3. what is the first eigenvector for this? 4. prove that v1, v2 = [-2, 1, 1]^T and v3 = [3, -4, 1]^T are all linearly independent. do so by confirming that c1=c2=c3=0 is the unique solution that is associated with the sum from i=1 to 3 for ci x vi = 0

3. what is the first eigenvector for this? 4. prove that v1, v2 = [-2, 1, 1]^T and v3 = [3, -4, 1]^T are all linearly independent. do so by confirming that c1=c2=c3=0 is the unique solution that is associated with the sum from i=1 to 3 for ci x vi = 0

Linear Algebra: A Modern Introduction

4th Edition

ISBN:9781285463247

Author:David Poole

Publisher:David Poole

Chapter5: Orthogonality

Section5.3: The Gram-schmidt Process And The Qr Factorization

Problem 1BEXP

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3. what is the first eigenvector for this?

4. prove that v1, v2 = [-2, 1, 1]^T and v3 = [3, -4, 1]^T are all linearly independent. do so by confirming that c1=c2=c3=0 is the unique solution that is associated with the sum from i=1 to 3 for ci x vi = 0

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