##############ECHO OF PROBLEM################# ##############temp/expt_lin_sinpostode.ode################# diff ( y , x , 1 ) = expt((0.2 * x + 0.3) , sin(x)); ! // BEGIN FIRST INPUT BLOCK Digits=32; max_terms=30; ! // END FIRST INPUT BLOCK // BEGIN SECOND INPUT BLOCK x_start=0.1; x_end=5.0; array_y_init[0 + 1] = exact_soln_y(x_start); glob_h=0.05; glob_look_poles=true; glob_max_iter=1000000; // END SECOND INPUT BLOCK // BEGIN OVERRIDE BLOCK glob_desired_digits_correct=10; glob_display_interval=0.001; glob_look_poles=true; glob_max_iter=10000000; glob_max_minutes=3; // END OVERRIDE BLOCK ! // BEGIN USER DEF BLOCK double exact_soln_y (double x) { return(0.0); } // END USER DEF BLOCK #######END OF ECHO OF PROBLEM################# START of Optimize min_size = 0 min_size = 1 opt_iter = 1 WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. glob_desired_digits_correct = 10 desired_abs_gbl_error = 1e-10 range = 4.9 estimated_steps = 4900 step_error = 2.040816326530612e-14 est_needed_step_err = 2.040816326530612e-14 hn_div_ho = 0.5 hn_div_ho_2 = 0.25 hn_div_ho_3 = 0.125 value3 = 6.764783327463374e-87 max_value3 = 6.764783327463374e-87 value3 = 6.764783327463374e-87 best_h = 0.001 START of Soultion x[1] = 0.1 y[1] (analytic) = 0 y[1] (numeric) = 0 absolute error = 0 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.647 Order of pole = 0.6186 x[1] = 0.101 y[1] (analytic) = 0 y[1] (numeric) = 0.0008920001100646827 absolute error = 0.0008920001100646827 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.641 Order of pole = 0.6115 x[1] = 0.102 y[1] (analytic) = 0 y[1] (numeric) = 0.001783046265792339 absolute error = 0.001783046265792339 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.634 Order of pole = 0.6044 x[1] = 0.103 y[1] (analytic) = 0 y[1] (numeric) = 0.00267314066076505 absolute error = 0.00267314066076505 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.628 Order of pole = 0.5972 x[1] = 0.104 y[1] (analytic) = 0 y[1] (numeric) = 0.00356228548356115 absolute error = 0.00356228548356115 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.622 Order of pole = 0.59 x[1] = 0.105 y[1] (analytic) = 0 y[1] (numeric) = 0.004450482917769234 absolute error = 0.004450482917769234 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.616 Order of pole = 0.5828 x[1] = 0.106 y[1] (analytic) = 0 y[1] (numeric) = 0.005337735142002146 absolute error = 0.005337735142002146 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.61 Order of pole = 0.5755 x[1] = 0.107 y[1] (analytic) = 0 y[1] (numeric) = 0.006224044329910902 absolute error = 0.006224044329910902 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.604 Order of pole = 0.5681 x[1] = 0.108 y[1] (analytic) = 0 y[1] (numeric) = 0.007109412650198588 absolute error = 0.007109412650198588 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.597 Order of pole = 0.5607 x[1] = 0.109 y[1] (analytic) = 0 y[1] (numeric) = 0.007993842266634204 absolute error = 0.007993842266634204 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.591 Order of pole = 0.5533 x[1] = 0.11 y[1] (analytic) = 0 y[1] (numeric) = 0.008877335338066466 absolute error = 0.008877335338066466 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.584 Order of pole = 0.5458 x[1] = 0.111 y[1] (analytic) = 0 y[1] (numeric) = 0.009759894018437574 absolute error = 0.009759894018437574 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.578 Order of pole = 0.5383 x[1] = 0.112 y[1] (analytic) = 0 y[1] (numeric) = 0.01064152045679694 absolute error = 0.01064152045679694 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.572 Order of pole = 0.5308 x[1] = 0.113 y[1] (analytic) = 0 y[1] (numeric) = 0.01152221679731483 absolute error = 0.01152221679731483 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.565 Order of pole = 0.5232 x[1] = 0.114 y[1] (analytic) = 0 y[1] (numeric) = 0.01240198517929607 absolute error = 0.01240198517929607 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.559 Order of pole = 0.5155 x[1] = 0.115 y[1] (analytic) = 0 y[1] (numeric) = 0.01328082773719356 absolute error = 0.01328082773719356 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.552 Order of pole = 0.5078 x[1] = 0.116 y[1] (analytic) = 0 y[1] (numeric) = 0.01415874660062189 absolute error = 0.01415874660062189 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.545 Order of pole = 0.5001 x[1] = 0.117 y[1] (analytic) = 0 y[1] (numeric) = 0.01503574389437082 absolute error = 0.01503574389437082 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.539 Order of pole = 0.4923 x[1] = 0.118 y[1] (analytic) = 0 y[1] (numeric) = 0.01591182173841877 absolute error = 0.01591182173841877 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.532 Order of pole = 0.4844 x[1] = 0.119 y[1] (analytic) = 0 y[1] (numeric) = 0.01678698224794623 absolute error = 0.01678698224794623 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.525 Order of pole = 0.4765 x[1] = 0.12 y[1] (analytic) = 0 y[1] (numeric) = 0.01766122753334915 absolute error = 0.01766122753334915 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.518 Order of pole = 0.4685 x[1] = 0.121 y[1] (analytic) = 0 y[1] (numeric) = 0.01853455970025231 absolute error = 0.01853455970025231 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.511 Order of pole = 0.4605 x[1] = 0.122 y[1] (analytic) = 0 y[1] (numeric) = 0.01940698084952261 absolute error = 0.01940698084952261 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.505 Order of pole = 0.4525 x[1] = 0.123 y[1] (analytic) = 0 y[1] (numeric) = 0.02027849307728233 absolute error = 0.02027849307728233 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.498 Order of pole = 0.4443 x[1] = 0.124 y[1] (analytic) = 0 y[1] (numeric) = 0.02114909847492238 absolute error = 0.02114909847492238 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.49 Order of pole = 0.4362 x[1] = 0.125 y[1] (analytic) = 0 y[1] (numeric) = 0.02201879912911545 absolute error = 0.02201879912911545 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.483 Order of pole = 0.4279 x[1] = 0.126 y[1] (analytic) = 0 y[1] (numeric) = 0.0228875971218292 absolute error = 0.0228875971218292 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.476 Order of pole = 0.4196 x[1] = 0.127 y[1] (analytic) = 0 y[1] (numeric) = 0.02375549453033931 absolute error = 0.02375549453033931 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.469 Order of pole = 0.4113 x[1] = 0.128 y[1] (analytic) = 0 y[1] (numeric) = 0.0246224934272426 absolute error = 0.0246224934272426 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.462 Order of pole = 0.4028 x[1] = 0.129 y[1] (analytic) = 0 y[1] (numeric) = 0.02548859588047003 absolute error = 0.02548859588047003 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.454 Order of pole = 0.3944 x[1] = 0.13 y[1] (analytic) = 0 y[1] (numeric) = 0.02635380395329967 absolute error = 0.02635380395329967 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.447 Order of pole = 0.3858 x[1] = 0.131 y[1] (analytic) = 0 y[1] (numeric) = 0.0272181197043697 absolute error = 0.0272181197043697 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.439 Order of pole = 0.3772 x[1] = 0.132 y[1] (analytic) = 0 y[1] (numeric) = 0.02808154518769125 absolute error = 0.02808154518769125 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.432 Order of pole = 0.3685 x[1] = 0.133 y[1] (analytic) = 0 y[1] (numeric) = 0.02894408245266132 absolute error = 0.02894408245266132 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.424 Order of pole = 0.3598 x[1] = 0.134 y[1] (analytic) = 0 y[1] (numeric) = 0.02980573354407557 absolute error = 0.02980573354407557 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.417 Order of pole = 0.3509 x[1] = 0.135 y[1] (analytic) = 0 y[1] (numeric) = 0.03066650050214114 absolute error = 0.03066650050214114 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.409 Order of pole = 0.3421 x[1] = 0.136 y[1] (analytic) = 0 y[1] (numeric) = 0.0315263853624894 absolute error = 0.0315263853624894 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.401 Order of pole = 0.3331 x[1] = 0.137 y[1] (analytic) = 0 y[1] (numeric) = 0.03238539015618865 absolute error = 0.03238539015618865 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.393 Order of pole = 0.3241 x[1] = 0.138 y[1] (analytic) = 0 y[1] (numeric) = 0.03324351690975677 absolute error = 0.03324351690975677 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.385 Order of pole = 0.315 x[1] = 0.139 y[1] (analytic) = 0 y[1] (numeric) = 0.03410076764517392 absolute error = 0.03410076764517392 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.377 Order of pole = 0.3058 x[1] = 0.14 y[1] (analytic) = 0 y[1] (numeric) = 0.03495714437989508 absolute error = 0.03495714437989508 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.369 Order of pole = 0.2965 x[1] = 0.141 y[1] (analytic) = 0 y[1] (numeric) = 0.03581264912686263 absolute error = 0.03581264912686263 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.36 Order of pole = 0.2872 x[1] = 0.142 y[1] (analytic) = 0 y[1] (numeric) = 0.03666728389451888 absolute error = 0.03666728389451888 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.352 Order of pole = 0.2778 x[1] = 0.143 y[1] (analytic) = 0 y[1] (numeric) = 0.03752105068681853 absolute error = 0.03752105068681853 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.344 Order of pole = 0.2683 x[1] = 0.144 y[1] (analytic) = 0 y[1] (numeric) = 0.03837395150324115 absolute error = 0.03837395150324115 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.335 Order of pole = 0.2587 x[1] = 0.145 y[1] (analytic) = 0 y[1] (numeric) = 0.03922598833880355 absolute error = 0.03922598833880355 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.326 Order of pole = 0.2491 x[1] = 0.146 y[1] (analytic) = 0 y[1] (numeric) = 0.04007716318407217 absolute error = 0.04007716318407217 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.318 Order of pole = 0.2393 x[1] = 0.147 y[1] (analytic) = 0 y[1] (numeric) = 0.0409274780251754 absolute error = 0.0409274780251754 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.309 Order of pole = 0.2295 x[1] = 0.148 y[1] (analytic) = 0 y[1] (numeric) = 0.04177693484381591 absolute error = 0.04177693484381591 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.3 Order of pole = 0.2196 x[1] = 0.149 y[1] (analytic) = 0 y[1] (numeric) = 0.04262553561728288 absolute error = 0.04262553561728288 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.291 Order of pole = 0.2096 x[1] = 0.15 y[1] (analytic) = 0 y[1] (numeric) = 0.04347328231846422 absolute error = 0.04347328231846422 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.282 Order of pole = 0.1995 x[1] = 0.1510000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.04432017691585875 absolute error = 0.04432017691585875 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.272 Order of pole = 0.1893 x[1] = 0.1520000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.04516622137358837 absolute error = 0.04516622137358837 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.263 Order of pole = 0.179 x[1] = 0.1530000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.04601141765141017 absolute error = 0.04601141765141017 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.253 Order of pole = 0.1686 x[1] = 0.1540000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.0468557677047285 absolute error = 0.0468557677047285 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.244 Order of pole = 0.1582 x[1] = 0.1550000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.04769927348460697 absolute error = 0.04769927348460697 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.234 Order of pole = 0.1476 x[1] = 0.1560000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.04854193693778053 absolute error = 0.04854193693778053 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.224 Order of pole = 0.1369 x[1] = 0.1570000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.04938376000666735 absolute error = 0.04938376000666735 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.214 Order of pole = 0.1262 x[1] = 0.1580000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.05022474462938084 absolute error = 0.05022474462938084 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.204 Order of pole = 0.1153 x[1] = 0.1590000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.05106489273974146 absolute error = 0.05106489273974146 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.193 Order of pole = 0.1043 x[1] = 0.1600000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.05190420626728864 absolute error = 0.05190420626728864 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.183 Order of pole = 0.09321 x[1] = 0.1610000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.05274268713729255 absolute error = 0.05274268713729255 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.172 Order of pole = 0.08202 x[1] = 0.1620000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.05358033727076595 absolute error = 0.05358033727076595 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.161 Order of pole = 0.07071 x[1] = 0.1630000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.05441715858447589 absolute error = 0.05441715858447589 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.15 Order of pole = 0.05929 x[1] = 0.1640000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.05525315299095546 absolute error = 0.05525315299095546 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.139 Order of pole = 0.04776 x[1] = 0.1650000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.05608832239851543 absolute error = 0.05608832239851543 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.128 Order of pole = 0.03611 x[1] = 0.1660000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.05692266871125596 absolute error = 0.05692266871125596 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.116 Order of pole = 0.02434 x[1] = 0.1670000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.05775619382907814 absolute error = 0.05775619382907814 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.104 Order of pole = 0.01246 x[1] = 0.1680000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.05858889964769563 absolute error = 0.05858889964769563 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.092 Order of pole = 0.0004453 x[1] = 0.1690000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.05942078805864616 absolute error = 0.05942078805864616 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1700000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.06025186094930306 absolute error = 0.06025186094930306 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1710000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.06108212020288671 absolute error = 0.06108212020288671 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1720000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.06191156769847602 absolute error = 0.06191156769847602 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1730000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.06274020531101979 absolute error = 0.06274020531101979 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1740000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.0635680349113481 absolute error = 0.0635680349113481 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1750000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.06439505836618366 absolute error = 0.06439505836618366 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1760000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.06522127753815309 absolute error = 0.06522127753815309 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1770000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.06604669428579818 absolute error = 0.06604669428579818 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1780000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.06687131046358719 absolute error = 0.06687131046358719 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1790000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.06769512792192596 absolute error = 0.06769512792192596 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1800000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.06851814850716914 absolute error = 0.06851814850716914 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1810000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.06934037406163132 absolute error = 0.06934037406163132 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1820000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.07016180642359809 absolute error = 0.07016180642359809 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1830000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.07098244742733718 absolute error = 0.07098244742733718 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1840000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.07180229890310942 absolute error = 0.07180229890310942 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1850000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.07262136267717981 absolute error = 0.07262136267717981 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1860000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.07343964057182842 absolute error = 0.07343964057182842 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1870000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.07425713440536139 absolute error = 0.07425713440536139 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1880000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.07507384599212182 absolute error = 0.07507384599212182 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1890000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.0758897771425006 absolute error = 0.0758897771425006 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1900000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.07670492966294733 absolute error = 0.07670492966294733 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1910000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.07751930535598105 absolute error = 0.07751930535598105 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1920000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.07833290602020104 absolute error = 0.07833290602020104 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1930000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.07914573345029761 absolute error = 0.07914573345029761 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1940000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.07995778943706275 absolute error = 0.07995778943706275 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1950000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.08076907576740082 absolute error = 0.08076907576740082 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1960000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.08157959422433925 absolute error = 0.08157959422433925 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1970000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.08238934658703909 absolute error = 0.08238934658703909 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1980000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.08319833463080563 absolute error = 0.08319833463080563 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.1990000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.08400656012709898 absolute error = 0.08400656012709898 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2000000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.08481402484354453 absolute error = 0.08481402484354453 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2010000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.08562073054394348 absolute error = 0.08562073054394348 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2020000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.08642667898828331 absolute error = 0.08642667898828331 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2030000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.08723187193274819 absolute error = 0.08723187193274819 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2040000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.08803631112972939 absolute error = 0.08803631112972939 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2050000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.08883999832783562 absolute error = 0.08883999832783562 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2060000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.08964293527190344 absolute error = 0.08964293527190344 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2070000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.09044512370300747 absolute error = 0.09044512370300747 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2080000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.09124656535847075 absolute error = 0.09124656535847075 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2090000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.09204726197187493 absolute error = 0.09204726197187493 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2100000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.09284721527307051 absolute error = 0.09284721527307051 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2110000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.09364642698818702 absolute error = 0.09364642698818702 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2120000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.09444489883964322 absolute error = 0.09444489883964322 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2130000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.09524263254615711 absolute error = 0.09524263254615711 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2140000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.09603962982275618 absolute error = 0.09603962982275618 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2150000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.09683589238078737 absolute error = 0.09683589238078737 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2160000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.09763142192792712 absolute error = 0.09763142192792712 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2170000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.09842622016819141 absolute error = 0.09842622016819141 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2180000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.09922028880194572 absolute error = 0.09922028880194572 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2190000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.100013629525915 absolute error = 0.100013629525915 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2200000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1008062440331935 absolute error = 0.1008062440331935 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2210000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1015981340132547 absolute error = 0.1015981340132547 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2220000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1023893011519615 absolute error = 0.1023893011519615 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2230000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1031797471315753 absolute error = 0.1031797471315753 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2240000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1039694736307666 absolute error = 0.1039694736307666 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2250000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1047584823246243 absolute error = 0.1047584823246243 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2260000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1055467748846656 absolute error = 0.1055467748846656 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2270000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1063343529788456 absolute error = 0.1063343529788456 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2280000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1071212182715673 absolute error = 0.1071212182715673 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2290000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1079073724236908 absolute error = 0.1079073724236908 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2300000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1086928170925433 absolute error = 0.1086928170925433 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2310000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1094775539319285 absolute error = 0.1094775539319285 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2320000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1102615845921365 absolute error = 0.1102615845921365 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2330000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1110449107199527 absolute error = 0.1110449107199527 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2340000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1118275339586681 absolute error = 0.1118275339586681 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2350000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1126094559480881 absolute error = 0.1126094559480881 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2360000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1133906783245426 absolute error = 0.1133906783245426 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2370000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1141712027208948 absolute error = 0.1141712027208948 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2380000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1149510307665511 absolute error = 0.1149510307665511 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2390000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1157301640874703 absolute error = 0.1157301640874703 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2400000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1165086043061729 absolute error = 0.1165086043061729 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2410000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1172863530417505 absolute error = 0.1172863530417505 