dont wrong solution 2. Let B₁ be the basis x²e², xe, e of V = span(x²e, xe, x), and B₂ be the basis0·0T: V→W given by T(f) = [(2)] is linear, and find the matrix of T.thatthe mapof W = R². Show

Answered: Image /qna-images/answer/c3f55b76-617b-49ee-b04c-39ad80a8704c.jpg

2. Let B₁ be the basis r²e, ze, e of V = span(r²e², xe, x), and B₂ be the basis is H.6 of w that the map T:V → W given by T(f) = r = [12] ; is linear, and find the matrix of T. of W = R². Show

2. Let B₁ be the basis r²e, ze, e of V = span(r²e², xe, x), and B₂ be the basis is H.6 of w that the map T:V → W given by T(f) = r = [12] ; is linear, and find the matrix of T. of W = R². Show

Elementary Linear Algebra (MindTap Course List)

8th Edition

ISBN:9781305658004

Author:Ron Larson

Publisher:Ron Larson

Chapter6: Linear Transformations

Section6.3: Matrices For Linear Transformations

Problem 52E: Let T be a linear transformation T such that T(v)=kv for v in Rn. Find the standard matrix for T.

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Question

dont wrong solution

2. Let B₁ be the basis x²e², xe, e of V = span(x²e, xe, x), and B₂ be the basis
0·0
T: V→W given by T(f) = [(2)] is linear, and find the matrix of T.
that
the map
of W = R². Show

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