Consider the matrix 1 1 [1 A = 1 -1 1 Lo 0 1] a) Compute the eigenvalue decomposition (eigenvalues A and eigenvectors S) of the matrix A. b) Are the eigenvectors orthogonal ? Why / why not? c) Using the eigenvalue decomposition computed in a), determine (including a short explanation!) a. the rank of the matrix A. b. the determinant of the matrix A. C. the null space of the matrix A.

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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Consider the matrix
A = 1
Lo
-1
0 1.
a) Compute the eigenvalue decomposition (eigenvalues A and eigenvectors S) of the matrix A.
b) Are the eigenvectors orthogonal? Why / why not?
c) Using the eigenvalue decomposition computed in a), determine (including a short explanation!)
a. the rank of the matrix A.
b. the determinant of the matrix A.
C. the null space of the matrix A.
d) Determine if the matrix (A+A¹) is positive definite, negative definite or indefinite, without
computing its eigenvalue decomposition.
Hint: decompose the quadratic form Q(x) = x² (A + A²)x as a sum of squares of independent
linear forms using the elimination method and use Hermite's theorem.
Transcribed Image Text:Consider the matrix A = 1 Lo -1 0 1. a) Compute the eigenvalue decomposition (eigenvalues A and eigenvectors S) of the matrix A. b) Are the eigenvectors orthogonal? Why / why not? c) Using the eigenvalue decomposition computed in a), determine (including a short explanation!) a. the rank of the matrix A. b. the determinant of the matrix A. C. the null space of the matrix A. d) Determine if the matrix (A+A¹) is positive definite, negative definite or indefinite, without computing its eigenvalue decomposition. Hint: decompose the quadratic form Q(x) = x² (A + A²)x as a sum of squares of independent linear forms using the elimination method and use Hermite's theorem.
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