000600E-2 " "
y[1] (analytic) = 1.0831129876665535 " "
y[1] (numeric) = 1.083112987666553 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.1001189617973600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 8.10000000000000600E-2 " "
y[1] (analytic) = 1.0841901623308408 " "
y[1] (numeric) = 1.08419016233084 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 6.14406806037613900000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 8.20000000000000600E-2 " "
y[1] (analytic) = 1.0852682528048887 " "
y[1] (numeric) = 1.0852682528048885 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.045988209377307400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 8.30000000000000600E-2 " "
y[1] (analytic) = 1.0863472580106082 " "
y[1] (numeric) = 1.0863472580106077 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.08791209786186160000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 8.40000000000000600E-2 " "
y[1] (analytic) = 1.0874271768689932 " "
y[1] (numeric) = 1.087427176868993 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.041926205710250800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 8.50000000000000600E-2 " "
y[1] (analytic) = 1.0885080083001257 " "
y[1] (numeric) = 1.0885080083001253 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.079797359907134700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 8.60000000000000700E-2 " "
y[1] (analytic) = 1.0895897512231736 " "
y[1] (numeric) = 1.0895897512231734 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.037873471880255700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 8.70000000000000700E-2 " "
y[1] (analytic) = 1.0906724045563942 " "
y[1] (numeric) = 1.0906724045563942 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 8.80000000000000700E-2 " "
y[1] (analytic) = 1.091755967217135 " "
y[1] (numeric) = 1.0917559672171349 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.03383000956723600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 8.90000000000000700E-2 " "
y[1] (analytic) = 1.0928404381218328 " "
y[1] (numeric) = 1.0928404381218326 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.031811755672580400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 9.00000000000000700E-2 " "
y[1] (analytic) = 1.093925816186017 " "
y[1] (numeric) = 1.0939258161860166 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.05959164030321500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 9.10000000000000700E-2 " "
y[1] (analytic) = 1.0950121003243094 " "
y[1] (numeric) = 1.095012100324309 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 4.05556440626123500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 9.20000000000000700E-2 " "
y[1] (analytic) = 1.0960992894504258 " "
y[1] (numeric) = 1.0960992894504256 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.02577090471760480000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 9.30000000000000700E-2 " "
y[1] (analytic) = 1.0971873824771774 " "
y[1] (numeric) = 1.0971873824771774 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 9.40000000000000700E-2 " "
y[1] (analytic) = 1.0982763783164715 " "
y[1] (numeric) = 1.0982763783164715 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 9.50000000000000700E-2 " "
y[1] (analytic) = 1.099366275879312 " "
y[1] (numeric) = 1.0993662758793121 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.019750921933931600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 9.60000000000000700E-2 " "
y[1] (analytic) = 1.100457074075802 " "
y[1] (numeric) = 1.1004570740758017 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.0177488986702302000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 9.70000000000000800E-2 " "
y[1] (analytic) = 1.1015487718151427 " "
y[1] (numeric) = 1.1015487718151424 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.01574919428346380000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 9.80000000000000800E-2 " "
y[1] (analytic) = 1.1026413680056364 " "
y[1] (numeric) = 1.1026413680056364 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 9.90000000000000800E-2 " "
y[1] (analytic) = 1.1037348615546874 " "
y[1] (numeric) = 1.1037348615546876 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.01175674212433630000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.10000000000000007 " "
y[1] (analytic) = 1.1048292513688027 " "
y[1] (numeric) = 1.1048292513688025 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.009763994299881600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.10100000000000008 " "
y[1] (analytic) = 1.1059245363535912 " "
y[1] (numeric) = 1.1059245363535914 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 2.007773565248381400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.10200000000000008 " "
y[1] (analytic) = 1.1070207154137695 " "
y[1] (numeric) = 1.1070207154137695 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.10300000000000008 " "
y[1] (analytic) = 1.1081177874531578 " "
y[1] (numeric) = 1.1081177874531578 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.10400000000000008 " "
y[1] (analytic) = 1.1092157513746843 " "
y[1] (numeric) = 1.1092157513746843 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.10500000000000008 " "
y[1] (analytic) = 1.1103146060803852 " "
y[1] (numeric) = 1.1103146060803852 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.10600000000000008 " "
y[1] (analytic) = 1.111414350471406 " "
y[1] (numeric) = 1.1114143504714058 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.997856198553232300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.10700000000000008 " "
y[1] (analytic) = 1.1125149834480017 " "
y[1] (numeric) = 1.112514983448002 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.99587968008171580000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.10800000000000008 " "
y[1] (analytic) = 1.1136165039095407 " "
y[1] (numeric) = 1.1136165039095407 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.10900000000000008 " "
y[1] (analytic) = 1.114718910754502 " "
y[1] (numeric) = 1.1147189107545017 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.991933596737311400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.11000000000000008 " "
y[1] (analytic) = 1.1158222028804783 " "
y[1] (numeric) = 1.115822202880478 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.989964031472276400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.11100000000000008 " "
y[1] (analytic) = 1.1169263791841781 " "
y[1] (numeric) = 1.116926379184178 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.987996783523157700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.11200000000000009 " "
y[1] (analytic) = 1.118031438561425 " "
y[1] (numeric) = 1.118031438561425 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.11300000000000009 " "
y[1] (analytic) = 1.11913737990716 " "
y[1] (numeric) = 1.11913737990716 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.11400000000000009 " "
y[1] (analytic) = 1.1202442021154417 " "
y[1] (numeric) = 1.1202442021154417 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.11500000000000009 " "
y[1] (analytic) = 1.1213519040794484 " "
y[1] (numeric) = 1.121351904079448 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.96030191980303300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.11600000000000009 " "
y[1] (analytic) = 1.122460484691477 " "
y[1] (numeric) = 1.122460484691477 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.11700000000000009 " "
y[1] (analytic) = 1.123569942842948 " "
y[1] (numeric) = 1.1235699428429482 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.97624194505591700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.11800000000000009 " "
y[1] (analytic) = 1.1246802774244034 " "
y[1] (numeric) = 1.1246802774244036 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.974290910778030400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.11900000000000009 " "
y[1] (analytic) = 1.1257914873255084 " "
y[1] (numeric) = 1.1257914873255086 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.97234219147039920000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.12000000000000009 " "
y[1] (analytic) = 1.1269035714350535 " "
y[1] (numeric) = 1.1269035714350533 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.970395786768773500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1210000000000001 " "
y[1] (analytic) = 1.1280165286409538 " "
y[1] (numeric) = 1.1280165286409538 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1220000000000001 " "
y[1] (analytic) = 1.129130357830253 " "
y[1] (numeric) = 1.129130357830253 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1230000000000001 " "
y[1] (analytic) = 1.1302450578891219 " "
y[1] (numeric) = 1.1302450578891219 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1240000000000001 " "
y[1] (analytic) = 1.1313606277028605 " "
y[1] (numeric) = 1.1313606277028603 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.962633306197649500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.12500000000000008 " "
y[1] (analytic) = 1.1324770661558987 " "
y[1] (numeric) = 1.1324770661558987 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.12600000000000008 " "
y[1] (analytic) = 1.1335943721317987 " "
y[1] (numeric) = 1.1335943721317987 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.12700000000000009 " "
y[1] (analytic) = 1.1347125445132544 " "
y[1] (numeric) = 1.1347125445132542 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.95683572900200400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.12800000000000009 " "
y[1] (analytic) = 1.1358315821820932 " "
y[1] (numeric) = 1.1358315821820932 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1290000000000001 " "
y[1] (analytic) = 1.1369514840192783 " "
y[1] (numeric) = 1.136951484019278 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.95298223403582200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1300000000000001 " "
y[1] (analytic) = 1.138072248904907 " "
y[1] (numeric) = 1.1380722489049069 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.95105895200142520000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1310000000000001 " "
y[1] (analytic) = 1.139193875718215 " "
y[1] (numeric) = 1.139193875718215 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1320000000000001 " "
y[1] (analytic) = 1.1403163633375755 " "
y[1] (numeric) = 1.1403163633375757 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.947219316182854700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1330000000000001 " "
y[1] (analytic) = 1.1414397106405014 " "
y[1] (numeric) = 1.1414397106405014 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1340000000000001 " "
y[1] (analytic) = 1.142563916503645 " "
y[1] (numeric) = 1.142563916503645 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1350000000000001 " "
y[1] (analytic) = 1.1436889798028007 " "
y[1] (numeric) = 1.1436889798028005 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.941477174706335900000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1360000000000001 " "
y[1] (analytic) = 1.1448148994129048 " "
y[1] (numeric) = 1.1448148994129048 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1370000000000001 " "
y[1] (analytic) = 1.1459416742080388 " "
y[1] (numeric) = 1.1459416742080386 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.937660615043837200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1380000000000001 " "
y[1] (analytic) = 1.1470693030614272 " "
y[1] (numeric) = 1.147069303061427 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.935755793764280500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1390000000000001 " "
y[1] (analytic) = 1.1481977848454412 " "
y[1] (numeric) = 1.1481977848454412 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1400000000000001 " "
y[1] (analytic) = 1.1493271184315994 " "
y[1] (numeric) = 1.1493271184315996 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.93195306509463500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1410000000000001 " "
y[1] (analytic) = 1.1504573026905685 " "
y[1] (numeric) = 1.1504573026905687 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.930055156377700800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1420000000000001 " "
y[1] (analytic) = 1.1515883364921637 " "
y[1] (numeric) = 1.1515883364921642 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.85631910099746460000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1430000000000001 " "
y[1] (analytic) = 1.1527202187053525 " "
y[1] (numeric) = 1.1527202187053525 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1440000000000001 " "
y[1] (analytic) = 1.1538529481982511 " "
y[1] (numeric) = 1.1538529481982516 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.848750488903380000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1450000000000001 " "
y[1] (analytic) = 1.1549865238381316 " "
y[1] (numeric) = 1.1549865238381318 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.922486542848618500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1460000000000001 " "
y[1] (analytic) = 1.1561209444914178 " "
y[1] (numeric) = 1.156120944491418 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.920600141213682500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1470000000000001 " "
y[1] (analytic) = 1.1572562090236893 " "
y[1] (numeric) = 1.1572562090236893 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1480000000000001 " "
y[1] (analytic) = 1.1583923162996812 " "
y[1] (numeric) = 1.1583923162996814 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.916834234832643600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1490000000000001 " "
y[1] (analytic) = 1.1595292651832867 " "
y[1] (numeric) = 1.159529265183287 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.914954728546094400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1500000000000001 " "
y[1] (analytic) = 1.1606670545375568 " "
y[1] (numeric) = 1.1606670545375573 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.82615503829391100000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1510000000000001 " "
y[1] (analytic) = 1.1618056832247028 " "
y[1] (numeric) = 1.1618056832247032 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.822405211665435600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1520000000000001 " "
y[1] (analytic) = 1.1629451501060957 " "
y[1] (numeric) = 1.1629451501060961 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.818659975576219600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1530000000000001 " "
y[1] (analytic) = 1.1640854540422687 " "
y[1] (numeric) = 1.1640854540422692 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.814919328370351000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1540000000000001 " "
y[1] (analytic) = 1.1652265938929176 " "
y[1] (numeric) = 1.1652265938929185 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 7.62236653673343300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1550000000000001 " "
y[1] (analytic) = 1.1663685685169036 " "
y[1] (numeric) = 1.1663685685169043 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.71117769078874100000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1560000000000001 " "
y[1] (analytic) = 1.1675113767722516 " "
y[1] (numeric) = 1.167511376772252 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.80372490311665600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1570000000000001 " "
y[1] (analytic) = 1.1686550175161532 " "
y[1] (numeric) = 1.1686550175161536 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.800002594383456400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1580000000000001 " "
y[1] (analytic) = 1.169799489604968 " "
y[1] (numeric) = 1.1697994896049686 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.69442729881889500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.1590000000000001 " "
y[1] (analytic) = 1.170944791894224 " "
y[1] (numeric) = 1.1709447918942246 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.68885757369907200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.16000000000000011 " "
y[1] (analytic) = 1.1720909232386192 " "
y[1] (numeric) = 1.1720909232386196 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.788863142314882000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.16100000000000012 " "
y[1] (analytic) = 1.173237882492022 " "
y[1] (numeric) = 1.1732378824920224 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.78515914357276500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.16200000000000012 " "
y[1] (analytic) = 1.1743856685074734 " "
y[1] (numeric) = 1.1743856685074738 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.78145971769610900000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.16300000000000012 " "
y[1] (analytic) = 1.1755342801371875 " "
y[1] (numeric) = 1.175534280137188 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.777764862784235000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.16400000000000012 " "
y[1] (analytic) = 1.1766837162325527 " "
y[1] (numeric) = 1.1766837162325532 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.774074576912862500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.16500000000000012 " "
y[1] (analytic) = 1.1778339756441334 " "
y[1] (numeric) = 1.1778339756441336 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.885194429067132400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.16600000000000012 " "
y[1] (analytic) = 1.1789850572216696 " "
y[1] (numeric) = 1.17898505722167 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.766707704477429400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.16700000000000012 " "
y[1] (analytic) = 1.1801369598140803 " "
y[1] (numeric) = 1.1801369598140807 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.763031113948204000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.16800000000000012 " "
y[1] (analytic) = 1.1812896822694627 " "
y[1] (numeric) = 1.1812896822694632 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.75935908452946170000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.16900000000000012 " "
y[1] (analytic) = 1.182443223435095 " "
y[1] (numeric) = 1.1824432234350952 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.877845807090622300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.17000000000000012 " "
y[1] (analytic) = 1.1835975821574354 " "
y[1] (numeric) = 1.1835975821574356 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.87601435042046400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.17100000000000012 " "
y[1] (analytic) = 1.1847527572821255 " "
y[1] (numeric) = 1.184752757282126 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.748370342423364400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.17200000000000013 " "
y[1] (analytic) = 1.1859087476539907 " "
y[1] (numeric) = 1.185908747653991 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.87235826841051920000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.17300000000000013 " "
y[1] (analytic) = 1.1870655521170403 " "
y[1] (numeric) = 1.1870655521170406 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.87053364095210900000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.17400000000000013 " "
y[1] (analytic) = 1.1882231695144698 " "
y[1] (numeric) = 1.1882231695144703 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.737422575521109300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.17500000000000013 " "
y[1] (analytic) = 1.1893815986886627 " "
y[1] (numeric) = 1.1893815986886629 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.866891207748999400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.17600000000000013 " "
y[1] (analytic) = 1.1905408384811889 " "
y[1] (numeric) = 1.1905408384811893 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.7301467996394100000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.17700000000000013 " "
y[1] (analytic) = 1.1917008877328095 " "
y[1] (numeric) = 1.1917008877328097 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.863257862864123300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.17800000000000013 " "
y[1] (analytic) = 1.1928617452834744 " "
y[1] (numeric) = 1.1928617452834749 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.72288919152594900000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.17900000000000013 " "
y[1] (analytic) = 1.1940234099723273 " "
y[1] (numeric) = 1.1940234099723277 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.719267194772628600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.18000000000000013 " "
y[1] (analytic) = 1.1951858806377031 " "
y[1] (numeric) = 1.1951858806377034 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.85782486659361500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.18100000000000013 " "
y[1] (analytic) = 1.1963491561171309 " "
y[1] (numeric) = 1.1963491561171313 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.712036804467668000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.18200000000000013 " "
y[1] (analytic) = 1.1975132352473357 " "
y[1] (numeric) = 1.197513235247336 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.70842840629097500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.18300000000000013 " "
y[1] (analytic) = 1.1986781168642384 " "
y[1] (numeric) = 1.1986781168642389 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.70482453631344600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.18400000000000014 " "
y[1] (analytic) = 1.1998437998029572 " "
y[1] (numeric) = 1.1998437998029579 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.551837788256179000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.18500000000000014 " "
y[1] (analytic) = 1.20101028289781 " "
y[1] (numeric) = 1.2010102828978104 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.697630371478249400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.18600000000000014 " "
y[1] (analytic) = 1.2021775649823132 " "
y[1] (numeric) = 1.2021775649823134 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.84702003591539400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.18700000000000014 " "
y[1] (analytic) = 1.2033456448891844 " "
y[1] (numeric) = 1.203345644889185 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.5356814362047900000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.18800000000000014 " "
y[1] (analytic) = 1.204514521450345 " "
y[1] (numeric) = 1.2045145214503454 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.686873025950229700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.18900000000000014 " "
y[1] (analytic) = 1.2056841934969178 " "
y[1] (numeric) = 1.205684193496918 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.84164813740339500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.19000000000000014 " "
y[1] (analytic) = 1.2068546598592302 " "
y[1] (numeric) = 1.206854659859231 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.51958605233204300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.19100000000000014 " "
y[1] (analytic) = 1.2080259193668175 " "
y[1] (numeric) = 1.208025919366818 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.67615630368949700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.19200000000000014 " "
y[1] (analytic) = 1.2091979708484188 " "
y[1] (numeric) = 1.2091979708484195 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.508889618030944000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.19300000000000014 " "
y[1] (analytic) = 1.210370813131984 " "
y[1] (numeric) = 1.2103708131319844 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.66903435733820200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.19400000000000014 " "
y[1] (analytic) = 1.21154444504467 " "
y[1] (numeric) = 1.2115444450446702 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.832740068539907800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.19500000000000015 " "
y[1] (analytic) = 1.2127188654128447 " "
y[1] (numeric) = 1.2127188654128453 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.492895622996040000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.19600000000000015 " "
y[1] (analytic) = 1.213894073062089 " "
y[1] (numeric) = 1.2138940730620895 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.65838518949048400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.19700000000000015 " "
y[1] (analytic) = 1.2150700668171948 " "
y[1] (numeric) = 1.215070066817195 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.827422228470035600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.19800000000000015 " "
y[1] (analytic) = 1.2162468455021678 " "
y[1] (numeric) = 1.2162468455021682 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.651308215041706400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.19900000000000015 " "
y[1] (analytic) = 1.2174244079402305 " "
y[1] (numeric) = 1.2174244079402308 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.823888230569569700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.20000000000000015 " "
