Let uj = U2 = Vi = V2 and Va Let U = {u, uz) and let V = {v,, Va, Va). %3D (a) Let eju +Qu2 Solve for e and c in terms of r and y. (b) Is U a basis for R? (c) Is V à basis for R? (d) Let. L: R + R be...


Solve part (d) and (e)


Let uj =<br>U2 =<br>Vi =<br>V2<br>and Va<br>Let U = {u, uz) and let V = {v,, Va, Va).<br>%3D<br>(a) Let eju +Qu2<br>Solve for e and c in terms of r and y.<br>(b) Is U a basis for R?<br>(c) Is V à basis for R?<br>(d) Let. L: R + R be the unique lincar transformation such that L(u,) =v and L(u2) = V.<br>What is the matrix associated with L (with respect to the standard basis)?<br>(e) How many lincar transformations F: R- R are there such that F(u,), F(u2) E V?<br>

Extracted text: Let uj = U2 = Vi = V2 and Va Let U = {u, uz) and let V = {v,, Va, Va). %3D (a) Let eju +Qu2 Solve for e and c in terms of r and y. (b) Is U a basis for R? (c) Is V à basis for R? (d) Let. L: R + R be the unique lincar transformation such that L(u,) =v and L(u2) = V. What is the matrix associated with L (with respect to the standard basis)? (e) How many lincar transformations F: R- R are there such that F(u,), F(u2) E V?

Jun 05, 2022
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