Solved: (Optimality of 8) In Prob. 2 choose Xo = [3 _l]T
Chapter 20, Problem 20.1.132(choose chapter or problem)
(Optimality of \(\delta\)) In Prob. 2 choose \(\mathbf{x}_{0}=\left[\begin{array}{ll}3 & -1\end{array}\right]^{\top}\)and show that q = 0 and \(\delta \) = 1 for all steps and that the eigenvalues are \(\pm 1\), so that the interval [q - \(\delta \), q + \(\delta \)]cannot be shortened in general: Experiment with other \(\mathbf{x}_{0}\).
Text Transcription:
delta
x_0=[3 -1]^T
+-1
x_0
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