caleb768
24.04.2020 •
Mathematics
G 1 (5 points) Given that A = 4 0 1 −2 1 0 −2 0 1 (i) Find the eigenvalues of A and its corresponding eigenvectors. (ii) Show that the eigenvectors you found are linearly independent in R 3 . Use only definition, nothing fancy. This is true in general, see Theorem 5.2.2, Page 304, but you cannot use this theorem in this problem.
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