For a given 3 x 3 matrix A, [A-31]~ 0 1 0 00 2 [A+71] ~ 10 www 0 1 00 8 0 a) Based on this, we know that one eigenvalue of A is λ = b) For this value of λ find a basis for its eigenspace. (Enter any vectors as ordered lists (a, b, c) separated by commas if more than 1). B = {

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
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For a given 3 x 3 matrix A,
[A-31]~ 0 1 0
00
[A+71]~
10
0 1 -8
00 0
a) Based on this, we know that one eigenvalue of A is λ =
b) For this value of λ find a basis for its eigenspace. (Enter any vectors as ordered lists (a, b, c) separated
by commas if more than 1).
B = {
Transcribed Image Text:For a given 3 x 3 matrix A, [A-31]~ 0 1 0 00 [A+71]~ 10 0 1 -8 00 0 a) Based on this, we know that one eigenvalue of A is λ = b) For this value of λ find a basis for its eigenspace. (Enter any vectors as ordered lists (a, b, c) separated by commas if more than 1). B = {
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