fem_check22_tri.c running Given uxx + 2 uxy + 3 uyy + 4 ux + 5 uy + 6 u = 6x^3+6y^3+12x^2+15y^2+6xy+11x+22y+8 xmin<=x<=xmax ymin<=y<=ymax Boundaries Analytic solution u(x,y) = x^3 + y^3 +xy + 1 about to read triangles from 22_tri.tri triangles read from 22_tri.tri tri 0 has vertices 0 5 4 tri 1 has vertices 0 1 5 tri 2 has vertices 1 6 5 tri 3 has vertices 1 2 6 tri 4 has vertices 2 7 6 tri 5 has vertices 2 3 7 tri 6 has vertices 4 9 8 tri 7 has vertices 4 5 9 tri 8 has vertices 5 10 9 tri 9 has vertices 5 6 10 tri 10 has vertices 6 11 10 tri 11 has vertices 6 7 11 tri 12 has vertices 8 13 12 tri 13 has vertices 8 9 13 tri 14 has vertices 9 14 13 tri 15 has vertices 9 10 14 tri 16 has vertices 10 15 14 tri 17 has vertices 10 11 15 subtracting minvert=0 from all vertices, using base zero finding unique of nold=54 found unique of n=16 about to read boundary from 22_tri.bound Dirichlet boundaries from 22_tri.bound boundary segment 0 has vertices 0 1 boundary segment 1 has vertices 1 2 boundary segment 2 has vertices 2 3 boundary segment 3 has vertices 3 7 boundary segment 4 has vertices 7 11 boundary segment 5 has vertices 11 15 boundary segment 6 has vertices 15 14 boundary segment 7 has vertices 14 13 boundary segment 8 has vertices 13 12 boundary segment 9 has vertices 12 8 boundary segment 10 has vertices 8 4 boundary segment 11 has vertices 4 0 subtracting minvert=0 from all vertices, using base zero finding unique of nold=24 found unique of n=12 freevert na=16, nb=12 freevert nc free = 4 unique boundary 0 unique boundary 1 unique boundary 2 unique boundary 3 unique boundary 4 unique boundary 7 unique boundary 8 unique boundary 11 unique boundary 12 unique boundary 13 unique boundary 14 unique boundary 15 number of free vertices is 4 free vertex 5 free vertex 6 free vertex 9 free vertex 10 about to read coordinates from 22_tri.coord coordinates read from 22_tri.coord coordinate 0 at 0.00 , 0.00 coordinate 1 at 0.00 , 0.33 coordinate 2 at 0.00 , 0.66 coordinate 3 at 0.00 , 1.00 coordinate 4 at 0.33 , 0.00 coordinate 5 at 0.33 , 0.33 coordinate 6 at 0.33 , 0.66 coordinate 7 at 0.33 , 1.00 coordinate 8 at 0.66 , 0.00 coordinate 9 at 0.66 , 0.33 coordinate 10 at 0.66 , 0.66 coordinate 11 at 0.66 , 1.00 coordinate 12 at 1.00 , 0.00 coordinate 13 at 1.00 , 0.33 coordinate 14 at 1.00 , 0.66 coordinate 15 at 1.00 , 1.00 xmin=0, xmax=1, ymin=0, ymax=1 nvert=16, nbound=12, nuniqueb=12, nfree=4, ntri=18 compute global stiffness matrix nvert=16, ntri=18, nuniqueb=12 computing local stiffness matrix for triangle 0 nodes i1=0, i2=5, i3=4, area=0.054450 coord (0.000000,0.000000) (0.330000,0.330000) (0.330000,0.000000) cm matrix of am cm = ym solve for cm 1.00 -9.09 -0.00 18.37 0.00 -0.00 cm matrix of am cm = ym solve for cm -0.00 0.00 -3.03 0.00 0.00 18.37 cm matrix of am cm = ym solve for cm -0.00 -3.03 3.03 18.37 -36.73 18.37 tri_int1 running with np=10, nv=66 integral=-0.003416, at i=5, j=5 intg fg =0.006012, at i=5 integral=0.006036, at i=0, j=5 integral=-0.054856, at i=4, j=5 finished k=0 computing local stiffness matrix for triangle 1 nodes i1=0, i2=1, i3=5, area=0.054450 coord (0.000000,0.000000) (0.000000,0.330000) (0.330000,0.330000) cm matrix of am cm = ym solve for cm 1.00 -0.00 -9.09 0.00 0.00 18.37 cm matrix of am cm = ym solve for cm -0.00 3.03 -3.03 18.37 -36.73 18.37 cm matrix of am cm = ym solve for cm -0.00 -3.03 0.00 18.37 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=0.042801, at i=5, j=5 intg fg =0.001922, at i=5 integral=-0.048558, at i=0, j=5 integral=-0.074010, at i=1, j=5 finished k=1 computing local stiffness matrix for triangle 2 nodes i1=1, i2=6, i3=5, area=0.054450 coord (0.000000,0.330000) (0.330000,0.660000) (0.330000,0.330000) cm matrix of am cm = ym solve for cm 1.00 -9.09 0.00 18.37 0.00 -0.00 cm matrix of am cm = ym solve for cm 3.00 0.00 -15.15 0.00 -0.00 18.37 cm matrix of am cm = ym solve for cm 1.00 9.09 -9.09 18.37 -36.73 18.37 tri_int1 running with np=10, nv=66 integral=-0.003416, at i=6, j=6 intg fg =0.003646, at i=6 integral=0.006036, at i=1, j=6 integral=-0.054856, at i=5, j=6 integral=-0.071408, at i=5, j=5 intg fg =-0.026568, at i=5 integral=0.004801, at i=1, j=5 integral=-0.144325, at i=6, j=5 finished k=2 computing local stiffness matrix for triangle 3 nodes i1=1, i2=2, i3=6, area=0.054450 coord (0.000000,0.330000) (0.000000,0.660000) (0.330000,0.660000) cm matrix of am cm = ym solve for cm 6.00 -0.00 -21.21 0.00 0.00 18.37 cm matrix of am cm = ym solve for cm 3.00 15.15 -15.15 18.37 -36.73 18.37 cm matrix of am cm = ym solve for cm -0.00 -3.03 0.00 18.37 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=0.042801, at i=6, j=6 intg fg =-0.004247, at i=6 integral=-0.048558, at i=1, j=6 integral=-0.074010, at i=2, j=6 finished k=3 computing local stiffness matrix for triangle 4 nodes i1=2, i2=7, i3=6, area=0.056100 coord (0.000000,0.660000) (0.330000,1.000000) (0.330000,0.660000) cm matrix of am cm = ym solve for cm 1.00 -9.09 0.00 18.37 0.00 -0.00 cm matrix of am cm = ym solve for cm 9.48 -0.00 -25.78 0.00 -0.00 17.30 cm matrix of am cm = ym solve for cm 5.60 20.50 -19.90 18.37 -35.65 17.30 tri_int1 running with np=10, nv=66 integral=-0.067341, at i=6, j=6 intg fg =-0.045853, at i=6 integral=0.004947, at i=2, j=6 integral=-0.141600, at i=7, j=6 finished k=4 computing local stiffness matrix for triangle 5 nodes i1=2, i2=3, i3=7, area=0.056100 coord (0.000000,0.660000) (0.000000,1.000000) (0.330000,1.000000) cm matrix of am cm = ym solve for cm 14.36 -0.00 -31.66 -0.00 0.00 17.30 cm matrix of am cm = ym solve for cm 9.48 26.56 -25.78 18.37 -35.65 17.30 cm matrix of am cm = ym solve for cm -0.00 -3.03 0.00 18.37 -0.00 -0.00 tri_int1 running with np=10, nv=66 finished k=5 computing local stiffness matrix for triangle 6 nodes i1=4, i2=9, i3=8, area=0.054450 coord (0.330000,0.000000) (0.660000,0.330000) (0.660000,0.000000) cm matrix of am cm = ym solve for cm 6.00 -21.21 -0.00 18.37 0.00 -0.00 cm matrix of am cm = ym solve for cm -0.00 0.00 -3.03 -0.00 0.00 18.37 cm matrix of am cm = ym solve for cm 3.00 -15.15 15.15 18.37 -36.73 18.37 tri_int1 running with np=10, nv=66 integral=-0.003416, at i=9, j=9 intg fg =0.003242, at i=9 integral=0.006036, at i=4, j=9 integral=-0.054856, at i=8, j=9 finished k=6 computing local stiffness matrix for triangle 7 nodes i1=4, i2=5, i3=9, area=0.054450 coord (0.330000,0.000000) (0.330000,0.330000) (0.660000,0.330000) cm matrix of am cm = ym solve for cm 1.00 0.00 -9.09 -0.00 0.00 18.37 cm matrix of am cm = ym solve for cm 1.00 -9.09 9.09 18.37 -36.73 18.37 cm matrix of am cm = ym solve for cm 3.00 -15.15 0.00 18.37 -0.00 0.00 tri_int1 running with np=10, nv=66 integral=-0.038280, at i=5, j=5 intg fg =-0.017472, at i=5 integral=-0.047013, at i=4, j=5 integral=-0.070577, at i=9, j=5 integral=0.042801, at i=9, j=9 intg fg =0.002168, at i=9 integral=-0.048558, at i=4, j=9 integral=-0.074010, at i=5, j=9 finished k=7 computing local stiffness matrix for triangle 8 nodes i1=5, i2=10, i3=9, area=0.054450 coord (0.330000,0.330000) (0.660000,0.660000) (0.660000,0.330000) cm matrix of am cm = ym solve for cm 6.00 -21.21 0.00 18.37 0.00 -0.00 cm matrix of am cm = ym solve for cm 3.00 -0.00 -15.15 0.00 -0.00 18.37 cm matrix of am cm = ym solve for cm 0.00 -3.03 3.03 18.37 -36.73 18.37 tri_int1 running with np=10, nv=66 integral=-0.089709, at i=5, j=5 intg fg =-0.052678, at i=5 integral=-0.142781, at i=10, j=5 integral=-0.054547, at i=9, j=5 integral=-0.003416, at i=10, j=10 intg fg =0.000318, at i=10 integral=0.006036, at i=5, j=10 integral=-0.054856, at i=9, j=10 integral=-0.071408, at i=9, j=9 intg fg =-0.031421, at i=9 integral=0.004801, at i=5, j=9 integral=-0.144325, at i=10, j=9 finished k=8 computing local stiffness matrix for triangle 9 nodes i1=5, i2=6, i3=10, area=0.054450 coord (0.330000,0.330000) (0.330000,0.660000) (0.660000,0.660000) cm matrix of am cm = ym solve for cm 6.00 -0.00 -21.21 0.00 -0.00 18.37 cm matrix of am cm = ym solve for cm 0.00 3.03 -3.03 18.37 -36.73 18.37 cm matrix of am cm = ym solve for cm 3.00 -15.15 0.00 18.37 -0.00 0.00 tri_int1 running with np=10, nv=66 integral=-0.169053, at i=5, j=5 intg fg =-0.057684, at i=5 integral=-0.073701, at i=6, j=5 integral=-0.071813, at i=10, j=5 integral=-0.038280, at i=6, j=6 intg fg =-0.025476, at i=6 integral=-0.047013, at i=5, j=6 integral=-0.070577, at i=10, j=6 integral=0.042801, at i=10, j=10 intg fg =-0.004560, at i=10 integral=-0.048558, at i=5, j=10 integral=-0.074010, at i=6, j=10 finished k=9 computing local stiffness matrix for triangle 10 nodes i1=6, i2=11, i3=10, area=0.056100 coord (0.330000,0.660000) (0.660000,1.000000) (0.660000,0.660000) cm matrix of am cm = ym solve for cm 6.00 -21.21 0.00 18.37 0.00 -0.00 cm matrix of am cm = ym solve for cm 9.48 -0.00 -25.78 0.00 -0.00 17.30 cm matrix of am cm = ym solve for cm 0.83 8.38 -8.13 18.37 -35.65 17.30 tri_int1 running with np=10, nv=66 integral=-0.092427, at i=6, j=6 intg fg =-0.074637, at i=6 integral=-0.140056, at i=11, j=6 integral=-0.053954, at i=10, j=6 integral=-0.067341, at i=10, j=10 intg fg =-0.051449, at i=10 integral=0.004947, at i=6, j=10 integral=-0.141600, at i=11, j=10 finished k=10 computing local stiffness matrix for triangle 11 nodes i1=6, i2=7, i3=11, area=0.056100 coord (0.330000,0.660000) (0.330000,1.000000) (0.660000,1.000000) cm matrix of am cm = ym solve for cm 14.36 0.00 -31.66 -0.00 0.00 17.30 cm matrix of am cm = ym solve for cm 2.71 14.44 -14.01 18.37 -35.65 17.30 cm matrix of am cm = ym solve for cm 3.00 -15.15 -0.00 18.37 -0.00 0.00 tri_int1 running with np=10, nv=66 integral=-0.166043, at i=6, j=6 intg fg =-0.086258, at i=6 integral=-0.070786, at i=7, j=6 integral=-0.073989, at i=11, j=6 finished k=11 computing local stiffness matrix for triangle 12 nodes i1=8, i2=13, i3=12, area=0.056100 coord (0.660000,0.000000) (1.000000,0.330000) (1.000000,0.000000) cm matrix of am cm = ym solve for cm 14.36 -31.66 -0.00 17.30 -0.00 0.00 cm matrix of am cm = ym solve for cm 0.00 -0.00 -3.03 0.00 -0.00 18.37 cm matrix of am cm = ym solve for cm 9.48 -25.78 26.56 17.30 -35.65 18.37 tri_int1 running with np=10, nv=66 finished k=12 computing local stiffness matrix for triangle 13 nodes i1=8, i2=9, i3=13, area=0.056100 coord (0.660000,0.000000) (0.660000,0.330000) (1.000000,0.330000) cm matrix of am cm = ym solve for cm 1.00 0.00 -9.09 -0.00 0.00 18.37 cm matrix of am cm = ym solve for cm 5.60 -19.90 20.50 17.30 -35.65 18.37 cm matrix of am cm = ym solve for cm 9.48 -25.78 0.00 17.30 0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.037461, at i=9, j=9 intg fg =-0.031411, at i=9 integral=-0.048438, at i=8, j=9 integral=-0.069700, at i=13, j=9 finished k=13 computing local stiffness matrix for triangle 14 nodes i1=9, i2=14, i3=13, area=0.056100 coord (0.660000,0.330000) (1.000000,0.660000) (1.000000,0.330000) cm matrix of am cm = ym solve for cm 14.36 -31.66 -0.00 17.30 -0.00 0.00 cm matrix of am cm = ym solve for cm 3.00 -0.00 -15.15 0.00 0.00 18.37 cm matrix of am cm = ym solve for cm 2.71 -14.01 14.44 17.30 -35.65 18.37 tri_int1 running with np=10, nv=66 integral=-0.088545, at i=9, j=9 intg fg =-0.075323, at i=9 integral=-0.147107, at i=14, j=9 integral=-0.055049, at i=13, j=9 finished k=14 computing local stiffness matrix for triangle 15 nodes i1=9, i2=10, i3=14, area=0.056100 coord (0.660000,0.330000) (0.660000,0.660000) (1.000000,0.660000) cm matrix of am cm = ym solve for cm 6.00 0.00 -21.21 -0.00 -0.00 18.37 cm matrix of am cm = ym solve for cm 0.83 -8.13 8.38 17.30 -35.65 18.37 cm matrix of am cm = ym solve for cm 9.48 -25.78 0.00 17.30 0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.174176, at i=9, j=9 intg fg =-0.075044, at i=9 integral=-0.077104, at i=10, j=9 integral=-0.070935, at i=14, j=9 integral=-0.037461, at i=10, j=10 intg fg =-0.040253, at i=10 integral=-0.048438, at i=9, j=10 integral=-0.069700, at i=14, j=10 finished k=15 computing local stiffness matrix for triangle 16 nodes i1=10, i2=15, i3=14, area=0.057800 coord (0.660000,0.660000) (1.000000,1.000000) (1.000000,0.660000) cm matrix of am cm = ym solve for cm 14.36 -31.66 -0.00 17.30 -0.00 0.00 cm matrix of am cm = ym solve for cm 9.48 0.00 -25.78 -0.00 0.00 17.30 cm matrix of am cm = ym solve for cm 0.00 -2.94 2.94 17.30 -34.60 17.30 tri_int1 running with np=10, nv=66 integral=-0.091228, at i=10, j=10 intg fg =-0.099242, at i=10 integral=-0.144300, at i=15, j=10 integral=-0.054345, at i=14, j=10 finished k=16 computing local stiffness matrix for triangle 17 nodes i1=10, i2=11, i3=15, area=0.057800 coord (0.660000,0.660000) (0.660000,1.000000) (1.000000,1.000000) cm matrix of am cm = ym solve for cm 14.36 0.00 -31.66 -0.00 -0.00 17.30 cm matrix of am cm = ym solve for cm 0.00 2.94 -2.94 17.30 -34.60 17.30 cm matrix of am cm = ym solve for cm 9.48 -25.78 0.00 17.30 0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.171075, at i=10, j=10 intg fg =-0.105614, at i=10 integral=-0.074079, at i=11, j=10 integral=-0.073084, at i=15, j=10 finished k=17 tri 0 has vertices 0 5 4 tri 1 has vertices 0 1 5 tri 2 has vertices 1 6 5 tri 3 has vertices 1 2 6 tri 4 has vertices 2 7 6 tri 5 has vertices 2 3 7 tri 6 has vertices 4 9 8 tri 7 has vertices 4 5 9 tri 8 has vertices 5 10 9 tri 9 has vertices 5 6 10 tri 10 has vertices 6 11 10 tri 11 has vertices 6 7 11 tri 12 has vertices 8 13 12 tri 13 has vertices 8 9 13 tri 14 has vertices 9 14 13 tri 15 has vertices 9 10 14 tri 16 has vertices 10 15 14 tri 17 has vertices 10 11 15 vertices, coordinates and analytic values coordinate 0 at 0.00 , 0.00, uana=1.000000 coordinate 1 at 0.00 , 0.33, uana=1.035937 coordinate 2 at 0.00 , 0.66, uana=1.287496 coordinate 3 at 0.00 , 1.00, uana=2.000000 coordinate 4 at 0.33 , 0.00, uana=1.035937 coordinate 5 at 0.33 , 0.33, uana=1.180774 coordinate 6 at 0.33 , 0.66, uana=1.541233 coordinate 7 at 0.33 , 1.00, uana=2.365937 coordinate 8 at 0.66 , 0.00, uana=1.287496 coordinate 9 at 0.66 , 0.33, uana=1.541233 coordinate 10 at 0.66 , 0.66, uana=2.010592 coordinate 11 at 0.66 , 1.00, uana=2.947496 coordinate 12 at 1.00 , 0.00, uana=2.000000 coordinate 13 at 1.00 , 0.33, uana=2.365937 coordinate 14 at 1.00 , 0.66, uana=2.947496 coordinate 15 at 1.00 , 1.00, uana=4.000000 k computed stiffness matrix, if debug K(0,0)=1.000000 K(0,1)=0.000000 K(0,2)=0.000000 K(0,3)=0.000000 K(0,4)=0.000000 K(0,5)=0.000000 K(0,6)=0.000000 K(0,7)=0.000000 K(0,8)=0.000000 K(0,9)=0.000000 K(0,10)=0.000000 K(0,11)=0.000000 K(0,12)=0.000000 K(0,13)=0.000000 K(0,14)=0.000000 K(0,15)=0.000000 K(1,0)=0.000000 K(1,1)=1.000000 K(1,2)=0.000000 K(1,3)=0.000000 K(1,4)=0.000000 K(1,5)=0.000000 K(1,6)=0.000000 K(1,7)=0.000000 K(1,8)=0.000000 K(1,9)=0.000000 K(1,10)=0.000000 K(1,11)=0.000000 K(1,12)=0.000000 K(1,13)=0.000000 K(1,14)=0.000000 K(1,15)=0.000000 K(2,0)=0.000000 K(2,1)=0.000000 K(2,2)=1.000000 K(2,3)=0.000000 K(2,4)=0.000000 K(2,5)=0.000000 K(2,6)=0.000000 K(2,7)=0.000000 K(2,8)=0.000000 K(2,9)=0.000000 K(2,10)=0.000000 K(2,11)=0.000000 K(2,12)=0.000000 K(2,13)=0.000000 K(2,14)=0.000000 K(2,15)=0.000000 K(3,0)=0.000000 K(3,1)=0.000000 K(3,2)=0.000000 K(3,3)=1.000000 K(3,4)=0.000000 K(3,5)=0.000000 K(3,6)=0.000000 K(3,7)=0.000000 K(3,8)=0.000000 K(3,9)=0.000000 K(3,10)=0.000000 K(3,11)=0.000000 K(3,12)=0.000000 K(3,13)=0.000000 K(3,14)=0.000000 K(3,15)=0.000000 K(4,0)=0.000000 K(4,1)=0.000000 K(4,2)=0.000000 K(4,3)=0.000000 K(4,4)=1.000000 K(4,5)=0.000000 K(4,6)=0.000000 K(4,7)=0.000000 K(4,8)=0.000000 K(4,9)=0.000000 K(4,10)=0.000000 K(4,11)=0.000000 K(4,12)=0.000000 K(4,13)=0.000000 K(4,14)=0.000000 K(4,15)=0.000000 K(5,0)=-0.042521 K(5,1)=-0.069209 K(5,2)=0.000000 K(5,3)=0.000000 K(5,4)=-0.101870 K(5,5)=-0.329065 K(5,6)=-0.218026 K(5,7)=0.000000 K(5,8)=0.000000 K(5,9)=-0.125125 K(5,10)=-0.214593 K(5,11)=0.000000 K(5,12)=0.000000 K(5,13)=0.000000 K(5,14)=0.000000 K(5,15)=0.000000 K(6,0)=0.000000 K(6,1)=-0.042521 K(6,2)=-0.069063 K(6,3)=0.000000 K(6,4)=0.000000 K(6,5)=-0.101870 K(6,6)=-0.324707 K(6,7)=-0.212386 K(6,8)=0.000000 K(6,9)=0.000000 K(6,10)=-0.124531 K(6,11)=-0.214045 K(6,12)=0.000000 K(6,13)=0.000000 K(6,14)=0.000000 K(6,15)=0.000000 K(7,0)=0.000000 K(7,1)=0.000000 K(7,2)=0.000000 K(7,3)=0.000000 K(7,4)=0.000000 K(7,5)=0.000000 K(7,6)=0.000000 K(7,7)=1.000000 K(7,8)=0.000000 K(7,9)=0.000000 K(7,10)=0.000000 K(7,11)=0.000000 K(7,12)=0.000000 K(7,13)=0.000000 K(7,14)=0.000000 K(7,15)=0.000000 K(8,0)=0.000000 K(8,1)=0.000000 K(8,2)=0.000000 K(8,3)=0.000000 K(8,4)=0.000000 K(8,5)=0.000000 K(8,6)=0.000000 K(8,7)=0.000000 K(8,8)=1.000000 K(8,9)=0.000000 K(8,10)=0.000000 K(8,11)=0.000000 K(8,12)=0.000000 K(8,13)=0.000000 K(8,14)=0.000000 K(8,15)=0.000000 K(9,0)=0.000000 K(9,1)=0.000000 K(9,2)=0.000000 K(9,3)=0.000000 K(9,4)=-0.042521 K(9,5)=-0.069209 K(9,6)=0.000000 K(9,7)=0.000000 K(9,8)=-0.103294 K(9,9)=-0.332205 K(9,10)=-0.221429 K(9,11)=0.000000 K(9,12)=0.000000 K(9,13)=-0.124748 K(9,14)=-0.218042 K(9,15)=0.000000 K(10,0)=0.000000 K(10,1)=0.000000 K(10,2)=0.000000 K(10,3)=0.000000 K(10,4)=0.000000 K(10,5)=-0.042521 K(10,6)=-0.069063 K(10,7)=0.000000 K(10,8)=0.000000 K(10,9)=-0.103294 K(10,10)=-0.327720 K(10,11)=-0.215679 K(10,12)=0.000000 K(10,13)=0.000000 K(10,14)=-0.124044 K(10,15)=-0.217385 K(11,0)=0.000000 K(11,1)=0.000000 K(11,2)=0.000000 K(11,3)=0.000000 K(11,4)=0.000000 K(11,5)=0.000000 K(11,6)=0.000000 K(11,7)=0.000000 K(11,8)=0.000000 K(11,9)=0.000000 K(11,10)=0.000000 K(11,11)=1.000000 K(11,12)=0.000000 K(11,13)=0.000000 K(11,14)=0.000000 K(11,15)=0.000000 K(12,0)=0.000000 K(12,1)=0.000000 K(12,2)=0.000000 K(12,3)=0.000000 K(12,4)=0.000000 K(12,5)=0.000000 K(12,6)=0.000000 K(12,7)=0.000000 K(12,8)=0.000000 K(12,9)=0.000000 K(12,10)=0.000000 K(12,11)=0.000000 K(12,12)=1.000000 K(12,13)=0.000000 K(12,14)=0.000000 K(12,15)=0.000000 K(13,0)=0.000000 K(13,1)=0.000000 K(13,2)=0.000000 K(13,3)=0.000000 K(13,4)=0.000000 K(13,5)=0.000000 K(13,6)=0.000000 K(13,7)=0.000000 K(13,8)=0.000000 K(13,9)=0.000000 K(13,10)=0.000000 K(13,11)=0.000000 K(13,12)=0.000000 K(13,13)=1.000000 K(13,14)=0.000000 K(13,15)=0.000000 K(14,0)=0.000000 K(14,1)=0.000000 K(14,2)=0.000000 K(14,3)=0.000000 K(14,4)=0.000000 K(14,5)=0.000000 K(14,6)=0.000000 K(14,7)=0.000000 K(14,8)=0.000000 K(14,9)=0.000000 K(14,10)=0.000000 K(14,11)=0.000000 K(14,12)=0.000000 K(14,13)=0.000000 K(14,14)=1.000000 K(14,15)=0.000000 K(15,0)=0.000000 K(15,1)=0.000000 K(15,2)=0.000000 K(15,3)=0.000000 K(15,4)=0.000000 K(15,5)=0.000000 K(15,6)=0.000000 K(15,7)=0.000000 K(15,8)=0.000000 K(15,9)=0.000000 K(15,10)=0.000000 K(15,11)=0.000000 K(15,12)=0.000000 K(15,13)=0.000000 K(15,14)=0.000000 K(15,15)=1.000000 f computed forcing function and boundary, if debug F(0)=1.000000, ug[0]=0.000000 F(1)=1.035937, ug[1]=0.000000 F(2)=1.287496, ug[2]=0.000000 F(3)=2.000000, ug[3]=0.000000 F(4)=1.035937, ug[4]=0.000000 F(5)=-0.146468, ug[5]=0.000000 F(6)=-0.232826, ug[6]=0.000000 F(7)=2.365937, ug[7]=0.000000 F(8)=1.287496, ug[8]=0.000000 F(9)=-0.207789, ug[9]=0.000000 F(10)=-0.300801, ug[10]=0.000000 F(11)=2.947496, ug[11]=0.000000 F(12)=2.000000, ug[12]=0.000000 F(13)=2.365937, ug[13]=0.000000 F(14)=2.947496, ug[14]=0.000000 F(15)=4.000000, ug[15]=0.000000 ug computed Galerkin, Ua analytic, error ug[0]= 1.000, Ua= 1.000, err=0 ug[1]= 1.036, Ua= 1.036, err=0 ug[2]= 1.287, Ua= 1.287, err=0 ug[3]= 2.000, Ua= 2.000, err=0 ug[4]= 1.036, Ua= 1.036, err=0 ug[5]= 5.031, Ua= 1.181, err=3.85059 