(%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 : exp(array_x ),
1 1
array_tmp2 : array_tmp1 + array_const_0D0 ,
1 1 1
if not array_y_set_initial then (if 1 <= glob_max_terms
1, 2
1
then (temporary : array_tmp2 glob_h factorial_3(0, 1),
1
array_y : temporary, array_y_higher : temporary,
2 1, 2
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 2,
glob_h 2, 1
array_tmp1 : att(1, array_tmp1, array_x, 1),
2
array_tmp2 : array_tmp1 + array_const_0D0 ,
2 2 2
if not array_y_set_initial then (if 2 <= glob_max_terms
1, 3
1
then (temporary : array_tmp2 glob_h factorial_3(1, 2),
2
array_y : temporary, array_y_higher : temporary,
3 1, 3
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 3,
glob_h 2, 2
array_tmp1 : att(2, array_tmp1, array_x, 1),
3
array_tmp2 : array_tmp1 + array_const_0D0 ,
3 3 3
if not array_y_set_initial then (if 3 <= glob_max_terms
1, 4
1
then (temporary : array_tmp2 glob_h factorial_3(2, 3),
3
array_y : temporary, array_y_higher : temporary,
4 1, 4
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 4,
glob_h 2, 3
array_tmp1 : att(3, array_tmp1, array_x, 1),
4
array_tmp2 : array_tmp1 + array_const_0D0 ,
4 4 4
if not array_y_set_initial then (if 4 <= glob_max_terms
1, 5
1
then (temporary : array_tmp2 glob_h factorial_3(3, 4),
4
array_y : temporary, array_y_higher : temporary,
5 1, 5
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 5,
glob_h 2, 4
array_tmp1 : att(4, array_tmp1, array_x, 1),
5
array_tmp2 : array_tmp1 + array_const_0D0 ,
5 5 5
if not array_y_set_initial then (if 5 <= glob_max_terms
1, 6
1
then (temporary : array_tmp2 glob_h factorial_3(4, 5),
5
array_y : temporary, array_y_higher : temporary,
6 1, 6
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 6,
glob_h 2, 5
while kkk <= glob_max_terms do (array_tmp1 :
kkk
att(kkk - 1, array_tmp1, array_x, 1), array_tmp2 :
kkk
array_tmp1 + array_const_0D0 , order_d : 1,
kkk kkk
if 1 + order_d + kkk <= glob_max_terms
then (if not array_y_set_initial
1, order_d + kkk
order_d
array_tmp2 glob_h
kkk
then (temporary : -----------------------------------------,
factorial_3(kkk - 1, - 1 + order_d + kkk)
array_y : temporary, array_y_higher : temporary,
order_d + kkk 1, order_d + kkk
term : - 1 + order_d + kkk, adj2 : 2, while (adj2 <= 1 + order_d)
temporary convfp(adj2)
and (term >= 1) do (temporary : ----------------------,
glob_h
array_y_higher : temporary, adj2 : 1 + adj2, term : term - 1))),
adj2, term
kkk : 1 + kkk))
(%o8) atomall() := (array_tmp1 : exp(array_x ),
1 1
array_tmp2 : array_tmp1 + array_const_0D0 ,
1 1 1
if not array_y_set_initial then (if 1 <= glob_max_terms
1, 2
1
then (temporary : array_tmp2 glob_h factorial_3(0, 1),
1
array_y : temporary, array_y_higher : temporary,
2 1, 2
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 2,
glob_h 2, 1
array_tmp1 : att(1, array_tmp1, array_x, 1),
2
array_tmp2 : array_tmp1 + array_const_0D0 ,
2 2 2
if not array_y_set_initial then (if 2 <= glob_max_terms
1, 3
1
then (temporary : array_tmp2 glob_h factorial_3(1, 2),
2
array_y : temporary, array_y_higher : temporary,
3 1, 3
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 3,
glob_h 2, 2
array_tmp1 : att(2, array_tmp1, array_x, 1),
3
array_tmp2 : array_tmp1 + array_const_0D0 ,
3 3 3
if not array_y_set_initial then (if 3 <= glob_max_terms
1, 4
1
then (temporary : array_tmp2 glob_h factorial_3(2, 3),
3
array_y : temporary, array_y_higher : temporary,
4 1, 4
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 4,
glob_h 2, 3
array_tmp1 : att(3, array_tmp1, array_x, 1),
4
array_tmp2 : array_tmp1 + array_const_0D0 ,
4 4 4
if not array_y_set_initial then (if 4 <= glob_max_terms
1, 5
1
then (temporary : array_tmp2 glob_h factorial_3(3, 4),
4
array_y : temporary, array_y_higher : temporary,
5 1, 5
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 5,
glob_h 2, 4
array_tmp1 : att(4, array_tmp1, array_x, 1),
5
array_tmp2 : array_tmp1 + array_const_0D0 ,
5 5 5
if not array_y_set_initial then (if 5 <= glob_max_terms
1, 6
1
then (temporary : array_tmp2 glob_h factorial_3(4, 5),
5
array_y : temporary, array_y_higher : temporary,
6 1, 6
temporary 2.0
temporary : -------------, array_y_higher : temporary)), kkk : 6,
glob_h 2, 5
while kkk <= glob_max_terms do (array_tmp1 :
kkk
att(kkk - 1, array_tmp1, array_x, 1), array_tmp2 :
kkk
array_tmp1 + array_const_0D0 , order_d : 1,
kkk kkk
if 1 + order_d + kkk <= glob_max_terms
then (if not array_y_set_initial
1, order_d + kkk
order_d
array_tmp2 glob_h
kkk
then (temporary : -----------------------------------------,
factorial_3(kkk - 1, - 1 + order_d + kkk)
array_y : temporary, array_y_higher : temporary,
order_d + kkk 1, order_d + kkk
term : - 1 + order_d + kkk, adj2 : 2, while (adj2 <= 1 + order_d)
temporary convfp(adj2)
and (term >= 1) do (temporary : ----------------------,
glob_h
array_y_higher : temporary, adj2 : 1 + adj2, term : term - 1))),
adj2, term
kkk : 1 + kkk))
log(x)
(%i9) log10(x) := ---------
log(10.0)
log(x)
(%o9) log10(x) := ---------
log(10.0)
(%i10) omniout_str(iolevel, str) := if glob_iolevel >= iolevel
then printf(true, "~a~%", string(str))
(%o10) omniout_str(iolevel, str) := if glob_iolevel >= iolevel
then printf(true, "~a~%", string(str))
(%i11) omniout_str_noeol(iolevel, str) :=
if glob_iolevel >= iolevel then printf(true, "~a", string(str))
(%o11) omniout_str_noeol(iolevel, str) :=
if glob_iolevel >= iolevel then printf(true, "~a", string(str))
(%i12) omniout_labstr(iolevel, label, str) :=
if glob_iolevel >= iolevel then printf(true, "~a = ~a~%", string(label),
string(str))
(%o12) omniout_labstr(iolevel, label, str) :=
if glob_iolevel >= iolevel then printf(true, "~a = ~a~%", string(label),
string(str))
(%i13) omniout_float(iolevel, prelabel, prelen, value, vallen, postlabel) :=
if glob_iolevel >= iolevel then (if vallen = 4
then printf(true, "~a = ~g ~s ~%", prelabel, value, postlabel)
else printf(true, "~a = ~g ~s ~%", prelabel, value, postlabel))
(%o13) omniout_float(iolevel, prelabel, prelen, value, vallen, postlabel) :=
if glob_iolevel >= iolevel then (if vallen = 4
then printf(true, "~a = ~g ~s ~%", prelabel, value, postlabel)
else printf(true, "~a = ~g ~s ~%", prelabel, value, postlabel))
(%i14) omniout_int(iolevel, prelabel, prelen, value, vallen, postlabel) :=
if glob_iolevel >= iolevel then (printf(true, "~a = ~d ~a~%", prelabel, value,
postlabel), newline())
(%o14) omniout_int(iolevel, prelabel, prelen, value, vallen, postlabel) :=
if glob_iolevel >= iolevel then (printf(true, "~a = ~d ~a~%", prelabel, value,
postlabel), newline())
(%i15) omniout_float_arr(iolevel, prelabel, elemnt, prelen, value, vallen,
postlabel) := if glob_iolevel >= iolevel
then (sprint(prelabel, "[", elemnt, "]=", value, postlabel), newline())
(%o15) omniout_float_arr(iolevel, prelabel, elemnt, prelen, value, vallen,
postlabel) := if glob_iolevel >= iolevel
then (sprint(prelabel, "[", elemnt, "]=", value, postlabel), newline())
(%i16) dump_series(iolevel, dump_label, series_name, array_series, numb) :=
if glob_iolevel >= iolevel then (i : 1,
while i <= numb do (sprint(dump_label, series_name, "i = ", i, "series = ",
array_series ), newline(), i : 1 + i))
i
(%o16) dump_series(iolevel, dump_label, series_name, array_series, numb) :=
if glob_iolevel >= iolevel then (i : 1,
while i <= numb do (sprint(dump_label, series_name, "i = ", i, "series = ",
array_series ), newline(), i : 1 + i))
i
(%i17) dump_series_2(iolevel, dump_label, series_name, array_series2, numb,
subnum) := if glob_iolevel >= iolevel then (sub : 1,
while sub <= subnum do (i : 1, while i <=
num do (sprint(dump_label, series_name, "sub = ", sub, "i = ", i,
"series2 = ", array_series2 ), i : 1 + i), sub : 1 + sub))
sub, i
(%o17) dump_series_2(iolevel, dump_label, series_name, array_series2, numb,
subnum) := if glob_iolevel >= iolevel then (sub : 1,
while sub <= subnum do (i : 1, while i <=
num do (sprint(dump_label, series_name, "sub = ", sub, "i = ", i,
"series2 = ", array_series2 ), i : 1 + i), sub : 1 + sub))
sub, i
(%i18) cs_info(iolevel, str) := if glob_iolevel >= iolevel
then sprint(concat("cs_info ", str, " glob_correct_start_flag = ",
glob_correct_start_flag, "glob_h := ", glob_h, "glob_reached_optimal_h := ",
glob_reached_optimal_h))
(%o18) cs_info(iolevel, str) := if glob_iolevel >= iolevel
then sprint(concat("cs_info ", str, " glob_correct_start_flag = ",
glob_correct_start_flag, "glob_h := ", glob_h, "glob_reached_optimal_h := ",
glob_reached_optimal_h))
(%i19) logitem_time(fd, secs_in) := (secs : secs_in, printf(fd, "| "),
if secs >= 0.0 then (sec_in_millinium :
sec_in_min min_in_hour hours_in_day days_in_year years_in_century
secs
centuries_in_millinium, milliniums : ----------------,
sec_in_millinium
millinium_int : floor(milliniums), centuries :
(milliniums - millinium_int) centuries_in_millinium,
cent_int : floor(centuries), years : (centuries - cent_int) years_in_century,
years_int : floor(years), days : (years - years_int) days_in_year,
days_int : floor(days), hours : (days - days_int) hours_in_day,
hours_int : floor(hours), minutes : (hours - hours_int) min_in_hour,
minutes_int : floor(minutes), seconds : (minutes - minutes_int) sec_in_min,
sec_int : floor(seconds), if millinium_int > 0 then printf(fd, "~d Millinia ~d\
Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", millinium_int,
cent_int, years_int, days_int, hours_int, minutes_int, sec_int)
elseif cent_int > 0 then printf(fd,
"~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", cent_int,
years_int, days_int, hours_int, minutes_int, sec_int) elseif years_int > 0
then printf(fd, "~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", years_int,
days_int, hours_int, minutes_int, sec_int) elseif days_int > 0
then printf(fd, "~d Days ~d Hours ~d Minutes ~d Seconds", days_int,
hours_int, minutes_int, sec_int) elseif hours_int > 0
then printf(fd, "~d Hours ~d Minutes ~d Seconds", hours_int, minutes_int,
sec_int) elseif minutes_int > 0 then printf(fd, "~d Minutes ~d Seconds",
minutes_int, sec_int) else printf(fd, "~d Seconds", sec_int))
else printf(fd, "Unknown"), printf(fd, " | "))
(%o19) logitem_time(fd, secs_in) := (secs : secs_in, printf(fd, ""),
if secs >= 0.0 then (sec_in_millinium :
sec_in_min min_in_hour hours_in_day days_in_year years_in_century
secs
centuries_in_millinium, milliniums : ----------------,
sec_in_millinium
millinium_int : floor(milliniums), centuries :
(milliniums - millinium_int) centuries_in_millinium,
cent_int : floor(centuries), years : (centuries - cent_int) years_in_century,
years_int : floor(years), days : (years - years_int) days_in_year,
days_int : floor(days), hours : (days - days_int) hours_in_day,
hours_int : floor(hours), minutes : (hours - hours_int) min_in_hour,
minutes_int : floor(minutes), seconds : (minutes - minutes_int) sec_in_min,
sec_int : floor(seconds), if millinium_int > 0 then printf(fd, "~d Millinia ~d\
Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", millinium_int,
cent_int, years_int, days_int, hours_int, minutes_int, sec_int)
elseif cent_int > 0 then printf(fd,
"~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", cent_int,
years_int, days_int, hours_int, minutes_int, sec_int) elseif years_int > 0
then printf(fd, "~d Years ~d Days ~d Hours ~d Minutes ~d Seconds", years_int,
days_int, hours_int, minutes_int, sec_int) elseif days_int > 0
then printf(fd, "~d Days ~d Hours ~d Minutes ~d Seconds", days_int,
hours_int, minutes_int, sec_int) elseif hours_int > 0
then printf(fd, "~d Hours ~d Minutes ~d Seconds", hours_int, minutes_int,
sec_int) elseif minutes_int > 0 then printf(fd, "~d Minutes ~d Seconds",
minutes_int, sec_int) else printf(fd, "~d Seconds", sec_int))
else printf(fd, "Unknown"), printf(fd, " | "))
(%i20) omniout_timestr(secs_in) := (secs : convfloat(secs_in),
if secs >= convfloat(0.0) then (sec_in_millinium :
convfloat(sec_in_min) convfloat(min_in_hour) convfloat(hours_in_day)
convfloat(days_in_year) convfloat(years_in_century)
secs
convfloat(centuries_in_millinium), milliniums : ---------------------------,
convfloat(sec_in_millinium)
millinium_int : floor(milliniums), centuries :
(milliniums - millinium_int) convfloat(centuries_in_millinium),
cent_int : floor(centuries), years : (centuries - cent_int)
convfloat(years_in_century), years_int : floor(years),
days : (years - years_int) convfloat(days_in_year), days_int : floor(days),
hours : (days - days_int) convfloat(hours_in_day), hours_int : floor(hours),
minutes : (hours - hours_int) convfloat(min_in_hour),
minutes_int : floor(minutes), seconds :
(minutes - minutes_int) convfloat(sec_in_min), sec_int : floor(seconds),
if millinium_int > 0 then printf(true,
"= ~d Millinia ~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%",
millinium_int, cent_int, years_int, days_int, hours_int, minutes_int, sec_int)
elseif cent_int > 0 then printf(true,
"= ~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%", cent_int,
years_int, days_int, hours_int, minutes_int, sec_int) elseif years_int > 0
then printf(true, "= ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%",
years_int, days_int, hours_int, minutes_int, sec_int) elseif days_int > 0
then printf(true, "= ~d Days ~d Hours ~d Minutes ~d Seconds~%", days_int,
hours_int, minutes_int, sec_int) elseif hours_int > 0
then printf(true, "= ~d Hours ~d Minutes ~d Seconds~%", hours_int,
minutes_int, sec_int) elseif minutes_int > 0
then printf(true, "= ~d Minutes ~d Seconds~%", minutes_int, sec_int)
else printf(true, "= ~d Seconds~%", sec_int)) else printf(true, " Unknown~%"))
(%o20) omniout_timestr(secs_in) := (secs : convfloat(secs_in),
if secs >= convfloat(0.0) then (sec_in_millinium :
convfloat(sec_in_min) convfloat(min_in_hour) convfloat(hours_in_day)
convfloat(days_in_year) convfloat(years_in_century)
secs
convfloat(centuries_in_millinium), milliniums : ---------------------------,
convfloat(sec_in_millinium)
millinium_int : floor(milliniums), centuries :
(milliniums - millinium_int) convfloat(centuries_in_millinium),
cent_int : floor(centuries), years : (centuries - cent_int)
convfloat(years_in_century), years_int : floor(years),
days : (years - years_int) convfloat(days_in_year), days_int : floor(days),
hours : (days - days_int) convfloat(hours_in_day), hours_int : floor(hours),
minutes : (hours - hours_int) convfloat(min_in_hour),
minutes_int : floor(minutes), seconds :
(minutes - minutes_int) convfloat(sec_in_min), sec_int : floor(seconds),
if millinium_int > 0 then printf(true,
"= ~d Millinia ~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%",
millinium_int, cent_int, years_int, days_int, hours_int, minutes_int, sec_int)
elseif cent_int > 0 then printf(true,
"= ~d Centuries ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%", cent_int,
years_int, days_int, hours_int, minutes_int, sec_int) elseif years_int > 0
then printf(true, "= ~d Years ~d Days ~d Hours ~d Minutes ~d Seconds~%",
years_int, days_int, hours_int, minutes_int, sec_int) elseif days_int > 0
then printf(true, "= ~d Days ~d Hours ~d Minutes ~d Seconds~%", days_int,
hours_int, minutes_int, sec_int) elseif hours_int > 0
then printf(true, "= ~d Hours ~d Minutes ~d Seconds~%", hours_int,
minutes_int, sec_int) elseif minutes_int > 0
then printf(true, "= ~d Minutes ~d Seconds~%", minutes_int, sec_int)
else printf(true, "= ~d Seconds~%", sec_int)) else printf(true, " Unknown~%"))
(%i21) mode_declare(ats, bfloat)
modedeclare: bfloat
is not a built-in type; assuming it is a Maxima extension type.
(%o21) [ats]
(%i22) ats(mmm_ats, array_a, array_b, jjj_ats) :=
(ret_ats : 0.0, if jjj_ats <= mmm_ats then (ma_ats : 1 + mmm_ats,
iii_ats : jjj_ats, while iii_ats <= mmm_ats do (lll_ats : ma_ats - iii_ats,
ret_ats : array_a array_b + ret_ats, iii_ats : 1 + iii_ats)),
iii_ats lll_ats
ret_ats)
(%o22) ats(mmm_ats, array_a, array_b, jjj_ats) :=
(ret_ats : 0.0, if jjj_ats <= mmm_ats then (ma_ats : 1 + mmm_ats,
iii_ats : jjj_ats, while iii_ats <= mmm_ats do (lll_ats : ma_ats - iii_ats,
ret_ats : array_a array_b + ret_ats, iii_ats : 1 + iii_ats)),
iii_ats lll_ats
ret_ats)
(%i23) mode_declare(att, bfloat)
modedeclare: bfloat
is not a built-in type; assuming it is a Maxima extension type.
(%o23) [att]
(%i24) att(mmm_att, array_aa, array_bb, jjj_att) :=
(ret_att : 0.0, if jjj_att <= mmm_att then (ma_att : 2 + mmm_att,
iii_att : jjj_att, while iii_att <= mmm_att do (lll_att : ma_att - iii_att,
al_att : lll_att - 1, if lll_att <= glob_max_terms
then ret_att : array_aa array_bb convfp(al_att) + ret_att,
iii_att lll_att
ret_att
iii_att : 1 + iii_att), ret_att : ---------------), ret_att)
convfp(mmm_att)
(%o24) att(mmm_att, array_aa, array_bb, jjj_att) :=
(ret_att : 0.0, if jjj_att <= mmm_att then (ma_att : 2 + mmm_att,
iii_att : jjj_att, while iii_att <= mmm_att do (lll_att : ma_att - iii_att,
al_att : lll_att - 1, if lll_att <= glob_max_terms
then ret_att : array_aa array_bb convfp(al_att) + ret_att,
iii_att lll_att
ret_att
iii_att : 1 + iii_att), ret_att : ---------------), ret_att)
convfp(mmm_att)
(%i25) display_pole() := if (array_pole # glob_large_float)
1
and (array_pole > 0.0) and (array_pole # glob_large_float)
1 2
and (array_pole > 0.0) and glob_display_flag
2
then (omniout_float(ALWAYS, "Radius of convergence ", 4,
array_pole , 4, " "), omniout_float(ALWAYS,
1
"Order of pole ", 4, array_pole , 4, " "))
2
(%o25) display_pole() := if (array_pole # glob_large_float)
1
and (array_pole > 0.0) and (array_pole # glob_large_float)
1 2
and (array_pole > 0.0) and glob_display_flag
2
then (omniout_float(ALWAYS, "Radius of convergence ", 4,
array_pole , 4, " "), omniout_float(ALWAYS,
1
"Order of pole ", 4, array_pole , 4, " "))
2
(%i26) logditto(file) := (printf(file, ""), printf(file, "ditto"),
printf(file, " | "))
(%o26) logditto(file) := (printf(file, ""), printf(file, "ditto"),
printf(file, " | "))
(%i27) logitem_integer(file, n) := (printf(file, ""),
printf(file, "~d", n), printf(file, " | "))
(%o27) logitem_integer(file, n) := (printf(file, ""),
printf(file, "~d", n), printf(file, " | "))
(%i28) logitem_str(file, str) := (printf(file, ""), printf(file, str),
printf(file, " | "))
(%o28) logitem_str(file, str) := (printf(file, ""), printf(file, str),
printf(file, " | "))
(%i29) log_revs(file, revs) := printf(file, revs)
(%o29) log_revs(file, revs) := printf(file, revs)
(%i30) logitem_float(file, x) := (printf(file, ""), printf(file, "~g", x),
printf(file, " | "))
(%o30) logitem_float(file, x) := (printf(file, ""), printf(file, "~g", x),
printf(file, " | "))
(%i31) logitem_pole(file, pole) := (printf(file, ""),
if pole = 0 then printf(file, "NA") elseif pole = 1 then printf(file, "Real")
elseif pole = 2 then printf(file, "Complex") else printf(file, "No Pole"),
printf(file, " | "))
(%o31) logitem_pole(file, pole) := (printf(file, ""),
if pole = 0 then printf(file, "NA") elseif pole = 1 then printf(file, "Real")
elseif pole = 2 then printf(file, "Complex") else printf(file, "No Pole"),
printf(file, " | "))
(%i32) logstart(file) := printf(file, "")
(%o32) logstart(file) := printf(file, "
")
(%i33) logend(file) := printf(file, "
~%")
(%o33) logend(file) := printf(file, "~%")
(%i34) chk_data() := (errflag : false,
if (glob_max_terms < 15) or (glob_max_terms > 512)
then (omniout_str(ALWAYS, "Illegal max_terms = -- Using 30"),
glob_max_terms : 30), if glob_max_iter < 2
then (omniout_str(ALWAYS, "Illegal max_iter"), errflag : true),
if errflag then quit())
(%o34) chk_data() := (errflag : false,
if (glob_max_terms < 15) or (glob_max_terms > 512)
then (omniout_str(ALWAYS, "Illegal max_terms = -- Using 30"),
glob_max_terms : 30), if glob_max_iter < 2
then (omniout_str(ALWAYS, "Illegal max_iter"), errflag : true),
if errflag then quit())
(%i35) mode_declare(comp_expect_sec, bfloat)
modedeclare: bfloat
is not a built-in type; assuming it is a Maxima extension type.
(%o35) [comp_expect_sec]
(%i36) comp_expect_sec(t_end2, t_start2, t2, clock_sec) :=
(ms2 : clock_sec, sub1 : t_end2 - t_start2, sub2 : t2 - t_start2,
if sub1 = 0.0 then sec_left : 0.0 else (if abs(sub2) > 0.0
sub1
then (rrr : ----, sec_left : rrr ms2 - ms2) else sec_left : 0.0), sec_left)
sub2
(%o36) comp_expect_sec(t_end2, t_start2, t2, clock_sec) :=
(ms2 : clock_sec, sub1 : t_end2 - t_start2, sub2 : t2 - t_start2,
if sub1 = 0.0 then sec_left : 0.0 else (if abs(sub2) > 0.0
sub1
then (rrr : ----, sec_left : rrr ms2 - ms2) else sec_left : 0.0), sec_left)
sub2
(%i37) mode_declare(comp_percent, bfloat)
modedeclare: bfloat
is not a built-in type; assuming it is a Maxima extension type.
(%o37) [comp_percent]
(%i38) comp_percent(t_end2, t_start2, t2) :=
(sub1 : t_end2 - t_start2, sub2 : t2 - t_start2,
100.0 sub2
if abs(sub2) > glob_small_float then rrr : ---------- else rrr : 0.0, rrr)
sub1
(%o38) comp_percent(t_end2, t_start2, t2) :=
(sub1 : t_end2 - t_start2, sub2 : t2 - t_start2,
100.0 sub2
if abs(sub2) > glob_small_float then rrr : ---------- else rrr : 0.0, rrr)
sub1
(%i39) factorial_1(nnn) := (if nnn <= glob_max_terms then ret : array_fact_1
nnn
else ret : nnn!, ret)
(%o39) factorial_1(nnn) := (if nnn <= glob_max_terms then ret : array_fact_1
nnn
else ret : nnn!, ret)
(%i40) factorial_3(mmm, nnn) := (if (nnn <= glob_max_terms)
mmm!
and (mmm <= glob_max_terms) then ret : array_fact_2 else ret : ----,
mmm, nnn nnn!
ret)
(%o40) factorial_3(mmm, nnn) := (if (nnn <= glob_max_terms)
mmm!
and (mmm <= glob_max_terms) then ret : array_fact_2 else ret : ----,
mmm, nnn nnn!
