c) From the plot(s) in part b, determine whether each critical pointis asymptotically stable, stable, or unstable, and classify it as totype.Critical point 1 is a saddle point Xand is asymptotically stable vThe basin of attraction of the point is in the (open) quadrant (s):first V second V third fourthCritical point 2 is a saddle pointand is asymptotically stableThe basin of attraction of the point is in the (open) quadrant (s):V first secondfourthCritical point 3 is a saddle point Xand is asymptotically stable -The basin of attraction of the point is in the (open) quadrant (s):V first second thirdfourthCritical point 4 is a saddle point vand is asymptotically stable vThe basin of attraction of the point is in the (open) quadrant (s):first ]secondthirdfourth Consider the systemdx= 2x – x - xy,dtdy2y – 2y2 - 3xydta) Find all the critical points (equilibrium solutions).Number of critical points: 4Critical point 1: (?, ?)Critical point 2: (?, ?)X1Critical point 3: (?, ?)Critical point 4: (?,?)b) Use an appropriate graphing device to draw a direction field andphase portrait for the system.

Answered: Image /qna-images/answer/1e18d921-df20-41fe-8eb5-e6ab04d02292.jpg

Consider the system dy dx 2x - x2- xy, dt = 2y – 2y? - 3ry dt %3D a) Find all the critical points (equilibrium solutions). Number of critical points: 4v Critical point 1: (?, ?) Critical point 2: (?,?) Critical point 3: (?,?) Critical point 4: (?,?) b) Use an appropriate graphing device to draw a direction field and phase portrait for the system.

Consider the system dy dx 2x - x2- xy, dt = 2y – 2y? - 3ry dt %3D a) Find all the critical points (equilibrium solutions). Number of critical points: 4v Critical point 1: (?, ?) Critical point 2: (?,?) Critical point 3: (?,?) Critical point 4: (?,?) b) Use an appropriate graphing device to draw a direction field and phase portrait for the system.

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%

c) From the plot(s) in part b, determine whether each critical point
is asymptotically stable, stable, or unstable, and classify it as to
type.
Critical point 1 is a saddle point X
and is asymptotically stable v
The basin of attraction of the point is in the (open) quadrant (s):
first V second V third fourth
Critical point 2 is a saddle point
and is asymptotically stable
The basin of attraction of the point is in the (open) quadrant (s):
V first second
fourth
Critical point 3 is a saddle point X
and is asymptotically stable -
The basin of attraction of the point is in the (open) quadrant (s):
V first second third
fourth
Critical point 4 is a saddle point v
and is asymptotically stable v
The basin of attraction of the point is in the (open) quadrant (s):
first ]second
third
fourth

Consider the system
dx
= 2x – x - xy,
dt
dy
2y – 2y2 - 3xy
dt
a) Find all the critical points (equilibrium solutions).
Number of critical points: 4
Critical point 1: (?, ?)
Critical point 2: (?, ?)
X1
Critical point 3: (?, ?)
Critical point 4: (?,?)
b) Use an appropriate graphing device to draw a direction field and
phase portrait for the system.

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