ug[6]=-3.004, Ua= 1.541, err=-4.54527 ug[7]= 2.366, Ua= 2.366, err=0 ug[8]= 1.287, Ua= 1.287, err=0 ug[9]=-0.724, Ua= 1.541, err=-2.26557 ug[10]=-4.582, Ua= 2.011, err=-6.59293 ug[11]= 2.947, Ua= 2.947, err=0 ug[12]= 2.000, Ua= 2.000, err=0 ug[13]= 2.366, Ua= 2.366, err=0 ug[14]= 2.947, Ua= 2.947, err=0 ug[15]= 4.000, Ua= 4.000, err=0 maxerr=6.59293, avgerr=1.0784 tri_split nvert_old=16, nvert=70, ntri_old=18, ntri=72 compute global stiffness matrix nvert=70, ntri=72, nuniqueb=28 computing local stiffness matrix for triangle 0 nodes i1=0, i2=16, i3=18, area=0.013613 coord (0.000000,0.000000) (0.165000,0.165000) (0.165000,0.000000) cm matrix of am cm = ym solve for cm 1.00 -18.18 -0.00 73.46 0.00 -0.00 cm matrix of am cm = ym solve for cm -0.00 0.00 -6.06 0.00 0.00 73.46 cm matrix of am cm = ym solve for cm -0.00 -6.06 6.06 73.46 -146.92 73.46 tri_int1 running with np=10, nv=66 integral=-0.050778, at i=16, j=16 intg fg =-0.000358, at i=16 integral=-0.012303, at i=0, j=16 integral=-0.058444, at i=18, j=16 finished k=0 computing local stiffness matrix for triangle 1 nodes i1=0, i2=19, i3=21, area=0.013613 coord (0.000000,0.000000) (0.000000,0.165000) (0.165000,0.165000) cm matrix of am cm = ym solve for cm 1.00 -0.00 -18.18 0.00 0.00 73.46 cm matrix of am cm = ym solve for cm -0.00 6.06 -6.06 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm -0.00 -6.06 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=0.003721, at i=21, j=21 intg fg =-0.000850, at i=21 integral=-0.070990, at i=0, j=21 integral=-0.068021, at i=19, j=21 finished k=1 computing local stiffness matrix for triangle 2 nodes i1=1, i2=22, i3=24, area=0.013612 coord (0.000000,0.330000) (0.165000,0.495000) (0.165000,0.330000) cm matrix of am cm = ym solve for cm 1.00 -18.18 0.00 73.46 0.00 -0.00 cm matrix of am cm = ym solve for cm 10.00 -0.00 -54.55 -0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 6.00 42.42 -42.42 73.46 -146.92 73.46 tri_int1 running with np=10, nv=66 integral=-0.050778, at i=22, j=22 intg fg =-0.001677, at i=22 integral=-0.012303, at i=1, j=22 integral=-0.058444, at i=24, j=22 integral=-0.069079, at i=24, j=24 intg fg =-0.005077, at i=24 integral=-0.012920, at i=1, j=24 integral=-0.118874, at i=22, j=24 finished k=2 computing local stiffness matrix for triangle 3 nodes i1=1, i2=25, i3=27, area=0.013612 coord (0.000000,0.330000) (0.000000,0.495000) (0.165000,0.495000) cm matrix of am cm = ym solve for cm 15.00 0.00 -66.67 0.00 -0.00 73.46 cm matrix of am cm = ym solve for cm 10.00 54.55 -54.55 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm -0.00 -6.06 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=0.003721, at i=27, j=27 intg fg =-0.002614, at i=27 integral=-0.070990, at i=1, j=27 integral=-0.068021, at i=25, j=27 finished k=3 computing local stiffness matrix for triangle 4 nodes i1=2, i2=28, i3=30, area=0.014025 coord (0.000000,0.660000) (0.165000,0.830000) (0.165000,0.660000) cm matrix of am cm = ym solve for cm 1.00 -18.18 0.00 73.46 0.00 -0.00 cm matrix of am cm = ym solve for cm 34.03 0.00 -97.23 -0.00 -0.00 69.20 cm matrix of am cm = ym solve for cm 26.26 88.06 -85.47 73.46 -142.60 69.20 tri_int1 running with np=10, nv=66 integral=-0.066196, at i=30, j=30 intg fg =-0.009010, at i=30 integral=-0.013312, at i=2, j=30 integral=-0.116115, at i=28, j=30 finished k=4 computing local stiffness matrix for triangle 5 nodes i1=2, i2=31, i3=33, area=0.014025 coord (0.000000,0.660000) (0.000000,0.830000) (0.165000,0.830000) cm matrix of am cm = ym solve for cm 42.79 -0.00 -109.00 0.00 0.00 69.20 cm matrix of am cm = ym solve for cm 34.03 100.18 -97.23 73.46 -142.60 69.20 cm matrix of am cm = ym solve for cm -0.00 -6.06 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 finished k=5 computing local stiffness matrix for triangle 6 nodes i1=4, i2=34, i3=36, area=0.013612 coord (0.330000,0.000000) (0.495000,0.165000) (0.495000,0.000000) cm matrix of am cm = ym solve for cm 15.00 -66.67 -0.00 73.46 -0.00 0.00 cm matrix of am cm = ym solve for cm 0.00 0.00 -6.06 0.00 -0.00 73.46 cm matrix of am cm = ym solve for cm 10.00 -54.55 54.55 73.46 -146.92 73.46 tri_int1 running with np=10, nv=66 integral=-0.050778, at i=34, j=34 intg fg =-0.001277, at i=34 integral=-0.012303, at i=4, j=34 integral=-0.058444, at i=36, j=34 finished k=6 computing local stiffness matrix for triangle 7 nodes i1=4, i2=37, i3=39, area=0.013612 coord (0.330000,0.000000) (0.330000,0.165000) (0.495000,0.165000) cm matrix of am cm = ym solve for cm 1.00 -0.00 -18.18 -0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 6.00 -42.42 42.42 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm 10.00 -54.55 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.052515, at i=37, j=37 intg fg =-0.003548, at i=37 integral=-0.070218, at i=4, j=37 integral=-0.050610, at i=39, j=37 integral=0.003721, at i=39, j=39 intg fg =-0.001419, at i=39 integral=-0.070990, at i=4, j=39 integral=-0.068021, at i=37, j=39 finished k=7 computing local stiffness matrix for triangle 8 nodes i1=5, i2=40, i3=42, area=0.013612 coord (0.330000,0.330000) (0.495000,0.495000) (0.495000,0.330000) cm matrix of am cm = ym solve for cm 15.00 -66.67 -0.00 73.46 -0.00 0.00 cm matrix of am cm = ym solve for cm 10.00 -0.00 -54.55 0.00 -0.00 73.46 cm matrix of am cm = ym solve for cm 0.00 -6.06 6.06 73.46 -146.92 73.46 tri_int1 running with np=10, nv=66 integral=-0.062534, at i=5, j=5 intg fg =-0.008630, at i=5 integral=-0.118102, at i=40, j=5 integral=-0.058290, at i=42, j=5 integral=-0.050778, at i=40, j=40 intg fg =-0.002735, at i=40 integral=-0.012303, at i=5, j=40 integral=-0.058444, at i=42, j=40 integral=-0.069079, at i=42, j=42 intg fg =-0.006324, at i=42 integral=-0.012920, at i=5, j=42 integral=-0.118874, at i=40, j=42 finished k=8 computing local stiffness matrix for triangle 9 nodes i1=5, i2=43, i3=45, area=0.013612 coord (0.330000,0.330000) (0.330000,0.495000) (0.495000,0.495000) cm matrix of am cm = ym solve for cm 15.00 -0.00 -66.67 0.00 -0.00 73.46 cm matrix of am cm = ym solve for cm 0.00 6.06 -6.06 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm 10.00 -54.55 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.133597, at i=5, j=5 intg fg =-0.009227, at i=5 integral=-0.067867, at i=43, j=5 integral=-0.051227, at i=45, j=5 integral=-0.052515, at i=43, j=43 intg fg =-0.005614, at i=43 integral=-0.070218, at i=5, j=43 integral=-0.050610, at i=45, j=43 integral=0.003721, at i=45, j=45 intg fg =-0.003324, at i=45 integral=-0.070990, at i=5, j=45 integral=-0.068021, at i=43, j=45 finished k=9 computing local stiffness matrix for triangle 10 nodes i1=6, i2=46, i3=48, area=0.014025 coord (0.330000,0.660000) (0.495000,0.830000) (0.495000,0.660000) cm matrix of am cm = ym solve for cm 15.00 -66.67 -0.00 73.46 -0.00 0.00 cm matrix of am cm = ym solve for cm 34.03 -0.00 -97.23 0.00 -0.00 69.20 cm matrix of am cm = ym solve for cm 5.20 39.57 -38.41 73.46 -142.60 69.20 tri_int1 running with np=10, nv=66 integral=-0.064429, at i=6, j=6 intg fg =-0.012978, at i=6 integral=-0.115343, at i=46, j=6 integral=-0.057072, at i=48, j=6 integral=-0.047948, at i=46, j=46 intg fg =-0.005039, at i=46 integral=-0.012675, at i=6, j=46 integral=-0.057208, at i=48, j=46 integral=-0.066196, at i=48, j=48 intg fg =-0.010442, at i=48 integral=-0.013312, at i=6, j=48 integral=-0.116115, at i=46, j=48 finished k=10 computing local stiffness matrix for triangle 11 nodes i1=6, i2=49, i3=51, area=0.014025 coord (0.330000,0.660000) (0.330000,0.830000) (0.495000,0.830000) cm matrix of am cm = ym solve for cm 42.79 0.00 -109.00 -0.00 0.00 69.20 cm matrix of am cm = ym solve for cm 8.97 51.69 -50.17 73.46 -142.60 69.20 cm matrix of am cm = ym solve for cm 10.00 -54.55 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.130767, at i=6, j=6 intg fg =-0.014329, at i=6 integral=-0.065488, at i=49, j=6 integral=-0.052780, at i=51, j=6 integral=-0.051640, at i=49, j=49 intg fg =-0.008872, at i=49 integral=-0.067460, at i=6, j=49 integral=-0.052143, at i=51, j=49 integral=0.003834, at i=51, j=51 intg fg =-0.006351, at i=51 integral=-0.068232, at i=6, j=51 integral=-0.065624, at i=49, j=51 finished k=11 computing local stiffness matrix for triangle 12 nodes i1=8, i2=52, i3=54, area=0.014025 coord (0.660000,0.000000) (0.830000,0.165000) (0.830000,0.000000) cm matrix of am cm = ym solve for cm 42.79 -109.00 0.00 69.20 -0.00 0.00 cm matrix of am cm = ym solve for cm -0.00 0.00 -6.06 -0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 34.03 -97.23 100.18 69.20 -142.60 73.46 tri_int1 running with np=10, nv=66 finished k=12 computing local stiffness matrix for triangle 13 nodes i1=8, i2=55, i3=57, area=0.014025 coord (0.660000,0.000000) (0.660000,0.165000) (0.830000,0.165000) cm matrix of am cm = ym solve for cm 1.00 0.00 -18.18 -0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 26.26 -85.47 88.06 69.20 -142.60 73.46 cm matrix of am cm = ym solve for cm 34.03 -97.23 0.00 69.20 0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.053130, at i=55, j=55 intg fg =-0.006295, at i=55 integral=-0.072346, at i=8, j=55 integral=-0.049698, at i=57, j=55 finished k=13 computing local stiffness matrix for triangle 14 nodes i1=9, i2=58, i3=60, area=0.014025 coord (0.660000,0.330000) (0.830000,0.495000) (0.830000,0.330000) cm matrix of am cm = ym solve for cm 42.79 -109.00 -0.00 69.20 -0.00 0.00 cm matrix of am cm = ym solve for cm 10.00 -0.00 -54.55 0.00 -0.00 73.46 cm matrix of am cm = ym solve for cm 8.97 -50.17 51.69 69.20 -142.60 73.46 tri_int1 running with np=10, nv=66 integral=-0.061550, at i=9, j=9 intg fg =-0.012487, at i=9 integral=-0.121680, at i=58, j=9 integral=-0.059494, at i=60, j=9 integral=-0.052317, at i=58, j=58 intg fg =-0.004726, at i=58 integral=-0.011391, at i=9, j=58 integral=-0.059672, at i=60, j=58 integral=-0.072204, at i=60, j=60 intg fg =-0.008627, at i=60 integral=-0.012008, at i=9, j=60 integral=-0.122476, at i=58, j=60 finished k=14 computing local stiffness matrix for triangle 15 nodes i1=9, i2=61, i3=63, area=0.014025 coord (0.660000,0.330000) (0.660000,0.495000) (0.830000,0.495000) cm matrix of am cm = ym solve for cm 15.00 -0.00 -66.67 0.00 -0.00 73.46 cm matrix of am cm = ym solve for cm 5.20 -38.41 39.57 69.20 -142.60 73.46 cm matrix of am cm = ym solve for cm 34.03 -97.23 0.00 69.20 0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.137645, at i=9, j=9 intg fg =-0.012492, at i=9 integral=-0.070522, at i=61, j=9 integral=-0.050315, at i=63, j=9 integral=-0.053130, at i=61, j=61 intg fg =-0.008570, at i=61 integral=-0.072346, at i=9, j=61 integral=-0.049698, at i=63, j=61 integral=0.004705, at i=63, j=63 intg fg =-0.004754, at i=63 integral=-0.073141, at i=9, j=63 integral=-0.070700, at i=61, j=63 finished k=15 computing local stiffness matrix for triangle 16 nodes i1=10, i2=64, i3=66, area=0.014450 coord (0.660000,0.660000) (0.830000,0.830000) (0.830000,0.660000) cm matrix of am cm = ym solve for cm 42.79 -109.00 -0.00 69.20 -0.00 0.00 cm matrix of am cm = ym solve for cm 34.03 0.00 -97.23 -0.00 0.00 69.20 cm matrix of am cm = ym solve for cm 0.00 -5.88 5.88 69.20 -138.41 69.20 tri_int1 running with np=10, nv=66 integral=-0.063416, at i=10, j=10 intg fg =-0.017232, at i=10 integral=-0.118838, at i=64, j=10 integral=-0.058165, at i=66, j=10 integral=-0.049401, at i=64, j=64 intg fg =-0.007303, at i=64 integral=-0.011736, at i=10, j=64 integral=-0.058324, at i=66, j=64 integral=-0.069208, at i=66, j=66 intg fg =-0.013084, at i=66 integral=-0.012372, at i=10, j=66 integral=-0.119634, at i=64, j=66 finished k=16 computing local stiffness matrix for triangle 17 nodes i1=10, i2=67, i3=69, area=0.014450 coord (0.660000,0.660000) (0.660000,0.830000) (0.830000,0.830000) cm matrix of am cm = ym solve for cm 42.79 -0.00 -109.00 0.00 -0.00 69.20 cm matrix of am cm = ym solve for cm -0.00 5.88 -5.88 69.20 -138.41 69.20 cm matrix of am cm = ym solve for cm 34.03 -97.23 0.00 69.20 0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.134729, at i=10, j=10 intg fg =-0.017996, at i=10 integral=-0.068032, at i=67, j=10 integral=-0.051840, at i=69, j=10 integral=-0.052142, at i=67, j=67 intg fg =-0.012162, at i=67 integral=-0.069504, at i=10, j=67 integral=-0.051204, at i=69, j=67 integral=0.004847, at i=69, j=69 intg fg =-0.008058, at i=69 integral=-0.070299, at i=10, j=69 integral=-0.068191, at i=67, j=69 finished k=17 computing local stiffness matrix for triangle 18 nodes i1=16, i2=5, i3=17, area=0.013613 coord (0.165000,0.165000) (0.330000,0.330000) (0.330000,0.165000) cm matrix of am cm = ym solve for cm 6.00 -42.42 0.00 73.46 0.00 -0.00 cm matrix of am cm = ym solve for cm 3.00 -0.00 -30.30 0.00 -0.00 73.46 cm matrix of am cm = ym solve for cm 0.00 -6.06 6.06 73.46 -146.92 73.46 tri_int1 running with np=10, nv=66 integral=-0.062534, at i=16, j=16 intg fg =-0.005924, at i=16 integral=-0.118102, at i=5, j=16 integral=-0.058290, at i=17, j=16 integral=-0.050778, at i=5, j=5 intg fg =-0.001347, at i=5 integral=-0.012303, at i=16, j=5 integral=-0.058444, at i=17, j=5 integral=-0.069079, at i=17, j=17 intg fg =-0.004228, at i=17 integral=-0.012920, at i=16, j=17 integral=-0.118874, at i=5, j=17 finished k=18 computing local stiffness matrix for triangle 19 nodes i1=18, i2=16, i3=17, area=0.013613 coord (0.165000,0.000000) (0.165000,0.165000) (0.330000,0.165000) cm matrix of am cm = ym solve for cm 1.00 0.00 -18.18 -0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 1.00 -18.18 18.18 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm 3.00 -30.30 0.00 73.46 -0.00 0.00 tri_int1 running with np=10, nv=66 integral=-0.052515, at i=16, j=16 intg fg =-0.002683, at i=16 integral=-0.070218, at i=18, j=16 integral=-0.050610, at i=17, j=16 integral=0.003721, at i=17, j=17 intg fg =-0.001071, at i=17 integral=-0.070990, at i=18, j=17 integral=-0.068021, at i=16, j=17 finished k=19 computing local stiffness matrix for triangle 20 nodes i1=18, i2=17, i3=4, area=0.013613 coord (0.165000,0.000000) (0.330000,0.165000) (0.330000,0.000000) cm matrix of am cm = ym solve for cm 6.00 -42.42 -0.00 73.46 0.00 -0.00 cm matrix of am cm = ym solve for cm -0.00 0.00 -6.06 -0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 3.00 -30.30 30.30 73.46 -146.92 73.46 tri_int1 running with np=10, nv=66 integral=-0.050778, at i=17, j=17 intg fg =-0.000733, at i=17 integral=-0.012303, at i=18, j=17 integral=-0.058444, at i=4, j=17 finished k=20 computing local stiffness matrix for triangle 21 nodes i1=19, i2=1, i3=20, area=0.013613 coord (0.000000,0.165000) (0.000000,0.330000) (0.165000,0.330000) cm matrix of am cm = ym solve for cm 6.00 -0.00 -42.42 0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 3.00 30.30 -30.30 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm -0.00 -6.06 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=0.003721, at i=20, j=20 intg fg =-0.001630, at i=20 integral=-0.070990, at i=19, j=20 integral=-0.068021, at i=1, j=20 finished k=21 computing local stiffness matrix for triangle 22 nodes i1=21, i2=19, i3=20, area=0.013613 coord (0.165000,0.165000) (0.000000,0.165000) (0.165000,0.330000) cm matrix of am cm = ym solve for cm 1.00 18.18 -18.18 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm 1.00 -18.18 0.00 73.46 0.00 -0.00 cm matrix of am cm = ym solve for cm 3.00 0.00 -30.30 0.00 -0.00 73.46 tri_int1 running with np=10, nv=66 integral=-0.069079, at i=21, j=21 intg fg =-0.003723, at i=21 integral=-0.012920, at i=19, j=21 integral=-0.118874, at i=20, j=21 integral=-0.050778, at i=20, j=20 intg fg =-0.000936, at i=20 integral=-0.058444, at i=21, j=20 integral=-0.012303, at i=19, j=20 finished k=22 computing local stiffness matrix for triangle 23 nodes i1=21, i2=20, i3=5, area=0.013613 coord (0.165000,0.165000) (0.165000,0.330000) (0.330000,0.330000) cm matrix of am cm = ym solve for cm 6.00 -0.00 -42.42 0.00 -0.00 73.46 cm matrix of am cm = ym solve for cm 0.00 6.06 -6.06 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm 3.00 -30.30 0.00 73.46 -0.00 0.00 tri_int1 running with np=10, nv=66 integral=-0.133597, at i=21, j=21 intg fg =-0.006472, at i=21 integral=-0.067867, at i=20, j=21 integral=-0.051227, at i=5, j=21 integral=-0.052515, at i=20, j=20 intg fg =-0.003579, at i=20 integral=-0.070218, at i=21, j=20 integral=-0.050610, at i=5, j=20 integral=0.003721, at i=5, j=5 intg fg =-0.001886, at i=5 integral=-0.070990, at i=21, j=5 integral=-0.068021, at i=20, j=5 finished k=23 computing local stiffness matrix for triangle 24 nodes i1=22, i2=6, i3=23, area=0.013613 coord (0.165000,0.495000) (0.330000,0.660000) (0.330000,0.495000) cm matrix of am cm = ym solve for cm 6.00 -42.42 0.00 73.46 0.00 -0.00 cm matrix of am cm = ym solve for cm 21.00 0.00 -78.79 -0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 6.00 42.42 -42.42 73.46 -146.92 73.46 tri_int1 running with np=10, nv=66 integral=-0.062534, at i=22, j=22 intg fg =-0.009147, at i=22 integral=-0.118102, at i=6, j=22 integral=-0.058290, at i=23, j=22 integral=-0.050778, at i=6, j=6 intg fg =-0.003095, at i=6 integral=-0.012303, at i=22, j=6 integral=-0.058444, at i=23, j=6 integral=-0.069079, at i=23, j=23 intg fg =-0.007290, at i=23 integral=-0.012920, at i=22, j=23 integral=-0.118874, at i=6, j=23 finished k=24 computing local stiffness matrix for triangle 25 nodes i1=24, i2=22, i3=23, area=0.013612 coord (0.165000,0.330000) (0.165000,0.495000) (0.330000,0.495000) cm matrix of am cm = ym solve for cm 15.00 0.00 -66.67 0.00 -0.00 73.46 cm matrix of am cm = ym solve for cm 3.00 30.30 -30.30 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm 3.00 -30.30 -0.00 73.46 -0.00 0.00 tri_int1 running with np=10, nv=66 integral=-0.133597, at i=24, j=24 intg fg =-0.008197, at i=24 integral=-0.067867, at i=22, j=24 integral=-0.051227, at i=23, j=24 integral=-0.052515, at i=22, j=22 intg fg =-0.004679, at i=22 integral=-0.070218, at i=24, j=22 integral=-0.050610, at i=23, j=22 integral=0.003721, at i=23, j=23 intg fg =-0.002905, at i=23 integral=-0.070990, at i=24, j=23 integral=-0.068021, at i=22, j=23 finished k=25 computing local stiffness matrix for triangle 26 nodes i1=24, i2=23, i3=5, area=0.013612 coord (0.165000,0.330000) (0.330000,0.495000) (0.330000,0.330000) cm matrix of am cm = ym solve for cm 6.00 -42.42 0.00 73.46 0.00 -0.00 cm matrix of am cm = ym solve for cm 10.00 -0.00 -54.55 0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 1.00 18.18 -18.18 73.46 -146.92 73.46 tri_int1 running with np=10, nv=66 integral=-0.062534, at i=24, j=24 intg fg =-0.007393, at i=24 integral=-0.118102, at i=23, j=24 integral=-0.058290, at i=5, j=24 integral=-0.050778, at i=23, j=23 intg fg =-0.002122, at i=23 integral=-0.012303, at i=24, j=23 integral=-0.058444, at i=5, j=23 integral=-0.069079, at i=5, j=5 intg fg =-0.005616, at i=5 integral=-0.012920, at i=24, j=5 integral=-0.118874, at i=23, j=5 finished k=26 computing local stiffness matrix for triangle 27 nodes i1=25, i2=2, i3=26, area=0.013613 coord (0.000000,0.495000) (0.000000,0.660000) (0.165000,0.660000) cm matrix of am cm = ym solve for cm 28.00 -0.00 -90.91 0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 21.00 78.79 -78.79 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm -0.00 -6.06 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=0.003721, at i=26, j=26 intg fg =-0.003837, at i=26 integral=-0.070990, at i=25, j=26 