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2420000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1180634119098751 absolute error = 0.1180634119098751 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2430000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1188397825228084 absolute error = 0.1188397825228084 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2440000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1196154664894109 absolute error = 0.1196154664894109 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2450000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1203904654151513 absolute error = 0.1203904654151513 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2460000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1211647809021155 absolute error = 0.1211647809021155 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2470000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1219384145490162 absolute error = 0.1219384145490162 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2480000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1227113679512012 absolute error = 0.1227113679512012 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2490000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1234836427006635 absolute error = 0.1234836427006635 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2500000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1242552403860497 absolute error = 0.1242552403860497 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2510000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1250261625926692 absolute error = 0.1250261625926692 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2520000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1257964109025035 absolute error = 0.1257964109025035 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2530000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1265659868942148 absolute error = 0.1265659868942148 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2540000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1273348921431554 absolute error = 0.1273348921431554 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2550000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1281031282213762 absolute error = 0.1281031282213762 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2560000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1288706966976362 absolute error = 0.1288706966976362 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2570000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1296375991374107 absolute error = 0.1296375991374107 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2580000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1304038371029008 absolute error = 0.1304038371029008 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2590000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.131169412153042 absolute error = 0.131169412153042 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2600000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1319343258435128 absolute error = 0.1319343258435128 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2610000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.132698579726744 absolute error = 0.132698579726744 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2620000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1334621753519269 absolute error = 0.1334621753519269 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2630000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1342251142650227 absolute error = 0.1342251142650227 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2640000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1349873980087706 absolute error = 0.1349873980087706 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2650000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1357490281226968 absolute error = 0.1357490281226968 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2660000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1365100061431232 absolute error = 0.1365100061431232 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2670000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1372703336031759 absolute error = 0.1372703336031759 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2680000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1380300120327941 absolute error = 0.1380300120327941 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2690000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1387890429587383 absolute error = 0.1387890429587383 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2700000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1395474279045991 absolute error = 0.1395474279045991 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2710000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1403051683908058 absolute error = 0.1403051683908058 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2720000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1410622659346349 absolute error = 0.1410622659346349 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2730000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1418187220502183 absolute error = 0.1418187220502183 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2740000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1425745382485522 absolute error = 0.1425745382485522 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2750000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1433297160375054 absolute error = 0.1433297160375054 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2760000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1440842569218276 absolute error = 0.1440842569218276 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2770000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1448381624031579 absolute error = 0.1448381624031579 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2780000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1455914339800333 absolute error = 0.1455914339800333 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2790000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1463440731478967 absolute error = 0.1463440731478967 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2800000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1470960813991056 absolute error = 0.1470960813991056 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2810000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1478474602229402 absolute error = 0.1478474602229402 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2820000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1485982111056118 absolute error = 0.1485982111056118 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2830000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.149348335530271 absolute error = 0.149348335530271 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2840000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1500978349770157 absolute error = 0.1500978349770157 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2850000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1508467109228999 absolute error = 0.1508467109228999 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2860000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1515949648419411 absolute error = 0.1515949648419411 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2870000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1523425982051293 absolute error = 0.1523425982051293 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2880000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1530896124804345 absolute error = 0.1530896124804345 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2890000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1538360091328149 absolute error = 0.1538360091328149 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2900000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1545817896242254 absolute error = 0.1545817896242254 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2910000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1553269554136253 absolute error = 0.1553269554136253 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2920000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1560715079569863 absolute error = 0.1560715079569863 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2930000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.1568154487073009 absolute error = 0.1568154487073009 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2940000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.15755877911459 absolute error = 0.15755877911459 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2950000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1583015006259111 absolute error = 0.1583015006259111 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2960000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.159043614685366 absolute error = 0.159043614685366 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2970000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1597851227341093 absolute error = 0.1597851227341093 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2980000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1605260262103557 absolute error = 0.1605260262103557 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.2990000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.161266326549388 absolute error = 0.161266326549388 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3000000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1620060251835652 absolute error = 0.1620060251835652 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3010000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1627451235423304 absolute error = 0.1627451235423304 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3020000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1634836230522182 absolute error = 0.1634836230522182 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3030000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1642215251368628 absolute error = 0.1642215251368628 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3040000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1649588312170056 absolute error = 0.1649588312170056 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3050000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1656955427105033 absolute error = 0.1656955427105033 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3060000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1664316610323352 absolute error = 0.1664316610323352 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3070000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.167167187594611 absolute error = 0.167167187594611 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3080000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.167902123806579 absolute error = 0.167902123806579 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3090000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1686364710746328 absolute error = 0.1686364710746328 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3100000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1693702308023197 absolute error = 0.1693702308023197 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3110000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1701034043903484 absolute error = 0.1701034043903484 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3120000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1708359932365958 absolute error = 0.1708359932365958 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3130000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1715679987361153 absolute error = 0.1715679987361153 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3140000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1722994222811442 absolute error = 0.1722994222811442 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3150000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1730302652611111 absolute error = 0.1730302652611111 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3160000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1737605290626433 absolute error = 0.1737605290626433 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3170000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1744902150695748 absolute error = 0.1744902150695748 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3180000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1752193246629531 absolute error = 0.1752193246629531 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3190000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1759478592210471 absolute error = 0.1759478592210471 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3200000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1766758201193545 absolute error = 0.1766758201193545 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3210000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.177403208730609 absolute error = 0.177403208730609 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3220000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1781300264247877 absolute error = 0.1781300264247877 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3230000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1788562745691188 absolute error = 0.1788562745691188 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3240000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1795819545280884 absolute error = 0.1795819545280884 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3250000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1803070676634484 absolute error = 0.1803070676634484 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3260000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1810316153342232 absolute error = 0.1810316153342232 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3270000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1817555988967177 absolute error = 0.1817555988967177 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3280000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1824790197045238 absolute error = 0.1824790197045238 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3290000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1832018791085281 absolute error = 0.1832018791085281 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3300000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.183924178456919 absolute error = 0.183924178456919 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3310000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.184645919095194 absolute error = 0.184645919095194 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3320000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1853671023661667 absolute error = 0.1853671023661667 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3330000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1860877296099741 absolute error = 0.1860877296099741 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3340000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1868078021640834 absolute error = 0.1868078021640834 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3350000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1875273213632999 absolute error = 0.1875273213632999 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3360000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1882462885397731 absolute error = 0.1882462885397731 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3370000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1889647050230046 absolute error = 0.1889647050230046 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3380000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1896825721398546 absolute error = 0.1896825721398546 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3390000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1903998912145492 absolute error = 0.1903998912145492 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3400000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1911166635686875 absolute error = 0.1911166635686875 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3410000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1918328905212484 absolute error = 0.1918328905212484 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3420000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1925485733885974 absolute error = 0.1925485733885974 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3430000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1932637134844942 absolute error = 0.1932637134844942 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3440000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.193978312120099 absolute error = 0.193978312120099 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3450000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1946923706039796 absolute error = 0.1946923706039796 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3460000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1954058902421186 absolute error = 0.1954058902421186 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3470000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1961188723379197 absolute error = 0.1961188723379197 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3480000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1968313181922151 absolute error = 0.1968313181922151 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3490000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1975432291032722 absolute error = 0.1975432291032722 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3500000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1982546063668001 absolute error = 0.1982546063668001 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3510000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1989654512759568 absolute error = 0.1989654512759568 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3520000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.1996757651213557 absolute error = 0.1996757651213557 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3530000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2003855491910728 absolute error = 0.2003855491910728 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3540000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2010948047706527 absolute error = 0.2010948047706527 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3550000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2018035331431161 absolute error = 0.2018035331431161 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3560000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2025117355889661 absolute error = 0.2025117355889661 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3570000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2032194133861947 absolute error = 0.2032194133861947 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3580000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.20392656781029 absolute error = 0.20392656781029 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3590000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2046332001342425 absolute error = 0.2046332001342425 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3600000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2053393116285518 absolute error = 0.2053393116285518 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3610000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2060449035612331 absolute error = 0.2060449035612331 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3620000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.206749977197824 absolute error = 0.206749977197824 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3630000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.207454533801391 absolute error = 0.207454533801391 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3640000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.208158574632536 absolute error = 0.208158574632536 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3650000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2088621009494027 absolute error = 0.2088621009494027 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3660000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2095651140076837 absolute error = 0.2095651140076837 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3670000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2102676150606261 absolute error = 0.2102676150606261 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3680000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2109696053590389 absolute error = 0.2109696053590389 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3690000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2116710861512988 absolute error = 0.2116710861512988 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.3700000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2123720586833569 absolute error = 0.2123720586833569 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 43.73 Order of pole = 1447 x[1] = 0.3710000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2130725241987452 absolute error = 0.2130725241987452 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 22.93 Order of pole = 398.7 x[1] = 0.3720000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2137724839385828 absolute error = 0.2137724839385828 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 17.48 Order of pole = 232.4 x[1] = 0.3730000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2144719391415826 absolute error = 0.2144719391415826 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 14.69 Order of pole = 164.5 x[1] = 0.3740000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2151708910440573 absolute error = 0.2151708910440573 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 12.92 Order of pole = 127.7 x[1] = 0.3750000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.215869340879926 absolute error = 0.215869340879926 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 11.68 Order of pole = 104.6 x[1] = 0.3760000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2165672898807206 absolute error = 0.2165672898807206 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 10.74 Order of pole = 88.69 x[1] = 0.3770000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2172647392755918 absolute error = 0.2172647392755918 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 9.997 Order of pole = 77.12 x[1] = 0.3780000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2179616902913159 absolute error = 0.2179616902913159 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 9.395 Order of pole = 68.31 x[1] = 0.3790000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2186581441523004 absolute error = 0.2186581441523004 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 8.892 Order of pole = 61.39 x[1] = 0.3800000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2193541020805911 absolute error = 0.2193541020805911 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 8.464 Order of pole = 55.8 x[1] = 0.3810000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2200495652958775 absolute error = 0.2200495652958775 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 8.094 Order of pole = 51.19 x[1] = 0.3820000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2207445350154998 absolute error = 0.2207445350154998 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 7.77 Order of pole = 47.34 x[1] = 0.3830000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2214390124544546 absolute error = 0.2214390124544546 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 7.484 Order of pole = 44.06 x[1] = 0.3840000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2221329988254012 absolute error = 0.2221329988254012 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 7.228 Order of pole = 41.23 x[1] = 0.3850000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2228264953386679 absolute error = 0.2228264953386679 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 6.997 Order of pole = 38.78 x[1] = 0.3860000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2235195032022581 absolute error = 0.2235195032022581 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 6.788 Order of pole = 36.63 x[1] = 0.3870000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2242120236218566 absolute error = 0.2242120236218566 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 6.598 Order of pole = 34.73 x[1] = 0.3880000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2249040578008353 absolute error = 0.2249040578008353 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 6.423 Order of pole = 33.03 x[1] = 0.3890000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2255956069402598 absolute error = 0.2255956069402598 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 6.262 Order of pole = 31.51 x[1] = 0.3900000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2262866722388953 absolute error = 0.2262866722388953 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 6.113 Order of pole = 30.15 x[1] = 0.3910000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2269772548932125 absolute error = 0.2269772548932125 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 5.975 Order of pole = 28.91 x[1] = 0.3920000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.227667356097394 absolute error = 0.227667356097394 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 5.846 Order of pole = 27.78 x[1] = 0.3930000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.22835697704334 absolute error = 0.22835697704334 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 5.725 Order of pole = 26.75 x[1] = 0.3940000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2290461189206746 absolute error = 0.2290461189206746 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 5.612 Order of pole = 25.81 x[1] = 0.3950000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2297347829167518 absolute error = 0.2297347829167518 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 5.506 Order of pole = 24.94 x[1] = 0.3960000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2304229702166613 absolute error = 0.2304229702166613 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 5.405 Order of