a)Give an example (with proof) of a square matrix with nonzero numbers along the diagonal which is not invertible. b)Give an example of a linear operator T : V →V and F = R so that for any basis B, the matrix M(T; B) is not upper-triangular(with proof)

a)Give an example (with proof) of a square matrix with nonzero numbers along the diagonal which is not invertible. b)Give an example of a linear operator T : V →V and F = R so that for any basis B, the matrix M(T; B) is not upper-triangular(with proof)

Linear Algebra: A Modern Introduction

4th Edition

ISBN:9781285463247

Author:David Poole

Publisher:David Poole

Chapter3: Matrices

Section: Chapter Questions

Problem 17RQ

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Question

a)Give an example (with proof) of a square matrix with nonzero numbers
along the diagonal which is not invertible.

b)Give an example of a linear operator T : V →V and F = R so that for
any basis B, the matrix M(T; B) is not upper-triangular(with proof)

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sorry, I do not think part b is correct,can you try to use eignvector and basis to proof the matrix is not upper-triangular?

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