Let B={1, x, x², x³} be a basis for P3, and let P={P1, P2, P3, P4} be the set of polynomials given below: P₁(x) = 2x³+3x²+2x−1 P2(x)=2x³-3x²+2x P3(x) = -2x²-x+1 P4(x) = -2x³+x+2 Find the coordinates of each of these polynomials with respect to the basis B, and use the coordinate vectors to determine whether P is linearly independent, and whether it spans P3. HHH [P2(x)]B= [P3(x)]B [P4(x)]B The set P is linearly independent The set P spans P3 [P1(x)]B 0

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Let B={1, x, x², x³ be a basis for P3, and let P={P1, P2, P3, P4} be the set of polynomials given below: P₁(x) = 2x³+3x²+2x−1 P2(x) = −2x³–3x²+2x P3(x) = −2x²-x+1 P4(x) = −2x³+x+2 Find the coordinates of each of these polynomials with respect to the basis B, and use the coordinate vectors to determine whether P is linearly independent, and whether it spans P3. 0 0 0 0 [P1(x)]B= 0 [P2(x)]B= 0 [P3(x)]B = [P4(x)]B = The set P is linearly independent The set P spans P3