Consider the system dx dt = 3x - x² - xy, 1 Critical point 1: (?, ?) Critical point 2: (?, ?) dy a) Find all the critical points (equilibrium solutions). Number of critical points: 4▼ Critical point 3: (?, ?) dt = 2y - 2y² - 3xy Critical point 4: (?, ?) b) Use an appropriate graphing device to draw a direction field and phase portrait for the system. 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.

Consider the system dx dt = 3x - x² - xy, 1 Critical point 1: (?, ?) Critical point 2: (?, ?) dy a) Find all the critical points (equilibrium solutions). Number of critical points: 4▼ Critical point 3: (?, ?) dt = 2y - 2y² - 3xy Critical point 4: (?, ?) b) Use an appropriate graphing device to draw a direction field and phase portrait for the system. 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.

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

The same question both picture Answer all them please

Consider the system
dx
dt
-
3x − x² - xy,
Critical point 1: (?, ?)
a) Find all the critical points (equilibrium solutions).
Number of critical points:
Critical point 2: (?, ?)
dy
dt
Critical point 3: (?, ?)
= 2y - 2y² - 3xy
Critical point 4: (?, ?)
b) Use an appropriate graphing device to draw a direction field and
phase portrait for the system.
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.

b) Use an appropriate graphing device to draw a direction field and
phase portrait for the system.
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 Choose one
and is Choose one ▾
Critical point 2 is a Choose one ▾
and is Choose one
Critical point 3 is a Choose one ▾
and is Choose one ▾
Critical point 4 is a Choose one
and is Choose one

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