HQ3. Please answer this question showing work 3.The rate of growth of a fish population was modeled by the equation60,000eG(t)=where t is measured in years since 2000 and G(1+5e-0.61)²in kilograms per year. If the biomass was 25,000 kg in the year 2000,what is the predicted biomass for the year 2020?-0.6t

According to question,Given equation,Gt = 60,000 e-0.6t1+5e-0.6t2

The rate of growth of a fish population was modeled by the equation 60,000e-0.6t G(t)=- (1+5e-0.6¹)² in kilograms per year. If the biomass was 25,000 kg in the year 2000, what is the predicted biomass for the year 2020? " where t is measured in years since 2000 and G

The rate of growth of a fish population was modeled by the equation 60,000e-0.6t G(t)=- (1+5e-0.6¹)² in kilograms per year. If the biomass was 25,000 kg in the year 2000, what is the predicted biomass for the year 2020? " where t is measured in years since 2000 and G

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter5: Inverse, Exponential, And Logarithmic Functions

Section: Chapter Questions

Problem 9T

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HQ3. Please answer this question showing work

3.
The rate of growth of a fish population was modeled by the equation
60,000e
G(t)=
where t is measured in years since 2000 and G
(1+5e-0.61)²
in kilograms per year. If the biomass was 25,000 kg in the year 2000,
what is the predicted biomass for the year 2020?
-0.6t

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