2 question
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2 question ---------------------------------------------------------- (1 point) Consider the ordered bases B =( (8-4] [: • and c-...
(1 point) Consider the ordered bases B = a. Find the transition matrix from C to B. 3 01 To Olmedi 011-3 0. *1 for the vector space V of lower triangular 2 x 2 matrices with zero trace. 3 4 01) and C=-5 -1/'1-23] b. Find the coordinates of M in the ordered basis B if the coordinate vector of M in C is M c [ MB = C. Find M. M =
(1 point) Consider the ordered bases B = {-(7 + 3x), –(2+ x)} and C = {2,3 + x} for the vector space P2. a. Find the transition matrix from C to the standard ordered basis E = {1,x}. TE = b. Find the transition matrix from B to E. Te = c. Find the transition matrix from E to B. 100 TB = d. Find the transition matrix from C to B. TB = 11. !!! e. Find the...
(1 point) Consider the ordered bases B = (1 – X,4 – 3x) and C = (-(3 + 2x), 4x – 2) for the vector space P2[x]. a. Find the transition matrix from C to the standard ordered basis E = (1, x). -3 2 TE = -2 b. Find the transition matrix from B to E. 1 -1 T = 4 -3 c. Find the transition matrix from E to B. -3 1 T = 4/7 -1/7 d. Find...
(1 point) Consider the ordered bases B-(_ (5 + 9z) ,-(1 + 2) and C-(1-42, 3} for the vector space P2 c. Find the transition matrix from & to B -2 2 -10 f. Find the coordinates of q(z) in the ordered basis B if the coordinate vector of q(z) in C is [q(z)]c g(z)] B
1. Consider the following two ordered bases: Bu = {(5), (3) B2 = { 1-2) /1 1-2 ) B = 11-5)' ( 2 ) (a) Find the transition matrix from B1 to B2. (b) Use your transition matrix from part (a) to compute the Bi-coordinate vector for [(3 4)T]12
Let B = {(1,0), (0, 1)} and B' = {(0, 1), (1, 1)} be two bases for the vector space V = RP. Moreover, let [y]g = [1 -2]" and the matrix for T relative to B be 2 A= 22 -2 2. (a) Find the transition matrix P from B' to B. (b) Use the matrices P and A to find [v] and [T(0) В" (C) Find A' (the matrix for T relative to B'). (d) Find (T(m)]g
(1 point) Find a basis for the column space of 0 A = -1 2 3 3 - 1 2 0 - 1 -4 0 2 Basis = (1 point) Find the dimensions of the following vector spaces. (a) The vector space RS 25x4 (b) The vector space R? (c) The vector space of 6 x 6 matrices with trace 0 (d) The vector space of all diagonal 6 x 6 matrices (e) The vector space P3[x] of polynomials with...
2) Let B = {(1, 3, 4), (2,-5,2), (-4,2-6)) and B/-(( 1, 2,-2), (4, 1,-4), (-2, 5, 8)) be 5 ordered bases of R2. Let x = | 8 | in the standard basis of R2. a) Use a matrix and x to find L18 ]B. b) Use a matrix and [X]B to find [x)B/. c) Use a matrix and [X]B/ to find x in the standard basis of R2, d) Draw a diagram of the steps a), b), and...
only for c,d and e Question 6 (12 marks) Consider the ordered bases - { and -3 0 of M22 (you do not need to prove that they M2,2 defined by bases) and the linear transformation T: M22 - are T(Q) 2Q (a) Verify that T is a linear transformation (b) Find the kernel of T (c) Find the transition matrix Psg from B to S (d) Use your answer in part (c) to calculate the transition matrix PBs from...
linear algebra Let V (71, 72, 3}, where 71 73=(2,0,3). (1,3,-1), 2 = (0, 1,4), and (a) Prove: V is a basis. (b) Find the coordinates of (b, b2, bs) with respect to V = {71, U2, 3,}. (c) Suppose M and M' are matrices whose columns span the same vector space V. Let b be the coordinates of relative to M. Write a matrix equation that gives b', the coordinates of relative to M'. (Your answer should be a...