Final answer:
The question pertains to solving a logistic differential equation, a model used in mathematics to describe population growth and stabilization over time.
Step-by-step explanation:
The question refers to a logistic differential equation, which is a common mathematical model used to describe how populations (like the number of moose in a national park) grow and stabilize over time. The logistics model typically takes the form dm/dt = r*m*(1 - m/K), where m is the population size, t is the time, r is the intrinsic growth rate, and K is the carrying capacity of the environment.
To solve this differential equation, one often separates variables and integrates or uses standard techniques for solving ordinary differential equations.