Let L: R³ P2 be the linear transformation (no need to verify) defined by 3b 3c Let B₁ = b (2a-1/2-) = {(2,0,0), (1,0,2), (1, 1,-1) 1. Compute for [L]B L((a, b, c)) = (2a - x² + (6b+c)x+ (a+ 2 1 B₂ = {²+1,2x3,5x+4), B3 = {x²+1, x² + 2x - 2,7x + 1}.

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Let L: R³ P2 be the linear transformation (no need to verify) defined by 3b 3c L((a, b, c)) = (2a - 2 -{(2,0,0), (1.0,2). Let B₁ = b С x² + (6b+c)x+ (a+ 2 , (1, 0, 2), (1, 1,−1)}, 1 B₂ = {²+1,2x-3, 5x + 4), B3 = {x² +1, x² + 2x - 2,7x + 1}. 1. Compute for [L]B 2. Compute for the change of basis matrix from B₁ to B₂ and the change of basis matrix from B₂ to B₁. Verify that they are inverses of each other. 3. Using the preceding items, find v if [L(v)] B₂ -0