pole = 24.14 x[1] = 0.3970000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2311106820032345 absolute error = 0.2311106820032345 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 5.31 Order of pole = 23.4 x[1] = 0.3980000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2317979194570507 absolute error = 0.2317979194570507 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 5.221 Order of pole = 22.72 x[1] = 0.3990000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2324846837564429 absolute error = 0.2324846837564429 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 5.135 Order of pole = 22.08 x[1] = 0.4000000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2331709760775034 absolute error = 0.2331709760775034 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 5.054 Order of pole = 21.48 x[1] = 0.4010000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2338567975940905 absolute error = 0.2338567975940905 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.977 Order of pole = 20.93 x[1] = 0.4020000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2345421494778335 absolute error = 0.2345421494778335 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.903 Order of pole = 20.41 x[1] = 0.4030000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2352270328981392 absolute error = 0.2352270328981392 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.833 Order of pole = 19.92 x[1] = 0.4040000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2359114490221976 absolute error = 0.2359114490221976 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.766 Order of pole = 19.46 x[1] = 0.4050000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2365953990149876 absolute error = 0.2365953990149876 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.701 Order of pole = 19.03 x[1] = 0.4060000000000002 y[1] (analytic) = 0 y[1] (numeric) = 0.2372788840392829 absolute error = 0.2372788840392829 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.639 Order of pole = 18.63 x[1] = 0.4070000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.237961905255658 absolute error = 0.237961905255658 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.58 Order of pole = 18.24 x[1] = 0.4080000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2386444638224937 absolute error = 0.2386444638224937 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.522 Order of pole = 17.88 x[1] = 0.4090000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2393265608959831 absolute error = 0.2393265608959831 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.467 Order of pole = 17.54 x[1] = 0.4100000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2400081976301371 absolute error = 0.2400081976301371 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.414 Order of pole = 17.22 x[1] = 0.4110000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2406893751767907 absolute error = 0.2406893751767907 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.363 Order of pole = 16.91 x[1] = 0.4120000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2413700946856081 absolute error = 0.2413700946856081 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.313 Order of pole = 16.62 x[1] = 0.4130000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2420503573040887 absolute error = 0.2420503573040887 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.266 Order of pole = 16.34 x[1] = 0.4140000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2427301641775729 absolute error = 0.2427301641775729 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.219 Order of pole = 16.08 x[1] = 0.4150000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2434095164492475 absolute error = 0.2434095164492475 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.174 Order of pole = 15.83 x[1] = 0.4160000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2440884152601518 absolute error = 0.2440884152601518 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.131 Order of pole = 15.59 x[1] = 0.4170000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2447668617491827 absolute error = 0.2447668617491827 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.089 Order of pole = 15.37 x[1] = 0.4180000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2454448570531008 absolute error = 0.2454448570531008 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.048 Order of pole = 15.15 x[1] = 0.4190000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2461224023065359 absolute error = 0.2461224023065359 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 4.008 Order of pole = 14.95 x[1] = 0.4200000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2467994986419924 absolute error = 0.2467994986419924 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.969 Order of pole = 14.75 x[1] = 0.4210000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2474761471898552 absolute error = 0.2474761471898552 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.932 Order of pole = 14.57 x[1] = 0.4220000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.248152349078395 absolute error = 0.248152349078395 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.895 Order of pole = 14.39 x[1] = 0.4230000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2488281054337741 absolute error = 0.2488281054337741 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.859 Order of pole = 14.22 x[1] = 0.4240000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2495034173800518 absolute error = 0.2495034173800518 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.825 Order of pole = 14.06 x[1] = 0.4250000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2501782860391898 absolute error = 0.2501782860391898 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.791 Order of pole = 13.91 x[1] = 0.4260000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2508527125310583 absolute error = 0.2508527125310583 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.758 Order of pole = 13.76 x[1] = 0.4270000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2515266979734406 absolute error = 0.2515266979734406 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.725 Order of pole = 13.62 x[1] = 0.4280000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2522002434820392 absolute error = 0.2522002434820392 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.694 Order of pole = 13.49 x[1] = 0.4290000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2528733501704814 absolute error = 0.2528733501704814 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.663 Order of pole = 13.36 x[1] = 0.4300000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2535460191503242 absolute error = 0.2535460191503242 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.633 Order of pole = 13.24 x[1] = 0.4310000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.25421825153106 absolute error = 0.25421825153106 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.603 Order of pole = 13.12 x[1] = 0.4320000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2548900484201222 absolute error = 0.2548900484201222 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.574 Order of pole = 13.01 x[1] = 0.4330000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2555614109228904 absolute error = 0.2555614109228904 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.546 Order of pole = 12.9 x[1] = 0.4340000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2562323401426957 absolute error = 0.2562323401426957 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.518 Order of pole = 12.8 x[1] = 0.4350000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2569028371808266 absolute error = 0.2569028371808266 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.491 Order of pole = 12.71 x[1] = 0.4360000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2575729031365335 absolute error = 0.2575729031365335 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.464 Order of pole = 12.62 x[1] = 0.4370000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2582425391070349 absolute error = 0.2582425391070349 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.438 Order of pole = 12.53 x[1] = 0.4380000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2589117461875223 absolute error = 0.2589117461875223 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.413 Order of pole = 12.45 x[1] = 0.4390000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2595805254711654 absolute error = 0.2595805254711654 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.387 Order of pole = 12.37 x[1] = 0.4400000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2602488780491178 absolute error = 0.2602488780491178 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.363 Order of pole = 12.3 x[1] = 0.4410000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2609168050105221 absolute error = 0.2609168050105221 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.338 Order of pole = 12.23 x[1] = 0.4420000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.261584307442515 absolute error = 0.261584307442515 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.315 Order of pole = 12.16 x[1] = 0.4430000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2622513864302328 absolute error = 0.2622513864302328 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.291 Order of pole = 12.1 x[1] = 0.4440000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2629180430568165 absolute error = 0.2629180430568165 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.268 Order of pole = 12.04 x[1] = 0.4450000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2635842784034174 absolute error = 0.2635842784034174 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.245 Order of pole = 11.99 x[1] = 0.4460000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2642500935492015 absolute error = 0.2642500935492015 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.223 Order of pole = 11.94 x[1] = 0.4470000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2649154895713557 absolute error = 0.2649154895713557 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.201 Order of pole = 11.89 x[1] = 0.4480000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2655804675450923 absolute error = 0.2655804675450923 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.179 Order of pole = 11.85 x[1] = 0.4490000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2662450285436544 absolute error = 0.2662450285436544 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.158 Order of pole = 11.81 x[1] = 0.4500000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.266909173638321 absolute error = 0.266909173638321 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.137 Order of pole = 11.77 x[1] = 0.4510000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2675729038984123 absolute error = 0.2675729038984123 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.116 Order of pole = 11.73 x[1] = 0.4520000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2682362203912946 absolute error = 0.2682362203912946 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.095 Order of pole = 11.7 x[1] = 0.4530000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2688991241823858 absolute error = 0.2688991241823858 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.075 Order of pole = 11.67 x[1] = 0.4540000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2695616163351598 absolute error = 0.2695616163351598 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.055 Order of pole = 11.65 x[1] = 0.4550000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2702236979111525 absolute error = 0.2702236979111525 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.036 Order of pole = 11.63 x[1] = 0.4560000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.270885369969966 absolute error = 0.270885369969966 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 3.016 Order of pole = 11.61 x[1] = 0.4570000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2715466335692745 absolute error = 0.2715466335692745 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.997 Order of pole = 11.59 x[1] = 0.4580000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2722074897648286 absolute error = 0.2722074897648286 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.978 Order of pole = 11.58 x[1] = 0.4590000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2728679396104608 absolute error = 0.2728679396104608 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.959 Order of pole = 11.57 x[1] = 0.4600000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2735279841580903 absolute error = 0.2735279841580903 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.941 Order of pole = 11.57 x[1] = 0.4610000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.274187624457728 absolute error = 0.274187624457728 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.922 Order of pole = 11.56 x[1] = 0.4620000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2748468615574819 absolute error = 0.2748468615574819 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.904 Order of pole = 11.56 x[1] = 0.4630000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2755056965035615 absolute error = 0.2755056965035615 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.886 Order of pole = 11.56 x[1] = 0.4640000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2761641303402831 absolute error = 0.2761641303402831 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.869 Order of pole = 11.57 x[1] = 0.4650000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2768221641100745 absolute error = 0.2768221641100745 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.851 Order of pole = 11.58 x[1] = 0.4660000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2774797988534803 absolute error = 0.2774797988534803 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.834 Order of pole = 11.59 x[1] = 0.4670000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2781370356091667 absolute error = 0.2781370356091667 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.817 Order of pole = 11.6 x[1] = 0.4680000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2787938754139262 absolute error = 0.2787938754139262 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.8 Order of pole = 11.62 x[1] = 0.4690000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2794503193026826 absolute error = 0.2794503193026826 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.783 Order of pole = 11.64 x[1] = 0.4700000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2801063683084961 absolute error = 0.2801063683084961 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.766 Order of pole = 11.66 x[1] = 0.4710000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2807620234625678 absolute error = 0.2807620234625678 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.749 Order of pole = 11.69 x[1] = 0.4720000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.281417285794245 absolute error = 0.281417285794245 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.733 Order of pole = 11.72 x[1] = 0.4730000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2820721563310256 absolute error = 0.2820721563310256 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.717 Order of pole = 11.75 x[1] = 0.4740000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2827266360985632 absolute error = 0.2827266360985632 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.7 Order of pole = 11.79 x[1] = 0.4750000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2833807261206719 absolute error = 0.2833807261206719 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.684 Order of pole = 11.82 x[1] = 0.4760000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.284034427419331 absolute error = 0.284034427419331 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.668 Order of pole = 11.87 x[1] = 0.4770000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2846877410146899 absolute error = 0.2846877410146899 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.653 Order of pole = 11.91 x[1] = 0.4780000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2853406679250726 absolute error = 0.2853406679250726 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.637 Order of pole = 11.96 x[1] = 0.4790000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2859932091669831 absolute error = 0.2859932091669831 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.621 Order of pole = 12.01 x[1] = 0.4800000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2866453657551095 absolute error = 0.2866453657551095 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.606 Order of pole = 12.07 x[1] = 0.4810000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2872971387023288 absolute error = 0.2872971387023288 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.59 Order of pole = 12.13 x[1] = 0.4820000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2879485290197122 absolute error = 0.2879485290197122 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.575 Order of pole = 12.19 x[1] = 0.4830000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2885995377165292 absolute error = 0.2885995377165292 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.56 Order of pole = 12.25 x[1] = 0.4840000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2892501658002525 absolute error = 0.2892501658002525 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.544 Order of pole = 12.32 x[1] = 0.4850000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2899004142765628 absolute error = 0.2899004142765628 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.529 Order of pole = 12.4 x[1] = 0.4860000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2905502841493534 absolute error = 0.2905502841493534 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.514 Order of pole = 12.48 x[1] = 0.4870000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2911997764207346 absolute error = 0.2911997764207346 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.499 Order of pole = 12.56 x[1] = 0.4880000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2918488920910391 absolute error = 0.2918488920910391 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.484 Order of pole = 12.64 x[1] = 0.4890000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2924976321588256 absolute error = 0.2924976321588256 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.47 Order of pole = 12.73 x[1] = 0.4900000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2931459976208842 absolute error = 0.2931459976208842 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.455 Order of pole = 12.83 x[1] = 0.4910000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2937939894722409 absolute error = 0.2937939894722409 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.44 Order of pole = 12.93 x[1] = 0.4920000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2944416087061618 absolute error = 0.2944416087061618 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.425 Order of pole = 13.03 x[1] = 0.4930000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2950888563141582 absolute error = 0.2950888563141582 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.411 Order of pole = 13.14 x[1] = 0.4940000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2957357332859906 absolute error = 0.2957357332859906 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.396 Order of pole = 13.25 x[1] = 0.4950000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.296382240609674 absolute error = 0.296382240609674 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.381 Order of pole = 13.37 x[1] = 0.4960000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2970283792714817 absolute error = 0.2970283792714817 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.367 Order of pole = 13.49 x[1] = 0.4970000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2976741502559503 absolute error = 0.2976741502559503 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.352 Order of pole = 13.62 x[1] = 0.4980000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2983195545458843 absolute error = 0.2983195545458843 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.337 Order of pole = 13.75 x[1] = 0.4990000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.29896459312236 absolute error = 0.29896459312236 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.323 Order of pole = 13.89 x[1] = 0.5000000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.2996092669647307 absolute error = 0.2996092669647307 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.308 Order of pole = 14.04 x[1] = 0.5010000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3002535770506308 absolute error = 0.3002535770506308 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.294 Order of pole = 14.19 x[1] = 0.5020000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3008975243559804 absolute error = 0.3008975243559804 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.279 Order of pole = 14.34 x[1] = 0.5030000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3015411098549898 absolute error = 0.3015411098549898 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.264 Order of pole = 14.51 x[1] = 0.5040000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3021843345201637 absolute error = 0.3021843345201637 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.25 Order of pole = 14.68 x[1] = 0.5050000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3028271993223061 absolute error = 0.3028271993223061 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.235 Order of pole = 14.86 x[1] = 0.5060000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3034697052305241 absolute error = 0.3034697052305241 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.22 Order of pole = 15.04 x[1] = 0.5070000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3041118532122329 absolute error = 0.3041118532122329 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.205 Order of pole = 15.24 x[1] = 0.5080000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3047536442331601 absolute error = 0.3047536442331601 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.19 Order of pole = 15.44 x[1] = 0.5090000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3053950792573495 absolute error = 0.3053950792573495 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.175 Order of pole = 15.65 x[1] = 0.5100000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3060361592471665 absolute error = 0.3060361592471665 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.16 Order of pole = 15.87 x[1] = 0.5110000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3066768851633014 absolute error = 0.3066768851633014 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.145 Order of pole = 16.09 x[1] = 0.5120000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3073172579647745 absolute error = 0.3073172579647745 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.13 Order of pole = 16.33 x[1] = 0.5130000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3079572786089402 absolute error = 0.3079572786089402 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.115 Order of pole = 16.58 x[1] = 0.5140000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3085969480514913 absolute error = 0.3085969480514913 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.099 Order of pole = 16.84 x[1] = 0.5150000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3092362672464634 absolute error = 0.3092362672464634 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.084 Order of pole = 17.11 x[1] = 0.5160000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.309875237146239 absolute error = 0.309875237146239 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.068 Order of pole = 17.39 x[1] = 0.5170000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3105138587015522 absolute error = 0.3105138587015522 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.052 Order of pole = 17.68 x[1] = 0.5180000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3111521328614926 absolute error = 0.3111521328614926 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.036 Order of pole = 17.98 x[1] = 0.5190000000000003 y[1] (analytic) = 0 y[1] (numeric) = 0.3117900605735095 absolute error = 0.3117900605735095 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.02 Order of pole = 18.3 x[1] = 0.5200000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3124276427834168 absolute error = 0.3124276427834168 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 2.003 Order of pole = 18.64 x[1] = 0.5210000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3130648804353965 absolute error = 0.3130648804353965 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.986 Order of pole = 18.99 x[1] = 0.5220000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3137017744720034 absolute error = 0.3137017744720034 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.969 Order of pole = 19.35 x[1] = 0.5230000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.314338325834169 absolute error = 0.314338325834169 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.952 Order of pole = 19.73 x[1] = 0.5240000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3149745354612063 absolute error = 0.3149745354612063 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.935 Order of pole = 20.13 x[1] = 0.5250000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3156104042908132 absolute error = 0.3156104042908132 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.917 Order of pole = 20.55 x[1] = 0.5260000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3162459332590771 absolute error = 0.3162459332590771 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.898 Order of pole = 20.99 x[1] = 0.5270000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3168811233004795 absolute error = 0.3168811233004795 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.88 Order of pole = 21.45 x[1] = 0.5280000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3175159753478992 absolute error = 0.3175159753478992 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.861 Order of pole = 21.94 x[1] = 0.5290000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3181504903326173 