# x Phi(x,j) at j=nx, where nx= 40 -1.315789473684210E-02 0.2478547918578596 1.315789473684210E-02 0.2478547918578596 3.947368421052631E-02 0.1438086106841991 6.578947368421052E-02 0.1199030726088517 9.210526315789473E-02 3.384327928460301E-02 0.1184210526315789 -2.075724047748562E-02 0.1447368421052632 -0.1029424258099035 0.1710526315789473 -2.204143983721935E-02 0.1973684210526316 -7.383940093971925E-02 0.2236842105263158 -0.1184110907989519 0.2500000000000000 -0.1584064694379926 0.2763157894736842 -0.1233690425835350 0.3026315789473684 -7.141632428094763E-02 0.3289473684210526 -3.070152211566191E-02 0.3552631578947368 -2.596567664098559E-02 0.3815789473684211 -9.398130941947130E-02 0.4078947368421053 -3.956084510816815E-02 0.4342105263157894 -0.1680693245202246 0.4605263157894737 -5.906702330788766E-02 0.4868421052631579 5.695832385831162E-02 0.5131578947368420 -6.596925002333498E-03 0.5394736842105262 4.018060344383551E-02 0.5657894736842105 8.671809403550484E-02 0.5921052631578947 -2.706720045427202E-02 0.6184210526315789 4.607861898745241E-02 0.6447368421052631 0.2238738195836157 0.6710526315789472 0.1665320072929151 0.6973684210526315 0.1235887017272878 0.7236842105263157 0.1183093586109106 0.7499999999999999 0.1504672996444259 0.7763157894736842 0.1666576081647831 0.8026315789473684 7.049426389651198E-02 0.8289473684210525 4.065336321955387E-02 0.8552631578947367 -4.368323091807280E-02 0.8815789473684209 3.318998068586548E-02 0.9078947368421052 3.221741978210829E-02 0.9342105263157894 -3.109568894112991E-02 0.9605263157894736 -3.670853472898611E-02 0.9868421052631579 0.1038446269596936 1.013157894736842 0.1038446269596936