Need help with book example - modeling \"field mice and owl\" as a differential
ID: 2863534 • Letter: N
Question
Need help with book example - modeling "field mice and owl" as a differential equation.
Hello. I'm currently reading the 1st chapter of Elementary Differential Equations and Boundary Value Problems (10th edition). I'm reading an example that models a differential equation based on the population of field mice and the rate at which owls consume the mice.
At first, they start with the following diff eq:
dp/dt = rp , where R is the growth rate and P is the population of mice.
Next, they assume that the growth rate is 0.5/month and that the owls kill 15 field mice per day.
Finally, they reach the following differential equation
dp/dt = 0.5p - 450
My question is how they calculated 450, what it represents, and how you can tell that it should be a negative number. I'm not sure the book explains this very well.
Explanation / Answer
dp/dt represents the rate of change of the population of the mice.
t is time in months
now we are given that the growth rate of the mice is .5/month
now the owls kill 15 mice every day
and we know that we are talking in terms of per month
so lets say its a 30 day month so in 1 month the owls will kill = 15*30 = 450 mice
now to get the rate of change of population of mice per month we need to subtract the number of mice killed by the owls in 1 month that is = 450 mice
hence the final differential equation becomes :
dP/dt = rp - 450
dP/dt = .5p - 450