y[1] (analytic) = 1.2186027529538197 " "
y[1] (numeric) = 1.2186027529538201 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.644249192557764000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.20100000000000015 " "
y[1] (analytic) = 1.2197818793645911 " "
y[1] (numeric) = 1.2197818793645914 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.82036320330237100000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.20200000000000015 " "
y[1] (analytic) = 1.2209617859934179 " "
y[1] (numeric) = 1.2209617859934183 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.637208100569141500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.20300000000000015 " "
y[1] (analytic) = 1.2221424716603937 " "
y[1] (numeric) = 1.2221424716603944 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.450541407583106000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.20400000000000015 " "
y[1] (analytic) = 1.2233239351848333 " "
y[1] (numeric) = 1.223323935184834 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.44527737597521200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.20500000000000015 " "
y[1] (analytic) = 1.2245061753852728 " "
y[1] (numeric) = 1.2245061753852735 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.44002005188340300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.20600000000000016 " "
y[1] (analytic) = 1.2256891910794727 " "
y[1] (numeric) = 1.2256891910794732 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.62317962075646800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.20700000000000016 " "
y[1] (analytic) = 1.2268729810844168 " "
y[1] (numeric) = 1.2268729810844172 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.6196836730199900000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.20800000000000016 " "
y[1] (analytic) = 1.228057544216315 " "
y[1] (numeric) = 1.2280575442163157 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.42428828284416600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.20900000000000016 " "
y[1] (analytic) = 1.229242879290605 " "
y[1] (numeric) = 1.2292428792906056 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.419057746826398000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.21000000000000016 " "
y[1] (analytic) = 1.2304289851219516 " "
y[1] (numeric) = 1.230428985121952 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.60922259813350800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.21100000000000016 " "
y[1] (analytic) = 1.2316158605242489 " "
y[1] (numeric) = 1.2316158605242493 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.605744486442646300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.21200000000000016 " "
y[1] (analytic) = 1.2328035043106214 " "
y[1] (numeric) = 1.232803504310622 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.40340623989054400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.21300000000000016 " "
y[1] (analytic) = 1.2339919152934258 " "
y[1] (numeric) = 1.2339919152934264 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.39820242352800800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.21400000000000016 " "
y[1] (analytic) = 1.2351810922842508 " "
y[1] (numeric) = 1.2351810922842517 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 7.19067370159945600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.21500000000000016 " "
y[1] (analytic) = 1.2363710340939202 " "
y[1] (numeric) = 1.236371034093921 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.38781479350390100000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.21600000000000016 " "
y[1] (analytic) = 1.2375617395324916 " "
y[1] (numeric) = 1.2375617395324925 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 7.1768412946868300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.21700000000000016 " "
y[1] (analytic) = 1.23875320740926 " "
y[1] (numeric) = 1.2387532074092609 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 7.16993840571093200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.21800000000000017 " "
y[1] (analytic) = 1.2399454365327576 " "
y[1] (numeric) = 1.2399454365327585 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 7.16304438511203000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.21900000000000017 " "
y[1] (analytic) = 1.2411384257107554 " "
y[1] (numeric) = 1.241138425710756 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.36711942016961600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.22000000000000017 " "
y[1] (analytic) = 1.2423321737502642 " "
y[1] (numeric) = 1.2423321737502648 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.36196219376832600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.22100000000000017 " "
y[1] (analytic) = 1.2435266794575357 " "
y[1] (numeric) = 1.2435266794575366 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 7.14241547344666400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.22200000000000017 " "
y[1] (analytic) = 1.2447219416380655 " "
y[1] (numeric) = 1.244721941638066 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.56777843303410500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.22300000000000017 " "
y[1] (analytic) = 1.24591795909659 " "
y[1] (numeric) = 1.2459179590965908 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.346530322575210000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.22400000000000017 " "
y[1] (analytic) = 1.2471147306370929 " "
y[1] (numeric) = 1.2471147306370935 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.34139961954260000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.22500000000000017 " "
y[1] (analytic) = 1.2483122550628023 " "
y[1] (numeric) = 1.248312255062803 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.33627553581600400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.22600000000000017 " "
y[1] (analytic) = 1.249510531176194 " "
y[1] (numeric) = 1.2495105311761947 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.331158066735511000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.22700000000000017 " "
y[1] (analytic) = 1.250709557778992 " "
y[1] (numeric) = 1.2507095577789928 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 7.10139627682506200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.22800000000000017 " "
y[1] (analytic) = 1.25190933367217 " "
y[1] (numeric) = 1.2519093336721707 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.320942953761302000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.22900000000000018 " "
y[1] (analytic) = 1.2531098576559518 " "
y[1] (numeric) = 1.2531098576559525 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.31584530043641700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.23000000000000018 " "
y[1] (analytic) = 1.2543111285298139 " "
y[1] (numeric) = 1.2543111285298145 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.3107542428956500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.23100000000000018 " "
y[1] (analytic) = 1.2555131450924848 " "
y[1] (numeric) = 1.2555131450924857 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 7.0742263684917400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.23200000000000018 " "
y[1] (analytic) = 1.256715906141949 " "
y[1] (numeric) = 1.2567159061419497 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.300591896064157000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.23300000000000018 " "
y[1] (analytic) = 1.257919410475445 " "
y[1] (numeric) = 1.2579194104754459 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 7.06069412955817300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.23400000000000018 " "
y[1] (analytic) = 1.2591236568894688 " "
y[1] (numeric) = 1.2591236568894695 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.290455874847961000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.23500000000000018 " "
y[1] (analytic) = 1.2603286441797739 " "
y[1] (numeric) = 1.2603286441797745 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.28539772424688500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.23600000000000018 " "
y[1] (analytic) = 1.2615343711413733 " "
y[1] (numeric) = 1.2615343711413738 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.52023076032619560000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.23700000000000018 " "
y[1] (analytic) = 1.2627408365685397 " "
y[1] (numeric) = 1.2627408365685404 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.27530111867841800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.23800000000000018 " "
y[1] (analytic) = 1.2639480392548084 " "
y[1] (numeric) = 1.263948039254809 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.27026265389698700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.23900000000000018 " "
y[1] (analytic) = 1.2651559779929764 " "
y[1] (numeric) = 1.265155977992977 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.265230741207405000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.24000000000000019 " "
y[1] (analytic) = 1.2663646515751052 " "
y[1] (numeric) = 1.266364651575106 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.2602053756519200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2410000000000002 " "
y[1] (analytic) = 1.2675740587925213 " "
y[1] (numeric) = 1.267574058792522 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.25518655225278500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2420000000000002 " "
y[1] (analytic) = 1.2687841984358172 " "
y[1] (numeric) = 1.2687841984358181 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 7.00023235468324300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2430000000000002 " "
y[1] (analytic) = 1.2699950692948543 " "
y[1] (numeric) = 1.269995069294855 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.24516851191363200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2440000000000002 " "
y[1] (analytic) = 1.2712066701587612 " "
y[1] (numeric) = 1.2712066701587617 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.493446189946440300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2450000000000002 " "
y[1] (analytic) = 1.2724189998159368 " "
y[1] (numeric) = 1.2724189998159374 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.23517657997447500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2460000000000002 " "
y[1] (analytic) = 1.2736320570540522 " "
y[1] (numeric) = 1.273632057054053 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.230190392002858000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2470000000000002 " "
y[1] (analytic) = 1.27484584066005 " "
y[1] (numeric) = 1.2748458406600507 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.22521071591059100000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2480000000000002 " "
y[1] (analytic) = 1.2760603494201468 " "
y[1] (numeric) = 1.2760603494201475 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.2202375465846200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2490000000000002 " "
y[1] (analytic) = 1.2772755821198338 " "
y[1] (numeric) = 1.2772755821198345 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.215270878893208000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.25000000000000017 " "
y[1] (analytic) = 1.2784915375438786 " "
y[1] (numeric) = 1.278491537543879 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.47354047179073500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.25100000000000017 " "
y[1] (analytic) = 1.2797082144763254 " "
y[1] (numeric) = 1.2797082144763259 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.470238018529795400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.25200000000000017 " "
y[1] (analytic) = 1.2809256117004977 " "
y[1] (numeric) = 1.2809256117004983 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.20040983403216900000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.25300000000000017 " "
y[1] (analytic) = 1.2821437279989987 " "
y[1] (numeric) = 1.2821437279989991 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.46364608079578300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.25400000000000017 " "
y[1] (analytic) = 1.2833625621537115 " "
y[1] (numeric) = 1.2833625621537121 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.19053488405647800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.25500000000000017 " "
y[1] (analytic) = 1.2845821129458026 " "
y[1] (numeric) = 1.2845821129458033 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.18560711738011400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.25600000000000017 " "
y[1] (analytic) = 1.2858023791557212 " "
y[1] (numeric) = 1.2858023791557218 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.18068581590654900000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2570000000000002 " "
y[1] (analytic) = 1.287023359563201 " "
y[1] (numeric) = 1.2870233595632017 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.17577097436033400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2580000000000002 " "
y[1] (analytic) = 1.2882450529472624 " "
y[1] (numeric) = 1.2882450529472627 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.72362086248291800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2590000000000002 " "
y[1] (analytic) = 1.2894674580862107 " "
y[1] (numeric) = 1.2894674580862113 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.165960649861997000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2600000000000002 " "
y[1] (analytic) = 1.290690573757642 " "
y[1] (numeric) = 1.2906905737576426 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.161065156273285000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2610000000000002 " "
y[1] (analytic) = 1.2919143987384405 " "
y[1] (numeric) = 1.2919143987384412 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.15617610133903800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2620000000000002 " "
y[1] (analytic) = 1.2931389318047812 " "
y[1] (numeric) = 1.293138931804782 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.15129347969903100000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2630000000000002 " "
y[1] (analytic) = 1.2943641717321315 " "
y[1] (numeric) = 1.294364171732132 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.430944857317689000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2640000000000002 " "
y[1] (analytic) = 1.295590117295251 " "
y[1] (numeric) = 1.2955901172952513 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.71384917159282200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2650000000000002 " "
y[1] (analytic) = 1.2968167672681943 " "
y[1] (numeric) = 1.2968167672681947 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.42445610713036600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2660000000000002 " "
y[1] (analytic) = 1.2980441204243123 " "
y[1] (numeric) = 1.2980441204243123 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2670000000000002 " "
y[1] (analytic) = 1.2992721755362506 " "
y[1] (numeric) = 1.299272175536251 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.41798445477194200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2680000000000002 " "
y[1] (analytic) = 1.3005009313759555 " "
y[1] (numeric) = 1.300500931375956 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.41475503120330370000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2690000000000002 " "
y[1] (analytic) = 1.3017303867146706 " "
y[1] (numeric) = 1.301730386714671 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.41152987118064100000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2700000000000002 " "
y[1] (analytic) = 1.302960540322941 " "
y[1] (numeric) = 1.3029605403229412 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.704154485522617600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2710000000000002 " "
y[1] (analytic) = 1.3041913909706127 " "
y[1] (numeric) = 1.3041913909706129 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.702546163564076500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2720000000000002 " "
y[1] (analytic) = 1.3054229374268354 " "
y[1] (numeric) = 1.3054229374268358 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.401879935750342600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2730000000000002 " "
y[1] (analytic) = 1.3066551784600633 " "
y[1] (numeric) = 1.3066551784600633 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2740000000000002 " "
y[1] (analytic) = 1.3078881128380542 " "
y[1] (numeric) = 1.3078881128380546 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.39546789584630800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2750000000000002 " "
y[1] (analytic) = 1.3091217393278751 " "
y[1] (numeric) = 1.3091217393278753 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.69613411995612200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2760000000000002 " "
y[1] (analytic) = 1.3103560566958992 " "
y[1] (numeric) = 1.3103560566958992 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2770000000000002 " "
y[1] (analytic) = 1.311591063707809 " "
y[1] (numeric) = 1.311591063707809 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2780000000000002 " "
y[1] (analytic) = 1.3128267591285976 " "
y[1] (numeric) = 1.3128267591285976 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2790000000000002 " "
y[1] (analytic) = 1.3140631417225697 " "
y[1] (numeric) = 1.3140631417225699 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.689755978041961300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2800000000000002 " "
y[1] (analytic) = 1.3153002102533433 " "
y[1] (numeric) = 1.3153002102533433 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2810000000000002 " "
y[1] (analytic) = 1.316537963483849 " "
y[1] (numeric) = 1.3165379634838494 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.373159165687139600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2820000000000002 " "
y[1] (analytic) = 1.3177764001763346 " "
y[1] (numeric) = 1.317776400176335 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.369989095195801700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2830000000000002 " "
y[1] (analytic) = 1.3190155190923636 " "
y[1] (numeric) = 1.3190155190923636 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2840000000000002 " "
y[1] (analytic) = 1.3202553189928161 " "
y[1] (numeric) = 1.3202553189928163 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.681830792353274700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2850000000000002 " "
y[1] (analytic) = 1.3214957986378932 " "
y[1] (numeric) = 1.3214957986378935 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.680252068556703500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2860000000000002 " "
y[1] (analytic) = 1.3227369567871152 " "
y[1] (numeric) = 1.3227369567871154 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.678675444771501600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2870000000000002 " "
y[1] (analytic) = 1.3239787921993238 " "
y[1] (numeric) = 1.3239787921993242 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.354201838175708000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2880000000000002 " "
y[1] (analytic) = 1.3252213036326843 " "
y[1] (numeric) = 1.3252213036326843 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2890000000000002 " "
y[1] (analytic) = 1.3264644898446845 " "
y[1] (numeric) = 1.3264644898446847 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.67395815436439220000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2900000000000002 " "
y[1] (analytic) = 1.3277083495921387 " "
y[1] (numeric) = 1.3277083495921391 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.344779822967018400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2910000000000002 " "
y[1] (analytic) = 1.3289528816311873 " "
y[1] (numeric) = 1.3289528816311877 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.34164751804426100000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2920000000000002 " "
y[1] (analytic) = 1.3301980847172983 " "
y[1] (numeric) = 1.330198084717299 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 5.00777908514779400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2930000000000002 " "
y[1] (analytic) = 1.3314439576052695 " "
y[1] (numeric) = 1.3314439576052697 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.667697717629812700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2940000000000002 " "
y[1] (analytic) = 1.3326904990492263 " "
y[1] (numeric) = 1.332690499049227 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.99841347447385500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2950000000000002 " "
y[1] (analytic) = 1.333937707802629 " "
y[1] (numeric) = 1.3339377078026295 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.32916002938100140000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2960000000000002 " "
y[1] (analytic) = 1.3351855826182688 " "
y[1] (numeric) = 1.3351855826182688 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2970000000000002 " "
y[1] (analytic) = 1.3364341222482699 " "
y[1] (numeric) = 1.33643412224827 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.6614706346429400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2980000000000002 " "
y[1] (analytic) = 1.3376833254440936 " "
y[1] (numeric) = 1.3376833254440939 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.65991906082342300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.2990000000000002 " "
y[1] (analytic) = 1.338933190956537 " "
y[1] (numeric) = 1.338933190956537 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3000000000000002 " "
y[1] (analytic) = 1.3401837175357338 " "
y[1] (numeric) = 1.340183717535734 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.656822135798787200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3010000000000002 " "
y[1] (analytic) = 1.3414349039311586 " "
y[1] (numeric) = 1.3414349039311586 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3020000000000002 " "
y[1] (analytic) = 1.3426867488916243 " "
y[1] (numeric) = 1.3426867488916243 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3030000000000002 " "
y[1] (analytic) = 1.3439392511652866 " "
y[1] (numeric) = 1.3439392511652863 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.65219227530190500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3040000000000002 " "
y[1] (analytic) = 1.3451924094996426 " "
y[1] (numeric) = 1.3451924094996426 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3050000000000002 " "
y[1] (analytic) = 1.3464462226415348 " "
y[1] (numeric) = 1.3464462226415348 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3060000000000002 " "
y[1] (analytic) = 1.34770068933715 " "
y[1] (numeric) = 1.34770068933715 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3070000000000002 " "
y[1] (analytic) = 1.348955808332021 " "
y[1] (numeric) = 1.3489558083320212 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.64604802880524800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3080000000000002 " "
y[1] (analytic) = 1.3502115783710302 " "
y[1] (numeric) = 1.35021157837103 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.64451711481335500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3090000000000002 " "
y[1] (analytic) = 1.3514679981984061 " "
y[1] (numeric) = 1.3514679981984064 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.642988255889381600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3100000000000002 " "
y[1] (analytic) = 1.3527250665577302 " "
y[1] (numeric) = 1.3527250665577304 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.641461450034829600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3110000000000002 " "
y[1] (analytic) = 1.3539827821919341 " "
y[1] (numeric) = 1.353982782191934 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.639936695247837500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3120000000000002 " "
y[1] (analytic) = 1.3552411438433014 " "
y[1] (numeric) = 1.3552411438433014 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3130000000000002 " "
y[1] (analytic) = 1.3565001502534715 " "
y[1] (numeric) = 1.3565001502534713 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.636893330852493600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3140000000000002 " "
y[1] (analytic) = 1.3577598001634374 " "
y[1] (numeric) = 1.3577598001634372 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.635374717223938600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3150000000000002 " "
y[1] (analytic) = 1.35902009231355 " "
y[1] (numeric) = 1.3590200923135496 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.267716293245231400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3160000000000002 " "
y[1] (analytic) = 1.3602810254435167 " "
y[1] (numeric) = 1.3602810254435163 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.264687234060832000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3170000000000002 " "
y[1] (analytic) = 1.3615425982924045 " "
