Let A be a 3 x 3 diagonalizable matrix whose eigenvalues are A1 = 2, A2 = -4, and A3 = -3. If Vi = [1 0 0], V2 = [1 1 0], are eigenvectors of A corresponding to A1, A2, and X3, respectively, then...

Let A be a 3 x 3 diagonalizable matrix whose eigenvalues are A1 = 2, A2 = -4, and A3 = -3. If<br>Vi = [1 0 0], V2 = [1 1 0],<br>are eigenvectors of A corresponding to A1, A2, and X3, respectively, then factor A into a<br>product XDX-1 with D diagonal, and use this factorization to find A5.<br>A5 =<br>

Extracted text: Let A be a 3 x 3 diagonalizable matrix whose eigenvalues are A1 = 2, A2 = -4, and A3 = -3. If Vi = [1 0 0], V2 = [1 1 0], are eigenvectors of A corresponding to A1, A2, and X3, respectively, then factor A into a product XDX-1 with D diagonal, and use this factorization to find A5. A5 =

Jun 04, 2022

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Let A be a 3 x 3 diagonalizable matrix whose eigenvalues are A1 = 2, A2 = -4, and A3 = -3. If Vi = [1 0 0], V2 = [1 1 0], are eigenvectors of A corresponding to A1, A2, and X3, respectively, then...

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