Question

I need the answer to problem 4 (exercises 1, 2, 3)

Clear and step by step please

Problem 4. Let V be a vector space and let T : V → V and U : V → V be two linear transforinations 1. Show that. TU is also a linear transformation. 2. Show that aT is a linear transformation for any scalar a. 3. Suppose that T is invertible. Show that T-1 is also a linear transformation. Problem 5. Let T : R3 → R2 be a linear transformatio! 1. State the Dimension Theorem for T. 2. Show that T is not 1-1. 3. Give an example for which T is onto. Give an example for which T is not onto. (In each case show that your example has the required property. Do not just give an example with no explanation). Problem 6, Let T : V → W be a linear map. Suppose that it is one-to-one. Suppose th be the images . . . . ,蚴is a linearly independent subset of V. Let wi 2], . . . ,we-Tuk. Show that w].. that { uh are linearly independent.

Answer 1

(T + U) (alpha v_1 + v_2) = T(alpha v_1 + v_2) + U (alpha v_1 + v_2) = alpha T(v_1) + T(v_2) + alpha U (v_1) + U(v_2) = alpha (T(v_1) + U(v_1) + T(v_2) + U(v_2)) = alpha (T + U) (v_1) + (T + U) (v_2) Therefore T + U is linear (aT) (alpha v_1 + v_2) = aT (alpha v_1 + v_2) = a[alpha T(v_1) + T(v_2)] = alpha aT(v_1) + aT(v_2) = alpha (aT(v_1)) + aT(v_2) Therefore aT is linear. T^-1 is linear Since T^1oT = id therefore T^-1(a T(v) + b T(w_1)) = av + bw Now write v' = T(v) and w' = T(w) Therefore T^-1(av' + bw') = aT^-1 (v') + bT^-1(w') Therefore T^-1 is linear.