y[1] (numeric) = 1.361542598292404 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.26166225285218800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3180000000000002 " "
y[1] (analytic) = 1.3628048095986411 " "
y[1] (numeric) = 1.3628048095986405 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.887962018355927500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.31900000000000023 " "
y[1] (analytic) = 1.3640676581000144 " "
y[1] (numeric) = 1.3640676581000142 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.627812254080661000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.32000000000000023 " "
y[1] (analytic) = 1.3653311425336772 " "
y[1] (numeric) = 1.3653311425336767 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.252611736563452000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.32100000000000023 " "
y[1] (analytic) = 1.3665952616361445 " "
y[1] (numeric) = 1.3665952616361439 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.874404540065292400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.32200000000000023 " "
y[1] (analytic) = 1.367860014143297 " "
y[1] (numeric) = 1.3678600141432966 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.246598374528842000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.32300000000000023 " "
y[1] (analytic) = 1.3691253987903833 " "
y[1] (numeric) = 1.3691253987903826 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.86539666391128500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.32400000000000023 " "
y[1] (analytic) = 1.3703914143120175 " "
y[1] (numeric) = 1.3703914143120173 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.62030061343098220000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.32500000000000023 " "
y[1] (analytic) = 1.3716580594421854 " "
y[1] (numeric) = 1.371658059442185 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.237608723202204000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.32600000000000023 " "
y[1] (analytic) = 1.3729253329142415 " "
y[1] (numeric) = 1.372925332914241 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.234620260866016300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.32700000000000023 " "
y[1] (analytic) = 1.3741932334609124 " "
y[1] (numeric) = 1.374193233460912 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.23163583575231100000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.32800000000000024 " "
y[1] (analytic) = 1.3754617598142977 " "
y[1] (numeric) = 1.375461759814297 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.842983165631803400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.32900000000000024 " "
y[1] (analytic) = 1.3767309107058712 " "
y[1] (numeric) = 1.3767309107058705 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.83851862114112700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.33000000000000024 " "
y[1] (analytic) = 1.3780006848664819 " "
y[1] (numeric) = 1.3780006848664812 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.83406011398054900000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.33100000000000024 " "
y[1] (analytic) = 1.3792710810263555 " "
y[1] (numeric) = 1.3792710810263553 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.609869212655437600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.33200000000000024 " "
y[1] (analytic) = 1.380542097915097 " "
y[1] (numeric) = 1.3805420979150966 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.216774124604594400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.33300000000000024 " "
y[1] (analytic) = 1.3818137342616885 " "
y[1] (numeric) = 1.3818137342616883 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.606906918201034500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.33400000000000024 " "
y[1] (analytic) = 1.3830859887944946 " "
y[1] (numeric) = 1.3830859887944942 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.210857556565468500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.33500000000000024 " "
y[1] (analytic) = 1.3843588602412602 " "
y[1] (numeric) = 1.38435886024126 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.603952640475998500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.33600000000000024 " "
y[1] (analytic) = 1.3856323473291146 " "
y[1] (numeric) = 1.3856323473291141 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.20495700541395370000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.33700000000000024 " "
y[1] (analytic) = 1.3869064487845706 " "
y[1] (numeric) = 1.3869064487845697 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 6.40402545159761400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.33800000000000024 " "
y[1] (analytic) = 1.3881811633335261 " "
y[1] (numeric) = 1.3881811633335255 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.79860865692389300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.33900000000000025 " "
y[1] (analytic) = 1.3894564897012676 " "
y[1] (numeric) = 1.389456489701267 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.79420420655498400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.34000000000000025 " "
y[1] (analytic) = 1.3907324266124688 " "
y[1] (numeric) = 1.3907324266124679 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 6.38640764178872800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.34100000000000025 " "
y[1] (analytic) = 1.3920089727911922 " "
y[1] (numeric) = 1.3920089727911913 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 6.38055096670239700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.34200000000000025 " "
y[1] (analytic) = 1.3932861269608923 " "
y[1] (numeric) = 1.3932861269608914 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 6.37470224179627600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.34300000000000025 " "
y[1] (analytic) = 1.3945638878444147 " "
y[1] (numeric) = 1.394563887844414 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.77664609403259940000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.34400000000000025 " "
y[1] (analytic) = 1.395842254163999 " "
y[1] (numeric) = 1.3958422541639983 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.772271456806244000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.34500000000000025 " "
y[1] (analytic) = 1.3971212246412787 " "
y[1] (numeric) = 1.397121224641278 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.767902763384964700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.34600000000000025 " "
y[1] (analytic) = 1.3984007979972835 " "
y[1] (numeric) = 1.398400797997283 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.175693338319486000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.34700000000000025 " "
y[1] (analytic) = 1.3996809729524402 " "
y[1] (numeric) = 1.3996809729524398 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.17278878852882900000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.34800000000000025 " "
y[1] (analytic) = 1.4009617482265737 " "
y[1] (numeric) = 1.4009617482265735 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.58494409434168680000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.34900000000000025 " "
y[1] (analytic) = 1.4022431225389094 " "
y[1] (numeric) = 1.4022431225389091 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.583495767288885500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.35000000000000026 " "
y[1] (analytic) = 1.4035250946080726 " "
y[1] (numeric) = 1.4035250946080724 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.582049411001348300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.35100000000000026 " "
y[1] (analytic) = 1.4048076631520918 " "
y[1] (numeric) = 1.4048076631520914 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.161210046744905600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.35200000000000026 " "
y[1] (analytic) = 1.4060908268883976 " "
y[1] (numeric) = 1.4060908268883976 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.35300000000000026 " "
y[1] (analytic) = 1.4073745845338275 " "
y[1] (numeric) = 1.4073745845338275 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.35400000000000026 " "
y[1] (analytic) = 1.4086589348046235 " "
y[1] (numeric) = 1.4086589348046235 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.35500000000000026 " "
y[1] (analytic) = 1.4099438764164354 " "
y[1] (numeric) = 1.4099438764164351 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.57484711724404200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.35600000000000026 " "
y[1] (analytic) = 1.4112294080843215 " "
y[1] (numeric) = 1.4112294080843213 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.5734125412426500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.35700000000000026 " "
y[1] (analytic) = 1.4125155285227504 " "
y[1] (numeric) = 1.4125155285227504 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.35800000000000026 " "
y[1] (analytic) = 1.4138022364456024 " "
y[1] (numeric) = 1.413802236445602 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.14109851011789230000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.35900000000000026 " "
y[1] (analytic) = 1.4150895305661686 " "
y[1] (numeric) = 1.4150895305661684 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.56912054063598800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.36000000000000026 " "
y[1] (analytic) = 1.4163774095971555 " "
y[1] (numeric) = 1.4163774095971553 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.567693775829035500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.36100000000000027 " "
y[1] (analytic) = 1.417665872250684 " "
y[1] (numeric) = 1.417665872250684 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.36200000000000027 " "
y[1] (analytic) = 1.418954917238292 " "
y[1] (numeric) = 1.418954917238292 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.36300000000000027 " "
y[1] (analytic) = 1.4202445432709345 " "
y[1] (numeric) = 1.4202445432709343 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.563425157850951400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.36400000000000027 " "
y[1] (analytic) = 1.4215347490589854 " "
y[1] (numeric) = 1.421534749058985 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.124012340493518000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.36500000000000027 " "
y[1] (analytic) = 1.4228255333122384 " "
y[1] (numeric) = 1.4228255333122384 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.36600000000000027 " "
y[1] (analytic) = 1.4241168947399105 " "
y[1] (numeric) = 1.4241168947399103 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.559174009838453500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.36700000000000027 " "
y[1] (analytic) = 1.42540883205064 " "
y[1] (numeric) = 1.4254088320506397 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.557760832768172500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.36800000000000027 " "
y[1] (analytic) = 1.4267013439524896 " "
y[1] (numeric) = 1.4267013439524892 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.11269917654785070000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.36900000000000027 " "
y[1] (analytic) = 1.427994429152947 " "
y[1] (numeric) = 1.4279944291529467 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.55494027421901800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3700000000000003 " "
y[1] (analytic) = 1.4292880863589277 " "
y[1] (numeric) = 1.4292880863589275 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.553532888465360700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3710000000000003 " "
y[1] (analytic) = 1.4305823142767746 " "
y[1] (numeric) = 1.4305823142767744 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.55212742887350100000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3720000000000003 " "
y[1] (analytic) = 1.43187711161226 " "
y[1] (numeric) = 1.4318771116122595 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.101447786605295000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3730000000000003 " "
y[1] (analytic) = 1.4331724770705863 " "
y[1] (numeric) = 1.4331724770705858 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.09864455922139800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3740000000000003 " "
y[1] (analytic) = 1.4344684093563882 " "
y[1] (numeric) = 1.4344684093563878 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.095845171308546600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3750000000000003 " "
y[1] (analytic) = 1.4357649071737337 " "
y[1] (numeric) = 1.4357649071737333 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.09304961857746500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3760000000000003 " "
y[1] (analytic) = 1.4370619692261246 " "
y[1] (numeric) = 1.4370619692261246 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3770000000000003 " "
y[1] (analytic) = 1.4383595942165002 " "
y[1] (numeric) = 1.4383595942164997 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.08747000149128760000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3780000000000003 " "
y[1] (analytic) = 1.439657780847234 " "
y[1] (numeric) = 1.4396577808472337 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.542342964272792600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3790000000000003 " "
y[1] (analytic) = 1.4409565278201406 " "
y[1] (numeric) = 1.4409565278201404 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.5409528368002700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3800000000000003 " "
y[1] (analytic) = 1.442255833836473 " "
y[1] (numeric) = 1.4422558338364726 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.079129232355143400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3810000000000003 " "
y[1] (analytic) = 1.4435556975969246 " "
y[1] (numeric) = 1.4435556975969244 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.538178300253098300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3820000000000003 " "
y[1] (analytic) = 1.4448561178016324 " "
y[1] (numeric) = 1.4448561178016321 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.53679388687418300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3830000000000003 " "
y[1] (analytic) = 1.4461570931501762 " "
y[1] (numeric) = 1.446157093150176 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.53541137388711800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3840000000000003 " "
y[1] (analytic) = 1.4474586223415808 " "
y[1] (numeric) = 1.4474586223415804 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.068061518274361500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3850000000000003 " "
y[1] (analytic) = 1.4487607040743167 " "
y[1] (numeric) = 1.4487607040743165 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.532652040468659400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3860000000000003 " "
y[1] (analytic) = 1.4500633370463027 " "
y[1] (numeric) = 1.4500633370463025 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.531275215724877400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3870000000000003 " "
y[1] (analytic) = 1.4513665199549064 " "
y[1] (numeric) = 1.4513665199549057 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.58970084824466400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3880000000000003 " "
y[1] (analytic) = 1.4526702514969436 " "
y[1] (numeric) = 1.4526702514969432 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.057054478760330000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3890000000000003 " "
y[1] (analytic) = 1.4539745303686844 " "
y[1] (numeric) = 1.4539745303686835 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 6.10862433384517300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3900000000000003 " "
y[1] (analytic) = 1.4552793552658487 " "
y[1] (numeric) = 1.455279355265848 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.57736043849399200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3910000000000003 " "
y[1] (analytic) = 1.4565847248836126 " "
y[1] (numeric) = 1.456584724883612 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.57325827598748800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3920000000000003 " "
y[1] (analytic) = 1.4578906379166063 " "
y[1] (numeric) = 1.4578906379166057 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.56916175637858700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3930000000000003 " "
y[1] (analytic) = 1.4591970930589169 " "
y[1] (numeric) = 1.4591970930589164 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.0433805821194300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3940000000000003 " "
y[1] (analytic) = 1.4605040890040895 " "
y[1] (numeric) = 1.460504089004089 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.040657079932483400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3950000000000003 " "
y[1] (analytic) = 1.461811624445128 " "
y[1] (numeric) = 1.4618116244451276 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.037937326696449300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3960000000000003 " "
y[1] (analytic) = 1.4631196980744974 " "
y[1] (numeric) = 1.463119698074497 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.035221318081461300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3970000000000003 " "
y[1] (analytic) = 1.4644283085841239 " "
y[1] (numeric) = 1.4644283085841234 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.03250904975627230000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3980000000000003 " "
y[1] (analytic) = 1.4657374546653972 " "
y[1] (numeric) = 1.4657374546653967 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.029800517388297500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.3990000000000003 " "
y[1] (analytic) = 1.4670471350091714 " "
y[1] (numeric) = 1.4670471350091707 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.54064357496550050000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4000000000000003 " "
y[1] (analytic) = 1.4683573483057657 " "
y[1] (numeric) = 1.4683573483057653 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.02439464318727260000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4010000000000003 " "
y[1] (analytic) = 1.4696680932449682 " "
y[1] (numeric) = 1.4696680932449673 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 6.04339458536561800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4020000000000003 " "
y[1] (analytic) = 1.4709793685160322 " "
y[1] (numeric) = 1.470979368516032 " "
absolute error = 2.2204460492503130000000000000000E-16 " "
relative error = 1.50950183039641500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4030000000000003 " "
y[1] (analytic) = 1.4722911728076844 " "
y[1] (numeric) = 1.472291172807684 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.016313743178782300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4040000000000003 " "
y[1] (analytic) = 1.4736035048081195 " "
y[1] (numeric) = 1.473603504808119 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.013627535501065500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4050000000000003 " "
y[1] (analytic) = 1.474916363205006 " "
y[1] (numeric) = 1.4749163632050055 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.010945033419067400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4060000000000003 " "
y[1] (analytic) = 1.4762297466854855 " "
y[1] (numeric) = 1.476229746685485 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 3.00826623259121300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4070000000000003 " "
y[1] (analytic) = 1.4775436539361748 " "
y[1] (numeric) = 1.4775436539361742 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.50838669301251500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4080000000000003 " "
y[1] (analytic) = 1.4788580836431668 " "
y[1] (numeric) = 1.478858083643166 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 6.00583943465418800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4090000000000003 " "
y[1] (analytic) = 1.4801730344920312 " "
y[1] (numeric) = 1.4801730344920305 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.50037799130490900000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4100000000000003 " "
y[1] (analytic) = 1.4814885051678182 " "
y[1] (numeric) = 1.4814885051678175 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.496381932437852300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4110000000000003 " "
y[1] (analytic) = 1.4828044943550567 " "
y[1] (numeric) = 1.482804494355056 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.49239139287089700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4120000000000003 " "
y[1] (analytic) = 1.4841210007377577 " "
y[1] (numeric) = 1.484121000737757 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.48840636608442500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4130000000000003 " "
y[1] (analytic) = 1.485438022999415 " "
y[1] (numeric) = 1.4854380229994144 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.48442684555783900000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4140000000000003 " "
y[1] (analytic) = 1.4867555598230062 " "
y[1] (numeric) = 1.4867555598230058 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 2.986968549846419400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4150000000000003 " "
y[1] (analytic) = 1.4880736098909955 " "
y[1] (numeric) = 1.4880736098909946 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 5.96864572959657700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4160000000000003 " "
y[1] (analytic) = 1.4893921718853318 " "
y[1] (numeric) = 1.489392171885331 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 5.9633616750908100000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4170000000000003 " "
y[1] (analytic) = 1.4907112444874535 " "
y[1] (numeric) = 1.4907112444874528 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.46856369560778730000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4180000000000003 " "
y[1] (analytic) = 1.4920308263782887 " "
y[1] (numeric) = 1.4920308263782878 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 5.95281547805592600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4190000000000003 " "
y[1] (analytic) = 1.4933509162382546 " "
y[1] (numeric) = 1.493350916238254 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.46066498859546400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4200000000000003 " "
y[1] (analytic) = 1.4946715127472623 " "
y[1] (numeric) = 1.4946715127472616 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.456723829242687500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4210000000000003 " "
y[1] (analytic) = 1.495992614584715 " "
y[1] (numeric) = 1.4959926145847144 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.452788123957493500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4220000000000003 " "
y[1] (analytic) = 1.4973142204295116 " "
y[1] (numeric) = 1.4973142204295107 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 5.93181048828446400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4230000000000003 " "
y[1] (analytic) = 1.4986363289600453 " "
y[1] (numeric) = 1.4986363289600446 " "
absolute error = 6.6613381477509390000000000000000E-16 " "
relative error = 4.44493304948337160000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4240000000000003 " "
y[1] (analytic) = 1.4999589388542087 " "
y[1] (numeric) = 1.4999589388542078 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 5.92135155632052400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4250000000000003 " "
y[1] (analytic) = 1.5012820487893914 " "
y[1] (numeric) = 1.5012820487893905 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 5.91613295060936300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4260000000000003 " "
y[1] (analytic) = 1.5026056574424838 " "
y[1] (numeric) = 1.5026056574424829 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 5.91092157347426000000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4270000000000003 " "
y[1] (analytic) = 1.5039297634898774 " "
y[1] (numeric) = 1.5039297634898763 " "
absolute error = 1.1102230246251565000000000000000E-15 " "
relative error = 7.38214677026457600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4280000000000003 " "
y[1] (analytic) = 1.505254365607466 " "
y[1] (numeric) = 1.5052543656074648 " "
absolute error = 1.1102230246251565000000000000000E-15 " "
relative error = 7.3756505876474300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4290000000000003 " "
y[1] (analytic) = 1.5065794624706477 " "
y[1] (numeric) = 1.5065794624706466 " "
absolute error = 1.1102230246251565000000000000000E-15 " "
relative error = 7.36916340811188300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4300000000000003 " "
y[1] (analytic) = 1.5079050527543258 " "
y[1] (numeric) = 1.5079050527543247 " "
absolute error = 1.1102230246251565000000000000000E-15 " "
relative error = 7.36268522077854400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4310000000000003 " "
y[1] (analytic) = 1.5092311351329104 " "
y[1] (numeric) = 1.5092311351329093 " "
