.. Let V R[r] be the vector space (over R) of all polynomials in a with real coefficients. Define the map T:VV by %3D T(f(r)) = xf(x). (i) Determine whether or not T is linear (provide a proof or counterexample, as appropriate). (ii) Determine whether or not T is injective (provide a proof or counterexample, as appropriate). (iii) Determine whether or not T is surjective (provide a proof or counterexample, as appropriate). (iv) Determine whether or not T is an isomorphism (explaining your answer).

please send handwritten solution for Q1 part I ii iii iv

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1. Let V = R[x] be the vector space (over R) of all polynomials in r with real coefficients. Define the map T:V V by T(f(r)) = r f(x). (i) Determine whether or not T is linear (provide a proof or counterexample, as appropriate). (ii) Determine whether or not T is injective (provide a proof or counterexample, as appropriate). (iii) Determine whether or not T is surjective (provide a proof or counterexample, as appropriate). (iv) Determine whether or not T is an isomorphism (explaining your answer). (v) Find ker(T). (vi) Find Im(T). (vii) Show that T has no eigenvectors. 2. Let 1 1 A = -2 -3 1 3 (i) Find the row rank of A. (ii) By finding a square submatrix of A of suitable size, show that the determi- nantal rank of A is at least 2. (iii) Use your answer to part (i) and any result from the lecture notes to find the column rank and determinantal rank of A.