Question: Let T' : P2 - R be a linear transformation. For any polynomial p(I) = ax + br + c in P2, define the transformation

Let T' : P2 - R be a linear transformation. For any polynomial p(I) = ax + br + c in P2, define the transformation by T(ax + ba + c) = [atc [b-20] Use the standard basis B - {x2, x, 1} for P2 and basis C for R2 directions for entering your answers: . vectors in parts (a), (b), and (d) are written as rows instead of columns . don't enter any spaces a) Compute the images of the basis polynomials of B = {b1, b2, b3 } : T(b1 ) = T(12 ) =(1 T(b2) = T(x) =( I T(b3) = T(1) =( b) Find the C-coordinates of the images of the basis polynomials of 1 you found in part (a). [T (b, ) ]c = [T(12) ]c =( [T (b2 ) ]c = [T(I) ]c =(

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