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and 02 Let T : R2 + RP be the linear transformation satisfying 9 5 Tū1) = [ and T(v2) = [ - -5 -1 X Find the image of an arbitrary vector [ Y -([:) - 1
Please answer the following. Thank you. (1 point) Let A--5-5-5 5 |. Find basis for the kernal and image of the linear transformation T defined by T(刃 L-5-1 5, Kernel basis: Image basis: To enter a basis into WeBWorK, place the entries of each vector inside of brackets, and enter a list of these vectors, separated by commas. For instance, if your basis is2 1 I&, then you would enter [1,2,3],[1,1,1] into the answer blank. 3] L1 (1 point) Let...
(1 point) Let T : P3-> P3 be the linear transformation such that Find T(1). T(x). T(r2), and T(az2 + bz+ c), where a, b, and c are arbitrary real numbers. T(1) = T(z) = T(r2) Note: You can earn partial credit on this problem.
(1 point) Let [ 4 51 [ 51 A = -1 -2 and b = 1 : 1-3 -3] 1-6] Define the linear transformation T : R2 → R3 by T(x) = Añ. Find a vector à whose image under T is b. Is the vector x unique? choose
(1 point) Let A- [7 ] Define the linear transformation T: R2 + R by T) = A. Find the following. 1([-])- 7([]) -
X1 Let x = V = and v2 - and let T: R2R2 be a linear transformation that maps x into xxv, + XxV2. Find a matrix A such that T(x) is Ax for each x. X2 A= Assume that is a linear transformation. Find the standard matrix of T. T:R3-R2, T(41) = (1,3), and T(62) =(-4,6), and T(03) = (3. – 2), where e1, 22, and ez are the columns of the 3*3 identity matrix. A= (Type an integer...
(1 point) Let S be a linear transformation from R2 to R2 with associated matrix A= Let T be a linear transformation from IR2 to R2 3 1 ]' Determine the matrix C of the composition ToS
Let t be the linear transformation t: r2 -> r2 that reflects a vector about the line y=x. Find the eigenvalue and eigenvectors of T. How can you interpret this geometrically?
Consider the following. T is the projection onto the vector w = (3, 1) in R2: : T(v) = projwv, v = (1, 4). (a) Find the standard matrix A for the linear transformation T. A = (b) Use A to find the image of the vector v. T(v)
13. Let L : R2 → R2 be the linear transformation satisfying L(111) 1 , and L(1-11) A. B. D. E.