System of differential equations eigenvalues

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Homework Help Overview

The discussion revolves around solving a system of differential equations represented by a matrix, specifically focusing on the eigenvalues and eigenvectors associated with the matrix. The original poster is attempting to apply initial conditions to the solution derived from the eigenvalues.

Discussion Character

  • Exploratory, Assumption checking, Conceptual clarification

Approaches and Questions Raised

  • The original poster attempts to find eigenvalues and eigenvectors for the given matrix but questions the validity of their results when applying initial conditions. Other participants raise the issue of repeated eigenvalues and the implications for the number of eigenvectors available.

Discussion Status

The discussion is ongoing, with participants exploring the implications of having repeated eigenvalues and the resulting lack of sufficient eigenvectors. Some guidance has been offered regarding resources for handling such cases, but no consensus has been reached on the specific approach to take.

Contextual Notes

The original poster notes that their textbook does not provide examples for cases with repeated eigenvalues, which may limit their understanding of the necessary steps to take in this situation.

hocuspocus102
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Homework Statement



solve the system:
dx/dt = [1 -4] x
_______[4 -7]
with x(0) = [3]
__________[2]

Homework Equations





The Attempt at a Solution



I got both eigenvalues of the matrix are -3 and so both eigenvectors are [1]
_____________________________________________________________[1]
so then when I try to solve with the initial condition I get the equation is
Ce^(-3(0))[1] = [3]
__________[1]__[2]
which would lead to C[1] = [3]
__________________[1]___[2]
meaning C = 3 and C = 2 which is impossible because it's the same constant...
Did I get the right eigenvalues and vectors? or is there something I'm missing when it comes to plugging in for the initial condition? Thanks!
 
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hocuspocus102 said:

Homework Statement



solve the system:
dx/dt = [1 -4] x
_______[4 -7]
with x(0) = [3]
__________[2]

Homework Equations





The Attempt at a Solution



I got both eigenvalues of the matrix are -3 and so both eigenvectors are [1]
_____________________________________________________________[1]
so then when I try to solve with the initial condition I get the equation is
Ce^(-3(0))[1] = [3]
__________[1]__[2]
which would lead to C[1] = [3]
__________________[1]___[2]
meaning C = 3 and C = 2 which is impossible because it's the same constant...
Did I get the right eigenvalues and vectors? or is there something I'm missing when it comes to plugging in for the initial condition? Thanks!
The eigenvalue -3 is repeated, so there is only one eigenvector, <1, 1>, so your work to this point looks fine. Does your text discuss what to do when there are fewer eigenvectors than needed?
 
no, it only gives examples of how to use 2 different eigenvalues with their corresponding 2 different eigenvectors. is there a different way to do it?
 
oh ok, thank you very much!
 

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