Let P, be the vector space of all polynomials of degree n or less in the variable z. Let D: P3 + P2 be the linear transformation defined by D(p(x)) = p'(x). That is, D is the derivative operator. Let...

Let P, be the vector space of all polynomials of degree n or less in the variable z. Let D: P3 + P2 be the linear transformation defined<br>by D(p(x)) = p'(x). That is, D is the derivative operator. Let<br>{1, x, x², x*},<br>{1, z, z²},<br>B<br>be ordered bases for Pz and Pz, respectively. Find the matrix [D]E for D relative to the basis B in the domain and C in the codomain.<br>[D]E =<br>

Extracted text: Let P, be the vector space of all polynomials of degree n or less in the variable z. Let D: P3 + P2 be the linear transformation defined by D(p(x)) = p'(x). That is, D is the derivative operator. Let {1, x, x², x*}, {1, z, z²}, B be ordered bases for Pz and Pz, respectively. Find the matrix [D]E for D relative to the basis B in the domain and C in the codomain. [D]E =

Jun 04, 2022

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Let P, be the vector space of all polynomials of degree n or less in the variable z. Let D: P3 + P2 be the linear transformation defined by D(p(x)) = p'(x). That is, D is the derivative operator. Let...

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