Let V be a finite dimensional vector space of dimension m+n, and E be a projection on V, then show that there exists a basis for V such that the matrix representation of E is of the form where m= rank(E). E = Imxm_0mxn Onxm Onxn, (Tmx

Let V be a finite dimensional vector space of dimension m+n, and E be a projection on V, then show that there exists a basis for V such that the matrix representation of E is of the form where m= rank(E). E = Imxm_0mxn Onxm Onxn, (Tmx

Linear Algebra: A Modern Introduction

4th Edition

ISBN:9781285463247

Author:David Poole

Publisher:David Poole

Chapter6: Vector Spaces

Section6.3: Change Of Basis

Problem 22EQ

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Question

Let V be a finite dimensional vector space of dimension m+n, and E be a projection
on V, then show that there exists a basis for V such that the matrix representation of
E is of the form
where m= rank(E).
E =
(Tmx
Imxm_0mxn
Onxm Onxn,

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