We wish to solve the system x' = ミ+ via eigenvector decomposition. Let üj be an eigenvector for the smaller eigenvalue of the coefficient matrix and ü, be an eigenvector for the larger eigenvalue. Let us pick the eigenvectors such that uj = and 02 = What are these eigenvectors: help (matrices) U2 = help (matrices) Then fill in the equation to write it in the eigenvector decomposed form. help (formulas)

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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We wish to solve the system
sin(t)
x +
3
via eigenvector decomposition.
Let vj be an eigenvector for the smaller eigenvalue of the coefficient matrix and vz be an eigenvector for the larger eigenvalue. Let us pick the eigenvectors such that v1 =
and
What are these eigenvectors:
help (matrices)
help (matrices)
%D
Then fill in the equation to write it in the eigenvector decomposed form.
U2
help (formulas)
Transcribed Image Text:We wish to solve the system sin(t) x + 3 via eigenvector decomposition. Let vj be an eigenvector for the smaller eigenvalue of the coefficient matrix and vz be an eigenvector for the larger eigenvalue. Let us pick the eigenvectors such that v1 = and What are these eigenvectors: help (matrices) help (matrices) %D Then fill in the equation to write it in the eigenvector decomposed form. U2 help (formulas)
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