4. In general, for any m x n matrix A, one can compute the respective norm measurements ||A||2 and || A|| via |||AX||2; || A||F= sup ||*||270 ||*||2 2 2 3 2 -2 (a) Determine the SVD of A. (b) Find ||A||2 and || A||- 772 ||A||2= One can easily show that Theorem 5 of the Class Notes - originally posed for square matrices is valid for general A, m x n. Let now, A n ΣΣα i=1

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4. In general, for any m x n matrix A, one can compute the respective norm measurements ||A||2 and ||A|| via ||A||F= ||A||2= One can easily show that Theorem 5 of the Class Notes - originally posed for square matrices is valid for general A, m x n. Let now, |||AX||2; sup ||*||₂70 ||*||2 2 2 3 2 -2 (a) Determine the SVD of A. (b) Find ||A||2 and || A||- A 722 72 ΣΣα ilj