absolute error = 0.3181504903326173 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.841 Order of pole = 22.45 x[1] = 0.5300000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3187846691843211 absolute error = 0.3187846691843211 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.821 Order of pole = 22.98 x[1] = 0.5310000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3194185128311081 absolute error = 0.3194185128311081 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.8 Order of pole = 23.55 x[1] = 0.5320000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3200520221994901 absolute error = 0.3200520221994901 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.779 Order of pole = 24.14 x[1] = 0.5330000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3206851982143975 absolute error = 0.3206851982143975 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.757 Order of pole = 24.77 x[1] = 0.5340000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3213180417991834 absolute error = 0.3213180417991834 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.734 Order of pole = 25.43 x[1] = 0.5350000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3219505538756276 absolute error = 0.3219505538756276 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.711 Order of pole = 26.13 x[1] = 0.5360000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3225827353639405 absolute error = 0.3225827353639405 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.686 Order of pole = 26.88 x[1] = 0.5370000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3232145871827676 absolute error = 0.3232145871827676 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.66 Order of pole = 27.66 x[1] = 0.5380000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3238461102491932 absolute error = 0.3238461102491932 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.634 Order of pole = 28.5 x[1] = 0.5390000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3244773054787446 absolute error = 0.3244773054787446 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.606 Order of pole = 29.39 x[1] = 0.5400000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3251081737853961 absolute error = 0.3251081737853961 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.576 Order of pole = 30.34 x[1] = 0.5410000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.325738716081573 absolute error = 0.325738716081573 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.545 Order of pole = 31.35 x[1] = 0.5420000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3263689332781555 absolute error = 0.3263689332781555 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.512 Order of pole = 32.43 x[1] = 0.5430000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3269988262844833 absolute error = 0.3269988262844833 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.476 Order of pole = 33.59 x[1] = 0.5440000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3276283960083586 absolute error = 0.3276283960083586 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.439 Order of pole = 34.84 x[1] = 0.5450000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3282576433560509 absolute error = 0.3282576433560509 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.398 Order of pole = 36.18 x[1] = 0.5460000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3288865692323006 absolute error = 0.3288865692323006 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.354 Order of pole = 37.63 x[1] = 0.5470000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3295151745403232 absolute error = 0.3295151745403232 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.306 Order of pole = 39.2 x[1] = 0.5480000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3301434601818128 absolute error = 0.3301434601818128 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.252 Order of pole = 40.9 x[1] = 0.5490000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3307714270569467 absolute error = 0.3307714270569467 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.193 Order of pole = 42.75 x[1] = 0.5500000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3313990760643887 absolute error = 0.3313990760643887 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.127 Order of pole = 44.78 x[1] = 0.5510000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3320264081012932 absolute error = 0.3320264081012932 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 1.051 Order of pole = 47 x[1] = 0.5520000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3326534240633094 absolute error = 0.3326534240633094 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 0.962 Order of pole = 49.45 x[1] = 0.5530000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.333280124844585 absolute error = 0.333280124844585 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 0.8552 Order of pole = 52.17 x[1] = 0.5540000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3339065113377699 absolute error = 0.3339065113377699 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 0.7208 Order of pole = 55.19 x[1] = 0.5550000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3345325844340203 absolute error = 0.3345325844340203 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 0.5353 Order of pole = 58.57 x[1] = 0.5560000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3351583450230026 absolute error = 0.3351583450230026 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. Complex estimate of poles used Radius of convergence = 0.169 Order of pole = 62.38 x[1] = 0.5570000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.335783793992897 absolute error = 0.335783793992897 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5580000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3364089322304015 absolute error = 0.3364089322304015 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5590000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.337033760620736 absolute error = 0.337033760620736 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5600000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3376582800476455 absolute error = 0.3376582800476455 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5610000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3382824913934046 absolute error = 0.3382824913934046 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5620000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3389063955388207 absolute error = 0.3389063955388207 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5630000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3395299933632382 absolute error = 0.3395299933632382 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5640000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3401532857445421 absolute error = 0.3401532857445421 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5650000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3407762735591619 absolute error = 0.3407762735591619 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5660000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3413989576820752 absolute error = 0.3413989576820752 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5670000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3420213389868115 absolute error = 0.3420213389868115 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5680000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.342643418345456 absolute error = 0.342643418345456 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5690000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3432651966286535 absolute error = 0.3432651966286535 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5700000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3438866747056116 absolute error = 0.3438866747056116 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5710000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3445078534441048 absolute error = 0.3445078534441048 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5720000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3451287337104784 absolute error = 0.3451287337104784 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5730000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3457493163696517 absolute error = 0.3457493163696517 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5740000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3463696022851218 absolute error = 0.3463696022851218 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5750000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3469895923189676 absolute error = 0.3469895923189676 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5760000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3476092873318533 absolute error = 0.3476092873318533 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5770000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3482286881830315 absolute error = 0.3482286881830315 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5780000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.348847795730348 absolute error = 0.348847795730348 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5790000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3494666108302443 absolute error = 0.3494666108302443 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5800000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3500851343377617 absolute error = 0.3500851343377617 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5810000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3507033671065452 absolute error = 0.3507033671065452 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5820000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3513213099888465 absolute error = 0.3513213099888465 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5830000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.351938963835528 absolute error = 0.351938963835528 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5840000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3525563294960662 absolute error = 0.3525563294960662 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5850000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3531734078185556 absolute error = 0.3531734078185556 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5860000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3537901996497116 absolute error = 0.3537901996497116 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5870000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3544067058348749 absolute error = 0.3544067058348749 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5880000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3550229272180142 absolute error = 0.3550229272180142 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5890000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3556388646417303 absolute error = 0.3556388646417303 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5900000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3562545189472596 absolute error = 0.3562545189472596 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5910000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3568698909744773 absolute error = 0.3568698909744773 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5920000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3574849815619012 absolute error = 0.3574849815619012 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5930000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3580997915466951 absolute error = 0.3580997915466951 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5940000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3587143217646721 absolute error = 0.3587143217646721 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5950000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3593285730502983 absolute error = 0.3593285730502983 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5960000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3599425462366964 absolute error = 0.3599425462366964 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5970000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3605562421556489 absolute error = 0.3605562421556489 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5980000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3611696616376014 absolute error = 0.3611696616376014 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.5990000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3617828055116666 absolute error = 0.3617828055116666 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6000000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3623956746056272 absolute error = 0.3623956746056272 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6010000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3630082697459395 absolute error = 0.3630082697459395 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6020000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.363620591757737 absolute error = 0.363620591757737 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6030000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3642326414648336 absolute error = 0.3642326414648336 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6040000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3648444196897268 absolute error = 0.3648444196897268 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6050000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3654559272536016 absolute error = 0.3654559272536016 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6060000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3660671649763334 absolute error = 0.3660671649763334 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6070000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3666781336764917 absolute error = 0.3666781336764917 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6080000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3672888341713432 absolute error = 0.3672888341713432 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6090000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3678992672768555 absolute error = 0.3678992672768555 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6100000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3685094338076998 absolute error = 0.3685094338076998 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6110000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.369119334577255 absolute error = 0.369119334577255 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6120000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3697289703976105 absolute error = 0.3697289703976105 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6130000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3703383420795697 absolute error = 0.3703383420795697 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6140000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3709474504326534 absolute error = 0.3709474504326534 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6150000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3715562962651027 absolute error = 0.3715562962651027 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6160000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3721648803838828 absolute error = 0.3721648803838828 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6170000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.372773203594686 absolute error = 0.372773203594686 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6180000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3733812667019349 absolute error = 0.3733812667019349 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6190000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3739890705087858 absolute error = 0.3739890705087858 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6200000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3745966158171321 absolute error = 0.3745966158171321 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6210000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.375203903427607 absolute error = 0.375203903427607 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6220000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3758109341395875 absolute error = 0.3758109341395875 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6230000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3764177087511969 absolute error = 0.3764177087511969 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6240000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3770242280593085 absolute error = 0.3770242280593085 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6250000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3776304928595486 absolute error = 0.3776304928595486 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6260000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3782365039462998 absolute error = 0.3782365039462998 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6270000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.378842262112704 absolute error = 0.378842262112704 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6280000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3794477681506658 absolute error = 0.3794477681506658 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6290000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3800530228508556 absolute error = 0.3800530228508556 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6300000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3806580270027128 absolute error = 0.3806580270027128 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6310000000000004 y[1] (analytic) = 0 y[1] (numeric) = 0.3812627813944487 absolute error = 0.3812627813944487 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6320000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.38186728681305 absolute error = 0.38186728681305 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6330000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.382471544044282 absolute error = 0.382471544044282 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6340000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3830755538726911 absolute error = 0.3830755538726911 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6350000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3836793170816087 absolute error = 0.3836793170816087 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6360000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3842828344531538 absolute error = 0.3842828344531538 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6370000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3848861067682363 absolute error = 0.3848861067682363 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6380000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3854891348065601 absolute error = 0.3854891348065601 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6390000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3860919193466261 absolute error = 0.3860919193466261 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6400000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3866944611657354 absolute error = 0.3866944611657354 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6410000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3872967610399923 absolute error = 0.3872967610399923 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6420000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3878988197443072 absolute error = 0.3878988197443072 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6430000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3885006380524001 absolute error = 0.3885006380524001 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6440000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3891022167368033 absolute error = 0.3891022167368033 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6450000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3897035565688644 absolute error = 0.3897035565688644 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6460000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3903046583187494 absolute error = 0.3903046583187494 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6470000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3909055227554462 absolute error = 0.3909055227554462 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6480000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3915061506467665 absolute error = 0.3915061506467665 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6490000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3921065427593502 absolute error = 0.3921065427593502 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6500000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3927066998586671 absolute error = 0.3927066998586671 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6510000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3933066227090209 absolute error = 0.3933066227090209 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6520000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3939063120735516 absolute error = 0.3939063120735516 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6530000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3945057687142386 absolute error = 0.3945057687142386 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6540000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3951049933919038 absolute error = 0.3951049933919038 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6550000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3957039868662143 absolute error = 0.3957039868662143 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6560000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3963027498956858 absolute error = 0.3963027498956858 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6570000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3969012832376849 absolute error = 0.3969012832376849 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6580000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3974995876484327 absolute error = 0.3974995876484327 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6590000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3980976638830073 absolute error = 0.3980976638830073 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6600000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3986955126953468 absolute error = 0.3986955126953468 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6610000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3992931348382524 absolute error = 0.3992931348382524 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6620000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.3998905310633909 absolute error = 0.3998905310633909 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6630000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4004877021212981 absolute error = 0.4004877021212981 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6640000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4010846487613814 absolute error = 0.4010846487613814 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6650000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4016813717319225 absolute error = 0.4016813717319225 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6660000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4022778717800807 absolute error = 0.4022778717800807 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6670000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4028741496518955 absolute error = 0.4028741496518955 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6680000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4034702060922896 absolute error = 0.4034702060922896 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6690000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4040660418450714 absolute error = 0.4040660418450714 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6700000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4046616576529384 absolute error = 0.4046616576529384 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6710000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4052570542574795 absolute error = 0.4052570542574795 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6720000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4058522323991784 absolute error = 0.4058522323991784 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6730000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4064471928174156 absolute error = 0.4064471928174156 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6740000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.407041936250472 absolute error = 0.407041936250472 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6750000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4076364634355314 absolute error = 0.4076364634355314 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6760000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4082307751086832 absolute error = 0.4082307751086832 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6770000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4088248720049253 absolute error = 0.4088248720049253 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6780000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4094187548581668 absolute error = 0.4094187548581668 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6790000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.410012424401231 absolute error = 0.410012424401231 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6800000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4106058813658579 absolute error = 0.4106058813658579 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6810000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.411199126482707 absolute error = 0.411199126482707 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6820000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4117921604813601 absolute error = 0.4117921604813601 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6830000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4123849840903242 absolute error = 0.4123849840903242 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6840000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.412977598037034 