integral=-0.068021, at i=2, j=26 finished k=27 computing local stiffness matrix for triangle 28 nodes i1=27, i2=25, i3=26, area=0.013613 coord (0.165000,0.495000) (0.000000,0.495000) (0.165000,0.660000) cm matrix of am cm = ym solve for cm 15.00 66.67 -66.67 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm 1.00 -18.18 0.00 73.46 0.00 -0.00 cm matrix of am cm = ym solve for cm 21.00 0.00 -78.79 -0.00 0.00 73.46 tri_int1 running with np=10, nv=66 integral=-0.069079, at i=27, j=27 intg fg =-0.006716, at i=27 integral=-0.012920, at i=25, j=27 integral=-0.118874, at i=26, j=27 integral=-0.050778, at i=26, j=26 intg fg =-0.002615, at i=26 integral=-0.058444, at i=27, j=26 integral=-0.012303, at i=25, j=26 finished k=28 computing local stiffness matrix for triangle 29 nodes i1=27, i2=26, i3=6, area=0.013613 coord (0.165000,0.495000) (0.165000,0.660000) (0.330000,0.660000) cm matrix of am cm = ym solve for cm 28.00 -0.00 -90.91 0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 10.00 54.55 -54.55 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm 3.00 -30.30 -0.00 73.46 -0.00 0.00 tri_int1 running with np=10, nv=66 integral=-0.133597, at i=27, j=27 intg fg =-0.010246, at i=27 integral=-0.067867, at i=26, j=27 integral=-0.051227, at i=6, j=27 integral=-0.052515, at i=26, j=26 intg fg =-0.006015, at i=26 integral=-0.070218, at i=27, j=26 integral=-0.050610, at i=6, j=26 integral=0.003721, at i=6, j=6 intg fg =-0.004162, at i=6 integral=-0.070990, at i=27, j=6 integral=-0.068021, at i=26, j=6 finished k=29 computing local stiffness matrix for triangle 30 nodes i1=28, i2=7, i3=29, area=0.014025 coord (0.165000,0.830000) (0.330000,1.000000) (0.330000,0.830000) cm matrix of am cm = ym solve for cm 6.00 -42.42 0.00 73.46 0.00 -0.00 cm matrix of am cm = ym solve for cm 52.56 -0.00 -120.76 -0.00 0.00 69.20 cm matrix of am cm = ym solve for cm 26.26 88.06 -85.47 73.46 -142.60 69.20 tri_int1 running with np=10, nv=66 integral=-0.066196, at i=29, j=29 intg fg =-0.012150, at i=29 integral=-0.013312, at i=28, j=29 integral=-0.116115, at i=7, j=29 finished k=30 computing local stiffness matrix for triangle 31 nodes i1=30, i2=28, i3=29, area=0.014025 coord (0.165000,0.660000) (0.165000,0.830000) (0.330000,0.830000) cm matrix of am cm = ym solve for cm 42.79 -0.00 -109.00 0.00 -0.00 69.20 cm matrix of am cm = ym solve for cm 19.50 75.94 -73.70 73.46 -142.60 69.20 cm matrix of am cm = ym solve for cm 3.00 -30.30 -0.00 73.46 -0.00 0.00 tri_int1 running with np=10, nv=66 integral=-0.130767, at i=30, j=30 intg fg =-0.013194, at i=30 integral=-0.065488, at i=28, j=30 integral=-0.052780, at i=29, j=30 integral=0.003834, at i=29, j=29 intg fg =-0.005848, at i=29 integral=-0.068232, at i=30, j=29 integral=-0.065624, at i=28, j=29 finished k=31 computing local stiffness matrix for triangle 32 nodes i1=30, i2=29, i3=6, area=0.014025 coord (0.165000,0.660000) (0.330000,0.830000) (0.330000,0.660000) cm matrix of am cm = ym solve for cm 6.00 -42.42 0.00 73.46 0.00 -0.00 cm matrix of am cm = ym solve for cm 34.03 0.00 -97.23 0.00 -0.00 69.20 cm matrix of am cm = ym solve for cm 13.73 63.81 -61.94 73.46 -142.60 69.20 tri_int1 running with np=10, nv=66 integral=-0.064429, at i=30, j=30 intg fg =-0.011631, at i=30 integral=-0.115343, at i=29, j=30 integral=-0.057072, at i=6, j=30 integral=-0.047948, at i=29, j=29 intg fg =-0.004337, at i=29 integral=-0.012675, at i=30, j=29 integral=-0.057208, at i=6, j=29 integral=-0.066196, at i=6, j=6 intg fg =-0.009639, at i=6 integral=-0.013312, at i=30, j=6 integral=-0.116115, at i=29, j=6 finished k=32 computing local stiffness matrix for triangle 33 nodes i1=31, i2=3, i3=32, area=0.014025 coord (0.000000,0.830000) (0.000000,1.000000) (0.165000,1.000000) cm matrix of am cm = ym solve for cm 63.32 0.00 -132.53 0.00 -0.00 69.20 cm matrix of am cm = ym solve for cm 52.56 124.42 -120.76 73.46 -142.60 69.20 cm matrix of am cm = ym solve for cm -0.00 -6.06 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 finished k=33 computing local stiffness matrix for triangle 34 nodes i1=33, i2=31, i3=32, area=0.014025 coord (0.165000,0.830000) (0.000000,0.830000) (0.165000,1.000000) cm matrix of am cm = ym solve for cm 42.79 112.30 -109.00 73.46 -142.60 69.20 cm matrix of am cm = ym solve for cm 1.00 -18.18 0.00 73.46 0.00 -0.00 cm matrix of am cm = ym solve for cm 52.56 -0.00 -120.76 -0.00 0.00 69.20 tri_int1 running with np=10, nv=66 finished k=34 computing local stiffness matrix for triangle 35 nodes i1=33, i2=32, i3=7, area=0.014025 coord (0.165000,0.830000) (0.165000,1.000000) (0.330000,1.000000) cm matrix of am cm = ym solve for cm 63.32 0.00 -132.53 0.00 -0.00 69.20 cm matrix of am cm = ym solve for cm 34.03 100.18 -97.23 73.46 -142.60 69.20 cm matrix of am cm = ym solve for cm 3.00 -30.30 -0.00 73.46 -0.00 0.00 tri_int1 running with np=10, nv=66 finished k=35 computing local stiffness matrix for triangle 36 nodes i1=34, i2=9, i3=35, area=0.013613 coord (0.495000,0.165000) (0.660000,0.330000) (0.660000,0.165000) cm matrix of am cm = ym solve for cm 28.00 -90.91 -0.00 73.46 0.00 0.00 cm matrix of am cm = ym solve for cm 3.00 0.00 -30.30 -0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 10.00 -54.55 54.55 73.46 -146.92 73.46 tri_int1 running with np=10, nv=66 integral=-0.062534, at i=34, j=34 intg fg =-0.008617, at i=34 integral=-0.118102, at i=9, j=34 integral=-0.058290, at i=35, j=34 integral=-0.050778, at i=9, j=9 intg fg =-0.002705, at i=9 integral=-0.012303, at i=34, j=9 integral=-0.058444, at i=35, j=9 integral=-0.069079, at i=35, j=35 intg fg =-0.005777, at i=35 integral=-0.012920, at i=34, j=35 integral=-0.118874, at i=9, j=35 finished k=36 computing local stiffness matrix for triangle 37 nodes i1=36, i2=34, i3=35, area=0.013613 coord (0.495000,0.000000) (0.495000,0.165000) (0.660000,0.165000) cm matrix of am cm = ym solve for cm 1.00 -0.00 -18.18 -0.00 -0.00 73.46 cm matrix of am cm = ym solve for cm 15.00 -66.67 66.67 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm 21.00 -78.79 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.052515, at i=34, j=34 intg fg =-0.004662, at i=34 integral=-0.070218, at i=36, j=34 integral=-0.050610, at i=35, j=34 integral=0.003721, at i=35, j=35 intg fg =-0.001930, at i=35 integral=-0.070990, at i=36, j=35 integral=-0.068021, at i=34, j=35 finished k=37 computing local stiffness matrix for triangle 38 nodes i1=36, i2=35, i3=8, area=0.013613 coord (0.495000,0.000000) (0.660000,0.165000) (0.660000,0.000000) cm matrix of am cm = ym solve for cm 28.00 -90.91 -0.00 73.46 0.00 0.00 cm matrix of am cm = ym solve for cm -0.00 0.00 -6.06 -0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 21.00 -78.79 78.79 73.46 -146.92 73.46 tri_int1 running with np=10, nv=66 integral=-0.050778, at i=35, j=35 intg fg =-0.002022, at i=35 integral=-0.012303, at i=36, j=35 integral=-0.058444, at i=8, j=35 finished k=38 computing local stiffness matrix for triangle 39 nodes i1=37, i2=5, i3=38, area=0.013612 coord (0.330000,0.165000) (0.330000,0.330000) (0.495000,0.330000) cm matrix of am cm = ym solve for cm 6.00 -0.00 -42.42 -0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 1.00 -18.18 18.18 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm 10.00 -54.55 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.133597, at i=37, j=37 intg fg =-0.007467, at i=37 integral=-0.067867, at i=5, j=37 integral=-0.051227, at i=38, j=37 integral=-0.052515, at i=5, j=5 intg fg =-0.004480, at i=5 integral=-0.070218, at i=37, j=5 integral=-0.050610, at i=38, j=5 integral=0.003721, at i=38, j=38 intg fg =-0.002270, at i=38 integral=-0.070990, at i=37, j=38 integral=-0.068021, at i=5, j=38 finished k=39 computing local stiffness matrix for triangle 40 nodes i1=39, i2=37, i3=38, area=0.013612 coord (0.495000,0.165000) (0.330000,0.165000) (0.495000,0.330000) cm matrix of am cm = ym solve for cm 3.00 -30.30 30.30 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm 15.00 -66.67 -0.00 73.46 -0.00 0.00 cm matrix of am cm = ym solve for cm 3.00 -0.00 -30.30 0.00 -0.00 73.46 tri_int1 running with np=10, nv=66 integral=-0.069079, at i=39, j=39 intg fg =-0.004901, at i=39 integral=-0.012920, at i=37, j=39 integral=-0.118874, at i=38, j=39 integral=-0.062534, at i=37, j=37 intg fg =-0.007125, at i=37 integral=-0.058290, at i=39, j=37 integral=-0.118102, at i=38, j=37 integral=-0.050778, at i=38, j=38 intg fg =-0.001925, at i=38 integral=-0.058444, at i=39, j=38 integral=-0.012303, at i=37, j=38 finished k=40 computing local stiffness matrix for triangle 41 nodes i1=39, i2=38, i3=9, area=0.013613 coord (0.495000,0.165000) (0.495000,0.330000) (0.660000,0.330000) cm matrix of am cm = ym solve for cm 6.00 0.00 -42.42 -0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 6.00 -42.42 42.42 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm 21.00 -78.79 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.133597, at i=39, j=39 intg fg =-0.008712, at i=39 integral=-0.067867, at i=38, j=39 integral=-0.051227, at i=9, j=39 integral=-0.052515, at i=38, j=38 intg fg =-0.005629, at i=38 integral=-0.070218, at i=39, j=38 integral=-0.050610, at i=9, j=38 integral=0.003721, at i=9, j=9 intg fg =-0.002815, at i=9 integral=-0.070990, at i=39, j=9 integral=-0.068021, at i=38, j=9 finished k=41 computing local stiffness matrix for triangle 42 nodes i1=40, i2=10, i3=41, area=0.013613 coord (0.495000,0.495000) (0.660000,0.660000) (0.660000,0.495000) cm matrix of am cm = ym solve for cm 28.00 -90.91 -0.00 73.46 0.00 0.00 cm matrix of am cm = ym solve for cm 21.00 0.00 -78.79 -0.00 0.00 73.46 cm matrix of am cm = ym solve for cm -0.00 -6.06 6.06 73.46 -146.92 73.46 tri_int1 running with np=10, nv=66 integral=-0.062534, at i=40, j=40 intg fg =-0.011979, at i=40 integral=-0.118102, at i=10, j=40 integral=-0.058290, at i=41, j=40 integral=-0.050778, at i=10, j=10 intg fg =-0.004593, at i=10 integral=-0.012303, at i=40, j=10 integral=-0.058444, at i=41, j=10 integral=-0.069079, at i=41, j=41 intg fg =-0.008979, at i=41 integral=-0.012920, at i=40, j=41 integral=-0.118874, at i=10, j=41 finished k=42 computing local stiffness matrix for triangle 43 nodes i1=42, i2=40, i3=41, area=0.013613 coord (0.495000,0.330000) (0.495000,0.495000) (0.660000,0.495000) cm matrix of am cm = ym solve for cm 15.00 0.00 -66.67 0.00 -0.00 73.46 cm matrix of am cm = ym solve for cm 1.00 -18.18 18.18 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm 21.00 -78.79 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.133597, at i=42, j=42 intg fg =-0.010506, at i=42 integral=-0.067867, at i=40, j=42 integral=-0.051227, at i=41, j=42 integral=-0.052515, at i=40, j=40 intg fg =-0.006798, at i=40 integral=-0.070218, at i=42, j=40 integral=-0.050610, at i=41, j=40 integral=0.003721, at i=41, j=41 intg fg =-0.003904, at i=41 integral=-0.070990, at i=42, j=41 integral=-0.068021, at i=40, j=41 finished k=43 computing local stiffness matrix for triangle 44 nodes i1=42, i2=41, i3=9, area=0.013613 coord (0.495000,0.330000) (0.660000,0.495000) (0.660000,0.330000) cm matrix of am cm = ym solve for cm 28.00 -90.91 -0.00 73.46 0.00 0.00 cm matrix of am cm = ym solve for cm 10.00 0.00 -54.55 -0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 3.00 -30.30 30.30 73.46 -146.92 73.46 tri_int1 running with np=10, nv=66 integral=-0.062534, at i=42, j=42 intg fg =-0.010156, at i=42 integral=-0.118102, at i=41, j=42 integral=-0.058290, at i=9, j=42 integral=-0.050778, at i=41, j=41 intg fg =-0.003550, at i=41 integral=-0.012303, at i=42, j=41 integral=-0.058444, at i=9, j=41 integral=-0.069079, at i=9, j=9 intg fg =-0.007236, at i=9 integral=-0.012920, at i=42, j=9 integral=-0.118874, at i=41, j=9 finished k=44 computing local stiffness matrix for triangle 45 nodes i1=43, i2=6, i3=44, area=0.013613 coord (0.330000,0.495000) (0.330000,0.660000) (0.495000,0.660000) cm matrix of am cm = ym solve for cm 28.00 -0.00 -90.91 0.00 -0.00 73.46 cm matrix of am cm = ym solve for cm 3.00 30.30 -30.30 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm 10.00 -54.55 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.133597, at i=43, j=43 intg fg =-0.011311, at i=43 integral=-0.067867, at i=6, j=43 integral=-0.051227, at i=44, j=43 integral=-0.052515, at i=6, j=6 intg fg =-0.006985, at i=6 integral=-0.070218, at i=43, j=6 integral=-0.050610, at i=44, j=6 integral=0.003721, at i=44, j=44 intg fg =-0.004616, at i=44 integral=-0.070990, at i=43, j=44 integral=-0.068021, at i=6, j=44 finished k=45 computing local stiffness matrix for triangle 46 nodes i1=45, i2=43, i3=44, area=0.013613 coord (0.495000,0.495000) (0.330000,0.495000) (0.495000,0.660000) cm matrix of am cm = ym solve for cm 1.00 18.18 -18.18 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm 15.00 -66.67 -0.00 73.46 -0.00 0.00 cm matrix of am cm = ym solve for cm 21.00 0.00 -78.79 -0.00 0.00 73.46 tri_int1 running with np=10, nv=66 integral=-0.069079, at i=45, j=45 intg fg =-0.008033, at i=45 integral=-0.012920, at i=43, j=45 integral=-0.118874, at i=44, j=45 integral=-0.062534, at i=43, j=43 intg fg =-0.010418, at i=43 integral=-0.058290, at i=45, j=43 integral=-0.118102, at i=44, j=43 integral=-0.050778, at i=44, j=44 intg fg =-0.003743, at i=44 integral=-0.058444, at i=45, j=44 integral=-0.012303, at i=43, j=44 finished k=46 computing local stiffness matrix for triangle 47 nodes i1=45, i2=44, i3=10, area=0.013613 coord (0.495000,0.495000) (0.495000,0.660000) (0.660000,0.660000) cm matrix of am cm = ym solve for cm 28.00 -0.00 -90.91 0.00 -0.00 73.46 cm matrix of am cm = ym solve for cm -0.00 6.06 -6.06 73.46 -146.92 73.46 cm matrix of am cm = ym solve for cm 21.00 -78.79 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.133597, at i=45, j=45 intg fg =-0.012625, at i=45 integral=-0.067867, at i=44, j=45 integral=-0.051227, at i=10, j=45 integral=-0.052515, at i=44, j=44 intg fg =-0.008204, at i=44 integral=-0.070218, at i=45, j=44 integral=-0.050610, at i=10, j=44 integral=0.003721, at i=10, j=10 intg fg =-0.005231, at i=10 integral=-0.070990, at i=45, j=10 integral=-0.068021, at i=44, j=10 finished k=47 computing local stiffness matrix for triangle 48 nodes i1=46, i2=11, i3=47, area=0.014025 coord (0.495000,0.830000) (0.660000,1.000000) (0.660000,0.830000) cm matrix of am cm = ym solve for cm 28.00 -90.91 -0.00 73.46 0.00 0.00 cm matrix of am cm = ym solve for cm 52.56 -0.00 -120.76 -0.00 0.00 69.20 cm matrix of am cm = ym solve for cm 5.20 39.57 -38.41 73.46 -142.60 69.20 tri_int1 running with np=10, nv=66 integral=-0.064429, at i=46, j=46 intg fg =-0.017290, at i=46 integral=-0.115343, at i=11, j=46 integral=-0.057072, at i=47, j=46 integral=-0.066196, at i=47, j=47 intg fg =-0.014038, at i=47 integral=-0.013312, at i=46, j=47 integral=-0.116115, at i=11, j=47 finished k=48 computing local stiffness matrix for triangle 49 nodes i1=48, i2=46, i3=47, area=0.014025 coord (0.495000,0.660000) (0.495000,0.830000) (0.660000,0.830000) cm matrix of am cm = ym solve for cm 42.79 0.00 -109.00 0.00 -0.00 69.20 cm matrix of am cm = ym solve for cm 2.44 27.45 -26.64 73.46 -142.60 69.20 cm matrix of am cm = ym solve for cm 21.00 -78.79 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.130767, at i=48, j=48 intg fg =-0.015722, at i=48 integral=-0.065488, at i=46, j=48 integral=-0.052780, at i=47, j=48 integral=-0.051640, at i=46, j=46 intg fg =-0.010164, at i=46 integral=-0.067460, at i=48, j=46 integral=-0.052143, at i=47, j=46 integral=0.003834, at i=47, j=47 intg fg =-0.007021, at i=47 integral=-0.068232, at i=48, j=47 integral=-0.065624, at i=46, j=47 finished k=49 computing local stiffness matrix for triangle 50 nodes i1=48, i2=47, i3=10, area=0.014025 coord (0.495000,0.660000) (0.660000,0.830000) (0.660000,0.660000) cm matrix of am cm = ym solve for cm 28.00 -90.91 -0.00 73.46 0.00 0.00 cm matrix of am cm = ym solve for cm 34.03 0.00 -97.23 -0.00 0.00 69.20 cm matrix of am cm = ym solve for cm 0.67 15.33 -14.88 73.46 -142.60 69.20 tri_int1 running with np=10, nv=66 integral=-0.064429, at i=48, j=48 intg fg =-0.014624, at i=48 integral=-0.115343, at i=47, j=48 integral=-0.057072, at i=10, j=48 integral=-0.047948, at i=47, j=47 intg fg =-0.005950, at i=47 integral=-0.012675, at i=48, j=47 integral=-0.057208, at i=10, j=47 integral=-0.066196, at i=10, j=10 intg fg =-0.011454, at i=10 integral=-0.013312, at i=48, j=10 integral=-0.116115, at i=47, j=10 finished k=50 computing local stiffness matrix for triangle 51 nodes i1=49, i2=7, i3=50, area=0.014025 coord (0.330000,0.830000) (0.330000,1.000000) (0.495000,1.000000) cm matrix of am cm = ym solve for cm 63.32 -0.00 -132.53 0.00 -0.00 69.20 cm matrix of am cm = ym solve for cm 19.50 75.94 -73.70 73.46 -142.60 69.20 cm matrix of am cm = ym solve for cm 10.00 -54.55 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.130767, at i=49, j=49 intg fg =-0.017375, at i=49 integral=-0.065488, at i=7, j=49 integral=-0.052780, at i=50, j=49 finished k=51 computing local stiffness matrix for triangle 52 nodes i1=51, i2=49, i3=50, area=0.014025 coord (0.495000,0.830000) (0.330000,0.830000) (0.495000,1.000000) cm matrix of am cm = ym solve for cm 13.73 63.81 -61.94 73.46 -142.60 69.20 cm matrix of am cm = ym solve for cm 15.00 -66.67 -0.00 73.46 -0.00 0.00 cm matrix of am cm = ym solve for cm 52.56 0.00 -120.76 -0.00 -0.00 69.20 tri_int1 running with np=10, nv=66 integral=-0.066196, at i=51, j=51 intg fg =-0.012989, at i=51 integral=-0.013312, at i=49, j=51 integral=-0.116115, at i=50, j=51 integral=-0.064429, at i=49, j=49 intg fg =-0.015608, at i=49 integral=-0.057072, at i=51, j=49 integral=-0.115343, at i=50, j=49 finished k=52 computing local stiffness matrix for triangle 53 nodes i1=51, i2=50, i3=11, area=0.014025 coord (0.495000,0.830000) (0.495000,1.000000) (0.660000,1.000000) cm matrix of am cm = ym solve for cm 63.32 0.00 -132.53 0.00 -0.00 69.20 cm matrix of am cm = ym solve for cm 8.97 51.69 -50.17 73.46 -142.60 69.20 cm matrix of am cm = ym solve for cm 21.00 -78.79 0.00 73.46 -0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.130767, at i=51, j=51 intg fg =-0.018805, at i=51 integral=-0.065488, at i=50, j=51 integral=-0.052780, at i=11, j=51 finished k=53 computing local stiffness matrix for triangle 54 nodes i1=52, i2=13, i3=53, area=0.014025 coord (0.830000,0.165000) (1.000000,0.330000) (1.000000,0.165000) cm matrix of am cm = ym solve for cm 63.32 -132.53 -0.00 69.20 -0.00 0.00 cm matrix of am cm = ym solve for cm 3.00 0.00 -30.30 -0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 34.03 -97.23 100.18 69.20 -142.60 73.46 tri_int1 running with np=10, nv=66 finished k=54 computing local stiffness matrix for triangle 55 nodes i1=54, i2=52, i3=53, area=0.014025 coord (0.830000,0.000000) (0.830000,0.165000) (1.000000,0.165000) cm matrix of am cm = ym solve for cm 1.00 0.00 -18.18 0.00 -0.00 73.46 cm matrix of am cm = ym solve for cm 42.79 -109.00 112.30 69.20 -142.60 73.46 cm matrix of am cm = ym solve for cm 52.56 -120.76 0.00 69.20 0.00 -0.00 tri_int1 running with np=10, nv=66 finished k=55 computing local stiffness matrix for triangle 56 nodes i1=54, i2=53, i3=12, area=0.014025 coord (0.830000,0.000000) (1.000000,0.165000) (1.000000,0.000000) cm matrix of am cm = ym solve for cm 63.32 -132.53 0.00 69.20 -0.00 0.00 cm matrix of am cm = ym solve for cm -0.00 -0.00 -6.06 