(a) The function is known as Logistic growth function.
(c) In this function, L represents the carrying capacity of the environment for this population.
What is Logistic growth function?
When a population grows logistically, its rate of per capita growth declines as it gets closer to the carrying capacity, a limit set by the environment's finite resources ( K). A J-shaped curve results from exponential growth, while an S-shaped curve results from logistic growth.
Let, the given function is, [tex]f(t) = \frac{L}{1+Ce^-^b^t}[/tex]
A logistic growth function simulates the real-world values whose growth rates alternate between increasing and declining. These functions' typical form is,
[tex]f(t) = \frac{L}{1+Ce^-^b^t}[/tex]
So, the function is known as logistic growth function.
And L represents the carrying capacity of the environment for this population.
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