absolute error = 1.1102230246251565000000000000000E-15 " "
relative error = 7.3562160147682410000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.43200000000000033 " "
y[1] (analytic) = 1.510557708280319 " "
y[1] (numeric) = 1.5105577082803177 " "
absolute error = 1.3322676295501878000000000000000E-15 " "
relative error = 8.81970693504252800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.43300000000000033 " "
y[1] (analytic) = 1.5118847708699787 " "
y[1] (numeric) = 1.511884770869977 " "
absolute error = 1.7763568394002505000000000000000E-15 " "
relative error = 1.17492872051227000000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.43400000000000033 " "
y[1] (analytic) = 1.513212321574826 " "
y[1] (numeric) = 1.5132123215748248 " "
absolute error = 1.3322676295501878000000000000000E-15 " "
relative error = 8.80423461106683200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.43500000000000033 " "
y[1] (analytic) = 1.5145403590673117 " "
y[1] (numeric) = 1.5145403590673105 " "
absolute error = 1.1102230246251565000000000000000E-15 " "
relative error = 7.33042878638676200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.43600000000000033 " "
y[1] (analytic) = 1.5158688820193977 " "
y[1] (numeric) = 1.5158688820193966 " "
absolute error = 1.1102230246251565000000000000000E-15 " "
relative error = 7.32400432381822400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.43700000000000033 " "
y[1] (analytic) = 1.5171978891025617 " "
y[1] (numeric) = 1.5171978891025604 " "
absolute error = 1.3322676295501878000000000000000E-15 " "
relative error = 8.78110653276902400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.43800000000000033 " "
y[1] (analytic) = 1.518527378987796 " "
y[1] (numeric) = 1.5185273789877949 " "
absolute error = 1.1102230246251565000000000000000E-15 " "
relative error = 7.31118213597964400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.43900000000000033 " "
y[1] (analytic) = 1.5198573503456116 " "
y[1] (numeric) = 1.5198573503456103 " "
absolute error = 1.3322676295501878000000000000000E-15 " "
relative error = 8.76574126675265700000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.44000000000000034 " "
y[1] (analytic) = 1.5211878018460367 " "
y[1] (numeric) = 1.5211878018460354 " "
absolute error = 1.3322676295501878000000000000000E-15 " "
relative error = 8.75807463045269600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.44100000000000034 " "
y[1] (analytic) = 1.5225187321586202 " "
y[1] (numeric) = 1.5225187321586187 " "
absolute error = 1.5543122344752192000000000000000E-15 " "
relative error = 1.02088217481010710000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.44200000000000034 " "
y[1] (analytic) = 1.5238501399524313 " "
y[1] (numeric) = 1.52385013995243 " "
absolute error = 1.3322676295501878000000000000000E-15 " "
relative error = 8.74277328603832400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.44300000000000034 " "
y[1] (analytic) = 1.525182023896063 " "
y[1] (numeric) = 1.5251820238960616 " "
absolute error = 1.3322676295501878000000000000000E-15 " "
relative error = 8.73513855183608100000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.44400000000000034 " "
y[1] (analytic) = 1.5265143826576313 " "
y[1] (numeric) = 1.5265143826576297 " "
absolute error = 1.5543122344752192000000000000000E-15 " "
relative error = 1.01821001631782360000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.44500000000000034 " "
y[1] (analytic) = 1.527847214904777 " "
y[1] (numeric) = 1.5278472149047757 " "
absolute error = 1.3322676295501878000000000000000E-15 " "
relative error = 8.71990089423451600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.44600000000000034 " "
y[1] (analytic) = 1.5291805193046693 " "
y[1] (numeric) = 1.5291805193046675 " "
absolute error = 1.7763568394002505000000000000000E-15 " "
relative error = 1.1616397259677191000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.44700000000000034 " "
y[1] (analytic) = 1.5305142945240022 " "
y[1] (numeric) = 1.5305142945240007 " "
absolute error = 1.5543122344752192000000000000000E-15 " "
relative error = 1.01554898248017870000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.44800000000000034 " "
y[1] (analytic) = 1.531848539229002 " "
y[1] (numeric) = 1.5318485392290002 " "
absolute error = 1.7763568394002505000000000000000E-15 " "
relative error = 1.15961649856996470000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.44900000000000034 " "
y[1] (analytic) = 1.5331832520854232 " "
y[1] (numeric) = 1.5331832520854216 " "
absolute error = 1.5543122344752192000000000000000E-15 " "
relative error = 1.0137811200070550000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.45000000000000034 " "
y[1] (analytic) = 1.5345184317585536 " "
y[1] (numeric) = 1.534518431758552 " "
absolute error = 1.5543122344752192000000000000000E-15 " "
relative error = 1.0128990322351371000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.45100000000000035 " "
y[1] (analytic) = 1.5358540769132136 " "
y[1] (numeric) = 1.5358540769132119 " "
absolute error = 1.7763568394002505000000000000000E-15 " "
relative error = 1.15659219590080030000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.45200000000000035 " "
y[1] (analytic) = 1.537190186213758 " "
y[1] (numeric) = 1.537190186213756 " "
absolute error = 1.9984014443252818000000000000000E-15 " "
relative error = 1.3000352605994250000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.45300000000000035 " "
y[1] (analytic) = 1.5385267583240774 " "
y[1] (numeric) = 1.5385267583240756 " "
absolute error = 1.7763568394002505000000000000000E-15 " "
relative error = 1.15458299947622760000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.45400000000000035 " "
y[1] (analytic) = 1.5398637919076 " "
y[1] (numeric) = 1.5398637919075984 " "
absolute error = 1.5543122344752192000000000000000E-15 " "
relative error = 1.0093829354541290000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.45500000000000035 " "
y[1] (analytic) = 1.5412012856272925 " "
y[1] (numeric) = 1.5412012856272908 " "
absolute error = 1.7763568394002505000000000000000E-15 " "
relative error = 1.15257939113205840000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.45600000000000035 " "
y[1] (analytic) = 1.542539238145661 " "
y[1] (numeric) = 1.5425392381456593 " "
absolute error = 1.7763568394002505000000000000000E-15 " "
relative error = 1.15157967815176580000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.45700000000000035 " "
y[1] (analytic) = 1.5438776481247534 " "
y[1] (numeric) = 1.5438776481247516 " "
absolute error = 1.7763568394002505000000000000000E-15 " "
relative error = 1.15058135698633520000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.45800000000000035 " "
y[1] (analytic) = 1.5452165142261598 " "
y[1] (numeric) = 1.5452165142261578 " "
absolute error = 1.9984014443252818000000000000000E-15 " "
relative error = 1.29328247913922670000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.45900000000000035 " "
y[1] (analytic) = 1.5465558351110138 " "
y[1] (numeric) = 1.5465558351110118 " "
absolute error = 1.9984014443252818000000000000000E-15 " "
relative error = 1.2921624935590081000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.46000000000000035 " "
y[1] (analytic) = 1.5478956094399952 " "
y[1] (numeric) = 1.547895609439993 " "
absolute error = 2.220446049250313000000000000000E-15 " "
relative error = 1.43449340879882480000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.46100000000000035 " "
y[1] (analytic) = 1.5492358358733291 " "
y[1] (numeric) = 1.549235835873327 " "
absolute error = 2.220446049250313000000000000000E-15 " "
relative error = 1.4332524447439030000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.46200000000000035 " "
y[1] (analytic) = 1.5505765130707896 " "
y[1] (numeric) = 1.5505765130707876 " "
absolute error = 1.9984014443252818000000000000000E-15 " "
relative error = 1.28881188866172840000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.46300000000000036 " "
y[1] (analytic) = 1.5519176396916998 " "
y[1] (numeric) = 1.5519176396916976 " "
absolute error = 2.220446049250313000000000000000E-15 " "
relative error = 1.43077570127459950000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.46400000000000036 " "
y[1] (analytic) = 1.5532592143949329 " "
y[1] (numeric) = 1.5532592143949306 " "
absolute error = 2.220446049250313000000000000000E-15 " "
relative error = 1.42953991753094500000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.46500000000000036 " "
y[1] (analytic) = 1.554601235838914 " "
y[1] (numeric) = 1.554601235838912 " "
absolute error = 1.9984014443252818000000000000000E-15 " "
relative error = 1.2854752706065350000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.46600000000000036 " "
y[1] (analytic) = 1.5559437026816227 " "
y[1] (numeric) = 1.5559437026816205 " "
absolute error = 2.220446049250313000000000000000E-15 " "
relative error = 1.42707351520716370000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.46700000000000036 " "
y[1] (analytic) = 1.5572866135805916 " "
y[1] (numeric) = 1.5572866135805894 " "
absolute error = 2.220446049250313000000000000000E-15 " "
relative error = 1.4258428923015990000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.46800000000000036 " "
y[1] (analytic) = 1.55862996719291 " "
y[1] (numeric) = 1.5586299671929078 " "
absolute error = 2.220446049250313000000000000000E-15 " "
relative error = 1.4246139853510790000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.46900000000000036 " "
y[1] (analytic) = 1.559973762175224 " "
y[1] (numeric) = 1.559973762175222 " "
absolute error = 1.9984014443252818000000000000000E-15 " "
relative error = 1.2810481129751280000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.47000000000000036 " "
y[1] (analytic) = 1.5613179971837399 " "
y[1] (numeric) = 1.5613179971837376 " "
absolute error = 2.220446049250313000000000000000E-15 " "
relative error = 1.422161310671810000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.47100000000000036 " "
y[1] (analytic) = 1.5626626708742215 " "
y[1] (numeric) = 1.5626626708742195 " "
absolute error = 1.9984014443252818000000000000000E-15 " "
relative error = 1.2788437847608460000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.47200000000000036 " "
y[1] (analytic) = 1.5640077819019957 " "
y[1] (numeric) = 1.564007781901994 " "
absolute error = 1.7763568394002505000000000000000E-15 " "
relative error = 1.1357723791118329000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.47300000000000036 " "
y[1] (analytic) = 1.5653533289219523 " "
y[1] (numeric) = 1.5653533289219501 " "
absolute error = 2.220446049250313000000000000000E-15 " "
relative error = 1.4184951143135960000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.47400000000000037 " "
y[1] (analytic) = 1.5666993105885434 " "
y[1] (numeric) = 1.5666993105885412 " "
absolute error = 2.220446049250313000000000000000E-15 " "
relative error = 1.4172764577372440000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.47500000000000037 " "
y[1] (analytic) = 1.5680457255557876 " "
y[1] (numeric) = 1.5680457255557856 " "
absolute error = 1.9984014443252818000000000000000E-15 " "
relative error = 1.27445355180376280000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.47600000000000037 " "
y[1] (analytic) = 1.5693925724772706 " "
y[1] (numeric) = 1.5693925724772684 " "
absolute error = 2.220446049250313000000000000000E-15 " "
relative error = 1.41484424495864740000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.47700000000000037 " "
y[1] (analytic) = 1.570739850006145 " "
y[1] (numeric) = 1.570739850006143 " "
absolute error = 1.9984014443252818000000000000000E-15 " "
relative error = 1.27226761600112450000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.47800000000000037 " "
y[1] (analytic) = 1.5720875567951338 " "
y[1] (numeric) = 1.5720875567951316 " "
absolute error = 2.220446049250313000000000000000E-15 " "
relative error = 1.41241881831119270000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.47900000000000037 " "
y[1] (analytic) = 1.5734356914965302 " "
y[1] (numeric) = 1.5734356914965277 " "
absolute error = 2.4424906541753444000000000000000E-15 " "
relative error = 1.55232950884204020000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.48000000000000037 " "
y[1] (analytic) = 1.574784252762199 " "
y[1] (numeric) = 1.574784252762197 " "
absolute error = 1.9984014443252818000000000000000E-15 " "
relative error = 1.26900014450871680000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.48100000000000037 " "
y[1] (analytic) = 1.57613323924358 " "
y[1] (numeric) = 1.5761332392435778 " "
absolute error = 2.220446049250313000000000000000E-15 " "
relative error = 1.40879336464977580000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4820000000000004 " "
y[1] (analytic) = 1.5774826495916865 " "
y[1] (numeric) = 1.5774826495916843 " "
absolute error = 2.220446049250313000000000000000E-15 " "
relative error = 1.40758825450476470000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4830000000000004 " "
y[1] (analytic) = 1.5788324824571083 " "
y[1] (numeric) = 1.5788324824571058 " "
absolute error = 2.4424906541753444000000000000000E-15 " "
relative error = 1.54702331077844340000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4840000000000004 " "
y[1] (analytic) = 1.5801827364900123 " "
y[1] (numeric) = 1.5801827364900098 " "
absolute error = 2.4424906541753444000000000000000E-15 " "
relative error = 1.54570139122057330000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4850000000000004 " "
y[1] (analytic) = 1.5815334103401448 " "
y[1] (numeric) = 1.5815334103401424 " "
absolute error = 2.4424906541753444000000000000000E-15 " "
relative error = 1.5443813189188530000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4860000000000004 " "
y[1] (analytic) = 1.5828845026568321 " "
y[1] (numeric) = 1.5828845026568297 " "
absolute error = 2.4424906541753444000000000000000E-15 " "
relative error = 1.54306309151153150000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4870000000000004 " "
y[1] (analytic) = 1.5842360120889825 " "
y[1] (numeric) = 1.5842360120889796 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.82206428966296930000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4880000000000004 " "
y[1] (analytic) = 1.5855879372850856 " "
y[1] (numeric) = 1.5855879372850827 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.82051073683616560000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4890000000000004 " "
y[1] (analytic) = 1.586940276893217 " "
y[1] (numeric) = 1.5869402768932142 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.81895935597306700000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4900000000000004 " "
y[1] (analytic) = 1.5882930295610371 " "
y[1] (numeric) = 1.5882930295610342 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.81741014428753260000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4910000000000004 " "
y[1] (analytic) = 1.589646193935793 " "
y[1] (numeric) = 1.5896461939357904 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.676181322148970000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4920000000000004 " "
y[1] (analytic) = 1.5909997686643211 " "
y[1] (numeric) = 1.5909997686643185 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.67475527751792900000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4930000000000004 " "
y[1] (analytic) = 1.5923537523930467 " "
y[1] (numeric) = 1.5923537523930438 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.81277549645444740000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4940000000000004 " "
y[1] (analytic) = 1.5937081437679854 " "
y[1] (numeric) = 1.5937081437679828 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.67190916951747930000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4950000000000004 " "
y[1] (analytic) = 1.5950629414347475 " "
y[1] (numeric) = 1.5950629414347441 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 2.0881113762693010000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4960000000000004 " "
y[1] (analytic) = 1.5964181440385334 " "
y[1] (numeric) = 1.5964181440385303 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.94724952266353330000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4970000000000004 " "
y[1] (analytic) = 1.597773750224142 " "
y[1] (numeric) = 1.597773750224139 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.94559740921663530000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4980000000000004 " "
y[1] (analytic) = 1.5991297586359665 " "
y[1] (numeric) = 1.5991297586359636 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.80509420729410700000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.4990000000000004 " "
y[1] (analytic) = 1.6004861679179991 " "
y[1] (numeric) = 1.6004861679179962 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.8035643930496630000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5000000000000003 " "
y[1] (analytic) = 1.601842976713831 " "
y[1] (numeric) = 1.6018429767138278 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.94065492944118570000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5010000000000003 " "
y[1] (analytic) = 1.6032001836666523 " "
y[1] (numeric) = 1.6032001836666494 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.8005111859602950000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5020000000000003 " "
y[1] (analytic) = 1.6045577874192571 " "
y[1] (numeric) = 1.6045577874192543 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.79898778757487550000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5030000000000003 " "
y[1] (analytic) = 1.6059157866140417 " "
y[1] (numeric) = 1.6059157866140388 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.79746652227110480000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5040000000000003 " "
y[1] (analytic) = 1.6072741798930066 " "
y[1] (numeric) = 1.607274179893004 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.6577975882607340000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5050000000000003 " "
y[1] (analytic) = 1.6086329658977592 " "
y[1] (numeric) = 1.6086329658977563 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.79443037984394450000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5060000000000003 " "
y[1] (analytic) = 1.609992143269513 " "
y[1] (numeric) = 1.6099921432695101 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.79291549719208350000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5070000000000003 " "
y[1] (analytic) = 1.6113517106490913 " "
y[1] (numeric) = 1.6113517106490882 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.92920294706995370000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5080000000000003 " "
y[1] (analytic) = 1.6127116666769266 " "
y[1] (numeric) = 1.6127116666769234 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.92757610252545340000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5090000000000003 " "
y[1] (analytic) = 1.614072009993063 " "
y[1] (numeric) = 1.6140720099930597 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 2.06351950424428970000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5100000000000003 " "
y[1] (analytic) = 1.6154327392371566 " "
y[1] (numeric) = 1.6154327392371537 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.78687715923630140000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5110000000000003 " "
y[1] (analytic) = 1.6167938530484796 " "
y[1] (numeric) = 1.6167938530484764 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.92270923289886260000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5120000000000003 " "
y[1] (analytic) = 1.618155350065917 " "
y[1] (numeric) = 1.6181553500659143 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.64664984668612540000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5130000000000003 " "
y[1] (analytic) = 1.6195172289279731 " "
y[1] (numeric) = 1.6195172289279702 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.7823705808527620000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5140000000000003 " "
y[1] (analytic) = 1.6208794882727684 " "
y[1] (numeric) = 1.6208794882727655 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.7808725971980720000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5150000000000003 " "
y[1] (analytic) = 1.6222421267380436 " "
y[1] (numeric) = 1.622242126738041 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.64250158172019880000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5160000000000003 " "
y[1] (analytic) = 1.6236051429611607 " "
y[1] (numeric) = 1.623605142961158 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.64112270194016970000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5170000000000003 " "
y[1] (analytic) = 1.6249685355791035 " "
y[1] (numeric) = 1.6249685355791008 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.63974575553907150000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5180000000000003 " "
y[1] (analytic) = 1.6263323032284798 " "
y[1] (numeric) = 1.6263323032284769 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.77490163498269880000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5190000000000003 " "
y[1] (analytic) = 1.6276964445455213 " "
y[1] (numeric) = 1.6276964445455184 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.77341412380573580000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5200000000000004 " "
y[1] (analytic) = 1.629060958166087 " "
y[1] (numeric) = 1.6290609581660844 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.63562649128855930000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5210000000000004 " "
y[1] (analytic) = 1.6304258427256642 " "
y[1] (numeric) = 1.6304258427256615 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.6342572530903580000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5220000000000004 " "
y[1] (analytic) = 1.6317910968593676 " "
y[1] (numeric) = 1.631791096859365 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.63288993562269250000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5230000000000004 " "
y[1] (analytic) = 1.6331567192019434 " "
y[1] (numeric) = 1.633156719201941 " "
absolute error = 2.4424906541753444000000000000000E-15 " "
relative error = 1.4955641583306770000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5240000000000004 " "
y[1] (analytic) = 1.6345227083877698 " "
y[1] (numeric) = 1.6345227083877671 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.63016105278131650000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5250000000000004 " "
y[1] (analytic) = 1.6358890630508571 " "
y[1] (numeric) = 1.6358890630508545 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.62879948236290620000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5260000000000004 " "
y[1] (analytic) = 1.6372557818248512 " "
y[1] (numeric) = 1.6372557818248483 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.76305980780112750000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5270000000000004 " "
y[1] (analytic) = 1.6386228633430326 " "
y[1] (numeric) = 1.6386228633430302 " "
absolute error = 2.4424906541753444000000000000000E-15 " "
relative error = 1.4905752316871150000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5280000000000004 " "
y[1] (analytic) = 1.639990306238321 " "
y[1] (numeric) = 1.6399903062383185 " "
absolute error = 2.4424906541753444000000000000000E-15 " "
relative error = 1.48933237281001660000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5290000000000004 " "
y[1] (analytic) = 1.6413581091432734 " "
y[1] (numeric) = 1.6413581091432707 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.62337228192765440000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5300000000000004 " "
y[1] (analytic) = 1.6427262706900865 " "
y[1] (numeric) = 1.6427262706900838 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.6220202395503430000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5310000000000004 " "
y[1] (analytic) = 1.6440947895105993 " "
y[1] (numeric) = 1.6440947895105964 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.7557259365104250000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5320000000000004 " "
y[1] (analytic) = 1.6454636642362928 " "
y[1] (numeric) = 1.6454636642362899 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.7542653336955650000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5330000000000004 " "
y[1] (analytic) = 1.6468328934982925 " "
y[1] (numeric) = 1.6468328934982897 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.75280678168479860000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5340000000000004 " "
y[1] (analytic) = 1.6482024759273692 " "
y[1] (numeric) = 1.6482024759273664 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.7513502777632092000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5350000000000004 " "
y[1] (analytic) = 1.6495724101539406 " "
