Suppose that the map h: R2 → R2 is represented by the matrix ( 1 2...

Let A equal the 2x2 matrix: [1 -2] [2 -1] and let T=LA R2->R2. (Notice that...

Let A equal the 2x2 matrix: [1 -2] [2 -1] and let T=LA R2->R2. (Notice that this means T(x,y)=(x-2y,2x-y), and that the matrix representation of T with respect to the standard basis is A.) a. Find the matrix representation [T]BB where B={(1,1),(-1,1)} b. Find an invertible 2x2 matrix Q so that [T]B = Q-1AQ

. Given the matrix A = 1 1 3 -2 2 5 4 3 −1 2...

. Given the matrix A = 1 1 3 -2 2 5 4 3 −1 2 1 3 (a) Find a basis for the row space of A (b) Find a basis for the column space of A (c) Find the nullity of A

Find the inverse matrix of [ 3 2 3 1 ] [ 2 1 0 0...

Find the inverse matrix of [ 3 2 3 1 ] [ 2 1 0 0 ] [ 3 -5 1 0 ] [ 4 2 3 1 ] This is all one 4x4 matrix Required first step add second row multiplied by (-1) to first row try to not use fractions at all to solve this problem

1.Find the matrix product. 2  1  5 1 5  5  3 −5 5 2. Carry out the row operation on...

1.Find the matrix product. 2  1  5 1 5  5  3 −5 5 2. Carry out the row operation on the matrix. 1 5 R2 → R2  on    2   −3      −42 0   5      100

Consider the linear map ? : R2 → R2 which sends (1,0) ↦→ (−3,5) and (0,1)...

Consider the linear map ? : R2 → R2 which sends (1,0) ↦→ (−3,5) and (0,1) ↦→ (4, −1). (a) What is the matrix of the transformation? What is the change of coordinates matrix? Do they agree? How come? ( Please compute both the matrix of the transformation and the change of coordinates matrix!) (b) Where does this transformation send the area between the vector (4, 2) and the x-axis? Explain algebraically and draw a picture. (c) What is the...

Given a matrix F = [3 6 7] [0 2 1] [2 3 4]. Use Cramer’s...

Given a matrix F = [3 6 7] [0 2 1] [2 3 4]. Use Cramer’s rule to find the inverse matrix of F. Given a matrix G = [1 2 4] [0 -3 1] [0 0 3]. Use Cramer’s rule to find the inverse matrix of G. Given a matrix H = [3 0 0] [-1 1 0] [-2 3 2]. Use Cramer’s rule to find the inverse matrix of H.

1. f:R2 to R2 is a linear transformation so that f(1,2)=(16,4) and f(8,1)=(38,-43). Find f(4,-2). 2....

1. f:R2 to R2 is a linear transformation so that f(1,2)=(16,4) and f(8,1)=(38,-43). Find f(4,-2). 2. f:R2 to R2 is a linear transformation so that f(1,4)=(32,15) and f(7,1)=(35,-3). Find the determinant of the matrix of f.

Let V = W = R2. Choose the basis B = {x1, x2} of V ,...

Let V = W = R2. Choose the basis B = {x1, x2} of V , where x1 = (2, 3), x2 = (4,−5) and choose the basis D = {y1,y2} of W, where y1 = (1,1), y2 = (−3,4). Find the matrix of the identity linear mapping I : V → W with respect to these bases.

1. Let f : R2 → R2, f(x,y) = ?g(x,y),h(x,y)? where g,h : R2 → R....

1. Let f : R2 → R2, f(x,y) = ?g(x,y),h(x,y)? where g,h : R2 → R. Show that f is continuous at p0 ⇐⇒ both g,h are continuous at p0

Let M = ( (−3 1 3 4), (1 2 −1 −2), (−3 8 4 2))...

Let M = ( (−3 1 3 4), (1 2 −1 −2), (−3 8 4 2)) 14. (3 points) Let B1 be the basis for M you found by row reducing M and let B2 be the basis for M you found by row reducing M Transpose . Find the change of coordinate matrix from B2 to B1.