Populations that grow under certain constraints often can be modeled using the logistic equation P(t)= A/(1+Be^(-Ct))
b. What is the limiting population in terms of the constants (as t → ∞)?

Question

Populations that grow under certain constraints often can be modeled using the logistic equation P(t)= A/(1+Be^(-Ct))
b.	What is the limiting population in terms of the constants (as t → ∞)?

anonymous · Answer

Think about what happens when t gets big. What terms remain and what do they approach. This will tell you the general long term behavior of the function. I'm not going to baby feed the answers to you.

anonymous · Answer

As t approaches infinity, e gets smaller and smaller. Eventually it becomes so close to zero you might as well call it zero. Therefore B is zero. You are left with A/1, which is just A.