0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 52.56 -120.76 124.42 69.20 -142.60 73.46 tri_int1 running with np=10, nv=66 finished k=56 computing local stiffness matrix for triangle 57 nodes i1=55, i2=9, i3=56, area=0.014025 coord (0.660000,0.165000) (0.660000,0.330000) (0.830000,0.330000) cm matrix of am cm = ym solve for cm 6.00 0.00 -42.42 -0.00 -0.00 73.46 cm matrix of am cm = ym solve for cm 13.73 -61.94 63.81 69.20 -142.60 73.46 cm matrix of am cm = ym solve for cm 34.03 -97.23 0.00 69.20 0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.137645, at i=55, j=55 intg fg =-0.010606, at i=55 integral=-0.070522, at i=9, j=55 integral=-0.050315, at i=56, j=55 integral=-0.053130, at i=9, j=9 intg fg =-0.007328, at i=9 integral=-0.072346, at i=55, j=9 integral=-0.049698, at i=56, j=9 integral=0.004705, at i=56, j=56 intg fg =-0.003598, at i=56 integral=-0.073141, at i=55, j=56 integral=-0.070700, at i=9, j=56 finished k=57 computing local stiffness matrix for triangle 58 nodes i1=57, i2=55, i3=56, area=0.014025 coord (0.830000,0.165000) (0.660000,0.165000) (0.830000,0.330000) cm matrix of am cm = ym solve for cm 19.50 -73.70 75.94 69.20 -142.60 73.46 cm matrix of am cm = ym solve for cm 42.79 -109.00 -0.00 69.20 -0.00 0.00 cm matrix of am cm = ym solve for cm 3.00 -0.00 -30.30 -0.00 0.00 73.46 tri_int1 running with np=10, nv=66 integral=-0.061550, at i=55, j=55 intg fg =-0.010863, at i=55 integral=-0.059494, at i=57, j=55 integral=-0.121680, at i=56, j=55 integral=-0.052317, at i=56, j=56 intg fg =-0.003819, at i=56 integral=-0.059672, at i=57, j=56 integral=-0.011391, at i=55, j=56 finished k=58 computing local stiffness matrix for triangle 59 nodes i1=57, i2=56, i3=13, area=0.014025 coord (0.830000,0.165000) (0.830000,0.330000) (1.000000,0.330000) cm matrix of am cm = ym solve for cm 6.00 0.00 -42.42 -0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 26.26 -85.47 88.06 69.20 -142.60 73.46 cm matrix of am cm = ym solve for cm 52.56 -120.76 0.00 69.20 0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.053130, at i=56, j=56 intg fg =-0.009203, at i=56 integral=-0.072346, at i=57, j=56 integral=-0.049698, at i=13, j=56 finished k=59 computing local stiffness matrix for triangle 60 nodes i1=58, i2=14, i3=59, area=0.014025 coord (0.830000,0.495000) (1.000000,0.660000) (1.000000,0.495000) cm matrix of am cm = ym solve for cm 63.32 -132.53 -0.00 69.20 -0.00 0.00 cm matrix of am cm = ym solve for cm 21.00 0.00 -78.79 -0.00 -0.00 73.46 cm matrix of am cm = ym solve for cm 8.97 -50.17 51.69 69.20 -142.60 73.46 tri_int1 running with np=10, nv=66 integral=-0.061550, at i=58, j=58 intg fg =-0.016817, at i=58 integral=-0.121680, at i=14, j=58 integral=-0.059494, at i=59, j=58 finished k=60 computing local stiffness matrix for triangle 61 nodes i1=60, i2=58, i3=59, area=0.014025 coord (0.830000,0.330000) (0.830000,0.495000) (1.000000,0.495000) cm matrix of am cm = ym solve for cm 15.00 -0.00 -66.67 0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 13.73 -61.94 63.81 69.20 -142.60 73.46 cm matrix of am cm = ym solve for cm 52.56 -120.76 0.00 69.20 0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.137645, at i=60, j=60 intg fg =-0.014508, at i=60 integral=-0.070522, at i=58, j=60 integral=-0.050315, at i=59, j=60 integral=-0.053130, at i=58, j=58 intg fg =-0.010482, at i=58 integral=-0.072346, at i=60, j=58 integral=-0.049698, at i=59, j=58 finished k=61 computing local stiffness matrix for triangle 62 nodes i1=60, i2=59, i3=13, area=0.014025 coord (0.830000,0.330000) (1.000000,0.495000) (1.000000,0.330000) cm matrix of am cm = ym solve for cm 63.32 -132.53 -0.00 69.20 -0.00 0.00 cm matrix of am cm = ym solve for cm 10.00 0.00 -54.55 -0.00 -0.00 73.46 cm matrix of am cm = ym solve for cm 19.50 -73.70 75.94 69.20 -142.60 73.46 tri_int1 running with np=10, nv=66 integral=-0.061550, at i=60, j=60 intg fg =-0.014864, at i=60 integral=-0.121680, at i=59, j=60 integral=-0.059494, at i=13, j=60 finished k=62 computing local stiffness matrix for triangle 63 nodes i1=61, i2=10, i3=62, area=0.014025 coord (0.660000,0.495000) (0.660000,0.660000) (0.830000,0.660000) cm matrix of am cm = ym solve for cm 28.00 0.00 -90.91 -0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 0.67 -14.88 15.33 69.20 -142.60 73.46 cm matrix of am cm = ym solve for cm 34.03 -97.23 0.00 69.20 0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.137645, at i=61, j=61 intg fg =-0.014712, at i=61 integral=-0.070522, at i=10, j=61 integral=-0.050315, at i=62, j=61 integral=-0.053130, at i=10, j=10 intg fg =-0.010056, at i=10 integral=-0.072346, at i=61, j=10 integral=-0.049698, at i=62, j=10 integral=0.004705, at i=62, j=62 intg fg =-0.006156, at i=62 integral=-0.073141, at i=61, j=62 integral=-0.070700, at i=10, j=62 finished k=63 computing local stiffness matrix for triangle 64 nodes i1=63, i2=61, i3=62, area=0.014025 coord (0.830000,0.495000) (0.660000,0.495000) (0.830000,0.660000) cm matrix of am cm = ym solve for cm 2.44 -26.64 27.45 69.20 -142.60 73.46 cm matrix of am cm = ym solve for cm 42.79 -109.00 -0.00 69.20 -0.00 0.00 cm matrix of am cm = ym solve for cm 21.00 -0.00 -78.79 0.00 -0.00 73.46 tri_int1 running with np=10, nv=66 integral=-0.072204, at i=63, j=63 intg fg =-0.010459, at i=63 integral=-0.012008, at i=61, j=63 integral=-0.122476, at i=62, j=63 integral=-0.061550, at i=61, j=61 intg fg =-0.014404, at i=61 integral=-0.059494, at i=63, j=61 integral=-0.121680, at i=62, j=61 integral=-0.052317, at i=62, j=62 intg fg =-0.005836, at i=62 integral=-0.059672, at i=63, j=62 integral=-0.011391, at i=61, j=62 finished k=64 computing local stiffness matrix for triangle 65 nodes i1=63, i2=62, i3=14, area=0.014025 coord (0.830000,0.495000) (0.830000,0.660000) (1.000000,0.660000) cm matrix of am cm = ym solve for cm 28.00 -0.00 -90.91 0.00 0.00 73.46 cm matrix of am cm = ym solve for cm 5.20 -38.41 39.57 69.20 -142.60 73.46 cm matrix of am cm = ym solve for cm 52.56 -120.76 0.00 69.20 0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.137645, at i=63, j=63 intg fg =-0.016766, at i=63 integral=-0.070522, at i=62, j=63 integral=-0.050315, at i=14, j=63 integral=-0.053130, at i=62, j=62 intg fg =-0.012005, at i=62 integral=-0.072346, at i=63, j=62 integral=-0.049698, at i=14, j=62 finished k=65 computing local stiffness matrix for triangle 66 nodes i1=64, i2=15, i3=65, area=0.014450 coord (0.830000,0.830000) (1.000000,1.000000) (1.000000,0.830000) cm matrix of am cm = ym solve for cm 63.32 -132.53 -0.00 69.20 -0.00 0.00 cm matrix of am cm = ym solve for cm 52.56 0.00 -120.76 -0.00 0.00 69.20 cm matrix of am cm = ym solve for cm 0.00 -5.88 5.88 69.20 -138.41 69.20 tri_int1 running with np=10, nv=66 integral=-0.063416, at i=64, j=64 intg fg =-0.022586, at i=64 integral=-0.118838, at i=15, j=64 integral=-0.058165, at i=65, j=64 finished k=66 computing local stiffness matrix for triangle 67 nodes i1=66, i2=64, i3=65, area=0.014450 coord (0.830000,0.660000) (0.830000,0.830000) (1.000000,0.830000) cm matrix of am cm = ym solve for cm 42.79 0.00 -109.00 0.00 -0.00 69.20 cm matrix of am cm = ym solve for cm 1.00 -17.65 17.65 69.20 -138.41 69.20 cm matrix of am cm = ym solve for cm 52.56 -120.76 0.00 69.20 0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.134729, at i=66, j=66 intg fg =-0.020152, at i=66 integral=-0.068032, at i=64, j=66 integral=-0.051840, at i=65, j=66 integral=-0.052142, at i=64, j=64 intg fg =-0.014208, at i=64 integral=-0.069504, at i=66, j=64 integral=-0.051204, at i=65, j=64 finished k=67 computing local stiffness matrix for triangle 68 nodes i1=66, i2=65, i3=14, area=0.014450 coord (0.830000,0.660000) (1.000000,0.830000) (1.000000,0.660000) cm matrix of am cm = ym solve for cm 63.32 -132.53 -0.00 69.20 -0.00 0.00 cm matrix of am cm = ym solve for cm 34.03 -0.00 -97.23 -0.00 0.00 69.20 cm matrix of am cm = ym solve for cm 3.00 -29.41 29.41 69.20 -138.41 69.20 tri_int1 running with np=10, nv=66 integral=-0.063416, at i=66, j=66 intg fg =-0.019758, at i=66 integral=-0.118838, at i=65, j=66 integral=-0.058165, at i=14, j=66 finished k=68 computing local stiffness matrix for triangle 69 nodes i1=67, i2=11, i3=68, area=0.014450 coord (0.660000,0.830000) (0.660000,1.000000) (0.830000,1.000000) cm matrix of am cm = ym solve for cm 63.32 0.00 -132.53 -0.00 -0.00 69.20 cm matrix of am cm = ym solve for cm 3.00 29.41 -29.41 69.20 -138.41 69.20 cm matrix of am cm = ym solve for cm 34.03 -97.23 0.00 69.20 0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.134729, at i=67, j=67 intg fg =-0.021212, at i=67 integral=-0.068032, at i=11, j=67 integral=-0.051840, at i=68, j=67 finished k=69 computing local stiffness matrix for triangle 70 nodes i1=69, i2=67, i3=68, area=0.014450 coord (0.830000,0.830000) (0.660000,0.830000) (0.830000,1.000000) cm matrix of am cm = ym solve for cm 1.00 17.65 -17.65 69.20 -138.41 69.20 cm matrix of am cm = ym solve for cm 42.79 -109.00 -0.00 69.20 -0.00 0.00 cm matrix of am cm = ym solve for cm 52.56 0.00 -120.76 -0.00 0.00 69.20 tri_int1 running with np=10, nv=66 integral=-0.069208, at i=69, j=69 intg fg =-0.015785, at i=69 integral=-0.012372, at i=67, j=69 integral=-0.119634, at i=68, j=69 integral=-0.063416, at i=67, j=67 intg fg =-0.020021, at i=67 integral=-0.058165, at i=69, j=67 integral=-0.118838, at i=68, j=67 finished k=70 computing local stiffness matrix for triangle 71 nodes i1=69, i2=68, i3=15, area=0.014450 coord (0.830000,0.830000) (0.830000,1.000000) (1.000000,1.000000) cm matrix of am cm = ym solve for cm 63.32 -0.00 -132.53 0.00 -0.00 69.20 cm matrix of am cm = ym solve for cm -0.00 5.88 -5.88 69.20 -138.41 69.20 cm matrix of am cm = ym solve for cm 52.56 -120.76 0.00 69.20 0.00 -0.00 tri_int1 running with np=10, nv=66 integral=-0.134729, at i=69, j=69 intg fg =-0.023408, at i=69 integral=-0.068032, at i=68, j=69 integral=-0.051840, at i=15, j=69 finished k=71 tri 0 has vertices 0 16 18 tri 1 has vertices 0 19 21 tri 2 has vertices 1 22 24 tri 3 has vertices 1 25 27 tri 4 has vertices 2 28 30 tri 5 has vertices 2 31 33 tri 6 has vertices 4 34 36 tri 7 has vertices 4 37 39 tri 8 has vertices 5 40 42 tri 9 has vertices 5 43 45 tri 10 has vertices 6 46 48 tri 11 has vertices 6 49 51 tri 12 has vertices 8 52 54 tri 13 has vertices 8 55 57 tri 14 has vertices 9 58 60 tri 15 has vertices 9 61 63 tri 16 has vertices 10 64 66 tri 17 has vertices 10 67 69 tri 18 has vertices 16 5 17 tri 19 has vertices 18 16 17 tri 20 has vertices 18 17 4 tri 21 has vertices 19 1 20 tri 22 has vertices 21 19 20 tri 23 has vertices 21 20 5 tri 24 has vertices 22 6 23 tri 25 has vertices 24 22 23 tri 26 has vertices 24 23 5 tri 27 has vertices 25 2 26 tri 28 has vertices 27 25 26 tri 29 has vertices 27 26 6 tri 30 has vertices 28 7 29 tri 31 has vertices 30 28 29 tri 32 has vertices 30 29 6 tri 33 has vertices 31 3 32 tri 34 has vertices 33 31 32 tri 35 has vertices 33 32 7 tri 36 has vertices 34 9 35 tri 37 has vertices 36 34 35 tri 38 has vertices 36 35 8 tri 39 has vertices 37 5 38 tri 40 has vertices 39 37 38 tri 41 has vertices 39 38 9 tri 42 has vertices 40 10 41 tri 43 has vertices 42 40 41 tri 44 has vertices 42 41 9 tri 45 has vertices 43 6 44 tri 46 has vertices 45 43 44 tri 47 has vertices 45 44 10 tri 48 has vertices 46 11 47 tri 49 has vertices 48 46 47 tri 50 has vertices 48 47 10 tri 51 has vertices 49 7 50 tri 52 has vertices 51 49 50 tri 53 has vertices 51 50 11 tri 54 has vertices 52 13 53 tri 55 has vertices 54 52 53 tri 56 has vertices 54 53 12 tri 57 has vertices 55 9 56 tri 58 has vertices 57 55 56 tri 59 has vertices 57 56 13 tri 60 has vertices 58 14 59 tri 61 has vertices 60 58 59 tri 62 has vertices 60 59 13 tri 63 has vertices 61 10 62 tri 64 has vertices 63 61 62 tri 65 has vertices 63 62 14 tri 66 has vertices 64 15 65 tri 67 has vertices 66 64 65 tri 68 has vertices 66 65 14 tri 69 has vertices 67 11 68 tri 70 has vertices 69 67 68 tri 71 has vertices 69 68 15 vertices, coordinates and analytic values coordinate 0 at 0.00 , 0.00, uana=1.000000 coordinate 1 at 0.00 , 0.33, uana=1.035937 coordinate 2 at 0.00 , 0.66, uana=1.287496 coordinate 3 at 0.00 , 1.00, uana=2.000000 coordinate 4 at 0.33 , 0.00, uana=1.035937 coordinate 5 at 0.33 , 0.33, uana=1.180774 coordinate 6 at 0.33 , 0.66, uana=1.541233 coordinate 7 at 0.33 , 1.00, uana=2.365937 coordinate 8 at 0.66 , 0.00, uana=1.287496 coordinate 9 at 0.66 , 0.33, uana=1.541233 coordinate 10 at 0.66 , 0.66, uana=2.010592 coordinate 11 at 0.66 , 1.00, uana=2.947496 coordinate 12 at 1.00 , 0.00, uana=2.000000 coordinate 13 at 1.00 , 0.33, uana=2.365937 coordinate 14 at 1.00 , 0.66, uana=2.947496 coordinate 15 at 1.00 , 1.00, uana=4.000000 coordinate 16 at 0.17 , 0.17, uana=1.036209 coordinate 17 at 0.33 , 0.17, uana=1.094879 coordinate 18 at 0.17 , 0.00, uana=1.004492 coordinate 19 at 0.00 , 0.17, uana=1.004492 coordinate 20 at 0.17 , 0.33, uana=1.094879 coordinate 21 at 0.17 , 0.17, uana=1.036209 coordinate 22 at 0.17 , 0.49, uana=1.207455 coordinate 23 at 0.33 , 0.49, uana=1.320574 coordinate 24 at 0.17 , 0.33, uana=1.094879 coordinate 25 at 0.00 , 0.49, uana=1.121287 coordinate 26 at 0.17 , 0.66, uana=1.400888 coordinate 27 at 0.17 , 0.49, uana=1.207455 coordinate 28 at 0.17 , 0.83, uana=1.713229 coordinate 29 at 0.33 , 0.83, uana=1.881624 coordinate 30 at 0.17 , 0.66, uana=1.400888 coordinate 31 at 0.00 , 0.83, uana=1.571787 coordinate 32 at 0.17 , 1.00, uana=2.169492 coordinate 33 at 0.17 , 0.83, uana=1.713229 coordinate 34 at 0.49 , 0.17, uana=1.207455 coordinate 35 at 0.66 , 0.17, uana=1.400888 coordinate 36 at 0.49 , 0.00, uana=1.121287 coordinate 37 at 0.33 , 0.17, uana=1.094879 coordinate 38 at 0.49 , 0.33, uana=1.320574 coordinate 39 at 0.49 , 0.17, uana=1.207455 coordinate 40 at 0.49 , 0.49, uana=1.487600 coordinate 41 at 0.66 , 0.49, uana=1.735483 coordinate 42 at 0.49 , 0.33, uana=1.320574 coordinate 43 at 0.33 , 0.49, uana=1.320574 coordinate 44 at 0.49 , 0.66, uana=1.735483 coordinate 45 at 0.49 , 0.49, uana=1.487600 coordinate 46 at 0.49 , 0.83, uana=2.103924 coordinate 47 at 0.66 , 0.83, uana=2.407083 coordinate 48 at 0.49 , 0.66, uana=1.735483 coordinate 49 at 0.33 , 0.83, uana=1.881624 coordinate 50 at 0.49 , 1.00, uana=2.616287 coordinate 51 at 0.49 , 0.83, uana=2.103924 coordinate 52 at 0.83 , 0.17, uana=1.713229 coordinate 53 at 1.00 , 0.17, uana=2.169492 coordinate 54 at 0.83 , 0.00, uana=1.571787 coordinate 55 at 0.66 , 0.17, uana=1.400888 coordinate 56 at 0.83 , 0.33, uana=1.881624 coordinate 57 at 0.83 , 0.17, uana=1.713229 coordinate 58 at 0.83 , 0.49, uana=2.103924 coordinate 59 at 1.00 , 0.49, uana=2.616287 coordinate 60 at 0.83 , 0.33, uana=1.881624 coordinate 61 at 0.66 , 0.49, uana=1.735483 coordinate 62 at 0.83 , 0.66, uana=2.407083 coordinate 63 at 0.83 , 0.49, uana=2.103924 coordinate 64 at 0.83 , 0.83, uana=2.832474 coordinate 65 at 1.00 , 0.83, uana=3.401787 coordinate 66 at 0.83 , 0.66, uana=2.407083 coordinate 67 at 0.66 , 0.83, uana=2.407083 coordinate 68 at 0.83 , 1.00, uana=3.401787 coordinate 69 at 0.83 , 0.83, uana=2.832474 k computed stiffness matrix, if debug K(0,0)=1.000000 K(0,1)=0.000000 K(0,2)=0.000000 K(0,3)=0.000000 K(0,4)=0.000000 K(0,5)=0.000000 K(0,6)=0.000000 K(0,7)=0.000000 K(0,8)=0.000000 K(0,9)=0.000000 K(0,10)=0.000000 K(0,11)=0.000000 K(0,12)=0.000000 K(0,13)=0.000000 K(0,14)=0.000000 K(0,15)=0.000000 K(0,16)=0.000000 K(0,17)=0.000000 K(0,18)=0.000000 K(0,19)=0.000000 K(0,20)=0.000000 K(0,21)=0.000000 K(0,22)=0.000000 K(0,23)=0.000000 K(0,24)=0.000000 K(0,25)=0.000000 K(0,26)=0.000000 K(0,27)=0.000000 K(0,28)=0.000000 K(0,29)=0.000000 K(0,30)=0.000000 K(0,31)=0.000000 K(0,32)=0.000000 K(0,33)=0.000000 K(0,34)=0.000000 K(0,35)=0.000000 K(0,36)=0.000000 K(0,37)=0.000000 K(0,38)=0.000000 K(0,39)=0.000000 K(0,40)=0.000000 K(0,41)=0.000000 K(0,42)=0.000000 K(0,43)=0.000000 K(0,44)=0.000000 K(0,45)=0.000000 K(0,46)=0.000000 K(0,47)=0.000000 K(0,48)=0.000000 K(0,49)=0.000000 K(0,50)=0.000000 K(0,51)=0.000000 K(0,52)=0.000000 K(0,53)=0.000000 K(0,54)=0.000000 K(0,55)=0.000000 K(0,56)=0.000000 K(0,57)=0.000000 K(0,58)=0.000000 K(0,59)=0.000000 K(0,60)=0.000000 K(0,61)=0.000000 K(0,62)=0.000000 K(0,63)=0.000000 K(0,64)=0.000000 K(0,65)=0.000000 K(0,66)=0.000000 K(0,67)=0.000000 K(0,68)=0.000000 K(0,69)=0.000000 K(1,0)=0.000000 K(1,1)=1.000000 K(1,2)=0.000000 K(1,3)=0.000000 K(1,4)=0.000000 K(1,5)=0.000000 K(1,6)=0.000000 K(1,7)=0.000000 K(1,8)=0.000000 K(1,9)=0.000000 K(1,10)=0.000000 K(1,11)=0.000000 K(1,12)=0.000000 K(1,13)=0.000000 K(1,14)=0.000000 K(1,15)=0.000000 K(1,16)=0.000000 K(1,17)=0.000000 K(1,18)=0.000000 K(1,19)=0.000000 K(1,20)=0.000000 K(1,21)=0.000000 K(1,22)=0.000000 K(1,23)=0.000000 K(1,24)=0.000000 K(1,25)=0.000000 K(1,26)=0.000000 K(1,27)=0.000000 K(1,28)=0.000000 K(1,29)=0.000000 K(1,30)=0.000000 K(1,31)=0.000000 K(1,32)=0.000000 K(1,33)=0.000000 K(1,34)=0.000000 K(1,35)=0.000000 K(1,36)=0.000000 K(1,37)=0.000000 K(1,38)=0.000000 K(1,39)=0.000000 K(1,40)=0.000000 K(1,41)=0.000000 K(1,42)=0.000000 K(1,43)=0.000000 K(1,44)=0.000000 K(1,45)=0.000000 K(1,46)=0.000000 K(1,47)=0.000000 K(1,48)=0.000000 K(1,49)=0.000000 K(1,50)=0.000000 K(1,51)=0.000000 K(1,52)=0.000000 K(1,53)=0.000000 K(1,54)=0.000000 K(1,55)=0.000000 K(1,56)=0.000000 K(1,57)=0.000000 K(1,58)=0.000000 K(1,59)=0.000000 K(1,60)=0.000000 K(1,61)=0.000000 K(1,62)=0.000000 K(1,63)=0.000000 K(1,64)=0.000000 K(1,65)=0.000000 K(1,66)=0.000000 K(1,67)=0.000000 K(1,68)=0.000000 K(1,69)=0.000000 K(2,0)=0.000000 K(2,1)=0.000000 K(2,2)=1.000000 K(2,3)=0.000000 K(2,4)=0.000000 K(2,5)=0.000000 K(2,6)=0.000000 K(2,7)=0.000000 K(2,8)=0.000000 K(2,9)=0.000000 K(2,10)=0.000000 K(2,11)=0.000000 K(2,12)=0.000000 K(2,13)=0.000000 K(2,14)=0.000000 K(2,15)=0.000000 K(2,16)=0.000000 K(2,17)=0.000000 K(2,18)=0.000000 K(2,19)=0.000000 K(2,20)=0.000000 K(2,21)=0.000000 K(2,22)=0.000000 K(2,23)=0.000000 K(2,24)=0.000000 K(2,25)=0.000000 K(2,26)=0.000000 K(2,27)=0.000000 K(2,28)=0.000000 K(2,29)=0.000000 K(2,30)=0.000000 K(2,31)=0.000000 K(2,32)=0.000000 K(2,33)=0.000000 K(2,34)=0.000000 K(2,35)=0.000000 K(2,36)=0.000000 K(2,37)=0.000000 K(2,38)=0.000000 K(2,39)=0.000000 K(2,40)=0.000000 K(2,41)=0.000000 K(2,42)=0.000000 K(2,43)=0.000000 K(2,44)=0.000000 K(2,45)=0.000000 K(2,46)=0.000000 K(2,47)=0.000000 K(2,48)=0.000000 K(2,49)=0.000000 K(2,50)=0.000000 K(2,51)=0.000000 K(2,52)=0.000000 K(2,53)=0.000000 K(2,54)=0.000000 K(2,55)=0.000000 K(2,56)=0.000000 K(2,57)=0.000000 K(2,58)=0.000000 K(2,59)=0.000000 K(2,60)=0.000000 K(2,61)=0.000000 K(2,62)=0.000000 K(2,63)=0.000000 K(2,64)=0.000000 K(2,65)=0.000000 K(2,66)=0.000000 K(2,67)=0.000000 K(2,68)=0.000000 K(2,69)=0.000000 K(3,0)=0.000000 K(3,1)=0.000000 K(3,2)=0.000000 K(3,3)=1.000000 K(3,4)=0.000000 K(3,5)=0.000000 K(3,6)=0.000000 K(3,7)=0.000000 K(3,8)=0.000000 K(3,9)=0.000000 K(3,10)=0.000000 K(3,11)=0.000000 K(3,12)=0.000000 K(3,13)=0.000000 K(3,14)=0.000000 K(3,15)=0.000000 K(3,16)=0.000000 K(3,17)=0.000000 K(3,18)=0.000000 K(3,19)=0.000000 K(3,20)=0.000000 K(3,21)=0.000000 K(3,22)=0.000000 K(3,23)=0.000000 K(3,24)=0.000000 K(3,25)=0.000000 K(3,26)=0.000000 K(3,27)=0.000000 K(3,28)=0.000000 K(3,29)=0.000000 K(3,30)=0.000000 K(3,31)=0.000000 K(3,32)=0.000000 K(3,33)=0.000000 K(3,34)=0.000000 K(3,35)=0.000000 K(3,36)=0.000000 K(3,37)=0.000000 K(3,38)=0.000000 K(3,39)=0.000000 K(3,40)=0.000000 K(3,41)=0.000000 K(3,42)=0.000000 K(3,43)=0.000000 