Use a graphing calculator and the following scenario. The population P of a fish farm in t years is modeled by the equation $P(t) = \frac{1400}{1 + 9e^{-0.7t}}$ To the nearest whole number, what will the fish population be after 2 years? fish
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Use a graphing calculator and this scenario: the population of a fish farm in $t$ years is modeled by the equation $P(t)=\frac{1000}{1+9 e^{-0.6 t}}.$ To the nearest whole number, what will the fish population be after 2 years?
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For the following exercises, use a graphing calculator and this scenario: the population of a fish farm in $t$ years is modeled by the equation $P(t)=\frac{1000}{1+9 e^{-0.6 t}}$ To the nearest whole number, what will the fish population be after 2 years?
The population P of a fish farm in t years is modeled by the equation P(t) = 1600(1 + 9e^(-0.7t)). To the nearest whole number, what will the fish population be after 2 years?
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