(a) For the matrix A, find the eigenvalues and their algebraic multiplicities. (b) The eigenspace associated to A=0 is Eo = Span Find eigenspace E, associated to A= 4. (c) If possible, determine a basis B for R consisting of eigenvectors for A. If it is not possible explain why not. (d) Is D diagonalizable? If so give the diagonalization D = [T]. 2 2 -2 (e) Find the matrices S and S-1 such that D= S-1 S. -2 2 2 2 -2 4. (f) Multiply out S-1 S. -2 2 2 2 2 3 -2 (g) Compute det 0 4 -2 2

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
Section: Chapter Questions
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letter d (e) (f) and g

2 2
-2
4. Let A =
0 4
and T: R3 R3 defined by T
X2
-2 2
X3
(a) For the matrix A, find the eigenvalues and their algebraic multiplicities.
(b) The eigenspace associated to X= 0 is
{{}
Eo = Span
%3D
1
Find eigenspace E, associated to A= 4.
(c) If possible, determine a basis B for R3 consisting of eigenvectors for A. If it is not possible explain why not.
(d) Is D diagonalizable? If so give the diagonalization D= [T]8-
B.
2 2
0 4
-2
(e) Find the matrices S and S-1 such that D= S-1
S.
-2 2
2
2 2
-2
(f) Multiply out S-1
0 4
S.
-2 2
2
2 2
(g) Compute det
0.
4
-2 2
202
Transcribed Image Text:2 2 -2 4. Let A = 0 4 and T: R3 R3 defined by T X2 -2 2 X3 (a) For the matrix A, find the eigenvalues and their algebraic multiplicities. (b) The eigenspace associated to X= 0 is {{} Eo = Span %3D 1 Find eigenspace E, associated to A= 4. (c) If possible, determine a basis B for R3 consisting of eigenvectors for A. If it is not possible explain why not. (d) Is D diagonalizable? If so give the diagonalization D= [T]8- B. 2 2 0 4 -2 (e) Find the matrices S and S-1 such that D= S-1 S. -2 2 2 2 2 -2 (f) Multiply out S-1 0 4 S. -2 2 2 2 2 (g) Compute det 0. 4 -2 2 202
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