ret)
(%i41) convfp(mmm) := mmm
(%o41) convfp(mmm) := mmm
(%i42) convfloat(mmm) := mmm
(%o42) convfloat(mmm) := mmm
(%i43) elapsed_time_seconds() := (t : elapsed_real_time(), t)
(%o43) elapsed_time_seconds() := (t : elapsed_real_time(), t)
(%i44) arcsin(x) := asin(x)
(%o44) arcsin(x) := asin(x)
(%i45) arccos(x) := acos(x)
(%o45) arccos(x) := acos(x)
(%i46) arctan(x) := atan(x)
(%o46) arctan(x) := atan(x)
(%i47) exact_soln_y(x) := exp(x) + 1.0
(%o47) exact_soln_y(x) := exp(x) + 1.0
(%i48) mainprog() := (define_variable(glob_iolevel, 5, fixnum),
define_variable(glob_max_terms, 30, fixnum),
define_variable(DEBUGMASSIVE, 4, fixnum), define_variable(DEBUGL, 3, fixnum),
define_variable(ALWAYS, 1, fixnum), define_variable(INFO, 2, fixnum),
define_variable(glob_start, 0, fixnum),
define_variable(glob_orig_start_sec, 0.0, float),
define_variable(glob_max_sec, 10000.0, float),
define_variable(glob_warned, false, boolean),
define_variable(glob_optimal_clock_start_sec, 0.0, float),
define_variable(glob_hmax, 1.0, float),
define_variable(glob_not_yet_start_msg, true, boolean),
define_variable(glob_clock_sec, 0.0, float),
define_variable(glob_almost_1, 0.999, float),
define_variable(glob_display_flag, true, boolean),
define_variable(glob_subiter_method, 3, fixnum),
define_variable(glob_iter, 0, fixnum),
define_variable(glob_hmin, 1.0E-11, float),
define_variable(glob_h, 0.1, float), define_variable(glob_not_yet_finished,
true, boolean), define_variable(glob_max_opt_iter, 10, fixnum),
define_variable(glob_html_log, true, boolean),
define_variable(glob_log10normmin, 0.1, float),
define_variable(glob_current_iter, 0, fixnum),
define_variable(glob_smallish_float, 1.0E-101, float),
define_variable(glob_small_float, 1.0E-51, float),
define_variable(glob_max_iter, 1000, fixnum),
define_variable(glob_relerr, 1.0E-11, float),
define_variable(glob_look_poles, false, boolean),
define_variable(glob_clock_start_sec, 0.0, float),
define_variable(djd_debug, true, boolean),
define_variable(glob_percent_done, 0.0, float),
define_variable(MAX_UNCHANGED, 10, fixnum),
define_variable(glob_optimal_start, 0.0, float),
define_variable(glob_abserr, 1.0E-11, float),
define_variable(glob_disp_incr, 0.1, float),
define_variable(glob_dump, false, boolean),
define_variable(glob_max_minutes, 0.0, float),
define_variable(glob_log10abserr, 0.0, float),
define_variable(glob_warned2, false, boolean),
define_variable(years_in_century, 100.0, float),
define_variable(min_in_hour, 60.0, float),
define_variable(glob_max_rel_trunc_err, 1.0E-11, float),
define_variable(glob_log10_relerr, 1.0E-11, float),
define_variable(glob_log10_abserr, 1.0E-11, float),
define_variable(glob_last_good_h, 0.1, float),
define_variable(glob_optimal_done, false, boolean),
define_variable(glob_normmax, 0.0, float),
define_variable(glob_curr_iter_when_opt, 0, fixnum),
define_variable(glob_initial_pass, true, boolean),
define_variable(centuries_in_millinium, 10.0, float),
define_variable(glob_unchanged_h_cnt, 0, fixnum),
define_variable(glob_max_hours, 0.0, float),
define_variable(glob_hmin_init, 0.001, float),
define_variable(glob_reached_optimal_h, false, boolean),
define_variable(days_in_year, 365.0, float),
define_variable(hours_in_day, 24.0, float),
define_variable(glob_max_trunc_err, 1.0E-11, float),
define_variable(djd_debug2, true, boolean),
define_variable(glob_log10relerr, 0.0, float),
define_variable(sec_in_min, 60.0, float),
define_variable(glob_optimal_expect_sec, 0.1, float),
define_variable(glob_no_eqs, 0, fixnum),
define_variable(glob_dump_analytic, false, boolean),
define_variable(glob_large_float, 9.0E+100, 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/exppostode.ode#################"),
omniout_str(ALWAYS, "diff ( y , x , 1 ) = exp ( 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 : 1.0,"), 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 : 10,"),
omniout_str(ALWAYS, "/* END SECOND INPUT BLOCK */"),
omniout_str(ALWAYS, "/* BEGIN OVERRIDE BLOCK */"),
omniout_str(ALWAYS, "glob_h : 0.001 ,"),
omniout_str(ALWAYS, "glob_look_poles : true,"),
omniout_str(ALWAYS, "glob_max_iter : 1000,"),
omniout_str(ALWAYS, "glob_max_minutes : 15,"),
omniout_str(ALWAYS, "/* END OVERRIDE BLOCK */"), omniout_str(ALWAYS, "!"),
omniout_str(ALWAYS, "/* BEGIN USER DEF BLOCK */"),
omniout_str(ALWAYS, "exact_soln_y (x) := ("),
omniout_str(ALWAYS, "1.0 + exp(x)"), omniout_str(ALWAYS, ");"),
omniout_str(ALWAYS, ""), 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_pole, 1 + max_terms), array(array_norms, 1 + max_terms),
array(array_y, 1 + max_terms), array(array_x, 1 + max_terms),
array(array_type_pole, 1 + max_terms), array(array_tmp0, 1 + max_terms),
array(array_tmp1, 1 + max_terms), array(array_tmp2, 1 + max_terms),
array(array_1st_rel_error, 1 + max_terms), array(array_fact_1, 1 + max_terms),
array(array_last_rel_error, 1 + max_terms), array(array_m1, 1 + max_terms),
array(array_y_init, 1 + max_terms), array(array_y_higher_work, 1 + 2,
1 + max_terms), array(array_real_pole, 1 + 1, 1 + 3),
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_y_higher, 1 + 2, 1 + max_terms), array(array_poles, 1 + 1, 1 + 3),
array(array_y_set_initial, 1 + 2, 1 + max_terms), term : 1,
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_y : 0.0, term : 1 + term),
term
term : 1, while term <= max_terms do (array_x : 0.0, term : 1 + term),
term
term : 1, while term <= max_terms do (array_type_pole : 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_1st_rel_error : 0.0, term : 1 + term), term : 1,
term
while term <= max_terms do (array_fact_1 : 0.0, term : 1 + term),
term
term : 1, while term <= max_terms do (array_last_rel_error : 0.0,
term
term : 1 + term), term : 1, while term <= max_terms do (array_m1 : 0.0,
term
term : 1 + term), term : 1, while term <=
max_terms do (array_y_init : 0.0, term : 1 + term), ord : 1,
term
while ord <= 2 do (term : 1, while term <=
max_terms do (array_y_higher_work : 0.0, term : 1 + term),
ord, term
ord : 1 + ord), ord : 1, while ord <= 1 do (term : 1,
while term <= 3 do (array_real_pole : 0.0, term : 1 + term),
ord, term
ord : 1 + ord), ord : 1, while ord <= 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 <= 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 <= 1 do (term : 1,
while term <= 3 do (array_poles : 0.0, term : 1 + term),
ord, term
ord : 1 + ord), ord : 1, while ord <= 2 do (term : 1,
while term <= max_terms do (array_y_set_initial : 0.0,
ord, term
term : 1 + term), ord : 1 + ord), array(array_x, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_x : 0.0, term : 1 + term),
term
array(array_y, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_y : 0.0, term : 1 + term),
term
array(array_tmp2, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_tmp2 : 0.0, term : 1 + term),
term
array(array_tmp1, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_tmp1 : 0.0, term : 1 + term),
term
array(array_tmp0, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_tmp0 : 0.0, term : 1 + term),
term
array(array_const_1, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_const_1 : 0.0, term : 1 + term),
term
array_const_1 : 1, array(array_const_0D0, 1 + 1 + max_terms), term : 1,
1
while term <= 1 + max_terms do (array_const_0D0 : 0.0, term : 1 + term),
term
array_const_0D0 : 0.0, array(array_m1, 1 + 1 + max_terms), term : 1,
1
while term <= max_terms do (array_m1 : 0.0, term : 1 + term),
term
array_m1 : - 1.0, iiif : 0, while iiif <= glob_max_terms do (jjjf : 0,
1
while jjjf <= glob_max_terms do (temp1 : iiif!, temp2 : jjjf!,
temp1
array_fact_1 : temp1, array_fact_2 : -----, jjjf : 1 + jjjf),
iiif iiif, jjjf temp2
iiif : 1 + iiif), x_start : 1.0, 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 : 10, glob_h : 0.001,
glob_look_poles : true, glob_max_iter : 1000, glob_max_minutes : 15,
glob_last_good_h : glob_h, glob_max_terms : max_terms,
glob_max_sec : convfloat(3600.0) convfloat(glob_max_hours)
+ convfloat(60.0) convfloat(glob_max_minutes),
glob_log10_abserr glob_log10_relerr
glob_abserr : 10.0 , glob_relerr : 10.0 ,
chk_data(), array_y_set_initial : true, array_y_set_initial : 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 ) = exp ( 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,
"2012-06-16T22:00:18-05:00"), logitem_str(html_log_file, "Maxima"),
logitem_str(html_log_file, "exp"),
logitem_str(html_log_file, "diff ( y , x , 1 ) = exp ( x ) ;"),
logitem_float(html_log_file, x_start), logitem_float(html_log_file, x_end),
logitem_float(html_log_file, array_x ), logitem_float(html_log_file, glob_h),
1
logitem_str(html_log_file, "16"), logitem_integer(html_log_file,
glob_max_terms), logitem_float(html_log_file, array_1st_rel_error ),
1
logitem_float(html_log_file, array_last_rel_error ),
1
logitem_integer(html_log_file, glob_iter),
logitem_pole(html_log_file, array_type_pole ),
1
if (array_type_pole = 1) or (array_type_pole = 2)
1 1
then (logitem_float(html_log_file, array_pole ),
1
logitem_float(html_log_file, array_pole ), 0)
2
else (logitem_str(html_log_file, "NA"), logitem_str(html_log_file, "NA"), 0),
logitem_time(html_log_file, convfloat(glob_clock_sec)),
if glob_percent_done < 100.0 then (logitem_time(html_log_file,
convfloat(glob_optimal_expect_sec)), 0)
else (logitem_str(html_log_file, "Done"), 0),
log_revs(html_log_file, " 091 | "),
logitem_str(html_log_file, "exp diffeq.max"),
logitem_str(html_log_file,
"exp maxima results"),
logitem_str(html_log_file,
"Test of revised logic - mostly for speeding factorials"),
logend(html_log_file)), if glob_html_log then close(html_log_file))
(%o48) mainprog() := (define_variable(glob_iolevel, 5, fixnum),
define_variable(glob_max_terms, 30, fixnum),
define_variable(DEBUGMASSIVE, 4, fixnum), define_variable(DEBUGL, 3, fixnum),
define_variable(ALWAYS, 1, fixnum), define_variable(INFO, 2, fixnum),
define_variable(glob_start, 0, fixnum),
define_variable(glob_orig_start_sec, 0.0, float),
define_variable(glob_max_sec, 10000.0, float),
define_variable(glob_warned, false, boolean),
define_variable(glob_optimal_clock_start_sec, 0.0, float),
define_variable(glob_hmax, 1.0, float),
define_variable(glob_not_yet_start_msg, true, boolean),
define_variable(glob_clock_sec, 0.0, float),
define_variable(glob_almost_1, 0.999, float),
define_variable(glob_display_flag, true, boolean),
define_variable(glob_subiter_method, 3, fixnum),
define_variable(glob_iter, 0, fixnum),
define_variable(glob_hmin, 1.0E-11, float),
define_variable(glob_h, 0.1, float), define_variable(glob_not_yet_finished,
true, boolean), define_variable(glob_max_opt_iter, 10, fixnum),
define_variable(glob_html_log, true, boolean),
define_variable(glob_log10normmin, 0.1, float),
define_variable(glob_current_iter, 0, fixnum),
define_variable(glob_smallish_float, 1.0E-101, float),
define_variable(glob_small_float, 1.0E-51, float),
define_variable(glob_max_iter, 1000, fixnum),
define_variable(glob_relerr, 1.0E-11, float),
define_variable(glob_look_poles, false, boolean),
define_variable(glob_clock_start_sec, 0.0, float),
define_variable(djd_debug, true, boolean),
define_variable(glob_percent_done, 0.0, float),
define_variable(MAX_UNCHANGED, 10, fixnum),
define_variable(glob_optimal_start, 0.0, float),
define_variable(glob_abserr, 1.0E-11, float),
define_variable(glob_disp_incr, 0.1, float),
define_variable(glob_dump, false, boolean),
define_variable(glob_max_minutes, 0.0, float),
define_variable(glob_log10abserr, 0.0, float),
define_variable(glob_warned2, false, boolean),
define_variable(years_in_century, 100.0, float),
define_variable(min_in_hour, 60.0, float),
define_variable(glob_max_rel_trunc_err, 1.0E-11, float),
define_variable(glob_log10_relerr, 1.0E-11, float),
define_variable(glob_log10_abserr, 1.0E-11, float),
define_variable(glob_last_good_h, 0.1, float),
define_variable(glob_optimal_done, false, boolean),
define_variable(glob_normmax, 0.0, float),
define_variable(glob_curr_iter_when_opt, 0, fixnum),
define_variable(glob_initial_pass, true, boolean),
define_variable(centuries_in_millinium, 10.0, float),
define_variable(glob_unchanged_h_cnt, 0, fixnum),
define_variable(glob_max_hours, 0.0, float),
define_variable(glob_hmin_init, 0.001, float),
define_variable(glob_reached_optimal_h, false, boolean),
define_variable(days_in_year, 365.0, float),
define_variable(hours_in_day, 24.0, float),
define_variable(glob_max_trunc_err, 1.0E-11, float),
define_variable(djd_debug2, true, boolean),
define_variable(glob_log10relerr, 0.0, float),
define_variable(sec_in_min, 60.0, float),
define_variable(glob_optimal_expect_sec, 0.1, float),
define_variable(glob_no_eqs, 0, fixnum),
define_variable(glob_dump_analytic, false, boolean),
define_variable(glob_large_float, 9.0E+100, 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/exppostode.ode#################"),
omniout_str(ALWAYS, "diff ( y , x , 1 ) = exp ( 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 : 1.0,"), 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 : 10,"),
omniout_str(ALWAYS, "/* END SECOND INPUT BLOCK */"),
omniout_str(ALWAYS, "/* BEGIN OVERRIDE BLOCK */"),
omniout_str(ALWAYS, "glob_h : 0.001 ,"),
omniout_str(ALWAYS, "glob_look_poles : true,"),
omniout_str(ALWAYS, "glob_max_iter : 1000,"),
omniout_str(ALWAYS, "glob_max_minutes : 15,"),
omniout_str(ALWAYS, "/* END OVERRIDE BLOCK */"), omniout_str(ALWAYS, "!"),
omniout_str(ALWAYS, "/* BEGIN USER DEF BLOCK */"),
omniout_str(ALWAYS, "exact_soln_y (x) := ("),
omniout_str(ALWAYS, "1.0 + exp(x)"), omniout_str(ALWAYS, ");"),
omniout_str(ALWAYS, ""), 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_pole, 1 + max_terms), array(array_norms, 1 + max_terms),
array(array_y, 1 + max_terms), array(array_x, 1 + max_terms),
array(array_type_pole, 1 + max_terms), array(array_tmp0, 1 + max_terms),
array(array_tmp1, 1 + max_terms), array(array_tmp2, 1 + max_terms),
array(array_1st_rel_error, 1 + max_terms), array(array_fact_1, 1 + max_terms),
array(array_last_rel_error, 1 + max_terms), array(array_m1, 1 + max_terms),
array(array_y_init, 1 + max_terms), array(array_y_higher_work, 1 + 2,
1 + max_terms), array(array_real_pole, 1 + 1, 1 + 3),
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_y_higher, 1 + 2, 1 + max_terms), array(array_poles, 1 + 1, 1 + 3),
array(array_y_set_initial, 1 + 2, 1 + max_terms), term : 1,
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_y : 0.0, term : 1 + term),
term
term : 1, while term <= max_terms do (array_x : 0.0, term : 1 + term),
term
term : 1, while term <= max_terms do (array_type_pole : 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_1st_rel_error : 0.0, term : 1 + term), term : 1,
term
while term <= max_terms do (array_fact_1 : 0.0, term : 1 + term),
term
term : 1, while term <= max_terms do (array_last_rel_error : 0.0,
term
term : 1 + term), term : 1, while term <= max_terms do (array_m1 : 0.0,
term
term : 1 + term), term : 1, while term <=
max_terms do (array_y_init : 0.0, term : 1 + term), ord : 1,
term
while ord <= 2 do (term : 1, while term <=
max_terms do (array_y_higher_work : 0.0, term : 1 + term),
ord, term
ord : 1 + ord), ord : 1, while ord <= 1 do (term : 1,
while term <= 3 do (array_real_pole : 0.0, term : 1 + term),
ord, term
ord : 1 + ord), ord : 1, while ord <= 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 <= 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 <= 1 do (term : 1,
while term <= 3 do (array_poles : 0.0, term : 1 + term),
ord, term
ord : 1 + ord), ord : 1, while ord <= 2 do (term : 1,
while term <= max_terms do (array_y_set_initial : 0.0,
ord, term
term : 1 + term), ord : 1 + ord), array(array_x, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_x : 0.0, term : 1 + term),
term
array(array_y, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_y : 0.0, term : 1 + term),
term
array(array_tmp2, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_tmp2 : 0.0, term : 1 + term),
term
array(array_tmp1, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_tmp1 : 0.0, term : 1 + term),
term
array(array_tmp0, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_tmp0 : 0.0, term : 1 + term),
term
array(array_const_1, 1 + 1 + max_terms), term : 1,
while term <= 1 + max_terms do (array_const_1 : 0.0, term : 1 + term),
term
array_const_1 : 1, array(array_const_0D0, 1 + 1 + max_terms), term : 1,
1
while term <= 1 + max_terms do (array_const_0D0 : 0.0, term : 1 + term),
term
array_const_0D0 : 0.0, array(array_m1, 1 + 1 + max_terms), term : 1,
1
while term <= max_terms do (array_m1 : 0.0, term : 1 + term),
term
array_m1 : - 1.0, iiif : 0, while iiif <= glob_max_terms do (jjjf : 0,
1
while jjjf <= glob_max_terms do (temp1 : iiif!, temp2 : jjjf!,
temp1
array_fact_1 : temp1, array_fact_2 : -----, jjjf : 1 + jjjf),
iiif iiif, jjjf temp2
iiif : 1 + iiif), x_start : 1.0, 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 : 10, glob_h : 0.001,
glob_look_poles : true, glob_max_iter : 1000, glob_max_minutes : 15,
glob_last_good_h : glob_h, glob_max_terms : max_terms,
glob_max_sec : convfloat(3600.0) convfloat(glob_max_hours)
+ convfloat(60.0) convfloat(glob_max_minutes),
glob_log10_abserr glob_log10_relerr
glob_abserr : 10.0 , glob_relerr : 10.0 ,
chk_data(), array_y_set_initial : true, array_y_set_initial : 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 ) = exp ( 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,
"2012-06-16T22:00:18-05:00"), logitem_str(html_log_file, "Maxima"),
logitem_str(html_log_file, "exp"),
logitem_str(html_log_file, "diff ( y , x , 1 ) = exp ( x ) ;"),
logitem_float(html_log_file, x_start), logitem_float(html_log_file, x_end),
logitem_float(html_log_file, array_x ), logitem_float(html_log_file, glob_h),
1
logitem_str(html_log_file, "16"), logitem_integer(html_log_file,
glob_max_terms), logitem_float(html_log_file, array_1st_rel_error ),
1
logitem_float(html_log_file, array_last_rel_error ),
1
logitem_integer(html_log_file, glob_iter),
logitem_pole(html_log_file, array_type_pole ),
1
if (array_type_pole = 1) or (array_type_pole = 2)
1 1
then (logitem_float(html_log_file, array_pole ),
1
logitem_float(html_log_file, array_pole ), 0)
2
else (logitem_str(html_log_file, "NA"), logitem_str(html_log_file, "NA"), 0),
logitem_time(html_log_file, convfloat(glob_clock_sec)),
if glob_percent_done < 100.0 then (logitem_time(html_log_file,
convfloat(glob_optimal_expect_sec)), 0)
else (logitem_str(html_log_file, "Done"), 0),
log_revs(html_log_file, " 091 | "),
logitem_str(html_log_file, "exp diffeq.max"),
logitem_str(html_log_file,
"exp maxima results"),
logitem_str(html_log_file,
"Test of revised logic - mostly for speeding factorials"),
logend(html_log_file)), if glob_html_log then close(html_log_file))
(%i49) mainprog()
"##############ECHO OF PROBLEM#################"
"##############temp/exppostode.ode#################"
"diff ( y , x , 1 ) = exp ( x ) ;"
"!"
"/* BEGIN FIRST INPUT BLOCK */"
"max_terms : 30,"
"Digits : 32,"
"!"
"/* END FIRST INPUT BLOCK */"
"/* BEGIN SECOND INPUT BLOCK */"
"x_start : 1.0,"
"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 : 10,"
"/* END SECOND INPUT BLOCK */"
"/* BEGIN OVERRIDE BLOCK */"
"glob_h : 0.001 ,"
"glob_look_poles : true,"
"glob_max_iter : 1000,"
"glob_max_minutes : 15,"
"/* END OVERRIDE BLOCK */"
"!"
"/* BEGIN USER DEF BLOCK */"
"exact_soln_y (x) := ("
"1.0 + exp(x)"
");"
""
"/* END USER DEF BLOCK */"
"#######END OF ECHO OF PROBLEM#################"
"START of Soultion"
x[1] = 1. " "
y[1] (analytic) = 3.718281828459045 " "
y[1] (numeric) = 3.718281828459045 " "
absolute error = 0.0 " "
relative error = 0.0 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.001 " "
y[1] (analytic) = 3.7210014698815783 " "
y[1] (numeric) = 3.7210014698815788 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 1.19346690251158600000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0019999999999998 " "
y[1] (analytic) = 3.7237238323058084 " "
y[1] (numeric) = 3.723723832305809 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 1.192594375547644200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0029999999999997 " "
y[1] (analytic) = 3.7264489184540976 " "
y[1] (numeric) = 3.726448918454098 " "
absolute error = 4.4408920985006260000000000000000E-16 " "
relative error = 1.19172225238576790000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0039999999999996 " "
y[1] (analytic) = 3.7291767310515325 " "
y[1] (numeric) = 3.7291767310515334 " "
absolute error = 8.8817841970012520000000000000000E-16 " "
relative error = 2.38170106636292800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0049999999999994 " "
y[1] (analytic) = 3.7319072728259255 " "
y[1] (numeric) = 3.731907272825927 " "
absolute error = 1.3322676295501878000000000000000E-15 " "
relative error = 3.56993765426907300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0059999999999993 " "
y[1] (analytic) = 3.734640546507819 " "
y[1] (numeric) = 3.734640546507821 " "
absolute error = 1.7763568394002505000000000000000E-15 " "
relative error = 4.75643322905944200000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0069999999999992 " "
y[1] (analytic) = 3.7373765548304876 " "
y[1] (numeric) = 3.7373765548304894 " "
absolute error = 1.7763568394002505000000000000000E-15 " "
relative error = 4.75295120344334350000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0079999999999991 " "
y[1] (analytic) = 3.7401153005299386 " "
y[1] (numeric) = 3.740115300529941 " "
absolute error = 2.220446049250313000000000000000E-15 " "
relative error = 5.93683849515467400000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.008999999999999 " "
y[1] (analytic) = 3.7428567863449187 " "
y[1] (numeric) = 3.742856786344921 " "
absolute error = 2.220446049250313000000000000000E-15 " "
relative error = 5.93249000963963300000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.009999999999999 " "
y[1] (analytic) = 3.7456010150169137 " "
y[1] (numeric) = 3.7456010150169163 " "
absolute error = 2.6645352591003757000000000000000E-15 " "
relative error = 7.11377225822420800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0109999999999988 " "
y[1] (analytic) = 3.7483479892901523 " "
y[1] (numeric) = 3.7483479892901554 " "
absolute error = 3.1086244689504383000000000000000E-15 " "
relative error = 8.29331875757655500000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0119999999999987 " "
y[1] (analytic) = 3.7510977119116093 " "
y[1] (numeric) = 3.751097711911613 " "
absolute error = 3.552713678800501000000000000000E-15 " "
relative error = 9.47113072399809800000000000000E-14 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0129999999999986 " "
y[1] (analytic) = 3.7538501856310074 " "
y[1] (numeric) = 3.7538501856310114 " "
absolute error = 3.9968028886505635000000000000000E-15 " "
relative error = 1.06472093743898750000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0139999999999985 " "
y[1] (analytic) = 3.7566054132008206 " "
y[1] (numeric) = 3.756605413200825 " "
absolute error = 4.440892098500626000000000000000E-15 " "
relative error = 1.18215559262498050000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0149999999999983 " "
y[1] (analytic) = 3.759363397376277 " "
y[1] (numeric) = 3.7593633973762817 " "
absolute error = 4.884981308350689000000000000000E-15 " "
relative error = 1.29941715976699680000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0159999999999982 " "
y[1] (analytic) = 3.7621241409153607 " "
y[1] (numeric) = 3.7621241409153656 " "
absolute error = 4.884981308350689000000000000000E-15 " "
relative error = 1.29846361400560440000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0169999999999981 " "
y[1] (analytic) = 3.7648876465788153 " "
y[1] (numeric) = 3.7648876465788206 " "
absolute error = 5.329070518200751000000000000000E-15 " "
relative error = 1.41546601610895940000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.017999999999998 " "
y[1] (analytic) = 3.7676539171301466 " "
y[1] (numeric) = 3.7676539171301524 " "
absolute error = 5.773159728050814000000000000000E-15 " "
relative error = 1.5322956553420058000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.018999999999998 " "
y[1] (analytic) = 3.770422955335626 " "
y[1] (numeric) = 3.7704229553356323 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 1.64895265373416060000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0199999999999978 " "
y[1] (analytic) = 3.773194763964292 " "
y[1] (numeric) = 3.773194763964298 " "
absolute error = 6.217248937900877000000000000000E-15 " "
relative error = 1.64774132448141870000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0209999999999977 " "
y[1] (analytic) = 3.7759693457879524 " "
y[1] (numeric) = 3.775969345787959 " "
absolute error = 6.661338147750939000000000000000E-15 " "
relative error = 1.7641398903785010000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0219999999999976 " "
y[1] (analytic) = 3.77874670358119 " "
y[1] (numeric) = 3.7787467035811972 " "
absolute error = 7.105427357601002000000000000000E-15 " "
relative error = 1.88036614120418640000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0229999999999975 " "
y[1] (analytic) = 3.781526840121363 " "
y[1] (numeric) = 3.7815268401213706 " "
absolute error = 7.549516567451064000000000000000E-15 " "
relative error = 1.9964201992041852000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0239999999999974 " "
y[1] (analytic) = 3.784309758188608 " "
y[1] (numeric) = 3.784309758188616 " "
absolute error = 7.993605777301127000000000000000E-15 " "
relative error = 2.11230218668128660000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0249999999999972 " "
y[1] (analytic) = 3.787095460565843 " "
y[1] (numeric) = 3.787095460565851 " "
absolute error = 7.993605777301127000000000000000E-15 " "
relative error = 2.11074842462692370000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0259999999999971 " "
y[1] (analytic) = 3.789883950038771 " "
y[1] (numeric) = 3.7898839500387793 " "
absolute error = 8.43769498715119000000000000000E-15 " "
relative error = 2.22637291758362970000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.026999999999997 " "
y[1] (analytic) = 3.7926752293958814 " "
y[1] (numeric) = 3.79267522939589 " "
absolute error = 8.43769498715119000000000000000E-15 " "
relative error = 2.22473438320085040000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.027999999999997 " "
y[1] (analytic) = 3.795469301428454 " "
y[1] (numeric) = 3.795469301428463 " "
absolute error = 8.881784197001252000000000000000E-15 " "
relative error = 2.34010170854458630000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0289999999999968 " "
y[1] (analytic) = 3.798266168930561 " "
y[1] (numeric) = 3.79826616893057 " "
absolute error = 8.881784197001252000000000000000E-15 " "
relative error = 2.3383785658976092000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0299999999999967 " "
y[1] (analytic) = 3.80106583469907 " "
y[1] (numeric) = 3.801065834699079 " "
absolute error = 9.325873406851315000000000000000E-15 " "
relative error = 2.45348905081241330000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0309999999999966 " "
y[1] (analytic) = 3.803868301533647 " "
y[1] (numeric) = 3.8038683015336567 " "
absolute error = 9.769962616701378000000000000000E-15 " "
relative error = 2.56842820051428060000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0319999999999965 " "
y[1] (analytic) = 3.8066735722367593 " "
y[1] (numeric) = 3.8066735722367695 " "
absolute error = 1.02140518265514400000000000000E-14 " "
relative error = 2.68319613771079800000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0329999999999964 " "
y[1] (analytic) = 3.809481649613678 " "
y[1] (numeric) = 3.809481649613688 " "
absolute error = 1.02140518265514400000000000000E-14 " "
relative error = 2.68121827744917830000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0339999999999963 " "
y[1] (analytic) = 3.81229253647248 " "
y[1] (numeric) = 3.8122925364724907 " "
absolute error = 1.065814103640150300000000000000E-14 " "
relative error = 2.79573011106421960000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0349999999999961 " "
y[1] (analytic) = 3.815106235624053 " "
y[1] (numeric) = 3.815106235624064 " "
absolute error = 1.110223024625156500000000000000E-14 " "
relative error = 2.91007105977365450000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.035999999999996 " "
y[1] (analytic) = 3.8179227498820962 " "
y[1] (numeric) = 3.8179227498821073 " "
absolute error = 1.110223024625156500000000000000E-14 " "
relative error = 2.9079242754700630000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.036999999999996 " "
y[1] (analytic) = 3.8207420820631244 " "
y[1] (numeric) = 3.8207420820631355 " "
absolute error = 1.110223024625156500000000000000E-14 " "
relative error = 2.90577851312501630000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0379999999999958 " "
y[1] (analytic) = 3.823564234986469 " "
y[1] (numeric) = 3.8235642349864807 " "
absolute error = 1.154631945610162800000000000000E-14 " "
relative error = 3.01977912400430500000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0389999999999957 " "
y[1] (analytic) = 3.8263892114742846 " "
y[1] (numeric) = 3.8263892114742966 " "
absolute error = 1.19904086659516900000000000000E-14 " "
relative error = 3.1336092601337490000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0399999999999956 " "
y[1] (analytic) = 3.829217014351547 " "
y[1] (numeric) = 3.8292170143515594 " "
absolute error = 1.243449787580175300000000000000E-14 " "
relative error = 3.24726904461105750000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0409999999999955 " "
y[1] (analytic) = 3.8320476464460596 " "
y[1] (numeric) = 3.832047646446072 " "
absolute error = 1.243449787580175300000000000000E-14 " "
relative error = 3.24487037298031240000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0419999999999954 " "
y[1] (analytic) = 3.8348811105884546 " "
y[1] (numeric) = 3.834881110588467 " "
absolute error = 1.243449787580175300000000000000E-14 " "
relative error = 3.24247284784630660000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0429999999999953 " "
y[1] (analytic) = 3.837717409612196 " "
y[1] (numeric) = 3.837717409612209 " "
absolute error = 1.287858708565181600000000000000E-14 " "
relative error = 3.35579348635604850000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0439999999999952 " "
y[1] (analytic) = 3.840556546353584 " "
y[1] (numeric) = 3.8405565463535973 " "
absolute error = 1.332267629550187800000000000000E-14 " "
relative error = 3.4689441841836943000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.044999999999995 " "
y[1] (analytic) = 3.843398523651755 " "
y[1] (numeric) = 3.8433985236517687 " "
absolute error = 1.376676550535194000000000000000E-14 " "
relative error = 3.58192506466168600000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.045999999999995 " "
y[1] (analytic) = 3.8462433443486868 " "
y[1] (numeric) = 3.8462433443487005 " "
absolute error = 1.376676550535194000000000000000E-14 " "
relative error = 3.579275743324859500000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0469999999999948 " "
y[1] (analytic) = 3.8490910112891994 " "
y[1] (numeric) = 3.849091011289214 " "
absolute error = 1.465494392505206600000000000000E-14 " "
relative error = 3.80737786715612040000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0479999999999947 " "
y[1] (analytic) = 3.851941527320961 " "
y[1] (numeric) = 3.8519415273209763 " "
absolute error = 1.50990331349021300000000000000E-14 " "
relative error = 3.91985003609428060000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0489999999999946 " "
y[1] (analytic) = 3.854794895294488 " "
y[1] (numeric) = 3.8547948952945035 " "
absolute error = 1.55431223447521920000000000000E-14 " "
relative error = 4.03215288152569000000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0499999999999945 " "
y[1] (analytic) = 3.857651118063148 " "
y[1] (numeric) = 3.857651118063164 " "
absolute error = 1.598721155460225400000000000000E-14 " "
relative error = 4.1442865270380190000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0509999999999944 " "
y[1] (analytic) = 3.8605101984831642 " "
y[1] (numeric) = 3.86051019848318 " "
absolute error = 1.598721155460225400000000000000E-14 " "
relative error = 4.14121728285649900000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0519999999999943 " "
y[1] (analytic) = 3.863372139413617 " "
y[1] (numeric) = 3.8633721394136336 " "
absolute error = 1.643130076445231700000000000000E-14 " "
relative error = 4.2530981151989830000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0529999999999942 " "
y[1] (analytic) = 3.8662369437164483 " "
y[1] (numeric) = 3.8662369437164648 " "
absolute error = 1.643130076445231700000000000000E-14 " "
relative error = 4.2499466545000760000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.053999999999994 " "
y[1] (analytic) = 3.869104614256462 " "
y[1] (numeric) = 3.8691046142564787 " "
absolute error = 1.68753899743023800000000000000E-14 " "
relative error = 4.3615750042326980000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.054999999999994 " "
y[1] (analytic) = 3.871975153901329 " "
y[1] (numeric) = 3.871975153901346 " "
absolute error = 1.68753899743023800000000000000E-14 " "
relative error = 4.35834149330711850000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0559999999999938 " "
y[1] (analytic) = 3.8748485655215887 " "
y[1] (numeric) = 3.8748485655216065 " "
absolute error = 1.776356839400250500000000000000E-14 " "
relative error = 4.5843258371598766000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0569999999999937 " "
y[1] (analytic) = 3.877724851990654 " "
y[1] (numeric) = 3.877724851990672 " "
absolute error = 1.776356839400250500000000000000E-14 " "
relative error = 4.5809254323146387000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0579999999999936 " "
y[1] (analytic) = 3.880604016184811 " "
y[1] (numeric) = 3.8806040161848294 " "
absolute error = 1.820765760385256700000000000000E-14 " "
relative error = 4.6919648405026640000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0589999999999935 " "
y[1] (analytic) = 3.8834860609832247 " "
y[1] (numeric) = 3.883486060983243 " "
absolute error = 1.820765760385256700000000000000E-14 " "
relative error = 4.688482800744940300000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0599999999999934 " "
y[1] (analytic) = 3.886370989267939 " "
y[1] (numeric) = 3.8863709892679577 " "
absolute error = 1.86517468137026300000000000000E-14 " "
relative error = 4.7992708017862157000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0609999999999933 " "
y[1] (analytic) = 3.8892588039238833 " "
y[1] (numeric) = 3.8892588039239024 " "
absolute error = 1.909583602355269200000000000000E-14 " "
relative error = 4.9098908008607840000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0619999999999932 " "
y[1] (analytic) = 3.8921495078388726 " "
y[1] (numeric) = 3.8921495078388917 " "
absolute error = 1.909583602355269200000000000000E-14 " "
relative error = 4.9062442193171840000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.062999999999993 " "
y[1] (analytic) = 3.8950431039036104 " "
y[1] (numeric) = 3.89504310390363 " "
absolute error = 1.953992523340275500000000000000E-14 " "
relative error = 5.016613349880480000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.063999999999993 " "
y[1] (analytic) = 3.8979395950116937 " "
y[1] (numeric) = 3.8979395950117133 " "
absolute error = 1.953992523340275500000000000000E-14 " "
relative error = 5.0128855917645730000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0649999999999928 " "
y[1] (analytic) = 3.900838984059613 " "
y[1] (numeric) = 3.900838984059633 " "
absolute error = 1.998401444325281800000000000000E-14 " "
relative error = 5.1230041857445250000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0659999999999927 " "
y[1] (analytic) = 3.9037412739467587 " "
y[1] (numeric) = 3.9037412739467787 " "
absolute error = 1.998401444325281800000000000000E-14 " "
relative error = 5.1191954181555140000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0669999999999926 " "
y[1] (analytic) = 3.90664646757542 " "
y[1] (numeric) = 3.9066464675754404 " "
absolute error = 2.04281036531028800000000000000E-14 " "
relative error = 5.2290638077064510000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0679999999999925 " "
y[1] (analytic) = 3.909554567850791 " "
y[1] (numeric) = 3.9095545678508117 " "
absolute error = 2.087219286295294300000000000000E-14 " "
relative error = 5.3387649413030360000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0689999999999924 " "
y[1] (analytic) = 3.9124655776809725 " "
y[1] (numeric) = 3.9124655776809933 " "
absolute error = 2.087219286295294300000000000000E-14 " "
relative error = 5.3347927153711780000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0699999999999923 " "
y[1] (analytic) = 3.915379499976974 " "
y[1] (numeric) = 3.9153794999769955 " "
absolute error = 2.131628207280300600000000000000E-14 " "
relative error = 5.4442441844854030000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0709999999999922 " "
y[1] (analytic) = 3.918296337652719 " "
y[1] (numeric) = 3.9182963376527407 " "
absolute error = 2.176037128265306800000000000000E-14 " "
relative error = 5.5535287297052060000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.071999999999992 " "
y[1] (analytic) = 3.9212160936250444 " "
y[1] (numeric) = 3.9212160936250666 " "
absolute error = 2.22044604925031300000000000000E-14 " "
relative error = 5.6626464755671720000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.072999999999992 " "
y[1] (analytic) = 3.924138770813707 " "
y[1] (numeric) = 3.9241387708137294 " "
absolute error = 2.22044604925031300000000000000E-14 " "
relative error = 5.6584289673065820000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0739999999999919 " "
y[1] (analytic) = 3.927064372141384 " "
y[1] (numeric) = 3.9270643721414067 " "
absolute error = 2.264854970235319300000000000000E-14 " "
relative error = 5.7672977970572950000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0749999999999917 " "
y[1] (analytic) = 3.9299929005336773 " "
y[1] (numeric) = 3.9299929005337 " "
absolute error = 2.264854970235319300000000000000E-14 " "
