Consider a theoretical model for mutual inhibition in ecological systems where n > 0 measures the strength of mutual inhibition d = x(t) = dt (1/2)" (1/2)" +yn X d dt³ (t) = (1/2)" (1/2)" +x" y Plot the nullclines and determine the equilibria points for n = 1 and n = 3. Interpret these equilibrium in the ecological setting. Explicitly calculate the local stability of the equilibrium point where x* = y* for gen- eral n. When does the system undergo a qualitative change in behaviour?

Consider a theoretical model for mutual inhibition in ecological systems where n > 0 measures the strength of mutual inhibition d = x(t) = dt (1/2)" (1/2)" +yn X d dt³ (t) = (1/2)" (1/2)" +x" y Plot the nullclines and determine the equilibria points for n = 1 and n = 3. Interpret these equilibrium in the ecological setting. Explicitly calculate the local stability of the equilibrium point where x* = y* for gen- eral n. When does the system undergo a qualitative change in behaviour?

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter7: Analytic Trigonometry

Section7.6: The Inverse Trigonometric Functions

Problem 91E

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Question

Consider a theoretical model for mutual inhibition in ecological systems where n > 0
measures the strength of mutual inhibition
d
dt x(t) =
(1/2)"
(1/2)" +yn
-
x
d
dt (t) =
(1/2)"
-
(1/2)" +x"
-y
Plot the nullclines and determine the equilibria points for n = 1 and n = 3. Interpret
these equilibrium in the ecological setting.
Explicitly calculate the local stability of the equilibrium point where x* = y* for gen-
eral n. When does the system undergo a qualitative change in behaviour?

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Step 1: Introduction

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Step 2: Determine the equilibrium point for n=1

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Step 3: Determine the equilibrium point for n=3

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Step 4: Calculate the local stability

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