11-Dec-2018 16:05:16 CC_PROJECT_TEST MATLAB version Normal end of execution. COMPARE_FF_TEST: Compare Boyd's rule to similar rules. From the results, Boyd's rule is the same as F2 Use order N = 5 Stand: "Standard" Clenshaw Curtis rule, endpoints. FF: Boyd's rule for [-1,+1], rho = 1, no endpoints CC1: Clenshaw-Curtis 1, rho = 1/sqrt(1-x^2), no endpoints CC2: Clenshaw-Curtis 2, rho = sqrt(1-x^2), no endpoints CC3: Clenshaw-Curtis 3, rho = 1/sqrt(1-x^2), endpoints F1: Fejer 1, rho = 1, no endpoints F2: Fejer 2, rho = 1, no endpoints X: Stand FF CC1 CC2 CC3 F1 F2 -1.00 0.87 -0.95 -0.87 1.00 -0.95 -0.87 -0.71 0.50 -0.59 -0.50 0.71 -0.59 -0.50 0.00 0.00 0.00 0.00 0.00 0.00 0.00 0.71 -0.50 0.59 0.50 -0.71 0.59 0.50 1.00 -0.87 0.95 0.87 -1.00 0.95 0.87 W: Stand FF CC1 CC2 CC3 F1 F2 0.07 0.31 0.63 0.13 0.39 0.17 0.31 0.53 0.40 0.63 0.39 0.79 0.53 0.40 0.80 0.58 0.63 0.52 0.79 0.61 0.58 0.53 0.40 0.63 0.39 0.79 0.53 0.40 0.07 0.31 0.63 0.13 0.39 0.17 0.31 2.00 2.00 3.14 1.57 3.14 2.00 2.00 CARDINAL_COS_TEST Plot a cardinal cosine function. Graphics file saved as "cardinal_cos.png" CARDINAL_SIN_TEST Plot a cardinal sine function. Graphics file saved as "cardinal_sin.png" CARDINAL_TEST CARDINAL_COS evaluates cardinal cosine functions. CARDINAL_SIN evaluates cardinal sine functions. Ci(Tj) = Delta(i,j), where Tj = cos(pi*i/(n+1)). A simple check of all pairs should form the identity matrix. The CARDINAL_COS test matrix: 1.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 0.0 -0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 The CARDINAL_SIN test matrix: 1.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 0.0 -0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 -0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 -0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 -0.0 0.0 1.0 CCFF_TABULATE_TEST Tabulate CCF quadrature rules for the Legendre integral. Density function rho(x) = 1. Region: -1 <= x <= -1. Exactness: N-1. Print the first 5 rules: I X(I) W(I) 1 0.000000 2.000000 Sum 2.000000 1 0.500000 1.000000 2 -0.500000 1.000000 Sum 2.000000 1 0.707107 0.666667 2 0.000000 0.666667 3 -0.707107 0.666667 Sum 2.000000 1 0.809017 0.425464 2 0.309017 0.574536 3 -0.309017 0.574536 4 -0.809017 0.425464 Sum 2.000000 1 0.866025 0.311111 2 0.500000 0.400000 3 0.000000 0.577778 4 -0.500000 0.400000 5 -0.866025 0.311111 Sum 2.000000 Print the first 5 nested rules: I X(I) W(I) 1 0.000000 2.000000 Sum 2.000000 1 0.707107 0.666667 2 0.000000 0.666667 3 -0.707107 0.666667 Sum 2.000000 1 0.923880 0.177965 2 0.707107 0.247619 3 0.382683 0.393464 4 0.000000 0.361905 5 -0.382683 0.393464 6 -0.707107 0.247619 7 -0.923880 0.177965 Sum 2.000000 1 0.980785 0.045212 2 0.923880 0.067639 3 0.831470 0.116749 4 0.707107 0.131113 5 0.555570 0.171016 6 0.382683 0.173631 7 0.195090 0.200357 8 0.000000 0.188567 9 -0.195090 0.200357 10 -0.382683 0.173631 11 -0.555570 0.171016 12 -0.707107 0.131113 13 -0.831470 0.116749 14 -0.923880 0.067639 15 -0.980785 0.045212 Sum 2.000000 1 0.995185 0.011348 2 0.980785 0.017279 3 0.956940 0.030413 4 0.923880 0.035639 5 0.881921 0.048218 6 