Consider the system of differential equations dx dt dy dt = = For this system, the smaller eigenvalue is -4.1 and the larger eigenvalue is −1.1 y(t) = -1.6x + y, Use the phase plotter pplane9.m in MATLAB to determine how the solution curves behave. -1.1t 1.25x – 3.6y. A. All of the solution curves run away from 0. (Unstable node) OB. All of the solution curves converge towards 0. (Stable node) C. The solution curves converge to different points. 9e D. The solution curves race towards zero and then veer away towards infinity. (Saddle) The solution to the above differential equation with initial values x(0) = 5, y(0) = 9 is x(t) = = 5e -1.1t

Consider the system of differential equations dx dt dy dt = = For this system, the smaller eigenvalue is -4.1 and the larger eigenvalue is −1.1 y(t) = -1.6x + y, Use the phase plotter pplane9.m in MATLAB to determine how the solution curves behave. -1.1t 1.25x – 3.6y. A. All of the solution curves run away from 0. (Unstable node) OB. All of the solution curves converge towards 0. (Stable node) C. The solution curves converge to different points. 9e D. The solution curves race towards zero and then veer away towards infinity. (Saddle) The solution to the above differential equation with initial values x(0) = 5, y(0) = 9 is x(t) = = 5e -1.1t

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

100%

Consider the system of differential equations
dx
dt
dy
dt
=
=
For this system, the smaller eigenvalue is -4.1 and the larger eigenvalue is
−1.1
y(t) =
-1.6x + y,
Use the phase plotter pplane9.m in MATLAB to determine how the solution curves
behave.
-1.1t
1.25x – 3.6y.
A. All of the solution curves run away from 0. (Unstable node)
OB. All of the solution curves converge towards 0. (Stable node)
C. The solution curves converge to different points.
9e
D. The solution curves race towards zero and then veer away towards infinity.
(Saddle)
The solution to the above differential equation with initial values
x(0) = 5, y(0) = 9 is
x(t) = = 5e
-1.1t

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