Problem. Prove as follows the inequality |Ax|E|4|| -|x|, where A is an m x m matrix with row vectors a1, a2,..., am, and x is an m-dimensional vector. First note that the components of the vector Ax are a, x, az • X, ..., am :X, so JAx| = (a; • x)2 Then use the Cauchy–Schwarz inequality (a - x)2 s Ja|2|x|2 for the dot product.

Linear Algebra: A Modern Introduction
4th Edition
ISBN:9781285463247
Author:David Poole
Publisher:David Poole
Chapter7: Distance And Approximation
Section7.2: Norms And Distance Functions
Problem 33EQ
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Problem.
Prove as follows the inequality |Ax|E|4|| -|x|, where A is
an m x m matrix with row vectors a1, a2,..., am, and x is
an m-dimensional vector. First note that the components
of the vector Ax are a, x, az • X, ..., am :X, so
JAx| =
(a; • x)2
Then use the Cauchy–Schwarz inequality (a - x)2 s
Ja|2|x|2 for the dot product.
Transcribed Image Text:Problem. Prove as follows the inequality |Ax|E|4|| -|x|, where A is an m x m matrix with row vectors a1, a2,..., am, and x is an m-dimensional vector. First note that the components of the vector Ax are a, x, az • X, ..., am :X, so JAx| = (a; • x)2 Then use the Cauchy–Schwarz inequality (a - x)2 s Ja|2|x|2 for the dot product.
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