0.831470 0.052600 7 0.773010 0.064227 8 0.707107 0.067473 9 0.634393 0.077839 10 0.555570 0.079680 11 0.471397 0.088533 12 0.382683 0.088751 13 0.290285 0.095898 14 0.195090 0.094337 15 0.098017 0.099653 16 0.000000 0.096224 17 -0.098017 0.099653 18 -0.195090 0.094337 19 -0.290285 0.095898 20 -0.382683 0.088751 21 -0.471397 0.088533 22 -0.555570 0.079680 23 -0.634393 0.077839 24 -0.707107 0.067473 25 -0.773010 0.064227 26 -0.831470 0.052600 27 -0.881921 0.048218 28 -0.923880 0.035639 29 -0.956940 0.030413 30 -0.980785 0.017279 31 -0.995185 0.011348 Sum 2.000000 CCFI_0_TABULATE_TEST Tabulate CCFI_0 quadrature rules for the Laguerre integral. Density function rho(x) = exp(-x). Region: 0 <= x < +oo. Exactness: NONE. Print the first 5 rules: I X(I) W(I) 1 1.000000 1.471518 Sum 1.471518 1 3.000000 0.398297 2 0.333333 0.636917 Sum 1.035213 1 5.828427 0.045737 2 1.000000 0.490506 3 0.171573 0.385393 Sum 0.921636 1 9.472136 0.001796 2 1.894427 0.361970 3 0.527864 0.395556 4 0.105573 0.233969 Sum 0.993291 1 13.928203 0.000031 2 3.000000 0.159319 3 1.000000 0.425105 4 0.333333 0.254767 5 0.071797 0.166314 Sum 1.005536 Print the first 5 nested rules: I X(I) W(I) 1 1.000000 1.471518 Sum 1.471518 1 5.828427 0.045737 2 1.000000 0.490506 3 0.171573 0.385393 Sum 0.921636 1 25.274142 0.000000 2 5.828427 0.016988 3 2.239829 0.219874 4 1.000000 0.266275 5 0.446463 0.263386 6 0.171573 0.143146 7 0.039566 0.092433 Sum 1.002101 1 103.086869 0.000000 2 25.274142 0.000000 3 10.867296 0.000157 4 5.828427 0.008995 5 3.500149 0.052284 6 2.239829 0.097028 7 1.484751 0.140127 8 1.000000 0.138740 9 0.673514 0.143064 10 0.446463 0.116229 11 0.285702 0.106220 12 0.171573 0.075795 13 0.092019 0.063492 14 0.039566 0.035131 15 0.009701 0.022824 Sum 1.000085 1 414.345062 0.000000 2 103.086869 0.000000 3 45.447181 0.000000 4 25.274142 0.000000 5 15.937851 0.000001 6 10.867296 0.000071 7 7.810978 0.001010 8 5.828427 0.004629 9 4.470359 0.013327 10 3.500149 0.024360 11 2.783556 0.039173 12 2.239829 0.049596 13 1.818031 0.061818 14 1.484751 0.065978 15 1.217337 0.072517 16 1.000000 0.070797 17 0.821465 0.072702 18 0.673514 0.067361 19 0.550046 0.066464 20 0.446463 0.059410 21 0.359253 0.057102 22 0.285702 0.049490 23 0.223696 0.046598 24 0.171573 0.039005 25 0.128025 0.035952 26 0.092019 0.028606 27 0.062744 0.025573 28 0.039566 0.018511 29 0.022004 0.015537 30 0.009701 0.008723 31 0.002413 0.005688 Sum 1.000000 CCFI_1_TABULATE_TEST Tabulate CCFI_1 quadrature rules for the Laguerre integral. Density function rho(x) = 1. Region: 0 <= x < +oo. Exactness: NONE. Print the first 5 rules: I X(I) W(I) 1 1.000000 4.000000 Sum 4.000000 1 3.000000 8.000000 2 0.333333 0.888889 Sum 8.888889 1 5.828427 15.542472 2 1.000000 1.333333 3 0.171573 0.457528 Sum 17.333333 1 9.472136 23.329411 2 1.894427 2.406646 3 0.527864 0.670589 4 0.105573 0.260021 Sum 26.666667 1 13.928203 34.665750 2 3.000000 3.200000 3 1.000000 1.155556 4 0.333333 0.355556 5 0.071797 0.178694 Sum 39.555556 Print the first 5 nested rules: I X(I) W(I) 1 1.000000 4.000000 Sum 4.000000 1 5.828427 15.542472 2 1.000000 1.333333 3 0.171573 0.457528 