relative error = 5.7630001568902610000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0759999999999916 " "
y[1] (analytic) = 3.932924358919115 " "
y[1] (numeric) = 3.9329243589191383 " "
absolute error = 2.309263891220325600000000000000E-14 " "
relative error = 5.8716204037419630000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0769999999999915 " "
y[1] (analytic) = 3.9358587502291567 " "
y[1] (numeric) = 3.9358587502291797 " "
absolute error = 2.309263891220325600000000000000E-14 " "
relative error = 5.8672427995183360000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0779999999999914 " "
y[1] (analytic) = 3.9387960773981927 " "
y[1] (numeric) = 3.9387960773982162 " "
absolute error = 2.35367281220533200000000000000E-14 " "
relative error = 5.9756147968951760000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0789999999999913 " "
y[1] (analytic) = 3.941736343363551 " "
y[1] (numeric) = 3.941736343363575 " "
absolute error = 2.39808173319033800000000000000E-14 " "
relative error = 6.0838207436878290000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0799999999999912 " "
y[1] (analytic) = 3.944679551065498 " "
y[1] (numeric) = 3.9446795510655224 " "
absolute error = 2.442490654175344400000000000000E-14 " "
relative error = 6.1918607647498340000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.080999999999991 " "
y[1] (analytic) = 3.9476257034472413 " "
y[1] (numeric) = 3.947625703447266 " "
absolute error = 2.486899575160350700000000000000E-14 " "
relative error = 6.2997349849776290000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.081999999999991 " "
y[1] (analytic) = 3.9505748034549337 " "
y[1] (numeric) = 3.950574803454959 " "
absolute error = 2.53130849614535700000000000000E-14 " "
relative error = 6.4074435293102860000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0829999999999909 " "
y[1] (analytic) = 3.9535268540376753 " "
y[1] (numeric) = 3.953526854037701 " "
absolute error = 2.575717417130363000000000000000E-14 " "
relative error = 6.5149865227292510000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0839999999999907 " "
y[1] (analytic) = 3.956481858147517 " "
y[1] (numeric) = 3.9564818581475434 " "
absolute error = 2.620126338115369400000000000000E-14 " "
relative error = 6.6223640902580840000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0849999999999906 " "
y[1] (analytic) = 3.959439818739464 " "
y[1] (numeric) = 3.95943981873949 " "
absolute error = 2.620126338115369400000000000000E-14 " "
relative error = 6.6174167510128210000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0859999999999905 " "
y[1] (analytic) = 3.9624007387714757 " "
y[1] (numeric) = 3.9624007387715023 " "
absolute error = 2.664535259100375700000000000000E-14 " "
relative error = 6.7245476537199080000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0869999999999904 " "
y[1] (analytic) = 3.965364621204473 " "
y[1] (numeric) = 3.9653646212045 " "
absolute error = 2.70894418008538200000000000000E-14 " "
relative error = 6.8315134643596650000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0879999999999903 " "
y[1] (analytic) = 3.968331469002339 " "
y[1] (numeric) = 3.968331469002366 " "
absolute error = 2.70894418008538200000000000000E-14 " "
relative error = 6.8264060128183450000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0889999999999902 " "
y[1] (analytic) = 3.971301285131921 " "
y[1] (numeric) = 3.9713012851319482 " "
absolute error = 2.70894418008538200000000000000E-14 " "
relative error = 6.8213010939949230000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.08999999999999 " "
y[1] (analytic) = 3.974274072563036 " "
y[1] (numeric) = 3.9742740725630634 " "
absolute error = 2.753353101070388000000000000000E-14 " "
relative error = 6.9279396709918710000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.09099999999999 " "
y[1] (analytic) = 3.9772498342684712 " "
y[1] (numeric) = 3.977249834268499 " "
absolute error = 2.797762022055394500000000000000E-14 " "
relative error = 7.0344135737954770000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0919999999999899 " "
y[1] (analytic) = 3.9802285732239886 " "
y[1] (numeric) = 3.980228573224017 " "
absolute error = 2.84217094304040100000000000000E-14 " "
relative error = 7.1407229277243230000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0929999999999898 " "
y[1] (analytic) = 3.983210292408328 " "
y[1] (numeric) = 3.983210292408357 " "
absolute error = 2.88657986402540700000000000000E-14 " "
relative error = 7.2468678581369200000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0939999999999896 " "
y[1] (analytic) = 3.986194994803208 " "
y[1] (numeric) = 3.9861949948032374 " "
absolute error = 2.93098878501041300000000000000E-14 " "
relative error = 7.352848490431441000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0949999999999895 " "
y[1] (analytic) = 3.989182683393332 " "
y[1] (numeric) = 3.9891826833933615 " "
absolute error = 2.93098878501041300000000000000E-14 " "
relative error = 7.3473415925821080000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0959999999999894 " "
y[1] (analytic) = 3.9921733611663885 " "
y[1] (numeric) = 3.9921733611664183 " "
absolute error = 2.975397705995419500000000000000E-14 " "
relative error = 7.4530774012431690000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0969999999999893 " "
y[1] (analytic) = 3.9951670311130556 " "
y[1] (numeric) = 3.9951670311130854 " "
absolute error = 2.975397705995419500000000000000E-14 " "
relative error = 7.4474926400423170000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.0979999999999892 " "
y[1] (analytic) = 3.998163696227003 " "
y[1] (numeric) = 3.9981636962270333 " "
absolute error = 3.01980662698042600000000000000E-14 " "
relative error = 7.5529839606871630000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.098999999999989 " "
y[1] (analytic) = 4.001163359504897 " "
y[1] (numeric) = 4.001163359504927 " "
absolute error = 3.01980662698042600000000000000E-14 " "
relative error = 7.5473215053986100000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.099999999999989 " "
y[1] (analytic) = 4.0041660239464 " "
y[1] (numeric) = 4.004166023946431 " "
absolute error = 3.10862446895043830000000000000E-14 " "
relative error = 7.7634754662012250000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1009999999999889 " "
y[1] (analytic) = 4.007171692554177 " "
y[1] (numeric) = 4.007171692554210 " "
absolute error = 3.19744231092045100000000000000E-14 " "
relative error = 7.9792995065863940000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1019999999999888 " "
y[1] (analytic) = 4.010180368333899 " "
y[1] (numeric) = 4.0101803683339305 " "
absolute error = 3.19744231092045100000000000000E-14 " "
relative error = 7.9733129616034840000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1029999999999887 " "
y[1] (analytic) = 4.0131920542942385 " "
y[1] (numeric) = 4.0131920542942705 " "
absolute error = 3.19744231092045100000000000000E-14 " "
relative error = 7.9673294167396990000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1039999999999885 " "
y[1] (analytic) = 4.016206753446884 " "
y[1] (numeric) = 4.016206753446916 " "
absolute error = 3.19744231092045100000000000000E-14 " "
relative error = 7.9613488727298860000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1049999999999884 " "
y[1] (analytic) = 4.0192244688065335 " "
y[1] (numeric) = 4.019224468806566 " "
absolute error = 3.286260152890463400000000000000E-14 " "
relative error = 8.1763538672580870000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1059999999999883 " "
y[1] (analytic) = 4.022245203390904 " "
y[1] (numeric) = 4.022245203390937 " "
absolute error = 3.286260152890463400000000000000E-14 " "
relative error = 8.1702133676982760000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1069999999999882 " "
y[1] (analytic) = 4.02526896022073 " "
y[1] (numeric) = 4.025268960220763 " "
absolute error = 3.286260152890463400000000000000E-14 " "
relative error = 8.1640759545922550000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.107999999999988 " "
y[1] (analytic) = 4.028295742319768 " "
y[1] (numeric) = 4.028295742319801 " "
absolute error = 3.286260152890463400000000000000E-14 " "
relative error = 8.1579416286799490000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.108999999999988 " "
y[1] (analytic) = 4.031325552714800 " "
y[1] (numeric) = 4.031325552714835 " "
absolute error = 3.37507799486047600000000000000E-14 " "
relative error = 8.3721295904460250000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1099999999999879 " "
y[1] (analytic) = 4.034358394435639 " "
y[1] (numeric) = 4.034358394435673 " "
absolute error = 3.37507799486047600000000000000E-14 " "
relative error = 8.3658358154682750000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1109999999999878 " "
y[1] (analytic) = 4.037394270515124 " "
y[1] (numeric) = 4.037394270515159 " "
absolute error = 3.463895836830488400000000000000E-14 " "
relative error = 8.5795332453090740000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1119999999999877 " "
y[1] (analytic) = 4.040433183989133 " "
y[1] (numeric) = 4.040433183989168 " "
absolute error = 3.463895836830488400000000000000E-14 " "
relative error = 8.5730803582069690000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1129999999999876 " "
y[1] (analytic) = 4.043475137896580 " "
y[1] (numeric) = 4.043475137896615 " "
absolute error = 3.55271367880050100000000000000E-14 " "
relative error = 8.7862879271928120000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1139999999999874 " "
y[1] (analytic) = 4.046520135279417 " "
y[1] (numeric) = 4.0465201352794535 " "
absolute error = 3.641531520770513500000000000000E-14 " "
relative error = 8.999168171738410000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1149999999999873 " "
y[1] (analytic) = 4.049568179182645 " "
y[1] (numeric) = 4.049568179182681 " "
absolute error = 3.641531520770513500000000000000E-14 " "
relative error = 8.9923946446692780000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1159999999999872 " "
y[1] (analytic) = 4.052619272654304 " "
y[1] (numeric) = 4.052619272654342 " "
absolute error = 3.73034936274052600000000000000E-14 " "
relative error = 9.2047861192183890000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1169999999999871 " "
y[1] (analytic) = 4.055673418745492 " "
y[1] (numeric) = 4.0556734187455294 " "
absolute error = 3.73034936274052600000000000000E-14 " "
relative error = 9.1978544068629780000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.117999999999987 " "
y[1] (analytic) = 4.058730620510353 " "
y[1] (numeric) = 4.05873062051039 " "
absolute error = 3.73034936274052600000000000000E-14 " "
relative error = 9.1909262070500860000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.118999999999987 " "
y[1] (analytic) = 4.06179088100609 " "
y[1] (numeric) = 4.061790881006127 " "
absolute error = 3.73034936274052600000000000000E-14 " "
relative error = 9.1840015205719630000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1199999999999868 " "
y[1] (analytic) = 4.0648542032929615 " "
y[1] (numeric) = 4.064854203293 " "
absolute error = 3.819167204710538500000000000000E-14 " "
relative error = 9.395582261269321000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1209999999999867 " "
y[1] (analytic) = 4.0679205904342925 " "
y[1] (numeric) = 4.067920590434330 " "
absolute error = 3.819167204710538500000000000000E-14 " "
relative error = 9.3884998976904890000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1219999999999866 " "
y[1] (analytic) = 4.07099004549647 " "
y[1] (numeric) = 4.070990045496508 " "
absolute error = 3.819167204710538500000000000000E-14 " "
relative error = 9.3814211335040960000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1229999999999865 " "
y[1] (analytic) = 4.074062571548948 " "
y[1] (numeric) = 4.074062571548987 " "
absolute error = 3.90798504668055100000000000000E-14 " "
relative error = 9.5923540153060160000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1239999999999863 " "
y[1] (analytic) = 4.077138171664254 " "
y[1] (numeric) = 4.077138171664294 " "
absolute error = 3.996802888650563500000000000000E-14 " "
relative error = 9.802961588174731000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1249999999999862 " "
y[1] (analytic) = 4.080216848917988 " "
y[1] (numeric) = 4.080216848918028 " "
absolute error = 3.996802888650563500000000000000E-14 " "
relative error = 9.7955648845243480000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1259999999999861 " "
y[1] (analytic) = 4.083298606388828 " "
y[1] (numeric) = 4.083298606388869 " "
absolute error = 4.08562073062057600000000000000E-14 " "
relative error = 1.0005686883217688000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.126999999999986 " "
y[1] (analytic) = 4.086383447158532 " "
y[1] (numeric) = 4.086383447158573 " "
absolute error = 4.08562073062057600000000000000E-14 " "
relative error = 9.9981335169647720000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.127999999999986 " "
y[1] (analytic) = 4.089471374311940 " "
y[1] (numeric) = 4.089471374311981 " "
absolute error = 4.174438572590588600000000000000E-14 " "
relative error = 1.0207770615078447000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1289999999999858 " "
y[1] (analytic) = 4.09256239093698 " "
y[1] (numeric) = 4.092562390937020 " "
absolute error = 4.08562073062057600000000000000E-14 " "
relative error = 9.9830383518849320000000000000E-13 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1299999999999857 " "
y[1] (analytic) = 4.095656500124667 " "
y[1] (numeric) = 4.095656500124709 " "
absolute error = 4.174438572590588600000000000000E-14 " "
relative error = 1.019235517544873100000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1309999999999856 " "
y[1] (analytic) = 4.098753704969113 " "
y[1] (numeric) = 4.098753704969155 " "
absolute error = 4.26325641456060100000000000000E-14 " "
relative error = 1.040134812050808000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1319999999999855 " "
y[1] (analytic) = 4.101854008567523 " "
y[1] (numeric) = 4.101854008567565 " "
absolute error = 4.174438572590588600000000000000E-14 " "
relative error = 1.0176955503222343000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1329999999999854 " "
y[1] (analytic) = 4.104957414020200 " "
y[1] (numeric) = 4.104957414020242 " "
absolute error = 4.26325641456060100000000000000E-14 " "
relative error = 1.0385628849643465000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1339999999999852 " "
y[1] (analytic) = 4.108063924430548 " "
y[1] (numeric) = 4.108063924430591 " "
absolute error = 4.352074256530613600000000000000E-14 " "
relative error = 1.0593978907311890000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1349999999999851 " "
y[1] (analytic) = 4.111173542905080 " "
y[1] (numeric) = 4.111173542905124 " "
absolute error = 4.352074256530613600000000000000E-14 " "
relative error = 1.0585965810276413000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.135999999999985 " "
y[1] (analytic) = 4.114286272553416 " "
y[1] (numeric) = 4.11428627255346 " "
absolute error = 4.352074256530613600000000000000E-14 " "
relative error = 1.0577956827077133000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.136999999999985 " "
y[1] (analytic) = 4.117402116488282 " "
y[1] (numeric) = 4.117402116488327 " "
absolute error = 4.44089209850062600000000000000E-14 " "
relative error = 1.0785665263824772000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1379999999999848 " "
y[1] (analytic) = 4.120521077825526 " "
y[1] (numeric) = 4.12052107782557 " "
absolute error = 4.44089209850062600000000000000E-14 " "
relative error = 1.0777501230121521000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1389999999999847 " "
y[1] (analytic) = 4.123643159684107 " "
y[1] (numeric) = 4.123643159684152 " "
absolute error = 4.44089209850062600000000000000E-14 " "
relative error = 1.0769341396748845000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1399999999999846 " "
y[1] (analytic) = 4.126768365186107 " "
y[1] (numeric) = 4.126768365186153 " "
absolute error = 4.52970994047063870000000000000E-14 " "
relative error = 1.0976409479833647000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1409999999999845 " "
y[1] (analytic) = 4.129896697456735 " "
y[1] (numeric) = 4.12989669745678 " "
absolute error = 4.52970994047063870000000000000E-14 " "
relative error = 1.0968095021021027000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1419999999999844 " "
y[1] (analytic) = 4.1330281596243195 " "
y[1] (numeric) = 4.133028159624366 " "
absolute error = 4.61852778244065100000000000000E-14 " "
relative error = 1.1174682591227401000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1429999999999843 " "
y[1] (analytic) = 4.136162754820325 " "
y[1] (numeric) = 4.136162754820372 " "
absolute error = 4.70734562441066400000000000000E-14 " "
relative error = 1.1380948728201462000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1439999999999841 " "
y[1] (analytic) = 4.139300486179347 " "
y[1] (numeric) = 4.139300486179394 " "
absolute error = 4.70734562441066400000000000000E-14 " "
relative error = 1.1372321579764394000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.144999999999984 " "
y[1] (analytic) = 4.142441356839116 " "
y[1] (numeric) = 4.142441356839164 " "
absolute error = 4.79616346638067600000000000000E-14 " "
relative error = 1.1578108301913010000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.145999999999984 " "
y[1] (analytic) = 4.145585369940505 " "
y[1] (numeric) = 4.145585369940553 " "
absolute error = 4.79616346638067600000000000000E-14 " "
relative error = 1.1569327461345964000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1469999999999838 " "
y[1] (analytic) = 4.148732528627525 " "
y[1] (numeric) = 4.1487325286275745 " "
absolute error = 4.97379915032070130000000000000E-14 " "
relative error = 1.1988719725843891000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1479999999999837 " "
y[1] (analytic) = 4.151882836047337 " "
y[1] (numeric) = 4.1518828360473865 " "
absolute error = 4.97379915032070130000000000000E-14 " "
relative error = 1.197962309325627000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1489999999999836 " "
y[1] (analytic) = 4.155036295350246 " "
y[1] (numeric) = 4.155036295350297 " "
absolute error = 5.06261699229071400000000000000E-14 " "
relative error = 1.2184290659400760000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1499999999999835 " "
y[1] (analytic) = 4.158192909689715 " "
y[1] (numeric) = 4.158192909689766 " "
absolute error = 5.06261699229071400000000000000E-14 " "
relative error = 1.2175041183138582000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1509999999999834 " "
y[1] (analytic) = 4.161352682222357 " "
y[1] (numeric) = 4.161352682222407 " "
absolute error = 5.06261699229071400000000000000E-14 " "
relative error = 1.2165796506310635000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1519999999999833 " "
y[1] (analytic) = 4.164515616107944 " "
y[1] (numeric) = 4.164515616107995 " "
absolute error = 5.06261699229071400000000000000E-14 " "
relative error = 1.2156556629801077000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1529999999999831 " "
y[1] (analytic) = 4.167681714509410 " "
y[1] (numeric) = 4.167681714509461 " "
absolute error = 5.06261699229071400000000000000E-14 " "
relative error = 1.2147321554488352000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.153999999999983 " "
y[1] (analytic) = 4.170850980592856 " "
y[1] (numeric) = 4.170850980592907 " "
absolute error = 5.06261699229071400000000000000E-14 " "
relative error = 1.2138091281245199000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.154999999999983 " "
y[1] (analytic) = 4.174023417527546 " "
y[1] (numeric) = 4.174023417527597 " "
absolute error = 5.151434834260726000000000000000E-14 " "
relative error = 1.2341652930428798000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1559999999999828 " "
y[1] (analytic) = 4.1771990284859175 " "
y[1] (numeric) = 4.17719902848597 " "
absolute error = 5.24025267623073900000000000000E-14 " "
relative error = 1.2544895851252122000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1569999999999827 " "
y[1] (analytic) = 4.180377816643583 " "
y[1] (numeric) = 4.180377816643635 " "
absolute error = 5.24025267623073900000000000000E-14 " "
relative error = 1.2535356625823182000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1579999999999826 " "
y[1] (analytic) = 4.18355978517933 " "
y[1] (numeric) = 4.183559785179383 " "
absolute error = 5.24025267623073900000000000000E-14 " "
relative error = 1.2525822374511886000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1589999999999825 " "
y[1] (analytic) = 4.186744937275128 " "
y[1] (numeric) = 4.18674493727518 " "
absolute error = 5.24025267623073900000000000000E-14 " "
relative error = 1.2516293098192100000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1599999999999824 " "
y[1] (analytic) = 4.189933276116129 " "
y[1] (numeric) = 4.1899332761161805 " "
absolute error = 5.151434834260726000000000000000E-14 " "
relative error = 1.2294789665566858000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1609999999999823 " "
y[1] (analytic) = 4.193124804890670 " "
y[1] (numeric) = 4.193124804890723 " "
absolute error = 5.24025267623073900000000000000E-14 " "
relative error = 1.249724947399310900000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1619999999999822 " "
y[1] (analytic) = 4.196319526790284 " "
y[1] (numeric) = 4.196319526790337 " "
absolute error = 5.24025267623073900000000000000E-14 " "
relative error = 1.2487735127832239000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.162999999999982 " "
y[1] (analytic) = 4.199517445009690 " "
y[1] (numeric) = 4.199517445009743 " "
absolute error = 5.24025267623073900000000000000E-14 " "
relative error = 1.2478225760099555000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.163999999999982 " "
y[1] (analytic) = 4.202718562746808 " "
y[1] (numeric) = 4.2027185627468615 " "
absolute error = 5.329070518200751000000000000000E-14 " "
relative error = 1.2680055632175816000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1649999999999818 " "
y[1] (analytic) = 4.205922883202756 " "
y[1] (numeric) = 4.20592288320281 " "
absolute error = 5.329070518200751000000000000000E-14 " "
relative error = 1.2670395216905958000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1659999999999817 " "
y[1] (analytic) = 4.209130409581855 " "
y[1] (numeric) = 4.209130409581908 " "
absolute error = 5.329070518200751000000000000000E-14 " "
relative error = 1.2660739867002965000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1669999999999816 " "
y[1] (analytic) = 4.21234114509163 " "
y[1] (numeric) = 4.212341145091683 " "
absolute error = 5.329070518200751000000000000000E-14 " "
relative error = 1.2651089583307787000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1679999999999815 " "
y[1] (analytic) = 4.215555092942818 " "
y[1] (numeric) = 4.215555092942871 " "
absolute error = 5.329070518200751000000000000000E-14 " "
relative error = 1.264144436665541000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1689999999999814 " "
y[1] (analytic) = 4.218772256349366 " "
y[1] (numeric) = 4.21877225634942 " "
absolute error = 5.41788836017076400000000000000E-14 " "
relative error = 1.284233428817281000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1699999999999813 " "
y[1] (analytic) = 4.221992638528440 " "
y[1] (numeric) = 4.221992638528494 " "
absolute error = 5.506706202140776000000000000000E-14 " "
relative error = 1.3042908109049000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1709999999999812 " "
y[1] (analytic) = 4.225216242700420 " "
y[1] (numeric) = 4.225216242700475 " "
absolute error = 5.59552404411078900000000000000E-14 " "
relative error = 1.3243166083576774000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.171999999999981 " "
y[1] (analytic) = 4.228443072088911 " "
y[1] (numeric) = 4.228443072088967 " "
absolute error = 5.59552404411078900000000000000E-14 " "
relative error = 1.3233059896314317000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.172999999999981 " "
y[1] (analytic) = 4.231673129920745 " "
y[1] (numeric) = 4.2316731299208 " "
absolute error = 5.506706202140776000000000000000E-14 " "
relative error = 1.3013070795106313000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1739999999999808 " "
y[1] (analytic) = 4.234906419425977 " "
y[1] (numeric) = 4.234906419426033 " "
absolute error = 5.59552404411078900000000000000E-14 " "
relative error = 1.3212863496684390000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1749999999999807 " "
y[1] (analytic) = 4.238142943837898 " "
y[1] (numeric) = 4.238142943837954 " "
absolute error = 5.59552404411078900000000000000E-14 " "
relative error = 1.3202773285989497000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1759999999999806 " "
y[1] (analytic) = 4.241382706393033 " "
y[1] (numeric) = 4.24138270639309 " "
absolute error = 5.68434188608080100000000000000E-14 " "
relative error = 1.3402096154899668000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1769999999999805 " "
y[1] (analytic) = 4.244625710331144 " "
y[1] (numeric) = 4.244625710331201 " "
absolute error = 5.68434188608080100000000000000E-14 " "
relative error = 1.3391856606450556000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1779999999999804 " "
y[1] (analytic) = 4.247871958895237 " "
y[1] (numeric) = 4.247871958895294 " "
absolute error = 5.68434188608080100000000000000E-14 " "
relative error = 1.3381622471406020000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1789999999999803 " "
y[1] (analytic) = 4.251121455331559 " "
y[1] (numeric) = 4.2511214553316155 " "
absolute error = 5.68434188608080100000000000000E-14 " "
relative error = 1.3371393750587307000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1799999999999802 " "
y[1] (analytic) = 4.254374202889606 " "
y[1] (numeric) = 4.254374202889664 " "
absolute error = 5.77315972805081400000000000000E-14 " "
relative error = 1.3569938733009515000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.18099999999998 " "
y[1] (analytic) = 4.257630204822128 " "
y[1] (numeric) = 4.257630204822186 " "
absolute error = 5.77315972805081400000000000000E-14 " "
relative error = 1.3559561188550898000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.18199999999998 " "
y[1] (analytic) = 4.2608894643851265 " "
y[1] (numeric) = 4.260889464385184 " "
absolute error = 5.77315972805081400000000000000E-14 " "
relative error = 1.354918914537934000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1829999999999798 " "
y[1] (analytic) = 4.264151984837861 " "
y[1] (numeric) = 4.264151984837919 " "
absolute error = 5.77315972805081400000000000000E-14 " "
relative error = 1.3538822604303424000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1839999999999797 " "
y[1] (analytic) = 4.267417769442853 " "
y[1] (numeric) = 4.26741776944291 " "
absolute error = 5.77315972805081400000000000000E-14 " "
relative error = 1.3528461566125383000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1849999999999796 " "
y[1] (analytic) = 4.270686821465885 " "
y[1] (numeric) = 4.270686821465944 " "
absolute error = 5.86197757002082700000000000000E-14 " "
relative error = 1.3726076893666347000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1859999999999795 " "
y[1] (analytic) = 4.273959144176013 " "
y[1] (numeric) = 4.273959144176070 " "
absolute error = 5.77315972805081400000000000000E-14 " "
relative error = 1.3507756001640103000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1869999999999794 " "
y[1] (analytic) = 4.277234740845556 " "
y[1] (numeric) = 4.277234740845615 " "
absolute error = 5.86197757002082700000000000000E-14 " "
relative error = 1.370506396116568000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1879999999999793 " "
y[1] (analytic) = 4.280513614750115 " "
y[1] (numeric) = 4.2805136147501734 " "
absolute error = 5.86197757002082700000000000000E-14 " "
relative error = 1.3694565880648493000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1889999999999792 " "
y[1] (analytic) = 4.28379576916856 " "
y[1] (numeric) = 4.28379576916862 " "
absolute error = 5.95079541199083900000000000000E-14 " "
relative error = 1.3891407836993652000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.189999999999979 " "
y[1] (analytic) = 4.28708120738305 " "
y[1] (numeric) = 4.2870812073831095 " "
absolute error = 5.95079541199083900000000000000E-14 " "
relative error = 1.3880762047946754000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.190999999999979 " "
y[1] (analytic) = 4.29036993267902 " "
y[1] (numeric) = 4.29036993267908 " "
absolute error = 5.95079541199083900000000000000E-14 " "
relative error = 1.3870121936723076000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1919999999999789 " "
y[1] (analytic) = 4.293661948345196 " "
y[1] (numeric) = 4.293661948345258 " "
absolute error = 6.12843109593086400000000000000E-14 " "
relative error = 1.4273203548995744000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1929999999999787 " "
y[1] (analytic) = 4.296957257673597 " "
y[1] (numeric) = 4.296957257673658 " "
absolute error = 6.12843109593086400000000000000E-14 " "
relative error = 1.426225751951938000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1939999999999786 " "
y[1] (analytic) = 4.30025586395953 " "
y[1] (numeric) = 4.300255863959591 " "
absolute error = 6.12843109593086400000000000000E-14 " "
relative error = 1.425131733972688000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1949999999999785 " "
y[1] (analytic) = 4.3035577705016 " "
y[1] (numeric) = 4.303557770501663 " "
absolute error = 6.30606677987088900000000000000E-14 " "
relative error = 1.4653147735335006000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1959999999999784 " "
y[1] (analytic) = 4.306862980601718 " "
y[1] (numeric) = 4.306862980601780 " "
absolute error = 6.30606677987088900000000000000E-14 " "
relative error = 1.4641902489755687000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1969999999999783 " "
y[1] (analytic) = 4.310171497565090 " "
y[1] (numeric) = 4.310171497565155 " "
absolute error = 6.39488462184090200000000000000E-14 " "
relative error = 1.4836728945596503000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.1979999999999782 " "
y[1] (analytic) = 4.313483324700238 " "
y[1] (numeric) = 4.313483324700302 " "
absolute error = 6.39488462184090200000000000000E-14 " "
relative error = 1.4825337529930777000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.198999999999978 " "
y[1] (analytic) = 4.3167984653189855 " "
y[1] (numeric) = 4.316798465319050 " "
absolute error = 6.39488462184090200000000000000E-14 " "
relative error = 1.4813952222271184000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.199999999999978 " "
y[1] (analytic) = 4.320116922736474 " "
y[1] (numeric) = 4.320116922736540 " "
absolute error = 6.48370246381091400000000000000E-14 " "
relative error = 1.5008164315386094000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2009999999999779 " "
y[1] (analytic) = 4.323438700271163 " "
y[1] (numeric) = 4.323438700271228 " "
absolute error = 6.48370246381091400000000000000E-14 " "
relative error = 1.4996633266488227000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2019999999999778 " "
y[1] (analytic) = 4.326763801244828 " "
y[1] (numeric) = 4.326763801244894 " "
absolute error = 6.57252030578092700000000000000E-14 " "
relative error = 1.5190383870480714000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2029999999999776 " "
y[1] (analytic) = 4.330092228982574 " "
y[1] (numeric) = 4.330092228982639 " "
absolute error = 6.48370246381091400000000000000E-14 " "
relative error = 1.497358975500244000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2039999999999775 " "
y[1] (analytic) = 4.333423986812824 " "
y[1] (numeric) = 4.33342398681289 " "
absolute error = 6.57252030578092700000000000000E-14 " "
relative error = 1.5167037256871163000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2049999999999774 " "
y[1] (analytic) = 4.33675907806734 " "
y[1] (numeric) = 4.336759078067406 " "
absolute error = 6.57252030578092700000000000000E-14 " "
relative error = 1.5155373373219397000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2059999999999773 " "
y[1] (analytic) = 4.340097506081210 " "
y[1] (numeric) = 4.340097506081277 " "
absolute error = 6.66133814775093900000000000000E-14 " "
relative error = 1.5348360580418477000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2069999999999772 " "
y[1] (analytic) = 4.343439274192868 " "
y[1] (numeric) = 4.343439274192934 " "
absolute error = 6.66133814775093900000000000000E-14 " "
relative error = 1.5336551813513732000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.207999999999977 " "
y[1] (analytic) = 4.346784385744076 " "
y[1] (numeric) = 4.346784385744144 " "
absolute error = 6.75015598972095200000000000000E-14 " "
relative error = 1.5529079408353194000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.208999999999977 " "
y[1] (analytic) = 4.350132844079950 " "
y[1] (numeric) = 4.350132844080018 " "
absolute error = 6.83897383169096400000000000000E-14 " "
relative error = 1.5721298812743278000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2099999999999769 " "
y[1] (analytic) = 4.353484652548946 " "
y[1] (numeric) = 4.353484652549015 " "
absolute error = 6.83897383169096400000000000000E-14 " "
relative error = 1.5709194765822304000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2109999999999768 " "
y[1] (analytic) = 4.356839814502875 " "
y[1] (numeric) = 4.356839814502944 " "
absolute error = 6.92779167366097700000000000000E-14 " "
relative error = 1.5900955666536143000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2119999999999767 " "
y[1] (analytic) = 4.360198333296898 " "
y[1] (numeric) = 4.360198333296967 " "
absolute error = 6.92779167366097700000000000000E-14 " "
relative error = 1.5888707678172592000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2129999999999765 " "
y[1] (analytic) = 4.363560212289534 " "
y[1] (numeric) = 4.363560212289604 " "
absolute error = 7.01660951563098900000000000000E-14 " "
relative error = 1.608001075788849000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2139999999999764 " "
y[1] (analytic) = 4.366925454842663 " "
y[1] (numeric) = 4.366925454842733 " "
absolute error = 7.01660951563098900000000000000E-14 " "
relative error = 1.6067619170943215000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2149999999999763 " "
y[1] (analytic) = 4.370294064321527 " "
y[1] (numeric) = 4.370294064321598 " "
absolute error = 7.10542735760100200000000000000E-14 " "
relative error = 1.6258465112470857000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2159999999999762 " "
y[1] (analytic) = 4.373666044094737 " "
y[1] (numeric) = 4.373666044094808 " "
absolute error = 7.10542735760100200000000000000E-14 " "
relative error = 1.6245930269858283000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.216999999999976 " "
y[1] (analytic) = 4.3770413975342715 " "
y[1] (numeric) = 4.3770413975343425 " "
absolute error = 7.10542735760100200000000000000E-14 " "
relative error = 1.6233402228280772000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.217999999999976 " "
y[1] (analytic) = 4.380420128015485 " "
y[1] (numeric) = 4.380420128015556 " "
absolute error = 7.10542735760100200000000000000E-14 " "
relative error = 1.622088098846368000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2189999999999759 " "
y[1] (analytic) = 4.3838022389171085 " "
y[1] (numeric) = 4.3838022389171805 " "
absolute error = 7.19424519957101400000000000000E-14 " "
relative error = 1.6410971133013850000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2199999999999758 " "
y[1] (analytic) = 4.387187733621253 " "
y[1] (numeric) = 4.387187733621325 " "
absolute error = 7.28306304154102700000000000000E-14 " "
relative error = 1.6600755389898653000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2209999999999757 " "
y[1] (analytic) = 4.390576615513412 " "
y[1] (numeric) = 4.390576615513486 " "
absolute error = 7.3718808835110390000000000000E-14 " "
relative error = 1.679023401496664000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2219999999999756 " "
y[1] (analytic) = 4.393968887982470 " "
y[1] (numeric) = 4.3939688879825445 " "
absolute error = 7.3718808835110390000000000000E-14 " "
relative error = 1.677727146333051000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2229999999999754 " "
y[1] (analytic) = 4.3973645544207 " "
y[1] (numeric) = 4.397364554420774 " "
absolute error = 7.3718808835110390000000000000E-14 " "
relative error = 1.6764315972165733000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2239999999999753 " "
y[1] (analytic) = 4.400763618223767 " "
y[1] (numeric) = 4.4007636182238405 " "
absolute error = 7.3718808835110390000000000000E-14 " "
relative error = 1.6751367542177767000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2249999999999752 " "
y[1] (analytic) = 4.404166082790734 " "
y[1] (numeric) = 4.404166082790809 " "
absolute error = 7.46069872548105200000000000000E-14 " "
relative error = 1.6940093959293928000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.225999999999975 " "
y[1] (analytic) = 4.407571951524070 " "
y[1] (numeric) = 4.407571951524144 " "
absolute error = 7.46069872548105200000000000000E-14 " "
relative error = 1.6927003818738023000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.226999999999975 " "
y[1] (analytic) = 4.410981227829640 " "
y[1] (numeric) = 4.410981227829715 " "
absolute error = 7.54951656745106400000000000000E-14 " "
relative error = 1.711527702684352000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.227999999999975 " "
y[1] (analytic) = 4.4143939151167215 " "
y[1] (numeric) = 4.414393915116797 " "
absolute error = 7.54951656745106400000000000000E-14 " "
relative error = 1.7102045518861328000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2289999999999748 " "
y[1] (analytic) = 4.417810016798003 " "
y[1] (numeric) = 4.41781001679808 " "
absolute error = 7.63833440942107700000000000000E-14 " "
