In the logistic model, the population grows fastest when P equals which value?

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Study for the AP Calculus BC Test. Discover flashcards and multiple choice questions with hints and explanations to prepare effectively. Ace your exam!

Multiple Choice

In the logistic model, the population grows fastest when P equals which value?

Explanation:
In the logistic model the growth rate is dP/dt = rP(1 - P/L), which is a downward-opening quadratic in P. The maximum occurs at the vertex, found by setting the derivative with respect to P to zero: 1 - 2P/L = 0, so P = L/2. This is the point where resources are still available but crowding starts to limit growth, giving the fastest increase. For example, at P = L/2 you get dP/dt = r(L/2)(1/2) = rL/4, which is larger than the rate at P = L/4 or P = L (the latter being zero).

In the logistic model the growth rate is dP/dt = rP(1 - P/L), which is a downward-opening quadratic in P. The maximum occurs at the vertex, found by setting the derivative with respect to P to zero: 1 - 2P/L = 0, so P = L/2. This is the point where resources are still available but crowding starts to limit growth, giving the fastest increase. For example, at P = L/2 you get dP/dt = r(L/2)(1/2) = rL/4, which is larger than the rate at P = L/4 or P = L (the latter being zero).

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