Endow the vector space P2 with the inner product (f,9) = | f(x)g(x) dæ (f, 9 € P2). (e) Show that the polynomials 1 and a are orthogonal to each other, and find a polynomial h(x) so that {1,x, h(x)} is an orthogonal basis for P2. (f) Define S = {x+1, x²} (a set of two polynormials). Evaluate S-. Find, if exists, a subspace U such that Ue S-= P2.

answer e and f

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2. Let p(x) = 2+ x, q(x) = 3 + x², r(x) = 1+ 2x + 7x2 be three vectors in P2, the vector space of polynomials of degree at most two. Consider the ordered bases B [1, p, q] and S= [1, x, x²]. (a) Evaluate the coordinate vector of r with respect to B. (b) Evaluate the change matrix from S to B. Define T : P2 -→ P2, T(f(x)) =f(0) + f(1)x - f(x) for all f e P2. Let A = MsB(T) be the matrix representation relative to B and S. (c) Evaluate A and compute all the eigenvalues of A. (d) Evaluate the eigenvalues of T and compute their algebraic and geometric multiplicities. Is T diagonalizable? Explain your answer. Endow the vector space P2 with the inner product (f, 9) = | f(r}g(x) dæ (f, 9 € P2). (e) Show that the polynomials 1 and r are orthogonal to each other, and find a polynomial h(x) so that {1, , h(x)} is an orthogonal basis for P2. (f) Define S = {x+1,x²} (a set of two polynomials). Evaluate S-. Find, if exists, a subspace U such that U OS- = P2.