1. Let D = {d, d2} and B = {b,, b;} be bases for vector spaces V and W, respectively. Let T:V - W be a linear transformation with the property that T(d) = 2b1 – 4b2, T(d,) = -4b, + 5b. Find the matrix for T relative to D and B. 2. If –2+ 5i is an eigenvalue of A, list another eigenvalue of A.

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1. Let D = {d, d2} and B = {b,, b;} be bases for vector spaces V and W, respectively. Let T:V → W be a linear transformation with the property that T(dı) = 2b1 – 4b2, T(d,) = -4b, + 5b,. Find the matrix for T relative to D and B. 2. If -2+ 5i is an eigenvalue of A, list another eigenvalue of A. G) + (~^) i is an eigenvector of A, find another eigenvector of A. 3. If (1 1 0\ 1 1 0 X = 1 0 1 4. Find the least-squares solution to the system using the normal 1 0 1/ equations. 5. Find Q where Q is from the QR factorization of 3 -5) -1 9 2 -9 3 6. List 3 non-zero vectors in Rº that are orthogonal. (You must verify that they are orthogonal.)