Sum 17.333333 1 25.274142 61.427229 2 5.828427 5.772918 3 2.239829 2.064995 4 1.000000 0.723810 5 0.446463 0.411613 6 0.171573 0.169939 7 0.039566 0.096163 Sum 70.666667 1 103.086869 244.914262 2 25.274142 23.346701 3 10.867296 8.221017 4 5.828427 3.056738 5 3.500149 1.731649 6 2.239829 0.911256 7 1.484751 0.618501 8 1.000000 0.377134 9 0.673514 0.280565 10 0.446463 0.181640 11 0.285702 0.141347 12 0.171573 0.089982 13 0.092019 0.069612 14 0.039566 0.036549 15 0.009701 0.023047 Sum 284.000000 1 414.345062 978.850395 2 103.086869 93.602145 3 45.447181 32.805547 4 25.274142 12.301452 5 15.937851 6.916621 6 10.867296 3.703899 7 7.810978 2.493084 8 5.828427 1.573035 9 4.470359 1.164657 10 3.500149 0.806811 11 2.783556 0.633685 12 2.239829 0.465787 13 1.818031 0.380779 14 1.484751 0.291219 15 1.217337 0.244977 16 1.000000 0.192447 17 0.821465 0.165312 18 0.673514 0.132103 19 0.550046 0.115205 20 0.446463 0.092845 21 0.359253 0.081785 22 0.285702 0.065857 23 0.223696 0.058279 24 0.171573 0.046306 25 0.128025 0.040863 26 0.092019 0.031363 27 0.062744 0.027229 28 0.039566 0.019258 29 0.022004 0.015883 30 0.009701 0.008808 31 0.002413 0.005702 Sum 1137.333333 CCII_0_TABULATE_TEST Tabulate CCII_0 quadrature rules for the Hermite integral. Density function rho(x) = exp(-x^2). Region: -oo < x < +oo. Exactness: NONE. Print the first 5 rules: I X(I) W(I) 1 0.000000 0.392699 Sum 0.392699 1 0.577350 0.500233 2 -0.577350 0.500233 Sum 1.000466 1 1.000000 0.288932 2 0.000000 0.785398 3 -1.000000 0.288932 Sum 1.363262 1 1.376382 0.136764 2 0.324920 0.625054 3 -0.324920 0.625054 4 -1.376382 0.136764 Sum 1.523637 1 1.732051 0.052137 2 0.577350 0.500233 3 0.000000 0.523599 4 -0.577350 0.500233 5 -1.732051 0.052137 Sum 1.628339 Print the first 5 nested rules: I X(I) W(I) 1 0.000000 0.392699 Sum 0.392699 1 1.000000 0.288932 2 0.000000 0.785398 3 -1.000000 0.288932 Sum 1.363262 1 2.414214 0.003945 2 1.000000 0.288932 3 0.414214 0.387540 4 0.000000 0.392699 5 -0.414214 0.387540 6 -1.000000 0.288932 7 -2.414214 0.003945 Sum 1.753533 1 5.027339 0.000000 2 2.414214 0.003945 3 1.496606 0.067734 4 1.000000 0.144466 5 0.668179 0.181736 6 0.414214 0.193770 7 0.198912 0.196200 8 0.000000 0.196350 9 -0.198912 0.196200 10 -0.414214 0.193770 11 -0.668179 0.181736 12 -1.000000 0.144466 13 -1.496606 0.067734 14 -2.414214 0.003945 15 -5.027339 0.000000 Sum 1.772051 1 10.153170 0.000000 2 5.027339 0.000000 3 3.296558 0.000022 4 2.414214 0.001973 5 1.870868 0.013339 6 1.496606 0.033867 7 1.218504 0.055267 8 1.000000 0.072233 9 0.820679 0.083777 10 0.668179 0.090868 11 0.534511 0.094855 12 0.414214 0.096885 13 0.303347 0.097784 14 0.198912 0.098100 15 0.098491 0.098170 16 0.000000 0.098175 17 -0.098491 0.098170 18 -0.198912 0.098100 19 -0.303347 0.097784 20 -0.414214 0.096885 21 -0.534511 0.094855 22 -0.668179 0.090868 23 -0.820679 0.083777 24 -1.000000 0.072233 25 -1.218504 0.055267 26 -1.496606 0.033867 27 -1.870868 0.013339 28 -2.414214 0.001973 29 -3.296558 0.000022 30 -5.027339 0.000000 31 -10.153170 0.000000 Sum 1.772455 CCII_1_TABULATE_TEST Tabulate CCII_1 quadrature rules for the