K(3,44)=0.000000 K(3,45)=0.000000 K(3,46)=0.000000 K(3,47)=0.000000 K(3,48)=0.000000 K(3,49)=0.000000 K(3,50)=0.000000 K(3,51)=0.000000 K(3,52)=0.000000 K(3,53)=0.000000 K(3,54)=0.000000 K(3,55)=0.000000 K(3,56)=0.000000 K(3,57)=0.000000 K(3,58)=0.000000 K(3,59)=0.000000 K(3,60)=0.000000 K(3,61)=0.000000 K(3,62)=0.000000 K(3,63)=0.000000 K(3,64)=0.000000 K(3,65)=0.000000 K(3,66)=0.000000 K(3,67)=0.000000 K(3,68)=0.000000 K(3,69)=0.000000 K(4,0)=0.000000 K(4,1)=0.000000 K(4,2)=0.000000 K(4,3)=0.000000 K(4,4)=1.000000 K(4,5)=0.000000 K(4,6)=0.000000 K(4,7)=0.000000 K(4,8)=0.000000 K(4,9)=0.000000 K(4,10)=0.000000 K(4,11)=0.000000 K(4,12)=0.000000 K(4,13)=0.000000 K(4,14)=0.000000 K(4,15)=0.000000 K(4,16)=0.000000 K(4,17)=0.000000 K(4,18)=0.000000 K(4,19)=0.000000 K(4,20)=0.000000 K(4,21)=0.000000 K(4,22)=0.000000 K(4,23)=0.000000 K(4,24)=0.000000 K(4,25)=0.000000 K(4,26)=0.000000 K(4,27)=0.000000 K(4,28)=0.000000 K(4,29)=0.000000 K(4,30)=0.000000 K(4,31)=0.000000 K(4,32)=0.000000 K(4,33)=0.000000 K(4,34)=0.000000 K(4,35)=0.000000 K(4,36)=0.000000 K(4,37)=0.000000 K(4,38)=0.000000 K(4,39)=0.000000 K(4,40)=0.000000 K(4,41)=0.000000 K(4,42)=0.000000 K(4,43)=0.000000 K(4,44)=0.000000 K(4,45)=0.000000 K(4,46)=0.000000 K(4,47)=0.000000 K(4,48)=0.000000 K(4,49)=0.000000 K(4,50)=0.000000 K(4,51)=0.000000 K(4,52)=0.000000 K(4,53)=0.000000 K(4,54)=0.000000 K(4,55)=0.000000 K(4,56)=0.000000 K(4,57)=0.000000 K(4,58)=0.000000 K(4,59)=0.000000 K(4,60)=0.000000 K(4,61)=0.000000 K(4,62)=0.000000 K(4,63)=0.000000 K(4,64)=0.000000 K(4,65)=0.000000 K(4,66)=0.000000 K(4,67)=0.000000 K(4,68)=0.000000 K(4,69)=0.000000 K(5,0)=0.000000 K(5,1)=0.000000 K(5,2)=0.000000 K(5,3)=0.000000 K(5,4)=0.000000 K(5,5)=-0.364781 K(5,6)=0.000000 K(5,7)=0.000000 K(5,8)=0.000000 K(5,9)=0.000000 K(5,10)=0.000000 K(5,11)=0.000000 K(5,12)=0.000000 K(5,13)=0.000000 K(5,14)=0.000000 K(5,15)=0.000000 K(5,16)=-0.012303 K(5,17)=-0.058444 K(5,18)=0.000000 K(5,19)=0.000000 K(5,20)=-0.068021 K(5,21)=-0.070990 K(5,22)=0.000000 K(5,23)=-0.118874 K(5,24)=-0.012920 K(5,25)=0.000000 K(5,26)=0.000000 K(5,27)=0.000000 K(5,28)=0.000000 K(5,29)=0.000000 K(5,30)=0.000000 K(5,31)=0.000000 K(5,32)=0.000000 K(5,33)=0.000000 K(5,34)=0.000000 K(5,35)=0.000000 K(5,36)=0.000000 K(5,37)=-0.070218 K(5,38)=-0.050610 K(5,39)=0.000000 K(5,40)=-0.118102 K(5,41)=0.000000 K(5,42)=-0.058290 K(5,43)=-0.067867 K(5,44)=0.000000 K(5,45)=-0.051227 K(5,46)=0.000000 K(5,47)=0.000000 K(5,48)=0.000000 K(5,49)=0.000000 K(5,50)=0.000000 K(5,51)=0.000000 K(5,52)=0.000000 K(5,53)=0.000000 K(5,54)=0.000000 K(5,55)=0.000000 K(5,56)=0.000000 K(5,57)=0.000000 K(5,58)=0.000000 K(5,59)=0.000000 K(5,60)=0.000000 K(5,61)=0.000000 K(5,62)=0.000000 K(5,63)=0.000000 K(5,64)=0.000000 K(5,65)=0.000000 K(5,66)=0.000000 K(5,67)=0.000000 K(5,68)=0.000000 K(5,69)=0.000000 K(6,0)=0.000000 K(6,1)=0.000000 K(6,2)=0.000000 K(6,3)=0.000000 K(6,4)=0.000000 K(6,5)=0.000000 K(6,6)=-0.360963 K(6,7)=0.000000 K(6,8)=0.000000 K(6,9)=0.000000 K(6,10)=0.000000 K(6,11)=0.000000 K(6,12)=0.000000 K(6,13)=0.000000 K(6,14)=0.000000 K(6,15)=0.000000 K(6,16)=0.000000 K(6,17)=0.000000 K(6,18)=0.000000 K(6,19)=0.000000 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K(46,5)=0.000000 K(46,6)=-0.012675 K(46,7)=0.000000 K(46,8)=0.000000 K(46,9)=0.000000 K(46,10)=0.000000 K(46,11)=-0.115343 K(46,12)=0.000000 K(46,13)=0.000000 K(46,14)=0.000000 K(46,15)=0.000000 K(46,16)=0.000000 K(46,17)=0.000000 K(46,18)=0.000000 K(46,19)=0.000000 K(46,20)=0.000000 K(46,21)=0.000000 K(46,22)=0.000000 K(46,23)=0.000000 K(46,24)=0.000000 K(46,25)=0.000000 K(46,26)=0.000000 K(46,27)=0.000000 K(46,28)=0.000000 K(46,29)=0.000000 K(46,30)=0.000000 K(46,31)=0.000000 K(46,32)=0.000000 K(46,33)=0.000000 K(46,34)=0.000000 K(46,35)=0.000000 K(46,36)=0.000000 K(46,37)=0.000000 K(46,38)=0.000000 K(46,39)=0.000000 K(46,40)=0.000000 K(46,41)=0.000000 K(46,42)=0.000000 K(46,43)=0.000000 K(46,44)=0.000000 K(46,45)=0.000000 K(46,46)=-0.164017 K(46,47)=-0.109216 K(46,48)=-0.124668 K(46,49)=0.000000 K(46,50)=0.000000 K(46,51)=0.000000 K(46,52)=0.000000 K(46,53)=0.000000 K(46,54)=0.000000 K(46,55)=0.000000 K(46,56)=0.000000 K(46,57)=0.000000 K(46,58)=0.000000 K(46,59)=0.000000 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K(61,11)=0.000000 K(61,12)=0.000000 K(61,13)=0.000000 K(61,14)=0.000000 K(61,15)=0.000000 K(61,16)=0.000000 K(61,17)=0.000000 K(61,18)=0.000000 K(61,19)=0.000000 K(61,20)=0.000000 K(61,21)=0.000000 K(61,22)=0.000000 K(61,23)=0.000000 K(61,24)=0.000000 K(61,25)=0.000000 K(61,26)=0.000000 K(61,27)=0.000000 K(61,28)=0.000000 K(61,29)=0.000000 K(61,30)=0.000000 K(61,31)=0.000000 K(61,32)=0.000000 K(61,33)=0.000000 K(61,34)=0.000000 K(61,35)=0.000000 K(61,36)=0.000000 K(61,37)=0.000000 K(61,38)=0.000000 K(61,39)=0.000000 K(61,40)=0.000000 K(61,41)=0.000000 K(61,42)=0.000000 K(61,43)=0.000000 K(61,44)=0.000000 K(61,45)=0.000000 K(61,46)=0.000000 K(61,47)=0.000000 K(61,48)=0.000000 K(61,49)=0.000000 K(61,50)=0.000000 K(61,51)=0.000000 K(61,52)=0.000000 K(61,53)=0.000000 K(61,54)=0.000000 K(61,55)=0.000000 K(61,56)=0.000000 K(61,57)=0.000000 K(61,58)=0.000000 K(61,59)=0.000000 K(61,60)=0.000000 K(61,61)=-0.252326 K(61,62)=-0.171996 K(61,63)=-0.109192 K(61,64)=0.000000 K(61,65)=0.000000 K(61,66)=0.000000 K(61,67)=0.000000 K(61,68)=0.000000 K(61,69)=0.000000 K(62,0)=0.000000 K(62,1)=0.000000 K(62,2)=0.000000 K(62,3)=0.000000 K(62,4)=0.000000 K(62,5)=0.000000 K(62,6)=0.000000 K(62,7)=0.000000 K(62,8)=0.000000 K(62,9)=0.000000 K(62,10)=-0.070700 K(62,11)=0.000000 K(62,12)=0.000000 K(62,13)=0.000000 K(62,14)=-0.049698 K(62,15)=0.000000 K(62,16)=0.000000 K(62,17)=0.000000 K(62,18)=0.000000 K(62,19)=0.000000 K(62,20)=0.000000 K(62,21)=0.000000 K(62,22)=0.000000 K(62,23)=0.000000 K(62,24)=0.000000 K(62,25)=0.000000 K(62,26)=0.000000 K(62,27)=0.000000 K(62,28)=0.000000 K(62,29)=0.000000 K(62,30)=0.000000 K(62,31)=0.000000 K(62,32)=0.000000 K(62,33)=0.000000 K(62,34)=0.000000 K(62,35)=0.000000 K(62,36)=0.000000 K(62,37)=0.000000 K(62,38)=0.000000 K(62,39)=0.000000 K(62,40)=0.000000 K(62,41)=0.000000 K(62,42)=0.000000 K(62,43)=0.000000 K(62,44)=0.000000 K(62,45)=0.000000 K(62,46)=0.000000 K(62,47)=0.000000 K(62,48)=0.000000 K(62,49)=0.000000 K(62,50)=0.000000 K(62,51)=0.000000 K(62,52)=0.000000 K(62,53)=0.000000 K(62,54)=0.000000 K(62,55)=0.000000 K(62,56)=0.000000 K(62,57)=0.000000 K(62,58)=0.000000 K(62,59)=0.000000 K(62,60)=0.000000 K(62,61)=-0.084532 K(62,62)=-0.100742 K(62,63)=-0.132018 K(62,64)=0.000000 K(62,65)=0.000000 K(62,66)=0.000000 K(62,67)=0.000000 K(62,68)=0.000000 K(62,69)=0.000000 K(63,0)=0.000000 K(63,1)=0.000000 K(63,2)=0.000000 K(63,3)=0.000000 K(63,4)=0.000000 K(63,5)=0.000000 K(63,6)=0.000000 K(63,7)=0.000000 K(63,8)=0.000000 K(63,9)=-0.073141 K(63,10)=0.000000 K(63,11)=0.000000 K(63,12)=0.000000 K(63,13)=0.000000 K(63,14)=-0.050315 K(63,15)=0.000000 K(63,16)=0.000000 K(63,17)=0.000000 K(63,18)=0.000000 K(63,19)=0.000000 K(63,20)=0.000000 K(63,21)=0.000000 K(63,22)=0.000000 K(63,23)=0.000000 K(63,24)=0.000000 K(63,25)=0.000000 K(63,26)=0.000000 K(63,27)=0.000000 K(63,28)=0.000000 K(63,29)=0.000000 K(63,30)=0.000000 K(63,31)=0.000000 K(63,32)=0.000000 K(63,33)=0.000000 K(63,34)=0.000000 K(63,35)=0.000000 K(63,36)=0.000000 K(63,37)=0.000000 K(63,38)=0.000000 K(63,39)=0.000000 K(63,40)=0.000000 K(63,41)=0.000000 K(63,42)=0.000000 K(63,43)=0.000000 K(63,44)=0.000000 K(63,45)=0.000000 K(63,46)=0.000000 K(63,47)=0.000000 K(63,48)=0.000000 K(63,49)=0.000000 K(63,50)=0.000000 K(63,51)=0.000000 K(63,52)=0.000000 K(63,53)=0.000000 K(63,54)=0.000000 K(63,55)=0.000000 K(63,56)=0.000000 K(63,57)=0.000000 K(63,58)=0.000000 K(63,59)=0.000000 K(63,60)=0.000000 K(63,61)=-0.082708 K(63,62)=-0.192998 K(63,63)=-0.205144 K(63,64)=0.000000 K(63,65)=0.000000 K(63,66)=0.000000 K(63,67)=0.000000 K(63,68)=0.000000 K(63,69)=0.000000 K(64,0)=0.000000 K(64,1)=0.000000 K(64,2)=0.000000 K(64,3)=0.000000 K(64,4)=0.000000 K(64,5)=0.000000 K(64,6)=0.000000 K(64,7)=0.000000 K(64,8)=0.000000 K(64,9)=0.000000 K(64,10)=-0.011736 K(64,11)=0.000000 K(64,12)=0.000000 K(64,13)=0.000000 K(64,14)=0.000000 K(64,15)=-0.118838 K(64,16)=0.000000 K(64,17)=0.000000 K(64,18)=0.000000 K(64,19)=0.000000 K(64,20)=0.000000 K(64,21)=0.000000 K(64,22)=0.000000 K(64,23)=0.000000 K(64,24)=0.000000 K(64,25)=0.000000 K(64,26)=0.000000 K(64,27)=0.000000 K(64,28)=0.000000 K(64,29)=0.000000 K(64,30)=0.000000 K(64,31)=0.000000 K(64,32)=0.000000 K(64,33)=0.000000 K(64,34)=0.000000 K(64,35)=0.000000 K(64,36)=0.000000 K(64,37)=0.000000 K(64,38)=0.000000 K(64,39)=0.000000 K(64,40)=0.000000 K(64,41)=0.000000 K(64,42)=0.000000 K(64,43)=0.000000 K(64,44)=0.000000 K(64,45)=0.000000 K(64,46)=0.000000 K(64,47)=0.000000 K(64,48)=0.000000 K(64,49)=0.000000 K(64,50)=0.000000 K(64,51)=0.000000 K(64,52)=0.000000 K(64,53)=0.000000 K(64,54)=0.000000 K(64,55)=0.000000 K(64,56)=0.000000 K(64,57)=0.000000 K(64,58)=0.000000 K(64,59)=0.000000 K(64,60)=0.000000 K(64,61)=0.000000 K(64,62)=0.000000 K(64,63)=0.000000 K(64,64)=-0.164958 K(64,65)=-0.109369 K(64,66)=-0.127828 K(64,67)=0.000000 K(64,68)=0.000000 K(64,69)=0.000000 K(65,0)=0.000000 K(65,1)=0.000000 K(65,2)=0.000000 K(65,3)=0.000000 K(65,4)=0.000000 K(65,5)=0.000000 K(65,6)=0.000000 K(65,7)=0.000000 K(65,8)=0.000000 K(65,9)=0.000000 K(65,10)=0.000000 K(65,11)=0.000000 K(65,12)=0.000000 K(65,13)=0.000000 K(65,14)=0.000000 K(65,15)=0.000000 K(65,16)=0.000000 K(65,17)=0.000000 K(65,18)=0.000000 K(65,19)=0.000000 K(65,20)=0.000000 K(65,21)=0.000000 K(65,22)=0.000000 K(65,23)=0.000000 K(65,24)=0.000000 K(65,25)=0.000000 K(65,26)=0.000000 K(65,27)=0.000000 K(65,28)=0.000000 K(65,29)=0.000000 K(65,30)=0.000000 K(65,31)=0.000000 K(65,32)=0.000000 K(65,33)=0.000000 K(65,34)=0.000000 K(65,35)=0.000000 K(65,36)=0.000000 K(65,37)=0.000000 K(65,38)=0.000000 K(65,39)=0.000000 K(65,40)=0.000000 K(65,41)=0.000000 K(65,42)=0.000000 K(65,43)=0.000000 K(65,44)=0.000000 K(65,45)=0.000000 K(65,46)=0.000000 K(65,47)=0.000000 K(65,48)=0.000000 K(65,49)=0.000000 K(65,50)=0.000000 K(65,51)=0.000000 K(65,52)=0.000000 K(65,53)=0.000000 K(65,54)=0.000000 K(65,55)=0.000000 K(65,56)=0.000000 K(65,57)=0.000000 K(65,58)=0.000000 K(65,59)=0.000000 K(65,60)=0.000000 K(65,61)=0.000000 K(65,62)=0.000000 K(65,63)=0.000000 K(65,64)=0.000000 K(65,65)=1.000000 K(65,66)=0.000000 K(65,67)=0.000000 K(65,68)=0.000000 K(65,69)=0.000000 K(66,0)=0.000000 K(66,1)=0.000000 K(66,2)=0.000000 K(66,3)=0.000000 K(66,4)=0.000000 K(66,5)=0.000000 K(66,6)=0.000000 K(66,7)=0.000000 K(66,8)=0.000000 K(66,9)=0.000000 K(66,10)=-0.012372 K(66,11)=0.000000 K(66,12)=0.000000 K(66,13)=0.000000 K(66,14)=-0.058165 K(66,15)=0.000000 K(66,16)=0.000000 K(66,17)=0.000000 K(66,18)=0.000000 K(66,19)=0.000000 K(66,20)=0.000000 K(66,21)=0.000000 K(66,22)=0.000000 K(66,23)=0.000000 K(66,24)=0.000000 K(66,25)=0.000000 K(66,26)=0.000000 K(66,27)=0.000000 K(66,28)=0.000000 K(66,29)=0.000000 K(66,30)=0.000000 K(66,31)=0.000000 K(66,32)=0.000000 K(66,33)=0.000000 K(66,34)=0.000000 K(66,35)=0.000000 K(66,36)=0.000000 K(66,37)=0.000000 K(66,38)=0.000000 K(66,39)=0.000000 K(66,40)=0.000000 K(66,41)=0.000000 K(66,42)=0.000000 K(66,43)=0.000000 K(66,44)=0.000000 K(66,45)=0.000000 K(66,46)=0.000000 K(66,47)=0.000000 K(66,48)=0.000000 K(66,49)=0.000000 K(66,50)=0.000000 K(66,51)=0.000000 K(66,52)=0.000000 K(66,53)=0.000000 K(66,54)=0.000000 K(66,55)=0.000000 K(66,56)=0.000000 K(66,57)=0.000000 K(66,58)=0.000000 K(66,59)=0.000000 K(66,60)=0.000000 K(66,61)=0.000000 K(66,62)=0.000000 K(66,63)=0.000000 K(66,64)=-0.187666 K(66,65)=-0.170678 K(66,66)=-0.267352 K(66,67)=0.000000 K(66,68)=0.000000 K(66,69)=0.000000 K(67,0)=0.000000 K(67,1)=0.000000 K(67,2)=0.000000 K(67,3)=0.000000 K(67,4)=0.000000 K(67,5)=0.000000 K(67,6)=0.000000 K(67,7)=0.000000 K(67,8)=0.000000 K(67,9)=0.000000 K(67,10)=-0.069504 K(67,11)=-0.068032 K(67,12)=0.000000 K(67,13)=0.000000 K(67,14)=0.000000 K(67,15)=0.000000 K(67,16)=0.000000 K(67,17)=0.000000 K(67,18)=0.000000 K(67,19)=0.000000 K(67,20)=0.000000 K(67,21)=0.000000 K(67,22)=0.000000 K(67,23)=0.000000 K(67,24)=0.000000 K(67,25)=0.000000 K(67,26)=0.000000 K(67,27)=0.000000 K(67,28)=0.000000 K(67,29)=0.000000 K(67,30)=0.000000 K(67,31)=0.000000 K(67,32)=0.000000 K(67,33)=0.000000 K(67,34)=0.000000 K(67,35)=0.000000 K(67,36)=0.000000 K(67,37)=0.000000 K(67,38)=0.000000 K(67,39)=0.000000 K(67,40)=0.000000 K(67,41)=0.000000 K(67,42)=0.000000 K(67,43)=0.000000 K(67,44)=0.000000 K(67,45)=0.000000 K(67,46)=0.000000 K(67,47)=0.000000 K(67,48)=0.000000 K(67,49)=0.000000 K(67,50)=0.000000 K(67,51)=0.000000 K(67,52)=0.000000 K(67,53)=0.000000 K(67,54)=0.000000 K(67,55)=0.000000 K(67,56)=0.000000 K(67,57)=0.000000 K(67,58)=0.000000 K(67,59)=0.000000 K(67,60)=0.000000 K(67,61)=0.000000 K(67,62)=0.000000 K(67,63)=0.000000 K(67,64)=0.000000 K(67,65)=0.000000 K(67,66)=0.000000 K(67,67)=-0.250287 K(67,68)=-0.170678 K(67,69)=-0.109369 K(68,0)=0.000000 K(68,1)=0.000000 K(68,2)=0.000000 K(68,3)=0.000000 K(68,4)=0.000000 K(68,5)=0.000000 K(68,6)=0.000000 K(68,7)=0.000000 K(68,8)=0.000000 K(68,9)=0.000000 K(68,10)=0.000000 K(68,11)=0.000000 K(68,12)=0.000000 K(68,13)=0.000000 K(68,14)=0.000000 K(68,15)=0.000000 K(68,16)=0.000000 K(68,17)=0.000000 K(68,18)=0.000000 K(68,19)=0.000000 K(68,20)=0.000000 K(68,21)=0.000000 K(68,22)=0.000000 K(68,23)=0.000000 K(68,24)=0.000000 K(68,25)=0.000000 K(68,26)=0.000000 K(68,27)=0.000000 K(68,28)=0.000000 K(68,29)=0.000000 K(68,30)=0.000000 K(68,31)=0.000000 K(68,32)=0.000000 K(68,33)=0.000000 K(68,34)=0.000000 K(68,35)=0.000000 K(68,36)=0.000000 K(68,37)=0.000000 K(68,38)=0.000000 K(68,39)=0.000000 K(68,40)=0.000000 K(68,41)=0.000000 K(68,42)=0.000000 K(68,43)=0.000000 K(68,44)=0.000000 K(68,45)=0.000000 K(68,46)=0.000000 K(68,47)=0.000000 K(68,48)=0.000000 K(68,49)=0.000000 K(68,50)=0.000000 K(68,51)=0.000000 K(68,52)=0.000000 K(68,53)=0.000000 K(68,54)=0.000000 K(68,55)=0.000000 K(68,56)=0.000000 K(68,57)=0.000000 K(68,58)=0.000000 K(68,59)=0.000000 K(68,60)=0.000000 K(68,61)=0.000000 K(68,62)=0.000000 K(68,63)=0.000000 K(68,64)=0.000000 K(68,65)=0.000000 K(68,66)=0.000000 K(68,67)=0.000000 K(68,68)=1.000000 K(68,69)=0.000000 K(69,0)=0.000000 K(69,1)=0.000000 K(69,2)=0.000000 K(69,3)=0.000000 K(69,4)=0.000000 K(69,5)=0.000000 K(69,6)=0.000000 K(69,7)=0.000000 K(69,8)=0.000000 K(69,9)=0.000000 K(69,10)=-0.070299 K(69,11)=0.000000 K(69,12)=0.000000 K(69,13)=0.000000 K(69,14)=0.000000 K(69,15)=-0.051840 K(69,16)=0.000000 K(69,17)=0.000000 K(69,18)=0.000000 K(69,19)=0.000000 K(69,20)=0.000000 K(69,21)=0.000000 K(69,22)=0.000000 K(69,23)=0.000000 K(69,24)=0.000000 K(69,25)=0.000000 K(69,26)=0.000000 K(69,27)=0.000000 K(69,28)=0.000000 K(69,29)=0.000000 K(69,30)=0.000000 K(69,31)=0.000000 K(69,32)=0.000000 K(69,33)=0.000000 K(69,34)=0.000000 K(69,35)=0.000000 K(69,36)=0.000000 K(69,37)=0.000000 K(69,38)=0.000000 K(69,39)=0.000000 K(69,40)=0.000000 K(69,41)=0.000000 K(69,42)=0.000000 K(69,43)=0.000000 K(69,44)=0.000000 K(69,45)=0.000000 K(69,46)=0.000000 K(69,47)=0.000000 K(69,48)=0.000000 K(69,49)=0.000000 K(69,50)=0.000000 K(69,51)=0.000000 K(69,52)=0.000000 K(69,53)=0.000000 K(69,54)=0.000000 K(69,55)=0.000000 K(69,56)=0.000000 K(69,57)=0.000000 K(69,58)=0.000000 K(69,59)=0.000000 K(69,60)=0.000000 K(69,61)=0.000000 K(69,62)=0.000000 K(69,63)=0.000000 K(69,64)=0.000000 K(69,65)=0.000000 K(69,66)=0.000000 K(69,67)=-0.080564 K(69,68)=-0.187666 K(69,69)=-0.199090 f computed forcing function and boundary, if debug F(0)=1.000000, ug[0]=0.000000 F(1)=1.035937, ug[1]=0.000000 F(2)=1.287496, ug[2]=0.000000 F(3)=2.000000, ug[3]=0.000000 F(4)=1.035937, ug[4]=0.000000 F(5)=-0.031185, ug[5]=0.000000 F(6)=-0.051188, ug[6]=0.000000 F(7)=2.365937, ug[7]=0.000000 F(8)=1.287496, ug[8]=0.000000 F(9)=-0.045063, ug[9]=0.000000 F(10)=-0.066561, ug[10]=0.000000 F(11)=2.947496, ug[11]=0.000000 F(12)=2.000000, ug[12]=0.000000 F(13)=2.365937, ug[13]=0.000000 F(14)=2.947496, ug[14]=0.000000 F(15)=4.000000, ug[15]=0.000000 F(16)=-0.008965, ug[16]=0.000000 F(17)=-0.006032, ug[17]=0.000000 F(18)=1.004492, ug[18]=0.000000 F(19)=1.004492, ug[19]=0.000000 F(20)=-0.006146, ug[20]=0.000000 F(21)=-0.011045, ug[21]=0.000000 F(22)=-0.015502, ug[22]=0.000000 F(23)=-0.012318, ug[23]=0.000000 F(24)=-0.020667, ug[24]=0.000000 F(25)=1.121287, ug[25]=0.000000 F(26)=-0.012466, ug[26]=0.000000 F(27)=-0.019576, ug[27]=0.000000 F(28)=1.713229, ug[28]=0.000000 F(29)=-0.022335, ug[29]=0.000000 F(30)=-0.033835, ug[30]=0.000000 F(31)=1.571787, ug[31]=0.000000 F(32)=2.169492, ug[32]=0.000000 F(33)=1.713229, ug[33]=0.000000 F(34)=-0.014556, ug[34]=0.000000 F(35)=-0.009729, ug[35]=0.000000 F(36)=1.121287, ug[36]=0.000000 F(37)=-0.018141, ug[37]=0.000000 F(38)=-0.009823, ug[38]=0.000000 F(39)=-0.015032, ug[39]=0.000000 F(40)=-0.021512, ug[40]=0.000000 F(41)=-0.016434, ug[41]=0.000000 F(42)=-0.026986, ug[42]=0.000000 F(43)=-0.027342, ug[43]=0.000000 F(44)=-0.016562, ug[44]=0.000000 F(45)=-0.023982, ug[45]=0.000000 F(46)=-0.032493, ug[46]=0.000000 F(47)=-0.027009, ug[47]=0.000000 F(48)=-0.040787, ug[48]=0.000000 F(49)=-0.041855, ug[49]=0.000000 F(50)=2.616287, ug[50]=0.000000 F(51)=-0.038145, ug[51]=0.000000 F(52)=1.713229, ug[52]=0.000000 F(53)=2.169492, ug[53]=0.000000 F(54)=1.571787, ug[54]=0.000000 F(55)=-0.027764, ug[55]=0.000000 F(56)=-0.016621, ug[56]=0.000000 F(57)=1.713229, ug[57]=0.000000 F(58)=-0.032026, ug[58]=0.000000 F(59)=2.616287, ug[59]=0.000000 F(60)=-0.037999, ug[60]=0.000000 F(61)=-0.037686, ug[61]=0.000000 F(62)=-0.023996, ug[62]=0.000000 F(63)=-0.031979, ug[63]=0.000000 F(64)=-0.044097, ug[64]=0.000000 F(65)=3.401787, ug[65]=0.000000 F(66)=-0.052994, ug[66]=0.000000 F(67)=-0.053394, ug[67]=0.000000 F(68)=3.401787, ug[68]=0.000000 F(69)=-0.047250, ug[69]=0.000000 ug computed Galerkin, Ua analytic, error ug[0]= 1.000, Ua= 1.000, err=0 ug[1]= 1.036, Ua= 1.036, err=0 ug[2]= 1.287, Ua= 1.287, err=0 ug[3]= 2.000, Ua= 2.000, err=0 ug[4]= 1.036, Ua= 1.036, err=0 ug[5]=92.581, Ua= 1.181, err=91.3999 ug[6]=77.899, Ua= 1.541, err=76.3579 ug[7]= 2.366, Ua= 2.366, err=0 ug[8]= 1.287, Ua= 1.287, err=0 ug[9]=-35.080, Ua= 1.541, err=-36.6215 ug[10]=-17.696, Ua= 2.011, err=-19.7063 ug[11]= 2.947, Ua= 2.947, err=0 ug[12]= 2.000, Ua= 2.000, err=0 ug[13]= 2.366, Ua= 2.366, err=0 ug[14]= 2.947, Ua= 2.947, err=0 ug[15]= 4.000, Ua= 4.000, err=0 ug[16]=-6.864, Ua= 1.036, err=-7.89993 ug[17]=-91.170, Ua= 1.095, err=-92.2646 ug[18]= 1.004, Ua= 1.004, err=0 ug[19]= 1.004, Ua= 1.004, err=0 ug[20]=79.043, Ua= 1.095, err=77.9478 ug[21]=-98.738, Ua= 1.036, err=-99.7743 ug[22]=-16.317, Ua= 1.207, err=-17.5244 ug[23]=-200.179, Ua= 1.321, err=-201.5 ug[24]=118.977, Ua= 1.095, err=117.883 ug[25]= 1.121, Ua= 1.121, err=0 ug[26]=67.794, Ua= 1.401, err=66.3931 ug[27]=-84.417, Ua= 1.207, err=-85.6247 ug[28]= 1.713, Ua= 1.713, err=0 ug[29]=-57.949, Ua= 1.882, err=-59.831 ug[30]=19.137, Ua= 1.401, err=17.7363 ug[31]= 1.572, Ua= 1.572, err=0 ug[32]= 2.169, Ua= 2.169, err=0 ug[33]= 1.713, Ua= 1.713, err=0 ug[34]= 2.661, Ua= 1.207, err=1.45353 ug[35]=32.684, Ua= 1.401, err=31.2836 ug[36]= 1.121, Ua= 1.121, err=0 ug[37]=-83.148, Ua= 1.095, err=-84.2426 ug[38]=144.546, Ua= 1.321, err=143.225 ug[39]=-93.106, Ua= 1.207, err=-94.3139 ug[40]=-16.843, Ua= 1.488, err=-18.331 ug[41]=67.837, Ua= 1.735, err=66.1016 ug[42]=-28.151, Ua= 1.321, err=-29.4712 ug[43]=-36.413, Ua= 1.321, err=-37.7337 ug[44]=-18.348, Ua= 1.735, err=-20.0834 ug[45]= 3.678, Ua= 1.488, err=2.19058 