==== DIRICHLET - DIRICHLET PROBLEM ====
---- GALERKIN WEIGHTING FUNCTION ----
APPROXIMATING FUNCTION: F0(X) + A1*F1(X)
WHERE F0(X) = U0*(1-X/L)+UL*(X/L)
F1(X) = triangular shape
X AT LEFT END = 0.000000000000000E+000
X AT RIGHT END = 1.00000000000000
ALPHA = 1.00000000000000
NUMBER OF SEGMENTS = 100
DX FOR DERIVATIVE EVALUATION = 1.000000000000000E-003
-3.6666666667 * A1 + 0.2500000000 = 0
U(X) = F0(X) + 0.0681818182 * F1(X)
X= 0.000000 U(X)= 0.000000 DU/DX= 1.136364
X= 0.1000000 U(X)= 0.1136364 DU/DX= 1.136364
X= 0.2000000 U(X)= 0.2272727 DU/DX= 1.136364
X= 0.3000000 U(X)= 0.3409091 DU/DX= 1.136364
X= 0.4000000 U(X)= 0.4545455 DU/DX= 1.136364
X= 0.5000000 U(X)= 0.5681818 DU/DX= 1.000000
X= 0.6000000 U(X)= 0.6545455 DU/DX= 0.8636364
X= 0.7000000 U(X)= 0.7409091 DU/DX= 0.8636364
X= 0.8000000 U(X)= 0.8272727 DU/DX= 0.8636364
X= 0.9000000 U(X)= 0.9136364 DU/DX= 0.8636364
X= 1.000000 U(X)= 1.000000 DU/DX= 0.8636364