Equivalence theorem: the matrix A does not have zero as an eigenvalue.

math.la.t.equiv.eig


The previous section introduced eigenvalues and eigenvectors, and concentrated on their existence and determination. This section will be more about theorems, and the various properties eigenvalues and eigenvectors enjoy. Like a good 4×100 meter relay, we will lead-off with one of our better theorems and save the very best for the anchor leg.

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GFDL-1.2
Submitted At
September 11th, 2017
 3 years ago
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Type
 Textbook
Language
 English
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