A polynomial p(x) is even if p(-x) = p(x), and odd if
p(-x) = -p(x). Let En and On denote the set of even and oddpolynomials in Pn.

Show that En and On are vector subspaces of Pn and find a basis foreach of them.

2b) (5 pts) Determine whether V and W are subspaces of P4deg(p) S 4). If yes, find a basis. {p(x) ? P4 l p(x)-2x4 + ar' + 5bz2-ax + 7b where a, b R}

Let P_n denote the vector space of all polynomials with real coefficients and of degree at most n for n belongsto N. Define a function T: P_2 rightarrow P_3 by T(p)(x) = x^2 d/dx p(x), for all p(x) belongsto P_2. In addition, let B = {l, x, x^2} be the standard basis of P_2 and let C = {1, x, x^2, x^3} be the standard basis of P_3. (a) Find T(p) with p(x) = 2x^2 + x - 1. (b) Show that T: P_2 rightarrow P_3 is a linear transformation. (c) Find the matrix A for which [T(p(x))]_C = A [p(x)]_B for all p(x) belongsto P_2.

Lot P infinity be the vector space consisting of all polynomial functions. Which of the following arc subspaces of P infinity? Justify your answer in each case. The set of polynomials f(x) satisfying f(l) = 0. The set of polynomials f(x) satisfying f(0) = 1. The set of polynomials f(x) satisfying f(0) = f'(l). The set of polynomials f(x) satisfying f(0)f(l) = 0. The set of polynomials of the form ax2 + bx + a, where a. b are any real numbers.