Let L : R² → R³ be the linear transformation given by L(x1, x2) = (x1 + x2, –2ı + x2, X1) and let T : R → R³ be the linear transformation given by T(yı; Y2; Y3) = (-yı + Y3, Y1 + 2, -Yı + 2y3). (a) Determine the matrix representation of L and T with respect to the standard bases for R". (b) Determine the composite linear transformation TL and find its rank and nullity.

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Let L : R? and let T : R Y2, -Yı + 2y3). → R3 be the linear transformation given by L(x1, x2) = (x1 + x2, -x1 + x2, x1) → R' be the linear transformation given by T(y1; Y2; Y3) = (-y1 + Y3, Y1 + (a) Determine the matrix representation of L and T with respect to the standard bases for R". (b) Determine the composite linear transformation TL and find its rank and nullity.