A population P(t) of field mice, where P is the number of mice and t is measured in months from some starting point, grows at the rate of 50% per month. However, owls in the neighbourhood eat them at the rate of 600/month. A model for the mice population is given by the differential equation dP — 0.5Р — 600 dt State and classify all equilibria.

A population P(t) of field mice, where P is the number of mice and t is measured in months from some starting point, grows at the rate of 50% per month. However, owls in the neighbourhood eat them at the rate of 600/month. A model for the mice population is given by the differential equation dP — 0.5Р — 600 dt State and classify all equilibria.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter9: Systems Of Equations And Inequalities

Section9.7: The Inverse Of A Matrix

Problem 31E

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Differential Equations

Have you ever observed the movement of the satellites and rockets or how the planets go around the sun in their orbits? How will you determine their motion? Definitely they follow some scientific laws and these kinds of problems are framed as differential equations.

Question

A population P(t) of field mice, where P is the number of mice and t is measured
in months from some starting point, grows at the rate of 50% per month. However, owls in the
neighbourhood eat them at the rate of 600/month. A model for the mice population is given by the
differential equation
dP
= 0.5P – 600
dt
State and classify all equilibria.

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Given equation is autonomous first order differential equation.

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