relative error = 1.7289866201528709000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2299999999999747 " "
y[1] (analytic) = 4.421229536289587 " "
y[1] (numeric) = 4.421229536289664 " "
absolute error = 7.63833440942107700000000000000E-14 " "
relative error = 1.7276493669295825000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2309999999999746 " "
y[1] (analytic) = 4.424652477010992 " "
y[1] (numeric) = 4.424652477011069 " "
absolute error = 7.7271522513910900000000000000E-14 " "
relative error = 1.7463862510194367000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2319999999999744 " "
y[1] (analytic) = 4.428078842385160 " "
y[1] (numeric) = 4.428078842385236 " "
absolute error = 7.7271522513910900000000000000E-14 " "
relative error = 1.745034929691745000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2329999999999743 " "
y[1] (analytic) = 4.431508635838455 " "
y[1] (numeric) = 4.431508635838532 " "
absolute error = 7.7271522513910900000000000000E-14 " "
relative error = 1.743684349140186000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2339999999999742 " "
y[1] (analytic) = 4.434941860800672 " "
y[1] (numeric) = 4.434941860800750 " "
absolute error = 7.7271522513910900000000000000E-14 " "
relative error = 1.7423345094305365000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2349999999999741 " "
y[1] (analytic) = 4.438378520705036 " "
y[1] (numeric) = 4.438378520705114 " "
absolute error = 7.81597009336110200000000000000E-14 " "
relative error = 1.7609967371867005000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.235999999999974 " "
y[1] (analytic) = 4.441818618988207 " "
y[1] (numeric) = 4.441818618988286 " "
absolute error = 7.90478793533111500000000000000E-14 " "
relative error = 1.7796287091821256000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.236999999999974 " "
y[1] (analytic) = 4.445262159090284 " "
y[1] (numeric) = 4.445262159090364 " "
absolute error = 7.99360577730112700000000000000E-14 " "
relative error = 1.7982304510330627000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2379999999999738 " "
y[1] (analytic) = 4.448709144454808 " "
y[1] (numeric) = 4.448709144454887 " "
absolute error = 7.90478793533111500000000000000E-14 " "
relative error = 1.776872274327984000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2389999999999737 " "
y[1] (analytic) = 4.452159578528763 " "
y[1] (numeric) = 4.452159578528843 " "
absolute error = 7.99360577730112700000000000000E-14 " "
relative error = 1.7954445783685616000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2399999999999736 " "
y[1] (analytic) = 4.4556134647625845 " "
y[1] (numeric) = 4.455613464762664 " "
absolute error = 7.99360577730112700000000000000E-14 " "
relative error = 1.7940527921730445000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2409999999999735 " "
y[1] (analytic) = 4.459070806610159 " "
y[1] (numeric) = 4.459070806610239 " "
absolute error = 7.99360577730112700000000000000E-14 " "
relative error = 1.7926617728185315000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2419999999999733 " "
y[1] (analytic) = 4.4625316075288275 " "
y[1] (numeric) = 4.462531607528908 " "
absolute error = 8.0824236192711400000000000000E-14 " "
relative error = 1.8111745372593258000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2429999999999732 " "
y[1] (analytic) = 4.465995870979393 " "
y[1] (numeric) = 4.465995870979474 " "
absolute error = 8.0824236192711400000000000000E-14 " "
relative error = 1.8097696130423568000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2439999999999731 " "
y[1] (analytic) = 4.469463600426117 " "
y[1] (numeric) = 4.469463600426199 " "
absolute error = 8.17124146124115200000000000000E-14 " "
relative error = 1.8282376123305064000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.244999999999973 " "
y[1] (analytic) = 4.472934799336732 " "
y[1] (numeric) = 4.472934799336813 " "
absolute error = 8.0824236192711400000000000000E-14 " "
relative error = 1.806962091302927000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.245999999999973 " "
y[1] (analytic) = 4.476409471182436 " "
y[1] (numeric) = 4.476409471182516 " "
absolute error = 8.0824236192711400000000000000E-14 " "
relative error = 1.8055594938986183000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2469999999999728 " "
y[1] (analytic) = 4.4798876194379 " "
y[1] (numeric) = 4.479887619437980 " "
absolute error = 8.0824236192711400000000000000E-14 " "
relative error = 1.8041576722152813000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2479999999999727 " "
y[1] (analytic) = 4.4833692475812725 " "
y[1] (numeric) = 4.483369247581354 " "
absolute error = 8.17124146124115200000000000000E-14 " "
relative error = 1.822567138686925000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2489999999999726 " "
y[1] (analytic) = 4.486854359094185 " "
y[1] (numeric) = 4.486854359094266 " "
absolute error = 8.17124146124115200000000000000E-14 " "
relative error = 1.8211514810324217000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2499999999999725 " "
y[1] (analytic) = 4.4903429574617455 " "
y[1] (numeric) = 4.490342957461828 " "
absolute error = 8.26005930321116500000000000000E-14 " "
relative error = 1.8395163535304493000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2509999999999724 " "
y[1] (analytic) = 4.4938350461725545 " "
y[1] (numeric) = 4.493835046172638 " "
absolute error = 8.34887714518117700000000000000E-14 " "
relative error = 1.8578512694390067000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2519999999999722 " "
y[1] (analytic) = 4.497330628718702 " "
y[1] (numeric) = 4.497330628718785 " "
absolute error = 8.34887714518117700000000000000E-14 " "
relative error = 1.85640724119049000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2529999999999721 " "
y[1] (analytic) = 4.500829708595768 " "
y[1] (numeric) = 4.500829708595853 " "
absolute error = 8.4376949871511900000000000000E-14 " "
relative error = 1.8746976743058558000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.253999999999972 " "
y[1] (analytic) = 4.504332289302836 " "
y[1] (numeric) = 4.50433228930292 " "
absolute error = 8.4376949871511900000000000000E-14 " "
relative error = 1.8732399044336814000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.254999999999972 " "
y[1] (analytic) = 4.507838374342484 " "
y[1] (numeric) = 4.507838374342569 " "
absolute error = 8.52651282912120200000000000000E-14 " "
relative error = 1.8914859231981415000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2559999999999718 " "
y[1] (analytic) = 4.511347967220800 " "
y[1] (numeric) = 4.5113479672208845 " "
absolute error = 8.52651282912120200000000000000E-14 " "
relative error = 1.8900144460312893000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2569999999999717 " "
y[1] (analytic) = 4.514861071447374 " "
y[1] (numeric) = 4.51486107144746 " "
absolute error = 8.61533067109121500000000000000E-14 " "
relative error = 1.908216118891408700000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2579999999999716 " "
y[1] (analytic) = 4.5183776905353135 " "
y[1] (numeric) = 4.5183776905354 " "
absolute error = 8.61533067109121500000000000000E-14 " "
relative error = 1.906730968758505200000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2589999999999715 " "
y[1] (analytic) = 4.5218978280012365 " "
y[1] (numeric) = 4.521897828001323 " "
absolute error = 8.61533067109121500000000000000E-14 " "
relative error = 1.9052466461630232000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2599999999999714 " "
y[1] (analytic) = 4.525421487365281 " "
y[1] (numeric) = 4.525421487365367 " "
absolute error = 8.61533067109121500000000000000E-14 " "
relative error = 1.903763151155031000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2609999999999713 " "
y[1] (analytic) = 4.528948672151107 " "
y[1] (numeric) = 4.528948672151193 " "
absolute error = 8.61533067109121500000000000000E-14 " "
relative error = 1.9022804837837134000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2619999999999711 " "
y[1] (analytic) = 4.532479385885899 " "
y[1] (numeric) = 4.532479385885986 " "
absolute error = 8.70414851306122700000000000000E-14 " "
relative error = 1.9203945064076564000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.262999999999971 " "
y[1] (analytic) = 4.536013632100370 " "
y[1] (numeric) = 4.536013632100459 " "
absolute error = 8.7929663550312400000000000000E-14 " "
relative error = 1.9384788204350512000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.263999999999971 " "
y[1] (analytic) = 4.53955141432877 " "
y[1] (numeric) = 4.539551414328858 " "
absolute error = 8.7929663550312400000000000000E-14 " "
relative error = 1.9369681169987127000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2649999999999708 " "
y[1] (analytic) = 4.543092736108878 " "
y[1] (numeric) = 4.543092736108966 " "
absolute error = 8.7929663550312400000000000000E-14 " "
relative error = 1.935458258455526000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2659999999999707 " "
y[1] (analytic) = 4.546637600982018 " "
y[1] (numeric) = 4.546637600982106 " "
absolute error = 8.7929663550312400000000000000E-14 " "
relative error = 1.9339492448511988000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2669999999999706 " "
y[1] (analytic) = 4.550186012493054 " "
y[1] (numeric) = 4.550186012493143 " "
absolute error = 8.88178419700125200000000000000E-14 " "
relative error = 1.9519606830611547000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2679999999999705 " "
y[1] (analytic) = 4.553737974190400 " "
y[1] (numeric) = 4.553737974190487 " "
absolute error = 8.7929663550312400000000000000E-14 " "
relative error = 1.9309337526374745000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2689999999999704 " "
y[1] (analytic) = 4.557293489626014 " "
y[1] (numeric) = 4.557293489626103 " "
absolute error = 8.88178419700125200000000000000E-14 " "
relative error = 1.9489164385000188000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2699999999999703 " "
y[1] (analytic) = 4.560852562355414 " "
y[1] (numeric) = 4.560852562355504 " "
absolute error = 8.97060203897126500000000000000E-14 " "
relative error = 1.9668695526387445000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2709999999999702 " "
y[1] (analytic) = 4.564415195937675 " "
y[1] (numeric) = 4.564415195937764 " "
absolute error = 8.88178419700125200000000000000E-14 " "
relative error = 1.9458756085349183000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.27199999999997 " "
y[1] (analytic) = 4.567981393935428 " "
y[1] (numeric) = 4.567981393935518 " "
absolute error = 8.97060203897126500000000000000E-14 " "
relative error = 1.963800038870752000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.27299999999997 " "
y[1] (analytic) = 4.571551159914872 " "
y[1] (numeric) = 4.5715511599149625 " "
absolute error = 9.05941988094127700000000000000E-14 " "
relative error = 1.9816949573654066000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2739999999999698 " "
y[1] (analytic) = 4.575124497445774 " "
y[1] (numeric) = 4.575124497445865 " "
absolute error = 9.05941988094127700000000000000E-14 " "
relative error = 1.980147182005434000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2749999999999697 " "
y[1] (analytic) = 4.578701410101470 " "
y[1] (numeric) = 4.578701410101562 " "
absolute error = 9.1482377229112900000000000000E-14 " "
relative error = 1.997998319507921800000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2759999999999696 " "
y[1] (analytic) = 4.5822819014588765 " "
y[1] (numeric) = 4.582281901458968 " "
absolute error = 9.1482377229112900000000000000E-14 " "
relative error = 1.9964371288459434000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2769999999999695 " "
y[1] (analytic) = 4.585865975098482 " "
y[1] (numeric) = 4.5858659750985735 " "
absolute error = 9.1482377229112900000000000000E-14 " "
relative error = 1.994876817723577000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2779999999999694 " "
y[1] (analytic) = 4.589453634604360 " "
y[1] (numeric) = 4.589453634604453 " "
absolute error = 9.23705556488130200000000000000E-14 " "
relative error = 2.0126699821595634000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2789999999999693 " "
y[1] (analytic) = 4.593044883564175 " "
y[1] (numeric) = 4.593044883564267 " "
absolute error = 9.23705556488130200000000000000E-14 " "
relative error = 2.011096298652628000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2799999999999692 " "
y[1] (analytic) = 4.596639725569170 " "
y[1] (numeric) = 4.596639725569264 " "
absolute error = 9.32587340685131500000000000000E-14 " "
relative error = 2.028845844710302200000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.280999999999969 " "
y[1] (analytic) = 4.600238164214192 " "
y[1] (numeric) = 4.600238164214286 " "
absolute error = 9.41469124882132700000000000000E-14 " "
relative error = 2.046566050005703700000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.281999999999969 " "
y[1] (analytic) = 4.603840203097677 " "
y[1] (numeric) = 4.603840203097771 " "
absolute error = 9.41469124882132700000000000000E-14 " "
relative error = 2.044964819258211200000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2829999999999688 " "
y[1] (analytic) = 4.607445845821667 " "
y[1] (numeric) = 4.607445845821761 " "
absolute error = 9.41469124882132700000000000000E-14 " "
relative error = 2.043364493878791000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2839999999999687 " "
y[1] (analytic) = 4.6110550959918015 " "
y[1] (numeric) = 4.6110550959918974 " "
absolute error = 9.59232693276135300000000000000E-14 " "
relative error = 2.0802889432181287000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2849999999999686 " "
y[1] (analytic) = 4.614667957217335 " "
y[1] (numeric) = 4.6146679572174305 " "
absolute error = 9.59232693276135300000000000000E-14 " "
relative error = 2.078660268017543000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2859999999999685 " "
y[1] (analytic) = 4.618284433111125 " "
y[1] (numeric) = 4.618284433111222 " "
absolute error = 9.68114477473136500000000000000E-14 " "
relative error = 2.096264297911513700000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2869999999999684 " "
y[1] (analytic) = 4.621904527289650 " "
y[1] (numeric) = 4.621904527289748 " "
absolute error = 9.68114477473136500000000000000E-14 " "
relative error = 2.094622404588811800000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2879999999999683 " "
y[1] (analytic) = 4.625528243373005 " "
y[1] (numeric) = 4.625528243373103 " "
absolute error = 9.76996261670137800000000000000E-14 " "
relative error = 2.1121831070210853000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2889999999999682 " "
y[1] (analytic) = 4.629155584984906 " "
y[1] (numeric) = 4.6291555849850035 " "
absolute error = 9.76996261670137800000000000000E-14 " "
relative error = 2.110528029861678000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.289999999999968 " "
y[1] (analytic) = 4.632786555752693 " "
y[1] (numeric) = 4.632786555752792 " "
absolute error = 9.8587804586713900000000000000E-14 " "
relative error = 2.128045473286352000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.290999999999968 " "
y[1] (analytic) = 4.636421159307340 " "
y[1] (numeric) = 4.636421159307438 " "
absolute error = 9.8587804586713900000000000000E-14 " "
relative error = 2.1263772465709843000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2919999999999678 " "
y[1] (analytic) = 4.640059399283448 " "
y[1] (numeric) = 4.640059399283547 " "
absolute error = 9.8587804586713900000000000000E-14 " "
relative error = 2.1247099681943413000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2929999999999677 " "
y[1] (analytic) = 4.6437012793192585 " "
y[1] (numeric) = 4.643701279319358 " "
absolute error = 9.94759830064140300000000000000E-14 " "
relative error = 2.1421701574438198000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2939999999999676 " "
y[1] (analytic) = 4.647346803056652 " "
y[1] (numeric) = 4.647346803056752 " "
absolute error = 1.00364161426114150000000000000E-13 " "
relative error = 2.1596012882038984000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2949999999999675 " "
y[1] (analytic) = 4.6509959741411535 " "
y[1] (numeric) = 4.650995974141254 " "
absolute error = 1.00364161426114150000000000000E-13 " "
relative error = 2.1579068651988514000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2959999999999674 " "
y[1] (analytic) = 4.654648796221933 " "
y[1] (numeric) = 4.654648796222034 " "
absolute error = 1.01252339845814280000000000000E-13 " "
relative error = 2.1752949422950746000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2969999999999673 " "
y[1] (analytic) = 4.658305272951813 " "
y[1] (numeric) = 4.658305272951915 " "
absolute error = 1.0214051826551440000000000000E-13 " "
relative error = 2.192654029322371200000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.2979999999999672 " "
y[1] (analytic) = 4.661965407987271 " "
y[1] (numeric) = 4.661965407987373 " "
absolute error = 1.0214051826551440000000000000E-13 " "
relative error = 2.1909325644184036000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.298999999999967 " "
y[1] (analytic) = 4.665629204988441 " "
y[1] (numeric) = 4.665629204988544 " "
absolute error = 1.03028696685214530000000000000E-13 " "
relative error = 2.208248708985646200000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.299999999999967 " "
y[1] (analytic) = 4.669296667619123 " "
y[1] (numeric) = 4.669296667619227 " "
absolute error = 1.03916875104914650000000000000E-13 " "
relative error = 2.2255359319008944000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3009999999999668 " "
y[1] (analytic) = 4.672967799546778 " "
y[1] (numeric) = 4.672967799546882 " "
absolute error = 1.03916875104914650000000000000E-13 " "
relative error = 2.2237875278103425000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3019999999999667 " "
y[1] (analytic) = 4.676642604442538 " "
y[1] (numeric) = 4.676642604442643 " "
absolute error = 1.04805053524614780000000000000E-13 " "
relative error = 2.2410319194598294000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3029999999999666 " "
y[1] (analytic) = 4.68032108598121 " "
y[1] (numeric) = 4.680321085981315 " "
absolute error = 1.04805053524614780000000000000E-13 " "
relative error = 2.2392705884759365000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3039999999999665 " "
y[1] (analytic) = 4.684003247841273 " "
y[1] (numeric) = 4.684003247841380 " "
absolute error = 1.0569323194431490000000000000E-13 " "
relative error = 2.256472217286056800000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3049999999999664 " "
y[1] (analytic) = 4.6876890937048925 " "
y[1] (numeric) = 4.687689093704998 " "
absolute error = 1.0569323194431490000000000000E-13 " "
relative error = 2.2546979936500178000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3059999999999663 " "
y[1] (analytic) = 4.6913786272579125 " "
y[1] (numeric) = 4.691378627258018 " "
absolute error = 1.0569323194431490000000000000E-13 " "
relative error = 2.2529247869744434000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3069999999999662 " "
y[1] (analytic) = 4.695071852189868 " "
y[1] (numeric) = 4.695071852189973 " "
absolute error = 1.0569323194431490000000000000E-13 " "
relative error = 2.251152597271065000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.307999999999966 " "
y[1] (analytic) = 4.698768772193982 " "
y[1] (numeric) = 4.6987687721940885 " "
absolute error = 1.06581410364015030000000000000E-13 " "
relative error = 2.2682837894627722000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.308999999999966 " "
y[1] (analytic) = 4.7024693909671775 " "
y[1] (numeric) = 4.702469390967284 " "
absolute error = 1.06581410364015030000000000000E-13 " "
relative error = 2.2664987584766386000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3099999999999659 " "
y[1] (analytic) = 4.706173712210072 " "
y[1] (numeric) = 4.706173712210180 " "
absolute error = 1.07469588783715150000000000000E-13 " "
relative error = 2.283587375979928000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3109999999999657 " "
y[1] (analytic) = 4.709881739626988 " "
y[1] (numeric) = 4.709881739627096 " "
absolute error = 1.07469588783715150000000000000E-13 " "
relative error = 2.2817895379306594000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3119999999999656 " "
y[1] (analytic) = 4.713593476925952 " "
y[1] (numeric) = 4.713593476926060 " "
absolute error = 1.08357767203415280000000000000E-13 " "
relative error = 2.2988356491464465000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3129999999999655 " "
y[1] (analytic) = 4.717308927818704 " "
y[1] (numeric) = 4.717308927818812 " "
absolute error = 1.08357767203415280000000000000E-13 " "
relative error = 2.2970250382461213000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3139999999999654 " "
y[1] (analytic) = 4.721028096020692 " "
y[1] (numeric) = 4.721028096020800 " "
absolute error = 1.08357767203415280000000000000E-13 " "
relative error = 2.295215470010631000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3149999999999653 " "
y[1] (analytic) = 4.724750985251087 " "
y[1] (numeric) = 4.7247509852511955 " "
absolute error = 1.08357767203415280000000000000E-13 " "
relative error = 2.293406944443588000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3159999999999652 " "
y[1] (analytic) = 4.728477599232777 " "
y[1] (numeric) = 4.728477599232886 " "
absolute error = 1.0924594562311540000000000000E-13 " "
relative error = 2.310383063691392000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.316999999999965 " "
y[1] (analytic) = 4.732207941692378 " "
y[1] (numeric) = 4.732207941692487 " "
absolute error = 1.0924594562311540000000000000E-13 " "
relative error = 2.3085618165808203000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.317999999999965 " "
y[1] (analytic) = 4.73594201636023 " "
y[1] (numeric) = 4.735942016360341 " "
absolute error = 1.11022302462515650000000000000E-13 " "
relative error = 2.3442496145221164000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3189999999999649 " "
y[1] (analytic) = 4.739679826970411 " "
y[1] (numeric) = 4.739679826970522 " "
absolute error = 1.11022302462515650000000000000E-13 " "
relative error = 2.342400890261838000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3199999999999648 " "
y[1] (analytic) = 4.743421377260730 " "
y[1] (numeric) = 4.743421377260842 " "
absolute error = 1.11022302462515650000000000000E-13 " "
relative error = 2.3405532343118485000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3209999999999646 " "
y[1] (analytic) = 4.747166670972739 " "
y[1] (numeric) = 4.747166670972850 " "
absolute error = 1.11910480882215780000000000000E-13 " "
relative error = 2.357416299842792000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3219999999999645 " "
y[1] (analytic) = 4.7509157118517304 " "
y[1] (numeric) = 4.750915711851842 " "
absolute error = 1.11910480882215780000000000000E-13 " "
relative error = 2.355556016349471800000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3229999999999644 " "
y[1] (analytic) = 4.754668503646747 " "
y[1] (numeric) = 4.754668503646859 " "
absolute error = 1.11910480882215780000000000000E-13 " "
relative error = 2.353696809701505000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3239999999999643 " "
y[1] (analytic) = 4.75842505011058 " "
y[1] (numeric) = 4.758425050110692 " "
absolute error = 1.1279865930191590000000000000E-13 " "
relative error = 2.3705040662413000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3249999999999642 " "
y[1] (analytic) = 4.762185354999776 " "
y[1] (numeric) = 4.762185354999889 " "
absolute error = 1.1279865930191590000000000000E-13 " "
relative error = 2.3686322747494404000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.325999999999964 " "
y[1] (analytic) = 4.765949422074641 " "
y[1] (numeric) = 4.765949422074754 " "
absolute error = 1.1279865930191590000000000000E-13 " "
relative error = 2.3667615686281054000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.326999999999964 " "
y[1] (analytic) = 4.769717255099241 " "
y[1] (numeric) = 4.769717255099355 " "
absolute error = 1.13686837721616030000000000000E-13 " "
relative error = 2.3835131443079763000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3279999999999639 " "
y[1] (analytic) = 4.773488857841410 " "
y[1] (numeric) = 4.773488857841525 " "
absolute error = 1.14575016141316150000000000000E-13 " "
relative error = 2.4002363795843737000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3289999999999638 " "
y[1] (analytic) = 4.777264234072753 " "
y[1] (numeric) = 4.7772642340728675 " "
absolute error = 1.14575016141316150000000000000E-13 " "
relative error = 2.398339520852454700000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3299999999999637 " "
y[1] (analytic) = 4.781043387568643 " "
y[1] (numeric) = 4.781043387568759 " "
absolute error = 1.15463194561016280000000000000E-13 " "
relative error = 2.4150208479855284000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3309999999999635 " "
y[1] (analytic) = 4.784826322108237 " "
y[1] (numeric) = 4.784826322108353 " "
absolute error = 1.1635137298071640000000000000E-13 " "
relative error = 2.4316739030446347000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3319999999999634 " "
y[1] (analytic) = 4.788613041474468 " "
y[1] (numeric) = 4.788613041474584 " "
absolute error = 1.1635137298071640000000000000E-13 " "
relative error = 2.4297509941394327000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3329999999999633 " "
y[1] (analytic) = 4.792403549454056 " "
y[1] (numeric) = 4.792403549454173 " "
absolute error = 1.17239551400416530000000000000E-13 " "
relative error = 2.446362252063942000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3339999999999632 " "
y[1] (analytic) = 4.79619784983751 " "
y[1] (numeric) = 4.796197849837627 " "
absolute error = 1.17239551400416530000000000000E-13 " "
relative error = 2.44442692046968970000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.334999999999963 " "
y[1] (analytic) = 4.799995946419129 " "
y[1] (numeric) = 4.799995946419248 " "
absolute error = 1.19015908239816780000000000000E-13 " "
relative error = 2.479500182257539000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.335999999999963 " "
y[1] (analytic) = 4.803797842997012 " "
y[1] (numeric) = 4.803797842997131 " "
absolute error = 1.19015908239816780000000000000E-13 " "
relative error = 2.47753781756904000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3369999999999629 " "
y[1] (analytic) = 4.807603543373055 " "
y[1] (numeric) = 4.807603543373174 " "
absolute error = 1.19015908239816780000000000000E-13 " "
relative error = 2.475576597905455000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3379999999999628 " "
y[1] (analytic) = 4.811413051352960 " "
y[1] (numeric) = 4.811413051353078 " "
absolute error = 1.19015908239816780000000000000E-13 " "
relative error = 2.473616523244657700000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3389999999999627 " "
y[1] (analytic) = 4.815226370746231 " "
y[1] (numeric) = 4.815226370746351 " "
absolute error = 1.1990408665951690000000000000E-13 " "
relative error = 2.49010279948552000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3399999999999626 " "
y[1] (analytic) = 4.819043505366192 " "
y[1] (numeric) = 4.819043505366313 " "
absolute error = 1.20792265079217030000000000000E-13 " "
relative error = 2.50656100001401000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3409999999999624 " "
y[1] (analytic) = 4.822864459029978 " "
y[1] (numeric) = 4.822864459030098 " "
absolute error = 1.20792265079217030000000000000E-13 " "
relative error = 2.5045751566385915000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3419999999999623 " "
y[1] (analytic) = 4.82668923555854 " "
y[1] (numeric) = 4.8266892355586615 " "
absolute error = 1.21680443498917160000000000000E-13 " "
relative error = 2.520991875807733000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3429999999999622 " "
y[1] (analytic) = 4.830517838776657 " "
y[1] (numeric) = 4.830517838776779 " "
absolute error = 1.21680443498917160000000000000E-13 " "
relative error = 2.518993771685006000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3439999999999621 " "
y[1] (analytic) = 4.834350272512932 " "
y[1] (numeric) = 4.8343502725130545 " "
absolute error = 1.22568621918617280000000000000E-13 " "
relative error = 2.535369077733484000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.344999999999962 " "
y[1] (analytic) = 4.838186540599799 " "
y[1] (numeric) = 4.838186540599922 " "
absolute error = 1.22568621918617280000000000000E-13 " "
relative error = 2.53335874692054000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.345999999999962 " "
y[1] (analytic) = 4.842026646873526 " "
y[1] (numeric) = 4.8420266468736495 " "
absolute error = 1.2345680033831741000000000000E-13 " "
relative error = 2.549692708073651000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3469999999999618 " "
y[1] (analytic) = 4.845870595174220 " "
y[1] (numeric) = 4.845870595174344 " "
absolute error = 1.2345680033831741000000000000E-13 " "
relative error = 2.547670184615791000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3479999999999617 " "
y[1] (analytic) = 4.849718389345831 " "
y[1] (numeric) = 4.849718389345955 " "
absolute error = 1.2345680033831741000000000000E-13 " "
relative error = 2.5456488485916035000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3489999999999616 " "
y[1] (analytic) = 4.853570033236151 " "
y[1] (numeric) = 4.8535700332362754 " "
absolute error = 1.24344978758017530000000000000E-13 " "
relative error = 2.561928187015562000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3499999999999615 " "
y[1] (analytic) = 4.857425530696826 " "
y[1] (numeric) = 4.8574255306969505 " "
absolute error = 1.24344978758017530000000000000E-13 " "
relative error = 2.5598947008494750000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3509999999999613 " "
y[1] (analytic) = 4.861284885583352 " "
y[1] (numeric) = 4.861284885583478 " "
absolute error = 1.26121335597417780000000000000E-13 " "
relative error = 2.594403302127875000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3519999999999612 " "
y[1] (analytic) = 4.865148101755087 " "
y[1] (numeric) = 4.865148101755213 " "
absolute error = 1.26121335597417780000000000000E-13 " "
relative error = 2.5923431920175240000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3529999999999611 " "
y[1] (analytic) = 4.869015183075245 " "
y[1] (numeric) = 4.869015183075371 " "
absolute error = 1.26121335597417780000000000000E-13 " "
relative error = 2.590284294775195300000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.353999999999961 " "
y[1] (analytic) = 4.872886133410908 " "
y[1] (numeric) = 4.8728861334110345 " "
absolute error = 1.26121335597417780000000000000E-13 " "
relative error = 2.588226610358649000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.354999999999961 " "
y[1] (analytic) = 4.876760956633028 " "
y[1] (numeric) = 4.876760956633155 " "
absolute error = 1.2700951401711790000000000000E-13 " "
relative error = 2.604382604490148000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3559999999999608 " "
y[1] (analytic) = 4.880639656616427 " "
y[1] (numeric) = 4.880639656616554 " "
absolute error = 1.2700951401711790000000000000E-13 " "
relative error = 2.6023128719395990000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3569999999999607 " "
y[1] (analytic) = 4.884522237239806 " "
y[1] (numeric) = 4.884522237239934 " "
absolute error = 1.27897692436818030000000000000E-13 " "
relative error = 2.6184278876185796000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3579999999999606 " "
y[1] (analytic) = 4.888408702385746 " "
y[1] (numeric) = 4.888408702385875 " "
absolute error = 1.28785870856518160000000000000E-13 " "
relative error = 2.634515211333809000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3589999999999605 " "
y[1] (analytic) = 4.892299055940713 " "
y[1] (numeric) = 4.892299055940842 " "
absolute error = 1.28785870856518160000000000000E-13 " "
relative error = 2.632420246267113000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3599999999999604 " "
y[1] (analytic) = 4.89619330179506 " "
y[1] (numeric) = 4.896193301795189 " "
absolute error = 1.28785870856518160000000000000E-13 " "
relative error = 2.63032651936561000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3609999999999602 " "
y[1] (analytic) = 4.900091443843033 " "
y[1] (numeric) = 4.900091443843163 " "
absolute error = 1.29674049276218280000000000000E-13 " "
relative error = 2.6463597825129115000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3619999999999601 " "
y[1] (analytic) = 4.903993485982776 " "
y[1] (numeric) = 4.903993485982905 " "
absolute error = 1.29674049276218280000000000000E-13 " "
relative error = 2.6442541093675864000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.36299999999996 " "
y[1] (analytic) = 4.907899432116329 " "
y[1] (numeric) = 4.9078994321164595 " "
absolute error = 1.3056222769591840000000000000E-13 " "
relative error = 2.6602465984030730000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.36399999999996 " "
y[1] (analytic) = 4.911809286149640 " "
y[1] (numeric) = 4.911809286149771 " "
absolute error = 1.3056222769591840000000000000E-13 " "
relative error = 2.6581290129500510000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3649999999999598 " "
y[1] (analytic) = 4.915723051992565 " "
y[1] (numeric) = 4.915723051992695 " "
absolute error = 1.3056222769591840000000000000E-13 " "
relative error = 2.6560126824678540000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3659999999999597 " "
y[1] (analytic) = 4.919640733558866 " "
y[1] (numeric) = 4.919640733558998 " "
absolute error = 1.31450406115618530000000000000E-13 " "
relative error = 2.6719513321154120000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3669999999999596 " "
y[1] (analytic) = 4.923562334766228 " "
y[1] (numeric) = 4.92356233476636 " "
absolute error = 1.32338584535318660000000000000E-13 " "
relative error = 2.6878624771509496000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3679999999999595 " "
y[1] (analytic) = 4.927487859536252 " "
y[1] (numeric) = 4.9274878595363845 " "
absolute error = 1.32338584535318660000000000000E-13 " "
relative error = 2.685721168834572000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3689999999999594 " "
y[1] (analytic) = 4.931417311794462 " "
y[1] (numeric) = 4.931417311794595 " "
absolute error = 1.33226762955018780000000000000E-13 " "
relative error = 2.701591743947132000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3699999999999593 " "
y[1] (analytic) = 4.935350695470312 " "
y[1] (numeric) = 4.935350695470445 " "
absolute error = 1.33226762955018780000000000000E-13 " "
relative error = 2.6994386250463404000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3709999999999591 " "
y[1] (analytic) = 4.939288014497186 " "
y[1] (numeric) = 4.939288014497320 " "
absolute error = 1.33226762955018780000000000000E-13 " "
relative error = 2.6972867863543915000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.371999999999959 " "
y[1] (analytic) = 4.9432292728124025 " "
y[1] (numeric) = 4.943229272812536 " "
absolute error = 1.33226762955018780000000000000E-13 " "
relative error = 2.695136227804799000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.372999999999959 " "
y[1] (analytic) = 4.94717447435722 " "
y[1] (numeric) = 4.947174474357354 " "
absolute error = 1.3411494137471890000000000000E-13 " "
relative error = 2.710940195658741000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3739999999999588 " "
y[1] (analytic) = 4.951123623076840 " "
y[1] (numeric) = 4.951123623076975 " "
absolute error = 1.3411494137471890000000000000E-13 " "
relative error = 2.708777877199805000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3749999999999587 " "
y[1] (analytic) = 4.955076722920413 " "
y[1] (numeric) = 4.955076722920548 " "
absolute error = 1.35003119794419040000000000000E-13 " "
relative error = 2.724541462091654000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3759999999999586 " "
y[1] (analytic) = 4.959033777841040 " "
y[1] (numeric) = 4.959033777841174 " "
absolute error = 1.35003119794419040000000000000E-13 " "
relative error = 2.722367417573709000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3769999999999585 " "
y[1] (analytic) = 4.962994791795773 " "
y[1] (numeric) = 4.962994791795908 " "
absolute error = 1.35003119794419040000000000000E-13 " "
relative error = 2.7201946699116025000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3779999999999584 " "
y[1] (analytic) = 4.966959768745628 " "
y[1] (numeric) = 4.966959768745764 " "
absolute error = 1.35891298214119160000000000000E-13 " "
relative error = 2.735904950734835000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3789999999999583 " "
y[1] (analytic) = 4.970928712655583 " "
y[1] (numeric) = 4.970928712655720 " "
absolute error = 1.35891298214119160000000000000E-13 " "
relative error = 2.733720519229151400000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3799999999999581 " "
y[1] (analytic) = 4.974901627494582 " "
y[1] (numeric) = 4.9749016274947175 " "
absolute error = 1.35891298214119160000000000000E-13 " "
relative error = 2.7315373928821907000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.380999999999958 " "
y[1] (analytic) = 4.978878517235539 " "
y[1] (numeric) = 4.9788785172356755 " "
absolute error = 1.36779476633819290000000000000E-13 " "
relative error = 2.7471944969198486000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.381999999999958 " "
y[1] (analytic) = 4.982859385855345 " "
y[1] (numeric) = 4.982859385855482 " "
absolute error = 1.36779476633819290000000000000E-13 " "
relative error = 2.74499972891248000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3829999999999578 " "
y[1] (analytic) = 4.986844237334869 " "
y[1] (numeric) = 4.986844237335006 " "
absolute error = 1.3766765505351940000000000000E-13 " "
relative error = 2.7606167047056890000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3839999999999577 " "