ug[46]=-24.918, Ua= 2.104, err=-27.0219 ug[47]=21.607, Ua= 2.407, err=19.2002 ug[48]= 3.467, Ua= 1.735, err=1.73159 ug[49]=-12.202, Ua= 1.882, err=-14.0832 ug[50]= 2.616, Ua= 2.616, err=0 ug[51]=-25.603, Ua= 2.104, err=-27.7065 ug[52]= 1.713, Ua= 1.713, err=0 ug[53]= 2.169, Ua= 2.169, err=0 ug[54]= 1.572, Ua= 1.572, err=0 ug[55]=-13.466, Ua= 1.401, err=-14.8664 ug[56]=32.670, Ua= 1.882, err=30.7888 ug[57]= 1.713, Ua= 1.713, err=0 ug[58]=-2.034, Ua= 2.104, err=-4.13837 ug[59]= 2.616, Ua= 2.616, err=0 ug[60]= 0.962, Ua= 1.882, err=-0.919389 ug[61]= 3.982, Ua= 1.735, err=2.2469 ug[62]=24.401, Ua= 2.407, err=21.9936 ug[63]=-12.621, Ua= 2.104, err=-14.7251 ug[64]=-4.866, Ua= 2.832, err=-7.6985 ug[65]= 3.402, Ua= 3.402, err=0 ug[66]= 1.620, Ua= 2.407, err=-0.787254 ug[67]= 1.250, Ua= 2.407, err=-1.1575 ug[68]= 3.402, Ua= 3.402, err=0 ug[69]= 1.732, Ua= 2.832, err=-1.10053 maxerr=201.5, avgerr=25.5294 tri_split nvert_old=70, nvert=286, ntri_old=72, ntri=288 compute global stiffness matrix nvert=286, ntri=288, nuniqueb=72 ug computed Galerkin, Ua analytic, error ug[0]= 1.000, Ua= 1.000, err=0 ug[1]= 1.036, Ua= 1.036, err=0 ug[2]= 1.287, Ua= 1.287, err=0 ug[3]= 2.000, Ua= 2.000, err=0 ug[4]= 1.036, Ua= 1.036, err=0 ug[5]= 3.679, Ua= 1.181, err=2.49799 ug[6]= 3.252, Ua= 1.541, err=1.71098 ug[7]= 2.366, Ua= 2.366, err=0 ug[8]= 1.287, Ua= 1.287, err=0 ug[9]= 1.247, Ua= 1.541, err=-0.293829 ug[10]= 1.991, Ua= 2.011, err=-0.0197707 ug[11]= 2.947, Ua= 2.947, err=0 ug[12]= 2.000, Ua= 2.000, err=0 ug[13]= 2.366, Ua= 2.366, err=0 ug[14]= 2.947, Ua= 2.947, err=0 ug[15]= 4.000, Ua= 4.000, err=0 ug[16]=17.582, Ua= 1.036, err=16.5461 ug[17]=21.708, Ua= 1.095, err=20.6128 ug[18]= 1.004, Ua= 1.004, err=0 ug[19]= 1.004, Ua= 1.004, err=0 ug[20]=-1.388, Ua= 1.095, err=-2.48316 ug[21]=-0.028, Ua= 1.036, err=-1.0647 ug[22]=21.611, Ua= 1.207, err=20.4033 ug[23]=-3.190, Ua= 1.321, err=-4.51097 ug[24]=15.118, Ua= 1.095, err=14.0227 ug[25]= 1.121, Ua= 1.121, err=0 ug[26]=-1.676, Ua= 1.401, err=-3.07663 ug[27]=-0.334, Ua= 1.207, err=-1.54166 ug[28]= 1.713, Ua= 1.713, err=0 ug[29]=-29.072, Ua= 1.882, err=-30.9541 ug[30]=-5.727, Ua= 1.401, err=-7.12744 ug[31]= 1.572, Ua= 1.572, err=0 ug[32]= 2.169, Ua= 2.169, err=0 ug[33]= 1.713, Ua= 1.713, err=0 ug[34]=17.905, Ua= 1.207, err=16.6978 ug[35]=14.697, Ua= 1.401, err=13.2964 ug[36]= 1.121, Ua= 1.121, err=0 ug[37]= 3.041, Ua= 1.095, err=1.94653 ug[38]= 0.218, Ua= 1.321, err=-1.10281 ug[39]= 0.438, Ua= 1.207, err=-0.769424 ug[40]=11.681, Ua= 1.488, err=10.1936 ug[41]=-1.984, Ua= 1.735, err=-3.71916 ug[42]= 8.144, Ua= 1.321, err=6.82389 ug[43]= 3.559, Ua= 1.321, err=2.23815 ug[44]= 1.206, Ua= 1.735, err=-0.529337 ug[45]= 1.396, Ua= 1.488, err=-0.0913544 ug[46]=15.085, Ua= 2.104, err=12.9808 ug[47]=-3.020, Ua= 2.407, err=-5.42675 ug[48]=10.462, Ua= 1.735, err=8.72613 ug[49]=-4.883, Ua= 1.882, err=-6.76448 ug[50]= 2.616, Ua= 2.616, err=0 ug[51]= 3.820, Ua= 2.104, err=1.71645 ug[52]= 1.713, Ua= 1.713, err=0 ug[53]= 2.169, Ua= 2.169, err=0 ug[54]= 1.572, Ua= 1.572, err=0 ug[55]= 4.806, Ua= 1.401, err=3.40536 ug[56]=19.725, Ua= 1.882, err=17.8434 ug[57]= 1.713, Ua= 1.713, err=0 ug[58]=28.854, Ua= 2.104, err=26.7497 ug[59]= 2.616, Ua= 2.616, err=0 ug[60]=21.112, Ua= 1.882, err=19.2305 ug[61]= 1.784, Ua= 1.735, err=0.0486814 ug[62]= 0.592, Ua= 2.407, err=-1.81499 ug[63]= 1.083, Ua= 2.104, err=-1.02107 ug[64]=33.855, Ua= 2.832, err=31.0229 ug[65]= 3.402, Ua= 3.402, err=0 ug[66]=25.054, Ua= 2.407, err=22.6465 ug[67]= 0.144, Ua= 2.407, err=-2.26282 ug[68]= 3.402, Ua= 3.402, err=0 ug[69]= 6.276, Ua= 2.832, err=3.44342 ug[70]=-5.668, Ua= 0.000, err=-5.66795 ug[71]=-10.016, Ua= 0.000, err=-10.0161 ug[72]= 1.001, Ua= 0.000, err=1.00056 ug[73]= 1.001, Ua= 0.000, err=1.00056 ug[74]=-2.271, Ua= 0.000, err=-2.27147 ug[75]= 1.143, Ua= 0.000, err=1.14336 ug[76]=-20.288, Ua= 0.000, err=-20.2883 ug[77]=-30.110, Ua= 0.000, err=-30.1098 ug[78]=30.595, Ua= 0.000, err=30.5954 ug[79]= 1.070, Ua= 0.000, err=1.07019 ug[80]=-2.509, Ua= 0.000, err=-2.50888 ug[81]= 1.379, Ua= 0.000, err=1.37949 ug[82]= 1.476, Ua= 0.000, err=1.47552 ug[83]= 0.091, Ua= 0.000, err=0.0907443 ug[84]= 0.247, Ua= 0.000, err=0.246991 ug[85]= 1.413, Ua= 0.000, err=1.41349 ug[86]= 1.641, Ua= 0.000, err=1.64082 ug[87]= 1.476, Ua= 0.000, err=1.47552 ug[88]=-5.770, Ua= 0.000, err=-5.77001 ug[89]=-10.269, Ua= 0.000, err=-10.2691 ug[90]= 1.070, Ua= 0.000, err=1.07019 ug[91]= 3.166, Ua= 0.000, err=3.16568 ug[92]=-13.436, Ua= 0.000, err=-13.4363 ug[93]= 9.886, Ua= 0.000, err=9.8864 ug[94]=-11.374, Ua= 0.000, err=-11.3739 ug[95]=-15.848, Ua= 0.000, err=-15.8482 ug[96]=16.287, Ua= 0.000, err=16.2875 ug[97]=-4.734, Ua= 0.000, err=-4.73411 ug[98]= 8.306, Ua= 0.000, err=8.30579 ug[99]=-7.013, Ua= 0.000, err=-7.01273 ug[100]=-13.218, Ua= 0.000, err=-13.2183 ug[101]=-20.914, Ua= 0.000, err=-20.9138 ug[102]=20.351, Ua= 0.000, err=20.3506 ug[103]=-15.999, Ua= 0.000, err=-15.999 ug[104]=52.859, Ua= 0.000, err=52.8594 ug[105]=-41.247, Ua= 0.000, err=-41.2471 ug[106]= 1.476, Ua= 0.000, err=1.47552 ug[107]= 1.641, Ua= 0.000, err=1.64082 ug[108]= 1.413, Ua= 0.000, err=1.41349 ug[109]= 0.287, Ua= 0.000, err=0.287067 ug[110]=-4.299, Ua= 0.000, err=-4.29946 ug[111]= 1.476, Ua= 0.000, err=1.47552 ug[112]=-28.882, Ua= 0.000, err=-28.8822 ug[113]=-40.394, Ua= 0.000, err=-40.3945 ug[114]=42.129, Ua= 0.000, err=42.1285 ug[115]= 0.615, Ua= 0.000, err=0.615216 ug[116]=-4.313, Ua= 0.000, err=-4.31263 ug[117]= 2.829, Ua= 0.000, err=2.82904 ug[118]=-30.763, Ua= 0.000, err=-30.763 ug[119]=-48.154, Ua= 0.000, err=-48.1535 ug[120]=47.388, Ua= 0.000, err=47.3881 ug[121]=-1.521, Ua= 0.000, err=-1.5215 ug[122]= 5.495, Ua= 0.000, err=5.49512 ug[123]=-6.285, Ua= 0.000, err=-6.28497 ug[124]= 5.551, Ua= 0.000, err=5.55132 ug[125]=-11.307, Ua= 0.000, err=-11.3074 ug[126]=-4.312, Ua= 0.000, err=-4.31248 ug[127]=54.597, Ua= 0.000, err=54.5974 ug[128]=-176.465, Ua= 0.000, err=-176.465 ug[129]=125.792, Ua= 0.000, err=125.792 ug[130]=-6.889, Ua= 0.000, err=-6.88895 ug[131]=-12.198, Ua= 0.000, err=-12.1981 ug[132]= 1.015, Ua= 0.000, err=1.01516 ug[133]= 1.015, Ua= 0.000, err=1.01516 ug[134]=-1.651, Ua= 0.000, err=-1.65142 ug[135]= 0.881, Ua= 0.000, err=0.88076 ug[136]=-2.450, Ua= 0.000, err=-2.45017 ug[137]= 1.727, Ua= 0.000, err=1.72665 ug[138]= 1.666, Ua= 0.000, err=1.66599 ug[139]= 0.495, Ua= 0.000, err=0.495443 ug[140]= 1.475, Ua= 0.000, err=1.47525 ug[141]=-2.268, Ua= 0.000, err=-2.26849 ug[142]=-9.011, Ua= 0.000, err=-9.01105 ug[143]= 0.686, Ua= 0.000, err=0.68638 ug[144]= 5.114, Ua= 0.000, err=5.11425 ug[145]=-12.532, Ua= 0.000, err=-12.5317 ug[146]= 2.047, Ua= 0.000, err=2.04671 ug[147]=-1.885, Ua= 0.000, err=-1.885 ug[148]= 4.514, Ua= 0.000, err=4.51433 ug[149]= 3.834, Ua= 0.000, err=3.83405 ug[150]=-8.284, Ua= 0.000, err=-8.2843 ug[151]= 1.193, Ua= 0.000, err=1.1926 ug[152]=-2.310, Ua= 0.000, err=-2.30959 ug[153]= 1.403, Ua= 0.000, err=1.40269 ug[154]=-2.826, Ua= 0.000, err=-2.82554 ug[155]= 1.925, Ua= 0.000, err=1.92486 ug[156]= 2.139, Ua= 0.000, err=2.13931 ug[157]= 0.625, Ua= 0.000, err=0.62542 ug[158]= 1.476, Ua= 0.000, err=1.47561 ug[159]=-2.096, Ua= 0.000, err=-2.09636 ug[160]= 2.008, Ua= 0.000, err=2.00768 ug[161]= 8.355, Ua= 0.000, err=8.35474 ug[162]= 0.582, Ua= 0.000, err=0.58155 ug[163]=-3.924, Ua= 0.000, err=-3.92364 ug[164]= 2.204, Ua= 0.000, err=2.20374 ug[165]= 8.756, Ua= 0.000, err=8.75648 ug[166]=38.737, Ua= 0.000, err=38.737 ug[167]=29.748, Ua= 0.000, err=29.7477 ug[168]=-48.315, Ua= 0.000, err=-48.3147 ug[169]= 1.766, Ua= 0.000, err=1.76606 ug[170]= 2.083, Ua= 0.000, err=2.08306 ug[171]= 1.842, Ua= 0.000, err=1.84211 ug[172]= 1.641, Ua= 0.000, err=1.64082 ug[173]= 1.842, Ua= 0.000, err=1.84211 ug[174]= 1.922, Ua= 0.000, err=1.92153 ug[175]= 1.922, Ua= 0.000, err=1.92153 ug[176]= 2.263, Ua= 0.000, err=2.26266 ug[177]= 2.008, Ua= 0.000, err=2.00768 ug[178]= 4.667, Ua= 0.000, err=4.6666 ug[179]=-5.511, Ua= 0.000, err=-5.51103 ug[180]=-5.555, Ua= 0.000, err=-5.55484 ug[181]=48.395, Ua= 0.000, err=48.3954 ug[182]=-160.838, Ua= 0.000, err=-160.838 ug[183]=116.259, Ua= 0.000, err=116.259 ug[184]=-4.851, Ua= 0.000, err=-4.85099 ug[185]=-8.715, Ua= 0.000, err=-8.7146 ug[186]= 1.193, Ua= 0.000, err=1.1926 ug[187]=-3.170, Ua= 0.000, err=-3.17015 ug[188]= 3.459, Ua= 0.000, err=3.45892 ug[189]=-2.936, Ua= 0.000, err=-2.93618 ug[190]=-0.065, Ua= 0.000, err=-0.0647243 ug[191]=-0.415, Ua= 0.000, err=-0.414911 ug[192]=-0.024, Ua= 0.000, err=-0.0239032 ug[193]= 0.002, Ua= 0.000, err=0.00194522 ug[194]=-0.042, Ua= 0.000, err=-0.0417363 ug[195]=-0.390, Ua= 0.000, err=-0.390317 ug[196]=-5.322, Ua= 0.000, err=-5.32155 ug[197]= 0.247, Ua= 0.000, err=0.246515 ug[198]= 3.271, Ua= 0.000, err=3.27069 ug[199]=-6.902, Ua= 0.000, err=-6.90239 ug[200]= 1.448, Ua= 0.000, err=1.44834 ug[201]=-1.180, Ua= 0.000, err=-1.1796 ug[202]= 2.369, Ua= 0.000, err=2.36914 ug[203]= 2.691, Ua= 0.000, err=2.69138 ug[204]=-4.609, Ua= 0.000, err=-4.60931 ug[205]=-5.126, Ua= 0.000, err=-5.12585 ug[206]= 9.849, Ua= 0.000, err=9.84866 ug[207]=-8.097, Ua= 0.000, err=-8.09736 ug[208]= 1.181, Ua= 0.000, err=1.18083 ug[209]=-1.240, Ua= 0.000, err=-1.2401 ug[210]=-1.448, Ua= 0.000, err=-1.44825 ug[211]=-0.750, Ua= 0.000, err=-0.750122 ug[212]= 0.755, Ua= 0.000, err=0.754783 ug[213]=-1.304, Ua= 0.000, err=-1.30449 ug[214]=-7.401, Ua= 0.000, err=-7.40129 ug[215]= 0.316, Ua= 0.000, err=0.31604 ug[216]= 4.605, Ua= 0.000, err=4.60535 ug[217]=-8.728, Ua= 0.000, err=-8.72768 ug[218]= 1.667, Ua= 0.000, err=1.6674 ug[219]=-1.184, Ua= 0.000, err=-1.18378 ug[220]= 3.473, Ua= 0.000, err=3.47282 ug[221]= 3.930, Ua= 0.000, err=3.92992 ug[222]=-6.671, Ua= 0.000, err=-6.67062 ug[223]=-0.272, Ua= 0.000, err=-0.272222 ug[224]= 2.483, Ua= 0.000, err=2.48269 ug[225]=-0.541, Ua= 0.000, err=-0.540906 ug[226]= 3.250, Ua= 0.000, err=3.24988 ug[227]=-0.385, Ua= 0.000, err=-0.385272 ug[228]=-5.282, Ua= 0.000, err=-5.28246 ug[229]=-2.291, Ua= 0.000, err=-2.2905 ug[230]= 2.770, Ua= 0.000, err=2.7701 ug[231]=-3.595, Ua= 0.000, err=-3.59453 ug[232]= 2.008, Ua= 0.000, err=2.00768 ug[233]= 2.263, Ua= 0.000, err=2.26266 ug[234]= 1.922, Ua= 0.000, err=1.92153 ug[235]= 1.641, Ua= 0.000, err=1.64082 ug[236]= 1.922, Ua= 0.000, err=1.92153 ug[237]= 1.842, Ua= 0.000, err=1.84211 ug[238]= 1.842, Ua= 0.000, err=1.84211 ug[239]= 2.083, Ua= 0.000, err=2.08306 ug[240]= 1.766, Ua= 0.000, err=1.76606 ug[241]= 2.087, Ua= 0.000, err=2.08737 ug[242]=-4.169, Ua= 0.000, err=-4.16938 ug[243]=-3.219, Ua= 0.000, err=-3.21862 ug[244]=34.214, Ua= 0.000, err=34.2141 ug[245]=-27.963, Ua= 0.000, err=-27.9627 ug[246]=-21.603, Ua= 0.000, err=-21.6028 ug[247]= 0.519, Ua= 0.000, err=0.519033 ug[248]=-11.971, Ua= 0.000, err=-11.9707 ug[249]= 2.008, Ua= 0.000, err=2.00768 ug[250]=-6.551, Ua= 0.000, err=-6.55068 ug[251]= 2.770, Ua= 0.000, err=2.7701 ug[252]=-0.068, Ua= 0.000, err=-0.0680236 ug[253]=-13.216, Ua= 0.000, err=-13.2157 ug[254]=-6.772, Ua= 0.000, err=-6.77168 ug[255]= 2.401, Ua= 0.000, err=2.40125 ug[256]=-5.307, Ua= 0.000, err=-5.30704 ug[257]= 2.483, Ua= 0.000, err=2.48269 ug[258]=-0.066, Ua= 0.000, err=-0.0659333 ug[259]=-2.150, Ua= 0.000, err=-2.1505 ug[260]= 3.250, Ua= 0.000, err=3.24972 ug[261]=-2.760, Ua= 0.000, err=-2.75974 ug[262]= 0.438, Ua= 0.000, err=0.437662 ug[263]=-0.382, Ua= 0.000, err=-0.381927 ug[264]=-0.874, Ua= 0.000, err=-0.874135 ug[265]=-0.268, Ua= 0.000, err=-0.267587 ug[266]= 0.488, Ua= 0.000, err=0.488157 ug[267]=-1.321, Ua= 0.000, err=-1.32077 ug[268]=-8.390, Ua= 0.000, err=-8.38969 ug[269]= 3.681, Ua= 0.000, err=3.68106 ug[270]=-0.128, Ua= 0.000, err=-0.128211 ug[271]=-15.241, Ua= 0.000, err=-15.2413 ug[272]=-7.416, Ua= 0.000, err=-7.41619 ug[273]= 2.135, Ua= 0.000, err=2.1353 ug[274]=-6.694, Ua= 0.000, err=-6.69371 ug[275]= 3.158, Ua= 0.000, err=3.15849 ug[276]=-0.117, Ua= 0.000, err=-0.116951 ug[277]=-1.725, Ua= 0.000, err=-1.72452 ug[278]= 3.158, Ua= 0.000, err=3.15849 ug[279]=-2.738, Ua= 0.000, err=-2.73754 ug[280]= 3.212, Ua= 0.000, err=3.2121 ug[281]=-0.846, Ua= 0.000, err=-0.846418 ug[282]=-6.496, Ua= 0.000, err=-6.4959 ug[283]=-3.352, Ua= 0.000, err=-3.35204 ug[284]= 3.681, Ua= 0.000, err=3.68106 ug[285]=-5.171, Ua= 0.000, err=-5.1708 maxerr=176.465, avgerr=8.3095 tri_split nvert_old=286, nvert=1150, ntri_old=288, ntri=1152 compute global stiffness matrix nvert=1150, ntri=1152, nuniqueb=208 ug computed Galerkin, Ua analytic, error ug[0]= 1.000, Ua= 1.000, err=0 ug[1]= 1.036, Ua= 1.036, err=0 ug[2]= 1.287, Ua= 1.287, err=0 ug[3]= 2.000, Ua= 2.000, err=0 ug[4]= 1.036, Ua= 1.036, err=0 ug[5]=30.107, Ua= 1.181, err=28.9261 ug[6]=-16.629, Ua= 1.541, err=-18.1703 ug[7]= 2.366, Ua= 2.366, err=0 ug[8]= 1.287, Ua= 1.287, err=0 ug[9]=23.897, Ua= 1.541, err=22.3561 ug[10]=-5.202, Ua= 2.011, err=-7.21216 ug[11]= 2.947, Ua= 2.947, err=0 ug[12]= 2.000, Ua= 2.000, err=0 ug[13]= 2.366, Ua= 2.366, err=0 ug[14]= 2.947, Ua= 2.947, err=0 ug[15]= 4.000, Ua= 4.000, err=0 ug[16]=367.092, Ua= 1.036, err=366.055 ug[17]=1478.331, Ua= 1.095, err=1477.24 ug[18]= 1.004, Ua= 1.004, err=0 ug[19]= 1.004, Ua= 1.004, err=0 ug[20]=12.108, Ua= 1.095, err=11.0128 ug[21]=-3.831, Ua= 1.036, err=-4.86741 ug[22]=-26.107, Ua= 1.207, err=-27.3143 ug[23]=75.688, Ua= 1.321, err=74.3673 ug[24]=-111.823, Ua= 1.095, err=-112.918 ug[25]= 1.121, Ua= 1.121, err=0 ug[26]=13.337, Ua= 1.401, err=11.9357 ug[27]= 7.263, Ua= 1.207, err=6.05541 ug[28]= 1.713, Ua= 1.713, err=0 ug[29]=-19.148, Ua= 1.882, err=-21.03 ug[30]=-2.247, Ua= 1.401, err=-3.648 ug[31]= 1.572, Ua= 1.572, err=0 ug[32]= 2.169, Ua= 2.169, err=0 ug[33]= 1.713, Ua= 1.713, err=0 ug[34]=291.633, Ua= 1.207, err=290.426 ug[35]=1173.282, Ua= 1.401, err=1171.88 ug[36]= 1.121, Ua= 1.121, err=0 ug[37]=54.929, Ua= 1.095, err=53.8336 ug[38]=-35.864, Ua= 1.321, err=-37.1847 ug[39]=-68.772, Ua= 1.207, err=-69.9792 ug[40]=-12.860, Ua= 1.488, err=-14.3476 ug[41]=15.399, Ua= 1.735, err=13.6633 ug[42]=-33.729, Ua= 1.321, err=-35.05 ug[43]=-32.062, Ua= 1.321, err=-33.3827 ug[44]=37.683, Ua= 1.735, err=35.9472 ug[45]=80.539, Ua= 1.488, err=79.0511 ug[46]= 6.409, Ua= 2.104, err=4.30492 ug[47]=-11.802, Ua= 2.407, err=-14.2094 ug[48]=30.998, Ua= 1.735, err=29.263 ug[49]=-0.107, Ua= 1.882, err=-1.98832 ug[50]= 2.616, Ua= 2.616, err=0 ug[51]= 0.784, Ua= 2.104, err=-1.3198 ug[52]= 1.713, Ua= 1.713, err=0 ug[53]= 2.169, Ua= 2.169, err=0 ug[54]= 1.572, Ua= 1.572, err=0 ug[55]=34.946, Ua= 1.401, err=33.5449 ug[56]=-0.965, Ua= 1.882, err=-2.84699 ug[57]= 1.713, Ua= 1.713, err=0 ug[58]=13.318, Ua= 2.104, err=11.2136 ug[59]= 2.616, Ua= 2.616, err=0 ug[60]=25.046, Ua= 1.882, err=23.1643 ug[61]=-8.679, Ua= 1.735, err=-10.4142 ug[62]=11.043, Ua= 2.407, err=8.63614 ug[63]=21.260, Ua= 2.104, err=19.156 ug[64]=13.229, Ua= 2.832, err=10.397 ug[65]= 3.402, Ua= 3.402, err=0 ug[66]=38.619, Ua= 2.407, err=36.2124 ug[67]=-0.871, Ua= 2.407, err=-3.27823 ug[68]= 3.402, Ua= 3.402, err=0 ug[69]= 4.027, Ua= 2.832, err=1.19434 ug[70]=50.114, Ua= 0.000, err=50.1139 ug[71]=272.151, Ua= 0.000, err=272.151 ug[72]= 1.001, Ua= 0.000, err=1.00056 ug[73]= 1.001, Ua= 0.000, err=1.00056 ug[74]=-642.225, Ua= 0.000, err=-642.225 ug[75]=-191.028, Ua= 0.000, err=-191.028 ug[76]=-141.609, Ua= 0.000, err=-141.609 ug[77]=12.063, Ua= 0.000, err=12.0634 ug[78]=-134.265, Ua= 0.000, err=-134.265 ug[79]= 1.070, Ua= 0.000, err=1.07019 ug[80]=-181.296, Ua= 0.000, err=-181.296 ug[81]=-51.002, Ua= 0.000, err=-51.0016 ug[82]= 1.476, Ua= 0.000, err=1.47552 ug[83]= 3.917, Ua= 0.000, err=3.91744 ug[84]=-8.326, Ua= 0.000, err=-8.32552 ug[85]= 1.413, Ua= 0.000, err=1.41349 ug[86]= 1.641, Ua= 0.000, err=1.64082 ug[87]= 1.476, Ua= 0.000, err=1.47552 ug[88]=39.871, Ua= 0.000, err=39.8706 ug[89]=216.543, Ua= 0.000, err=216.543 ug[90]= 1.070, Ua= 0.000, err=1.07019 ug[91]=110.084, Ua= 0.000, err=110.084 ug[92]=-169.888, Ua= 0.000, err=-169.888 ug[93]=-26.052, Ua= 0.000, err=-26.0519 ug[94]=-48.955, Ua= 0.000, err=-48.9551 ug[95]=-4.607, Ua= 0.000, err=-4.60651 ug[96]=-31.541, Ua= 0.000, err=-31.5409 ug[97]=-65.495, Ua= 0.000, err=-65.4947 ug[98]=132.182, Ua= 0.000, err=132.182 ug[99]=27.866, Ua= 0.000, err=27.8659 ug[100]=32.698, Ua= 0.000, err=32.6982 ug[101]=-4.259, Ua= 0.000, err=-4.25949 ug[102]=34.179, Ua= 0.000, err=34.179 ug[103]= 6.192, Ua= 0.000, err=6.19188 ug[104]=-5.765, Ua= 0.000, err=-5.7645 ug[105]= 7.591, Ua= 0.000, err=7.59106 ug[106]= 1.476, Ua= 0.000, err=1.47552 ug[107]= 1.641, Ua= 0.000, err=1.64082 ug[108]= 1.413, Ua= 0.000, err=1.41349 ug[109]=62.164, Ua= 0.000, err=62.1645 ug[110]=36.254, Ua= 0.000, err=36.254 ug[111]= 1.476, Ua= 0.000, err=1.47552 ug[112]=60.678, Ua= 0.000, err=60.6784 ug[113]=-1.327, Ua= 0.000, err=-1.32679 ug[114]=42.313, Ua= 0.000, err=42.3127 ug[115]=-29.447, Ua= 0.000, err=-29.4468 ug[116]=66.104, Ua= 0.000, err=66.1044 ug[117]= 7.437, Ua= 0.000, err=7.4368 ug[118]=61.233, Ua= 0.000, err=61.233 ug[119]=-3.399, Ua= 0.000, err=-3.39914 ug[120]=48.987, Ua= 0.000, err=48.9874 ug[121]= 1.520, Ua= 0.000, err=1.52029 ug[122]=-1.122, Ua= 0.000, err=-1.12206 ug[123]= 3.498, Ua= 0.000, err=3.49815 ug[124]=1061.703, Ua= 0.000, err=1061.7 ug[125]=-301.448, Ua= 0.000, err=-301.448 ug[126]=1628.528, Ua= 0.000, err=1628.53 ug[127]=1548.106, Ua= 0.000, err=1548.11 ug[128]=-1260.712, Ua= 0.000, err=-1260.71 ug[129]=873.339, Ua= 0.000, err=873.339 ug[130]=200.917, Ua= 0.000, err=200.917 ug[131]=1092.738, Ua= 0.000, err=1092.74 ug[132]= 1.015, Ua= 0.000, err=1.01516 ug[133]= 1.015, Ua= 0.000, err=1.01516 ug[134]=58.867, Ua= 0.000, err=58.8665 ug[135]=21.577, Ua= 0.000, err=21.5772 ug[136]= 9.362, Ua= 0.000, err=9.36204 ug[137]=33.217, Ua= 0.000, err=33.2171 ug[138]= 2.063, Ua= 0.000, err=2.06314 ug[139]=45.555, Ua= 0.000, err=45.5548 ug[140]=-44.913, Ua= 0.000, err=-44.9129 ug[141]=19.891, Ua= 0.000, err=19.8907 ug[142]=-10.913, Ua= 0.000, err=-10.9126 ug[143]=-6.743, Ua= 0.000, err=-6.74322 ug[144]=43.205, Ua= 0.000, err=43.2055 ug[145]=31.253, Ua= 0.000, err=31.2532 ug[146]=-50.563, Ua= 0.000, err=-50.5634 ug[147]=68.714, Ua= 0.000, err=68.7135 ug[148]=206.830, Ua= 0.000, err=206.83 ug[149]=34.908, Ua= 0.000, err=34.9081 ug[150]=54.526, Ua= 0.000, err=54.5263 ug[151]= 1.193, Ua= 0.000, err=1.1926 ug[152]=31.446, Ua= 0.000, err=31.4459 ug[153]=13.987, Ua= 0.000, err=13.9866 ug[154]=21.372, Ua= 0.000, err=21.3716 ug[155]=43.366, Ua= 0.000, err=43.3664 ug[156]= 0.614, Ua= 0.000, err=0.614236 ug[157]=22.624, Ua= 0.000, err=22.624 ug[158]=-33.150, Ua= 0.000, err=-33.1502 ug[159]=-8.374, Ua= 0.000, err=-8.3738 ug[160]= 2.008, Ua= 0.000, err=2.00768 ug[161]=-11.400, Ua= 0.000, err=-11.4003 ug[162]=-28.376, Ua= 0.000, err=-28.3764 ug[163]=-6.243, Ua= 0.000, err=-6.24283 ug[164]=-5.871, Ua= 0.000, err=-5.87149 ug[165]=-11.959, Ua= 0.000, err=-11.9592 ug[166]=-65.209, Ua= 0.000, err=-65.2091 ug[167]= 7.708, Ua= 0.000, err=7.70821 ug[168]=-43.276, Ua= 0.000, err=-43.2757 ug[169]= 1.766, Ua= 0.000, err=1.76606 ug[170]= 2.083, Ua= 0.000, err=2.08306 ug[171]= 1.842, Ua= 0.000, err=1.84211 ug[172]= 1.641, Ua= 0.000, err=1.64082 ug[173]= 1.842, Ua= 0.000, err=1.84211 ug[174]= 1.922, Ua= 0.000, err=1.92153 ug[175]= 1.922, Ua= 0.000, err=1.92153 ug[176]= 2.263, Ua= 0.000, err=2.26266 ug[177]= 2.008, Ua= 0.000, err=2.00768 ug[178]=842.711, Ua= 0.000, err=842.711 ug[179]=-239.318, Ua= 0.000, err=-239.318 ug[180]=1292.626, Ua= 0.000, err=1292.63 ug[181]=1229.203, Ua= 0.000, err=1229.2 ug[182]=-1001.117, Ua= 0.000, err=-1001.12 ug[183]=693.091, Ua= 0.000, err=693.091 ug[184]=159.533, Ua= 