L: R³ → R² be defined by L(x) = |21 + 22, 02 - - 13¹. that I is a linear transformation.

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-ts) Let L : R³ → R² be defined by L(x) = (21 + 32, 32 – 1¹. Show that I is a linear transformation. Find a basis for L(S), where S-Span([2,1,2], [-1,7,9]"). -1 5 5 Suppose A = 1 2 is the matrix representation of I with respect to bases E= {V₁, V2, Val and F = {w₁, w₁}. If [x] = [2,1,1]T, write L(x) as a linear combination of w₁ and wą.