5. (8 pts) Suppose B is a 4 x 5 matrix, and the associated linear transformation T(E) Bd, is onto. (a) (3) Find dim Nul(B) (b) (2) Does Ba 5 have a unique solution for every B (c) (3) Give a geom...
2. (a) Let T be the linear transformation which projects R3 orthogonally onto the plane 2x+3y+4a-0. what are the eigenvalues and associated eigenspaces of T? Justify your answer (b) Does the linear transformation described in (a) have an inverse? Why, or why not? [10 pts] 2. (a) Let T be the linear transformation which projects R3 orthogonally onto the plane 2x+3y+4a-0. what are the eigenvalues and associated eigenspaces of T? Justify your answer (b) Does the linear transformation described in...
Find the matrix of the linear transformation T: V →W relative to B and C. Suppose B = {bı, b2, b3} is a basis for V and C = {C1, C2} is a basis for W. Let T be defined by T(b]) = 261 + C2 T(62) = -501 +502 T(b3) = 2C1-802 2. 3 0 2 -6 [3 0 -6 1 5-8 2 -5 2 5 -8 2 1 -5 5 2 -8
1. (8 pts.) Suppose T is a linear transformation and -(1)-(C). --- () - 0 Solve the matrix vector equations below. Explain 2. (8 pts.) Below are a matrix A, its inverse, and a vector b. 1983--013... (1) A = A-1 = 1-4 3 2 -5 7 2 0 1) , and b = x) Determine the value of x. Then solve the matrix vector equation Av = b. [-u-5 il 14 s1 3 70 | 71-3-70 12 x 12...
2. (a) Let T be the linear transformation which projects R^3 orthogonally onto the plane 2x+3y+4z = 0. What are the eigenvalues and associated eigenspaces of T? Justify your answer. (b) Does the linear transformation described in (a) have an inverse? Why, or why not?
12 3-5 2 U 0 0 0 0 3 (2) A matri A is no1 0 (Thi is not the matris A) (2) A matrix A iownuivalent to This is nohe matrix A! 11 pts] Give the rank and nullity of Λ. rank(A)--null(.)-- 4 pts Does Ar have a solution for every rigt-haud-side ector BYes or No Justify your aswer 2 pts Give a gemetric description for the set all veetrswih the property that A has a solution 4 ptsl...