absolute error = 0.412977598037034 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6850000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4135700030478547 absolute error = 0.4135700030478547 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6860000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4141621998480847 absolute error = 0.4141621998480847 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6870000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4147541891619586 absolute error = 0.4147541891619586 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6880000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4153459717126492 absolute error = 0.4153459717126492 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6890000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4159375482222711 absolute error = 0.4159375482222711 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6900000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4165289194118827 absolute error = 0.4165289194118827 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6910000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4171200860014894 absolute error = 0.4171200860014894 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6920000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4177110487100456 absolute error = 0.4177110487100456 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6930000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.418301808255458 absolute error = 0.418301808255458 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6940000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4188923653545882 absolute error = 0.4188923653545882 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6950000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.419482720723255 absolute error = 0.419482720723255 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6960000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4200728750762373 absolute error = 0.4200728750762373 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6970000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4206628291272767 absolute error = 0.4206628291272767 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6980000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4212525835890802 absolute error = 0.4212525835890802 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.6990000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4218421391733226 absolute error = 0.4218421391733226 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7000000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4224314965906494 absolute error = 0.4224314965906494 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7010000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4230206565506793 absolute error = 0.4230206565506793 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7020000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4236096197620067 absolute error = 0.4236096197620067 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7030000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4241983869322044 absolute error = 0.4241983869322044 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7040000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4247869587678264 absolute error = 0.4247869587678264 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7050000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4253753359744099 absolute error = 0.4253753359744099 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7060000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4259635192564786 absolute error = 0.4259635192564786 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7070000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4265515093175448 absolute error = 0.4265515093175448 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7080000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.427139306860112 absolute error = 0.427139306860112 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7090000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4277269125856776 absolute error = 0.4277269125856776 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7100000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4283143271947354 absolute error = 0.4283143271947354 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7110000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4289015513867782 absolute error = 0.4289015513867782 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7120000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4294885858603002 absolute error = 0.4294885858603002 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7130000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4300754313127996 absolute error = 0.4300754313127996 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7140000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4306620884407812 absolute error = 0.4306620884407812 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7150000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4312485579397587 absolute error = 0.4312485579397587 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7160000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4318348405042576 absolute error = 0.4318348405042576 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7170000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4324209368278172 absolute error = 0.4324209368278172 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7180000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4330068476029935 absolute error = 0.4330068476029935 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7190000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4335925735213614 absolute error = 0.4335925735213614 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7200000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4341781152735176 absolute error = 0.4341781152735176 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7210000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4347634735490824 absolute error = 0.4347634735490824 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7220000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.435348649036703 absolute error = 0.435348649036703 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7230000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4359336424240551 absolute error = 0.4359336424240551 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7240000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4365184543978463 absolute error = 0.4365184543978463 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7250000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4371030856438174 absolute error = 0.4371030856438174 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7260000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4376875368467461 absolute error = 0.4376875368467461 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7270000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4382718086904484 absolute error = 0.4382718086904484 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7280000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4388559018577815 absolute error = 0.4388559018577815 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7290000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4394398170306464 absolute error = 0.4394398170306464 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7300000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4400235548899898 absolute error = 0.4400235548899898 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7310000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4406071161158069 absolute error = 0.4406071161158069 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7320000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4411905013871437 absolute error = 0.4411905013871437 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7330000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4417737113820994 absolute error = 0.4417737113820994 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7340000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4423567467778288 absolute error = 0.4423567467778288 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7350000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4429396082505446 absolute error = 0.4429396082505446 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7360000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4435222964755198 absolute error = 0.4435222964755198 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7370000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4441048121270902 absolute error = 0.4441048121270902 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7380000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4446871558786566 absolute error = 0.4446871558786566 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7390000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4452693284026874 absolute error = 0.4452693284026874 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7400000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4458513303707206 absolute error = 0.4458513303707206 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7410000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4464331624533662 absolute error = 0.4464331624533662 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7420000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4470148253203091 absolute error = 0.4470148253203091 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7430000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4475963196403106 absolute error = 0.4475963196403106 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7440000000000005 y[1] (analytic) = 0 y[1] (numeric) = 0.4481776460812113 absolute error = 0.4481776460812113 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7450000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4487588053099332 absolute error = 0.4487588053099332 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7460000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.449339797992482 absolute error = 0.449339797992482 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7470000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4499206247939496 absolute error = 0.4499206247939496 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7480000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4505012863785161 absolute error = 0.4505012863785161 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7490000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4510817834094523 absolute error = 0.4510817834094523 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7500000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4516621165491221 absolute error = 0.4516621165491221 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7510000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4522422864589845 absolute error = 0.4522422864589845 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7520000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4528222937995959 absolute error = 0.4528222937995959 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7530000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4534021392306126 absolute error = 0.4534021392306126 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7540000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.453981823410793 absolute error = 0.453981823410793 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7550000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4545613469979995 absolute error = 0.4545613469979995 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7560000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4551407106492014 absolute error = 0.4551407106492014 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7570000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4557199150204765 absolute error = 0.4557199150204765 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7580000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4562989607670139 absolute error = 0.4562989607670139 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7590000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4568778485431157 absolute error = 0.4568778485431157 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7600000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4574565790021995 absolute error = 0.4574565790021995 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7610000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4580351527968009 absolute error = 0.4580351527968009 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7620000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.458613570578575 absolute error = 0.458613570578575 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7630000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4591918329982994 absolute error = 0.4591918329982994 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7640000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4597699407058757 absolute error = 0.4597699407058757 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7650000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4603478943503323 absolute error = 0.4603478943503323 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7660000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4609256945798261 absolute error = 0.4609256945798261 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7670000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4615033420416449 absolute error = 0.4615033420416449 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7680000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4620808373822099 absolute error = 0.4620808373822099 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7690000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4626581812470771 absolute error = 0.4626581812470771 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7700000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4632353742809403 absolute error = 0.4632353742809403 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7710000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4638124171276326 absolute error = 0.4638124171276326 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7720000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4643893104301289 absolute error = 0.4643893104301289 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7730000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4649660548305481 absolute error = 0.4649660548305481 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7740000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.465542650970155 absolute error = 0.465542650970155 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7750000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4661190994893625 absolute error = 0.4661190994893625 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7760000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4666954010277339 absolute error = 0.4666954010277339 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7770000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4672715562239849 absolute error = 0.4672715562239849 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7780000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4678475657159856 absolute error = 0.4678475657159856 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7790000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.468423430140763 absolute error = 0.468423430140763 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7800000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4689991501345027 absolute error = 0.4689991501345027 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7810000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4695747263325511 absolute error = 0.4695747263325511 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7820000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4701501593694176 absolute error = 0.4701501593694176 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7830000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4707254498787766 absolute error = 0.4707254498787766 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7840000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4713005984934698 absolute error = 0.4713005984934698 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7850000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4718756058455079 absolute error = 0.4718756058455079 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7860000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4724504725660729 absolute error = 0.4724504725660729 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7870000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4730251992855202 absolute error = 0.4730251992855202 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7880000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4735997866333807 absolute error = 0.4735997866333807 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7890000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4741742352383626 absolute error = 0.4741742352383626 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7900000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4747485457283536 absolute error = 0.4747485457283536 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7910000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4753227187304231 absolute error = 0.4753227187304231 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7920000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4758967548708241 absolute error = 0.4758967548708241 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7930000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4764706547749949 absolute error = 0.4764706547749949 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7940000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4770444190675618 absolute error = 0.4770444190675618 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7950000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4776180483723408 absolute error = 0.4776180483723408 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7960000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4781915433123394 absolute error = 0.4781915433123394 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7970000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4787649045097588 absolute error = 0.4787649045097588 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7980000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4793381325859961 absolute error = 0.4793381325859961 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.7990000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4799112281616459 absolute error = 0.4799112281616459 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8000000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4804841918565027 absolute error = 0.4804841918565027 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8010000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4810570242895625 absolute error = 0.4810570242895625 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8020000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4816297260790252 absolute error = 0.4816297260790252 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8030000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.482202297842296 absolute error = 0.482202297842296 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8040000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4827747401959882 absolute error = 0.4827747401959882 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8050000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4833470537559242 absolute error = 0.4833470537559242 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8060000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4839192391371385 absolute error = 0.4839192391371385 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8070000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4844912969538786 absolute error = 0.4844912969538786 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8080000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4850632278196078 absolute error = 0.4850632278196078 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8090000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4856350323470066 absolute error = 0.4856350323470066 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8100000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4862067111479749 absolute error = 0.4862067111479749 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8110000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4867782648336341 absolute error = 0.4867782648336341 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8120000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4873496940143284 absolute error = 0.4873496940143284 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8130000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4879209992996275 absolute error = 0.4879209992996275 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8140000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4884921812983279 absolute error = 0.4884921812983279 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8150000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4890632406184553 absolute error = 0.4890632406184553 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8160000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4896341778672661 absolute error = 0.4896341778672661 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8170000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4902049936512495 absolute error = 0.4902049936512495 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8180000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4907756885761295 absolute error = 0.4907756885761295 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8190000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4913462632468664 absolute error = 0.4913462632468664 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8200000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4919167182676592 absolute error = 0.4919167182676592 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8210000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4924870542419472 absolute error = 0.4924870542419472 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8220000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4930572717724117 absolute error = 0.4930572717724117 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8230000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4936273714609784 absolute error = 0.4936273714609784 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8240000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4941973539088187 absolute error = 0.4941973539088187 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8250000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4947672197163518 absolute error = 0.4947672197163518 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8260000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4953369694832468 absolute error = 0.4953369694832468 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8270000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4959066038084241 absolute error = 0.4959066038084241 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8280000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4964761232900575 absolute error = 0.4964761232900575 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8290000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4970455285255759 absolute error = 0.4970455285255759 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8300000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4976148201116655 absolute error = 0.4976148201116655 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8310000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.498183998644271 absolute error = 0.498183998644271 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8320000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4987530647185981 absolute error = 0.4987530647185981 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8330000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4993220189291148 absolute error = 0.4993220189291148 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8340000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.4998908618695536 absolute error = 0.4998908618695536 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8350000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.5004595941329129 absolute error = 0.5004595941329129 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8360000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.501028216311459 absolute error = 0.501028216311459 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8370000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.5015967289967282 absolute error = 0.5015967289967282 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8380000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.5021651327795283 absolute error = 0.5021651327795283 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8390000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.5027334282499402 absolute error = 0.5027334282499402 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8400000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.5033016159973198 absolute error = 0.5033016159973198 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8410000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.5038696966103002 absolute error = 0.5038696966103002 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8420000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.504437670676793 absolute error = 0.504437670676793 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8430000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.5050055387839902 absolute error = 0.5050055387839902 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8440000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.505573301518366 absolute error = 0.505573301518366 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8450000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.5061409594656785 