Material :Daly analysis 3.7.4. Let M be a finite-dimensional subspace of a normed space X. Supposethat rn E M and xn y E X, but y M. DefineM1= M + span{y}{m + cy : m € M, cE F}.%3D(a) Prove that if r E M1, then there exist a unique vector m E M and aunique scalar Cz E F such that r = mx+ Cry.

Name: Material :Daly analysis 3.7.4. Let M be a finite-dimensional subspace
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Description: Material :Daly analysis 3.7.4. Let M be a finite-dimensional subspace of a normed space X. Supposethat rn E M and xn y E X, but y M. DefineM1= M + span{y}{m + cy : m € M, cE F}.%3D(a) Prove that if r E M1, then there exist a unique vector m E M and a

Suppose that there is a finite dimensional subspace M of a normed space X and let xn∈M, xn→y∈X, but…

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3.7.4. Let M be a finite-dimensional subspace of a normed space X. Suppose that n E M and an →y € X, but y M. Define M₁ = M + span{y} (a) Prove that if x € M₁, then there exist a unique vector mr M and a unique scalar C, EF such that x = mx + cry. = {m + cy: m € M, c≤ F}.

3.7.4. Let M be a finite-dimensional subspace of a normed space X. Suppose that n E M and an →y € X, but y M. Define M₁ = M + span{y} (a) Prove that if x € M₁, then there exist a unique vector mr M and a unique scalar C, EF such that x = mx + cry. = {m + cy: m € M, c≤ F}.

Linear Algebra: A Modern Introduction

4th Edition

ISBN:9781285463247

Author:David Poole

Publisher:David Poole

Chapter6: Vector Spaces

Section6.4: Linear Transformations

Problem 34EQ

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