Diagonalizable Matrices and Eigenvalues In Exercise 1-6, (a) verify that A is diagonalizable by finding P − 1 A P , and (b) use the result of part (a) and Theorem 7.4 to find the eigenvalues of A . A = [ 4 − 5 2 − 3 ] , P = [ 1 5 1 2 ]
Diagonalizable Matrices and Eigenvalues In Exercise 1-6, (a) verify that A is diagonalizable by finding P − 1 A P , and (b) use the result of part (a) and Theorem 7.4 to find the eigenvalues of A . A = [ 4 − 5 2 − 3 ] , P = [ 1 5 1 2 ]
Solution Summary: The author explains that the matrix A is diagonalizable by finding P-1AP for the given matrices.
Diagonalizable Matrices and Eigenvalues In Exercise 1-6, (a) verify that A is diagonalizable by finding
P
−
1
A
P
, and (b) use the result of part (a) and Theorem 7.4 to find the eigenvalues of A.
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