y[1] (analytic) = 4.990833075658962 " "
y[1] (numeric) = 4.9908330756591 " "
absolute error = 1.3766765505351940000000000000E-13 " "
relative error = 2.758410328827568000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3849999999999576 " "
y[1] (analytic) = 4.994825904816464 " "
y[1] (numeric) = 4.994825904816602 " "
absolute error = 1.3766765505351940000000000000E-13 " "
relative error = 2.7562052747577803000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3859999999999575 " "
y[1] (analytic) = 4.998822728800203 " "
y[1] (numeric) = 4.9988227288003415 " "
absolute error = 1.38555833473219540000000000000E-13 " "
relative error = 2.771769294296922000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3869999999999574 " "
y[1] (analytic) = 5.002823551607004 " "
y[1] (numeric) = 5.002823551607143 " "
absolute error = 1.39444011892919660000000000000E-13 " "
relative error = 2.7873062172685975000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3879999999999573 " "
y[1] (analytic) = 5.0068283772376905 " "
y[1] (numeric) = 5.00682837723783 " "
absolute error = 1.39444011892919660000000000000E-13 " "
relative error = 2.785076726952884000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3889999999999572 " "
y[1] (analytic) = 5.010837209697088 " "
y[1] (numeric) = 5.010837209697228 " "
absolute error = 1.40332190312619800000000000000E-13 " "
relative error = 2.800573725305737000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.389999999999957 " "
y[1] (analytic) = 5.01485005299403 " "
y[1] (numeric) = 5.01485005299417 " "
absolute error = 1.40332190312619800000000000000E-13 " "
relative error = 2.7983327283900916000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.390999999999957 " "
y[1] (analytic) = 5.018866911141359 " "
y[1] (numeric) = 5.018866911141500 " "
absolute error = 1.40332190312619800000000000000E-13 " "
relative error = 2.7960930783220617000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3919999999999568 " "
y[1] (analytic) = 5.022887788155933 " "
y[1] (numeric) = 5.0228877881560745 " "
absolute error = 1.4122036873231990000000000000E-13 " "
relative error = 2.8115374001649070000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3929999999999567 " "
y[1] (analytic) = 5.026912688058633 " "
y[1] (numeric) = 5.026912688058774 " "
absolute error = 1.4122036873231990000000000000E-13 " "
relative error = 2.8092862855523054000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3939999999999566 " "
y[1] (analytic) = 5.030941614874354 " "
y[1] (numeric) = 5.0309416148744965 " "
absolute error = 1.42108547152020040000000000000E-13 " "
relative error = 2.824690843794837600000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3949999999999565 " "
y[1] (analytic) = 5.034974572632027 " "
y[1] (numeric) = 5.03497457263217 " "
absolute error = 1.42996725571720160000000000000E-13 " "
relative error = 2.840068475201232000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3959999999999564 " "
y[1] (analytic) = 5.039011565364609 " "
y[1] (numeric) = 5.039011565364753 " "
absolute error = 1.4388490399142030000000000000E-13 " "
relative error = 2.855419205234731000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3969999999999563 " "
y[1] (analytic) = 5.043052597109093 " "
y[1] (numeric) = 5.043052597109237 " "
absolute error = 1.4388490399142030000000000000E-13 " "
relative error = 2.8531311387452440000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.3979999999999562 " "
y[1] (analytic) = 5.047097671906510 " "
y[1] (numeric) = 5.047097671906656 " "
absolute error = 1.44773082411120400000000000000E-13 " "
relative error = 2.868442257754708000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.398999999999956 " "
y[1] (analytic) = 5.051146793801937 " "
y[1] (numeric) = 5.051146793802083 " "
absolute error = 1.45661260830820540000000000000E-13 " "
relative error = 2.8837265432387693000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.399999999999956 " "
y[1] (analytic) = 5.055199966844496 " "
y[1] (numeric) = 5.055199966844642 " "
absolute error = 1.45661260830820540000000000000E-13 " "
relative error = 2.8814144205208103000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4009999999999558 " "
y[1] (analytic) = 5.059257195087360 " "
y[1] (numeric) = 5.059257195087505 " "
absolute error = 1.45661260830820540000000000000E-13 " "
relative error = 2.8791036947530670000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4019999999999557 " "
y[1] (analytic) = 5.063318482587755 " "
y[1] (numeric) = 5.063318482587902 " "
absolute error = 1.46549439250520660000000000000E-13 " "
relative error = 2.894335794884116000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4029999999999556 " "
y[1] (analytic) = 5.067383833406973 " "
y[1] (numeric) = 5.06738383340712 " "
absolute error = 1.46549439250520660000000000000E-13 " "
relative error = 2.8920137899242290000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4039999999999555 " "
y[1] (analytic) = 5.071453251610364 " "
y[1] (numeric) = 5.07145325161051 " "
absolute error = 1.46549439250520660000000000000E-13 " "
relative error = 2.8896931900927236000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4049999999999554 " "
y[1] (analytic) = 5.075526741267344 " "
y[1] (numeric) = 5.075526741267492 " "
absolute error = 1.4743761767022080000000000000E-13 " "
relative error = 2.9048732316087855000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4059999999999553 " "
y[1] (analytic) = 5.079604306451406 " "
y[1] (numeric) = 5.079604306451554 " "
absolute error = 1.4743761767022080000000000000E-13 " "
relative error = 2.9025413944737005000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4069999999999552 " "
y[1] (analytic) = 5.083685951240114 " "
y[1] (numeric) = 5.083685951240263 " "
absolute error = 1.48325796089920900000000000000E-13 " "
relative error = 2.9176821210550646000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.407999999999955 " "
y[1] (analytic) = 5.0877716797151145 " "
y[1] (numeric) = 5.087771679715263 " "
absolute error = 1.48325796089920900000000000000E-13 " "
relative error = 2.91533908019682000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.408999999999955 " "
y[1] (analytic) = 5.091861495962134 " "
y[1] (numeric) = 5.091861495962283 " "
absolute error = 1.49213974509621040000000000000E-13 " "
relative error = 2.9304405594682476000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4099999999999548 " "
y[1] (analytic) = 5.095955404070992 " "
y[1] (numeric) = 5.095955404071141 " "
absolute error = 1.49213974509621040000000000000E-13 " "
relative error = 2.9280863484483965000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4109999999999547 " "
y[1] (analytic) = 5.100053408135594 " "
y[1] (numeric) = 5.100053408135744 " "
absolute error = 1.50102152929321160000000000000E-13 " "
relative error = 2.943148648009814000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4119999999999546 " "
y[1] (analytic) = 5.104155512253946 " "
y[1] (numeric) = 5.1041555122540965 " "
absolute error = 1.50102152929321160000000000000E-13 " "
relative error = 2.9407833003708284000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4129999999999545 " "
y[1] (analytic) = 5.108261720528152 " "
y[1] (numeric) = 5.108261720528303 " "
absolute error = 1.5099033134902130000000000000E-13 " "
relative error = 2.9558064877969903000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4139999999999544 " "
y[1] (analytic) = 5.112372037064422 " "
y[1] (numeric) = 5.112372037064573 " "
absolute error = 1.5099033134902130000000000000E-13 " "
relative error = 2.953430037062043000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4149999999999543 " "
y[1] (analytic) = 5.116486465973072 " "
y[1] (numeric) = 5.116486465973223 " "
absolute error = 1.5099033134902130000000000000E-13 " "
relative error = 2.951055032651306300000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4159999999999542 " "
y[1] (analytic) = 5.1206050113685295 " "
y[1] (numeric) = 5.120605011368681 " "
absolute error = 1.51878509768721410000000000000E-13 " "
relative error = 2.9660266595749485000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.416999999999954 " "
y[1] (analytic) = 5.124727677369343 " "
y[1] (numeric) = 5.124727677369495 " "
absolute error = 1.51878509768721410000000000000E-13 " "
relative error = 2.9636405938097504000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.417999999999954 " "
y[1] (analytic) = 5.128854468098177 " "
y[1] (numeric) = 5.1288544680983295 " "
absolute error = 1.52766688188421540000000000000E-13 " "
relative error = 2.9785732689168840000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4189999999999539 " "
y[1] (analytic) = 5.132985387681823 " "
y[1] (numeric) = 5.132985387681976 " "
absolute error = 1.52766688188421540000000000000E-13 " "
relative error = 2.9761761752728183000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4199999999999537 " "
y[1] (analytic) = 5.137120440251201 " "
y[1] (numeric) = 5.137120440251355 " "
absolute error = 1.53654866608121670000000000000E-13 " "
relative error = 2.9910699660490740000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4209999999999536 " "
y[1] (analytic) = 5.141259629941365 " "
y[1] (numeric) = 5.141259629941518 " "
absolute error = 1.53654866608121670000000000000E-13 " "
relative error = 2.988661877981721000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4219999999999535 " "
y[1] (analytic) = 5.145402960891503 " "
y[1] (numeric) = 5.145402960891658 " "
absolute error = 1.5454304502782180000000000000E-13 " "
relative error = 3.003516851886083300000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4229999999999534 " "
y[1] (analytic) = 5.149550437244948 " "
y[1] (numeric) = 5.149550437245103 " "
absolute error = 1.5454304502782180000000000000E-13 " "
relative error = 3.001097802830796000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4239999999999533 " "
y[1] (analytic) = 5.153702063149176 " "
y[1] (numeric) = 5.153702063149331 " "
absolute error = 1.55431223447521920000000000000E-13 " "
relative error = 3.0159140272952740000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4249999999999532 " "
y[1] (analytic) = 5.157857842755813 " "
y[1] (numeric) = 5.157857842755969 " "
absolute error = 1.56319401867222040000000000000E-13 " "
relative error = 3.0307039595279256000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.425999999999953 " "
y[1] (analytic) = 5.162017780220639 " "
y[1] (numeric) = 5.162017780220796 " "
absolute error = 1.57207580286922170000000000000E-13 " "
relative error = 3.0454676248752220000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.426999999999953 " "
y[1] (analytic) = 5.1661818797035925 " "
y[1] (numeric) = 5.16618187970375 " "
absolute error = 1.57207580286922170000000000000E-13 " "
relative error = 3.043012885484045000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4279999999999529 " "
y[1] (analytic) = 5.170350145368773 " "
y[1] (numeric) = 5.17035014536893 " "
absolute error = 1.57207580286922170000000000000E-13 " "
relative error = 3.0405596500604004000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4289999999999528 " "
y[1] (analytic) = 5.174522581384446 " "
y[1] (numeric) = 5.174522581384604 " "
absolute error = 1.5809575870662230000000000000E-13 " "
relative error = 3.0552723699646840000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4299999999999526 " "
y[1] (analytic) = 5.178699191923048 " "
y[1] (numeric) = 5.178699191923207 " "
absolute error = 1.58983937126322420000000000000E-13 " "
relative error = 3.0699589073310440000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4309999999999525 " "
y[1] (analytic) = 5.182879981161191 " "
y[1] (numeric) = 5.18287998116135 " "
absolute error = 1.58983937126322420000000000000E-13 " "
relative error = 3.0674825136642090000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4319999999999524 " "
y[1] (analytic) = 5.1870649532796635 " "
y[1] (numeric) = 5.1870649532798225 " "
absolute error = 1.58983937126322420000000000000E-13 " "
relative error = 3.065007640318837000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4329999999999523 " "
y[1] (analytic) = 5.1912541124634375 " "
y[1] (numeric) = 5.191254112463597 " "
absolute error = 1.59872115546022540000000000000E-13 " "
relative error = 3.0796434172273150000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4339999999999522 " "
y[1] (analytic) = 5.195447462901674 " "
y[1] (numeric) = 5.195447462901834 " "
absolute error = 1.59872115546022540000000000000E-13 " "
relative error = 3.0771577749096024000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.434999999999952 " "
y[1] (analytic) = 5.199645008787723 " "
y[1] (numeric) = 5.199645008787883 " "
absolute error = 1.59872115546022540000000000000E-13 " "
relative error = 3.074673660910096000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.435999999999952 " "
y[1] (analytic) = 5.20384675431913 " "
y[1] (numeric) = 5.203846754319291 " "
absolute error = 1.60760293965722670000000000000E-13 " "
relative error = 3.0892588032553714000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4369999999999519 " "
y[1] (analytic) = 5.208052703697642 " "
y[1] (numeric) = 5.2080527036978035 " "
absolute error = 1.6164847238542280000000000000E-13 " "
relative error = 3.1038179062714694000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4379999999999518 " "
y[1] (analytic) = 5.212262861129209 " "
y[1] (numeric) = 5.21226286112937 " "
absolute error = 1.6164847238542280000000000000E-13 " "
relative error = 3.1013108258780814000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4389999999999517 " "
y[1] (analytic) = 5.216477230823988 " "
y[1] (numeric) = 5.216477230824150 " "
absolute error = 1.6164847238542280000000000000E-13 " "
relative error = 3.098805290095918000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4399999999999515 " "
y[1] (analytic) = 5.220695816996348 " "
y[1] (numeric) = 5.2206958169965105 " "
absolute error = 1.62536650805122920000000000000E-13 " "
relative error = 3.1133139432482015000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4409999999999514 " "
y[1] (analytic) = 5.224918623864878 " "
y[1] (numeric) = 5.22491862386504 " "
absolute error = 1.62536650805122920000000000000E-13 " "
relative error = 3.110797746451683000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4419999999999513 " "
y[1] (analytic) = 5.229145655652383 " "
y[1] (numeric) = 5.229145655652546 " "
absolute error = 1.63424829224823040000000000000E-13 " "
relative error = 3.1252682557842104000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4429999999999512 " "
y[1] (analytic) = 5.233376916585897 " "
y[1] (numeric) = 5.23337691658606 " "
absolute error = 1.63424829224823040000000000000E-13 " "
relative error = 3.1227414311949975000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.443999999999951 " "
y[1] (analytic) = 5.23761241089668 " "
y[1] (numeric) = 5.237612410896844 " "
absolute error = 1.64313007644523170000000000000E-13 " "
relative error = 3.1371738638520746000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.444999999999951 " "
y[1] (analytic) = 5.241852142820227 " "
y[1] (numeric) = 5.241852142820392 " "
absolute error = 1.64313007644523170000000000000E-13 " "
relative error = 3.134636444669332000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4459999999999509 " "
y[1] (analytic) = 5.24609611659627 " "
y[1] (numeric) = 5.246096116596435 " "
absolute error = 1.6520118606422330000000000000E-13 " "
relative error = 3.149030867764729400000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4469999999999508 " "
y[1] (analytic) = 5.250344336468784 " "
y[1] (numeric) = 5.25034433646895 " "
absolute error = 1.66089364483923420000000000000E-13 " "
relative error = 3.1633994618271055000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4479999999999507 " "
y[1] (analytic) = 5.2545968066859885 " "
y[1] (numeric) = 5.254596806686155 " "
absolute error = 1.66089364483923420000000000000E-13 " "
relative error = 3.1608393677815594000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4489999999999505 " "
y[1] (analytic) = 5.258853531500354 " "
y[1] (numeric) = 5.25885353150052 " "
absolute error = 1.66089364483923420000000000000E-13 " "
relative error = 3.158280858918275000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4499999999999504 " "
y[1] (analytic) = 5.263114515168606 " "
y[1] (numeric) = 5.263114515168772 " "
absolute error = 1.66089364483923420000000000000E-13 " "
relative error = 3.155723935043482000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4509999999999503 " "
y[1] (analytic) = 5.267379761951728 " "
y[1] (numeric) = 5.267379761951895 " "
absolute error = 1.66977542903623540000000000000E-13 " "
relative error = 3.1700304601115975000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4519999999999502 " "
y[1] (analytic) = 5.271649276114968 " "
y[1] (numeric) = 5.271649276115136 " "
absolute error = 1.67865721323323670000000000000E-13 " "
relative error = 3.184311256894449000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.45299999999995 " "
y[1] (analytic) = 5.27592306192784 " "
y[1] (numeric) = 5.275923061928009 " "
absolute error = 1.6875389974302380000000000000E-13 " "
relative error = 3.198566350612409000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.45399999999995 " "
y[1] (analytic) = 5.280201123664131 " "
y[1] (numeric) = 5.2802011236643 " "
absolute error = 1.6875389974302380000000000000E-13 " "
relative error = 3.1959748462369003000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4549999999999499 " "
y[1] (analytic) = 5.284483465601902 " "
y[1] (numeric) = 5.284483465602071 " "
absolute error = 1.69642078162723920000000000000E-13 " "
relative error = 3.2101922404898986000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4559999999999498 " "
y[1] (analytic) = 5.288770092023495 " "
y[1] (numeric) = 5.2887700920236655 " "
absolute error = 1.70530256582424040000000000000E-13 " "
relative error = 3.2243839988358950000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4569999999999497 " "
y[1] (analytic) = 5.293061007215538 " "
y[1] (numeric) = 5.293061007215709 " "
absolute error = 1.70530256582424040000000000000E-13 " "
relative error = 3.221770093901355000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4579999999999496 " "
y[1] (analytic) = 5.2973562154689455 " "
y[1] (numeric) = 5.297356215469117 " "
absolute error = 1.71418435002124170000000000000E-13 " "
relative error = 3.2359242616450980000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4589999999999494 " "
y[1] (analytic) = 5.3016557210789275 " "
y[1] (numeric) = 5.301655721079099 " "
absolute error = 1.71418435002124170000000000000E-13 " "
relative error = 3.233300010798121300000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4599999999999493 " "
y[1] (analytic) = 5.305959528344988 " "
y[1] (numeric) = 5.30595952834516 " "
absolute error = 1.7230661342182430000000000000E-13 " "
relative error = 3.2474166548264160000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4609999999999492 " "
y[1] (analytic) = 5.3102676415709364 " "
y[1] (numeric) = 5.310267641571109 " "
absolute error = 1.7230661342182430000000000000E-13 " "
relative error = 3.2447820910746195000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4619999999999491 " "
y[1] (analytic) = 5.3145800650648845 " "
y[1] (numeric) = 5.314580065065058 " "
absolute error = 1.73194791841524420000000000000E-13 " "
relative error = 3.2588612782411797000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.462999999999949 " "
y[1] (analytic) = 5.318896803139258 " "
y[1] (numeric) = 5.318896803139432 " "
absolute error = 1.74082970261224550000000000000E-13 " "
relative error = 3.272914980386145000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.463999999999949 " "
y[1] (analytic) = 5.323217860110795 " "
y[1] (numeric) = 5.323217860110969 " "
absolute error = 1.74082970261224550000000000000E-13 " "
relative error = 3.2702582316929873000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4649999999999488 " "
y[1] (analytic) = 5.327543240300551 " "
y[1] (numeric) = 5.327543240300726 " "
absolute error = 1.74971148680924670000000000000E-13 " "
relative error = 3.2842745856541140000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4659999999999487 " "
y[1] (analytic) = 5.33187294803391 " "
y[1] (numeric) = 5.331872948034085 " "
absolute error = 1.74971148680924670000000000000E-13 " "
relative error = 3.2816076149272094000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4669999999999486 " "
y[1] (analytic) = 5.336206987640576 " "
y[1] (numeric) = 5.336206987640752 " "
absolute error = 1.7585932710062480000000000000E-13 " "
relative error = 3.2955866874718376000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4679999999999485 " "
y[1] (analytic) = 5.340545363454592 " "
y[1] (numeric) = 5.340545363454768 " "
absolute error = 1.7585932710062480000000000000E-13 " "
relative error = 3.2929095276304926000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4689999999999483 " "
y[1] (analytic) = 5.344888079814333 " "
y[1] (numeric) = 5.34488807981451 " "
absolute error = 1.76747505520324920000000000000E-13 " "
relative error = 3.3068513854917736000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4699999999999482 " "
y[1] (analytic) = 5.349235141062516 " "
y[1] (numeric) = 5.349235141062693 " "
absolute error = 1.77635683940025050000000000000E-13 " "
relative error = 3.3207679089751390000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4709999999999481 " "
y[1] (analytic) = 5.353586551546202 " "
y[1] (numeric) = 5.35358655154638 " "
absolute error = 1.77635683940025050000000000000E-13 " "
relative error = 3.318068779306855300000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.471999999999948 " "
y[1] (analytic) = 5.3579423156168025 " "
y[1] (numeric) = 5.357942315616981 " "
absolute error = 1.78523862359725170000000000000E-13 " "
relative error = 3.3319481965937076000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.472999999999948 " "
y[1] (analytic) = 5.362302437630082 " "
y[1] (numeric) = 5.362302437630260 " "
absolute error = 1.78523862359725170000000000000E-13 " "
relative error = 3.329238968450004000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4739999999999478 " "
y[1] (analytic) = 5.3666669219461625 " "
y[1] (numeric) = 5.366666921946342 " "
absolute error = 1.7941204077942530000000000000E-13 " "
relative error = 3.3430813461842995000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4749999999999477 " "
y[1] (analytic) = 5.371035772929530 " "
y[1] (numeric) = 5.371035772929709 " "
absolute error = 1.7941204077942530000000000000E-13 " "
relative error = 3.3403620523936370000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4759999999999476 " "
y[1] (analytic) = 5.375408994949033 " "
y[1] (numeric) = 5.375408994949213 " "
absolute error = 1.80300219199125420000000000000E-13 " "
relative error = 3.3541674571840640000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4769999999999475 " "
y[1] (analytic) = 5.379786592377896 " "
y[1] (numeric) = 5.3797865923780765 " "
absolute error = 1.80300219199125420000000000000E-13 " "
relative error = 3.351438130549184000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4779999999999474 " "
y[1] (analytic) = 5.384168569593717 " "
y[1] (numeric) = 5.384168569593897 " "
absolute error = 1.80300219199125420000000000000E-13 " "
relative error = 3.3487105180425410000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4789999999999472 " "
y[1] (analytic) = 5.388554930978472 " "
y[1] (numeric) = 5.388554930978653 " "
absolute error = 1.81188397618825550000000000000E-13 " "
relative error = 3.3624673022665974000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4799999999999471 " "
y[1] (analytic) = 5.392945680918524 " "
y[1] (numeric) = 5.392945680918706 " "
absolute error = 1.82076576038525670000000000000E-13 " "
relative error = 3.376198960852772000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.480999999999947 " "
y[1] (analytic) = 5.397340823804623 " "
y[1] (numeric) = 5.397340823804806 " "
absolute error = 1.8296475445822580000000000000E-13 " "
relative error = 3.389905518867209000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.481999999999947 " "
y[1] (analytic) = 5.401740364031913 " "
y[1] (numeric) = 5.401740364032096 " "
absolute error = 1.8296475445822580000000000000E-13 " "
relative error = 3.387144552087636000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4829999999999468 " "
y[1] (analytic) = 5.406144305999933 " "
y[1] (numeric) = 5.406144306000117 " "
absolute error = 1.83852932877925920000000000000E-13 " "
relative error = 3.400814378444899000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4839999999999467 " "
y[1] (analytic) = 5.410552654112627 " "
y[1] (numeric) = 5.410552654112811 " "
absolute error = 1.83852932877925920000000000000E-13 " "
relative error = 3.3980435018625516000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4849999999999466 " "
y[1] (analytic) = 5.414965412778342 " "
y[1] (numeric) = 5.4149654127785265 " "
absolute error = 1.84741111297626050000000000000E-13 " "
relative error = 3.411676663006385000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4859999999999465 " "
y[1] (analytic) = 5.419382586409838 " "
y[1] (numeric) = 5.4193825864100225 " "
absolute error = 1.84741111297626050000000000000E-13 " "
relative error = 3.4088959093034055000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4869999999999464 " "
y[1] (analytic) = 5.423804179424288 " "
y[1] (numeric) = 5.423804179424473 " "
absolute error = 1.84741111297626050000000000000E-13 " "
relative error = 3.4061169095753646000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4879999999999463 " "
y[1] (analytic) = 5.428230196243287 " "
y[1] (numeric) = 5.428230196243472 " "
absolute error = 1.85629289717326170000000000000E-13 " "
relative error = 3.4197018734723994000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4889999999999461 " "
y[1] (analytic) = 5.43266064129285 " "
y[1] (numeric) = 5.432660641293037 " "
absolute error = 1.8651746813702630000000000000E-13 " "
relative error = 3.433261903372624000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.489999999999946 " "
y[1] (analytic) = 5.437095519003425 " "
y[1] (numeric) = 5.437095519003612 " "
absolute error = 1.8651746813702630000000000000E-13 " "
relative error = 3.430461493367573000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.490999999999946 " "
y[1] (analytic) = 5.441534833809889 " "
y[1] (numeric) = 5.441534833810076 " "
absolute error = 1.87405646556726420000000000000E-13 " "
relative error = 3.4439850571628966000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4919999999999458 " "
y[1] (analytic) = 5.445978590151555 " "
y[1] (numeric) = 5.445978590151744 " "
absolute error = 1.88293824976426550000000000000E-13 " "
relative error = 3.4574837535522984000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4929999999999457 " "
y[1] (analytic) = 5.450426792472183 " "
y[1] (numeric) = 5.450426792472372 " "
absolute error = 1.89182003396126670000000000000E-13 " "
relative error = 3.470957607529267000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4939999999999456 " "
y[1] (analytic) = 5.454879445219975 " "
y[1] (numeric) = 5.454879445220164 " "
absolute error = 1.89182003396126670000000000000E-13 " "
relative error = 3.4681243700427494000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4949999999999455 " "
y[1] (analytic) = 5.459336552847582 " "
y[1] (numeric) = 5.459336552847772 " "
absolute error = 1.9007018181582680000000000000E-13 " "
relative error = 3.481561907310632400000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4959999999999454 " "
y[1] (analytic) = 5.463798119812115 " "
y[1] (numeric) = 5.463798119812305 " "
absolute error = 1.9007018181582680000000000000E-13 " "
relative error = 3.4787189725516950000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4969999999999453 " "
y[1] (analytic) = 5.468264150575139 " "
y[1] (numeric) = 5.468264150575329 " "
absolute error = 1.9007018181582680000000000000E-13 " "
relative error = 3.475877839512118000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.4979999999999452 " "
y[1] (analytic) = 5.472734649602685 " "
y[1] (numeric) = 5.472734649602876 " "
absolute error = 1.90958360235526920000000000000E-13 " "
relative error = 3.4892676598049620000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.498999999999945 " "
y[1] (analytic) = 5.477209621365255 " "
y[1] (numeric) = 5.477209621365446 " "
absolute error = 1.91846538655227050000000000000E-13 " "
relative error = 3.5026327622532580000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.499999999999945 " "
y[1] (analytic) = 5.481689070337818 " "
y[1] (numeric) = 5.48168907033801 " "
absolute error = 1.92734717074927180000000000000E-13 " "
relative error = 3.5159731718065070000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5009999999999448 " "
y[1] (analytic) = 5.486173000999825 " "
y[1] (numeric) = 5.486173001000019 " "
absolute error = 1.9362289549462730000000000000E-13 " "
relative error = 3.5292889134072260000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5019999999999447 " "
y[1] (analytic) = 5.490661417835208 " "
y[1] (numeric) = 5.490661417835401 " "
absolute error = 1.9362289549462730000000000000E-13 " "
relative error = 3.5264038475526070000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5029999999999446 " "
y[1] (analytic) = 5.495154325332382 " "
y[1] (numeric) = 5.495154325332576 " "
absolute error = 1.94511073914327430000000000000E-13 " "
relative error = 3.5396835538838517000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5039999999999445 " "
y[1] (analytic) = 5.499651727984256 " "
y[1] (numeric) = 5.4996517279844515 " "
absolute error = 1.95399252334027550000000000000E-13 " "
relative error = 3.5529386586384026000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5049999999999444 " "
y[1] (analytic) = 5.504153630288234 " "
y[1] (numeric) = 5.504153630288429 " "
absolute error = 1.95399252334027550000000000000E-13 " "
relative error = 3.550032674574804000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5059999999999443 " "
y[1] (analytic) = 5.508660036746217 " "
y[1] (numeric) = 5.508660036746412 " "
absolute error = 1.95399252334027550000000000000E-13 " "
relative error = 3.5471285399823554000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5069999999999442 " "
y[1] (analytic) = 5.513170951864612 " "
y[1] (numeric) = 5.513170951864808 " "
absolute error = 1.96287430753727680000000000000E-13 " "
relative error = 3.5603363738855450000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.507999999999944 " "
y[1] (analytic) = 5.517686380154335 " "
y[1] (numeric) = 5.517686380154532 " "
absolute error = 1.9717560917342780000000000000E-13 " "
relative error = 3.5735196890243080000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.508999999999944 " "
y[1] (analytic) = 5.522206326130815 " "
y[1] (numeric) = 5.522206326131013 " "
absolute error = 1.9717560917342780000000000000E-13 " "
relative error = 3.5705947501527113000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5099999999999438 " "
y[1] (analytic) = 5.526730794313998 " "
y[1] (numeric) = 5.526730794314196 " "
absolute error = 1.98063787593127930000000000000E-13 " "
relative error = 3.583742269424441000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5109999999999437 " "
y[1] (analytic) = 5.531259789228352 " "
y[1] (numeric) = 5.531259789228551 " "
absolute error = 1.98951966012828050000000000000E-13 " "
relative error = 3.59686533618019000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5119999999999436 " "
y[1] (analytic) = 5.535793315402874 " "
y[1] (numeric) = 5.535793315403073 " "
absolute error = 1.99840144432528180000000000000E-13 " "
relative error = 3.6099639752895035000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5129999999999435 " "
y[1] (analytic) = 5.540331377371088 " "
y[1] (numeric) = 5.540331377371288 " "
absolute error = 1.99840144432528180000000000000E-13 " "
relative error = 3.607007069085337300000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5139999999999434 " "
y[1] (analytic) = 5.544873979671059 " "
y[1] (numeric) = 5.544873979671259 " "
absolute error = 1.99840144432528180000000000000E-13 " "
relative error = 3.60405205177239000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5149999999999433 " "
y[1] (analytic) = 5.549421126845387 " "
y[1] (numeric) = 5.549421126845588 " "
absolute error = 2.0072832285222830000000000000E-13 " "
relative error = 3.617103807119679000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5159999999999432 " "
y[1] (analytic) = 5.553972823441223 " "
y[1] (numeric) = 5.553972823441423 " "
absolute error = 2.0072832285222830000000000000E-13 " "
relative error = 3.6141394499632734000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.516999999999943 " "
y[1] (analytic) = 5.55852907401026 " "
y[1] (numeric) = 5.558529074010462 " "
absolute error = 2.01616501271928430000000000000E-13 " "
relative error = 3.6271556483282014000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.517999999999943 " "
y[1] (analytic) = 5.563089883108751 " "
y[1] (numeric) = 5.563089883108954 " "
absolute error = 2.02504679691628550000000000000E-13 " "
relative error = 3.640147542941827300000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5189999999999428 " "
y[1] (analytic) = 5.567655255297506 " "
y[1] (numeric) = 5.567655255297710 " "
absolute error = 2.03392858111328680000000000000E-13 " "
relative error = 3.65311515862633000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5199999999999427 " "
y[1] (analytic) = 5.572225195141898 " "
y[1] (numeric) = 5.572225195142101 " "
absolute error = 2.03392858111328680000000000000E-13 " "
relative error = 3.650119135325959000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5209999999999426 " "
y[1] (analytic) = 5.5767997072118645 " "
y[1] (numeric) = 5.576799707212069 " "
absolute error = 2.0428103653102880000000000000E-13 " "
relative error = 3.663051342275293000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5219999999999425 " "
y[1] (analytic) = 5.58137879608192 " "
y[1] (numeric) = 5.581378796082125 " "
absolute error = 2.0428103653102880000000000000E-13 " "
relative error = 3.6600460924535766000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5229999999999424 " "
y[1] (analytic) = 5.585962466331154 " "
y[1] (numeric) = 5.585962466331359 " "
absolute error = 2.05169214950728930000000000000E-13 " "
relative error = 3.672942956336826000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5239999999999423 " "
y[1] (analytic) = 5.590550722543235 " "
y[1] (numeric) = 5.590550722543441 " "
absolute error = 2.06057393370429050000000000000E-13 " "
relative error = 3.685815648528632000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5249999999999422 " "
y[1] (analytic) = 5.595143569306423 " "
y[1] (numeric) = 5.595143569306629 " "
absolute error = 2.06057393370429050000000000000E-13 " "
relative error = 3.682790098556345500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.525999999999942 " "
y[1] (analytic) = 5.599741011213562 " "
y[1] (numeric) = 5.599741011213768 " "
absolute error = 2.06057393370429050000000000000E-13 " "
relative error = 3.679766492018044000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.526999999999942 " "
y[1] (analytic) = 5.604343052862096 " "
y[1] (numeric) = 5.604343052862303 " "
absolute error = 2.06945571790129180000000000000E-13 " "
relative error = 3.692592866606259000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5279999999999418 " "
y[1] (analytic) = 5.608949698854066 " "
y[1] (numeric) = 5.608949698854274 " "
absolute error = 2.0783375020982930000000000000E-13 " "
relative error = 3.705395151828348400000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5289999999999417 " "
y[1] (analytic) = 5.61356095379612 " "
y[1] (numeric) = 5.613560953796328 " "
absolute error = 2.0783375020982930000000000000E-13 " "
relative error = 3.7023513580855233000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5299999999999416 " "
y[1] (analytic) = 5.618176822299511 " "
y[1] (numeric) = 5.61817682229972 " "
absolute error = 2.08721928629529430000000000000E-13 " "
relative error = 3.715118538118561000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5309999999999415 " "
y[1] (analytic) = 5.62279730898011 " "
y[1] (numeric) = 5.622797308980319 " "
absolute error = 2.08721928629529430000000000000E-13 " "
relative error = 3.712065670519224500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5319999999999414 " "
y[1] (analytic) = 5.627422418458403 " "
y[1] (numeric) = 5.627422418458613 " "
absolute error = 2.09610107049229550000000000000E-13 " "
relative error = 3.724797810835941000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5329999999999413 " "
y[1] (analytic) = 5.6320521553595 " "
y[1] (numeric) = 5.632052155359710 " "
absolute error = 2.10498285468929680000000000000E-13 " "
relative error = 3.737505968736778000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5339999999999412 " "
y[1] (analytic) = 5.636686524313139 " "
y[1] (numeric) = 5.636686524313350 " "
absolute error = 2.10498285468929680000000000000E-13 " "
relative error = 3.7344330673875825000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.534999999999941 " "
y[1] (analytic) = 5.641325529953687 " "
y[1] (numeric) = 5.641325529953899 " "
absolute error = 2.1138646388862980000000000000E-13 " "
relative error = 3.7471062920626247000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.535999999999941 " "
y[1] (analytic) = 5.645969176920153 " "
y[1] (numeric) = 5.645969176920365 " "
absolute error = 2.1138646388862980000000000000E-13 " "
relative error = 3.744024405105591000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5369999999999409 " "
y[1] (analytic) = 5.650617469856183 " "
y[1] (numeric) = 5.650617469856395 " "
absolute error = 2.12274642308329930000000000000E-13 " "
relative error = 3.7566627619146314000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5379999999999407 " "
y[1] (analytic) = 5.65527041341007 " "
y[1] (numeric) = 5.655270413410283 " "
