Mathematics Calculus Differential Equations
A rabbit population satisfies the logistic equation dy/dx=2x10^7y(10^6-y), where t is the time measured in months. The population is suddenly reduced to 40% of its steady state size by myxamatosis. If the myxamatosis then has no further effect, how large is the population 8 months later? How long will it take for the population to build up again to 90% of its steady state size?
You can ask a new question or answer this question .
Similar Questions
Top answer:
Lilly has been posting the same problem typed the same way. As you can see from previous comments,
Read more.
Top answer:
To solve this problem, we will need to integrate the differential equation and use some initial
Read more.
Top answer:
your equation is much too ambiguous . How are x and y defined? Is the exponent of 10 equal to -7 or
Read more.
Top answer:
To solve this problem, we need to solve the logistic equation and use the given initial condition
Read more.
Top answer:
To find the population at a given time, we need to solve the logistic equation dy/dt = 2 *
Read more.
Top answer:
There is no t in your equation and it is incomprehensible anyway. dy/dt = 2 * 10^6 y - y ??? or
Read more.
Top answer:
anonymouss, Lea, Jonah, Yonnie, laura, Gabe, Mark, Sara, Cia, Kelly, Shanna -- over 31 posts that I
Read more.
Top answer:
To understand what this problem is asking for, we need to find the value of P(t) at a specific time
Read more.
Top answer:
dp/dt=0.03p−0.00015p^2 This is a Bernoulli equation, with solution 200
Read more.
Top answer:
To determine the maximum sustainable yield (MSY) of a population governed by the logistic growth
Read more.