If the biomass was 35,000 kg in the year 2000, what is the predicted biomass (in kg) for the year 2020? (Round your answer to the nearest whole number.)
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However, since that information is not provided, I will assume a simple linear growth model for this example. Let's assume a hypothetical growth rate for the sake of this calculation. Show more…
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The rate of growth of fish population was modeled by the equation G(t) = 5000e^(1 + 5e^(-0.6t))^2 where t is measured in years and G is in kilograms per year. If the biomass was 25,000 kg in the year 2000, what is the predicted biomass for the year 2020?
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The rate of growth of a fish population was modeled by the equation $$ G(t) = \frac{60,000e^{-0.6t}}{(1 + 5e^{-0.6t})^2} $$ where $ t $ is measured in years and $ G $ in kilograms per year. If the biomass was 25,000 kg in the year 2000, what is the predicted biomass for the year 2020?
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Fish biomass The rate of growth of a fish population was modeled by the equation $$G(t)=\frac{60,000 e^{-0.6 t}}{\left(1+5 e^{-0.6 t}\right)^{2}}$$ where $t$ is measured in years since 2000 and $G$ in kilograms per year. If the biomass was $25,000 \mathrm{kg}$ in the year $2000,$ what is the predicted biomass for the year 2020$?$
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