absolute error = 2.12274642308329930000000000000E-13 " "
relative error = 3.753571921246653000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5389999999999406 " "
y[1] (analytic) = 5.659928012234759 " "
y[1] (numeric) = 5.659928012234972 " "
absolute error = 2.13162820728030060000000000000E-13 " "
relative error = 3.7661754755051224000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5399999999999405 " "
y[1] (analytic) = 5.664590270987849 " "
y[1] (numeric) = 5.664590270988062 " "
absolute error = 2.13162820728030060000000000000E-13 " "
relative error = 3.763075712991622000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5409999999999404 " "
y[1] (analytic) = 5.669257194331597 " "
y[1] (numeric) = 5.669257194331811 " "
absolute error = 2.14050999147730180000000000000E-13 " "
relative error = 3.775644529970327300000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5419999999999403 " "
y[1] (analytic) = 5.67392878693293 " "
y[1] (numeric) = 5.673928786933144 " "
absolute error = 2.14050999147730180000000000000E-13 " "
relative error = 3.772535877445098000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5429999999999402 " "
y[1] (analytic) = 5.678605053463438 " "
y[1] (numeric) = 5.678605053463653 " "
absolute error = 2.1493917756743030000000000000E-13 " "
relative error = 3.785070022369961000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.54399999999994 " "
y[1] (analytic) = 5.68328599859939 " "
y[1] (numeric) = 5.683285998599606 " "
absolute error = 2.15827355987130430000000000000E-13 " "
relative error = 3.797580414575647000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.54499999999994 " "
y[1] (analytic) = 5.6879716270217315 " "
y[1] (numeric) = 5.687971627021947 " "
absolute error = 2.15827355987130430000000000000E-13 " "
relative error = 3.794452049686812000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5459999999999399 " "
y[1] (analytic) = 5.69266194341609 " "
y[1] (numeric) = 5.692661943416306 " "
absolute error = 2.15827355987130430000000000000E-13 " "
relative error = 3.791325712512191000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5469999999999398 " "
y[1] (analytic) = 5.697356952472783 " "
y[1] (numeric) = 5.697356952473 " "
absolute error = 2.16715534406830560000000000000E-13 " "
relative error = 3.803790708826328000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5479999999999396 " "
y[1] (analytic) = 5.7020566588868205 " "
y[1] (numeric) = 5.702056658887038 " "
absolute error = 2.17603712826530680000000000000E-13 " "
relative error = 3.816232034232578000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5489999999999395 " "
y[1] (analytic) = 5.706761067357909 " "
y[1] (numeric) = 5.706761067358126 " "
absolute error = 2.17603712826530680000000000000E-13 " "
relative error = 3.8130860966162000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5499999999999394 " "
y[1] (analytic) = 5.711470182590456 " "
y[1] (numeric) = 5.711470182590674 " "
absolute error = 2.1849189124623080000000000000E-13 " "
relative error = 3.82549298624077050000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5509999999999393 " "
y[1] (analytic) = 5.7161840092935785 " "
y[1] (numeric) = 5.716184009293798 " "
absolute error = 2.19380069665930930000000000000E-13 " "
relative error = 3.837876270414929000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5519999999999392 " "
y[1] (analytic) = 5.720902552181103 " "
y[1] (numeric) = 5.7209025521813235 " "
absolute error = 2.20268248085631060000000000000E-13 " "
relative error = 3.850235973721549000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.552999999999939 " "
y[1] (analytic) = 5.725625815971574 " "
y[1] (numeric) = 5.725625815971794 " "
absolute error = 2.20268248085631060000000000000E-13 " "
relative error = 3.84705978290085000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.553999999999939 " "
y[1] (analytic) = 5.730353805388254 " "
y[1] (numeric) = 5.730353805388475 " "
absolute error = 2.21156426505331180000000000000E-13 " "
relative error = 3.859385197077669400000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5549999999999389 " "
y[1] (analytic) = 5.735086525159134 " "
y[1] (numeric) = 5.735086525159355 " "
absolute error = 2.21156426505331180000000000000E-13 " "
relative error = 3.856200347373045000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5559999999999388 " "
y[1] (analytic) = 5.739823980016934 " "
y[1] (numeric) = 5.739823980017155 " "
absolute error = 2.21156426505331180000000000000E-13 " "
relative error = 3.853017571188284000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5569999999999387 " "
y[1] (analytic) = 5.744566174699108 " "
y[1] (numeric) = 5.74456617469933 " "
absolute error = 2.2204460492503130000000000000E-13 " "
relative error = 3.865298060330233400000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5579999999999385 " "
y[1] (analytic) = 5.749313113947853 " "
y[1] (numeric) = 5.749313113948076 " "
absolute error = 2.22932783344731430000000000000E-13 " "
relative error = 3.877555090953313500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5589999999999384 " "
y[1] (analytic) = 5.754064802510108 " "
y[1] (numeric) = 5.754064802510330 " "
absolute error = 2.22932783344731430000000000000E-13 " "
relative error = 3.8743530181912617000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5599999999999383 " "
y[1] (analytic) = 5.75882124513756 " "
y[1] (numeric) = 5.758821245137784 " "
absolute error = 2.23820961764431560000000000000E-13 " "
relative error = 3.8865759542964456000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5609999999999382 " "
y[1] (analytic) = 5.763582446586655 " "
y[1] (numeric) = 5.763582446586879 " "
absolute error = 2.23820961764431560000000000000E-13 " "
relative error = 3.8833653172947014000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.561999999999938 " "
y[1] (analytic) = 5.768348411618594 " "
y[1] (numeric) = 5.768348411618818 " "
absolute error = 2.23820961764431560000000000000E-13 " "
relative error = 3.880156776133908400000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.562999999999938 " "
y[1] (analytic) = 5.773119144999340 " "
y[1] (numeric) = 5.773119144999566 " "
absolute error = 2.24709140184131680000000000000E-13 " "
relative error = 3.892335053898447500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5639999999999379 " "
y[1] (analytic) = 5.777894651499631 " "
y[1] (numeric) = 5.777894651499857 " "
absolute error = 2.2559731860383180000000000000E-13 " "
relative error = 3.904489995249028000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5649999999999378 " "
y[1] (analytic) = 5.7826749358949705 " "
y[1] (numeric) = 5.782674935895197 " "
absolute error = 2.26485497023531930000000000000E-13 " "
relative error = 3.916621624668227000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5659999999999377 " "
y[1] (analytic) = 5.787460002965645 " "
y[1] (numeric) = 5.787460002965871 " "
absolute error = 2.26485497023531930000000000000E-13 " "
relative error = 3.913383365197770600000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5669999999999376 " "
y[1] (analytic) = 5.792249857496722 " "
y[1] (numeric) = 5.792249857496948 " "
absolute error = 2.26485497023531930000000000000E-13 " "
relative error = 3.910147224232723400000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5679999999999374 " "
y[1] (analytic) = 5.7970445042780545 " "
y[1] (numeric) = 5.797044504278282 " "
absolute error = 2.27373675443232060000000000000E-13 " "
relative error = 3.922234429551761000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5689999999999373 " "
y[1] (analytic) = 5.801843948104291 " "
y[1] (numeric) = 5.801843948104520 " "
absolute error = 2.2826185386293218000000000000E-13 " "
relative error = 3.9342984041739876000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5699999999999372 " "
y[1] (analytic) = 5.806648193774876 " "
y[1] (numeric) = 5.806648193775105 " "
absolute error = 2.2915003228263230000000000000E-13 " "
relative error = 3.94633917254186000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5709999999999371 " "
y[1] (analytic) = 5.811457246094056 " "
y[1] (numeric) = 5.811457246094285 " "
absolute error = 2.2915003228263230000000000000E-13 " "
relative error = 3.943073528358942400000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.571999999999937 " "
y[1] (analytic) = 5.816271109870883 " "
y[1] (numeric) = 5.816271109871113 " "
absolute error = 2.30038210702332440000000000000E-13 " "
relative error = 3.9550806067470110000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.572999999999937 " "
y[1] (analytic) = 5.82108978991922 " "
y[1] (numeric) = 5.821089789919451 " "
absolute error = 2.30926389122032560000000000000E-13 " "
relative error = 3.967064543858155300000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5739999999999368 " "
y[1] (analytic) = 5.82591329105775 " "
y[1] (numeric) = 5.825913291057981 " "
absolute error = 2.30926389122032560000000000000E-13 " "
relative error = 3.963780056192797700000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5749999999999367 " "
y[1] (analytic) = 5.830741618109973 " "
y[1] (numeric) = 5.8307416181102045 " "
absolute error = 2.3181456754173269000000000000E-13 " "
relative error = 3.9757304083193980000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5759999999999366 " "
y[1] (analytic) = 5.835574775904216 " "
y[1] (numeric) = 5.8355747759044485 " "
absolute error = 2.3270274596143280000000000000E-13 " "
relative error = 3.9876576840775000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5769999999999365 " "
y[1] (analytic) = 5.840412769273638 " "
y[1] (numeric) = 5.840412769273871 " "
absolute error = 2.3270274596143280000000000000E-13 " "
relative error = 3.98435444812531000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5779999999999363 " "
y[1] (analytic) = 5.845255603056233 " "
y[1] (numeric) = 5.845255603056467 " "
absolute error = 2.33590924381132940000000000000E-13 " "
relative error = 3.996248243772236300000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5789999999999362 " "
y[1] (analytic) = 5.850103282094835 " "
y[1] (numeric) = 5.850103282095069 " "
absolute error = 2.33590924381132940000000000000E-13 " "
relative error = 3.992936758844495000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5799999999999361 " "
y[1] (analytic) = 5.854955811237123 " "
y[1] (numeric) = 5.854955811237358 " "
absolute error = 2.34479102800833060000000000000E-13 " "
relative error = 4.00479713870443000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.580999999999936 " "
y[1] (analytic) = 5.859813195335627 " "
y[1] (numeric) = 5.859813195335862 " "
absolute error = 2.3536728122053320000000000000E-13 " "
relative error = 4.0166345474610693000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.581999999999936 " "
y[1] (analytic) = 5.864675439247732 " "
y[1] (numeric) = 5.864675439247967 " "
absolute error = 2.3536728122053320000000000000E-13 " "
relative error = 4.013304464308497000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5829999999999358 " "
y[1] (analytic) = 5.86954254783568 " "
y[1] (numeric) = 5.869542547835916 " "
absolute error = 2.3625545964023330000000000000E-13 " "
relative error = 4.02510856195002000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5839999999999357 " "
y[1] (analytic) = 5.874414525966582 " "
y[1] (numeric) = 5.874414525966820 " "
absolute error = 2.37143638059933440000000000000E-13 " "
relative error = 4.03688975321185030000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5849999999999356 " "
y[1] (analytic) = 5.879291378512417 " "
y[1] (numeric) = 5.879291378512654 " "
absolute error = 2.37143638059933440000000000000E-13 " "
relative error = 4.033541166655626500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5859999999999355 " "
y[1] (analytic) = 5.884173110350036 " "
y[1] (numeric) = 5.884173110350274 " "
absolute error = 2.38031816479633560000000000000E-13 " "
relative error = 4.045289151349824000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5869999999999354 " "
y[1] (analytic) = 5.8890597263611735 " "
y[1] (numeric) = 5.889059726361412 " "
absolute error = 2.3891999489933370000000000000E-13 " "
relative error = 4.05701429431691960000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5879999999999352 " "
y[1] (analytic) = 5.893951231432444 " "
y[1] (numeric) = 5.893951231432684 " "
absolute error = 2.3980817331903380000000000000E-13 " "
relative error = 4.0687166198481034000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5889999999999351 " "
y[1] (analytic) = 5.8988476304553545 " "
y[1] (numeric) = 5.898847630455594 " "
absolute error = 2.3980817331903380000000000000E-13 " "
relative error = 4.065339339855471000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.589999999999935 " "
y[1] (analytic) = 5.903748928326303 " "
y[1] (numeric) = 5.903748928326544 " "
absolute error = 2.40696351738733940000000000000E-13 " "
relative error = 4.077008603531023000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.590999999999935 " "
y[1] (analytic) = 5.908655129946589 " "
y[1] (numeric) = 5.90865512994683 " "
absolute error = 2.40696351738733940000000000000E-13 " "
relative error = 4.073623294052528000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5919999999999348 " "
y[1] (analytic) = 5.913566240222414 " "
y[1] (numeric) = 5.913566240222655 " "
absolute error = 2.41584530158434060000000000000E-13 " "
relative error = 4.085259559878505000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5929999999999347 " "
y[1] (analytic) = 5.918482264064888 " "
y[1] (numeric) = 5.918482264065130 " "
absolute error = 2.4247270857813420000000000000E-13 " "
relative error = 4.0968731130673500000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5939999999999346 " "
y[1] (analytic) = 5.923403206390037 " "
y[1] (numeric) = 5.9234032063902795 " "
absolute error = 2.4247270857813420000000000000E-13 " "
relative error = 4.09346958377846000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5949999999999345 " "
y[1] (analytic) = 5.928329072118802 " "
y[1] (numeric) = 5.928329072119045 " "
absolute error = 2.4247270857813420000000000000E-13 " "
relative error = 4.0900683080919753000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5959999999999344 " "
y[1] (analytic) = 5.93325986617705 " "
y[1] (numeric) = 5.933259866177293 " "
absolute error = 2.4336088699783430000000000000E-13 " "
relative error = 4.101638770031455500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5969999999999342 " "
y[1] (analytic) = 5.938195593495575 " "
y[1] (numeric) = 5.938195593495819 " "
absolute error = 2.44249065417534440000000000000E-13 " "
relative error = 4.113186599731971600000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.5979999999999341 " "
y[1] (analytic) = 5.943136259010105 " "
y[1] (numeric) = 5.94313625901035 " "
absolute error = 2.45137243837234560000000000000E-13 " "
relative error = 4.124711821398906500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.598999999999934 " "
y[1] (analytic) = 5.9480818676613065 " "
y[1] (numeric) = 5.948081867661552 " "
absolute error = 2.45137243837234560000000000000E-13 " "
relative error = 4.12128227706487050000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.599999999999934 " "
y[1] (analytic) = 5.953032424394787 " "
y[1] (numeric) = 5.953032424395033 " "
absolute error = 2.4602542225693470000000000000E-13 " "
relative error = 4.132774772883028000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6009999999999338 " "
y[1] (analytic) = 5.957987934161106 " "
y[1] (numeric) = 5.957987934161352 " "
absolute error = 2.4602542225693470000000000000E-13 " "
relative error = 4.1293373698578234000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6019999999999337 " "
y[1] (analytic) = 5.962948401915772 " "
y[1] (numeric) = 5.962948401916018 " "
absolute error = 2.4602542225693470000000000000E-13 " "
relative error = 4.125902249596723500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6029999999999336 " "
y[1] (analytic) = 5.967913832619252 " "
y[1] (numeric) = 5.967913832619499 " "
absolute error = 2.4691360067663481000000000000E-13 " "
relative error = 4.137351972594871500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6039999999999335 " "
y[1] (analytic) = 5.97288423123698 " "
y[1] (numeric) = 5.972884231237227 " "
absolute error = 2.4691360067663481000000000000E-13 " "
relative error = 4.133909031508203000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6049999999999334 " "
y[1] (analytic) = 5.977859602739353 " "
y[1] (numeric) = 5.977859602739601 " "
absolute error = 2.47801779096334940000000000000E-13 " "
relative error = 4.145326179671062000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6059999999999333 " "
y[1] (analytic) = 5.982839952101744 " "
y[1] (numeric) = 5.982839952101992 " "
absolute error = 2.47801779096334940000000000000E-13 " "
relative error = 4.141875448452926000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6069999999999331 " "
y[1] (analytic) = 5.987825284304503 " "
y[1] (numeric) = 5.987825284304751 " "
absolute error = 2.48689957516035070000000000000E-13 " "
relative error = 4.153260085392102600000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.607999999999933 " "
y[1] (analytic) = 5.992815604332960 " "
y[1] (numeric) = 5.99281560433321 " "
absolute error = 2.4957813593573520000000000000E-13 " "
relative error = 4.164622314680994600000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.608999999999933 " "
y[1] (analytic) = 5.997810917177440 " "
y[1] (numeric) = 5.99781091717769 " "
absolute error = 2.5046631435543530000000000000E-13 " "
relative error = 4.1759621604294317000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6099999999999328 " "
y[1] (analytic) = 6.002811227833251 " "
y[1] (numeric) = 6.002811227833503 " "
absolute error = 2.51354492775135440000000000000E-13 " "
relative error = 4.187279646737505000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6109999999999327 " "
y[1] (analytic) = 6.007816541300708 " "
y[1] (numeric) = 6.0078165413009605 " "
absolute error = 2.52242671194835570000000000000E-13 " "
relative error = 4.198574797695543000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6119999999999326 " "
y[1] (analytic) = 6.012826862585124 " "
y[1] (numeric) = 6.012826862585377 " "
absolute error = 2.5313084961453570000000000000E-13 " "
relative error = 4.2098476373840893000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6129999999999325 " "
y[1] (analytic) = 6.0178421966968205 " "
y[1] (numeric) = 6.017842196697074 " "
absolute error = 2.5313084961453570000000000000E-13 " "
relative error = 4.206339105293897500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6139999999999324 " "
y[1] (analytic) = 6.022862548651130 " "
y[1] (numeric) = 6.022862548651385 " "
absolute error = 2.5401902803423580000000000000E-13 " "
relative error = 4.217579697068223000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6149999999999323 " "
y[1] (analytic) = 6.027887923468409 " "
y[1] (numeric) = 6.027887923468663 " "
absolute error = 2.5401902803423580000000000000E-13 " "
relative error = 4.2140635535916676000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6159999999999322 " "
y[1] (analytic) = 6.03291832617403 " "
y[1] (numeric) = 6.0329183261742845 " "
absolute error = 2.54907206453935940000000000000E-13 " "
relative error = 4.22527196080232040000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.616999999999932 " "
y[1] (analytic) = 6.037953761798395 " "
y[1] (numeric) = 6.037953761798650 " "
absolute error = 2.55795384873636070000000000000E-13 " "
relative error = 4.236458160578027000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.617999999999932 " "
y[1] (analytic) = 6.042994235376943 " "
y[1] (numeric) = 6.042994235377199 " "
absolute error = 2.55795384873636070000000000000E-13 " "
relative error = 4.23292452235278950000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6189999999999318 " "
y[1] (analytic) = 6.048039751950146 " "
y[1] (numeric) = 6.0480397519504026 " "
absolute error = 2.5668356329333620000000000000E-13 " "
relative error = 4.244078640696276600000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6199999999999317 " "
y[1] (analytic) = 6.053090316563522 " "
y[1] (numeric) = 6.053090316563779 " "
absolute error = 2.5668356329333620000000000000E-13 " "
relative error = 4.2405374753942430000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6209999999999316 " "
y[1] (analytic) = 6.058145934267635 " "
y[1] (numeric) = 6.058145934267893 " "
absolute error = 2.5757174171303630000000000000E-13 " "
relative error = 4.251659575516217300000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6219999999999315 " "
y[1] (analytic) = 6.0632066101181055 " "
y[1] (numeric) = 6.063206610118363 " "
absolute error = 2.5757174171303630000000000000E-13 " "
relative error = 4.248110913509165000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6229999999999314 " "
y[1] (analytic) = 6.068272349175606 " "
y[1] (numeric) = 6.0682723491758646 " "
absolute error = 2.58459920132736440000000000000E-13 " "
relative error = 4.2592010585656900000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6239999999999313 " "
y[1] (analytic) = 6.07334315650588 " "
y[1] (numeric) = 6.073343156506138 " "
absolute error = 2.58459920132736440000000000000E-13 " "
relative error = 4.255644930187574300000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6249999999999312 " "
y[1] (analytic) = 6.0784190371797315 " "
y[1] (numeric) = 6.078419037179990 " "
absolute error = 2.59348098552436570000000000000E-13 " "
relative error = 4.266703183279859000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.625999999999931 " "
y[1] (analytic) = 6.083499996273044 " "
y[1] (numeric) = 6.083499996273304 " "
absolute error = 2.59348098552436570000000000000E-13 " "
relative error = 4.2631396188266935000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.626999999999931 " "
y[1] (analytic) = 6.088586038866777 " "
y[1] (numeric) = 6.088586038867037 " "
absolute error = 2.6023627697213670000000000000E-13 " "
relative error = 4.274166043000889300000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6279999999999308 " "
y[1] (analytic) = 6.093677170046972 " "
y[1] (numeric) = 6.093677170047233 " "
absolute error = 2.6112445539183680000000000000E-13 " "
relative error = 4.285170482535161600000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6289999999999307 " "
y[1] (analytic) = 6.098773394904762 " "
y[1] (numeric) = 6.098773394905023 " "
absolute error = 2.6112445539183680000000000000E-13 " "
relative error = 4.28158973097760960000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6299999999999306 " "
y[1] (analytic) = 6.103874718536372 " "
y[1] (numeric) = 6.103874718536633 " "
absolute error = 2.6112445539183680000000000000E-13 " "
relative error = 4.278011385109998000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6309999999999305 " "
y[1] (analytic) = 6.108981146043125 " "
y[1] (numeric) = 6.108981146043387 " "
absolute error = 2.62012633811536940000000000000E-13 " "
relative error = 4.28897434036519000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6319999999999304 " "
y[1] (analytic) = 6.11409268253145 " "
y[1] (numeric) = 6.114092682531713 " "
absolute error = 2.62900812231237070000000000000E-13 " "
relative error = 4.2999153902650170000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6329999999999303 " "
y[1] (analytic) = 6.1192093331128845 " "
y[1] (numeric) = 6.119209333113148 " "
absolute error = 2.6378899065093720000000000000E-13 " "
relative error = 4.3108345586985486000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6339999999999302 " "
y[1] (analytic) = 6.124331102904079 " "
y[1] (numeric) = 6.124331102904343 " "
absolute error = 2.6378899065093720000000000000E-13 " "
relative error = 4.307229413606522000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.63499999999993 " "
y[1] (analytic) = 6.129457997026802 " "
y[1] (numeric) = 6.129457997027067 " "
absolute error = 2.6467716907063730000000000000E-13 " "
relative error = 4.3181170210975170000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.63599999999993 " "
y[1] (analytic) = 6.13459002060795 " "
y[1] (numeric) = 6.134590020608216 " "
absolute error = 2.65565347490337440000000000000E-13 " "
relative error = 4.328982810558209000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6369999999999298 " "
y[1] (analytic) = 6.139727178779547 " "
y[1] (numeric) = 6.139727178779813 " "
absolute error = 2.65565347490337440000000000000E-13 " "
relative error = 4.325360716485881500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6379999999999297 " "
y[1] (analytic) = 6.144869476678750 " "
y[1] (numeric) = 6.144869476679017 " "
absolute error = 2.66453525910037570000000000000E-13 " "
relative error = 4.3361950472876990000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6389999999999296 " "
y[1] (analytic) = 6.15001691944786 " "
y[1] (numeric) = 6.1500169194481265 " "
absolute error = 2.66453525910037570000000000000E-13 " "
relative error = 4.332565737623359500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6399999999999295 " "
y[1] (analytic) = 6.155169512234318 " "
y[1] (numeric) = 6.155169512234584 " "
absolute error = 2.66453525910037570000000000000E-13 " "
relative error = 4.328938876182393000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6409999999999294 " "
y[1] (analytic) = 6.1603272601907175 " "
y[1] (numeric) = 6.160327260190985 " "
absolute error = 2.6734170432973770000000000000E-13 " "
relative error = 4.339732177174318600000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6419999999999293 " "
y[1] (analytic) = 6.165490168474808 " "
y[1] (numeric) = 6.165490168475075 " "
absolute error = 2.6734170432973770000000000000E-13 " "
relative error = 4.336098136960804000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6429999999999292 " "
y[1] (analytic) = 6.1706582422494956 " "
y[1] (numeric) = 6.170658242249765 " "
absolute error = 2.69118061169137950000000000000E-13 " "
relative error = 4.36125370428928000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.643999999999929 " "
y[1] (analytic) = 6.175831486682858 " "
y[1] (numeric) = 6.175831486683127 " "
absolute error = 2.69118061169137950000000000000E-13 " "
relative error = 4.35760045832606970000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.644999999999929 " "
y[1] (analytic) = 6.1810099069481375 " "
y[1] (numeric) = 6.1810099069484075 " "
absolute error = 2.70006239588838070000000000000E-13 " "
relative error = 4.36831915259222000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6459999999999289 " "
y[1] (analytic) = 6.186193508223757 " "
y[1] (numeric) = 6.186193508224027 " "
absolute error = 2.70006239588838070000000000000E-13 " "
relative error = 4.36465880399472040000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6469999999999287 " "
y[1] (analytic) = 6.191382295693315 " "
y[1] (numeric) = 6.191382295693586 " "
absolute error = 2.7089441800853820000000000000E-13 " "
relative error = 4.3753463293160005000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6479999999999286 " "
y[1] (analytic) = 6.196576274545603 " "
y[1] (numeric) = 6.196576274545874 " "
absolute error = 2.7178259642823830000000000000E-13 " "
relative error = 4.386012281405642400000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6489999999999285 " "
y[1] (analytic) = 6.201775449974598 " "
y[1] (numeric) = 6.201775449974870 " "
absolute error = 2.7178259642823830000000000000E-13 " "
relative error = 4.382335326722471300000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6499999999999284 " "
y[1] (analytic) = 6.206979827179476 " "
y[1] (numeric) = 6.206979827179748 " "
absolute error = 2.72670774847938450000000000000E-13 " "
relative error = 4.392970211598758400000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6509999999999283 " "
y[1] (analytic) = 6.212189411364616 " "
y[1] (numeric) = 6.212189411364888 " "
absolute error = 2.72670774847938450000000000000E-13 " "
relative error = 4.389286236976499000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6519999999999282 " "
y[1] (analytic) = 6.217404207739600 " "
y[1] (numeric) = 6.217404207739874 " "
absolute error = 2.73558953267638570000000000000E-13 " "
relative error = 4.399890116957566000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.652999999999928 " "
y[1] (analytic) = 6.2226242215192284 " "
y[1] (numeric) = 6.222624221519503 " "
absolute error = 2.7444713168733870000000000000E-13 " "
relative error = 4.410472526016259000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.653999999999928 " "
y[1] (analytic) = 6.227849457923512 " "
y[1] (numeric) = 6.227849457923788 " "
absolute error = 2.7533531010703880000000000000E-13 " "
relative error = 4.421033487839654000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6549999999999279 " "
y[1] (analytic) = 6.233079922177690 " "
y[1] (numeric) = 6.233079922177966 " "
absolute error = 2.7533531010703880000000000000E-13 " "
relative error = 4.417323595152028400000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6559999999999278 " "
y[1] (analytic) = 6.238315619512227 " "
y[1] (numeric) = 6.238315619512503 " "
absolute error = 2.7533531010703880000000000000E-13 " "
relative error = 4.41361622111334000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6569999999999276 " "
y[1] (analytic) = 6.24355655516282 " "
y[1] (numeric) = 6.243556555163096 " "
absolute error = 2.76223488526738950000000000000E-13 " "
relative error = 4.424136885543684700000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6579999999999275 " "
y[1] (analytic) = 6.248802734370404 " "
y[1] (numeric) = 6.248802734370681 " "
absolute error = 2.77111666946439100000000000000E-13 " "
relative error = 4.4346361811397356000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6589999999999274 " "
y[1] (analytic) = 6.25405416238116 " "
y[1] (numeric) = 6.254054162381438 " "
absolute error = 2.7799984536613920000000000000E-13 " "
relative error = 4.4451141315394993000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6599999999999273 " "
y[1] (analytic) = 6.259310844446516 " "
y[1] (numeric) = 6.259310844446795 " "
absolute error = 2.7888802378583930000000000000E-13 " "
relative error = 4.455570760370189000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6609999999999272 " "
y[1] (analytic) = 6.264572785823155 " "
y[1] (numeric) = 6.264572785823435 " "
absolute error = 2.79776202205539450000000000000E-13 " "
relative error = 4.4660060912482047000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.661999999999927 " "
y[1] (analytic) = 6.269839991773020 " "
y[1] (numeric) = 6.269839991773300 " "
absolute error = 2.79776202205539450000000000000E-13 " "
relative error = 4.462254261235506000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.662999999999927 " "
y[1] (analytic) = 6.275112467563314 " "
y[1] (numeric) = 6.275112467563594 " "
absolute error = 2.79776202205539450000000000000E-13 " "
relative error = 4.458504985396368000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6639999999999269 " "
y[1] (analytic) = 6.280390218466516 " "
y[1] (numeric) = 6.280390218466796 " "
absolute error = 2.80664380625239600000000000000E-13 " "
relative error = 4.4689003527199533000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6649999999999268 " "
y[1] (analytic) = 6.285673249760376 " "
y[1] (numeric) = 6.2856732497606576 " "
absolute error = 2.8155255904493970000000000000E-13 " "
relative error = 4.479274500240259000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6659999999999267 " "
y[1] (analytic) = 6.290961566727926 " "
y[1] (numeric) = 6.290961566728209 " "
absolute error = 2.8244073746463980000000000000E-13 " "
relative error = 4.489627451523976500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6669999999999265 " "
y[1] (analytic) = 6.296255174657484 " "
y[1] (numeric) = 6.296255174657768 " "
absolute error = 2.83328915884339950000000000000E-13 " "
relative error = 4.499959230126866500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6679999999999264 " "
y[1] (analytic) = 6.301554078842659 " "
y[1] (numeric) = 6.301554078842942 " "
absolute error = 2.83328915884339950000000000000E-13 " "
relative error = 4.496175266282505000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6689999999999263 " "
y[1] (analytic) = 6.306858284582353 " "
y[1] (numeric) = 6.3068582845826375 " "
absolute error = 2.84217094304040100000000000000E-13 " "
relative error = 4.506476624008386400000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6699999999999262 " "
y[1] (analytic) = 6.312167797180775 " "
y[1] (numeric) = 6.3121677971810595 " "
absolute error = 2.84217094304040100000000000000E-13 " "
relative error = 4.502685977881971000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.670999999999926 " "
y[1] (analytic) = 6.317482621947437 " "
y[1] (numeric) = 6.317482621947722 " "
absolute error = 2.8510527272374020000000000000E-13 " "
relative error = 4.512956976458658000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.671999999999926 " "
y[1] (analytic) = 6.322802764197163 " "
y[1] (numeric) = 6.322802764197449 " "
absolute error = 2.8599345114344030000000000000E-13 " "
relative error = 4.523206903793943000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6729999999999259 " "
y[1] (analytic) = 6.3281282292500975 " "
y[1] (numeric) = 6.3281282292503835 " "
absolute error = 2.8599345114344030000000000000E-13 " "
relative error = 4.5194003784801845000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6739999999999258 " "
y[1] (analytic) = 6.333459022431705 " "
y[1] (numeric) = 6.333459022431992 " "
absolute error = 2.86881629563140450000000000000E-13 " "
relative error = 4.529620047229633300000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6749999999999257 " "
y[1] (analytic) = 6.338795149072780 " "
y[1] (numeric) = 6.338795149073067 " "
absolute error = 2.8776980798284060000000000000E-13 " "
relative error = 4.539818707107685600000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6759999999999255 " "
y[1] (analytic) = 6.3441366145094475 " "
y[1] (numeric) = 6.344136614509736 " "
absolute error = 2.8865798640254070000000000000E-13 " "
relative error = 4.549996381577934300000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6769999999999254 " "
y[1] (analytic) = 6.349483424083176 " "
y[1] (numeric) = 6.349483424083465 " "
absolute error = 2.89546164822240800000000000000E-13 " "
relative error = 4.560153094092837500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6779999999999253 " "
y[1] (analytic) = 6.354835583140774 " "
y[1] (numeric) = 6.354835583141064 " "
absolute error = 2.89546164822240800000000000000E-13 " "
relative error = 4.5563124495368507000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6789999999999252 " "
y[1] (analytic) = 6.360193097034402 " "
y[1] (numeric) = 6.360193097034692 " "
absolute error = 2.90434343241940950000000000000E-13 " "
relative error = 4.566439081501522000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.679999999999925 " "
y[1] (analytic) = 6.365555971121573 " "
y[1] (numeric) = 6.365555971121863 " "
absolute error = 2.90434343241940950000000000000E-13 " "
relative error = 4.562591933203411000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.680999999999925 " "
y[1] (analytic) = 6.370924210765162 " "
y[1] (numeric) = 6.370924210765454 " "
absolute error = 2.9132252166164110000000000000E-13 " "
relative error = 4.5726885460257677000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6819999999999249 " "
y[1] (analytic) = 6.37629782133341 " "
y[1] (numeric) = 6.376297821333702 " "
absolute error = 2.9132252166164110000000000000E-13 " "
relative error = 4.568834923095229000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6829999999999248 " "
y[1] (analytic) = 6.381676808199927 " "
y[1] (numeric) = 6.381676808200220 " "
absolute error = 2.9221070008134120000000000000E-13 " "
relative error = 4.578901578122455000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6839999999999247 " "
y[1] (analytic) = 6.3870611767437016 " "
y[1] (numeric) = 6.387061176743994 " "
absolute error = 2.9221070008134120000000000000E-13 " "
relative error = 4.575041509627722500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6849999999999246 " "
y[1] (analytic) = 6.392450932349101 " "
y[1] (numeric) = 6.392450932349393 " "
absolute error = 2.9221070008134120000000000000E-13 " "
relative error = 4.571184091575959000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6859999999999244 " "
y[1] (analytic) = 6.397846080405882 " "
y[1] (numeric) = 6.397846080406175 " "
absolute error = 2.93098878501041300000000000000E-13 " "
relative error = 4.5812117831138416000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6869999999999243 " "
y[1] (analytic) = 6.403246626309193 " "
y[1] (numeric) = 6.403246626309487 " "
absolute error = 2.93987056920741450000000000000E-13 " "
relative error = 4.591218706348571000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6879999999999242 " "
y[1] (analytic) = 6.408652575459581 " "
y[1] (numeric) = 6.408652575459876 " "
absolute error = 2.9487523534044160000000000000E-13 " "
relative error = 4.60120488462109000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6889999999999241 " "
y[1] (analytic) = 6.414063933262995 " "
y[1] (numeric) = 6.414063933263291 " "
absolute error = 2.9576341376014170000000000000E-13 " "
relative error = 4.611170341260995600000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.689999999999924 " "
y[1] (analytic) = 6.419480705130795 " "
y[1] (numeric) = 6.4194807051310905 " "
absolute error = 2.9576341376014170000000000000E-13 " "
relative error = 4.607279425635654000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.690999999999924 " "
y[1] (analytic) = 6.424902896479750 " "
y[1] (numeric) = 6.424902896480046 " "
absolute error = 2.96651592179841800000000000000E-13 " "
relative error = 4.61721518534356950000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6919999999999238 " "
y[1] (analytic) = 6.430330512732054 " "
y[1] (numeric) = 6.4303305127323505 " "
absolute error = 2.96651592179841800000000000000E-13 " "
relative error = 4.61331795609061960000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6929999999999237 " "
