Let S = {-1,0,1} and T : P2(R) Fun(S) be the transformation T(p(x)) = p(x) and consider the ordered bases E = {1, x, x x } | the standard basis of P2(R) F = {1 + x, 1 - x, x + 2x)} a basis of source P2(R) E' = {x X1, X0, XI x1} the standard basis of Fun(S) G = {x1, X-1+2x1, x0 - 2x-1+21)} a basis of target Fun(S) Calculate the matrix Mg(T) representing T relative to input basis B and output basis C for the bases below: M(T) = M (T) = M(T) MG(T) = MC(T) =