y[1] (numeric) = 1.649572410153938 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.61528844850873630000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5360000000000004 " "
y[1] (analytic) = 1.650942694808073 " "
y[1] (numeric) = 1.65094269480807 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.74844340333749760000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5370000000000004 " "
y[1] (analytic) = 1.652313328519481 " "
y[1] (numeric) = 1.6523133285194784 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.61260894838140270000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5380000000000004 " "
y[1] (analytic) = 1.653684309917532 " "
y[1] (numeric) = 1.6536843099175291 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.74554468873769440000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5390000000000004 " "
y[1] (analytic) = 1.6550556376312437 " "
y[1] (numeric) = 1.655055637631241 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.6099369704053718000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5400000000000004 " "
y[1] (analytic) = 1.6564273102892895 " "
y[1] (numeric) = 1.6564273102892868 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.6086037959824650000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5410000000000004 " "
y[1] (analytic) = 1.6577993265199964 " "
y[1] (numeric) = 1.6577993265199935 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.74121186916201180000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5420000000000004 " "
y[1] (analytic) = 1.6591716849513478 " "
y[1] (numeric) = 1.6591716849513451 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.60594306379963830000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5430000000000004 " "
y[1] (analytic) = 1.6605443842109862 " "
y[1] (numeric) = 1.6605443842109835 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.6046155010583710000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5440000000000004 " "
y[1] (analytic) = 1.6619174229262121 " "
y[1] (numeric) = 1.6619174229262093 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.73689728755769180000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5450000000000004 " "
y[1] (analytic) = 1.6632907997239865 " "
y[1] (numeric) = 1.663290799723984 " "
absolute error = 2.4424906541753444000000000000000E-15 " "
relative error = 1.46846880568368530000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5460000000000004 " "
y[1] (analytic) = 1.6646645132309335 " "
y[1] (numeric) = 1.664664513230931 " "
absolute error = 2.4424906541753444000000000000000E-15 " "
relative error = 1.46725699668741940000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5470000000000004 " "
y[1] (analytic) = 1.6660385620733393 " "
y[1] (numeric) = 1.6660385620733367 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.59932388106577450000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5480000000000004 " "
y[1] (analytic) = 1.6674129448771553 " "
y[1] (numeric) = 1.6674129448771526 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.59800562139493420000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5490000000000004 " "
y[1] (analytic) = 1.6687876602679985 " "
y[1] (numeric) = 1.6687876602679959 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.59668921489536040000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5500000000000004 " "
y[1] (analytic) = 1.670162706871154 " "
y[1] (numeric) = 1.6701627068711513 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.59537465909058480000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5510000000000004 " "
y[1] (analytic) = 1.6715380833115752 " "
y[1] (numeric) = 1.6715380833115723 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.7269004474649158000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5520000000000004 " "
y[1] (analytic) = 1.6729137882138851 " "
y[1] (numeric) = 1.6729137882138827 " "
absolute error = 2.4424906541753444000000000000000E-15 " "
relative error = 1.4600218321968111000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5530000000000004 " "
y[1] (analytic) = 1.6742898202023802 " "
y[1] (numeric) = 1.6742898202023775 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.59144207110946870000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5540000000000004 " "
y[1] (analytic) = 1.6756661779010278 " "
y[1] (numeric) = 1.6756661779010251 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.590134893358070000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5550000000000004 " "
y[1] (analytic) = 1.6770428599334704 " "
y[1] (numeric) = 1.6770428599334677 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.5888295539483590000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5560000000000004 " "
y[1] (analytic) = 1.678419864923026 " "
y[1] (numeric) = 1.6784198649230235 " "
absolute error = 2.4424906541753444000000000000000E-15 " "
relative error = 1.4552322128809880000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5570000000000004 " "
y[1] (analytic) = 1.6797971914926904 " "
y[1] (numeric) = 1.6797971914926875 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.7184097453219060000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5580000000000004 " "
y[1] (analytic) = 1.6811748382651361 " "
y[1] (numeric) = 1.6811748382651333 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.71700158622655280000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5590000000000004 " "
y[1] (analytic) = 1.682552803862717 " "
y[1] (numeric) = 1.6825528038627142 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.7155954080005972000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5600000000000004 " "
y[1] (analytic) = 1.6839310869074677 " "
y[1] (numeric) = 1.6839310869074648 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.7141912079826252000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5610000000000004 " "
y[1] (analytic) = 1.6853096860211054 " "
y[1] (numeric) = 1.6853096860211023 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.84454198224521970000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5620000000000004 " "
y[1] (analytic) = 1.6866885998250307 " "
y[1] (numeric) = 1.6866885998250276 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.8430340190079620000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5630000000000004 " "
y[1] (analytic) = 1.6880678269403298 " "
y[1] (numeric) = 1.6880678269403269 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.7099904505954680000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5640000000000004 " "
y[1] (analytic) = 1.6894473659877765 " "
y[1] (numeric) = 1.6894473659877731 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.9714547732761790000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5650000000000004 " "
y[1] (analytic) = 1.6908272155878303 " "
y[1] (numeric) = 1.6908272155878277 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 1.57587672740057440000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5660000000000004 " "
y[1] (analytic) = 1.6922073743606436 " "
y[1] (numeric) = 1.6922073743606407 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.70580740148117250000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5670000000000004 " "
y[1] (analytic) = 1.6935878409260567 " "
y[1] (numeric) = 1.6935878409260539 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.70441697458516260000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5680000000000004 " "
y[1] (analytic) = 1.6949686139036035 " "
y[1] (numeric) = 1.6949686139036004 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.8340306973538050000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5690000000000004 " "
y[1] (analytic) = 1.696349691912511 " "
y[1] (numeric) = 1.6963496919125078 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.8325375267676620000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5700000000000004 " "
y[1] (analytic) = 1.6977310735717008 " "
y[1] (numeric) = 1.697731073571698 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.70025742531330130000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5710000000000004 " "
y[1] (analytic) = 1.6991127574997924 " "
y[1] (numeric) = 1.6991127574997893 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.82955748830037150000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5720000000000004 " "
y[1] (analytic) = 1.7004947423151013 " "
y[1] (numeric) = 1.700494742315098 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.95864708722415880000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5730000000000004 " "
y[1] (analytic) = 1.7018770266356427 " "
y[1] (numeric) = 1.7018770266356396 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.82658583452162000000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5740000000000004 " "
y[1] (analytic) = 1.703259609079133 " "
y[1] (numeric) = 1.7032596090791297 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.95546765514870350000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5750000000000004 " "
y[1] (analytic) = 1.704642488262989 " "
y[1] (numeric) = 1.7046424882629858 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.8236225427644310000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5760000000000004 " "
y[1] (analytic) = 1.7060256628043324 " "
y[1] (numeric) = 1.706025662804329 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.95229717025509420000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5770000000000004 " "
y[1] (analytic) = 1.7074091313199884 " "
y[1] (numeric) = 1.707409131319985 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.95071527543052800000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5780000000000004 " "
y[1] (analytic) = 1.7087928924264886 " "
y[1] (numeric) = 1.7087928924264855 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.81919323443356930000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5790000000000004 " "
y[1] (analytic) = 1.710176944740072 " "
y[1] (numeric) = 1.7101769447400692 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.68788374378660300000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5800000000000004 " "
y[1] (analytic) = 1.7115612868766874 " "
y[1] (numeric) = 1.711561286876684 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.94598294517012740000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5810000000000004 " "
y[1] (analytic) = 1.712945917451991 " "
y[1] (numeric) = 1.7129459174519879 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.81478261355415170000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5820000000000004 " "
y[1] (analytic) = 1.7143308350813538 " "
y[1] (numeric) = 1.7143308350813504 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.94283915666570400000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5830000000000004 " "
y[1] (analytic) = 1.715716038379857 " "
y[1] (numeric) = 1.715716038379854 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.8118525440176558000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5840000000000004 " "
y[1] (analytic) = 1.7171015259622988 " "
y[1] (numeric) = 1.7171015259622955 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.93970421871758250000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5850000000000004 " "
y[1] (analytic) = 1.7184872964431905 " "
y[1] (numeric) = 1.7184872964431874 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.80893072377343730000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5860000000000004 " "
y[1] (analytic) = 1.7198733484367623 " "
y[1] (numeric) = 1.7198733484367594 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.67836769297523840000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5870000000000004 " "
y[1] (analytic) = 1.721259680556963 " "
y[1] (numeric) = 1.7212596805569598 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.93501835399858770000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5880000000000004 " "
y[1] (analytic) = 1.7226462914174596 " "
y[1] (numeric) = 1.7226462914174563 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.93346079834814330000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5890000000000004 " "
y[1] (analytic) = 1.7240331796316415 " "
y[1] (numeric) = 1.7240331796316384 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.8031117415122080000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5900000000000004 " "
y[1] (analytic) = 1.7254203438126208 " "
y[1] (numeric) = 1.7254203438126177 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.80166211676940360000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5910000000000004 " "
y[1] (analytic) = 1.7268077825732335 " "
y[1] (numeric) = 1.7268077825732304 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.80021453477471950000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5920000000000004 " "
y[1] (analytic) = 1.728195494526041 " "
y[1] (numeric) = 1.7281954945260378 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.79876899274232950000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5930000000000004 " "
y[1] (analytic) = 1.729583478283331 " "
y[1] (numeric) = 1.729583478283328 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.7973254878890560000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5940000000000004 " "
y[1] (analytic) = 1.7309717324571203 " "
y[1] (numeric) = 1.7309717324571172 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.7958840174343780000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5950000000000004 " "
y[1] (analytic) = 1.732360255659155 " "
y[1] (numeric) = 1.7323602556591517 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.92261919135761130000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5960000000000004 " "
y[1] (analytic) = 1.733749046500911 " "
y[1] (numeric) = 1.7337490465009082 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.66493522799690260000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5970000000000004 " "
y[1] (analytic) = 1.735138103593599 " "
y[1] (numeric) = 1.735138103593596 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.79157178469670360000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5980000000000004 " "
y[1] (analytic) = 1.7365274255481613 " "
y[1] (numeric) = 1.7365274255481582 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.790138424084580000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.5990000000000004 " "
y[1] (analytic) = 1.737917010975276 " "
y[1] (numeric) = 1.7379170109752728 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.78870708400854840000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6000000000000004 " "
y[1] (analytic) = 1.7393068584853575 " "
y[1] (numeric) = 1.7393068584853546 " "
absolute error = 2.886579864025407000000000000000E-15 " "
relative error = 1.65961506443959570000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6010000000000004 " "
y[1] (analytic) = 1.7406969666885592 " "
y[1] (numeric) = 1.7406969666885561 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.7858504544097510000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6020000000000004 " "
y[1] (analytic) = 1.7420873341947727 " "
y[1] (numeric) = 1.7420873341947694 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.91188409932098540000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6030000000000004 " "
y[1] (analytic) = 1.7434779596136303 " "
y[1] (numeric) = 1.743477959613627 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.91035915051864180000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6040000000000004 " "
y[1] (analytic) = 1.7448688415545068 " "
y[1] (numeric) = 1.7448688415545035 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.90883635179602970000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6050000000000004 " "
y[1] (analytic) = 1.7462599786265207 " "
y[1] (numeric) = 1.7462599786265174 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.90731570020583550000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6060000000000004 " "
y[1] (analytic) = 1.7476513694385347 " "
y[1] (numeric) = 1.7476513694385314 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.90579719280368180000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6070000000000004 " "
y[1] (analytic) = 1.7490430125991583 " "
y[1] (numeric) = 1.749043012599155 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.9042808266481350000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6080000000000004 " "
y[1] (analytic) = 1.7504349067167482 " "
y[1] (numeric) = 1.750434906716745 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.77591549221399860000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6090000000000004 " "
y[1] (analytic) = 1.7518270503994111 " "
y[1] (numeric) = 1.7518270503994076 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 2.02800480674761420000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6100000000000004 " "
y[1] (analytic) = 1.7532194422550025 " "
y[1] (numeric) = 1.753219442254999 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 2.02639418271050950000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6110000000000004 " "
y[1] (analytic) = 1.7546120808911312 " "
y[1] (numeric) = 1.7546120808911276 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 2.02478583015121560000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6120000000000004 " "
y[1] (analytic) = 1.7560049649151583 " "
y[1] (numeric) = 1.756004964915155 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.8967310118262630000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6130000000000004 " "
y[1] (analytic) = 1.7573980929342006 " "
y[1] (numeric) = 1.757398092934197 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 2.02157592698236720000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6140000000000004 " "
y[1] (analytic) = 1.7587914635551294 " "
y[1] (numeric) = 1.7587914635551258 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 2.0199743701389308000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6150000000000004 " "
y[1] (analytic) = 1.7601850753845745 " "
y[1] (numeric) = 1.7601850753845711 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.89222663028645880000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6160000000000004 " "
y[1] (analytic) = 1.7615789270289244 " "
y[1] (numeric) = 1.761578927028921 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.89072940347496640000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6170000000000004 " "
y[1] (analytic) = 1.7629730170943274 " "
y[1] (numeric) = 1.762973017094324 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.88923428865914570000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6180000000000004 " "
y[1] (analytic) = 1.7643673441866934 " "
y[1] (numeric) = 1.7643673441866903 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.76189186406836170000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6190000000000004 " "
y[1] (analytic) = 1.7657619069116959 " "
y[1] (numeric) = 1.7657619069116925 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.88625038338310540000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6200000000000004 " "
y[1] (analytic) = 1.7671567038747715 " "
y[1] (numeric) = 1.7671567038747684 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.75911081464042550000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6210000000000004 " "
y[1] (analytic) = 1.7685517336811243 " "
y[1] (numeric) = 1.768551733681121 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.88327489122577190000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6220000000000004 " "
y[1] (analytic) = 1.7699469949357236 " "
y[1] (numeric) = 1.7699469949357205 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.75633760663173380000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6230000000000004 " "
y[1] (analytic) = 1.7713424862433094 " "
y[1] (numeric) = 1.771342486243306 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.8803077890031330000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6240000000000004 " "
y[1] (analytic) = 1.7727382062083898 " "
y[1] (numeric) = 1.7727382062083863 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 2.00408253534468620000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6250000000000004 " "
y[1] (analytic) = 1.7741341534352448 " "
y[1] (numeric) = 1.7741341534352413 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 2.00250565715191480000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6260000000000004 " "
y[1] (analytic) = 1.7755303265279276 " "
y[1] (numeric) = 1.775530326527924 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 2.00093100394848120000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6270000000000004 " "
y[1] (analytic) = 1.7769267240902653 " "
y[1] (numeric) = 1.7769267240902618 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.99935857266111350000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6280000000000004 " "
y[1] (analytic) = 1.7783233447258602 " "
y[1] (numeric) = 1.7783233447258566 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.99778836021981960000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6290000000000004 " "
y[1] (analytic) = 1.7797201870380919 " "
y[1] (numeric) = 1.7797201870380883 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.9962203635578930000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6300000000000004 " "
y[1] (analytic) = 1.7811172496301184 " "
y[1] (numeric) = 1.7811172496301146 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 2.11932049083766370000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6310000000000004 " "
y[1] (analytic) = 1.7825145311048767 " "
y[1] (numeric) = 1.7825145311048731 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.99309100532178070000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6320000000000005 " "
y[1] (analytic) = 1.7839120300650857 " "
y[1] (numeric) = 1.7839120300650824 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.86705903527874670000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6330000000000005 " "
y[1] (analytic) = 1.7853097451132471 " "
y[1] (numeric) = 1.7853097451132436 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.98997047348506040000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6340000000000005 " "
y[1] (analytic) = 1.7867076748516455 " "
y[1] (numeric) = 1.7867076748516417 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 2.11268935419945460000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6350000000000005 " "
y[1] (analytic) = 1.7881058178823508 " "
y[1] (numeric) = 1.7881058178823472 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.98685874363295270000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6360000000000005 " "
y[1] (analytic) = 1.7895041728072205 " "
y[1] (numeric) = 1.7895041728072172 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.86122453609627620000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6370000000000005 " "
y[1] (analytic) = 1.7909027382279001 " "
y[1] (numeric) = 1.7909027382278968 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.85977105444105230000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6380000000000005 " "
y[1] (analytic) = 1.7923015127458242 " "
y[1] (numeric) = 1.7923015127458208 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.85831962434314430000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6390000000000005 " "
y[1] (analytic) = 1.7937004949622184 " "
y[1] (numeric) = 1.7937004949622148 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.98066159248918180000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6400000000000005 " "
y[1] (analytic) = 1.7950996834781003 " "
y[1] (numeric) = 1.7950996834780966 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 2.10281262843951880000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6410000000000005 " "
y[1] (analytic) = 1.7964990768942815 " "
y[1] (numeric) = 1.7964990768942777 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 2.10117463029883070000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6420000000000005 " "
y[1] (analytic) = 1.797898673811369 " "
y[1] (numeric) = 1.7978986738113651 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 2.09953894438523330000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6430000000000005 " "
y[1] (analytic) = 1.7992984728297654 " "
y[1] (numeric) = 1.7992984728297619 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.97449935763749700000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6440000000000005 " "
y[1] (analytic) = 1.8006984725496724 " "
y[1] (numeric) = 1.800698472549669 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.84965396741824200000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6450000000000005 " "
y[1] (analytic) = 1.8020986715710903 " "
y[1] (numeric) = 1.8020986715710872 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.72500236418259150000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6460000000000005 " "
y[1] (analytic) = 1.8034990684938206 " "
