Consider the following matrix. -1 0 -1 0 -1 0 -1 A = -1 1. 0 -1 0 -1 1 0 -1 0 -1 Use this list of theorems to answer the following questions. (a) Is A symmetric? Explain. Yes, because A = AT. Yes, because A + AT. No, because A = AT. No, because A # AT. (b) Is A diagonalizable? Explain. (Select all that apply.) yes, by the Real Spectral Theorem yes, by the Property of Symmetric Matrices O yes, by the Fundamental Theorem of Symmetric Matrices
Consider the following matrix. -1 0 -1 0 -1 0 -1 A = -1 1. 0 -1 0 -1 1 0 -1 0 -1 Use this list of theorems to answer the following questions. (a) Is A symmetric? Explain. Yes, because A = AT. Yes, because A + AT. No, because A = AT. No, because A # AT. (b) Is A diagonalizable? Explain. (Select all that apply.) yes, by the Real Spectral Theorem yes, by the Property of Symmetric Matrices O yes, by the Fundamental Theorem of Symmetric Matrices
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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10.
7.3
Pls answer b,c,f,g
thanks
Transcribed Image Text:Consider the following matrix.
-1
0 -1
0 -1
0 -1
A =
-1
1.
0 -1
0 -1
1
0 -1
0 -1
Use this list of theorems to answer the following questions.
(a) Is A symmetric? Explain.
Yes, because A = AT.
Yes, because A + AT.
No, because A = AT.
No, because A #
+ AT.
(b) Is A diagonalizable? Explain. (Select all that apply.)
yes, by the Real Spectral Theorem
yes, by the Property of Symmetric Matrices
yes, by the Fundamental Theorem of Symmetric Matrices
no, by the Real Spectral Theorem
no, by the Property of Symmetric Matrices
no, by the Fundamental Theorem of Symmetric Matrices
(c) Are the eigenvalues of A real? Explain. (Select all that apply.)
yes, by the Real Spectral Theorem
yes, by the Property of Symmetric Matrices
yes, by the Fundamental Theorem of Symmetric Matrices
no, by the Real Spectral Theorem
no, by the Property of Symmetric Matrices
no, by the Fundamental Theorem of Symmetric Matrices
Transcribed Image Text:(f) For the eigenvalues of A, are the corresponding eigenvectors orthogonal? Explain. (Select all that apply.)
yes, by the Real Spectral Theorem
yes, by the Property of Symmetric Matrices
yes, by the Fundamental Theorem of Symmetric Matrices
no, by the Real Spectral Theorem
no, by the Property of Symmetric Matrices
no, by the Fundamental Theorem of Symmetric Matrices
(g) Is A orthogonally diagonalizable? Explain. (Select all that apply.)
yes, by the Real Spectral Theorem
yes, by the Property of Symmetric Matrices
O yes, by the Fundamental Theorem of Symmetric Matrices
no, by the Real Spectral Theorem
no, by the Property of Symmetric Matrices
O no, by the Fundamental Theorem of Symmetric Matrices
O O
O O
O O O
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