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The population of a small town is 23,781 and has been continuously declining at a rate of 3.2% each year what is the approximate population of the town in 17 years

Respuesta :

apologiabiology
same as the car one

A=Pe^(rt)
when it is a decay, make r negative
P=23781 and r=-0.032 and t=17
A=23781e^(-0.032*17)
A=23781e^(-0.554)
A=13803.01
so about 13803 people is the population after 17 years

Answer:

Step-by-step explanation:

Given that the population of a small town is 23,781 and has been continuously declining at a rate of 3.2% each year

Continuously declining is given hence we have the population P(t) as

[tex]P(t) = 23781 e^{-0.032t}[/tex] where t represents the number of years from initial time.

To find approximate population of the town in 17 years substitute t =17 in the equation

[tex]P(17) = 23781e^{-0.032(17)} \\P(17) = 23781 e^{-0.544}\\=13803.79[/tex]

i.e. approximate population of the town in 17 years = 13804

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