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11 Nov 2019
Problem 2. Suppose that the characteristic polynomial of some matrix A is found to be (a) What is the size of A? (b) Is A ivertible? If the answer is yes, determine the eigen e) Explain when the matrix A is diagonalizable. p(A) = (-1)(λ-3)2(-4)3. In each part, answer the question and explain your reasoning. values of A-1 (c) How many eigen spaces does A have (d) Compute det(A) and trac(A)
Problem 2. Suppose that the characteristic polynomial of some matrix A is found to be (a) What is the size of A? (b) Is A ivertible? If the answer is yes, determine the eigen e) Explain when the matrix A is diagonalizable. p(A) = (-1)(λ-3)2(-4)3. In each part, answer the question and explain your reasoning. values of A-1 (c) How many eigen spaces does A have (d) Compute det(A) and trac(A)
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Deanna HettingerLv2
26 Oct 2019