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QUESTION 11 11.1 Let A be an invertible matrix and A be an eigenvalue of A. Prove, using the definition of an eigenvalue, that
QUESTION 11 11.1 Let A be an invertible matrix and A be an eigenvalue of A. Prove, using the definition of an eigenvalue, that is an eigenvalue of A- (4) 11.2 If A is an invertible matrix that is diagonalisable, prove that A is diagonalisable. (4) [8 marks]
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Analysis Of Ordinal Categorical Data
Authors: Alan Agresti
2nd Edition
0470082895, 978-0470082898
