and by = 3 . The set B = {h,62} : Let b1 is a basis for R². Let T : R? → R² be a linear transformation such that T(b1) = 561 + 2b2 and T(b2) = 8b1 + 6b2. (a) The B-matrix of T (in other words, the...

and by =<br>3<br>. The set<br>B = {h,62} :<br>Let b1<br>is a basis for R². Let T : R? → R² be a linear<br>transformation such that T(b1) = 561 + 2b2 and T(b2) = 8b1 + 6b2.<br>(a) The B-matrix of T (in other words, the matrix of T relative to the basis B) is<br>B<br>(b) The standard matrix of T (in other words, the matrix of T relative to the standard basis for R2) is<br>A<br>

Extracted text: and by = 3 . The set B = {h,62} : Let b1 is a basis for R². Let T : R? → R² be a linear transformation such that T(b1) = 561 + 2b2 and T(b2) = 8b1 + 6b2. (a) The B-matrix of T (in other words, the matrix of T relative to the basis B) is B (b) The standard matrix of T (in other words, the matrix of T relative to the standard basis for R2) is A

Jun 05, 2022

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and by = 3 . The set B = {h,62} : Let b1 is a basis for R². Let T : R? → R² be a linear transformation such that T(b1) = 561 + 2b2 and T(b2) = 8b1 + 6b2. (a) The B-matrix of T (in other words, the...

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