y[1] (numeric) = 1.803499068493817 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.96990047894370380000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6470000000000005 " "
y[1] (analytic) = 1.8048996619174655 " "
y[1] (numeric) = 1.8048996619174622 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.8453486053274992000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6480000000000005 " "
y[1] (analytic) = 1.8063004504414324 " "
y[1] (numeric) = 1.806300450441429 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.8439175349048410000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6490000000000005 " "
y[1] (analytic) = 1.8077014326649326 " "
y[1] (numeric) = 1.8077014326649294 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 1.71965591926741550000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6500000000000005 " "
y[1] (analytic) = 1.8091026071869845 " "
y[1] (numeric) = 1.8091026071869811 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.84106145259190360000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6510000000000005 " "
y[1] (analytic) = 1.810503972606413 " "
y[1] (numeric) = 1.8105039726064096 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.83963643508642400000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6520000000000005 " "
y[1] (analytic) = 1.8119055275218532 " "
y[1] (numeric) = 1.8119055275218496 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.96076099158412200000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6530000000000005 " "
y[1] (analytic) = 1.8133072705317501 " "
y[1] (numeric) = 1.8133072705317466 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.9592452622542410000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6540000000000005 " "
y[1] (analytic) = 1.814709200234361 " "
y[1] (numeric) = 1.8147092002343574 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.95773167311968480000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6550000000000005 " "
y[1] (analytic) = 1.8161113152277562 " "
y[1] (numeric) = 1.8161113152277526 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.95622022120101130000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6560000000000005 " "
y[1] (analytic) = 1.8175136141098207 " "
y[1] (numeric) = 1.8175136141098172 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.95471090352219680000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6570000000000005 " "
y[1] (analytic) = 1.8189160954782557 " "
y[1] (numeric) = 1.8189160954782524 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.83112848479122510000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6580000000000005 " "
y[1] (analytic) = 1.8203187579305806 " "
y[1] (numeric) = 1.820318757930577 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.9516986589971660000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6590000000000005 " "
y[1] (analytic) = 1.8217216000641323 " "
y[1] (numeric) = 1.821721600064129 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.82830849332752930000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6600000000000005 " "
y[1] (analytic) = 1.8231246204760696 " "
y[1] (numeric) = 1.8231246204760658 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 2.0704883480427330000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6610000000000005 " "
y[1] (analytic) = 1.824527817763371 " "
y[1] (numeric) = 1.8245278177633675 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.9471962248049782000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6620000000000005 " "
y[1] (analytic) = 1.8259311905228404 " "
y[1] (numeric) = 1.8259311905228368 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.94569965026075850000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6630000000000005 " "
y[1] (analytic) = 1.8273347373511049 " "
y[1] (numeric) = 1.827334737351101 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 2.06571801354655080000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6640000000000005 " "
y[1] (analytic) = 1.8287384568446172 " "
y[1] (numeric) = 1.8287384568446137 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.9427128387350170000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6650000000000005 " "
y[1] (analytic) = 1.8301423475996585 " "
y[1] (numeric) = 1.830142347599655 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.94122259585987830000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6660000000000005 " "
y[1] (analytic) = 1.8315464082123383 " "
y[1] (numeric) = 1.8315464082123347 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.93973445765324050000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6670000000000005 " "
y[1] (analytic) = 1.8329506372785958 " "
y[1] (numeric) = 1.8329506372785922 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.93824842117693820000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6680000000000005 " "
y[1] (analytic) = 1.834355033394202 " "
y[1] (numeric) = 1.8343550333941985 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.93676448349626770000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6690000000000005 " "
y[1] (analytic) = 1.8357595951547607 " "
y[1] (numeric) = 1.8357595951547574 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.8143274765749940000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6700000000000005 " "
y[1] (analytic) = 1.8371643211557112 " "
y[1] (numeric) = 1.8371643211557076 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.93380289280034760000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6710000000000005 " "
y[1] (analytic) = 1.8385692099923268 " "
y[1] (numeric) = 1.838569209992323 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 2.05309556105385120000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6720000000000005 " "
y[1] (analytic) = 1.8399742602597182 " "
y[1] (numeric) = 1.8399742602597149 " "
absolute error = 3.3306690738754696000000000000000E-15 " "
relative error = 1.81017155827241600000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6730000000000005 " "
y[1] (analytic) = 1.8413794705528368 " "
y[1] (numeric) = 1.8413794705528332 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.92937617455562870000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6740000000000005 " "
y[1] (analytic) = 1.8427848394664714 " "
y[1] (numeric) = 1.8427848394664679 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.92790476821433660000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6750000000000005 " "
y[1] (analytic) = 1.8441903655952538 " "
y[1] (numeric) = 1.8441903655952498 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.16723987025087080000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6760000000000005 " "
y[1] (analytic) = 1.845596047533657 " "
y[1] (numeric) = 1.8455960475336533 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 2.04527869940439620000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6770000000000005 " "
y[1] (analytic) = 1.8470018838760003 " "
y[1] (numeric) = 1.8470018838759963 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.16394088362440000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6780000000000005 " "
y[1] (analytic) = 1.8484078732164468 " "
y[1] (numeric) = 1.8484078732164428 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.16229488445948720000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6790000000000005 " "
y[1] (analytic) = 1.8498140141490076 " "
y[1] (numeric) = 1.8498140141490034 " "
absolute error = 4.218847493575595000000000000000E-15 " "
relative error = 2.28068738873537120000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6800000000000005 " "
y[1] (analytic) = 1.8512203052675413 " "
y[1] (numeric) = 1.8512203052675373 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.15900985813405900000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6810000000000005 " "
y[1] (analytic) = 1.8526267451657576 " "
y[1] (numeric) = 1.8526267451657537 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.15737082446845640000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6820000000000005 " "
y[1] (analytic) = 1.8540333324372167 " "
y[1] (numeric) = 1.8540333324372125 " "
absolute error = 4.218847493575595000000000000000E-15 " "
relative error = 2.2754971120339650000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6830000000000005 " "
y[1] (analytic) = 1.8554400656753305 " "
y[1] (numeric) = 1.8554400656753267 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 2.03442749434842090000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6840000000000005 " "
y[1] (analytic) = 1.856846943473367 " "
y[1] (numeric) = 1.8568469434733632 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 2.03288606903947230000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6850000000000005 " "
y[1] (analytic) = 1.8582539644244482 " "
y[1] (numeric) = 1.8582539644244442 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.15083781074482060000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6860000000000005 " "
y[1] (analytic) = 1.8596611271215533 " "
y[1] (numeric) = 1.859661127121549 " "
absolute error = 4.218847493575595000000000000000E-15 " "
relative error = 2.26861089477396920000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6870000000000005 " "
y[1] (analytic) = 1.8610684301575193 " "
y[1] (numeric) = 1.861068430157515 " "
absolute error = 4.218847493575595000000000000000E-15 " "
relative error = 2.2668954162091262000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6880000000000005 " "
y[1] (analytic) = 1.8624758721250434 " "
y[1] (numeric) = 1.8624758721250394 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.14596223686393330000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6890000000000005 " "
y[1] (analytic) = 1.863883451616684 " "
y[1] (numeric) = 1.8638834516166802 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 2.02521154445113260000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6900000000000005 " "
y[1] (analytic) = 1.865291167224862 " "
y[1] (numeric) = 1.865291167224858 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.14272332324229930000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6910000000000005 " "
y[1] (analytic) = 1.8666990175418614 " "
y[1] (numeric) = 1.8666990175418574 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.14110729747621660000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6920000000000005 " "
y[1] (analytic) = 1.8681070011598324 " "
y[1] (numeric) = 1.8681070011598282 " "
absolute error = 4.218847493575595000000000000000E-15 " "
relative error = 2.25835430784011940000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6930000000000005 " "
y[1] (analytic) = 1.8695151166707906 " "
y[1] (numeric) = 1.8695151166707866 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.13788209199828270000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6940000000000005 " "
y[1] (analytic) = 1.870923362666622 " "
y[1] (numeric) = 1.8709233626666175 " "
absolute error = 4.440892098500626000000000000000E-15 " "
relative error = 2.3736365620936153000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6950000000000005 " "
y[1] (analytic) = 1.8723317377390791 " "
y[1] (numeric) = 1.8723317377390751 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.13466599325869170000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6960000000000005 " "
y[1] (analytic) = 1.8737402404797885 " "
y[1] (numeric) = 1.8737402404797843 " "
absolute error = 4.218847493575595000000000000000E-15 " "
relative error = 2.25156475931547470000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6970000000000005 " "
y[1] (analytic) = 1.8751488694802463 " "
y[1] (numeric) = 1.8751488694802425 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 2.01304458817278850000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6980000000000005 " "
y[1] (analytic) = 1.8765576233318249 " "
y[1] (numeric) = 1.8765576233318209 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.12985886442125160000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.6990000000000005 " "
y[1] (analytic) = 1.8779665006257695 " "
y[1] (numeric) = 1.8779665006257655 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.12826101387791680000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7000000000000005 " "
y[1] (analytic) = 1.8793754999532033 " "
y[1] (numeric) = 1.8793754999531995 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 2.00851734196786340000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7010000000000005 " "
y[1] (analytic) = 1.8807846199051272 " "
y[1] (numeric) = 1.8807846199051235 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 2.00701252220785550000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7020000000000005 " "
y[1] (analytic) = 1.8821938590724212 " "
y[1] (numeric) = 1.8821938590724174 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 2.00550982861340350000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7030000000000005 " "
y[1] (analytic) = 1.8836032160458465 " "
y[1] (numeric) = 1.8836032160458427 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 2.00400925819700620000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7040000000000005 " "
y[1] (analytic) = 1.8850126894160457 " "
y[1] (numeric) = 1.8850126894160422 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.88471605456464550000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7050000000000005 " "
y[1] (analytic) = 1.8864222777735462 " "
y[1] (numeric) = 1.8864222777735427 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.8833077411456350000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7060000000000005 " "
y[1] (analytic) = 1.8878319797087593 " "
y[1] (numeric) = 1.8878319797087557 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.88190141759786660000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7070000000000005 " "
y[1] (analytic) = 1.8892417938119834 " "
y[1] (numeric) = 1.8892417938119799 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.88049708112378620000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7080000000000005 " "
y[1] (analytic) = 1.8906517186734044 " "
y[1] (numeric) = 1.8906517186734009 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.87909472892939770000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7090000000000005 " "
y[1] (analytic) = 1.892061752883098 " "
y[1] (numeric) = 1.892061752883094 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.11240615300229470000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7100000000000005 " "
y[1] (analytic) = 1.8934718950310292 " "
y[1] (numeric) = 1.8934718950310254 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 1.99356446411034480000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7110000000000005 " "
y[1] (analytic) = 1.8948821437070567 " "
y[1] (numeric) = 1.8948821437070529 " "
absolute error = 3.774758283725532000000000000000E-15 " "
relative error = 1.9920807720214070000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7120000000000005 " "
y[1] (analytic) = 1.8962924975009319 " "
y[1] (numeric) = 1.8962924975009279 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.10769324559256150000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7130000000000005 " "
y[1] (analytic) = 1.8977029550023004 " "
y[1] (numeric) = 1.8977029550022968 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 1.87211263461208780000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7140000000000005 " "
y[1] (analytic) = 1.8991135148007063 " "
y[1] (numeric) = 1.8991135148007021 " "
absolute error = 4.218847493575595000000000000000E-15 " "
relative error = 2.22148252892525070000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7150000000000005 " "
y[1] (analytic) = 1.9005241754855882 " "
y[1] (numeric) = 1.9005241754855842 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.10300028813333620000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7160000000000005 " "
y[1] (analytic) = 1.9019349356462867 " "
y[1] (numeric) = 1.9019349356462825 " "
absolute error = 4.218847493575595000000000000000E-15 " "
relative error = 2.21818707596430500000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7170000000000005 " "
y[1] (analytic) = 1.9033457938720413 " "
y[1] (numeric) = 1.903345793872037 " "
absolute error = 4.218847493575595000000000000000E-15 " "
relative error = 2.21654284111614280000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7180000000000005 " "
y[1] (analytic) = 1.9047567487519936 " "
y[1] (numeric) = 1.9047567487519896 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.09832719651435240000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7190000000000005 " "
y[1] (analytic) = 1.9061677988751895 " "
y[1] (numeric) = 1.9061677988751855 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.0967738994484308000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7200000000000005 " "
y[1] (analytic) = 1.9075789428305787 " "
y[1] (numeric) = 1.9075789428305747 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.0952227972908270000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7210000000000005 " "
y[1] (analytic) = 1.9089901792070176 " "
y[1] (numeric) = 1.9089901792070134 " "
absolute error = 4.218847493575595000000000000000E-15 " "
relative error = 2.20998910289212560000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7220000000000005 " "
y[1] (analytic) = 1.9104015065932693 " "
y[1] (numeric) = 1.9104015065932654 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.09212716534016850000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7230000000000005 " "
y[1] (analytic) = 1.9118129235780073 " "
y[1] (numeric) = 1.9118129235780033 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.090582629376960000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7240000000000005 " "
y[1] (analytic) = 1.9132244287498144 " "
y[1] (numeric) = 1.9132244287498101 " "
absolute error = 4.218847493575595000000000000000E-15 " "
relative error = 2.20509806909186150000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7250000000000005 " "
y[1] (analytic) = 1.9146360206971853 " "
y[1] (numeric) = 1.914636020697181 " "
absolute error = 4.218847493575595000000000000000E-15 " "
relative error = 2.20347232997286150000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7260000000000005 " "
y[1] (analytic) = 1.9160476980085281 " "
y[1] (numeric) = 1.9160476980085241 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.08596210459932620000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7270000000000005 " "
y[1] (analytic) = 1.9174594592721665 " "
y[1] (numeric) = 1.9174594592721623 " "
absolute error = 4.218847493575595000000000000000E-15 " "
relative error = 2.20022774050044030000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7280000000000005 " "
y[1] (analytic) = 1.9188713030763385 " "
y[1] (numeric) = 1.9188713030763342 " "
absolute error = 4.218847493575595000000000000000E-15 " "
relative error = 2.19860888367652880000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7290000000000005 " "
y[1] (analytic) = 1.9202832280092004 " "
y[1] (numeric) = 1.9202832280091964 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 2.08136114004085550000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7300000000000005 " "
y[1] (analytic) = 1.9216952326588284 " "
y[1] (numeric) = 1.921695232658824 " "
absolute error = 4.440892098500626000000000000000E-15 " "
relative error = 2.31092424179888040000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7310000000000005 " "
y[1] (analytic) = 1.9231073156132166 " "
y[1] (numeric) = 1.9231073156132121 " "
absolute error = 4.440892098500626000000000000000E-15 " "
relative error = 2.30922739591605640000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7320000000000005 " "
y[1] (analytic) = 1.9245194754602828 " "
y[1] (numeric) = 1.9245194754602784 " "
absolute error = 4.440892098500626000000000000000E-15 " "
relative error = 2.30753294790041470000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7330000000000005 " "
y[1] (analytic) = 1.9259317107878675 " "
y[1] (numeric) = 1.9259317107878628 " "
absolute error = 4.6629367034256575000000000000000E-15 " "
relative error = 2.42113293908958280000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7340000000000005 " "
y[1] (analytic) = 1.9273440201837353 " "
y[1] (numeric) = 1.9273440201837304 " "
absolute error = 4.884981308350689000000000000000E-15 " "
relative error = 2.5345663551466020000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7350000000000005 " "
y[1] (analytic) = 1.9287564022355763 " "
y[1] (numeric) = 1.9287564022355717 " "
absolute error = 4.6629367034256575000000000000000E-15 " "
relative error = 2.41758715513320260000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7360000000000005 " "
y[1] (analytic) = 1.9301688555310095 " "
y[1] (numeric) = 1.9301688555310048 " "
absolute error = 4.6629367034256575000000000000000E-15 " "
relative error = 2.41581802030622630000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7370000000000005 " "
y[1] (analytic) = 1.9315813786575813 " "
y[1] (numeric) = 1.9315813786575766 " "
absolute error = 4.6629367034256575000000000000000E-15 " "
relative error = 2.4140513855369250000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7380000000000005 " "
y[1] (analytic) = 1.932993970202769 " "
y[1] (numeric) = 1.932993970202764 " "
absolute error = 4.884981308350689000000000000000E-15 " "
relative error = 2.52715806859876550000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7390000000000005 " "
y[1] (analytic) = 1.9344066287539805 " "
y[1] (numeric) = 1.9344066287539758 " "
absolute error = 4.6629367034256575000000000000000E-15 " "
relative error = 2.4105256020701393000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7400000000000005 " "
y[1] (analytic) = 1.9358193528985579 " "
y[1] (numeric) = 1.9358193528985532 " "
absolute error = 4.6629367034256575000000000000000E-15 " "
relative error = 2.4087664463338007000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7410000000000005 " "
y[1] (analytic) = 1.9372321412237772 " "
y[1] (numeric) = 1.9372321412237725 " "
absolute error = 4.6629367034256575000000000000000E-15 " "
relative error = 2.40700977657742840000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7420000000000005 " "
y[1] (analytic) = 1.93864499231685 " "
y[1] (numeric) = 1.9386449923168452 " "
absolute error = 4.884981308350689000000000000000E-15 " "
relative error = 2.51979156973588500000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7430000000000005 " "
y[1] (analytic) = 1.9400579047649253 " "
y[1] (numeric) = 1.9400579047649205 " "
absolute error = 4.884981308350689000000000000000E-15 " "
relative error = 2.51795644673945800000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7440000000000005 " "
y[1] (analytic) = 1.9414708771550908 " "
y[1] (numeric) = 1.941470877155086 " "
absolute error = 4.884981308350689000000000000000E-15 " "
relative error = 2.5161239170936380000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7450000000000006 " "
y[1] (analytic) = 1.9428839080743745 " "
y[1] (numeric) = 1.9428839080743694 " "
absolute error = 5.10702591327572000000000000000E-15 " "
relative error = 2.62858006700842000000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7460000000000006 " "
y[1] (analytic) = 1.944296996109745 " "
y[1] (numeric) = 1.94429699610974 " "
absolute error = 4.884981308350689000000000000000E-15 " "
relative error = 2.51246662321899600000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7470000000000006 " "
y[1] (analytic) = 1.9457101398481147 " "
y[1] (numeric) = 1.94571013984811 " "
absolute error = 4.6629367034256575000000000000000E-15 " "
relative error = 2.3965217675175680000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7480000000000006 " "
y[1] (analytic) = 1.9471233378763406 " "
y[1] (numeric) = 1.9471233378763355 " "
absolute error = 5.10702591327572000000000000000E-15 " "
relative error = 2.62285691611388870000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7490000000000006 " "
y[1] (analytic) = 1.9485365887812238 " "
y[1] (numeric) = 1.9485365887812187 " "
absolute error = 5.10702591327572000000000000000E-15 " "
relative error = 2.62095458852537000000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7500000000000006 " "
y[1] (analytic) = 1.949949891149514 " "
y[1] (numeric) = 1.949949891149509 " "
absolute error = 4.884981308350689000000000000000E-15 " "
relative error = 2.50518299496965360000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7510000000000006 " "
y[1] (analytic) = 1.9513632435679091 " "
y[1] (numeric) = 1.9513632435679038 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.73094747262789430000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7520000000000006 " "
y[1] (analytic) = 1.9527766446230563 " "
y[1] (numeric) = 1.952776644623051 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.7289708389714070000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7530000000000006 " "
y[1] (analytic) = 1.954190092901555 " "
y[1] (numeric) = 1.9541900929015497 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.72699699868410500000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7540000000000006 " "