0.000, err=159.533 ug[185]=867.734, Ua= 0.000, err=867.734 ug[186]= 1.193, Ua= 0.000, err=1.1926 ug[187]=29.060, Ua= 0.000, err=29.0603 ug[188]=-30.403, Ua= 0.000, err=-30.403 ug[189]=-29.467, Ua= 0.000, err=-29.467 ug[190]=-77.386, Ua= 0.000, err=-77.3855 ug[191]=-129.637, Ua= 0.000, err=-129.637 ug[192]=-9.169, Ua= 0.000, err=-9.16932 ug[193]=-40.504, Ua= 0.000, err=-40.5043 ug[194]=33.500, Ua= 0.000, err=33.5001 ug[195]=25.938, Ua= 0.000, err=25.9384 ug[196]=-9.603, Ua= 0.000, err=-9.60289 ug[197]= 0.271, Ua= 0.000, err=0.270985 ug[198]= 3.319, Ua= 0.000, err=3.31859 ug[199]=-6.327, Ua= 0.000, err=-6.32747 ug[200]= 1.112, Ua= 0.000, err=1.11229 ug[201]=15.685, Ua= 0.000, err=15.6852 ug[202]=49.523, Ua= 0.000, err=49.5233 ug[203]= 7.312, Ua= 0.000, err=7.31229 ug[204]=22.992, Ua= 0.000, err=22.9916 ug[205]=-7.574, Ua= 0.000, err=-7.5738 ug[206]=13.704, Ua= 0.000, err=13.7043 ug[207]=26.434, Ua= 0.000, err=26.4337 ug[208]=101.448, Ua= 0.000, err=101.448 ug[209]=148.198, Ua= 0.000, err=148.198 ug[210]= 1.969, Ua= 0.000, err=1.96942 ug[211]=45.987, Ua= 0.000, err=45.987 ug[212]=-26.849, Ua= 0.000, err=-26.8487 ug[213]=-18.975, Ua= 0.000, err=-18.9747 ug[214]= 2.857, Ua= 0.000, err=2.85672 ug[215]= 1.046, Ua= 0.000, err=1.0457 ug[216]=-6.651, Ua= 0.000, err=-6.65126 ug[217]=-1.244, Ua= 0.000, err=-1.24413 ug[218]=-3.393, Ua= 0.000, err=-3.39337 ug[219]=-17.722, Ua= 0.000, err=-17.7225 ug[220]=-28.272, Ua= 0.000, err=-28.2718 ug[221]=-7.723, Ua= 0.000, err=-7.72315 ug[222]=-1.951, Ua= 0.000, err=-1.9512 ug[223]= 1.392, Ua= 0.000, err=1.39218 ug[224]= 2.483, Ua= 0.000, err=2.48269 ug[225]= 2.896, Ua= 0.000, err=2.89633 ug[226]= 3.922, Ua= 0.000, err=3.92231 ug[227]= 7.872, Ua= 0.000, err=7.8717 ug[228]=-0.462, Ua= 0.000, err=-0.461986 ug[229]= 1.447, Ua= 0.000, err=1.44706 ug[230]= 2.770, Ua= 0.000, err=2.7701 ug[231]= 3.452, Ua= 0.000, err=3.45155 ug[232]= 2.008, Ua= 0.000, err=2.00768 ug[233]= 2.263, Ua= 0.000, err=2.26266 ug[234]= 1.922, Ua= 0.000, err=1.92153 ug[235]= 1.641, Ua= 0.000, err=1.64082 ug[236]= 1.922, Ua= 0.000, err=1.92153 ug[237]= 1.842, Ua= 0.000, err=1.84211 ug[238]= 1.842, Ua= 0.000, err=1.84211 ug[239]= 2.083, Ua= 0.000, err=2.08306 ug[240]= 1.766, Ua= 0.000, err=1.76606 ug[241]=29.149, Ua= 0.000, err=29.1486 ug[242]=-19.583, Ua= 0.000, err=-19.5831 ug[243]=-7.185, Ua= 0.000, err=-7.18522 ug[244]=13.185, Ua= 0.000, err=13.1852 ug[245]= 6.643, Ua= 0.000, err=6.64269 ug[246]=-6.981, Ua= 0.000, err=-6.98063 ug[247]=-4.932, Ua= 0.000, err=-4.93241 ug[248]= 2.376, Ua= 0.000, err=2.37584 ug[249]= 2.008, Ua= 0.000, err=2.00768 ug[250]=13.214, Ua= 0.000, err=13.2143 ug[251]= 2.770, Ua= 0.000, err=2.7701 ug[252]= 3.982, Ua= 0.000, err=3.98239 ug[253]=13.362, Ua= 0.000, err=13.3623 ug[254]=-1.925, Ua= 0.000, err=-1.92521 ug[255]=-3.281, Ua= 0.000, err=-3.28083 ug[256]= 7.444, Ua= 0.000, err=7.44446 ug[257]= 2.483, Ua= 0.000, err=2.48269 ug[258]= 4.798, Ua= 0.000, err=4.79757 ug[259]=-2.777, Ua= 0.000, err=-2.77657 ug[260]= 2.418, Ua= 0.000, err=2.41781 ug[261]= 6.217, Ua= 0.000, err=6.21721 ug[262]=24.988, Ua= 0.000, err=24.9879 ug[263]=43.503, Ua= 0.000, err=43.5034 ug[264]= 4.245, Ua= 0.000, err=4.24462 ug[265]=10.957, Ua= 0.000, err=10.9569 ug[266]=-0.806, Ua= 0.000, err=-0.806202 ug[267]=-2.447, Ua= 0.000, err=-2.44682 ug[268]=17.480, Ua= 0.000, err=17.4796 ug[269]= 3.681, Ua= 0.000, err=3.68106 ug[270]= 4.401, Ua= 0.000, err=4.40054 ug[271]=14.523, Ua= 0.000, err=14.5226 ug[272]=-2.436, Ua= 0.000, err=-2.43564 ug[273]=-6.617, Ua= 0.000, err=-6.61658 ug[274]= 5.089, Ua= 0.000, err=5.08855 ug[275]= 3.158, Ua= 0.000, err=3.15849 ug[276]= 7.787, Ua= 0.000, err=7.78739 ug[277]= 1.842, Ua= 0.000, err=1.84227 ug[278]= 3.158, Ua= 0.000, err=3.15849 ug[279]= 3.505, Ua= 0.000, err=3.50532 ug[280]= 7.306, Ua= 0.000, err=7.30559 ug[281]=12.431, Ua= 0.000, err=12.4308 ug[282]=-0.047, Ua= 0.000, err=-0.046864 ug[283]= 1.761, Ua= 0.000, err=1.76089 ug[284]= 3.681, Ua= 0.000, err=3.68106 ug[285]= 5.308, Ua= 0.000, err=5.30812 ug[286]=-16.852, Ua= 0.000, err=-16.8521 ug[287]=-21.426, Ua= 0.000, err=-21.426 ug[288]= 1.000, Ua= 0.000, err=1.00007 ug[289]= 1.000, Ua= 0.000, err=1.00007 ug[290]=37.204, Ua= 0.000, err=37.2037 ug[291]= 3.335, Ua= 0.000, err=3.33508 ug[292]=125.179, Ua= 0.000, err=125.179 ug[293]=185.765, Ua= 0.000, err=185.765 ug[294]=-180.429, Ua= 0.000, err=-180.429 ug[295]= 1.051, Ua= 0.000, err=1.05117 ug[296]= 9.091, Ua= 0.000, err=9.09136 ug[297]= 0.890, Ua= 0.000, err=0.889726 ug[298]= 1.376, Ua= 0.000, err=1.37574 ug[299]= 1.055, Ua= 0.000, err=1.05493 ug[300]= 0.504, Ua= 0.000, err=0.503933 ug[301]= 1.347, Ua= 0.000, err=1.34669 ug[302]= 1.444, Ua= 0.000, err=1.4443 ug[303]= 1.376, Ua= 0.000, err=1.37574 ug[304]=-13.545, Ua= 0.000, err=-13.5448 ug[305]=-17.242, Ua= 0.000, err=-17.242 ug[306]= 1.051, Ua= 0.000, err=1.05117 ug[307]=15.633, Ua= 0.000, err=15.6326 ug[308]=-190.177, Ua= 0.000, err=-190.177 ug[309]=159.669, Ua= 0.000, err=159.669 ug[310]=49.913, Ua= 0.000, err=49.9128 ug[311]=64.458, Ua= 0.000, err=64.4577 ug[312]=-75.949, Ua= 0.000, err=-75.9485 ug[313]=-47.841, Ua= 0.000, err=-47.8415 ug[314]=207.932, Ua= 0.000, err=207.932 ug[315]=-174.288, Ua= 0.000, err=-174.288 ug[316]=-22.497, Ua= 0.000, err=-22.4967 ug[317]=-46.429, Ua= 0.000, err=-46.4286 ug[318]=40.257, Ua= 0.000, err=40.2574 ug[319]=24.902, Ua= 0.000, err=24.9015 ug[320]=-65.352, Ua= 0.000, err=-65.3523 ug[321]=49.668, Ua= 0.000, err=49.6676 ug[322]= 1.376, Ua= 0.000, err=1.37574 ug[323]= 1.444, Ua= 0.000, err=1.4443 ug[324]= 1.347, Ua= 0.000, err=1.34669 ug[325]=-7.099, Ua= 0.000, err=-7.09876 ug[326]=-20.803, Ua= 0.000, err=-20.8028 ug[327]= 1.376, Ua= 0.000, err=1.37574 ug[328]=-71.317, Ua= 0.000, err=-71.3169 ug[329]=-72.373, Ua= 0.000, err=-72.373 ug[330]=88.242, Ua= 0.000, err=88.2419 ug[331]=-41.628, Ua= 0.000, err=-41.6283 ug[332]=144.807, Ua= 0.000, err=144.807 ug[333]=-117.711, Ua= 0.000, err=-117.711 ug[334]=-59.447, Ua= 0.000, err=-59.4468 ug[335]=-78.662, Ua= 0.000, err=-78.6619 ug[336]=84.363, Ua= 0.000, err=84.3632 ug[337]= 8.649, Ua= 0.000, err=8.6495 ug[338]=-22.301, Ua= 0.000, err=-22.3006 ug[339]=16.739, Ua= 0.000, err=16.7387 ug[340]=-564.082, Ua= 0.000, err=-564.082 ug[341]=-1515.752, Ua= 0.000, err=-1515.75 ug[342]=906.906, Ua= 0.000, err=906.906 ug[343]=601.882, Ua= 0.000, err=601.882 ug[344]=-3376.024, Ua= 0.000, err=-3376.02 ug[345]=2436.940, Ua= 0.000, err=2436.94 ug[346]=-65.846, Ua= 0.000, err=-65.8464 ug[347]=-83.728, Ua= 0.000, err=-83.7278 ug[348]= 1.009, Ua= 0.000, err=1.00877 ug[349]= 1.009, Ua= 0.000, err=1.00877 ug[350]=-5.343, Ua= 0.000, err=-5.34322 ug[351]=-0.441, Ua= 0.000, err=-0.441317 ug[352]= 4.977, Ua= 0.000, err=4.97731 ug[353]=-6.743, Ua= 0.000, err=-6.74303 ug[354]= 0.408, Ua= 0.000, err=0.407514 ug[355]=21.310, Ua= 0.000, err=21.3102 ug[356]=-109.001, Ua= 0.000, err=-109.001 ug[357]=81.143, Ua= 0.000, err=81.1428 ug[358]=48.421, Ua= 0.000, err=48.421 ug[359]=-5.214, Ua= 0.000, err=-5.21362 ug[360]=-44.113, Ua= 0.000, err=-44.1127 ug[361]=180.650, Ua= 0.000, err=180.65 ug[362]=-464.129, Ua= 0.000, err=-464.129 ug[363]=349.957, Ua= 0.000, err=349.957 ug[364]=-265.276, Ua= 0.000, err=-265.276 ug[365]=-247.127, Ua= 0.000, err=-247.127 ug[366]=368.523, Ua= 0.000, err=368.523 ug[367]= 1.154, Ua= 0.000, err=1.15421 ug[368]=-4.071, Ua= 0.000, err=-4.07141 ug[369]=-0.215, Ua= 0.000, err=-0.215104 ug[370]=-6.435, Ua= 0.000, err=-6.43502 ug[371]= 1.545, Ua= 0.000, err=1.54515 ug[372]= 0.529, Ua= 0.000, err=0.529373 ug[373]=-7.346, Ua= 0.000, err=-7.34588 ug[374]=-14.231, Ua= 0.000, err=-14.2313 ug[375]=13.886, Ua= 0.000, err=13.8861 ug[376]= 1.853, Ua= 0.000, err=1.85292 ug[377]= 6.367, Ua= 0.000, err=6.36703 ug[378]= 2.448, Ua= 0.000, err=2.4481 ug[379]=-1.925, Ua= 0.000, err=-1.92477 ug[380]=10.487, Ua= 0.000, err=10.4871 ug[381]=-4.574, Ua= 0.000, err=-4.57435 ug[382]=64.951, Ua= 0.000, err=64.9511 ug[383]=79.268, Ua= 0.000, err=79.2678 ug[384]=-89.657, Ua= 0.000, err=-89.6568 ug[385]= 1.664, Ua= 0.000, err=1.6642 ug[386]= 1.804, Ua= 0.000, err=1.80387 ug[387]= 1.700, Ua= 0.000, err=1.70026 ug[388]= 1.676, Ua= 0.000, err=1.67639 ug[389]= 1.774, Ua= 0.000, err=1.77406 ug[390]= 1.813, Ua= 0.000, err=1.81265 ug[391]= 1.813, Ua= 0.000, err=1.81265 ug[392]= 1.964, Ua= 0.000, err=1.96355 ug[393]= 1.853, Ua= 0.000, err=1.85292 ug[394]=-447.755, Ua= 0.000, err=-447.755 ug[395]=-1203.066, Ua= 0.000, err=-1203.07 ug[396]=719.802, Ua= 0.000, err=719.802 ug[397]=477.353, Ua= 0.000, err=477.353 ug[398]=-2679.328, Ua= 0.000, err=-2679.33 ug[399]=1934.047, Ua= 0.000, err=1934.05 ug[400]=-52.470, Ua= 0.000, err=-52.4696 ug[401]=-66.757, Ua= 0.000, err=-66.7568 ug[402]= 1.154, Ua= 0.000, err=1.15421 ug[403]=-77.515, Ua= 0.000, err=-77.5145 ug[404]=142.040, Ua= 0.000, err=142.04 ug[405]=-104.520, Ua= 0.000, err=-104.52 ug[406]=37.161, Ua= 0.000, err=37.1609 ug[407]=-23.457, Ua= 0.000, err=-23.4573 ug[408]=17.610, Ua= 0.000, err=17.6101 ug[409]=92.922, Ua= 0.000, err=92.9216 ug[410]=-164.272, Ua= 0.000, err=-164.272 ug[411]=123.292, Ua= 0.000, err=123.292 ug[412]=18.254, Ua= 0.000, err=18.2537 ug[413]= 7.023, Ua= 0.000, err=7.02296 ug[414]=-18.284, Ua= 0.000, err=-18.284 ug[415]=49.482, Ua= 0.000, err=49.4816 ug[416]=-107.644, Ua= 0.000, err=-107.644 ug[417]=81.218, Ua= 0.000, err=81.2182 ug[418]=-56.087, Ua= 0.000, err=-56.0866 ug[419]=-63.113, Ua= 0.000, err=-63.113 ug[420]=82.928, Ua= 0.000, err=82.9276 ug[421]=50.065, Ua= 0.000, err=50.065 ug[422]=-105.491, Ua= 0.000, err=-105.491 ug[423]=76.307, Ua= 0.000, err=76.3066 ug[424]=-61.456, Ua= 0.000, err=-61.4564 ug[425]=39.594, Ua= 0.000, err=39.5943 ug[426]=-9.878, Ua= 0.000, err=-9.87779 ug[427]=-105.793, Ua= 0.000, err=-105.793 ug[428]=189.065, Ua= 0.000, err=189.065 ug[429]=-145.123, Ua= 0.000, err=-145.123 ug[430]=-9.027, Ua= 0.000, err=-9.02664 ug[431]= 0.154, Ua= 0.000, err=0.153744 ug[432]= 8.018, Ua= 0.000, err=8.01807 ug[433]=-45.568, Ua= 0.000, err=-45.5675 ug[434]=105.801, Ua= 0.000, err=105.801 ug[435]=-78.655, Ua= 0.000, err=-78.6555 ug[436]=35.000, Ua= 0.000, err=34.9998 ug[437]=34.579, Ua= 0.000, err=34.5787 ug[438]=-53.529, Ua= 0.000, err=-53.5294 ug[439]= 1.290, Ua= 0.000, err=1.2901 ug[440]=-4.306, Ua= 0.000, err=-4.30637 ug[441]= 2.524, Ua= 0.000, err=2.5242 ug[442]=-1.864, Ua= 0.000, err=-1.8641 ug[443]= 0.687, Ua= 0.000, err=0.686906 ug[444]= 0.891, Ua= 0.000, err=0.890979 ug[445]= 0.323, Ua= 0.000, err=0.323366 ug[446]=-1.996, Ua= 0.000, err=-1.99579 ug[447]= 0.509, Ua= 0.000, err=0.509075 ug[448]= 1.853, Ua= 0.000, err=1.85292 ug[449]= 1.964, Ua= 0.000, err=1.96355 ug[450]= 1.813, Ua= 0.000, err=1.81265 ug[451]= 1.606, Ua= 0.000, err=1.60609 ug[452]= 1.737, Ua= 0.000, err=1.73674 ug[453]= 1.700, Ua= 0.000, err=1.70026 ug[454]= 1.700, Ua= 0.000, err=1.70026 ug[455]= 1.804, Ua= 0.000, err=1.80387 ug[456]= 1.664, Ua= 0.000, err=1.6642 ug[457]=-45.611, Ua= 0.000, err=-45.6105 ug[458]=70.410, Ua= 0.000, err=70.4099 ug[459]=-54.224, Ua= 0.000, err=-54.2235 ug[460]=-16.633, Ua= 0.000, err=-16.6327 ug[461]=11.168, Ua= 0.000, err=11.1679 ug[462]= 8.712, Ua= 0.000, err=8.71238 ug[463]= 0.113, Ua= 0.000, err=0.112557 ug[464]=-0.245, Ua= 0.000, err=-0.245231 ug[465]= 1.853, Ua= 0.000, err=1.85292 ug[466]=-20.051, Ua= 0.000, err=-20.0507 ug[467]=-13.128, Ua= 0.000, err=-13.1283 ug[468]=21.681, Ua= 0.000, err=21.6807 ug[469]=-34.282, Ua= 0.000, err=-34.2824 ug[470]=65.209, Ua= 0.000, err=65.2086 ug[471]=-51.156, Ua= 0.000, err=-51.1557 ug[472]=-11.334, Ua= 0.000, err=-11.3344 ug[473]=-5.645, Ua= 0.000, err=-5.64506 ug[474]= 8.230, Ua= 0.000, err=8.22963 ug[475]=13.868, Ua= 0.000, err=13.8681 ug[476]=-29.204, Ua= 0.000, err=-29.2043 ug[477]=21.590, Ua= 0.000, err=21.5896 ug[478]=-9.134, Ua= 0.000, err=-9.13373 ug[479]= 5.439, Ua= 0.000, err=5.43894 ug[480]=-6.956, Ua= 0.000, err=-6.95564 ug[481]=-29.111, Ua= 0.000, err=-29.1108 ug[482]=55.977, Ua= 0.000, err=55.9767 ug[483]=-44.015, Ua= 0.000, err=-44.0146 ug[484]=-24.994, Ua= 0.000, err=-24.9942 ug[485]=-17.385, Ua= 0.000, err=-17.3851 ug[486]=28.041, Ua= 0.000, err=28.0406 ug[487]=-52.159, Ua= 0.000, err=-52.1593 ug[488]=105.185, Ua= 0.000, err=105.185 ug[489]=-81.858, Ua= 0.000, err=-81.858 ug[490]=-6.855, Ua= 0.000, err=-6.8555 ug[491]=-1.687, Ua= 0.000, err=-1.68683 ug[492]=-0.689, Ua= 0.000, err=-0.689436 ug[493]= 2.710, Ua= 0.000, err=2.70974 ug[494]=-8.391, Ua= 0.000, err=-8.39086 ug[495]= 5.652, Ua= 0.000, err=5.65174 ug[496]=-3.610, Ua= 0.000, err=-3.60976 ug[497]= 1.938, Ua= 0.000, err=1.93785 ug[498]=-0.017, Ua= 0.000, err=-0.0165945 ug[499]=-3.581, Ua= 0.000, err=-3.58089 ug[500]= 7.224, Ua= 0.000, err=7.22445 ug[501]=-7.331, Ua= 0.000, err=-7.33052 ug[502]=-381.196, Ua= 0.000, err=-381.196 ug[503]=-451.464, Ua= 0.000, err=-451.464 ug[504]=508.345, Ua= 0.000, err=508.345 ug[505]=89.657, Ua= 0.000, err=89.657 ug[506]=-235.308, Ua= 0.000, err=-235.308 ug[507]=107.001, Ua= 0.000, err=107.001 ug[508]=-88.986, Ua= 0.000, err=-88.9862 ug[509]=-113.145, Ua= 0.000, err=-113.145 ug[510]= 1.002, Ua= 0.000, err=1.0019 ug[511]= 1.002, Ua= 0.000, err=1.0019 ug[512]=127.438, Ua= 0.000, err=127.438 ug[513]=11.389, Ua= 0.000, err=11.3893 ug[514]=-1082.097, Ua= 0.000, err=-1082.1 ug[515]=847.841, Ua= 0.000, err=847.841 ug[516]=720.725, Ua= 0.000, err=720.725 ug[517]=117.048, Ua= 0.000, err=117.048 ug[518]=581.884, Ua= 0.000, err=581.884 ug[519]=-464.262, Ua= 0.000, err=-464.262 ug[520]=63.560, Ua= 0.000, err=63.5596 ug[521]= 1.893, Ua= 0.000, err=1.89308 ug[522]=-36.703, Ua= 0.000, err=-36.7029 ug[523]=156.075, Ua= 0.000, err=156.075 ug[524]=-182.464, Ua= 0.000, err=-182.464 ug[525]=141.747, Ua= 0.000, err=141.747 ug[526]=-78.186, Ua= 0.000, err=-78.1856 ug[527]=-0.594, Ua= 0.000, err=-0.594404 ug[528]=112.121, Ua= 0.000, err=112.121 ug[529]= 1.093, Ua= 0.000, err=1.09342 ug[530]=35.080, Ua= 0.000, err=35.0804 ug[531]= 3.239, Ua= 0.000, err=3.23909 ug[532]=-307.428, Ua= 0.000, err=-307.428 ug[533]=241.212, Ua= 0.000, err=241.212 ug[534]=202.731, Ua= 0.000, err=202.731 ug[535]=31.477, Ua= 0.000, err=31.4773 ug[536]=169.485, Ua= 0.000, err=169.485 ug[537]=-137.701, Ua= 0.000, err=-137.701 ug[538]= 1.588, Ua= 0.000, err=1.58772 ug[539]=-2.712, Ua= 0.000, err=-2.71197 ug[540]=-0.788, Ua= 0.000, err=-0.788194 ug[541]=12.201, Ua= 0.000, err=12.2012 ug[542]=-29.952, Ua= 0.000, err=-29.9518 ug[543]=22.625, Ua= 0.000, err=22.6247 ug[544]=-5.959, Ua= 0.000, err=-5.95894 ug[545]=-4.691, Ua= 0.000, err=-4.69089 ug[546]= 9.500, Ua= 0.000, err=9.49958 ug[547]= 1.488, Ua= 0.000, err=1.48837 ug[548]= 1.606, Ua= 0.000, err=1.60609 ug[549]= 1.521, Ua= 0.000, err=1.52093 ug[550]= 1.444, Ua= 0.000, err=1.4443 ug[551]= 1.521, Ua= 0.000, err=1.52093 ug[552]= 1.554, Ua= 0.000, err=1.5539 ug[553]= 1.554, Ua= 0.000, err=1.5539 ug[554]= 1.676, Ua= 0.000, err=1.67639 ug[555]= 1.588, Ua= 0.000, err=1.58772 ug[556]=-302.619, Ua= 0.000, err=-302.619 ug[557]=-358.749, Ua= 0.000, err=-358.749 ug[558]=403.631, Ua= 0.000, err=403.631 ug[559]=70.962, Ua= 0.000, err=70.9618 ug[560]=-186.317, Ua= 0.000, err=-186.317 ug[561]=84.412, Ua= 0.000, err=84.4119 ug[562]=-70.961, Ua= 0.000, err=-70.9609 ug[563]=-90.256, Ua= 0.000, err=-90.2558 ug[564]= 1.093, Ua= 0.000, err=1.09342 ug[565]=-188.588, Ua= 0.000, err=-188.588 ug[566]=349.627, Ua= 0.000, err=349.627 ug[567]=-228.393, Ua= 0.000, err=-228.393 ug[568]=-317.104, Ua= 0.000, err=-317.104 ug[569]=228.404, Ua= 0.000, err=228.404 ug[570]=200.348, Ua= 0.000, err=200.348 ug[571]=-22.503, Ua= 0.000, err=-22.5029 ug[572]=270.573, Ua= 0.000, err=270.573 ug[573]=-195.752, Ua= 0.000, err=-195.752 ug[574]=21.928, Ua= 0.000, err=21.9277 ug[575]= 7.175, Ua= 0.000, err=7.17463 ug[576]=-14.318, Ua= 0.000, err=-14.3185 ug[577]=30.967, Ua= 0.000, err=30.9675 ug[578]=-9.364, Ua= 0.000, err=-9.36393 ug[579]= 8.756, Ua= 0.000, err=8.75596 ug[580]=-12.052, Ua= 0.000, err=-12.0524 ug[581]= 9.733, Ua= 0.000, err=9.73328 ug[582]=17.123, Ua= 0.000, err=17.1232 ug[583]=121.466, Ua= 0.000, err=121.466 ug[584]=-225.659, Ua= 0.000, err=-225.659 ug[585]=140.730, Ua= 0.000, err=140.73 ug[586]=239.099, Ua= 0.000, err=239.099 ug[587]=-174.872, Ua= 0.000, err=-174.872 ug[588]=-154.997, Ua= 0.000, err=-154.997 ug[589]=15.013, Ua= 0.000, err=15.0135 ug[590]=-199.789, Ua= 0.000, err=-199.789 ug[591]=135.721, Ua= 0.000, err=135.721 ug[592]=-15.691, Ua= 0.000, err=-15.691 ug[593]= 0.141, Ua= 0.000, err=0.140733 ug[594]= 8.984, Ua= 0.000, err=8.98374 ug[595]=-39.197, Ua= 0.000, err=-39.1968 ug[596]=49.072, Ua= 0.000, err=49.0723 ug[597]=-37.669, Ua= 0.000, err=-37.6686 ug[598]=21.611, Ua= 0.000, err=21.6108 ug[599]= 0.651, Ua= 0.000, err=0.651241 ug[600]=-30.879, Ua= 0.000, err=-30.8793 ug[601]=-9.751, Ua= 0.000, err=-9.75051 ug[602]=22.083, Ua= 0.000, err=22.0829 ug[603]=-15.757, Ua= 0.000, err=-15.7574 ug[604]=-15.597, Ua= 0.000, err=-15.5975 ug[605]=12.233, Ua= 0.000, err=12.2325 ug[606]= 4.627, Ua= 0.000, err=4.62711 ug[607]=-10.609, Ua= 0.000, err=-10.6092 ug[608]=32.668, Ua= 0.000, err=32.6682 ug[609]=-26.271, Ua= 0.000, err=-26.2709 ug[610]= 1.588, Ua= 0.000, err=1.58772 ug[611]= 1.676, Ua= 0.000, err=1.67639 ug[612]= 1.554, Ua= 0.000, err=1.5539 ug[613]= 1.444, Ua= 0.000, err=1.4443 ug[614]= 1.554, Ua= 0.000, err=1.5539 ug[615]= 1.521, Ua= 0.000, err=1.52093 ug[616]= 1.521, Ua= 0.000, err=1.52093 ug[617]= 1.606, Ua= 0.000, err=1.60609 ug[618]= 1.488, Ua= 0.000, err=1.48837 ug[619]=-71.872, Ua= 0.000, err=-71.8723 ug[620]=134.254, Ua= 0.000, err=134.254 ug[621]=-117.371, Ua= 0.000, err=-117.371 ug[622]=62.517, Ua= 0.000, err=62.5167 ug[623]=-64.351, Ua= 0.000, err=-64.3507 ug[624]=-29.746, Ua= 0.000, err=-29.7456 ug[625]=-4.318, Ua= 0.000, err=-4.31816 ug[626]=-12.893, Ua= 0.000, err=-12.8928 ug[627]= 1.588, Ua= 0.000, err=1.58772 ug[628]=-28.907, Ua= 0.000, err=-28.907 ug[629]=-5.059, Ua= 0.000, err=-5.05854 ug[630]=19.325, Ua= 0.000, err=19.3248 ug[631]=-45.926, Ua= 0.000, err=-45.9258 ug[632]=28.187, Ua= 0.000, err=28.1867 ug[633]=-22.152, Ua= 0.000, err=-22.1522 ug[634]=15.335, Ua= 0.000, err=15.335 ug[635]= 0.266, Ua= 0.000, err=0.265994 ug[636]=-24.912, Ua= 0.000, err=-24.9121 ug[637]=60.150, Ua= 0.000, err=60.1496 ug[638]=-124.842, Ua= 0.000, err=-124.842 ug[639]=81.205, Ua= 0.000, err=81.205 ug[640]=129.272, Ua= 0.000, err=129.272 ug[641]=-99.057, Ua= 0.000, err=-99.0574 ug[642]=-75.709, Ua= 0.000, err=-75.7087 ug[643]=13.788, Ua= 0.000, err=13.7885 ug[644]=-122.576, Ua= 0.000, err=-122.576 ug[645]=91.924, Ua= 0.000, err=91.9245 ug[646]=-29.160, Ua= 0.000, err=-29.1605 ug[647]=-3.388, Ua= 0.000, err=-3.38795 ug[648]=18.372, Ua= 0.000, err=18.3723 ug[649]=-54.353, Ua= 0.000, err=-54.3532 ug[650]=48.020, Ua= 0.000, err=48.0197 ug[651]=-37.270, Ua= 0.000, err=-37.2702 ug[652]=25.331, Ua= 0.000, err=25.3313 ug[653]=-0.402, Ua= 0.000, err=-0.40227 ug[654]=-37.210, Ua= 0.000, err=-37.2103 ug[655]=-2.651, Ua= 0.000, err=-2.65082 ug[656]= 7.398, Ua= 0.000, err=7.3979 ug[657]=-5.552, Ua= 0.000, err=-5.55248 ug[658]=-4.489, Ua= 0.000, err=-4.48854 ug[659]= 3.863, Ua= 0.000, err=3.86253 ug[660]= 0.372, Ua= 0.000, err=0.372185 ug[661]=-3.924, Ua= 0.000, err=-3.92435 ug[662]=11.715, Ua= 0.000, err=11.7154 ug[663]=-10.528, Ua= 0.000, err=-10.5285 ug[664]=-366.090, Ua= 0.000, err=-366.09 ug[665]=218.567, Ua= 0.000, err=218.567 ug[666]=98.455, Ua= 0.000, err=98.4548 ug[667]=-2085.612, Ua= 0.000, err=-2085.61 ug[668]=3531.047, Ua= 0.000, err=3531.05 ug[669]=-2725.828, Ua= 