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Math / Linear Algebra and Its Applications 5 / Chapter 4.8 / Problem 33E

Linear Algebra and Its Applications | 5th Edition | ISBN: 9780321982384 | Authors: David C. Lay; Steven R. Lay; Judi J. McDonald

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Chapter 4, Problem 33E

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QUESTION:

Let \(y_{k}=k^{2}\) and \(z_{k}=2 k|k|\). Are the signals \(\left\{y_{k}\right\}\) and \(\left\{z_{k}\right\}\) linearly independent? Evaluate the associated Casorati matrix C(k) for k = 0, k = -1, and k = -2, and discuss your results.

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QUESTION:

Let \(y_{k}=k^{2}\) and \(z_{k}=2 k|k|\). Are the signals \(\left\{y_{k}\right\}\) and \(\left\{z_{k}\right\}\) linearly independent? Evaluate the associated Casorati matrix C(k) for k = 0, k = -1, and k = -2, and discuss your results.

ANSWER:

Solution 33E

As the matrix

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