You have to use symmetrical components to transform ABC to 012. It is worth noting the IEEE 13 nodes is an unbalanced system, then by using the 012 you have to neglect the non-diagonal elements in the PI model. Here it is an excerpt of a script to solve this problem:
w = 2*pi*60;
a = -0.5 + j*.86603;
a2 = -0.5 - j*.86603;
A = [
1 1 1
1 a2 a
1 a a2
];
Z_601=R_601 +X_601*i./mi2km;
Z_601s = inv(A)*Z_601*A;
R_601s = real(Z_601s);
X_601s = imag(Z_601s);
L_601s = X_601s/w;
R_601_10 = [R_601s(2,2) R_601s(1,1)];
L_601_10 = [L_601s(2,2) L_601s(1,1)];
B_601 = B_601./mi2km;
C_601s = B_601*ms2F;
C_601s = real(inv(A)*C_601*A);
C_601_10 = [C_601s(2,2) C_601s(1,1)];
