Test 3 - Eigenvalues_vecs - Instructor's Version(1)

Test 3 - Eigenvalues_vecs - Instructor's Version(1) - Test...

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Test 3 Linear Algebra April. 13, 2010 Spring 2010 Honor Code: I hereby declare that I have not cheated in any way or form prior to this test, nor will I break the honor code by copying, cheating, or performing any unduly action during this test. Reading the textbook or your notebook is not allowed. Calculators are permitted. Remember to show all your work for partial credit. I understand that if I am caught breaking the honor code I will be subject to immediate failure of this examination and be subject to further inquiry. All questions are worth 1 point, except where indicated. Signature: _______________________________________________ Date: _______________
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Please show all your work below and underline or circle your final answers. 1. Consider the matrix: ܣൌ൥ 4െ 11 െ1 4 െ1 1െ 14 a) Given that one eigenvalue of A=6, find the remaining eigenvalues (4 points). b) Find three linearly independent eigenvectors of A (4 points).
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This note was uploaded on 06/21/2011 for the course CIVIL 1010 taught by Professor Unknown during the Spring '10 term at HKU.

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Test 3 - Eigenvalues_vecs - Instructor's Version(1) - Test...

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