Find the matrix of the given linear transformation T with respect to the given basis. Determine whether T is an isomorphism. If I isn't an isomorphism, find bases of the kernel and image of T, and thus determine the rank of T. T (f (t)) = f (3) from P₂ to P₂ a. Find the matrix A of T with respect to the basis ß₁ = {1, t, t²} for P₂. X 1 0 0 0 3 0 0 0 9

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Find the matrix of the given linear transformation T with respect to the given basis. Determine whether T is an isomorphism. If I isn't an isomorphism, find bases of the kernel and image of T, and thus determine the rank of T. T (ƒ (t)) = ƒ (3) from P₂ to P₂ a. Find the matrix A of T with respect to the basis ß₁ = {1, t, t²} for P₂. X 1 0 0 0 3 0 0 0 9