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Assume there is a certain population of fish in a pond whose growth is described by the logistic equation. It is estimated that the carrying capacity for the pond is 1100 fish. Absent constraints, the population would grow by 230% per year. If the starting population is given by Po = 200, then after one breeding season the population of the pond is given by P1= P2=

User Mathias Asberg
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For a population rate of change r and a total capacity of the pond C, the logistic growth is given by:


P_n=P_(n-1)\lbrack1+r(1-(P_(n-1))/(C))\rbrack

For r = 2.3, P0 = 200 fish and C = 1100 fish, we have:


\begin{gathered} P_1=200\cdot\lbrack1+2.3(1-(200)/(1100))\rbrack\approx576\text{ fish} \\ P_2=576\cdot\lbrack1+2.3(1-(576)/(1100))\rbrack\approx1207\text{ fish} \end{gathered}

User Idan K
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