Let A be an n n matrix with an eigenvalue and let x be an eigenvector belonging to . Let
Chapter 6, Problem 27(choose chapter or problem)
Let A be an n n matrix with an eigenvalue and let x be an eigenvector belonging to . Let S be a nonsingular n n matrix and let be a scalar. Show that if B = I SAS1, y = Sx then y is an eigenvector of B. Determine the eigenvalue of B corresponding to y. 2
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