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answer
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watching
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10 Nov 2019
2b) (10 pts) Let P2 be the vector space of polynomials of degree less than or equal to 2 Let D be the derivative, and I be the identity map. Write the matrix for the linear map F: PP where F D -51 (Use the basis (1, ,2) for Pa) Problem 3) Let M2r2 be the space of 2 x 2 matrices. Let L: M2r2M2r2 be the linear map such that L(A) C.A where C 3a) (10 pts) Find the dimension of ker(L). 3b) (5 pts) Find the dimension of Im(L). 2 6
2b) (10 pts) Let P2 be the vector space of polynomials of degree less than or equal to 2 Let D be the derivative, and I be the identity map. Write the matrix for the linear map F: PP where F D -51 (Use the basis (1, ,2) for Pa) Problem 3) Let M2r2 be the space of 2 x 2 matrices. Let L: M2r2M2r2 be the linear map such that L(A) C.A where C 3a) (10 pts) Find the dimension of ker(L). 3b) (5 pts) Find the dimension of Im(L). 2 6
Deanna HettingerLv2
16 Feb 2019