INTRODUCING TRANSFER MATRIX IN SOLVING LAPLACE EQUATION x Then we would easily manifest a and b in terms of A-, and n-1 as 2+ 2-2 B A,+ 3 R 1+2 B A,R,+ n-1.n
INTRODUCING TRANSFER MATRIX IN SOLVING LAPLACE EQUATION Then we would easily manifest An and Bn in terms of An-1 and Bn-1 as 1 1 1 1 1, 2 2 2 3 3 n n n n n n n n n B A A R − − − − − + − = + 1 1 1 1, 1 1 1 2 3 3 n n n n B A R B n n n n n − − − − − − + = +
INTRODUCING TRANSFER MATRIX IN SOLVING LAPLACE EQUATION x and further in matrix form Q1Q12 B八(Q1Q2八Bn where 2+ 2-2 Q Q12 3 R n-1,n 1+2 R in 22
INTRODUCING TRANSFER MATRIX IN SOLVING LAPLACE EQUATION and further in matrix form where 11 12 1 21 22 1 n n n n A A Q Q B B Q Q − − = 1 22 1 2 3 n n Q − + = 1 21 1, 1 3 n n Q Rn n − − − = 1 12 1, 2 2 1 3 n n n n Q R − − − = 1 11 2 3 n n Q − + =