y[1] (analytic) = 6.435763559315323 " "
y[1] (numeric) = 6.43576355931562 " "
absolute error = 2.97539770599541950000000000000E-13 " "
relative error = 4.623224079897617000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6939999999999236 " "
y[1] (analytic) = 6.441202041662605 " "
y[1] (numeric) = 6.441202041662902 " "
absolute error = 2.97539770599541950000000000000E-13 " "
relative error = 4.61932056586663000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6949999999999235 " "
y[1] (analytic) = 6.446645965212381 " "
y[1] (numeric) = 6.44664596521268 " "
absolute error = 2.9842794901924210000000000000E-13 " "
relative error = 4.629197114741984000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6959999999999233 " "
y[1] (analytic) = 6.452095335408576 " "
y[1] (numeric) = 6.452095335408876 " "
absolute error = 2.9931612743894220000000000000E-13 " "
relative error = 4.639053080885515700000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6969999999999232 " "
y[1] (analytic) = 6.457550157700562 " "
y[1] (numeric) = 6.457550157700862 " "
absolute error = 2.9931612743894220000000000000E-13 " "
relative error = 4.635134379591474000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.6979999999999231 " "
y[1] (analytic) = 6.4630104375431605 " "
y[1] (numeric) = 6.46301043754346 " "
absolute error = 2.9931612743894220000000000000E-13 " "
relative error = 4.6312183823847236000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.698999999999923 " "
y[1] (analytic) = 6.468476180396651 " "
y[1] (numeric) = 6.4684761803969515 " "
absolute error = 3.00204305858642330000000000000E-13 " "
relative error = 4.641035964056585000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.699999999999923 " "
y[1] (analytic) = 6.473947391726778 " "
y[1] (numeric) = 6.473947391727080 " "
absolute error = 3.01092484278342450000000000000E-13 " "
relative error = 4.65083303987172000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7009999999999228 " "
y[1] (analytic) = 6.479424077004753 " "
y[1] (numeric) = 6.479424077005055 " "
absolute error = 3.0198066269804260000000000000E-13 " "
relative error = 4.660609633034536000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7019999999999227 " "
y[1] (analytic) = 6.484906241707261 " "
y[1] (numeric) = 6.484906241707564 " "
absolute error = 3.0286884111774270000000000000E-13 " "
relative error = 4.67036576673786000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7029999999999226 " "
y[1] (analytic) = 6.490393891316468 " "
y[1] (numeric) = 6.490393891316772 " "
absolute error = 3.03757019537442830000000000000E-13 " "
relative error = 4.680101464162922000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7039999999999225 " "
y[1] (analytic) = 6.495887031320024 " "
y[1] (numeric) = 6.495887031320328 " "
absolute error = 3.04645197957142950000000000000E-13 " "
relative error = 4.689816748479326000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7049999999999224 " "
y[1] (analytic) = 6.5013856672110695 " "
y[1] (numeric) = 6.501385667211374 " "
absolute error = 3.04645197957142950000000000000E-13 " "
relative error = 4.6858502717902606000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7059999999999222 " "
y[1] (analytic) = 6.506889804488240 " "
y[1] (numeric) = 6.506889804488545 " "
absolute error = 3.04645197957142950000000000000E-13 " "
relative error = 4.681886540433013400000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7069999999999221 " "
y[1] (analytic) = 6.512399448655675 " "
y[1] (numeric) = 6.51239944865598 " "
absolute error = 3.0553337637684310000000000000E-13 " "
relative error = 4.6915638204581106000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.707999999999922 " "
y[1] (analytic) = 6.517914605223017 " "
y[1] (numeric) = 6.517914605223323 " "
absolute error = 3.0642155479654320000000000000E-13 " "
relative error = 4.701220763938786000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.708999999999922 " "
y[1] (analytic) = 6.523435279705424 " "
y[1] (numeric) = 6.523435279705732 " "
absolute error = 3.07309733216243330000000000000E-13 " "
relative error = 4.710857393991350600000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7099999999999218 " "
y[1] (analytic) = 6.528961477623572 " "
y[1] (numeric) = 6.52896147762388 " "
absolute error = 3.08197911635943460000000000000E-13 " "
relative error = 4.720473733720391000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7109999999999217 " "
y[1] (analytic) = 6.534493204503658 " "
y[1] (numeric) = 6.534493204503966 " "
absolute error = 3.08197911635943460000000000000E-13 " "
relative error = 4.716477651603179000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7119999999999216 " "
y[1] (analytic) = 6.540030465877410 " "
y[1] (numeric) = 6.540030465877718 " "
absolute error = 3.0908609005564360000000000000E-13 " "
relative error = 4.7260649880501227000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7129999999999215 " "
y[1] (analytic) = 6.545573267282088 " "
y[1] (numeric) = 6.545573267282398 " "
absolute error = 3.0997426847534370000000000000E-13 " "
relative error = 4.735632095430719000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7139999999999214 " "
y[1] (analytic) = 6.551121614260497 " "
y[1] (numeric) = 6.551121614260807 " "
absolute error = 3.0997426847534370000000000000E-13 " "
relative error = 4.731621342528446000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7149999999999213 " "
y[1] (analytic) = 6.5566755123609815 " "
y[1] (numeric) = 6.556675512361293 " "
absolute error = 3.11750625314743960000000000000E-13 " "
relative error = 4.754705715221314600000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7159999999999211 " "
y[1] (analytic) = 6.562234967137442 " "
y[1] (numeric) = 6.562234967137755 " "
absolute error = 3.1263880373444410000000000000E-13 " "
relative error = 4.764212273715983700000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.716999999999921 " "
y[1] (analytic) = 6.5677999841493335 " "
y[1] (numeric) = 6.567799984149647 " "
absolute error = 3.1352698215414420000000000000E-13 " "
relative error = 4.77369869531361000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.717999999999921 " "
y[1] (analytic) = 6.573370568961673 " "
y[1] (numeric) = 6.5733705689619875 " "
absolute error = 3.14415160573844330000000000000E-13 " "
relative error = 4.7831650030268910000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7189999999999208 " "
y[1] (analytic) = 6.578946727145047 " "
y[1] (numeric) = 6.578946727145361 " "
absolute error = 3.14415160573844330000000000000E-13 " "
relative error = 4.779110906561265000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7199999999999207 " "
y[1] (analytic) = 6.5845284642756114 " "
y[1] (numeric) = 6.584528464275927 " "
absolute error = 3.15303338993544460000000000000E-13 " "
relative error = 4.788548499778293000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7209999999999206 " "
y[1] (analytic) = 6.590115785935105 " "
y[1] (numeric) = 6.590115785935422 " "
absolute error = 3.1619151741324460000000000000E-13 " "
relative error = 4.7979660401122765000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7219999999999205 " "
y[1] (analytic) = 6.595708697710852 " "
y[1] (numeric) = 6.595708697711169 " "
absolute error = 3.1707969583294470000000000000E-13 " "
relative error = 4.8073635505308540000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7229999999999204 " "
y[1] (analytic) = 6.601307205195763 " "
y[1] (numeric) = 6.60130720519608 " "
absolute error = 3.1707969583294470000000000000E-13 " "
relative error = 4.8032864700400146000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7239999999999203 " "
y[1] (analytic) = 6.606911313988345 " "
y[1] (numeric) = 6.606911313988663 " "
absolute error = 3.17967874252644830000000000000E-13 " "
relative error = 4.812655401918805600000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7249999999999202 " "
y[1] (analytic) = 6.612521029692709 " "
y[1] (numeric) = 6.612521029693027 " "
absolute error = 3.17967874252644830000000000000E-13 " "
relative error = 4.808572597725578000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.72599999999992 " "
y[1] (analytic) = 6.618136357918570 " "
y[1] (numeric) = 6.618136357918888 " "
absolute error = 3.18856052672344960000000000000E-13 " "
relative error = 4.817913010976801000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.72699999999992 " "
y[1] (analytic) = 6.6237573042812565 " "
y[1] (numeric) = 6.623757304281575 " "
absolute error = 3.18856052672344960000000000000E-13 " "
relative error = 4.8138245111464570000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7279999999999198 " "
y[1] (analytic) = 6.629383874401717 " "
y[1] (numeric) = 6.629383874402036 " "
absolute error = 3.18856052672344960000000000000E-13 " "
relative error = 4.809738864324263000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7289999999999197 " "
y[1] (analytic) = 6.63501607390652 " "
y[1] (numeric) = 6.63501607390684 " "
absolute error = 3.1974423109204510000000000000E-13 " "
relative error = 4.819042298171679600000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7299999999999196 " "
y[1] (analytic) = 6.6406539084278675 " "
y[1] (numeric) = 6.640653908428187 " "
absolute error = 3.1974423109204510000000000000E-13 " "
relative error = 4.814950989785018000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7309999999999195 " "
y[1] (analytic) = 6.646297383603593 " "
y[1] (numeric) = 6.646297383603914 " "
absolute error = 3.2063240951174520000000000000E-13 " "
relative error = 4.824226046561578000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7319999999999194 " "
y[1] (analytic) = 6.651946505077173 " "
y[1] (numeric) = 6.651946505077494 " "
absolute error = 3.21520587931445330000000000000E-13 " "
relative error = 4.833481262755813000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7329999999999193 " "
y[1] (analytic) = 6.6576012784977285 " "
y[1] (numeric) = 6.657601278498051 " "
absolute error = 3.22408766351145460000000000000E-13 " "
relative error = 4.842716661216098000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7339999999999192 " "
y[1] (analytic) = 6.663261709520034 " "
y[1] (numeric) = 6.6632617095203575 " "
absolute error = 3.2329694477084560000000000000E-13 " "
relative error = 4.851932264778674500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.734999999999919 " "
y[1] (analytic) = 6.668927803804520 " "
y[1] (numeric) = 6.668927803804845 " "
absolute error = 3.2418512319054570000000000000E-13 " "
relative error = 4.861128096267635000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.735999999999919 " "
y[1] (analytic) = 6.674599567017284 " "
y[1] (numeric) = 6.674599567017609 " "
absolute error = 3.2418512319054570000000000000E-13 " "
relative error = 4.8569973364771624000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7369999999999188 " "
y[1] (analytic) = 6.680277004830088 " "
y[1] (numeric) = 6.680277004830413 " "
absolute error = 3.25073301610245840000000000000E-13 " "
relative error = 4.866165001469337500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7379999999999187 " "
y[1] (analytic) = 6.685960122920369 " "
y[1] (numeric) = 6.685960122920695 " "
absolute error = 3.25961480029945960000000000000E-13 " "
relative error = 4.875312954866516000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7389999999999186 " "
y[1] (analytic) = 6.691648926971247 " "
y[1] (numeric) = 6.691648926971573 " "
absolute error = 3.25961480029945960000000000000E-13 " "
relative error = 4.871168281350373000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7399999999999185 " "
y[1] (analytic) = 6.697343422671526 " "
y[1] (numeric) = 6.697343422671853 " "
absolute error = 3.2684965844964610000000000000E-13 " "
relative error = 4.880288165352404000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7409999999999184 " "
y[1] (analytic) = 6.703043615715703 " "
y[1] (numeric) = 6.70304361571603 " "
absolute error = 3.2684965844964610000000000000E-13 " "
relative error = 4.876138023081435500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7419999999999183 " "
y[1] (analytic) = 6.708749511803972 " "
y[1] (numeric) = 6.708749511804299 " "
absolute error = 3.2684965844964610000000000000E-13 " "
relative error = 4.8719907916454125000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7429999999999182 " "
y[1] (analytic) = 6.714461116642227 " "
y[1] (numeric) = 6.714461116642554 " "
absolute error = 3.2773783686934620000000000000E-13 " "
relative error = 4.881074313723059000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.743999999999918 " "
y[1] (analytic) = 6.720178435942075 " "
y[1] (numeric) = 6.720178435942403 " "
absolute error = 3.2773783686934620000000000000E-13 " "
relative error = 4.876921647146739000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.744999999999918 " "
y[1] (analytic) = 6.725901475420836 " "
y[1] (numeric) = 6.725901475421164 " "
absolute error = 3.2773783686934620000000000000E-13 " "
relative error = 4.8727718963328975000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7459999999999178 " "
y[1] (analytic) = 6.731630240801550 " "
y[1] (numeric) = 6.731630240801878 " "
absolute error = 3.28626015289046340000000000000E-13 " "
relative error = 4.8818191661388130000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7469999999999177 " "
y[1] (analytic) = 6.737364737812982 " "
y[1] (numeric) = 6.73736473781331 " "
absolute error = 3.28626015289046340000000000000E-13 " "
relative error = 4.877664013715275500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7479999999999176 " "
y[1] (analytic) = 6.743104972189629 " "
y[1] (numeric) = 6.7431049721899585 " "
absolute error = 3.29514193708746460000000000000E-13 " "
relative error = 4.8866834354166405000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7489999999999175 " "
y[1] (analytic) = 6.748850949671728 " "
y[1] (numeric) = 6.7488509496720575 " "
absolute error = 3.29514193708746460000000000000E-13 " "
relative error = 4.882522908951996000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7499999999999174 " "
y[1] (analytic) = 6.7546026760052555 " "
y[1] (numeric) = 6.754602676005585 " "
absolute error = 3.29514193708746460000000000000E-13 " "
relative error = 4.87836530902547000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7509999999999173 " "
y[1] (analytic) = 6.760360156941938 " "
y[1] (numeric) = 6.760360156942268 " "
absolute error = 3.3040237212844660000000000000E-13 " "
relative error = 4.887348668682538500000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7519999999999172 " "
y[1] (analytic) = 6.766123398239258 " "
y[1] (numeric) = 6.766123398239590 " "
absolute error = 3.3129055054814670000000000000E-13 " "
relative error = 4.896312571454995000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.752999999999917 " "
y[1] (analytic) = 6.771892405660457 " "
y[1] (numeric) = 6.771892405660789 " "
absolute error = 3.32178728967846840000000000000E-13 " "
relative error = 4.905257039969904000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.753999999999917 " "
y[1] (analytic) = 6.777667184974542 " "
y[1] (numeric) = 6.777667184974875 " "
absolute error = 3.33066907387546960000000000000E-13 " "
relative error = 4.914182096841895300000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7549999999999168 " "
y[1] (analytic) = 6.7834477419562935 " "
y[1] (numeric) = 6.783447741956627 " "
absolute error = 3.33066907387546960000000000000E-13 " "
relative error = 4.909994446150079400000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7559999999999167 " "
y[1] (analytic) = 6.789234082386269 " "
y[1] (numeric) = 6.789234082386603 " "
absolute error = 3.3395508580724710000000000000E-13 " "
relative error = 4.918891906726967000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7569999999999166 " "
y[1] (analytic) = 6.79502621205081 " "
y[1] (numeric) = 6.795026212051144 " "
absolute error = 3.3395508580724710000000000000E-13 " "
relative error = 4.9146990075621205000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7579999999999165 " "
y[1] (analytic) = 6.800824136742045 " "
y[1] (numeric) = 6.80082413674238 " "
absolute error = 3.3484326422694720000000000000E-13 " "
relative error = 4.923568930681906000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7589999999999164 " "
y[1] (analytic) = 6.8066278622579 " "
y[1] (numeric) = 6.806627862258236 " "
absolute error = 3.35731442646647340000000000000E-13 " "
relative error = 4.932419539317641000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7599999999999163 " "
y[1] (analytic) = 6.812437394402102 " "
y[1] (numeric) = 6.812437394402439 " "
absolute error = 3.36619621066347460000000000000E-13 " "
relative error = 4.941250856014525000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7609999999999162 " "
y[1] (analytic) = 6.8182527389841825 " "
y[1] (numeric) = 6.81825273898452 " "
absolute error = 3.3750779948604760000000000000E-13 " "
relative error = 4.950062903305212400000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.761999999999916 " "
y[1] (analytic) = 6.824073901819487 " "
y[1] (numeric) = 6.824073901819825 " "
absolute error = 3.3839597790574770000000000000E-13 " "
relative error = 4.9588557037098024000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.762999999999916 " "
y[1] (analytic) = 6.8299008887291786 " "
y[1] (numeric) = 6.829900888729518 " "
absolute error = 3.39284156325447840000000000000E-13 " "
relative error = 4.967629279735823000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7639999999999159 " "
y[1] (analytic) = 6.835733705540244 " "
y[1] (numeric) = 6.8357337055405845 " "
absolute error = 3.40172334745147960000000000000E-13 " "
relative error = 4.9763836538782097000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7649999999999157 " "
y[1] (analytic) = 6.841572358085502 " "
y[1] (numeric) = 6.841572358085843 " "
absolute error = 3.4106051316484810000000000000E-13 " "
relative error = 4.985118848619297700000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7659999999999156 " "
y[1] (analytic) = 6.847416852203605 " "
y[1] (numeric) = 6.8474168522039465 " "
absolute error = 3.4106051316484810000000000000E-13 " "
relative error = 4.980863886723787000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7669999999999155 " "
y[1] (analytic) = 6.853267193739047 " "
y[1] (numeric) = 6.85326719373939 " "
absolute error = 3.42836870004248340000000000000E-13 " "
relative error = 5.002531789763786000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7679999999999154 " "
y[1] (analytic) = 6.859123388542171 " "
y[1] (numeric) = 6.859123388542514 " "
absolute error = 3.42836870004248340000000000000E-13 " "
relative error = 4.998260719102101000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7689999999999153 " "
y[1] (analytic) = 6.864985442469171 " "
y[1] (numeric) = 6.864985442469515 " "
absolute error = 3.43725048423948460000000000000E-13 " "
relative error = 5.0069304779227430000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7699999999999152 " "
y[1] (analytic) = 6.870853361382103 " "
y[1] (numeric) = 6.870853361382448 " "
absolute error = 3.4461322684364860000000000000E-13 " "
relative error = 5.015581161731096000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.770999999999915 " "
y[1] (analytic) = 6.876727151148885 " "
y[1] (numeric) = 6.876727151149230 " "
absolute error = 3.4550140526334870000000000000E-13 " "
relative error = 5.024212792936336000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.771999999999915 " "
y[1] (analytic) = 6.882606817643309 " "
y[1] (numeric) = 6.882606817643655 " "
absolute error = 3.46389583683048840000000000000E-13 " "
relative error = 5.0328253939349240000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7729999999999149 " "
y[1] (analytic) = 6.88849236674504 " "
y[1] (numeric) = 6.888492366745386 " "
absolute error = 3.46389583683048840000000000000E-13 " "
relative error = 5.02852533241210900000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7739999999999148 " "
y[1] (analytic) = 6.894383804339628 " "
y[1] (numeric) = 6.894383804339975 " "
absolute error = 3.47277762102748970000000000000E-13 " "
relative error = 5.037110958112849000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7749999999999146 " "
y[1] (analytic) = 6.900281136318513 " "
y[1] (numeric) = 6.90028113631886 " "
absolute error = 3.47277762102748970000000000000E-13 " "
relative error = 5.032805986337408000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7759999999999145 " "
y[1] (analytic) = 6.906184368579025 " "
y[1] (numeric) = 6.906184368579373 " "
absolute error = 3.4816594052244910000000000000E-13 " "
relative error = 5.041364694902949000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7769999999999144 " "
y[1] (analytic) = 6.912093507024397 " "
y[1] (numeric) = 6.912093507024746 " "
absolute error = 3.4905411894214920000000000000E-13 " "
relative error = 5.049904469426287000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7779999999999143 " "
y[1] (analytic) = 6.91800855756377 " "
y[1] (numeric) = 6.91800855756412 " "
absolute error = 3.49942297361849340000000000000E-13 " "
relative error = 5.058425332232954000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7789999999999142 " "
y[1] (analytic) = 6.923929526112193 " "
y[1] (numeric) = 6.923929526112544 " "
absolute error = 3.50830475781549470000000000000E-13 " "
relative error = 5.0669273056356750000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.779999999999914 " "
y[1] (analytic) = 6.929856418590637 " "
y[1] (numeric) = 6.929856418590988 " "
absolute error = 3.50830475781549470000000000000E-13 " "
relative error = 5.062593718974914000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.780999999999914 " "
y[1] (analytic) = 6.935789240925993 " "
y[1] (numeric) = 6.935789240926344 " "
absolute error = 3.5171865420124960000000000000E-13 " "
relative error = 5.0710689437600600000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7819999999999139 " "
y[1] (analytic) = 6.941727999051084 " "
y[1] (numeric) = 6.9417279990514364 " "
absolute error = 3.5260683262094970000000000000E-13 " "
relative error = 5.079525338203257000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7829999999999138 " "
y[1] (analytic) = 6.947672698904669 " "
y[1] (numeric) = 6.947672698905023 " "
absolute error = 3.53495011040649840000000000000E-13 " "
relative error = 5.0879629245686820000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7839999999999137 " "
y[1] (analytic) = 6.953623346431450 " "
y[1] (numeric) = 6.953623346431804 " "
absolute error = 3.54383189460349970000000000000E-13 " "
relative error = 5.0963817251076290000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7849999999999135 " "
y[1] (analytic) = 6.959579947582072 " "
y[1] (numeric) = 6.9595799475824265 " "
absolute error = 3.54383189460349970000000000000E-13 " "
relative error = 5.0920198076533540000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7859999999999134 " "
y[1] (analytic) = 6.965542508313140 " "
y[1] (numeric) = 6.965542508313494 " "
absolute error = 3.54383189460349970000000000000E-13 " "
relative error = 5.087660997508889000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7869999999999133 " "
y[1] (analytic) = 6.971511034587210 " "
y[1] (numeric) = 6.971511034587567 " "
absolute error = 3.5615954629975020000000000000E-13 " "
relative error = 5.108785520567403000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7879999999999132 " "
y[1] (analytic) = 6.977485532372816 " "
y[1] (numeric) = 6.977485532373172 " "
absolute error = 3.5615954629975020000000000000E-13 " "
relative error = 5.104411104076226000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.788999999999913 " "
y[1] (analytic) = 6.983466007644451 " "
y[1] (numeric) = 6.983466007644807 " "
absolute error = 3.5615954629975020000000000000E-13 " "
relative error = 5.100039807022475000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.789999999999913 " "
y[1] (analytic) = 6.989452466382592 " "
y[1] (numeric) = 6.989452466382950 " "
absolute error = 3.57047724719450340000000000000E-13 " "
relative error = 5.108379038798174000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7909999999999129 " "
y[1] (analytic) = 6.995444914573700 " "
y[1] (numeric) = 6.9954449145740565 " "
absolute error = 3.57047724719450340000000000000E-13 " "
relative error = 5.1040030917205600000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7919999999999128 " "
y[1] (analytic) = 7.00144335821022 " "
y[1] (numeric) = 7.001443358210578 " "
absolute error = 3.57935903139150470000000000000E-13 " "
relative error = 5.1123159158235300000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7929999999999127 " "
y[1] (analytic) = 7.007447803290600 " "
y[1] (numeric) = 7.007447803290957 " "
absolute error = 3.57935903139150470000000000000E-13 " "
relative error = 5.107935345177581000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7939999999999126 " "
y[1] (analytic) = 7.013458255819282 " "
y[1] (numeric) = 7.013458255819641 " "
absolute error = 3.5882408155885060000000000000E-13 " "
relative error = 5.1162218191164570000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7949999999999124 " "
y[1] (analytic) = 7.019474721806723 " "
y[1] (numeric) = 7.019474721807081 " "
absolute error = 3.5882408155885060000000000000E-13 " "
relative error = 5.1118366513113380000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7959999999999123 " "
y[1] (analytic) = 7.025497207269386 " "
y[1] (numeric) = 7.025497207269746 " "
absolute error = 3.5971225997855070000000000000E-13 " "
relative error = 5.120096832525264000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7969999999999122 " "
y[1] (analytic) = 7.0315257182297595 " "
y[1] (numeric) = 7.031525718230120 " "
absolute error = 3.5971225997855070000000000000E-13 " "
relative error = 5.115707093923721000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.7979999999999121 " "
y[1] (analytic) = 7.037560260716353 " "
y[1] (numeric) = 7.037560260716714 " "
absolute error = 3.60600438398250840000000000000E-13 " "
relative error = 5.123941039782234000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.798999999999912 " "
y[1] (analytic) = 7.043600840763710 " "
y[1] (numeric) = 7.043600840764072 " "
absolute error = 3.61488616817950970000000000000E-13 " "
relative error = 5.132156477776161000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.799999999999912 " "
y[1] (analytic) = 7.049647464412413 " "
y[1] (numeric) = 7.049647464412775 " "
absolute error = 3.6237679523765110000000000000E-13 " "
relative error = 5.140353429969071000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8009999999999118 " "
y[1] (analytic) = 7.055700137709084 " "
y[1] (numeric) = 7.055700137709446 " "
absolute error = 3.6237679523765110000000000000E-13 " "
relative error = 5.1359438208113990000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8019999999999117 " "
y[1] (analytic) = 7.061758866706397 " "
y[1] (numeric) = 7.06175886670676 " "
absolute error = 3.6326497365735120000000000000E-13 " "
relative error = 5.144114667664629000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8029999999999116 " "
y[1] (analytic) = 7.067823657463082 " "
y[1] (numeric) = 7.067823657463445 " "
absolute error = 3.6326497365735120000000000000E-13 " "
relative error = 5.139700581999823000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8039999999999115 " "
y[1] (analytic) = 7.0738945160439295 " "
y[1] (numeric) = 7.073894516044294 " "
absolute error = 3.64153152077051350000000000000E-13 " "
relative error = 5.147845380661737000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8049999999999113 " "
y[1] (analytic) = 7.0799714485197995 " "
y[1] (numeric) = 7.079971448520165 " "
absolute error = 3.65041330496751470000000000000E-13 " "
relative error = 5.155971788178187000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8059999999999112 " "
y[1] (analytic) = 7.086054460967625 " "
y[1] (numeric) = 7.086054460967990 " "
absolute error = 3.6592950891645160000000000000E-13 " "
relative error = 5.164079826539785000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8069999999999111 " "
y[1] (analytic) = 7.0921435594704185 " "
y[1] (numeric) = 7.092143559470785 " "
absolute error = 3.6681768733615170000000000000E-13 " "
relative error = 5.172169517723956000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.807999999999911 " "
y[1] (analytic) = 7.098238750117279 " "
y[1] (numeric) = 7.0982387501176465 " "
absolute error = 3.67705865755851850000000000000E-13 " "
relative error = 5.180240883694939000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.808999999999911 " "
y[1] (analytic) = 7.104340039003398 " "
y[1] (numeric) = 7.104340039003766 " "
absolute error = 3.67705865755851850000000000000E-13 " "
relative error = 5.175792033279897000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8099999999999108 " "
y[1] (analytic) = 7.110447432230065 " "
y[1] (numeric) = 7.110447432230433 " "
absolute error = 3.68594044175551970000000000000E-13 " "
relative error = 5.183837552961825000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8109999999999107 " "
y[1] (analytic) = 7.116560935904673 " "
y[1] (numeric) = 7.116560935905042 " "
absolute error = 3.6948222259525210000000000000E-13 " "
relative error = 5.19186480552889000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8119999999999106 " "
y[1] (analytic) = 7.122680556140726 " "
y[1] (numeric) = 7.122680556141097 " "
absolute error = 3.7037040101495220000000000000E-13 " "
relative error = 5.1998738128953750000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8129999999999105 " "
y[1] (analytic) = 7.128806299057847 " "
y[1] (numeric) = 7.128806299058217 " "
absolute error = 3.7037040101495220000000000000E-13 " "
relative error = 5.195405590749477000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8139999999999104 " "
y[1] (analytic) = 7.134938170781776 " "
y[1] (numeric) = 7.1349381707821475 " "
absolute error = 3.71258579434652350000000000000E-13 " "
relative error = 5.2033888808594040000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8149999999999102 " "
y[1] (analytic) = 7.141076177444388 " "
y[1] (numeric) = 7.14107617744476 " "
absolute error = 3.72146757854352500000000000000E-13 " "
relative error = 5.2113539837287450000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8159999999999101 " "
y[1] (analytic) = 7.14722032518369 " "
y[1] (numeric) = 7.147220325184062 " "
absolute error = 3.72146757854352500000000000000E-13 " "
relative error = 5.20687401426634900000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.81699999999991 " "
y[1] (analytic) = 7.153370620143828 " "
y[1] (numeric) = 7.153370620144200 " "
absolute error = 3.7303493627405260000000000000E-13 " "
relative error = 5.21481349258753000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.81799999999991 " "
y[1] (analytic) = 7.159527068475100 " "
y[1] (numeric) = 7.159527068475473 " "
absolute error = 3.7392311469375270000000000000E-13 " "
relative error = 5.222734841526261000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8189999999999098 " "
y[1] (analytic) = 7.165689676333953 " "
y[1] (numeric) = 7.165689676334327 " "
absolute error = 3.7392311469375270000000000000E-13 " "
relative error = 5.218243205935984000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8199999999999097 " "
y[1] (analytic) = 7.171858449882996 " "
y[1] (numeric) = 7.171858449883370 " "
absolute error = 3.74811293113452850000000000000E-13 " "
relative error = 5.226139022857703000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8209999999999096 " "
y[1] (analytic) = 7.178033395291004 " "
y[1] (numeric) = 7.178033395291380 " "
absolute error = 3.75699471533153000000000000000E-13 " "
relative error = 5.234016768152996000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8219999999999095 " "
y[1] (analytic) = 7.184214518732921 " "
y[1] (numeric) = 7.184214518733298 " "
absolute error = 3.7658764995285310000000000000E-13 " "
relative error = 5.241876463611944000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8229999999999094 " "
y[1] (analytic) = 7.190401826389873 " "
y[1] (numeric) = 7.19040182639025 " "
absolute error = 3.7747582837255320000000000000E-13 " "
relative error = 5.24971813101125000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8239999999999092 " "
y[1] (analytic) = 7.1965953244491665 " "
y[1] (numeric) = 7.196595324449545 " "
absolute error = 3.78364006792253350000000000000E-13 " "
relative error = 5.257541792114226000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8249999999999091 " "
y[1] (analytic) = 7.202795019104301 " "
y[1] (numeric) = 7.202795019104680 " "
absolute error = 3.79252185211953500000000000000E-13 " "
relative error = 5.265347468670781000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.825999999999909 " "
y[1] (analytic) = 7.209000916554972 " "
y[1] (numeric) = 7.209000916555352 " "
absolute error = 3.8014036363165360000000000000E-13 " "
relative error = 5.273135182417408000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.826999999999909 " "
y[1] (analytic) = 7.2152130230070775 " "
y[1] (numeric) = 7.215213023007458 " "
absolute error = 3.8014036363165360000000000000E-13 " "
relative error = 5.268595153317079000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8279999999999088 " "
y[1] (analytic) = 7.221431344672723 " "
y[1] (numeric) = 7.221431344673104 " "
absolute error = 3.8102854205135370000000000000E-13 " "
relative error = 5.276357606479772000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8289999999999087 " "
y[1] (analytic) = 7.227655887770232 " "
y[1] (numeric) = 7.227655887770614 " "
absolute error = 3.81916720471053850000000000000E-13 " "
relative error = 5.284102154299948000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8299999999999086 " "
y[1] (analytic) = 7.233886658524147 " "
y[1] (numeric) = 7.23388665852453 " "
absolute error = 3.828048988907540000000000000E-13 " "
relative error = 5.291828818463318000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8309999999999085 " "
y[1] (analytic) = 7.2401236631652415 " "
y[1] (numeric) = 7.240123663165624 " "
absolute error = 3.828048988907540000000000000E-13 " "
relative error = 5.287270172446186000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8319999999999084 " "
y[1] (analytic) = 7.2463669079305175 " "
y[1] (numeric) = 7.246366907930902 " "
absolute error = 3.84581255730154200000000000000E-13 " "
relative error = 5.307228582495092000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8329999999999083 " "
y[1] (analytic) = 7.252616399063223 " "
y[1] (numeric) = 7.252616399063608 " "
absolute error = 3.84581255730154200000000000000E-13 " "
relative error = 5.302655408327238000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8339999999999081 " "
y[1] (analytic) = 7.258872142812849 " "
y[1] (numeric) = 7.2588721428132335 " "
absolute error = 3.84581255730154200000000000000E-13 " "
relative error = 5.298085545024176000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.834999999999908 " "
y[1] (analytic) = 7.265134145435138 " "
y[1] (numeric) = 7.265134145435524 " "
absolute error = 3.85469434149854350000000000000E-13 " "
relative error = 5.305744208344099000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.835999999999908 " "
y[1] (analytic) = 7.271402413192096 " "
y[1] (numeric) = 7.271402413192482 " "
absolute error = 3.8635761256955450000000000000E-13 " "
relative error = 5.313385102557489000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8369999999999078 " "
y[1] (analytic) = 7.277676952351989 " "
y[1] (numeric) = 7.277676952352376 " "
absolute error = 3.8724579098925460000000000000E-13 " "
relative error = 5.3210082492615330000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8379999999999077 " "
y[1] (analytic) = 7.283957769189358 " "
y[1] (numeric) = 7.283957769189746 " "
absolute error = 3.88133969408954700000000000000E-13 " "
relative error = 5.328613670039862000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8389999999999076 " "
y[1] (analytic) = 7.290244869985019 " "
y[1] (numeric) = 7.290244869985408 " "
absolute error = 3.89022147828654850000000000000E-13 " "
relative error = 5.336201386462541000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8399999999999075 " "
y[1] (analytic) = 7.2965382610260745 " "
y[1] (numeric) = 7.2965382610264635 " "
absolute error = 3.89022147828654850000000000000E-13 " "
relative error = 5.331598820040295000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8409999999999074 " "
y[1] (analytic) = 7.302837948605916 " "
y[1] (numeric) = 7.302837948606306 " "
absolute error = 3.899103262483550000000000000E-13 " "
relative error = 5.3391616929249730000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8419999999999073 " "
y[1] (analytic) = 7.3091439390242305 " "
y[1] (numeric) = 7.309143939024621 " "
absolute error = 3.9079850466805510000000000000E-13 " "
relative error = 5.346706918460641000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8429999999999072 " "
y[1] (analytic) = 7.315456238587010 " "
y[1] (numeric) = 7.315456238587402 " "
absolute error = 3.9079850466805510000000000000E-13 " "
relative error = 5.342093396809633000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.843999999999907 " "
y[1] (analytic) = 7.321774853606556 " "
y[1] (numeric) = 7.321774853606947 " "
absolute error = 3.91686683087755200000000000000E-13 " "
relative error = 5.349613869850401000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.844999999999907 " "
y[1] (analytic) = 7.328099790401481 " "
y[1] (numeric) = 7.328099790401874 " "
absolute error = 3.92574861507455350000000000000E-13 " "
relative error = 5.3571167524446010000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8459999999999068 " "
y[1] (analytic) = 7.334431055296724 " "
y[1] (numeric) = 7.3344310552971175 " "
absolute error = 3.9346303992715550000000000000E-13 " "
relative error = 5.364602066073105000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8469999999999067 " "
y[1] (analytic) = 7.34076865462355 " "
y[1] (numeric) = 7.340768654623944 " "
absolute error = 3.9435121834685560000000000000E-13 " "
