1
answer
0
watching
137
views
6 Nov 2019
A-B 3 -21 2 -2 2. [20 points] Given the matrix: (a) Use the characteristic equation to determine the eigenvalues of A. Then determine an eigenvector corresponding to each eigenvalue. (b) For the linear transformation: T(E) AR,graph the eigenvectors you gave in part (a) and their outputs. 2 input eigenvectors output vectors (c) Verify that the matrix A Hamilton Theorem.) satisfies its own characteristic equation. (This result is known as the Cayley- Show transcribed image text
A-B 3 -21 2 -2 2. [20 points] Given the matrix: (a) Use the characteristic equation to determine the eigenvalues of A. Then determine an eigenvector corresponding to each eigenvalue. (b) For the linear transformation: T(E) AR,graph the eigenvectors you gave in part (a) and their outputs. 2 input eigenvectors output vectors (c) Verify that the matrix A Hamilton Theorem.) satisfies its own characteristic equation. (This result is known as the Cayley-
Show transcribed image text Tod ThielLv2
17 Jun 2019