Let A be an n x n matrix that is similar to an upper triangular matrix, and that has the distinct eigenvalues 1, 2, , dk with corresponding multiplicities m1, m2,... , mk (k< n, m + m2 + + m = n). Show that det(A=

Let A be an n x n matrix that is similar to an upper triangular matrix, and that has the distinct eigenvalues 1, 2, , dk with corresponding multiplicities m1, m2,... , mk (k< n, m + m2 + + m = n). Show that det(A=

Elementary Linear Algebra (MindTap Course List)

8th Edition

ISBN:9781305658004

Author:Ron Larson

Publisher:Ron Larson

Chapter7: Eigenvalues And Eigenvectors

Section7.2: Diagonalization

Problem 32E

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Let A be an n × n matrix that is similar to an upper triangular matrix, and that has the distinct eigenvalues 1, 2,· , dk with
corresponding multiplicities m1, m2, ... , m: (k< n, m, + m2 + · … · + mp = n). Show that det(A= X"
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