relative error = 5.372069832203135000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8479999999999066 " "
y[1] (analytic) = 7.347112594719559 " "
y[1] (numeric) = 7.347112594719954 " "
absolute error = 3.95239396766555730000000000000E-13 " "
relative error = 5.379520072288236000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8489999999999065 " "
y[1] (analytic) = 7.353462881928692 " "
y[1] (numeric) = 7.3534628819290875 " "
absolute error = 3.95239396766555730000000000000E-13 " "
relative error = 5.3748744382441350000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8499999999999064 " "
y[1] (analytic) = 7.359819522601236 " "
y[1] (numeric) = 7.359819522601632 " "
absolute error = 3.96127575186255850000000000000E-13 " "
relative error = 5.382300122574875000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8509999999999063 " "
y[1] (analytic) = 7.366182523093833 " "
y[1] (numeric) = 7.3661825230942295 " "
absolute error = 3.96127575186255850000000000000E-13 " "
relative error = 5.377650824485413000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8519999999999062 " "
y[1] (analytic) = 7.3725518897694835 " "
y[1] (numeric) = 7.3725518897698805 " "
absolute error = 3.970157536059560000000000000E-13 " "
relative error = 5.3850520083402140000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.852999999999906 " "
y[1] (analytic) = 7.3789276289975545 " "
y[1] (numeric) = 7.378927628997952 " "
absolute error = 3.9790393202565610000000000000E-13 " "
relative error = 5.392435758035918000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.853999999999906 " "
y[1] (analytic) = 7.385309747153786 " "
y[1] (numeric) = 7.385309747154185 " "
absolute error = 3.98792110445356230000000000000E-13 " "
relative error = 5.399802094949994000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8549999999999058 " "
y[1] (analytic) = 7.391698250620298 " "
y[1] (numeric) = 7.3916982506206965 " "
absolute error = 3.98792110445356230000000000000E-13 " "
relative error = 5.395135149245173000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8559999999999057 " "
y[1] (analytic) = 7.398093145785592 " "
y[1] (numeric) = 7.3980931457859915 " "
absolute error = 3.99680288865056350000000000000E-13 " "
relative error = 5.402477111182884000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8569999999999056 " "
y[1] (analytic) = 7.404494439044565 " "
y[1] (numeric) = 7.404494439044965 " "
absolute error = 4.0056846728475650000000000000E-13 " "
relative error = 5.4098017168130060000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8579999999999055 " "
y[1] (analytic) = 7.410902136798511 " "
y[1] (numeric) = 7.410902136798912 " "
absolute error = 4.0056846728475650000000000000E-13 " "
relative error = 5.4051242330640310000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8589999999999054 " "
y[1] (analytic) = 7.417316245455129 " "
y[1] (numeric) = 7.417316245455530 " "
absolute error = 4.0056846728475650000000000000E-13 " "
relative error = 5.400450163227164000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8599999999999053 " "
y[1] (analytic) = 7.423736771428525 " "
y[1] (numeric) = 7.423736771428927 " "
absolute error = 4.0145664570445660000000000000E-13 " "
relative error = 5.407743540281880000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8609999999999052 " "
y[1] (analytic) = 7.4301637211392295 " "
y[1] (numeric) = 7.430163721139632 " "
absolute error = 4.02344824124156730000000000000E-13 " "
relative error = 5.415019631121496000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.861999999999905 " "
y[1] (analytic) = 7.436597101014190 " "
y[1] (numeric) = 7.436597101014594 " "
absolute error = 4.03233002543856860000000000000E-13 " "
relative error = 5.422278457022562000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.862999999999905 " "
y[1] (analytic) = 7.443036917486789 " "
y[1] (numeric) = 7.443036917487193 " "
absolute error = 4.041211809635570000000000000E-13 " "
relative error = 5.429520039247800000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8639999999999048 " "
y[1] (analytic) = 7.449483176996842 " "
y[1] (numeric) = 7.449483176997247 " "
absolute error = 4.0500935938325710000000000000E-13 " "
relative error = 5.4367443990460970000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8649999999999047 " "
y[1] (analytic) = 7.455935885990609 " "
y[1] (numeric) = 7.455935885991015 " "
absolute error = 4.05897537802957230000000000000E-13 " "
relative error = 5.443951557652497000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8659999999999046 " "
y[1] (analytic) = 7.462395050920800 " "
y[1] (numeric) = 7.462395050921207 " "
absolute error = 4.05897537802957230000000000000E-13 " "
relative error = 5.439239480532093000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8669999999999045 " "
y[1] (analytic) = 7.468860678246581 " "
y[1] (numeric) = 7.468860678246988 " "
absolute error = 4.06785716222657360000000000000E-13 " "
relative error = 5.4464226037505360000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8679999999999044 " "
y[1] (analytic) = 7.475332774433580 " "
y[1] (numeric) = 7.475332774433986 " "
absolute error = 4.06785716222657360000000000000E-13 " "
relative error = 5.441707125252098000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8689999999999043 " "
y[1] (analytic) = 7.481811345953890 " "
y[1] (numeric) = 7.4818113459542985 " "
absolute error = 4.0767389464235750000000000000E-13 " "
relative error = 5.4488662676963180000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8699999999999042 " "
y[1] (analytic) = 7.48829639928609 " "
y[1] (numeric) = 7.488296399286497 " "
absolute error = 4.0767389464235750000000000000E-13 " "
relative error = 5.444147412236832000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.870999999999904 " "
y[1] (analytic) = 7.494787940915227 " "
y[1] (numeric) = 7.494787940915636 " "
absolute error = 4.0856207306205760000000000000E-13 " "
relative error = 5.451282628447070000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.871999999999904 " "
y[1] (analytic) = 7.501285977332848 " "
y[1] (numeric) = 7.501285977333256 " "
absolute error = 4.0856207306205760000000000000E-13 " "
relative error = 5.446560420395086000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8729999999999039 " "
y[1] (analytic) = 7.507790515036987 " "
y[1] (numeric) = 7.507790515037397 " "
absolute error = 4.09450251481757730000000000000E-13 " "
relative error = 5.453671764838002000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8739999999999037 " "
y[1] (analytic) = 7.514301560532184 " "
y[1] (numeric) = 7.514301560532594 " "
absolute error = 4.10338429901457860000000000000E-13 " "
relative error = 5.460766068488693000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8749999999999036 " "
y[1] (analytic) = 7.5208191203294845 " "
y[1] (numeric) = 7.520819120329895 " "
absolute error = 4.10338429901457860000000000000E-13 " "
relative error = 5.456033755582211000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8759999999999035 " "
y[1] (analytic) = 7.527343200946448 " "
y[1] (numeric) = 7.527343200946860 " "
absolute error = 4.112266083211580000000000000E-13 " "
relative error = 5.4631042765454430000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8769999999999034 " "
y[1] (analytic) = 7.533873808907157 " "
y[1] (numeric) = 7.533873808907570 " "
absolute error = 4.1211478674085810000000000000E-13 " "
relative error = 5.4701578124871510000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8779999999999033 " "
y[1] (analytic) = 7.540410950742219 " "
y[1] (numeric) = 7.540410950742632 " "
absolute error = 4.13002965160558230000000000000E-13 " "
relative error = 5.477194384477221000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8789999999999032 " "
y[1] (analytic) = 7.546954632988777 " "
y[1] (numeric) = 7.54695463298919 " "
absolute error = 4.13002965160558230000000000000E-13 " "
relative error = 5.472445313971617000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.879999999999903 " "
y[1] (analytic) = 7.553504862190513 " "
y[1] (numeric) = 7.553504862190928 " "
absolute error = 4.1477932199995850000000000000E-13 " "
relative error = 5.491216720812074000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.880999999999903 " "
y[1] (analytic) = 7.560061644897658 " "
y[1] (numeric) = 7.560061644898073 " "
absolute error = 4.1477932199995850000000000000E-13 " "
relative error = 5.486454231228340000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8819999999999029 " "
y[1] (analytic) = 7.566624987666994 " "
y[1] (numeric) = 7.56662498766741 " "
absolute error = 4.1566750041965860000000000000E-13 " "
relative error = 5.493433348384043000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8829999999999028 " "
y[1] (analytic) = 7.573194897061866 " "
y[1] (numeric) = 7.573194897062282 " "
absolute error = 4.16555678839358730000000000000E-13 " "
relative error = 5.500395599233393000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8839999999999026 " "
y[1] (analytic) = 7.579771379652182 " "
y[1] (numeric) = 7.579771379652600 " "
absolute error = 4.17443857259058860000000000000E-13 " "
relative error = 5.507341004765428000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8849999999999025 " "
y[1] (analytic) = 7.586354442014426 " "
y[1] (numeric) = 7.586354442014844 " "
absolute error = 4.183320356787590000000000000E-13 " "
relative error = 5.514269585955149000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8859999999999024 " "
y[1] (analytic) = 7.5929440907316605 " "
y[1] (numeric) = 7.59294409073208 " "
absolute error = 4.1922021409845910000000000000E-13 " "
relative error = 5.52118136376351000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8869999999999023 " "
y[1] (analytic) = 7.599540332393536 " "
y[1] (numeric) = 7.599540332393955 " "
absolute error = 4.1922021409845910000000000000E-13 " "
relative error = 5.516389094107517000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8879999999999022 " "
y[1] (analytic) = 7.606143173596293 " "
y[1] (numeric) = 7.606143173596713 " "
absolute error = 4.20108392518159230000000000000E-13 " "
relative error = 5.523277473615134000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.888999999999902 " "
y[1] (analytic) = 7.612752620942775 " "
y[1] (numeric) = 7.612752620943196 " "
absolute error = 4.20996570937859360000000000000E-13 " "
relative error = 5.530149105064739000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.889999999999902 " "
y[1] (analytic) = 7.619368681042428 " "
y[1] (numeric) = 7.61936868104285 " "
absolute error = 4.2188474935755950000000000000E-13 " "
relative error = 5.537004009364201000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8909999999999019 " "
y[1] (analytic) = 7.625991360511315 " "
y[1] (numeric) = 7.625991360511737 " "
absolute error = 4.2188474935755950000000000000E-13 " "
relative error = 5.532195480080803000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8919999999999018 " "
y[1] (analytic) = 7.632620665972113 " "
y[1] (numeric) = 7.632620665972537 " "
absolute error = 4.23661106196959740000000000000E-13 " "
relative error = 5.550663720073674000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8929999999999017 " "
y[1] (analytic) = 7.639256604054130 " "
y[1] (numeric) = 7.639256604054555 " "
absolute error = 4.24549284616659860000000000000E-13 " "
relative error = 5.557468568228914000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8939999999999015 " "
y[1] (analytic) = 7.645899181393306 " "
y[1] (numeric) = 7.645899181393731 " "
absolute error = 4.25437463036360000000000000E-13 " "
relative error = 5.564256772724446000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8949999999999014 " "
y[1] (analytic) = 7.652548404632216 " "
y[1] (numeric) = 7.652548404632642 " "
absolute error = 4.2632564145606010000000000000E-13 " "
relative error = 5.571028354397576000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8959999999999013 " "
y[1] (analytic) = 7.659204280420085 " "
y[1] (numeric) = 7.6592042804205125 " "
absolute error = 4.27213819875760240000000000000E-13 " "
relative error = 5.577783334071471000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8969999999999012 " "
y[1] (analytic) = 7.66586681541279 " "
y[1] (numeric) = 7.665866815413218 " "
absolute error = 4.28101998295460360000000000000E-13 " "
relative error = 5.5845217325551470000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.897999999999901 " "
y[1] (analytic) = 7.672536016272865 " "
y[1] (numeric) = 7.672536016273294 " "
absolute error = 4.2899017671516050000000000000E-13 " "
relative error = 5.591243570643462000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.898999999999901 " "
y[1] (analytic) = 7.679211889669513 " "
y[1] (numeric) = 7.679211889669943 " "
absolute error = 4.2987835513486060000000000000E-13 " "
relative error = 5.597948869117103000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.8999999999999009 " "
y[1] (analytic) = 7.685894442278607 " "
y[1] (numeric) = 7.685894442279038 " "
absolute error = 4.30766533554560740000000000000E-13 " "
relative error = 5.604637648742585000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9009999999999008 " "
y[1] (analytic) = 7.6925836807827 " "
y[1] (numeric) = 7.692583680783132 " "
absolute error = 4.31654711974260860000000000000E-13 " "
relative error = 5.6113099302722320000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9019999999999007 " "
y[1] (analytic) = 7.699279611871032 " "
y[1] (numeric) = 7.699279611871464 " "
absolute error = 4.325428903939610000000000000E-13 " "
relative error = 5.617965734444174000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9029999999999005 " "
y[1] (analytic) = 7.705982242239534 " "
y[1] (numeric) = 7.705982242239967 " "
absolute error = 4.3343106881366110000000000000E-13 " "
relative error = 5.624605081982335000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9039999999999004 " "
y[1] (analytic) = 7.712691578590837 " "
y[1] (numeric) = 7.712691578591271 " "
absolute error = 4.34319247233361240000000000000E-13 " "
relative error = 5.631227993596425000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9049999999999003 " "
y[1] (analytic) = 7.719407627634278 " "
y[1] (numeric) = 7.719407627634713 " "
absolute error = 4.35207425653061360000000000000E-13 " "
relative error = 5.637834489981932000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9059999999999002 " "
y[1] (analytic) = 7.726130396085907 " "
y[1] (numeric) = 7.726130396086343 " "
absolute error = 4.3609560407276150000000000000E-13 " "
relative error = 5.644424591820111000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9069999999999 " "
y[1] (analytic) = 7.732859890668492 " "
y[1] (numeric) = 7.732859890668930 " "
absolute error = 4.3698378249246160000000000000E-13 " "
relative error = 5.650998319777977000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9079999999999 " "
y[1] (analytic) = 7.739596118111530 " "
y[1] (numeric) = 7.739596118111967 " "
absolute error = 4.37871960912161740000000000000E-13 " "
relative error = 5.6575556945082950000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9089999999998999 " "
y[1] (analytic) = 7.746339085151246 " "
y[1] (numeric) = 7.746339085151685 " "
absolute error = 4.38760139331861860000000000000E-13 " "
relative error = 5.66409673664957000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9099999999998998 " "
y[1] (analytic) = 7.75308879853061 " "
y[1] (numeric) = 7.753088798531050 " "
absolute error = 4.396483177515620000000000000E-13 " "
relative error = 5.670621466826042000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9109999999998997 " "
y[1] (analytic) = 7.759845264999335 " "
y[1] (numeric) = 7.759845264999775 " "
absolute error = 4.4053649617126210000000000000E-13 " "
relative error = 5.6771299056476720000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9119999999998996 " "
y[1] (analytic) = 7.766608491313889 " "
y[1] (numeric) = 7.766608491314330 " "
absolute error = 4.4053649617126210000000000000E-13 " "
relative error = 5.6721862144069000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9129999999998994 " "
y[1] (analytic) = 7.773378484237498 " "
y[1] (numeric) = 7.773378484237939 " "
absolute error = 4.4053649617126210000000000000E-13 " "
relative error = 5.6672461924317960000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9139999999998993 " "
y[1] (analytic) = 7.780155250540155 " "
y[1] (numeric) = 7.780155250540597 " "
absolute error = 4.41424674590962240000000000000E-13 " "
relative error = 5.6737257853603280000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9149999999998992 " "
y[1] (analytic) = 7.786938796998628 " "
y[1] (numeric) = 7.78693879699907 " "
absolute error = 4.42312853010662370000000000000E-13 " "
relative error = 5.6801891544485480000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9159999999998991 " "
y[1] (analytic) = 7.793729130396464 " "
y[1] (numeric) = 7.7937291303969065 " "
absolute error = 4.42312853010662370000000000000E-13 " "
relative error = 5.675240255471415000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.916999999999899 " "
y[1] (analytic) = 7.800526257523996 " "
y[1] (numeric) = 7.80052625752444 " "
absolute error = 4.4320103143036250000000000000E-13 " "
relative error = 5.681681168663114000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.917999999999899 " "
y[1] (analytic) = 7.807330185178353 " "
y[1] (numeric) = 7.807330185178797 " "
absolute error = 4.4408920985006260000000000000E-13 " "
relative error = 5.6881059122250720000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9189999999998988 " "
y[1] (analytic) = 7.814140920163462 " "
y[1] (numeric) = 7.814140920163907 " "
absolute error = 4.44977388269762740000000000000E-13 " "
relative error = 5.694514506662549000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9199999999998987 " "
y[1] (analytic) = 7.8209584692900584 " "
y[1] (numeric) = 7.820958469290504 " "
absolute error = 4.45865566689462870000000000000E-13 " "
relative error = 5.700906972466457000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9209999999998986 " "
y[1] (analytic) = 7.827782839375693 " "
y[1] (numeric) = 7.827782839376140 " "
absolute error = 4.45865566689462870000000000000E-13 " "
relative error = 5.695936842379534000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9219999999998985 " "
y[1] (analytic) = 7.834614037244736 " "
y[1] (numeric) = 7.834614037245183 " "
absolute error = 4.467537451091630000000000000E-13 " "
relative error = 5.702307005620874000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9229999999998983 " "
y[1] (analytic) = 7.841452069728386 " "
y[1] (numeric) = 7.841452069728834 " "
absolute error = 4.4764192352886310000000000000E-13 " "
relative error = 5.708661094250221000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9239999999998982 " "
y[1] (analytic) = 7.848296943664676 " "
y[1] (numeric) = 7.848296943665124 " "
absolute error = 4.48530101948563240000000000000E-13 " "
relative error = 5.71499912870431000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9249999999998981 " "
y[1] (analytic) = 7.855148665898480 " "
y[1] (numeric) = 7.855148665898929 " "
absolute error = 4.49418280368263370000000000000E-13 " "
relative error = 5.721321129405493000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.925999999999898 " "
y[1] (analytic) = 7.8620072432815205 " "
y[1] (numeric) = 7.862007243281970 " "
absolute error = 4.5030645878796350000000000000E-13 " "
relative error = 5.727627116761728000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.926999999999898 " "
y[1] (analytic) = 7.868872682672377 " "
y[1] (numeric) = 7.868872682672828 " "
absolute error = 4.5119463720766360000000000000E-13 " "
relative error = 5.733917111166573000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9279999999998978 " "
y[1] (analytic) = 7.8757449909364885 " "
y[1] (numeric) = 7.875744990936940 " "
absolute error = 4.52082815627363740000000000000E-13 " "
relative error = 5.7401911329991850000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9289999999998977 " "
y[1] (analytic) = 7.882624174946164 " "
y[1] (numeric) = 7.882624174946616 " "
absolute error = 4.52082815627363740000000000000E-13 " "
relative error = 5.73518165516817000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9299999999998976 " "
y[1] (analytic) = 7.889510241580587 " "
y[1] (numeric) = 7.889510241581041 " "
absolute error = 4.538591724667640000000000000E-13 " "
relative error = 5.7526913403922230000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9309999999998975 " "
y[1] (analytic) = 7.896403197725827 " "
y[1] (numeric) = 7.896403197726281 " "
absolute error = 4.538591724667640000000000000E-13 " "
relative error = 5.747669680766503000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9319999999998974 " "
y[1] (analytic) = 7.903303050274839 " "
y[1] (numeric) = 7.9033030502752935 " "
absolute error = 4.5474735088646410000000000000E-13 " "
relative error = 5.753889835600449000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9329999999998972 " "
y[1] (analytic) = 7.910209806127476 " "
y[1] (numeric) = 7.910209806127932 " "
absolute error = 4.5563552930616424000000000000E-13 " "
relative error = 5.760094112209462000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9339999999998971 " "
y[1] (analytic) = 7.917123472190496 " "
y[1] (numeric) = 7.917123472190951 " "
absolute error = 4.5563552930616424000000000000E-13 " "
relative error = 5.755064082385718000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.934999999999897 " "
y[1] (analytic) = 7.924044055377563 " "
y[1] (numeric) = 7.92404405537802 " "
absolute error = 4.5652370772586437000000000000E-13 " "
relative error = 5.761246461218873000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.935999999999897 " "
y[1] (analytic) = 7.930971562609264 " "
y[1] (numeric) = 7.930971562609721 " "
absolute error = 4.5741188614556450000000000000E-13 " "
relative error = 5.767413015349124000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9369999999998968 " "
y[1] (analytic) = 7.937906000813104 " "
y[1] (numeric) = 7.9379060008135625 " "
absolute error = 4.5830006456526460000000000000E-13 " "
relative error = 5.773563765032234000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9379999999998967 " "
y[1] (analytic) = 7.944847376923524 " "
y[1] (numeric) = 7.944847376923983 " "
absolute error = 4.5918824298496475000000000000E-13 " "
relative error = 5.7796987305094820000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9389999999998966 " "
y[1] (analytic) = 7.9517956978818995 " "
y[1] (numeric) = 7.951795697882359 " "
absolute error = 4.5918824298496475000000000000E-13 " "
relative error = 5.77464839932039000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9399999999998965 " "
y[1] (analytic) = 7.958750970636552 " "
y[1] (numeric) = 7.958750970637012 " "
absolute error = 4.6007642140466487000000000000E-13 " "
relative error = 5.780761618275227000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9409999999998964 " "
y[1] (analytic) = 7.965713202142755 " "
y[1] (numeric) = 7.965713202143216 " "
absolute error = 4.609645998243650000000000000E-13 " "
relative error = 5.786859106355559000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9419999999998963 " "
y[1] (analytic) = 7.97268239936274 " "
y[1] (numeric) = 7.972682399363202 " "
absolute error = 4.6185277824406510000000000000E-13 " "
relative error = 5.7929408837479990000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9429999999998961 " "
y[1] (analytic) = 7.979658569265706 " "
y[1] (numeric) = 7.979658569266169 " "
absolute error = 4.6274095666376525000000000000E-13 " "
relative error = 5.7990069706246460000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.943999999999896 " "
y[1] (analytic) = 7.986641718827823 " "
y[1] (numeric) = 7.986641718828286 " "
absolute error = 4.6362913508346537000000000000E-13 " "
relative error = 5.805057387143078000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.944999999999896 " "
y[1] (analytic) = 7.993631855032241 " "
y[1] (numeric) = 7.993631855032705 " "
absolute error = 4.6362913508346537000000000000E-13 " "
relative error = 5.799981078583152000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9459999999998958 " "
y[1] (analytic) = 8.000628984869095 " "
y[1] (numeric) = 8.00062898486956 " "
absolute error = 4.6540549192286560000000000000E-13 " "
relative error = 5.81711128966294000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9469999999998957 " "
y[1] (analytic) = 8.007633115335521 " "
y[1] (numeric) = 8.007633115335986 " "
absolute error = 4.6540549192286560000000000000E-13 " "
relative error = 5.812023168638453000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9479999999998956 " "
y[1] (analytic) = 8.014644253435645 " "
y[1] (numeric) = 8.01464425343611 " "
absolute error = 4.6540549192286560000000000000E-13 " "
relative error = 5.806938863485548000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9489999999998955 " "
y[1] (analytic) = 8.021662406180607 " "
y[1] (numeric) = 8.021662406181072 " "
absolute error = 4.6540549192286560000000000000E-13 " "
relative error = 5.8018583724525170000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9499999999998954 " "
y[1] (analytic) = 8.028687580588558 " "
y[1] (numeric) = 8.028687580589025 " "
absolute error = 4.6718184876226587000000000000E-13 " "
relative error = 5.818906814755124000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9509999999998953 " "
y[1] (analytic) = 8.035719783684677 " "
y[1] (numeric) = 8.035719783685146 " "
absolute error = 4.6895820560166610000000000000E-13 " "
relative error = 5.835920343487032000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9519999999998952 " "
y[1] (analytic) = 8.042759022501166 " "
y[1] (numeric) = 8.042759022501635 " "
absolute error = 4.6895820560166610000000000000E-13 " "
relative error = 5.830812589183206000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.952999999999895 " "
y[1] (analytic) = 8.049805304077264 " "
y[1] (numeric) = 8.049805304077733 " "
absolute error = 4.6895820560166610000000000000E-13 " "
relative error = 5.825708671042473000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.953999999999895 " "
y[1] (analytic) = 8.056858635459253 " "
y[1] (numeric) = 8.056858635459724 " "
absolute error = 4.7073456244106640000000000000E-13 " "
relative error = 5.842656347094190000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9549999999998948 " "
y[1] (analytic) = 8.063919023700468 " "
y[1] (numeric) = 8.063919023700938 " "
absolute error = 4.7073456244106640000000000000E-13 " "
relative error = 5.837540791983921000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9559999999998947 " "
y[1] (analytic) = 8.070986475861293 " "
y[1] (numeric) = 8.070986475861766 " "
absolute error = 4.7251091928046660000000000000E-13 " "
relative error = 5.85443824857905900000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9569999999998946 " "
y[1] (analytic) = 8.078060999009184 " "
y[1] (numeric) = 8.078060999009658 " "
absolute error = 4.7428727611986690000000000000E-13 " "
relative error = 5.871300998816927000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9579999999998945 " "
y[1] (analytic) = 8.085142600218663 " "
y[1] (numeric) = 8.085142600219138 " "
absolute error = 4.7428727611986690000000000000E-13 " "
relative error = 5.866158453495177000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9589999999998944 " "
y[1] (analytic) = 8.092231286571334 " "
y[1] (numeric) = 8.09223128657181 " "
absolute error = 4.7606363295926710000000000000E-13 " "
relative error = 5.882971162098044000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9599999999998943 " "
y[1] (analytic) = 8.099327065155883 " "
y[1] (numeric) = 8.09932706515636 " "
absolute error = 4.7606363295926710000000000000E-13 " "
relative error = 5.877817121466060000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9609999999998942 " "
y[1] (analytic) = 8.106429943068086 " "
y[1] (numeric) = 8.106429943068564 " "
absolute error = 4.7783998979866740000000000000E-13 " "
relative error = 5.894579897125671000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.961999999999894 " "
y[1] (analytic) = 8.113539927410827 " "
y[1] (numeric) = 8.113539927411304 " "
absolute error = 4.7783998979866740000000000000E-13 " "
relative error = 5.889414411881184000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.962999999999894 " "
y[1] (analytic) = 8.120657025294086 " "
y[1] (numeric) = 8.120657025294566 " "
absolute error = 4.7961634663806760000000000000E-13 " "
relative error = 5.906127363145207000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9639999999998938 " "
y[1] (analytic) = 8.127781243834967 " "
y[1] (numeric) = 8.127781243835445 " "
absolute error = 4.7783998979866740000000000000E-13 " "
relative error = 5.879095111733175000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9649999999998937 " "
y[1] (analytic) = 8.134912590157683 " "
y[1] (numeric) = 8.134912590158162 " "
absolute error = 4.7961634663806760000000000000E-13 " "
relative error = 5.895777506181797000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9659999999998936 " "
y[1] (analytic) = 8.142051071393585 " "
y[1] (numeric) = 8.142051071394064 " "
absolute error = 4.7961634663806760000000000000E-13 " "
relative error = 5.890608428177999000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9669999999998935 " "
y[1] (analytic) = 8.149196694681152 " "
y[1] (numeric) = 8.149196694681633 " "
absolute error = 4.8139270347746790000000000000E-13 " "
relative error = 5.907241186013649000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9679999999998934 " "
y[1] (analytic) = 8.15634946716601 " "
y[1] (numeric) = 8.156349467166493 " "
absolute error = 4.8316906031686810000000000000E-13 " "
relative error = 5.923839608171536000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9689999999998933 " "
y[1] (analytic) = 8.163509396000933 " "
y[1] (numeric) = 8.163509396001416 " "
absolute error = 4.8316906031686810000000000000E-13 " "
relative error = 5.918644015447067000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9699999999998932 " "
y[1] (analytic) = 8.170676488345848 " "
y[1] (numeric) = 8.170676488346333 " "
absolute error = 4.8494541715626840000000000000E-13 " "
relative error = 5.9351929775700320000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.970999999999893 " "
y[1] (analytic) = 8.17785075136785 " "
y[1] (numeric) = 8.177850751368334 " "
absolute error = 4.8494541715626840000000000000E-13 " "
relative error = 5.929986152842850000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.971999999999893 " "
y[1] (analytic) = 8.185032192241199 " "
y[1] (numeric) = 8.185032192241685 " "
absolute error = 4.8672177399566860000000000000E-13 " "
relative error = 5.946485762842139000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9729999999998928 " "
y[1] (analytic) = 8.19222081814734 " "
y[1] (numeric) = 8.192220818147828 " "
absolute error = 4.8672177399566860000000000000E-13 " "
relative error = 5.941267756326667000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9739999999998927 " "
y[1] (analytic) = 8.199416636274899 " "
y[1] (numeric) = 8.199416636275387 " "
absolute error = 4.8849813083506890000000000000E-13 " "
relative error = 5.957718121968735000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9749999999998926 " "
y[1] (analytic) = 8.206619653819693 " "
y[1] (numeric) = 8.206619653820184 " "
absolute error = 4.9027448767446913000000000000E-13 " "
relative error = 5.974134398275367000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9759999999998925 " "
y[1] (analytic) = 8.213829877984743 " "
y[1] (numeric) = 8.213829877985233 " "
absolute error = 4.9027448767446913000000000000E-13 " "
relative error = 5.9688902126952460000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9769999999998924 " "
y[1] (analytic) = 8.221047315980272 " "
y[1] (numeric) = 8.221047315980762 " "
absolute error = 4.9027448767446913000000000000E-13 " "
relative error = 5.96364999288426000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9779999999998923 " "
y[1] (analytic) = 8.228271975023718 " "
y[1] (numeric) = 8.228271975024208 " "
absolute error = 4.9027448767446913000000000000E-13 " "
relative error = 5.9584137369627470000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9789999999998922 " "
y[1] (analytic) = 8.23550386233974 " "
y[1] (numeric) = 8.235503862340233 " "
absolute error = 4.9205084451386940000000000000E-13 " "
relative error = 5.974750941031988000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.979999999999892 " "
y[1] (analytic) = 8.24274298516023 " "
y[1] (numeric) = 8.242742985160723 " "
absolute error = 4.9205084451386940000000000000E-13 " "
relative error = 5.9695036640076000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.980999999999892 " "
y[1] (analytic) = 8.24998935072431 " "
y[1] (numeric) = 8.249989350724801 " "
absolute error = 4.9205084451386940000000000000E-13 " "
relative error = 5.96426035956846100000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9819999999998918 " "
y[1] (analytic) = 8.25724296627834 " "
y[1] (numeric) = 8.257242966278834 " "
absolute error = 4.9382720135326963000000000000E-13 " "
relative error = 5.980533737108195000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9829999999998917 " "
y[1] (analytic) = 8.264503839075944 " "
y[1] (numeric) = 8.264503839076438 " "
absolute error = 4.9382720135326963000000000000E-13 " "
relative error = 5.9752794719311850000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9839999999998916 " "
y[1] (analytic) = 8.271771976377991 " "
y[1] (numeric) = 8.271771976378487 " "
absolute error = 4.9560355819266990000000000000E-13 " "
relative error = 5.991504113120907000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9849999999998915 " "
y[1] (analytic) = 8.279047385452623 " "
y[1] (numeric) = 8.279047385453119 " "
absolute error = 4.9560355819266990000000000000E-13 " "
relative error = 5.9862389369036660000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9859999999998914 " "
y[1] (analytic) = 8.286330073575245 " "
y[1] (numeric) = 8.286330073575742 " "
absolute error = 4.9737991503207013000000000000E-13 " "
relative error = 6.002414948665798000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9869999999998913 " "
y[1] (analytic) = 8.293620048028549 " "
y[1] (numeric) = 8.293620048029046 " "
absolute error = 4.9737991503207013000000000000E-13 " "
relative error = 5.997138911015110000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9879999999998912 " "
y[1] (analytic) = 8.300917316102508 " "
y[1] (numeric) = 8.300917316103007 " "
absolute error = 4.9915627187147040000000000000E-13 " "
relative error = 6.0132664001264490000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.988999999999891 " "
y[1] (analytic) = 8.30822188509439 " "
y[1] (numeric) = 8.308221885094891 " "
absolute error = 5.0093262871087060000000000000E-13 " "
relative error = 6.029360260702515000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.989999999999891 " "
y[1] (analytic) = 8.31553376230877 " "
y[1] (numeric) = 8.31553376230927 " "
absolute error = 5.0093262871087060000000000000E-13 " "
relative error = 6.024058623649783000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9909999999998909 " "
y[1] (analytic) = 8.322852955057519 " "
y[1] (numeric) = 8.322852955058021 " "
absolute error = 5.0270898555027090000000000000E-13 " "
relative error = 6.040104135743399000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9919999999998907 " "
y[1] (analytic) = 8.330179470659832 " "
y[1] (numeric) = 8.330179470660337 " "
absolute error = 5.0448534238967110000000000000E-13 " "
relative error = 6.056116127708242000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9929999999998906 " "
y[1] (analytic) = 8.33751331644223 " "
y[1] (numeric) = 8.337513316442735 " "
absolute error = 5.0448534238967110000000000000E-13 " "
relative error = 6.050789045155545000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9939999999998905 " "
y[1] (analytic) = 8.344854499738554 " "
y[1] (numeric) = 8.34485449973906 " "
absolute error = 5.0626169922907140000000000000E-13 " "
relative error = 6.0667528624367580000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9949999999998904 " "
y[1] (analytic) = 8.35220302788999 " "
y[1] (numeric) = 8.352203027890498 " "
absolute error = 5.0803805606847160000000000000E-13 " "
relative error = 6.082683267779913000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9959999999998903 " "
y[1] (analytic) = 8.359558908245067 " "
y[1] (numeric) = 8.359558908245576 " "
absolute error = 5.0981441290787190000000000000E-13 " "
relative error = 6.098580301946791000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9969999999998902 " "
y[1] (analytic) = 8.366922148159667 " "
y[1] (numeric) = 8.366922148160175 " "
absolute error = 5.0803805606847160000000000000E-13 " "
relative error = 6.071982588964526000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.99799999999989 " "
y[1] (analytic) = 8.374292754997025 " "
y[1] (numeric) = 8.374292754997535 " "
absolute error = 5.0981441290787190000000000000E-13 " "
relative error = 6.087850375229126000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.99899999999989 " "
y[1] (analytic) = 8.381670736127756 " "
y[1] (numeric) = 8.381670736128266 " "
absolute error = 5.0981441290787190000000000000E-13 " "
relative error = 6.082491533703468000000000000E-12 "%"
h = 1.000E-3 " "
" "
"TOP MAIN SOLVE Loop"
"NO POLE"
x[1] = 1.9999999999998899 " "
y[1] (analytic) = 8.389056098929837 " "
y[1] (numeric) = 8.389056098930347 " "
absolute error = 5.0981441290787190000000000000E-13 " "
relative error = 6.0771367707614590000000000000E-12 "%"
h = 1.000E-3 " "
"Finished!"
"Maximum Iterations Reached before Solution Completed!"
"diff ( y , x , 1 ) = exp ( x ) ;"
Iterations = 1000
"Total Elapsed Time "= 7 Minutes 34 Seconds
"Elapsed Time(since restart) "= 7 Minutes 33 Seconds
"Expected Time Remaining "= 1 Hours 0 Minutes 30 Seconds
"Optimized Time Remaining "= 1 Hours 0 Minutes 21 Seconds
"Time to Timeout "= 7 Minutes 25 Seconds
Percent Done = 11.122222222220998 "%"
(%o49) true
(%o49) diffeq.max