y[1] (analytic) = 1.955603586989957 " "
y[1] (numeric) = 1.9556035869899517 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.7250259478216630000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7550000000000006 " "
y[1] (analytic) = 1.9570171254747684 " "
y[1] (numeric) = 1.957017125474763 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.72305768244512900000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7560000000000006 " "
y[1] (analytic) = 1.9584307069424503 " "
y[1] (numeric) = 1.9584307069424454 " "
absolute error = 4.884981308350689000000000000000E-15 " "
relative error = 2.49433451540250840000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7570000000000006 " "
y[1] (analytic) = 1.9598443299794224 " "
y[1] (numeric) = 1.9598443299794173 " "
absolute error = 5.10702591327572000000000000000E-15 " "
relative error = 2.60583243023661040000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7580000000000006 " "
y[1] (analytic) = 1.9612579931720608 " "
y[1] (numeric) = 1.9612579931720557 " "
absolute error = 5.10702591327572000000000000000E-15 " "
relative error = 2.60395416159187650000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7590000000000006 " "
y[1] (analytic) = 1.962671695106703 " "
y[1] (numeric) = 1.9626716951066978 " "
absolute error = 5.10702591327572000000000000000E-15 " "
relative error = 2.6020785473232550000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7600000000000006 " "
y[1] (analytic) = 1.9640854343696468 " "
y[1] (numeric) = 1.9640854343696417 " "
absolute error = 5.10702591327572000000000000000E-15 " "
relative error = 2.60020558368163230000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7610000000000006 " "
y[1] (analytic) = 1.9654992095471537 " "
y[1] (numeric) = 1.9654992095471482 " "
absolute error = 5.551115123125783000000000000000E-15 " "
relative error = 2.82427746404677800000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7620000000000006 " "
y[1] (analytic) = 1.9669130192254478 " "
y[1] (numeric) = 1.9669130192254423 " "
absolute error = 5.551115123125783000000000000000E-15 " "
relative error = 2.82224738403112500000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7630000000000006 " "
y[1] (analytic) = 1.9683268619907195 " "
y[1] (numeric) = 1.9683268619907144 " "
absolute error = 5.10702591327572000000000000000E-15 " "
relative error = 2.59460255910473840000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7640000000000006 " "
y[1] (analytic) = 1.9697407364291273 " "
y[1] (numeric) = 1.969740736429122 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.70546799365160740000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7650000000000006 " "
y[1] (analytic) = 1.971154641126796 " "
y[1] (numeric) = 1.9711546411267906 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.7035273676723953000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7660000000000006 " "
y[1] (analytic) = 1.9725685746698207 " "
y[1] (numeric) = 1.9725685746698156 " "
absolute error = 5.10702591327572000000000000000E-15 " "
relative error = 2.5890232556962240000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7670000000000006 " "
y[1] (analytic) = 1.9739825356442688 " "
y[1] (numeric) = 1.9739825356442637 " "
absolute error = 5.10702591327572000000000000000E-15 " "
relative error = 2.5871687419001854000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7680000000000006 " "
y[1] (analytic) = 1.9753965226361796 " "
y[1] (numeric) = 1.975396522636174 " "
absolute error = 5.551115123125783000000000000000E-15 " "
relative error = 2.81012700969918870000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7690000000000006 " "
y[1] (analytic) = 1.976810534231565 " "
y[1] (numeric) = 1.9768105342315596 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.6957922501522347000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7700000000000006 " "
y[1] (analytic) = 1.978224569016414 " "
y[1] (numeric) = 1.978224569016409 " "
absolute error = 4.884981308350689000000000000000E-15 " "
relative error = 2.46937652320208150000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7710000000000006 " "
y[1] (analytic) = 1.9796386255766927 " "
y[1] (numeric) = 1.9796386255766876 " "
absolute error = 5.10702591327572000000000000000E-15 " "
relative error = 2.5797768579040437000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7720000000000006 " "
y[1] (analytic) = 1.981052702498344 " "
y[1] (numeric) = 1.9810527024983389 " "
absolute error = 5.10702591327572000000000000000E-15 " "
relative error = 2.5779354112261377000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7730000000000006 " "
y[1] (analytic) = 1.9824667983672912 " "
y[1] (numeric) = 1.9824667983672861 " "
absolute error = 5.10702591327572000000000000000E-15 " "
relative error = 2.5760965669042910000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7740000000000006 " "
y[1] (analytic) = 1.983880911769439 " "
y[1] (numeric) = 1.9838809117694336 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.686184683055250000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7750000000000006 " "
y[1] (analytic) = 1.9852950412906731 " "
y[1] (numeric) = 1.9852950412906678 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.68427130847827770000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7760000000000006 " "
y[1] (analytic) = 1.9867091855168648 " "
y[1] (numeric) = 1.9867091855168595 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.68236063790802560000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7770000000000006 " "
y[1] (analytic) = 1.98812334303387 " "
y[1] (numeric) = 1.9881233430338647 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.68045266752343750000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7780000000000006 " "
y[1] (analytic) = 1.989537512427531 " "
y[1] (numeric) = 1.9895375124275259 " "
absolute error = 5.10702591327572000000000000000E-15 " "
relative error = 2.56694125211260340000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7790000000000006 " "
y[1] (analytic) = 1.990951692283679 " "
y[1] (numeric) = 1.9909516922836736 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.6766448120537540000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7800000000000006 " "
y[1] (analytic) = 1.9923658811881335 " "
y[1] (numeric) = 1.9923658811881284 " "
absolute error = 5.10702591327572000000000000000E-15 " "
relative error = 2.56329721438021240000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7810000000000006 " "
y[1] (analytic) = 1.9937800777267065 " "
y[1] (numeric) = 1.9937800777267014 " "
absolute error = 5.10702591327572000000000000000E-15 " "
relative error = 2.5614790569573320000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7820000000000006 " "
y[1] (analytic) = 1.9951942804852014 " "
y[1] (numeric) = 1.995194280485196 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.6709531850225640000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7830000000000006 " "
y[1] (analytic) = 1.9966084880494153 " "
y[1] (numeric) = 1.99660848804941 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.66906133580899540000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7840000000000006 " "
y[1] (analytic) = 1.9980226990051406 " "
y[1] (numeric) = 1.9980226990051355 " "
absolute error = 5.10702591327572000000000000000E-15 " "
relative error = 2.55603998684230170000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7850000000000006 " "
y[1] (analytic) = 1.9994369119381672 " "
y[1] (numeric) = 1.9994369119381619 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.665285654367050000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7860000000000006 " "
y[1] (analytic) = 2.0008511254342816 " "
y[1] (numeric) = 2.0008511254342762 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.6634018145873220000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7870000000000006 " "
y[1] (analytic) = 2.0022653380792703 " "
y[1] (numeric) = 2.0022653380792654 " "
absolute error = 4.884981308350689000000000000000E-15 " "
relative error = 2.4397272506533751000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7880000000000006 " "
y[1] (analytic) = 2.003679548458921 " "
y[1] (numeric) = 2.0036795484589165 " "
absolute error = 4.440892098500626000000000000000E-15 " "
relative error = 2.21636843172663270000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7890000000000006 " "
y[1] (analytic) = 2.005093755159024 " "
y[1] (numeric) = 2.0050937551590193 " "
absolute error = 4.884981308350689000000000000000E-15 " "
relative error = 2.43628573266553350000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7900000000000006 " "
y[1] (analytic) = 2.0065079567653723 " "
y[1] (numeric) = 2.0065079567653674 " "
absolute error = 4.884981308350689000000000000000E-15 " "
relative error = 2.4345686205130290000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7910000000000006 " "
y[1] (analytic) = 2.007922151863765 " "
y[1] (numeric) = 2.0079221518637596 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.6540224745537460000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7920000000000006 " "
y[1] (analytic) = 2.009336339040005 " "
y[1] (numeric) = 2.0093363390400003 " "
absolute error = 4.884981308350689000000000000000E-15 " "
relative error = 2.4311416727199450000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7930000000000006 " "
y[1] (analytic) = 2.010750516879908 " "
y[1] (numeric) = 2.0107505168799027 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.6502892693370520000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7940000000000006 " "
y[1] (analytic) = 2.0121646839692944 " "
y[1] (numeric) = 2.012164683969289 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.64842662266011300000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7950000000000006 " "
y[1] (analytic) = 2.0135788388939977 " "
y[1] (numeric) = 2.013578838893993 " "
absolute error = 4.884981308350689000000000000000E-15 " "
relative error = 2.4260193909436750000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7960000000000006 " "
y[1] (analytic) = 2.014992980239864 " "
y[1] (numeric) = 2.0149929802398585 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.64470922254348540000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7970000000000006 " "
y[1] (analytic) = 2.0164071065927507 " "
y[1] (numeric) = 2.0164071065927454 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.64285446166950650000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7980000000000006 " "
y[1] (analytic) = 2.0178212165385316 " "
y[1] (numeric) = 2.0178212165385268 " "
absolute error = 4.884981308350689000000000000000E-15 " "
relative error = 2.4209187951401479000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.7990000000000006 " "
y[1] (analytic) = 2.0192353086630987 " "
y[1] (numeric) = 2.0192353086630934 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.63915279974429430000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8000000000000006 " "
y[1] (analytic) = 2.0206493815523583 " "
y[1] (numeric) = 2.020649381552353 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.6373058912906050000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8010000000000006 " "
y[1] (analytic) = 2.022063433792238 " "
y[1] (numeric) = 2.0220634337922325 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.6354615929167240000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8020000000000006 " "
y[1] (analytic) = 2.0234774639686854 " "
y[1] (numeric) = 2.02347746396868 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.63361990093467200000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8030000000000006 " "
y[1] (analytic) = 2.0248914706676713 " "
y[1] (numeric) = 2.024891470667666 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.6317808116617664000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8040000000000006 " "
y[1] (analytic) = 2.0263054524751887 " "
y[1] (numeric) = 2.026305452475183 " "
absolute error = 5.773159728050814000000000000000E-15 " "
relative error = 2.84910634820566560000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8050000000000006 " "
y[1] (analytic) = 2.027719407977255 " "
y[1] (numeric) = 2.0277194079772496 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.6281104265391180000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8060000000000006 " "
y[1] (analytic) = 2.029133335759916 " "
y[1] (numeric) = 2.029133335759911 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.6262791233504620000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8070000000000006 " "
y[1] (analytic) = 2.0305472344092443 " "
y[1] (numeric) = 2.0305472344092386 " "
absolute error = 5.773159728050814000000000000000E-15 " "
relative error = 2.84315460887587970000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8080000000000006 " "
y[1] (analytic) = 2.03196110251134 " "
y[1] (numeric) = 2.0319611025113344 " "
absolute error = 5.773159728050814000000000000000E-15 " "
relative error = 2.84117630052841740000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8090000000000006 " "
y[1] (analytic) = 2.033374938652336 " "
y[1] (numeric) = 2.0333749386523303 " "
absolute error = 5.773159728050814000000000000000E-15 " "
relative error = 2.8392007879654020000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8100000000000006 " "
y[1] (analytic) = 2.034788741418396 " "
y[1] (numeric) = 2.0347887414183905 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 2.6189797543729293000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8110000000000006 " "
y[1] (analytic) = 2.0362025093957183 " "
y[1] (numeric) = 2.036202509395712 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 3.05335491396971250000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8120000000000006 " "
y[1] (analytic) = 2.0376162411705336 " "
y[1] (numeric) = 2.0376162411705274 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 3.05123644594101850000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8130000000000006 " "
y[1] (analytic) = 2.039029935329111 " "
y[1] (numeric) = 2.0390299353291046 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 3.0491209717808176000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8140000000000006 " "
y[1] (analytic) = 2.040443590457756 " "
y[1] (numeric) = 2.0404435904577496 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 3.0470084872604053000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8150000000000006 " "
y[1] (analytic) = 2.041857205142814 " "
y[1] (numeric) = 2.041857205142808 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 3.04489898815721640000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8160000000000006 " "
y[1] (analytic) = 2.0432707779706707 " "
y[1] (numeric) = 2.0432707779706645 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 3.04279247025482540000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8170000000000006 " "
y[1] (analytic) = 2.0446843075277523 " "
y[1] (numeric) = 2.0446843075277465 " "
absolute error = 5.773159728050814000000000000000E-15 " "
relative error = 2.8234968629613040000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8180000000000006 " "
y[1] (analytic) = 2.046097792400531 " "
y[1] (numeric) = 2.046097792400525 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 3.03858836121740360000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8190000000000006 " "
y[1] (analytic) = 2.047511231175521 " "
y[1] (numeric) = 2.0475112311755144 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.25338295894304740000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8200000000000006 " "
y[1] (analytic) = 2.048924622439283 " "
y[1] (numeric) = 2.048924622439277 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 3.03439612653935760000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8210000000000006 " "
y[1] (analytic) = 2.0503379647784272 " "
y[1] (numeric) = 2.050337964778421 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 3.03230445160915350000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8220000000000006 " "
y[1] (analytic) = 2.0517512567796112 " "
y[1] (numeric) = 2.0517512567796046 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.24665971361774440000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8230000000000006 " "
y[1] (analytic) = 2.0531644970295417 " "
y[1] (numeric) = 2.0531644970295355 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 3.02812996566802660000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8240000000000006 " "
y[1] (analytic) = 2.0545776841149808 " "
y[1] (numeric) = 2.054577684114974 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.2421933710529627000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8250000000000006 " "
y[1] (analytic) = 2.0559908166227396 " "
y[1] (numeric) = 2.055990816622733 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.239964932670830000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8260000000000006 " "
y[1] (analytic) = 2.0574038931396865 " "
y[1] (numeric) = 2.05740389313968 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.2377396436173020000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8270000000000006 " "
y[1] (analytic) = 2.058816912252745 " "
y[1] (numeric) = 2.0588169122527384 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.23551749944687550000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8280000000000006 " "
y[1] (analytic) = 2.0602298725488963 " "
y[1] (numeric) = 2.0602298725488897 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.23329849572057500000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8290000000000006 " "
y[1] (analytic) = 2.0616427726151807 " "
y[1] (numeric) = 2.0616427726151736 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.4464881365396843000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8300000000000006 " "
y[1] (analytic) = 2.0630556110386964 " "
y[1] (numeric) = 2.0630556110386897 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.228869891877090000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8310000000000006 " "
y[1] (analytic) = 2.064468386406607 " "
y[1] (numeric) = 2.0644683864066002 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.22666028291457500000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8320000000000006 " "
y[1] (analytic) = 2.0658810973061366 " "
y[1] (numeric) = 2.06588109730613 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.22445379670552030000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8330000000000006 " "
y[1] (analytic) = 2.0672937423245736 " "
y[1] (numeric) = 2.0672937423245674 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 3.0074337335873110000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8340000000000006 " "
y[1] (analytic) = 2.068706320049275 " "
y[1] (numeric) = 2.068706320049268 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.22005017492877900000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8350000000000006 " "
y[1] (analytic) = 2.0701188290676615 " "
y[1] (numeric) = 2.070118829067655 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.21785303056784770000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8360000000000006 " "
y[1] (analytic) = 2.071531267967225 " "
y[1] (numeric) = 2.0715312679672184 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.21565899137387870000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8370000000000006 " "
y[1] (analytic) = 2.0729436353355264 " "
y[1] (numeric) = 2.0729436353355197 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.21346805296649400000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8380000000000006 " "
y[1] (analytic) = 2.0743559297601983 " "
y[1] (numeric) = 2.0743559297601917 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.21128021097180250000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8390000000000006 " "
y[1] (analytic) = 2.075768149828947 " "
y[1] (numeric) = 2.0757681498289404 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.20909546102240040000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8400000000000006 " "
y[1] (analytic) = 2.077180294129552 " "
y[1] (numeric) = 2.0771802941295454 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.20691379875736370000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8410000000000006 " "
y[1] (analytic) = 2.0785923612498696 " "
y[1] (numeric) = 2.078592361249863 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.20473521982224450000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8420000000000006 " "
y[1] (analytic) = 2.080004349777832 " "
y[1] (numeric) = 2.0800043497778256 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.2025597198690690000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8430000000000006 " "
y[1] (analytic) = 2.0814162583014513 " "
y[1] (numeric) = 2.081416258301445 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 2.9870281415859073000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8440000000000006 " "
y[1] (analytic) = 2.0828280854088197 " "
y[1] (numeric) = 2.082828085408813 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.19821793954897850000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8450000000000006 " "
y[1] (analytic) = 2.084239829688109 " "
y[1] (numeric) = 2.0842398296881024 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.19605165051843330000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8460000000000006 " "
y[1] (analytic) = 2.085651489727576 " "
y[1] (numeric) = 2.085651489727569 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.40681431801873050000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8470000000000006 " "
y[1] (analytic) = 2.0870630641155605 " "
y[1] (numeric) = 2.0870630641155534 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.40451013664605560000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8480000000000006 " "
y[1] (analytic) = 2.0884745514404877 " "
y[1] (numeric) = 2.088474551440481 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.1895711360985470000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8490000000000006 " "
y[1] (analytic) = 2.0898859502908707 " "
y[1] (numeric) = 2.0898859502908644 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 2.97492259663048040000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8500000000000006 " "
y[1] (analytic) = 2.0912972592553114 " "
y[1] (numeric) = 2.0912972592553047 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.185266043968790000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8510000000000006 " "
y[1] (analytic) = 2.0927084769225006 " "
y[1] (numeric) = 2.0927084769224935 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.39532593094386270000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8520000000000006 " "
y[1] (analytic) = 2.0941196018812196 " "
y[1] (numeric) = 2.0941196018812134 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 2.96890823824757100000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8530000000000006 " "
y[1] (analytic) = 2.0955306327203456 " "
y[1] (numeric) = 2.095530632720339 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.1788311961364270000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8540000000000006 " "
y[1] (analytic) = 2.0969415680288463 " "
y[1] (numeric) = 2.0969415680288397 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.17669230717415150000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8550000000000006 " "
y[1] (analytic) = 2.0983524063957875 " "
y[1] (numeric) = 2.098352406395781 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.1745564412570315000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8560000000000006 " "
y[1] (analytic) = 2.0997631464103304 " "
y[1] (numeric) = 2.0997631464103237 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.17242359412721940000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8570000000000007 " "
y[1] (analytic) = 2.1011737866617346 " "
y[1] (numeric) = 2.1011737866617284 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 2.95894084409772050000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8580000000000007 " "
y[1] (analytic) = 2.102584325739361 " "
y[1] (numeric) = 2.102584325739355 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 2.9569558099481310000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8590000000000007 " "
y[1] (analytic) = 2.10399476223267 " "
y[1] (numeric) = 2.1039947622326642 " "
absolute error = 5.773159728050814000000000000000E-15 " "
relative error = 2.74390403991528100000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8600000000000007 " "
y[1] (analytic) = 2.1054050947312257 " "
y[1] (numeric) = 2.10540509473122 " "
absolute error = 5.773159728050814000000000000000E-15 " "
relative error = 2.7420660007416820000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8610000000000007 " "
y[1] (analytic) = 2.106815321824696 " "
y[1] (numeric) = 2.1068153218246897 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 2.951017525596960000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8620000000000007 " "
