Logistic Growth Model – AP Calculus BC

Learning Objectives

Analyze the logistic differential equation \(dP/dt = kP(1-P/L)\).

Identify the carrying capacity (L) as a horizontal asymptote.

Locate the inflection point where the growth rate is maximized (P = L/2).

Key Equations

\( \frac{dP}{dt} = k P \left(1 - \frac{P}{L} \right) \)

\( P(t) = \frac{L}{1 + C e^{-kt}} \)

\( C = \frac{L - P_0}{P_0} \)

Why It Matters

Unlike unbounded exponential growth, logistic models account for environmental limits—like resource scarcity. As the population P approaches carrying capacity L, the growth rate smoothly declines to zero.