Question: Let V be a Let's define Vo = 0 By vector space Then there exists the following theorem Let spaces, S = { V,

Let V be a Let's define Vo = 0 By vector space Then there exists the following theorem "Let spaces, S = { V, V,..., Vn} Such that. with ordered V basis of a a unique linear for all transformation. that I (vi) = Wi lincar and w V there IS a T (V;) = V + Vj - 1 for all je {1,2,..., n} Calculate [T]B bases be vector and transformation W, W,..., Wnew. TV-W that know i = 1, 2,..., n" T: VV defined by We

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