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5 Jun 2020
The logistic function in form of differential equation is given by,
where, P is population growth as function of time, ‘r’ is the growth rate and K is the carrying capacity.
If the carrying capacity is the also function of time K(t) and changing with time given as ,
How the population growth will follow the varying carrying capacity?
The logistic function in form of differential equation is given by,
where, P is population growth as function of time, ‘r’ is the growth rate and K is the carrying capacity.
If the carrying capacity is the also function of time K(t) and changing with time given as ,
How the population growth will follow the varying carrying capacity?
Nestor RutherfordLv2
24 Jul 2020