0.000, err=-2725.83 ug[670]=1265.736, Ua= 0.000, err=1265.74 ug[671]=132.542, Ua= 0.000, err=132.542 ug[672]=-1727.634, Ua= 0.000, err=-1727.63 ug[673]=-2412.248, Ua= 0.000, err=-2412.25 ug[674]=5082.668, Ua= 0.000, err=5082.67 ug[675]=-3680.121, Ua= 0.000, err=-3680.12 ug[676]=-3130.248, Ua= 0.000, err=-3130.25 ug[677]=2327.289, Ua= 0.000, err=2327.29 ug[678]=1289.224, Ua= 0.000, err=1289.22 ug[679]=-1048.107, Ua= 0.000, err=-1048.11 ug[680]=4472.543, Ua= 0.000, err=4472.54 ug[681]=-4009.753, Ua= 0.000, err=-4009.75 ug[682]=-1537.212, Ua= 0.000, err=-1537.21 ug[683]=-1817.309, Ua= 0.000, err=-1817.31 ug[684]=2049.360, Ua= 0.000, err=2049.36 ug[685]=364.038, Ua= 0.000, err=364.038 ug[686]=-954.143, Ua= 0.000, err=-954.143 ug[687]=437.072, Ua= 0.000, err=437.072 ug[688]=-355.581, Ua= 0.000, err=-355.581 ug[689]=-452.126, Ua= 0.000, err=-452.126 ug[690]= 1.024, Ua= 0.000, err=1.02407 ug[691]= 1.024, Ua= 0.000, err=1.02407 ug[692]=-12.833, Ua= 0.000, err=-12.8332 ug[693]=-1.091, Ua= 0.000, err=-1.09073 ug[694]=96.458, Ua= 0.000, err=96.4579 ug[695]=-75.112, Ua= 0.000, err=-75.1122 ug[696]=-67.070, Ua= 0.000, err=-67.0697 ug[697]=-12.862, Ua= 0.000, err=-12.862 ug[698]=-46.150, Ua= 0.000, err=-46.1495 ug[699]=33.332, Ua= 0.000, err=33.3318 ug[700]=56.149, Ua= 0.000, err=56.1486 ug[701]=-44.315, Ua= 0.000, err=-44.3152 ug[702]=-36.964, Ua= 0.000, err=-36.9636 ug[703]=25.614, Ua= 0.000, err=25.6141 ug[704]=-4.793, Ua= 0.000, err=-4.79316 ug[705]=-32.795, Ua= 0.000, err=-32.795 ug[706]=16.722, Ua= 0.000, err=16.7217 ug[707]=-20.723, Ua= 0.000, err=-20.7232 ug[708]=-8.057, Ua= 0.000, err=-8.05741 ug[709]=-72.979, Ua= 0.000, err=-72.9787 ug[710]=151.243, Ua= 0.000, err=151.243 ug[711]=-107.306, Ua= 0.000, err=-107.306 ug[712]=-103.073, Ua= 0.000, err=-103.073 ug[713]=76.472, Ua= 0.000, err=76.472 ug[714]=47.718, Ua= 0.000, err=47.718 ug[715]=-28.546, Ua= 0.000, err=-28.5459 ug[716]=134.271, Ua= 0.000, err=134.271 ug[717]=-116.148, Ua= 0.000, err=-116.148 ug[718]=21.976, Ua= 0.000, err=21.9762 ug[719]=17.515, Ua= 0.000, err=17.5152 ug[720]=-25.351, Ua= 0.000, err=-25.3508 ug[721]=-63.725, Ua= 0.000, err=-63.7251 ug[722]=166.641, Ua= 0.000, err=166.641 ug[723]=-130.967, Ua= 0.000, err=-130.967 ug[724]=56.089, Ua= 0.000, err=56.0889 ug[725]=-8.353, Ua= 0.000, err=-8.35306 ug[726]=-66.553, Ua= 0.000, err=-66.5528 ug[727]=-63.575, Ua= 0.000, err=-63.5747 ug[728]=179.060, Ua= 0.000, err=179.06 ug[729]=-127.889, Ua= 0.000, err=-127.889 ug[730]=-142.537, Ua= 0.000, err=-142.537 ug[731]=119.337, Ua= 0.000, err=119.337 ug[732]=37.227, Ua= 0.000, err=37.2272 ug[733]=-83.464, Ua= 0.000, err=-83.4645 ug[734]=281.805, Ua= 0.000, err=281.805 ug[735]=-247.405, Ua= 0.000, err=-247.405 ug[736]=-114.730, Ua= 0.000, err=-114.73 ug[737]=-56.887, Ua= 0.000, err=-56.8873 ug[738]=90.720, Ua= 0.000, err=90.7202 ug[739]=-18.218, Ua= 0.000, err=-18.2179 ug[740]=-228.310, Ua= 0.000, err=-228.31 ug[741]=172.162, Ua= 0.000, err=172.162 ug[742]=-38.974, Ua= 0.000, err=-38.9738 ug[743]=-36.546, Ua= 0.000, err=-36.5456 ug[744]=38.701, Ua= 0.000, err=38.7015 ug[745]= 1.237, Ua= 0.000, err=1.23689 ug[746]=-7.685, Ua= 0.000, err=-7.68546 ug[747]=-0.493, Ua= 0.000, err=-0.493144 ug[748]=49.879, Ua= 0.000, err=49.8794 ug[749]=-38.547, Ua= 0.000, err=-38.5471 ug[750]=-36.439, Ua= 0.000, err=-36.4388 ug[751]=-8.231, Ua= 0.000, err=-8.23122 ug[752]=-20.177, Ua= 0.000, err=-20.1767 ug[753]=12.198, Ua= 0.000, err=12.1976 ug[754]=67.544, Ua= 0.000, err=67.5435 ug[755]=-51.709, Ua= 0.000, err=-51.7089 ug[756]=-50.938, Ua= 0.000, err=-50.9383 ug[757]= 9.103, Ua= 0.000, err=9.10267 ug[758]=-19.425, Ua= 0.000, err=-19.4247 ug[759]=-11.536, Ua= 0.000, err=-11.5357 ug[760]=18.519, Ua= 0.000, err=18.5188 ug[761]=-24.692, Ua= 0.000, err=-24.6918 ug[762]=-7.356, Ua= 0.000, err=-7.35606 ug[763]=-37.777, Ua= 0.000, err=-37.7773 ug[764]=67.061, Ua= 0.000, err=67.0607 ug[765]=-43.630, Ua= 0.000, err=-43.63 ug[766]=-59.955, Ua= 0.000, err=-59.9551 ug[767]=42.242, Ua= 0.000, err=42.2422 ug[768]=40.227, Ua= 0.000, err=40.227 ug[769]=-0.811, Ua= 0.000, err=-0.811406 ug[770]=43.644, Ua= 0.000, err=43.6443 ug[771]=-29.937, Ua= 0.000, err=-29.9368 ug[772]= 2.178, Ua= 0.000, err=2.1784 ug[773]= 1.119, Ua= 0.000, err=1.11861 ug[774]= 0.644, Ua= 0.000, err=0.643754 ug[775]=33.444, Ua= 0.000, err=33.4436 ug[776]=-83.511, Ua= 0.000, err=-83.5109 ug[777]=70.133, Ua= 0.000, err=70.1335 ug[778]= 7.368, Ua= 0.000, err=7.36752 ug[779]=12.740, Ua= 0.000, err=12.74 ug[780]=-4.688, Ua= 0.000, err=-4.68825 ug[781]= 6.572, Ua= 0.000, err=6.5717 ug[782]=-18.780, Ua= 0.000, err=-18.7796 ug[783]=16.825, Ua= 0.000, err=16.8253 ug[784]=-2.427, Ua= 0.000, err=-2.42726 ug[785]= 1.457, Ua= 0.000, err=1.4573 ug[786]= 8.577, Ua= 0.000, err=8.57713 ug[787]= 8.456, Ua= 0.000, err=8.45617 ug[788]=-15.777, Ua= 0.000, err=-15.7773 ug[789]=18.621, Ua= 0.000, err=18.6213 ug[790]=39.812, Ua= 0.000, err=39.8118 ug[791]= 6.481, Ua= 0.000, err=6.48062 ug[792]=-28.728, Ua= 0.000, err=-28.7279 ug[793]=45.894, Ua= 0.000, err=45.8943 ug[794]=-21.891, Ua= 0.000, err=-21.8907 ug[795]=14.879, Ua= 0.000, err=14.8794 ug[796]=-16.251, Ua= 0.000, err=-16.2505 ug[797]=-9.992, Ua= 0.000, err=-9.99172 ug[798]=29.883, Ua= 0.000, err=29.8833 ug[799]= 1.878, Ua= 0.000, err=1.87784 ug[800]= 2.041, Ua= 0.000, err=2.04132 ug[801]= 1.917, Ua= 0.000, err=1.91741 ug[802]= 1.804, Ua= 0.000, err=1.80387 ug[803]= 1.917, Ua= 0.000, err=1.91741 ug[804]= 1.957, Ua= 0.000, err=1.9574 ug[805]= 1.957, Ua= 0.000, err=1.9574 ug[806]= 2.126, Ua= 0.000, err=2.12565 ug[807]= 1.998, Ua= 0.000, err=1.99823 ug[808]= 1.606, Ua= 0.000, err=1.60609 ug[809]= 1.700, Ua= 0.000, err=1.70026 ug[810]= 1.737, Ua= 0.000, err=1.73674 ug[811]= 1.774, Ua= 0.000, err=1.77406 ug[812]= 1.737, Ua= 0.000, err=1.73674 ug[813]= 1.881, Ua= 0.000, err=1.88119 ug[814]= 1.881, Ua= 0.000, err=1.88119 ug[815]= 1.998, Ua= 0.000, err=1.99823 ug[816]= 2.040, Ua= 0.000, err=2.04032 ug[817]= 2.040, Ua= 0.000, err=2.04032 ug[818]= 2.215, Ua= 0.000, err=2.21502 ug[819]= 2.084, Ua= 0.000, err=2.0841 ug[820]= 1.964, Ua= 0.000, err=1.96355 ug[821]= 2.084, Ua= 0.000, err=2.0841 ug[822]= 2.130, Ua= 0.000, err=2.12998 ug[823]= 2.130, Ua= 0.000, err=2.12998 ug[824]= 2.313, Ua= 0.000, err=2.31282 ug[825]= 2.178, Ua= 0.000, err=2.1784 ug[826]=-290.609, Ua= 0.000, err=-290.609 ug[827]=173.500, Ua= 0.000, err=173.5 ug[828]=78.178, Ua= 0.000, err=78.1776 ug[829]=-1655.444, Ua= 0.000, err=-1655.44 ug[830]=2802.762, Ua= 0.000, err=2802.76 ug[831]=-2163.606, Ua= 0.000, err=-2163.61 ug[832]=1004.651, Ua= 0.000, err=1004.65 ug[833]=105.290, Ua= 0.000, err=105.29 ug[834]=-1371.298, Ua= 0.000, err=-1371.3 ug[835]=-1915.330, Ua= 0.000, err=-1915.33 ug[836]=4035.415, Ua= 0.000, err=4035.41 ug[837]=-2921.802, Ua= 0.000, err=-2921.8 ug[838]=-2485.413, Ua= 0.000, err=-2485.41 ug[839]=1847.812, Ua= 0.000, err=1847.81 ug[840]=1023.861, Ua= 0.000, err=1023.86 ug[841]=-831.905, Ua= 0.000, err=-831.905 ug[842]=3550.563, Ua= 0.000, err=3550.56 ug[843]=-3183.082, Ua= 0.000, err=-3183.08 ug[844]=-1219.699, Ua= 0.000, err=-1219.7 ug[845]=-1442.439, Ua= 0.000, err=-1442.44 ug[846]=1626.167, Ua= 0.000, err=1626.17 ug[847]=288.548, Ua= 0.000, err=288.548 ug[848]=-756.376, Ua= 0.000, err=-756.376 ug[849]=346.039, Ua= 0.000, err=346.039 ug[850]=-282.587, Ua= 0.000, err=-282.587 ug[851]=-359.361, Ua= 0.000, err=-359.361 ug[852]= 1.237, Ua= 0.000, err=1.23689 ug[853]=-42.047, Ua= 0.000, err=-42.0466 ug[854]=55.240, Ua= 0.000, err=55.2397 ug[855]=-34.986, Ua= 0.000, err=-34.9863 ug[856]=-42.368, Ua= 0.000, err=-42.3685 ug[857]=23.229, Ua= 0.000, err=23.2286 ug[858]=44.481, Ua= 0.000, err=44.4807 ug[859]=23.117, Ua= 0.000, err=23.1173 ug[860]=-20.914, Ua= 0.000, err=-20.9144 ug[861]=27.288, Ua= 0.000, err=27.2879 ug[862]=-201.529, Ua= 0.000, err=-201.529 ug[863]=139.044, Ua= 0.000, err=139.044 ug[864]=165.111, Ua= 0.000, err=165.111 ug[865]= 7.409, Ua= 0.000, err=7.40865 ug[866]=74.461, Ua= 0.000, err=74.461 ug[867]=-6.158, Ua= 0.000, err=-6.15801 ug[868]=-43.222, Ua= 0.000, err=-43.2221 ug[869]=62.836, Ua= 0.000, err=62.8359 ug[870]=19.987, Ua= 0.000, err=19.9868 ug[871]=57.379, Ua= 0.000, err=57.3789 ug[872]=-83.782, Ua= 0.000, err=-83.7823 ug[873]=56.836, Ua= 0.000, err=56.836 ug[874]=52.003, Ua= 0.000, err=52.0029 ug[875]=-29.012, Ua= 0.000, err=-29.0116 ug[876]=-48.408, Ua= 0.000, err=-48.4081 ug[877]=-21.080, Ua= 0.000, err=-21.0798 ug[878]= 9.780, Ua= 0.000, err=9.78029 ug[879]=-14.837, Ua= 0.000, err=-14.837 ug[880]= 9.163, Ua= 0.000, err=9.16349 ug[881]= 3.847, Ua= 0.000, err=3.84721 ug[882]=-8.569, Ua= 0.000, err=-8.56936 ug[883]=-6.624, Ua= 0.000, err=-6.62407 ug[884]=28.894, Ua= 0.000, err=28.8944 ug[885]=-23.145, Ua= 0.000, err=-23.1452 ug[886]= 9.531, Ua= 0.000, err=9.53096 ug[887]=-4.233, Ua= 0.000, err=-4.23262 ug[888]=-9.698, Ua= 0.000, err=-9.69773 ug[889]= 6.132, Ua= 0.000, err=6.13175 ug[890]= 2.768, Ua= 0.000, err=2.7679 ug[891]=-2.557, Ua= 0.000, err=-2.55679 ug[892]=-6.953, Ua= 0.000, err=-6.9529 ug[893]= 9.521, Ua= 0.000, err=9.5206 ug[894]=-6.663, Ua= 0.000, err=-6.66298 ug[895]=-16.761, Ua= 0.000, err=-16.7609 ug[896]=41.482, Ua= 0.000, err=41.4822 ug[897]=-37.663, Ua= 0.000, err=-37.663 ug[898]=-24.028, Ua= 0.000, err=-24.0281 ug[899]=-10.492, Ua= 0.000, err=-10.4921 ug[900]=17.282, Ua= 0.000, err=17.282 ug[901]=-18.303, Ua= 0.000, err=-18.3032 ug[902]=-21.340, Ua= 0.000, err=-21.3397 ug[903]=14.947, Ua= 0.000, err=14.9471 ug[904]= 2.323, Ua= 0.000, err=2.3229 ug[905]=-10.983, Ua= 0.000, err=-10.9831 ug[906]=-4.640, Ua= 0.000, err=-4.63971 ug[907]=10.689, Ua= 0.000, err=10.6892 ug[908]=-0.914, Ua= 0.000, err=-0.91385 ug[909]=-3.365, Ua= 0.000, err=-3.36543 ug[910]=10.005, Ua= 0.000, err=10.0055 ug[911]=-2.278, Ua= 0.000, err=-2.27786 ug[912]=-23.012, Ua= 0.000, err=-23.0118 ug[913]=-22.157, Ua= 0.000, err=-22.1569 ug[914]=41.405, Ua= 0.000, err=41.4054 ug[915]=-44.197, Ua= 0.000, err=-44.1974 ug[916]=217.869, Ua= 0.000, err=217.869 ug[917]=-153.685, Ua= 0.000, err=-153.685 ug[918]=-187.809, Ua= 0.000, err=-187.809 ug[919]=-43.696, Ua= 0.000, err=-43.6962 ug[920]=-105.430, Ua= 0.000, err=-105.43 ug[921]=54.371, Ua= 0.000, err=54.3715 ug[922]=48.584, Ua= 0.000, err=48.5842 ug[923]=-72.483, Ua= 0.000, err=-72.4827 ug[924]=-16.935, Ua= 0.000, err=-16.9354 ug[925]=-62.537, Ua= 0.000, err=-62.5371 ug[926]=94.916, Ua= 0.000, err=94.9158 ug[927]=-67.681, Ua= 0.000, err=-67.6813 ug[928]=-44.719, Ua= 0.000, err=-44.7185 ug[929]=22.964, Ua= 0.000, err=22.964 ug[930]=40.348, Ua= 0.000, err=40.348 ug[931]=18.504, Ua= 0.000, err=18.5043 ug[932]=-9.247, Ua= 0.000, err=-9.24747 ug[933]= 8.882, Ua= 0.000, err=8.88167 ug[934]=-3.836, Ua= 0.000, err=-3.83611 ug[935]=-2.843, Ua= 0.000, err=-2.84329 ug[936]= 4.177, Ua= 0.000, err=4.17739 ug[937]= 9.428, Ua= 0.000, err=9.42817 ug[938]=-25.730, Ua= 0.000, err=-25.7301 ug[939]=20.177, Ua= 0.000, err=20.1773 ug[940]=-8.168, Ua= 0.000, err=-8.16828 ug[941]= 1.402, Ua= 0.000, err=1.40182 ug[942]= 9.789, Ua= 0.000, err=9.78873 ug[943]= 1.771, Ua= 0.000, err=1.77107 ug[944]=-13.119, Ua= 0.000, err=-13.1187 ug[945]=11.543, Ua= 0.000, err=11.5427 ug[946]= 4.608, Ua= 0.000, err=4.60788 ug[947]=-6.307, Ua= 0.000, err=-6.30677 ug[948]= 8.610, Ua= 0.000, err=8.60972 ug[949]=18.589, Ua= 0.000, err=18.5892 ug[950]=-41.540, Ua= 0.000, err=-41.5404 ug[951]=36.823, Ua= 0.000, err=36.8226 ug[952]=15.183, Ua= 0.000, err=15.1833 ug[953]= 9.725, Ua= 0.000, err=9.72489 ug[954]=-12.141, Ua= 0.000, err=-12.1407 ug[955]=-5.132, Ua= 0.000, err=-5.13196 ug[956]=47.494, Ua= 0.000, err=47.4943 ug[957]=-35.430, Ua= 0.000, err=-35.4299 ug[958]= 7.853, Ua= 0.000, err=7.85325 ug[959]= 9.140, Ua= 0.000, err=9.14022 ug[960]=-10.323, Ua= 0.000, err=-10.323 ug[961]=-1.814, Ua= 0.000, err=-1.81439 ug[962]= 2.422, Ua= 0.000, err=2.42242 ug[963]=-2.306, Ua= 0.000, err=-2.30596 ug[964]= 2.484, Ua= 0.000, err=2.48358 ug[965]=-1.829, Ua= 0.000, err=-1.82861 ug[966]=-3.169, Ua= 0.000, err=-3.16941 ug[967]=-2.285, Ua= 0.000, err=-2.28508 ug[968]= 2.547, Ua= 0.000, err=2.54717 ug[969]=-2.898, Ua= 0.000, err=-2.89811 ug[970]=11.645, Ua= 0.000, err=11.6452 ug[971]=-8.615, Ua= 0.000, err=-8.61452 ug[972]=-9.230, Ua= 0.000, err=-9.22995 ug[973]= 1.412, Ua= 0.000, err=1.41206 ug[974]=-3.713, Ua= 0.000, err=-3.7127 ug[975]=-1.560, Ua= 0.000, err=-1.56002 ug[976]= 3.731, Ua= 0.000, err=3.73145 ug[977]=-4.930, Ua= 0.000, err=-4.93003 ug[978]=-1.224, Ua= 0.000, err=-1.22437 ug[979]=-1.983, Ua= 0.000, err=-1.98282 ug[980]= 2.690, Ua= 0.000, err=2.69046 ug[981]=-2.534, Ua= 0.000, err=-2.53423 ug[982]= 2.657, Ua= 0.000, err=2.65734 ug[983]=-1.888, Ua= 0.000, err=-1.8878 ug[984]=-3.620, Ua= 0.000, err=-3.62033 ug[985]=-2.609, Ua= 0.000, err=-2.60912 ug[986]= 2.856, Ua= 0.000, err=2.85564 ug[987]=-3.323, Ua= 0.000, err=-3.32281 ug[988]= 2.178, Ua= 0.000, err=2.1784 ug[989]= 2.313, Ua= 0.000, err=2.31282 ug[990]= 2.130, Ua= 0.000, err=2.12998 ug[991]= 1.964, Ua= 0.000, err=1.96355 ug[992]= 2.130, Ua= 0.000, err=2.12998 ug[993]= 2.084, Ua= 0.000, err=2.0841 ug[994]= 2.084, Ua= 0.000, err=2.0841 ug[995]= 2.215, Ua= 0.000, err=2.21502 ug[996]= 2.040, Ua= 0.000, err=2.04032 ug[997]= 1.676, Ua= 0.000, err=1.67639 ug[998]= 1.813, Ua= 0.000, err=1.81265 ug[999]= 1.774, Ua= 0.000, err=1.77406 ug[1000]= 1.737, Ua= 0.000, err=1.73674 ug[1001]= 1.774, Ua= 0.000, err=1.77406 ug[1002]= 1.881, Ua= 0.000, err=1.88119 ug[1003]= 1.881, Ua= 0.000, err=1.88119 ug[1004]= 2.040, Ua= 0.000, err=2.04032 ug[1005]= 1.998, Ua= 0.000, err=1.99823 ug[1006]= 1.998, Ua= 0.000, err=1.99823 ug[1007]= 2.126, Ua= 0.000, err=2.12565 ug[1008]= 1.957, Ua= 0.000, err=1.9574 ug[1009]= 1.804, Ua= 0.000, err=1.80387 ug[1010]= 1.957, Ua= 0.000, err=1.9574 ug[1011]= 1.917, Ua= 0.000, err=1.91741 ug[1012]= 1.917, Ua= 0.000, err=1.91741 ug[1013]= 2.041, Ua= 0.000, err=2.04132 ug[1014]= 1.878, Ua= 0.000, err=1.87784 ug[1015]=-42.056, Ua= 0.000, err=-42.0557 ug[1016]=66.906, Ua= 0.000, err=66.9062 ug[1017]=-47.953, Ua= 0.000, err=-47.953 ug[1018]=-37.592, Ua= 0.000, err=-37.5923 ug[1019]=23.713, Ua= 0.000, err=23.7132 ug[1020]=26.725, Ua= 0.000, err=26.7254 ug[1021]= 4.837, Ua= 0.000, err=4.8366 ug[1022]=15.265, Ua= 0.000, err=15.2648 ug[1023]=-11.909, Ua= 0.000, err=-11.9091 ug[1024]=-0.266, Ua= 0.000, err=-0.265541 ug[1025]=-5.176, Ua= 0.000, err=-5.1757 ug[1026]=-5.786, Ua= 0.000, err=-5.78645 ug[1027]=-28.368, Ua= 0.000, err=-28.3683 ug[1028]=-19.663, Ua= 0.000, err=-19.6626 ug[1029]=37.972, Ua= 0.000, err=37.9722 ug[1030]= 1.923, Ua= 0.000, err=1.92327 ug[1031]=-4.027, Ua= 0.000, err=-4.02736 ug[1032]= 3.934, Ua= 0.000, err=3.9341 ug[1033]= 7.726, Ua= 0.000, err=7.72558 ug[1034]=-17.257, Ua= 0.000, err=-17.2567 ug[1035]=13.122, Ua= 0.000, err=13.1224 ug[1036]= 3.978, Ua= 0.000, err=3.97762 ug[1037]=-1.926, Ua= 0.000, err=-1.92552 ug[1038]=-3.754, Ua= 0.000, err=-3.75442 ug[1039]=-0.751, Ua= 0.000, err=-0.751052 ug[1040]=-2.856, Ua= 0.000, err=-2.85619 ug[1041]= 2.178, Ua= 0.000, err=2.1784 ug[1042]=-4.093, Ua= 0.000, err=-4.09259 ug[1043]= 2.856, Ua= 0.000, err=2.85564 ug[1044]=-1.012, Ua= 0.000, err=-1.01176 ug[1045]=-1.362, Ua= 0.000, err=-1.36168 ug[1046]=-14.599, Ua= 0.000, err=-14.5988 ug[1047]=10.887, Ua= 0.000, err=10.8872 ug[1048]=-2.924, Ua= 0.000, err=-2.92439 ug[1049]= 2.690, Ua= 0.000, err=2.69046 ug[1050]=-0.671, Ua= 0.000, err=-0.671458 ug[1051]=-16.585, Ua= 0.000, err=-16.585 ug[1052]=21.938, Ua= 0.000, err=21.9382 ug[1053]=-16.979, Ua= 0.000, err=-16.9785 ug[1054]=-3.325, Ua= 0.000, err=-3.32521 ug[1055]=-0.570, Ua= 0.000, err=-0.569649 ug[1056]= 4.843, Ua= 0.000, err=4.84299 ug[1057]= 5.076, Ua= 0.000, err=5.07553 ug[1058]=-9.351, Ua= 0.000, err=-9.35058 ug[1059]= 6.743, Ua= 0.000, err=6.74313 ug[1060]=-3.152, Ua= 0.000, err=-3.15209 ug[1061]= 2.547, Ua= 0.000, err=2.54717 ug[1062]=-0.777, Ua= 0.000, err=-0.777208 ug[1063]=-4.287, Ua= 0.000, err=-4.28696 ug[1064]= 0.600, Ua= 0.000, err=0.600171 ug[1065]=-1.170, Ua= 0.000, err=-1.16972 ug[1066]=-2.739, Ua= 0.000, err=-2.7388 ug[1067]= 2.422, Ua= 0.000, err=2.42242 ug[1068]=-0.671, Ua= 0.000, err=-0.670522 ug[1069]= 3.343, Ua= 0.000, err=3.34318 ug[1070]=-0.551, Ua= 0.000, err=-0.550717 ug[1071]=-0.228, Ua= 0.000, err=-0.228406 ug[1072]= 0.955, Ua= 0.000, err=0.954518 ug[1073]= 0.740, Ua= 0.000, err=0.739903 ug[1074]=-4.686, Ua= 0.000, err=-4.68636 ug[1075]=-5.361, Ua= 0.000, err=-5.36075 ug[1076]=11.693, Ua= 0.000, err=11.6931 ug[1077]=-12.423, Ua= 0.000, err=-12.4226 ug[1078]=70.195, Ua= 0.000, err=70.1949 ug[1079]=-52.185, Ua= 0.000, err=-52.1855 ug[1080]=-54.007, Ua= 0.000, err=-54.0075 ug[1081]= 0.483, Ua= 0.000, err=0.483182 ug[1082]=-23.506, Ua= 0.000, err=-23.506 ug[1083]=-2.101, Ua= 0.000, err=-2.10137 ug[1084]=13.316, Ua= 0.000, err=13.3159 ug[1085]=-19.499, Ua= 0.000, err=-19.4989 ug[1086]=-6.667, Ua= 0.000, err=-6.66701 ug[1087]=-13.341, Ua= 0.000, err=-13.3412 ug[1088]=17.317, Ua= 0.000, err=17.3167 ug[1089]=-13.599, Ua= 0.000, err=-13.599 ug[1090]=-1.366, Ua= 0.000, err=-1.36608 ug[1091]=-1.548, Ua= 0.000, err=-1.54816 ug[1092]= 3.093, Ua= 0.000, err=3.09322 ug[1093]= 4.252, Ua= 0.000, err=4.25179 ug[1094]=-8.826, Ua= 0.000, err=-8.82575 ug[1095]= 6.232, Ua= 0.000, err=6.23221 ug[1096]=-5.573, Ua= 0.000, err=-5.5729 ug[1097]= 3.835, Ua= 0.000, err=3.83534 ug[1098]=-1.409, Ua= 0.000, err=-1.40915 ug[1099]=-0.796, Ua= 0.000, err=-0.795912 ug[1100]=-20.991, Ua= 0.000, err=-20.9913 ug[1101]=15.639, Ua= 0.000, err=15.6393 ug[1102]=-3.808, Ua= 0.000, err=-3.80766 ug[1103]= 3.537, Ua= 0.000, err=3.5367 ug[1104]=-0.861, Ua= 0.000, err=-0.8606 ug[1105]=-17.720, Ua= 0.000, err=-17.72 ug[1106]=24.524, Ua= 0.000, err=24.5239 ug[1107]=-18.814, Ua= 0.000, err=-18.814 ug[1108]=-2.413, Ua= 0.000, err=-2.41271 ug[1109]=-2.343, Ua= 0.000, err=-2.34271 ug[1110]= 6.691, Ua= 0.000, err=6.69146 ug[1111]= 9.636, Ua= 0.000, err=9.6363 ug[1112]=-19.356, Ua= 0.000, err=-19.356 ug[1113]=14.424, Ua= 0.000, err=14.4245 ug[1114]=-3.624, Ua= 0.000, err=-3.6236 ug[1115]= 3.276, Ua= 0.000, err=3.27587 ug[1116]=-0.852, Ua= 0.000, err=-0.851819 ug[1117]=-8.649, Ua= 0.000, err=-8.64931 ug[1118]=14.591, Ua= 0.000, err=14.5914 ug[1119]=-12.563, Ua= 0.000, err=-12.5633 ug[1120]=-3.698, Ua= 0.000, err=-3.69827 ug[1121]= 3.049, Ua= 0.000, err=3.04919 ug[1122]=-0.927, Ua= 0.000, err=-0.92661 ug[1123]=-2.326, Ua= 0.000, err=-2.3256 ug[1124]= 3.049, Ua= 0.000, err=3.04919 ug[1125]=-2.941, Ua= 0.000, err=-2.94084 ug[1126]= 3.449, Ua= 0.000, err=3.44869 ug[1127]=-2.643, Ua= 0.000, err=-2.64295 ug[1128]=-4.014, Ua= 0.000, err=-4.01414 ug[1129]=-2.908, Ua= 0.000, err=-2.90815 ug[1130]= 3.276, Ua= 0.000, err=3.27587 ug[1131]=-3.668, Ua= 0.000, err=-3.66796 ug[1132]=18.749, Ua= 0.000, err=18.7487 ug[1133]=-13.837, Ua= 0.000, err=-13.8372 ug[1134]=-15.155, Ua= 0.000, err=-15.1547 ug[1135]=-0.411, Ua= 0.000, err=-0.410527 ug[1136]=-7.165, Ua= 0.000, err=-7.16549 ug[1137]= 0.541, Ua= 0.000, err=0.540824 ug[1138]= 4.663, Ua= 0.000, err=4.66292 ug[1139]=-6.566, Ua= 0.000, err=-6.56597 ug[1140]=-1.609, Ua= 0.000, err=-1.60933 ug[1141]=-2.587, Ua= 0.000, err=-2.58701 ug[1142]= 3.537, Ua= 0.000, err=3.5367 ug[1143]=-3.295, Ua= 0.000, err=-3.29478 ug[1144]= 3.308, Ua= 0.000, err=3.30847 ug[1145]=-2.223, Ua= 0.000, err=-2.22335 ug[1146]=-5.098, Ua= 0.000, err=-5.09778 ug[1147]=-3.723, Ua= 0.000, err=-3.72297 ug[1148]= 3.835, Ua= 0.000, err=3.83534 ug[1149]=-4.701, Ua= 0.000, err=-4.70063 maxerr=5082.67, avgerr=139.948