Tutorial 5 - c: Diagonalize A. 2: Let A = 2 0 1 1 , with...

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Tutorial 5 MATH 1104 1-Last name: First name: 2-Last name: First name: 3-Last name: First name: 4-Last name: First name: 5-Last name: First name: ————————————————————————————————- 1: Let A = 0 - 4 - 6 - 1 0 - 3 1 2 5 . a: Find all eigenvalues and their corresponding eigenvectors. b: Find a basis for each corresponding eigenspace.
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Unformatted text preview: c: Diagonalize A. 2: Let A = 2 0 1 1 , with two eigenvalues 1 = 2 , 2 = 1 and v 1 = 1 1 , v 2 = 1 be their eigenvectors, respectively. Then A 6 is: a : 60 1 64 0 b : 64 0 0 1 c : 64 0 63 1 d : 64 0 1 1 1...
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