y[1] (analytic) = 2.1082254421028526 " "
y[1] (numeric) = 2.1082254421028463 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 2.94904369036523560000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8630000000000007 " "
y[1] (analytic) = 2.109635454155576 " "
y[1] (numeric) = 2.10963545415557 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 2.94707264501745600000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8640000000000007 " "
y[1] (analytic) = 2.1110453565728546 " "
y[1] (numeric) = 2.1110453565728484 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 2.9451043856273074000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8650000000000007 " "
y[1] (analytic) = 2.112455147944786 " "
y[1] (numeric) = 2.1124551479447797 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 2.9431389082744110000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8660000000000007 " "
y[1] (analytic) = 2.1138648268615787 " "
y[1] (numeric) = 2.1138648268615725 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 2.9411762090443250000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8670000000000007 " "
y[1] (analytic) = 2.1152743919135544 " "
y[1] (numeric) = 2.1152743919135477 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.14916030431628750000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8680000000000007 " "
y[1] (analytic) = 2.116683841691147 " "
y[1] (numeric) = 2.116683841691141 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 2.9372591293244527000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8690000000000007 " "
y[1] (analytic) = 2.1180931747849088 " "
y[1] (numeric) = 2.118093174784902 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.1449693653950770000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8700000000000007 " "
y[1] (analytic) = 2.119502389785505 " "
y[1] (numeric) = 2.1195023897854983 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.1428783377899710000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8710000000000007 " "
y[1] (analytic) = 2.120911485283721 " "
y[1] (numeric) = 2.1209114852837145 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.14079026586997400000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8720000000000007 " "
y[1] (analytic) = 2.122320459870462 " "
y[1] (numeric) = 2.1223204598704557 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 2.92945813578047170000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8730000000000007 " "
y[1] (analytic) = 2.1237293121367538 " "
y[1] (numeric) = 2.123729312136747 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.13662297246759260000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8740000000000007 " "
y[1] (analytic) = 2.1251380406737437 " "
y[1] (numeric) = 2.1251380406737366 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.34351332553829400000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8750000000000007 " "
y[1] (analytic) = 2.126546644072703 " "
y[1] (numeric) = 2.126546644072696 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.3412986154834040000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8760000000000007 " "
y[1] (analytic) = 2.127955120925029 " "
y[1] (numeric) = 2.1279551209250216 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.5477799758151220000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8770000000000007 " "
y[1] (analytic) = 2.129363469822244 " "
y[1] (numeric) = 2.1293634698222372 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.12832367144300570000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8780000000000007 " "
y[1] (analytic) = 2.130771689356001 " "
y[1] (numeric) = 2.130771689355994 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.3346732515244410000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8790000000000007 " "
y[1] (analytic) = 2.1321797781180787 " "
y[1] (numeric) = 2.132179778118072 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.1241915977790680000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8800000000000007 " "
y[1] (analytic) = 2.13358773470039 " "
y[1] (numeric) = 2.133587734700383 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.330271936812940000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8810000000000007 " "
y[1] (analytic) = 2.1349955576949773 " "
y[1] (numeric) = 2.1349955576949706 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.1200711981540490000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8820000000000007 " "
y[1] (analytic) = 2.1364032456940185 " "
y[1] (numeric) = 2.1364032456940114 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.3258830569192366000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8830000000000007 " "
y[1] (analytic) = 2.1378107972898253 " "
y[1] (numeric) = 2.137810797289818 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.32369326911847950000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8840000000000007 " "
y[1] (analytic) = 2.139218211074846 " "
y[1] (numeric) = 2.139218211074839 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.3215065769428420000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8850000000000007 " "
y[1] (analytic) = 2.1406254856416673 " "
y[1] (numeric) = 2.14062548564166 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.3193229760464620000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8860000000000007 " "
y[1] (analytic) = 2.142032619583015 " "
y[1] (numeric) = 2.1420326195830075 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.52446386597077700000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8870000000000007 " "
y[1] (analytic) = 2.1434396114917544 " "
y[1] (numeric) = 2.1434396114917473 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.3149650307413553000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8880000000000007 " "
y[1] (analytic) = 2.1448464599608945 " "
y[1] (numeric) = 2.1448464599608874 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.3127906776742190000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8890000000000007 " "
y[1] (analytic) = 2.146253163583587 " "
y[1] (numeric) = 2.1462531635835798 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.31061939856950900000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8900000000000007 " "
y[1] (analytic) = 2.147659720953128 " "
y[1] (numeric) = 2.1476597209531207 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.30845118911464450000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8910000000000007 " "
y[1] (analytic) = 2.1490661306629604 " "
y[1] (numeric) = 2.149066130662953 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.51292892281641000000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8920000000000007 " "
y[1] (analytic) = 2.1504723913066743 " "
y[1] (numeric) = 2.150472391306667 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.5106317095583880000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8930000000000007 " "
y[1] (analytic) = 2.1518785014780097 " "
y[1] (numeric) = 2.151878501478002 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.5083377440992636000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8940000000000007 " "
y[1] (analytic) = 2.153284459770856 " "
y[1] (numeric) = 2.1532844597708487 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.2998089617742070000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8950000000000007 " "
y[1] (analytic) = 2.154690264779255 " "
y[1] (numeric) = 2.1546902647792483 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.09155253385496900000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8960000000000007 " "
y[1] (analytic) = 2.156095915097403 " "
y[1] (numeric) = 2.1560959150973957 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.2955061543632720000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8970000000000007 " "
y[1] (analytic) = 2.1575014093196483 " "
y[1] (numeric) = 2.157501409319641 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.2933593122618837000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8980000000000007 " "
y[1] (analytic) = 2.1589067460404974 " "
y[1] (numeric) = 2.1589067460404903 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.2912155055481570000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.8990000000000007 " "
y[1] (analytic) = 2.1603119238546142 " "
y[1] (numeric) = 2.1603119238546067 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.49464190059210000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9000000000000007 " "
y[1] (analytic) = 2.16171694135682 " "
y[1] (numeric) = 2.1617169413568127 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.28693698127804860000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9010000000000007 " "
y[1] (analytic) = 2.1631217971420984 " "
y[1] (numeric) = 2.163121797142091 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.4901023961875070000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9020000000000007 " "
y[1] (analytic) = 2.1645264898055925 " "
y[1] (numeric) = 2.1645264898055854 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.28267054760747130000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9030000000000007 " "
y[1] (analytic) = 2.165931017942611 " "
y[1] (numeric) = 2.165931017942604 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.2805418541677990000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9040000000000007 " "
y[1] (analytic) = 2.167335380148625 " "
y[1] (numeric) = 2.1673353801486184 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.0735151600275810000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9050000000000007 " "
y[1] (analytic) = 2.168739575019273 " "
y[1] (numeric) = 2.1687395750192664 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.0715251496675167000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9060000000000007 " "
y[1] (analytic) = 2.17014360115036 " "
y[1] (numeric) = 2.1701436011503534 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.06953795325796200000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9070000000000007 " "
y[1] (analytic) = 2.171547457137861 " "
y[1] (numeric) = 2.1715474571378537 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.27205713798494830000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9080000000000007 " "
y[1] (analytic) = 2.172951141577918 " "
y[1] (numeric) = 2.172951141577911 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.2699434523140264000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9090000000000007 " "
y[1] (analytic) = 2.1743546530668483 " "
y[1] (numeric) = 2.174354653066841 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.26783275560822400000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9100000000000007 " "
y[1] (analytic) = 2.1757579902011397 " "
y[1] (numeric) = 2.1757579902011326 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.26572504368656150000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9110000000000007 " "
y[1] (analytic) = 2.177161151577456 " "
y[1] (numeric) = 2.1771611515774487 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.26362031237457330000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9120000000000007 " "
y[1] (analytic) = 2.1785641357926355 " "
y[1] (numeric) = 2.178564135792628 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.46536346734832000000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9130000000000007 " "
y[1] (analytic) = 2.179966941443693 " "
y[1] (numeric) = 2.1799669414436864 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.055706038982150000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9140000000000007 " "
y[1] (analytic) = 2.1813695671278257 " "
y[1] (numeric) = 2.181369567127818 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.4609067079776820000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9150000000000007 " "
y[1] (analytic) = 2.182772011442405 " "
y[1] (numeric) = 2.182772011442398 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.2552311099617040000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9160000000000007 " "
y[1] (analytic) = 2.1841742729849893 " "
y[1] (numeric) = 2.184174272984982 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.4564625455154550000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9170000000000007 " "
y[1] (analytic) = 2.185576350353315 " "
y[1] (numeric) = 2.185576350353308 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.2510542843549510000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9180000000000007 " "
y[1] (analytic) = 2.1869782421453063 " "
y[1] (numeric) = 2.1869782421452992 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.248970300971520400000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9190000000000007 " "
y[1] (analytic) = 2.188379946959071 " "
y[1] (numeric) = 2.188379946959064 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.2468892650357910000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9200000000000007 " "
y[1] (analytic) = 2.1897814633929045 " "
y[1] (numeric) = 2.1897814633928974 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.244811172431640000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9210000000000007 " "
y[1] (analytic) = 2.1911827900452896 " "
y[1] (numeric) = 2.191182790045283 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.0400650178588050000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9220000000000007 " "
y[1] (analytic) = 2.192583925514902 " "
y[1] (numeric) = 2.1925839255148944 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.4432052883349273000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9230000000000007 " "
y[1] (analytic) = 2.193984868400604 " "
y[1] (numeric) = 2.1939848684005967 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.23859451354411470000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9240000000000007 " "
y[1] (analytic) = 2.1953856173014534 " "
y[1] (numeric) = 2.1953856173014468 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.03424514365680850000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9250000000000007 " "
y[1] (analytic) = 2.1967861708167025 " "
y[1] (numeric) = 2.196786170816696 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.03231067103560850000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9260000000000007 " "
y[1] (analytic) = 2.198186527545797 " "
y[1] (numeric) = 2.1981865275457904 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.03037893476132970000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9270000000000007 " "
y[1] (analytic) = 2.199586686088381 " "
y[1] (numeric) = 2.1995866860883737 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.23034659308512550000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9280000000000007 " "
y[1] (analytic) = 2.2009866450442948 " "
y[1] (numeric) = 2.2009866450442876 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.22829189972572760000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9290000000000007 " "
y[1] (analytic) = 2.2023864030135805 " "
y[1] (numeric) = 2.2023864030135734 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.22624011294224630000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9300000000000007 " "
y[1] (analytic) = 2.20378595859648 " "
y[1] (numeric) = 2.2037859585964727 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.22419122868276200000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9310000000000007 " "
y[1] (analytic) = 2.205185310393438 " "
y[1] (numeric) = 2.2051853103934307 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.2221452429017350000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9320000000000007 " "
y[1] (analytic) = 2.2065844570051025 " "
y[1] (numeric) = 2.2065844570050954 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.22010215156000760000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9330000000000007 " "
y[1] (analytic) = 2.207983397032327 " "
y[1] (numeric) = 2.2079833970323204 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 3.0169330787107410000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9340000000000007 " "
y[1] (analytic) = 2.2093821290761726 " "
y[1] (numeric) = 2.2093821290761655 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.2160246360696570000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9350000000000007 " "
y[1] (analytic) = 2.210780651737906 " "
y[1] (numeric) = 2.210780651737899 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.213990203874540000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9360000000000007 " "
y[1] (analytic) = 2.2121789636190057 " "
y[1] (numeric) = 2.212178963618998 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.4127060656523295000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9370000000000007 " "
y[1] (analytic) = 2.213577063321159 " "
y[1] (numeric) = 2.213577063321152 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.20992997051582850000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9380000000000007 " "
y[1] (analytic) = 2.214974949446267 " "
y[1] (numeric) = 2.2149749494462596 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.4083981714278110000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9390000000000007 " "
y[1] (analytic) = 2.216372620596443 " "
y[1] (numeric) = 2.216372620596436 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.2058812185149970000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9400000000000007 " "
y[1] (analytic) = 2.217770075374017 " "
y[1] (numeric) = 2.2177700753740095 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.4041024591685287000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9410000000000007 " "
y[1] (analytic) = 2.2191673123815336 " "
y[1] (numeric) = 2.219167312381526 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.4019591606858990000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9420000000000007 " "
y[1] (analytic) = 2.220564330221756 " "
y[1] (numeric) = 2.2205643302217486 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.39981889500005350000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9430000000000007 " "
y[1] (analytic) = 2.221961127497667 " "
y[1] (numeric) = 2.2219611274976594 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.3976816578934460000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9440000000000007 " "
y[1] (analytic) = 2.2233577028124683 " "
y[1] (numeric) = 2.223357702812461 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.1958093601460930000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9450000000000007 " "
y[1] (analytic) = 2.224754054769586 " "
y[1] (numeric) = 2.2247540547695785 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.39341625258121170000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9460000000000007 " "
y[1] (analytic) = 2.2261501819726672 " "
y[1] (numeric) = 2.22615018197266 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.1918005420930950000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9470000000000007 " "
y[1] (analytic) = 2.2275460830255858 " "
y[1] (numeric) = 2.227546083025578 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.3891629111424987000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9480000000000007 " "
y[1] (analytic) = 2.2289417565324396 " "
y[1] (numeric) = 2.2289417565324325 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.1878030624967524000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9490000000000007 " "
y[1] (analytic) = 2.2303372010975564 " "
y[1] (numeric) = 2.2303372010975493 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.1858085647786340000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9500000000000007 " "
y[1] (analytic) = 2.2317324153254914 " "
y[1] (numeric) = 2.2317324153254843 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.18381688987776630000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9510000000000007 " "
y[1] (analytic) = 2.23312739782103 " "
y[1] (numeric) = 2.2331273978210233 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 2.98296378175769400000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9520000000000007 " "
y[1] (analytic) = 2.2345221471891907 " "
y[1] (numeric) = 2.2345221471891836 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.17984199285692050000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9530000000000007 " "
y[1] (analytic) = 2.2359166620352235 " "
y[1] (numeric) = 2.2359166620352164 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.1778587629171070000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9540000000000007 " "
y[1] (analytic) = 2.2373109409646137 " "
y[1] (numeric) = 2.237310940964607 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 2.977385943895180000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9550000000000007 " "
y[1] (analytic) = 2.238704982583083 " "
y[1] (numeric) = 2.238704982583076 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.17390072067582240000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9560000000000007 " "
y[1] (analytic) = 2.2400987854965893 " "
y[1] (numeric) = 2.2400987854965826 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 2.97368053180486900000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9570000000000007 " "
y[1] (analytic) = 2.2414923483113305 " "
y[1] (numeric) = 2.241492348311324 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 2.97183175876972350000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9580000000000007 " "
y[1] (analytic) = 2.242885669633744 " "
y[1] (numeric) = 2.2428856696337367 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.1679846430876235000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9590000000000007 " "
y[1] (analytic) = 2.244278748070507 " "
y[1] (numeric) = 2.2442787480705 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 2.96814206055194760000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9600000000000007 " "
y[1] (analytic) = 2.2456715822285425 " "
y[1] (numeric) = 2.245671582228536 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 2.9663011281197277000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9610000000000007 " "
y[1] (analytic) = 2.2470641707150167 " "
y[1] (numeric) = 2.2470641707150096 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.1620936554473440000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9620000000000007 " "
y[1] (analytic) = 2.2484565121373405 " "
y[1] (numeric) = 2.2484565121373334 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.16013555042997800000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9630000000000007 " "
y[1] (analytic) = 2.249848605103173 " "
y[1] (numeric) = 2.249848605103166 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.1581802177641030000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9640000000000007 " "
y[1] (analytic) = 2.251240448220421 " "
y[1] (numeric) = 2.251240448220414 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.15622765361103840000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9650000000000007 " "
y[1] (analytic) = 2.252632040097242 " "
y[1] (numeric) = 2.2526320400972346 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.3514202200218930000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9660000000000007 " "
y[1] (analytic) = 2.254023379342044 " "
y[1] (numeric) = 2.2540233793420366 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.34935149148931630000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9670000000000007 " "
y[1] (analytic) = 2.2554144645634873 " "
y[1] (numeric) = 2.25541446456348 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.15038653393410140000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9680000000000007 " "
y[1] (analytic) = 2.256805294370488 " "
y[1] (numeric) = 2.2568052943704804 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.3452228184163857000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9690000000000007 " "
y[1] (analytic) = 2.258195867372215 " "
y[1] (numeric) = 2.258195867372208 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 3.1465062266141436000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9700000000000008 " "
y[1] (analytic) = 2.259586182178097 " "
y[1] (numeric) = 2.2595861821780896 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.34110583034890550000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 0.9710000000000008 " "
y[1] (analytic) = 2.260976237397818 " "
y[1] (numeric) = 2.2609762373978106 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 3.33905170809750960000000000000E-13 "%"
h = 1.000E-3 " "
"Finished!"
"Maximum Time Reached before Solution Completed!"
"diff ( y , x , 1 ) = cos ( x ) + sin ( x ) ;"
Iterations = 971
"Total Elapsed Time "= 15 Minutes 3 Seconds
"Elapsed Time(since restart) "= 15 Minutes 2 Seconds
"Expected Time Remaining "= 2 Hours 19 Minutes 50 Seconds
"Optimized Time Remaining "= 2 Hours 19 Minutes 46 Seconds
"Time to Timeout " Unknown
Percent Done = 9.720000000000008 "%"
(%o49) true
(%o49) diffeq.max