The number of trees in a forest follows the logistic growth function, where t is the time in years. According to the growth model, how many trees will there be after 50 years? A. 14,285 b. 18,092 c. 20,874 d. 21,386

Question

Mathematics

Ali Bowers

16 June, 08:33

The number of trees in a forest follows the logistic growth function, where t is the time in years. According to the growth model, how many trees will there be after 50 years? A. 14,285 b. 18,092 c. 20,874 d. 21,386

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Answers (1)

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Melissa Best · Answer 1

D. 21,386

Step-by-step explanation:

The question is incomplete. Here is the complete question.

"The number of trees in a forest follows the logistic growth function,

f (t) = 32000/1+12.8e^-0.065t where t is the time in years. According to the growth model, how many trees will there be after 50 years?"

Given the logistics growth function,

f (t) = 32000/1+12.8e^-0.065t

To calculate the number of trees that will be there after 50years, we will substitute the value of t = 50 into the function

f (50) = 32000/1+12.8e^-0.065 (50)

f (50) = 32000/1+0.496

f (50) = 32000/1.496

f (50) = 21,385.94

f (50) = 21,386

Number of trees that will be there after 50years is 21,386years