absolute error = 0.5061409594656785 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8460000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.5067085132109714 absolute error = 0.5067085132109714 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8470000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.5072759633385761 absolute error = 0.5072759633385761 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8480000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.5078433104321128 absolute error = 0.5078433104321128 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8490000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.5084105550744931 absolute error = 0.5084105550744931 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8500000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.5089776978479208 absolute error = 0.5089776978479208 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8510000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.5095447393338943 absolute error = 0.5095447393338943 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8520000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.5101116801132082 absolute error = 0.5101116801132082 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8530000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.5106785207659547 absolute error = 0.5106785207659547 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8540000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.5112452618715255 absolute error = 0.5112452618715255 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8550000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.511811904008614 absolute error = 0.511811904008614 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8560000000000006 y[1] (analytic) = 0 y[1] (numeric) = 0.512378447755216 absolute error = 0.512378447755216 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8570000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5129448936886323 absolute error = 0.5129448936886323 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8580000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5135112423854699 absolute error = 0.5135112423854699 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8590000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5140774944216439 absolute error = 0.5140774944216439 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8600000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.514643650372379 absolute error = 0.514643650372379 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8610000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5152097108122116 absolute error = 0.5152097108122116 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8620000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5157756763149908 absolute error = 0.5157756763149908 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8630000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5163415474538807 absolute error = 0.5163415474538807 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8640000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5169073248013618 absolute error = 0.5169073248013618 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8650000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5174730089292326 absolute error = 0.5174730089292326 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8660000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5180386004086114 absolute error = 0.5180386004086114 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8670000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5186040998099377 absolute error = 0.5186040998099377 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8680000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5191695077029743 absolute error = 0.5191695077029743 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8690000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5197348246568085 absolute error = 0.5197348246568085 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8700000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5203000512398541 absolute error = 0.5203000512398541 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8710000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5208651880198526 absolute error = 0.5208651880198526 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8720000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5214302355638751 absolute error = 0.5214302355638751 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8730000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5219951944383242 absolute error = 0.5219951944383242 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8740000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5225600652089349 absolute error = 0.5225600652089349 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8750000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.523124848440777 absolute error = 0.523124848440777 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8760000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.523689544698256 absolute error = 0.523689544698256 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8770000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5242541545451154 absolute error = 0.5242541545451154 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8780000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5248186785444375 absolute error = 0.5248186785444375 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8790000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5253831172586461 absolute error = 0.5253831172586461 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8800000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5259474712495067 absolute error = 0.5259474712495067 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8810000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5265117410781293 absolute error = 0.5265117410781293 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8820000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5270759273049693 absolute error = 0.5270759273049693 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8830000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5276400304898294 absolute error = 0.5276400304898294 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8840000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5282040511918611 absolute error = 0.5282040511918611 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8850000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.528767989969566 absolute error = 0.528767989969566 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8860000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5293318473807976 absolute error = 0.5293318473807976 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8870000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5298956239827631 absolute error = 0.5298956239827631 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8880000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5304593203320245 absolute error = 0.5304593203320245 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8890000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5310229369845003 absolute error = 0.5310229369845003 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8900000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5315864744954674 absolute error = 0.5315864744954674 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8910000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.532149933419562 absolute error = 0.532149933419562 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8920000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5327133143107816 absolute error = 0.5327133143107816 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8930000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5332766177224865 absolute error = 0.5332766177224865 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8940000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5338398442074009 absolute error = 0.5338398442074009 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8950000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5344029943176153 absolute error = 0.5344029943176153 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8960000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.534966068604587 absolute error = 0.534966068604587 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8970000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5355290676191422 absolute error = 0.5355290676191422 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8980000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5360919919114776 absolute error = 0.5360919919114776 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.8990000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5366548420311615 absolute error = 0.5366548420311615 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9000000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5372176185271357 absolute error = 0.5372176185271357 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9010000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5377803219477165 absolute error = 0.5377803219477165 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9020000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5383429528405967 absolute error = 0.5383429528405967 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9030000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5389055117528471 absolute error = 0.5389055117528471 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9040000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5394679992309173 absolute error = 0.5394679992309173 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9050000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5400304158206378 absolute error = 0.5400304158206378 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9060000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5405927620672216 absolute error = 0.5405927620672216 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9070000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5411550385152653 absolute error = 0.5411550385152653 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9080000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5417172457087502 absolute error = 0.5417172457087502 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9090000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5422793841910449 absolute error = 0.5422793841910449 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9100000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5428414545049056 absolute error = 0.5428414545049056 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9110000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5434034571924783 absolute error = 0.5434034571924783 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9120000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5439653927952998 absolute error = 0.5439653927952998 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9130000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5445272618542993 absolute error = 0.5445272618542993 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9140000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5450890649098002 absolute error = 0.5450890649098002 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9150000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.545650802501521 absolute error = 0.545650802501521 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9160000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5462124751685767 absolute error = 0.5462124751685767 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9170000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5467740834494809 absolute error = 0.5467740834494809 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9180000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5473356278821464 absolute error = 0.5473356278821464 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9190000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5478971090038873 absolute error = 0.5478971090038873 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9200000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.54845852735142 absolute error = 0.54845852735142 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9210000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5490198834608646 absolute error = 0.5490198834608646 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9220000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5495811778677467 absolute error = 0.5495811778677467 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9230000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5501424111069985 absolute error = 0.5501424111069985 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9240000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.55070358371296 absolute error = 0.55070358371296 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9250000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.551264696219381 absolute error = 0.551264696219381 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9260000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5518257491594217 absolute error = 0.5518257491594217 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9270000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5523867430656549 absolute error = 0.5523867430656549 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9280000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5529476784700669 absolute error = 0.5529476784700669 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9290000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5535085559040587 absolute error = 0.5535085559040587 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9300000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.554069375898448 absolute error = 0.554069375898448 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9310000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5546301389834699 absolute error = 0.5546301389834699 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9320000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.555190845688779 absolute error = 0.555190845688779 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9330000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5557514965434499 absolute error = 0.5557514965434499 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9340000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5563120920759793 absolute error = 0.5563120920759793 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9350000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5568726328142869 absolute error = 0.5568726328142869 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9360000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5574331192857169 absolute error = 0.5574331192857169 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9370000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5579935520170394 absolute error = 0.5579935520170394 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9380000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5585539315344517 absolute error = 0.5585539315344517 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9390000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5591142583635794 absolute error = 0.5591142583635794 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9400000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5596745330294784 absolute error = 0.5596745330294784 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9410000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5602347560566355 absolute error = 0.5602347560566355 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9420000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5607949279689699 absolute error = 0.5607949279689699 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9430000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5613550492898348 absolute error = 0.5613550492898348 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9440000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5619151205420185 absolute error = 0.5619151205420185 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9450000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5624751422477459 absolute error = 0.5624751422477459 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9460000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5630351149286793 absolute error = 0.5630351149286793 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9470000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5635950391059203 absolute error = 0.5635950391059203 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9480000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5641549153000112 absolute error = 0.5641549153000112 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9490000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5647147440309352 absolute error = 0.5647147440309352 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9500000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5652745258181192 absolute error = 0.5652745258181192 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9510000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5658342611804339 absolute error = 0.5658342611804339 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9520000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5663939506361957 absolute error = 0.5663939506361957 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9530000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5669535947031678 absolute error = 0.5669535947031678 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9540000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5675131938985615 absolute error = 0.5675131938985615 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9550000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5680727487390373 absolute error = 0.5680727487390373 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9560000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5686322597407067 absolute error = 0.5686322597407067 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9570000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5691917274191328 absolute error = 0.5691917274191328 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9580000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5697511522893318 absolute error = 0.5697511522893318 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9590000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5703105348657745 absolute error = 0.5703105348657745 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9600000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5708698756623874 absolute error = 0.5708698756623874 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9610000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5714291751925539 absolute error = 0.5714291751925539 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9620000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5719884339691153 absolute error = 0.5719884339691153 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9630000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5725476525043725 absolute error = 0.5725476525043725 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9640000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5731068313100871 absolute error = 0.5731068313100871 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9650000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5736659708974826 absolute error = 0.5736659708974826 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9660000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5742250717772455 absolute error = 0.5742250717772455 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9670000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5747841344595266 absolute error = 0.5747841344595266 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9680000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5753431594539423 absolute error = 0.5753431594539423 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9690000000000007 y[1] (analytic) = 0 y[1] (numeric) = 0.5759021472695759 absolute error = 0.5759021472695759 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9700000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5764610984149785 absolute error = 0.5764610984149785 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9710000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5770200133981706 absolute error = 0.5770200133981706 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9720000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5775788927266429 absolute error = 0.5775788927266429 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9730000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5781377369073578 absolute error = 0.5781377369073578 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9740000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5786965464467506 absolute error = 0.5786965464467506 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9750000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5792553218507305 absolute error = 0.5792553218507305 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9760000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5798140636246819 absolute error = 0.5798140636246819 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9770000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5803727722734656 absolute error = 0.5803727722734656 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9780000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5809314483014201 absolute error = 0.5809314483014201 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9790000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5814900922123625 absolute error = 0.5814900922123625 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9800000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5820487045095898 absolute error = 0.5820487045095898 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9810000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5826072856958803 absolute error = 0.5826072856958803 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9820000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5831658362734944 absolute error = 0.5831658362734944 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9830000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.583724356744176 absolute error = 0.583724356744176 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9840000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5842828476091536 absolute error = 0.5842828476091536 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9850000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5848413093691415 absolute error = 0.5848413093691415 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9860000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5853997425243408 absolute error = 0.5853997425243408 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9870000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5859581475744409 absolute error = 0.5859581475744409 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9880000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5865165250186201 absolute error = 0.5865165250186201 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9890000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5870748753555473 absolute error = 0.5870748753555473 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9900000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5876331990833827 absolute error = 0.5876331990833827 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9910000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5881914966997795 absolute error = 0.5881914966997795 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9920000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5887497687018843 absolute error = 0.5887497687018843 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9930000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5893080155863388 absolute error = 0.5893080155863388 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9940000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5898662378492806 absolute error = 0.5898662378492806 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9950000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5904244359863444 absolute error = 0.5904244359863444 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9960000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5909826104926634 absolute error = 0.5909826104926634 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9970000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5915407618628701 absolute error = 0.5915407618628701 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9980000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5920988905910973 absolute error = 0.5920988905910973 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 0.9990000000000008 y[1] (analytic) = 0 y[1] (numeric) = 0.5926569971709796 absolute error = 0.5926569971709796 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.000000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.5932150820956543 absolute error = 0.5932150820956543 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.001000000000001 y[1] (analytic) = 0 y[1] (numeric) = 0.5937731458577623 absolute error = 0.5937731458577623 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.002 y[1] (analytic) = 0 y[1] (numeric) = 0.5943311889494497 absolute error = 0.5943311889494497 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.003 y[1] (analytic) = 0 y[1] (numeric) = 0.5948892118623683 absolute error = 0.5948892118623683 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.004 y[1] (analytic) = 0 y[1] (numeric) = 0.5954472150876772 absolute error = 0.5954472150876772 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.005 y[1] (analytic) = 0 y[1] (numeric) = 0.5960051991160435 absolute error = 0.5960051991160435 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.006 y[1] (analytic) = 0 y[1] (numeric) = 0.5965631644376438 absolute error = 0.5965631644376438 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.007 