Hermite integral. Density function rho(x) = 1. Region: -oo < x < +oo. Exactness: NONE. Print the first 5 rules: I X(I) W(I) 1 0.000000 0.392699 Sum 0.392699 1 0.577350 0.698132 2 -0.577350 0.698132 Sum 1.396263 1 1.000000 0.785398 2 0.000000 0.785398 3 -1.000000 0.785398 Sum 2.356194 1 1.376382 0.909311 2 0.324920 0.694652 3 -0.324920 0.694652 4 -1.376382 0.909311 Sum 3.207926 1 1.732051 1.047198 2 0.577350 0.698132 3 0.000000 0.523599 4 -0.577350 0.698132 5 -1.732051 1.047198 Sum 4.014257 Print the first 5 nested rules: I X(I) W(I) 1 0.000000 0.392699 Sum 0.392699 1 1.000000 0.785398 2 0.000000 0.785398 3 -1.000000 0.785398 Sum 2.356194 1 2.414214 1.340759 2 1.000000 0.785398 3 0.414214 0.460076 4 0.000000 0.392699 5 -0.414214 0.460076 6 -1.000000 0.785398 7 -2.414214 1.340759 Sum 5.565164 1 5.027339 2.579458 2 2.414214 1.340759 3 1.496606 0.636139 4 1.000000 0.392699 5 0.668179 0.284012 6 0.414214 0.230038 7 0.198912 0.204118 8 0.000000 0.196350 9 -0.198912 0.204118 10 -0.414214 0.230038 11 -0.668179 0.284012 12 -1.000000 0.392699 13 -1.496606 0.636139 14 -2.414214 1.340759 15 -5.027339 2.579458 Sum 11.530795 1 10.153170 5.109352 2 5.027339 2.579458 3 3.296558 1.165069 4 2.414214 0.670379 5 1.870868 0.441801 6 1.496606 0.318069 7 1.218504 0.243940 8 1.000000 0.196350 9 0.820679 0.164297 10 0.668179 0.142006 11 0.534511 0.126224 12 0.414214 0.115019 13 0.303347 0.107209 14 0.198912 0.102059 15 0.098491 0.099127 16 0.000000 0.098175 17 -0.098491 0.099127 18 -0.198912 0.102059 19 -0.303347 0.107209 20 -0.414214 0.115019 21 -0.534511 0.126224 22 -0.668179 0.142006 23 -0.820679 0.164297 24 -1.000000 0.196350 25 -1.218504 0.243940 26 -1.496606 0.318069 27 -1.870868 0.441801 28 -2.414214 0.670379 29 -3.296558 1.165069 30 -5.027339 2.579458 31 -10.153170 5.109352 Sum 23.258892 CCFF_EXACTNESS_TEST Test exactness of CCFF quadrature rules for the Legendre integral. Density function rho(x) = 1. Region: -1 <= x <= +1. Exactness: N for N odd. N-1 for N even. LEGENDRE_EXACTNESS_TEST: Quadrature rule of order 1 for the Legendre integral. Degree Relative Error 0 0.0000000000000000 1 0.0000000000000001 2 1.0000000000000000 LEGENDRE_EXACTNESS_TEST: Quadrature rule of order 2 for the Legendre integral. Degree Relative Error 0 0.0000000000000002 1 0.0000000000000000 2 0.2500000000000001 LEGENDRE_EXACTNESS_TEST: Quadrature rule of order 3 for the Legendre integral. Degree Relative Error 0 0.0000000000000000 1 0.0000000000000001 2 0.0000000000000002 3 0.0000000000000001 4 0.1666666666666668 LEGENDRE_EXACTNESS_TEST: Quadrature rule of order 4 for the Legendre integral. Degree Relative Error 0 0.0000000000000000 1 0.0000000000000001 2 0.0000000000000002 3 0.0000000000000000 4 0.0625000000000001 LEGENDRE_EXACTNESS_TEST: Quadrature rule of order 5 for the Legendre integral. Degree Relative Error 0 0.0000000000000000 1 0.0000000000000001 2 0.0000000000000002 3 0.0000000000000001 4 0.0000000000000000 5 0.0000000000000000 6 0.0374999999999999 CCFI_0_EXACTNESS_TEST Test CCFI_0 rules on the Laguerre integral. Density function rho(x) = exp(-x). Region: 0 <= x < +oo. Exactness: NONE. LAGUERRE_EXACTNESS_TEST: Laguerre rule of order N = 1 Degree Relative Error 0 0.4715177646857689 1 0.4715177646857696 LAGUERRE_EXACTNESS_TEST: Laguerre rule of order N = 2 Degree Relative Error 0 0.0352132674529462 1 0.4071952143320792 2 0.8277187234936594 LAGUERRE_EXACTNESS_TEST: Laguerre rule of order N = 3 Degree Relative Error 0 0.0783638734930403 1 0.1767970673506645 2 0.0277788915706800 3 0.5913533466585218 LAGUERRE_EXACTNESS_TEST: Laguerre rule of order N = 4 Degree Relative Error 0 0.0067092006556096 1 0.0637650235087897 2 0.2135064230662245 3 0.3257640631988397 4 0.2021983295511916 LAGUERRE_EXACTNESS_TEST: Laguerre rule of order N = 5 Degree Relative Error 0 0.0055356645620166 1 0.0003554178997149 2 0.0529271563467727 3 0.1966850811665406 4 0.3958902027309439 5 0.5385424613419887 CCFI_1_EXACTNESS_TEST Test CCFI_1 rules on the Laguerre integrals. Density function rho(x) = 1. Region: 0 <= x < +oo. Exactness: NONE. LAGUERRE_EXACTNESS_TEST: Laguerre rule of order N = 1 Degree Relative Error 0 0.4715177646857689 1 0.4715177646857696 LAGUERRE_EXACTNESS_TEST: Laguerre rule of order N = 2 Degree Relative Error 0 0.0352132674529462 1 0.4071952143320792 2 0.8277187234936594 LAGUERRE_EXACTNESS_TEST: Laguerre rule of order N = 3 Degree Relative Error 0 0.0783638734930403 1 0.1767970673506645 2 0.0277788915706800 3 0.5913533466585218 LAGUERRE_EXACTNESS_TEST: Laguerre rule of order N = 4 Degree Relative Error 0 0.0067092006556096 1 0.0637650235087897 2 0.2135064230662245 3 0.3257640631988397 4 0.2021983295511916 LAGUERRE_EXACTNESS_TEST: Laguerre rule of order N = 5 Degree Relative Error 0 0.0055356645620166 1 0.0003554178997149 2 0.0529271563467727 3 0.1966850811665406 4 0.3958902027309439 5 0.5385424613419887 CCFF_ASYMPTOTIC_TEST Examine asymptotic quadrature error for Boyd's quadrature rule for the Legendre integral I(f) = integral ( -1 <= x <= +1 ) f(x) dx with f(x) = 1 / (x^4+x^2+0.9) N |Quad error| 5 7.67e-04 10 3.77e-05 15 1.04e-07 20 6.59e-09 25 5.57e-11 30 1.21e-12 35 1.71e-14 40 0.00e+00 45 0.00e+00 50 0.00e+00 CCFI_0_ASYMPTOTIC_TEST Examine asymptotic quadrature error for Boyd's quadrature rule for the Laguerre integral. CCFI_0: I(f) = integral ( 0 <= x < +oo ) f(x) exp(-x) dx with f(x) = x / (exp(x)-1) I(f) = 0.644934 N |Quad error| 5 2.59e-03 10 3.56e-05 15 1.95e-05 20 1.51e-06 25 5.80e-09 30 3.69e-09 35 3.34e-09 40 3.87e-10 45 1.02e-10 50 9.28e-12 CCFI_1_ASYMPTOTIC_TEST Examine asymptotic quadrature error for Boyd's quadrature rule for the Laguerre integral. CCFI_1: I(f) = integral ( 0 <= x < +oo ) f(x) dx with f(x) = x exp(-x) / (exp(x)-1) I(f) = 0.644934 N |Quad error| 5 2.59e-03 10 3.56e-05 15 1.95e-05 20 1.51e-06 25 5.80e-09 30 3.69e-09 35 3.34e-09 40 3.87e-10 45 1.02e-10 50 9.28e-12 CCII_ASYMPTOTIC_TEST Examine asymptotic quadrature error for Boyd's quadrature rule for I(f) = integral ( -oo < x < +oo ) f(x) dx with f(x) = exp ( -px ) / (1+exp(-qx)) N |Quad error| 5 2.11e-01 10 5.19e-02 15 1.65e-02 20 5.22e-03 25 1.44e-03 30 2.99e-04 35 2.24e-05 40 1.60e-05 45 8.52e-06 50 7.96e-07 CC_PROJECT_TEST Normal end of execution. 11-Dec-2018 16:05:18