dxa11a12= Ax(t) where A =dt. Analyze the stability of the equilibrium (0,0), and classify the equilibrium.%3DConsider a differential equation of the forma21а22- 2A =- 19.so the equilibrium isThe eigenvalues are

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dx a11 a12 Consider a differential equation of the form = Ax(t) where A = dt . Analyze the stability of the equilibrium (0,0), and classify the equilibrium. a21 a22 -2 - 1 A = 9 6. ...... The eigenvalues are V so the equilibrium is

dx a11 a12 Consider a differential equation of the form = Ax(t) where A = dt . Analyze the stability of the equilibrium (0,0), and classify the equilibrium. a21 a22 -2 - 1 A = 9 6. ...... The eigenvalues are V so the equilibrium is

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Question

dx
a11
a12
= Ax(t) where A =
dt
. Analyze the stability of the equilibrium (0,0), and classify the equilibrium.
%3D
Consider a differential equation of the form
a21
а22
- 2
A =
- 1
9.
so the equilibrium is
The eigenvalues are

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