y[1] (analytic) = 0 y[1] (numeric) = 0.5971211115421646 absolute error = 0.5971211115421646 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.008 y[1] (analytic) = 0 y[1] (numeric) = 0.5976790409188044 absolute error = 0.5976790409188044 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.009 y[1] (analytic) = 0 y[1] (numeric) = 0.5982369530562737 absolute error = 0.5982369530562737 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.01 y[1] (analytic) = 0 y[1] (numeric) = 0.5987948484427966 absolute error = 0.5987948484427966 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.010999999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.5993527275661121 absolute error = 0.5993527275661121 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.011999999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.5999105909134747 absolute error = 0.5999105909134747 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.012999999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.6004684389716554 absolute error = 0.6004684389716554 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.013999999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.6010262722269433 absolute error = 0.6010262722269433 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.014999999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.6015840911651462 absolute error = 0.6015840911651462 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.015999999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.602141896271592 absolute error = 0.602141896271592 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.016999999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.6026996880311292 absolute error = 0.6026996880311292 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.017999999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.6032574669281284 absolute error = 0.6032574669281284 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.018999999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.6038152334464834 absolute error = 0.6038152334464834 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.019999999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.6043729880696116 absolute error = 0.6043729880696116 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.020999999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.6049307312804558 absolute error = 0.6049307312804558 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.021999999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.605488463561485 absolute error = 0.605488463561485 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.022999999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.606046185394695 absolute error = 0.606046185394695 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.023999999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.6066038972616099 absolute error = 0.6066038972616099 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.024999999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.607161599643283 absolute error = 0.607161599643283 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.025999999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.6077192930202976 absolute error = 0.6077192930202976 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.026999999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.6082769778727684 absolute error = 0.6082769778727684 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.027999999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.608834654680342 absolute error = 0.608834654680342 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.028999999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.6093923239221986 absolute error = 0.6093923239221986 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.029999999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.609949986077052 absolute error = 0.609949986077052 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.030999999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.6105076416231517 absolute error = 0.6105076416231517 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.031999999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.6110652910382832 absolute error = 0.6110652910382832 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.032999999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.6116229347997691 absolute error = 0.6116229347997691 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.033999999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.6121805733844703 absolute error = 0.6121805733844703 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.034999999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.6127382072687867 absolute error = 0.6127382072687867 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.035999999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.6132958369286582 absolute error = 0.6132958369286582 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.036999999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.6138534628395661 absolute error = 0.6138534628395661 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.037999999999996 y[1] (analytic) = 0 y[1] (numeric) = 0.6144110854765334 absolute error = 0.6144110854765334 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.038999999999996 y[1] (analytic) = 0 y[1] (numeric) = 0.6149687053141265 absolute error = 0.6149687053141265 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.039999999999996 y[1] (analytic) = 0 y[1] (numeric) = 0.6155263228264555 absolute error = 0.6155263228264555 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.040999999999996 y[1] (analytic) = 0 y[1] (numeric) = 0.6160839384871756 absolute error = 0.6160839384871756 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.041999999999996 y[1] (analytic) = 0 y[1] (numeric) = 0.6166415527694877 absolute error = 0.6166415527694877 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.042999999999996 y[1] (analytic) = 0 y[1] (numeric) = 0.61719916614614 absolute error = 0.61719916614614 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.043999999999996 y[1] (analytic) = 0 y[1] (numeric) = 0.6177567790894282 absolute error = 0.6177567790894282 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.044999999999996 y[1] (analytic) = 0 y[1] (numeric) = 0.6183143920711967 absolute error = 0.6183143920711967 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.045999999999996 y[1] (analytic) = 0 y[1] (numeric) = 0.6188720055628397 absolute error = 0.6188720055628397 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.046999999999995 y[1] (analytic) = 0 y[1] (numeric) = 0.6194296200353023 absolute error = 0.6194296200353023 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.047999999999995 y[1] (analytic) = 0 y[1] (numeric) = 0.6199872359590809 absolute error = 0.6199872359590809 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.048999999999995 y[1] (analytic) = 0 y[1] (numeric) = 0.6205448538042245 absolute error = 0.6205448538042245 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.049999999999995 y[1] (analytic) = 0 y[1] (numeric) = 0.6211024740403357 absolute error = 0.6211024740403357 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.050999999999995 y[1] (analytic) = 0 y[1] (numeric) = 0.6216600971365713 absolute error = 0.6216600971365713 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.051999999999995 y[1] (analytic) = 0 y[1] (numeric) = 0.6222177235616436 absolute error = 0.6222177235616436 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.052999999999995 y[1] (analytic) = 0 y[1] (numeric) = 0.622775353783821 absolute error = 0.622775353783821 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.053999999999995 y[1] (analytic) = 0 y[1] (numeric) = 0.6233329882709291 absolute error = 0.6233329882709291 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.054999999999995 y[1] (analytic) = 0 y[1] (numeric) = 0.6238906274903516 absolute error = 0.6238906274903516 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.055999999999994 y[1] (analytic) = 0 y[1] (numeric) = 0.6244482719090313 absolute error = 0.6244482719090313 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.056999999999994 y[1] (analytic) = 0 y[1] (numeric) = 0.6250059219934707 absolute error = 0.6250059219934707 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.057999999999994 y[1] (analytic) = 0 y[1] (numeric) = 0.6255635782097333 absolute error = 0.6255635782097333 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.058999999999994 y[1] (analytic) = 0 y[1] (numeric) = 0.6261212410234441 absolute error = 0.6261212410234441 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.059999999999994 y[1] (analytic) = 0 y[1] (numeric) = 0.626678910899791 absolute error = 0.626678910899791 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.060999999999994 y[1] (analytic) = 0 y[1] (numeric) = 0.6272365883035251 absolute error = 0.6272365883035251 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.061999999999994 y[1] (analytic) = 0 y[1] (numeric) = 0.6277942736989622 absolute error = 0.6277942736989622 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.062999999999994 y[1] (analytic) = 0 y[1] (numeric) = 0.6283519675499831 absolute error = 0.6283519675499831 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.063999999999994 y[1] (analytic) = 0 y[1] (numeric) = 0.6289096703200351 absolute error = 0.6289096703200351 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.064999999999994 y[1] (analytic) = 0 y[1] (numeric) = 0.6294673824721322 absolute error = 0.6294673824721322 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.065999999999993 y[1] (analytic) = 0 y[1] (numeric) = 0.6300251044688566 absolute error = 0.6300251044688566 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.066999999999993 y[1] (analytic) = 0 y[1] (numeric) = 0.6305828367723593 absolute error = 0.6305828367723593 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.067999999999993 y[1] (analytic) = 0 y[1] (numeric) = 0.6311405798443609 absolute error = 0.6311405798443609 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.068999999999993 y[1] (analytic) = 0 y[1] (numeric) = 0.6316983341461526 absolute error = 0.6316983341461526 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.069999999999993 y[1] (analytic) = 0 y[1] (numeric) = 0.6322561001385972 absolute error = 0.6322561001385972 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.070999999999993 y[1] (analytic) = 0 y[1] (numeric) = 0.6328138782821296 absolute error = 0.6328138782821296 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.071999999999993 y[1] (analytic) = 0 y[1] (numeric) = 0.6333716690367579 absolute error = 0.6333716690367579 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.072999999999993 y[1] (analytic) = 0 y[1] (numeric) = 0.6339294728620642 absolute error = 0.6339294728620642 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.073999999999993 y[1] (analytic) = 0 y[1] (numeric) = 0.6344872902172057 absolute error = 0.6344872902172057 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.074999999999992 y[1] (analytic) = 0 y[1] (numeric) = 0.6350451215609152 absolute error = 0.6350451215609152 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.075999999999992 y[1] (analytic) = 0 y[1] (numeric) = 0.6356029673515019 absolute error = 0.6356029673515019 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.076999999999992 y[1] (analytic) = 0 y[1] (numeric) = 0.6361608280468526 absolute error = 0.6361608280468526 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.077999999999992 y[1] (analytic) = 0 y[1] (numeric) = 0.6367187041044323 absolute error = 0.6367187041044323 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.078999999999992 y[1] (analytic) = 0 y[1] (numeric) = 0.6372765959812853 absolute error = 0.6372765959812853 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.079999999999992 y[1] (analytic) = 0 y[1] (numeric) = 0.6378345041340356 absolute error = 0.6378345041340356 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.080999999999992 y[1] (analytic) = 0 y[1] (numeric) = 0.6383924290188883 absolute error = 0.6383924290188883 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.081999999999992 y[1] (analytic) = 0 y[1] (numeric) = 0.6389503710916296 absolute error = 0.6389503710916296 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.082999999999992 y[1] (analytic) = 0 y[1] (numeric) = 0.6395083308076286 absolute error = 0.6395083308076286 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.083999999999991 y[1] (analytic) = 0 y[1] (numeric) = 0.6400663086218374 absolute error = 0.6400663086218374 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.084999999999991 y[1] (analytic) = 0 y[1] (numeric) = 0.6406243049887925 absolute error = 0.6406243049887925 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.085999999999991 y[1] (analytic) = 0 y[1] (numeric) = 0.6411823203626149 absolute error = 0.6411823203626149 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.086999999999991 y[1] (analytic) = 0 y[1] (numeric) = 0.6417403551970116 absolute error = 0.6417403551970116 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.087999999999991 y[1] (analytic) = 0 y[1] (numeric) = 0.642298409945276 absolute error = 0.642298409945276 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.088999999999991 y[1] (analytic) = 0 y[1] (numeric) = 0.6428564850602889 absolute error = 0.6428564850602889 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.089999999999991 y[1] (analytic) = 0 y[1] (numeric) = 0.6434145809945193 absolute error = 0.6434145809945193 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.090999999999991 y[1] (analytic) = 0 y[1] (numeric) = 0.643972698200025 absolute error = 0.643972698200025 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.091999999999991 y[1] (analytic) = 0 y[1] (numeric) = 0.6445308371284536 absolute error = 0.6445308371284536 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.09299999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.6450889982310433 absolute error = 0.6450889982310433 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.09399999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.6456471819586236 absolute error = 0.6456471819586236 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.09499999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.6462053887616162 absolute error = 0.6462053887616162 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.09599999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.6467636190900355 absolute error = 0.6467636190900355 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.09699999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.6473218733934901 absolute error = 0.6473218733934901 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.09799999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.6478801521211824 absolute error = 0.6478801521211824 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.09899999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.6484384557219106 absolute error = 0.6484384557219106 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.09999999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.6489967846440687 absolute error = 0.6489967846440687 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.10099999999999 y[1] (analytic) = 0 y[1] (numeric) = 0.6495551393356477 absolute error = 0.6495551393356477 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.101999999999989 y[1] (analytic) = 0 y[1] (numeric) = 0.6501135202442359 absolute error = 0.6501135202442359 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.102999999999989 y[1] (analytic) = 0 y[1] (numeric) = 0.65067192781702 absolute error = 0.65067192781702 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.103999999999989 y[1] (analytic) = 0 y[1] (numeric) = 0.651230362500786 absolute error = 0.651230362500786 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.104999999999989 y[1] (analytic) = 0 y[1] (numeric) = 0.6517888247419198 absolute error = 0.6517888247419198 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.105999999999989 y[1] (analytic) = 0 y[1] (numeric) = 0.6523473149864077 absolute error = 0.6523473149864077 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.106999999999989 y[1] (analytic) = 0 y[1] (numeric) = 0.6529058336798376 absolute error = 0.6529058336798376 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.107999999999989 y[1] (analytic) = 0 y[1] (numeric) = 0.6534643812673993 absolute error = 0.6534643812673993 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.108999999999989 y[1] (analytic) = 0 y[1] (numeric) = 0.6540229581938856 absolute error = 0.6540229581938856 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.109999999999989 y[1] (analytic) = 0 y[1] (numeric) = 0.654581564903693 absolute error = 0.654581564903693 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.110999999999988 y[1] (analytic) = 0 y[1] (numeric) = 0.6551402018408224 absolute error = 0.6551402018408224 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.111999999999988 y[1] (analytic) = 0 y[1] (numeric) = 0.6556988694488798 absolute error = 0.6556988694488798 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.112999999999988 y[1] (analytic) = 0 y[1] (numeric) = 0.6562575681710768 absolute error = 0.6562575681710768 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.113999999999988 y[1] (analytic) = 0 y[1] (numeric) = 0.6568162984502319 absolute error = 0.6568162984502319 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.114999999999988 y[1] (analytic) = 0 y[1] (numeric) = 0.6573750607287708 absolute error = 0.6573750607287708 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.115999999999988 y[1] (analytic) = 0 y[1] (numeric) = 0.6579338554487273 absolute error = 0.6579338554487273 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.116999999999988 y[1] (analytic) = 0 y[1] (numeric) = 0.6584926830517438 absolute error = 0.6584926830517438 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.117999999999988 y[1] (analytic) = 0 y[1] (numeric) = 0.6590515439790723 absolute error = 0.6590515439790723 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.118999999999988 y[1] (analytic) = 0 y[1] (numeric) = 0.6596104386715751 absolute error = 0.6596104386715751 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.119999999999987 y[1] (analytic) = 0 y[1] (numeric) = 0.6601693675697253 absolute error = 0.6601693675697253 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.120999999999987 y[1] (analytic) = 0 y[1] (numeric) = 0.6607283311136078 absolute error = 0.6607283311136078 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.121999999999987 y[1] (analytic) = 0 y[1] (numeric) = 0.6612873297429197 absolute error = 0.6612873297429197 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.122999999999987 y[1] (analytic) = 0 y[1] (numeric) = 0.6618463638969712 absolute error = 0.6618463638969712 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.123999999999987 y[1] (analytic) = 0 y[1] (numeric) = 0.6624054340146862 absolute error = 0.6624054340146862 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.124999999999987 y[1] (analytic) = 0 y[1] (numeric) = 0.6629645405346033 absolute error = 0.6629645405346033 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.125999999999987 y[1] (analytic) = 0 y[1] (numeric) = 0.663523683894876 absolute error = 0.663523683894876 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.126999999999987 y[1] (analytic) = 0 y[1] (numeric) = 0.6640828645332739 absolute error = 0.6640828645332739 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.127999999999987 y[1] (analytic) = 0 y[1] (numeric) = 0.664642082887183 absolute error = 0.664642082887183 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.128999999999986 y[1] (analytic) = 0 y[1] (numeric) = 0.6652013393936065 absolute error = 0.6652013393936065 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.129999999999986 y[1] (analytic) = 0 y[1] (numeric) = 0.6657606344891657 absolute error = 0.6657606344891657 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.130999999999986 y[1] (analytic) = 0 y[1] (numeric) = 0.6663199686101005 absolute error = 0.6663199686101005 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.131999999999986 y[1] (analytic) = 0 y[1] (numeric) = 0.66687934219227 absolute error = 0.66687934219227 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.132999999999986 y[1] (analytic) = 0 y[1] (numeric) = 0.6674387556711533 absolute error = 0.6674387556711533 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.133999999999986 y[1] (analytic) = 0 y[1] (numeric) = 0.6679982094818502 absolute error = 0.6679982094818502 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.134999999999986 y[1] (analytic) = 0 y[1] (numeric) = 0.6685577040590819 absolute error = 0.6685577040590819 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.135999999999986 y[1] (analytic) = 0 y[1] (numeric) = 0.6691172398371914 absolute error = 0.6691172398371914 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.136999999999986 y[1] (analytic) = 0 y[1] (numeric) = 0.6696768172501446 absolute error = 0.6696768172501446 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.137999999999985 y[1] (analytic) = 0 y[1] (numeric) = 0.6702364367315307 absolute error = 0.6702364367315307 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.138999999999985 y[1] (analytic) = 0 y[1] (numeric) = 0.6707960987145626 absolute error = 0.6707960987145626 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.139999999999985 y[1] (analytic) = 0 y[1] (numeric) = 0.6713558036320783 absolute error = 0.6713558036320783 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.140999999999985 y[1] (analytic) = 0 y[1] (numeric) = 0.6719155519165407 absolute error = 0.6719155519165407 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.141999999999985 y[1] (analytic) = 0 y[1] (numeric) = 0.6724753440000392 absolute error = 0.6724753440000392 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.142999999999985 y[1] (analytic) = 0 y[1] (numeric) = 0.6730351803142891 absolute error = 0.6730351803142891 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.143999999999985 y[1] (analytic) = 0 y[1] (numeric) = 0.6735950612906336 absolute error = 0.6735950612906336 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.144999999999985 y[1] (analytic) = 0 y[1] (numeric) = 0.6741549873600435 absolute error = 0.6741549873600435 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.145999999999985 y[1] (analytic) = 0 y[1] (numeric) = 0.6747149589531183 absolute error = 0.6747149589531183 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.146999999999984 y[1] (analytic) = 0 y[1] (numeric) = 0.6752749765000865 absolute error = 0.6752749765000865 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.147999999999984 y[1] (analytic) = 0 y[1] (numeric) = 0.6758350404308066 absolute error = 0.6758350404308066 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.148999999999984 y[1] (analytic) = 0 y[1] (numeric) = 0.6763951511747675 absolute error = 0.6763951511747675 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.149999999999984 y[1] (analytic) = 0 y[1] (numeric) = 0.676955309161089 absolute error = 0.676955309161089 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.150999999999984 y[1] (analytic) = 0 y[1] (numeric) = 0.6775155148185232 absolute error = 0.6775155148185232 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.151999999999984 y[1] (analytic) = 0 y[1] (numeric) = 0.6780757685754539 absolute error = 0.6780757685754539 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.152999999999984 y[1] (analytic) = 0 y[1] (numeric) = 0.6786360708598983 absolute error = 0.6786360708598983 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.153999999999984 y[1] (analytic) = 0 y[1] (numeric) = 0.679196422099507 absolute error = 0.679196422099507 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.154999999999984 y[1] (analytic) = 0 y[1] (numeric) = 0.6797568227215649 absolute error = 0.6797568227215649 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.155999999999983 y[1] (analytic) = 0 y[1] (numeric) = 0.6803172731529916 absolute error = 0.6803172731529916 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.156999999999983 y[1] (analytic) = 0 y[1] (numeric) = 0.6808777738203422 absolute error = 0.6808777738203422 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.157999999999983 y[1] (analytic) = 0 y[1] (numeric) = 0.681438325149808 absolute error = 0.681438325149808 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.158999999999983 y[1] (analytic) = 0 y[1] (numeric) = 0.6819989275672167 absolute error = 0.6819989275672167 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.159999999999983 y[1] (analytic) = 0 y[1] (numeric) = 0.6825595814980334 absolute error = 0.6825595814980334 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.160999999999983 y[1] (analytic) = 0 y[1] (numeric) = 0.6831202873673611 absolute error = 0.6831202873673611 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.161999999999983 y[1] (analytic) = 0 y[1] (numeric) = 0.6836810455999411 absolute error = 0.6836810455999411 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.162999999999983 y[1] (analytic) = 0 y[1] (numeric) = 0.684241856620154 absolute error = 0.684241856620154 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.163999999999983 y[1] (analytic) = 0 y[1] (numeric) = 0.6848027208520198 absolute error = 0.6848027208520198 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.164999999999982 y[1] (analytic) = 0 y[1] (numeric) = 0.6853636387191987 absolute error = 0.6853636387191987 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.165999999999982 y[1] (analytic) = 0 y[1] (numeric) = 0.6859246106449921 absolute error = 0.6859246106449921 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.166999999999982 y[1] (analytic) = 0 y[1] (numeric) = 0.6864856370523424 absolute error = 0.6864856370523424 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.167999999999982 y[1] (analytic) = 0 y[1] (numeric) = 0.6870467183638342 absolute error = 0.6870467183638342 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.168999999999982 y[1] (analytic) = 0 y[1] (numeric) = 0.6876078550016946 absolute error = 0.6876078550016946 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.169999999999982 y[1] (analytic) = 0 y[1] (numeric) = 0.6881690473877939 absolute error = 0.6881690473877939 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.170999999999982 y[1] (analytic) = 0 y[1] (numeric) = 0.6887302959436461 absolute error = 0.6887302959436461 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.171999999999982 y[1] (analytic) = 0 y[1] (numeric) = 0.6892916010904093 absolute error = 0.6892916010904093 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.172999999999982 y[1] (analytic) = 0 y[1] (numeric) = 0.6898529632488869 absolute error = 0.6898529632488869 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.173999999999982 y[1] (analytic) = 0 y[1] (numeric) = 0.6904143828395273 absolute error = 0.6904143828395273 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.174999999999981 y[1] (analytic) = 0 y[1] (numeric) = 0.6909758602824251 absolute error = 0.6909758602824251 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.175999999999981 y[1] (analytic) = 0 y[1] (numeric) = 0.6915373959973213 absolute error = 0.6915373959973213 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.176999999999981 y[1] (analytic) = 0 y[1] (numeric) = 0.6920989904036043 absolute error = 0.6920989904036043 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.177999999999981 y[1] (analytic) = 0 y[1] (numeric) = 0.6926606439203099 absolute error = 0.6926606439203099 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.178999999999981 y[1] (analytic) = 0 y[1] (numeric) = 0.6932223569661221 absolute error = 0.6932223569661221 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.179999999999981 y[1] (analytic) = 0 y[1] (numeric) = 0.6937841299593739 absolute error = 0.6937841299593739 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.180999999999981 y[1] (analytic) = 0 y[1] (numeric) = 0.6943459633180473 absolute error = 0.6943459633180473 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.181999999999981 y[1] (analytic) = 0 y[1] (numeric) = 0.6949078574597745 absolute error = 0.6949078574597745 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.182999999999981 y[1] (analytic) = 0 y[1] (numeric) = 0.6954698128018377 absolute error = 0.6954698128018377 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.18399999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.6960318297611705 absolute error = 0.6960318297611705 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.18499999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.6965939087543576 absolute error = 0.6965939087543576 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.18599999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.6971560501976358 absolute error = 0.6971560501976358 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.18699999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.6977182545068947 absolute error = 0.6977182545068947 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.18799999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.6982805220976767 absolute error = 0.6982805220976767 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.18899999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.6988428533851776 absolute error = 0.6988428533851776 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.18999999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.6994052487842478 absolute error = 0.6994052487842478 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.19099999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.6999677087093922 absolute error = 0.6999677087093922 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.19199999999998 y[1] (analytic) = 0 y[1] (numeric) = 0.7005302335747706 absolute error = 0.7005302335747706 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.192999999999979 y[1] (analytic) = 0 y[1] (numeric) = 0.7010928237941988 absolute error = 0.7010928237941988 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.193999999999979 y[1] (analytic) = 0 y[1] (numeric) = 0.7016554797811485 absolute error = 0.7016554797811485 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.194999999999979 y[1] (analytic) = 0 y[1] (numeric) = 0.7022182019487483 absolute error = 0.7022182019487483 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.195999999999979 y[1] (analytic) = 0 y[1] (numeric) = 0.7027809907097839 absolute error = 0.7027809907097839 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.196999999999979 y[1] (analytic) = 0 y[1] (numeric) = 0.7033438464766989 absolute error = 0.7033438464766989 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.197999999999979 y[1] (analytic) = 0 y[1] (numeric) = 0.7039067696615948 absolute error = 0.7039067696615948 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.198999999999979 y[1] (analytic) = 0 y[1] (numeric) = 0.7044697606762321 absolute error = 0.7044697606762321 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.199999999999979 y[1] (analytic) = 0 y[1] (numeric) = 0.7050328199320304 absolute error = 0.7050328199320304 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.200999999999979 y[1] (analytic) = 0 y[1] (numeric) = 0.705595947840069 absolute error = 0.705595947840069 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.201999999999978 y[1] (analytic) = 0 y[1] (numeric) = 0.7061591448110873 absolute error = 0.7061591448110873 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.202999999999978 y[1] (analytic) = 0 y[1] (numeric) = 0.7067224112554857 absolute error = 0.7067224112554857 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.203999999999978 y[1] (analytic) = 0 y[1] (numeric) = 0.7072857475833255 absolute error = 0.7072857475833255 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.204999999999978 y[1] (analytic) = 0 y[1] (numeric) = 0.7078491542043298 absolute error = 0.7078491542043298 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.205999999999978 y[1] (analytic) = 0 y[1] (numeric) = 0.7084126315278837 absolute error = 0.7084126315278837 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.206999999999978 y[1] (analytic) = 0 y[1] (numeric) = 0.7089761799630351 absolute error = 0.7089761799630351 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.207999999999978 y[1] (analytic) = 0 y[1] (numeric) = 0.7095397999184948 absolute error = 0.7095397999184948 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.208999999999978 y[1] (analytic) = 0 y[1] (numeric) = 0.7101034918026374 absolute error = 0.7101034918026374 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.209999999999978 y[1] (analytic) = 0 y[1] (numeric) = 0.7106672560235014 absolute error = 0.7106672560235014 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.210999999999977 y[1] (analytic) = 0 y[1] (numeric) = 0.7112310929887899 absolute error = 0.7112310929887899 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.211999999999977 y[1] (analytic) = 0 y[1] (numeric) = 0.7117950031058711 absolute error = 0.7117950031058711 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.212999999999977 y[1] (analytic) = 0 y[1] (numeric) = 0.7123589867817782 absolute error = 0.7123589867817782 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.213999999999977 y[1] (analytic) = 0 y[1] (numeric) = 0.7129230444232109 absolute error = 0.7129230444232109 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.214999999999977 y[1] (analytic) = 0 y[1] (numeric) = 0.7134871764365347 absolute error = 0.7134871764365347 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.215999999999977 y[1] (analytic) = 0 y[1] (numeric) = 0.7140513832277825 absolute error = 0.7140513832277825 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.216999999999977 y[1] (analytic) = 0 y[1] (numeric) = 0.7146156652026541 absolute error = 0.7146156652026541 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.217999999999977 y[1] (analytic) = 0 y[1] (numeric) = 0.715180022766517 absolute error = 0.715180022766517 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.218999999999977 y[1] (analytic) = 0 y[1] (numeric) = 0.7157444563244072 absolute error = 0.7157444563244072 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.219999999999976 y[1] (analytic) = 0 y[1] (numeric) = 0.716308966281029 absolute error = 0.716308966281029 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.220999999999976 y[1] (analytic) = 0 y[1] (numeric) = 0.7168735530407561 absolute error = 0.7168735530407561 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.221999999999976 y[1] (analytic) = 0 y[1] (numeric) = 0.7174382170076313 absolute error = 0.7174382170076313 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.222999999999976 y[1] (analytic) = 0 y[1] (numeric) = 0.7180029585853679 absolute error = 0.7180029585853679 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.223999999999976 y[1] (analytic) = 0 y[1] (numeric) = 0.7185677781773492 absolute error = 0.7185677781773492 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.224999999999976 y[1] (analytic) = 0 y[1] (numeric) = 0.7191326761866293 absolute error = 0.7191326761866293 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.225999999999976 y[1] (analytic) = 0 y[1] (numeric) = 0.7196976530159338 absolute error = 0.7196976530159338 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.226999999999976 y[1] (analytic) = 0 y[1] (numeric) = 0.7202627090676599 absolute error = 0.7202627090676599 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.227999999999976 y[1] (analytic) = 0 y[1] (numeric) = 0.7208278447438767 absolute error = 0.7208278447438767 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.228999999999975 y[1] (analytic) = 0 y[1] (numeric) = 0.7213930604463263 absolute error = 0.7213930604463263 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.229999999999975 y[1] (analytic) = 0 y[1] (numeric) = 0.7219583565764234 absolute error = 0.7219583565764234 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.230999999999975 y[1] (analytic) = 0 y[1] (numeric) = 0.7225237335352561 absolute error = 0.7225237335352561 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.231999999999975 y[1] (analytic) = 0 y[1] (numeric) = 0.7230891917235865 absolute error = 0.7230891917235865 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.232999999999975 y[1] (analytic) = 0 y[1] (numeric) = 0.7236547315418508 absolute error = 0.7236547315418508 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.233999999999975 y[1] (analytic) = 0 y[1] (numeric) = 0.7242203533901598 absolute error = 0.7242203533901598 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.234999999999975 y[1] (analytic) = 0 y[1] (numeric) = 0.7247860576682993 absolute error = 0.7247860576682993 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.235999999999975 y[1] (analytic) = 0 y[1] (numeric) = 0.7253518447757307 absolute error = 0.7253518447757307 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.236999999999975 y[1] (analytic) = 0 y[1] (numeric) = 0.7259177151115911 absolute error = 0.7259177151115911 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.237999999999974 y[1] (analytic) = 0 y[1] (numeric) = 0.7264836690746939 absolute error = 0.7264836690746939 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.238999999999974 y[1] (analytic) = 0 y[1] (numeric) = 0.7270497070635291 absolute error = 0.7270497070635291 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.239999999999974 y[1] (analytic) = 0 y[1] (numeric) = 0.727615829476264 absolute error = 0.727615829476264 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.240999999999974 y[1] (analytic) = 0 y[1] (numeric) = 0.7281820367107431 absolute error = 0.7281820367107431 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.241999999999974 y[1] (analytic) = 0 y[1] (numeric) = 0.7287483291644887 absolute error = 0.7287483291644887 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.242999999999974 y[1] (analytic) = 0 y[1] (numeric) = 0.7293147072347015 absolute error = 0.7293147072347015 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.243999999999974 y[1] (analytic) = 0 y[1] (numeric) = 0.7298811713182607 absolute error = 0.7298811713182607 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.244999999999974 y[1] (analytic) = 0 y[1] (numeric) = 0.7304477218117246 absolute error = 0.7304477218117246 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.245999999999974 y[1] (analytic) = 0 y[1] (numeric) = 0.7310143591113307 absolute error = 0.7310143591113307 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.246999999999973 y[1] (analytic) = 0 y[1] (numeric) = 0.7315810836129966 absolute error = 0.7315810836129966 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.247999999999973 y[1] (analytic) = 0 y[1] (numeric) = 0.7321478957123195 absolute error = 0.7321478957123195 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.248999999999973 y[1] (analytic) = 0 y[1] (numeric) = 0.7327147958045778 absolute error = 0.7327147958045778 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.249999999999973 y[1] (analytic) = 0 y[1] (numeric) = 0.7332817842847301 absolute error = 0.7332817842847301 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.250999999999973 y[1] (analytic) = 0 y[1] (numeric) = 0.7338488615474169 absolute error = 0.7338488615474169 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.251999999999973 y[1] (analytic) = 0 y[1] (numeric) = 0.7344160279869598 absolute error = 0.7344160279869598 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.252999999999973 y[1] (analytic) = 0 y[1] (numeric) = 0.7349832839973628 absolute error = 0.7349832839973628 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.253999999999973 y[1] (analytic) = 0 y[1] (numeric) = 0.735550629972312 absolute error = 0.735550629972312 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.254999999999973 y[1] (analytic) = 0 y[1] (numeric) = 0.7361180663051764 absolute error = 0.7361180663051764 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.255999999999972 y[1] (analytic) = 0 y[1] (numeric) = 0.7366855933890079 absolute error = 0.7366855933890079 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.256999999999972 y[1] (analytic) = 0 y[1] (numeric) = 0.7372532116165419 absolute error = 0.7372532116165419 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.257999999999972 y[1] (analytic) = 0 y[1] (numeric) = 0.7378209213801977 absolute error = 0.7378209213801977 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.258999999999972 y[1] (analytic) = 0 y[1] (numeric) = 0.7383887230720788 absolute error = 0.7383887230720788 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.259999999999972 y[1] (analytic) = 0 y[1] (numeric) = 0.7389566170839729 absolute error = 0.7389566170839729 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.260999999999972 y[1] (analytic) = 0 y[1] (numeric) = 0.7395246038073527 absolute error = 0.7395246038073527 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.261999999999972 y[1] (analytic) = 0 y[1] (numeric) = 0.7400926836333762 absolute error = 0.7400926836333762 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.262999999999972 y[1] (analytic) = 0 y[1] (numeric) = 0.7406608569528867 absolute error = 0.7406608569528867 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.263999999999972 y[1] (analytic) = 0 y[1] (numeric) = 0.7412291241564136 absolute error = 0.7412291241564136 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.264999999999971 y[1] (analytic) = 0 y[1] (numeric) = 0.7417974856341724 absolute error = 0.7417974856341724 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.265999999999971 y[1] (analytic) = 0 y[1] (numeric) = 0.7423659417760651 absolute error = 0.7423659417760651 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.266999999999971 y[1] (analytic) = 0 y[1] (numeric) = 0.7429344929716806 absolute error = 0.7429344929716806 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.267999999999971 y[1] (analytic) = 0 y[1] (numeric) = 0.743503139610295 absolute error = 0.743503139610295 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.268999999999971 y[1] (analytic) = 0 y[1] (numeric) = 0.744071882080872 absolute error = 0.744071882080872 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.269999999999971 y[1] (analytic) = 0 y[1] (numeric) = 0.7446407207720631 absolute error = 0.7446407207720631 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.270999999999971 y[1] (analytic) = 0 y[1] (numeric) = 0.745209656072208 absolute error = 0.745209656072208 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.271999999999971 y[1] (analytic) = 0 y[1] (numeric) = 0.7457786883693349 absolute error = 0.7457786883693349 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.272999999999971 y[1] (analytic) = 0 y[1] (numeric) = 0.7463478180511609 absolute error = 0.7463478180511609 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.27399999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.7469170455050921 absolute error = 0.7469170455050921 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.27499999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.7474863711182241 absolute error = 0.7474863711182241 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.27599999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.7480557952773425 absolute error = 0.7480557952773425 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.27699999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.7486253183689224 absolute error = 0.7486253183689224 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.27799999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.74919494077913 absolute error = 0.74919494077913 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.27899999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.7497646628938216 absolute error = 0.7497646628938216 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.27999999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.7503344850985448 absolute error = 0.7503344850985448 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.28099999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.7509044077785386 absolute error = 0.7509044077785386 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.28199999999997 y[1] (analytic) = 0 y[1] (numeric) = 0.7514744313187333 absolute error = 0.7514744313187333 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.282999999999969 y[1] (analytic) = 0 y[1] (numeric) = 0.7520445561037511 absolute error = 0.7520445561037511 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.283999999999969 y[1] (analytic) = 0 y[1] (numeric) = 0.7526147825179067 absolute error = 0.7526147825179067 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.284999999999969 y[1] (analytic) = 0 y[1] (numeric) = 0.7531851109452069 absolute error = 0.7531851109452069 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.285999999999969 y[1] (analytic) = 0 y[1] (numeric) = 0.7537555417693516 absolute error = 0.7537555417693516 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.286999999999969 y[1] (analytic) = 0 y[1] (numeric) = 0.7543260753737333 absolute error = 0.7543260753737333 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.287999999999969 y[1] (analytic) = 0 y[1] (numeric) = 0.7548967121414384 absolute error = 0.7548967121414384 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.288999999999969 y[1] (analytic) = 0 y[1] (numeric) = 0.7554674524552465 absolute error = 0.7554674524552465 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.289999999999969 y[1] (analytic) = 0 y[1] (numeric) = 0.7560382966976311 absolute error = 0.7560382966976311 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.290999999999969 y[1] (analytic) = 0 y[1] (numeric) = 0.7566092452507602 absolute error = 0.7566092452507602 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.291999999999969 y[1] (analytic) = 0 y[1] (numeric) = 0.7571802984964959 absolute error = 0.7571802984964959 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.292999999999968 y[1] (analytic) = 0 y[1] (numeric) = 0.7577514568163952 absolute error = 0.7577514568163952 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.293999999999968 y[1] (analytic) = 0 y[1] (numeric) = 0.75832272059171 absolute error = 0.75832272059171 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.294999999999968 y[1] (analytic) = 0 y[1] (numeric) = 0.7588940902033876 absolute error = 0.7588940902033876 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.295999999999968 y[1] (analytic) = 0 y[1] (numeric) = 0.7594655660320707 absolute error = 0.7594655660320707 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.296999999999968 y[1] (analytic) = 0 y[1] (numeric) = 0.7600371484580979 absolute error = 0.7600371484580979 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.297999999999968 y[1] (analytic) = 0 y[1] (numeric) = 0.7606088378615037 absolute error = 0.7606088378615037 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.298999999999968 y[1] (analytic) = 0 y[1] (numeric) = 0.7611806346220189 absolute error = 0.7611806346220189 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.299999999999968 y[1] (analytic) = 0 y[1] (numeric) = 0.7617525391190711 absolute error = 0.7617525391190711 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.300999999999968 y[1] (analytic) = 0 y[1] (numeric) = 0.7623245517317846 absolute error = 0.7623245517317846 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.301999999999967 y[1] (analytic) = 0 y[1] (numeric) = 0.7628966728389807 absolute error = 0.7628966728389807 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.302999999999967 y[1] (analytic) = 0 y[1] (numeric) = 0.7634689028191781 absolute error = 0.7634689028191781 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.303999999999967 y[1] (analytic) = 0 y[1] (numeric) = 0.7640412420505932 absolute error = 0.7640412420505932 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.304999999999967 y[1] (analytic) = 0 y[1] (numeric) = 0.76461369091114 absolute error = 0.76461369091114 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.305999999999967 y[1] (analytic) = 0 y[1] (numeric) = 0.7651862497784305 absolute error = 0.7651862497784305 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.306999999999967 y[1] (analytic) = 0 y[1] (numeric) = 0.7657589190297756 absolute error = 0.7657589190297756 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.307999999999967 y[1] (analytic) = 0 y[1] (numeric) = 0.7663316990421839 absolute error = 0.7663316990421839 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.308999999999967 y[1] (analytic) = 0 y[1] (numeric) = 0.7669045901923635 absolute error = 0.7669045901923635 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.309999999999967 y[1] (analytic) = 0 y[1] (numeric) = 0.767477592856721 absolute error = 0.767477592856721 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.310999999999966 y[1] (analytic) = 0 y[1] (numeric) = 0.7680507074113626 absolute error = 0.7680507074113626 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.311999999999966 y[1] (analytic) = 0 y[1] (numeric) = 0.7686239342320939 absolute error = 0.7686239342320939 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.312999999999966 y[1] (analytic) = 0 y[1] (numeric) = 0.76919727369442 absolute error = 0.76919727369442 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.313999999999966 y[1] (analytic) = 0 y[1] (numeric) = 0.7697707261735464 absolute error = 0.7697707261735464 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.314999999999966 y[1] (analytic) = 0 y[1] (numeric) = 0.7703442920443783 absolute error = 0.7703442920443783 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.315999999999966 y[1] (analytic) = 0 y[1] (numeric) = 0.7709179716815215 absolute error = 0.7709179716815215 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.316999999999966 y[1] (analytic) = 0 y[1] (numeric) = 0.7714917654592824 absolute error = 0.7714917654592824 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.317999999999966 y[1] (analytic) = 0 y[1] (numeric) = 0.7720656737516682 absolute error = 0.7720656737516682 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.318999999999966 y[1] (analytic) = 0 y[1] (numeric) = 0.7726396969323871 absolute error = 0.7726396969323871 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.319999999999965 y[1] (analytic) = 0 y[1] (numeric) = 0.7732138353748487 absolute error = 0.7732138353748487 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.320999999999965 y[1] (analytic) = 0 y[1] (numeric) = 0.7737880894521637 absolute error = 0.7737880894521637 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.321999999999965 y[1] (analytic) = 0 y[1] (numeric) = 0.7743624595371449 absolute error = 0.7743624595371449 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.322999999999965 y[1] (analytic) = 0 y[1] (numeric) = 0.7749369460023068 absolute error = 0.7749369460023068 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.323999999999965 y[1] (analytic) = 0 y[1] (numeric) = 0.7755115492198659 absolute error = 0.7755115492198659 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.324999999999965 y[1] (analytic) = 0 y[1] (numeric) = 0.7760862695617411 absolute error = 0.7760862695617411 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.325999999999965 y[1] (analytic) = 0 y[1] (numeric) = 0.7766611073995537 absolute error = 0.7766611073995537 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.326999999999965 y[1] (analytic) = 0 y[1] (numeric) = 0.7772360631046278 absolute error = 0.7772360631046278 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.327999999999965 y[1] (analytic) = 0 y[1] (numeric) = 0.7778111370479902 absolute error = 0.7778111370479902 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.328999999999964 y[1] (analytic) = 0 y[1] (numeric) = 0.7783863296003709 absolute error = 0.7783863296003709 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.329999999999964 y[1] (analytic) = 0 y[1] (numeric) = 0.7789616411322032 absolute error = 0.7789616411322032 relative error = -1 % Correct digits = -1 h = 0.001 TOP MAIN SOLVE Loop WARNING: expt of linear to full series power seems to have NO accuracy - needs more work. NO POLE x[1] = 1.330999999999964 y[1] (analytic) = 0 y[1] (numeric) = 0.7795370720136238 absolute error = 0.7795370720136238 relative error = -1 % Correct digits = -1 h = 0.001 Finished! Maximum Time Reached before Solution Completed! diff ( y , x , 1 ) = expt((0.2 * x + 0.3) , sin(x)); Iterations = 1231 Total Elapsed Time = 3 Minutes 0 Seconds Elapsed Time(since restart) = 2 Minutes 59 Seconds Expected Time Remaining = 8 Minutes 55 Seconds Optimized Time Remaining = 8 Minutes 52 Seconds Expected Total Time = 11 Minutes 52 Seconds Time to Timeout = 0 Seconds Percent Done = 25.14 %