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Since 201020102010, the town of Fall River has been experiencing a growth in population. The relationship between the elapsed time, ttt, in years, since 201020102010 and the town's population, P(t)P(t)P, (, t, ), is modeled by the following function. P(t)=36,800⋅2t25 According to the model, what will the population of Fall River be in 202020202020?

Respuesta :

Answer:

48,558

Step-by-step explanation:

The function which models the relationship between the elapsed time, t in years, since 2010 and the town's population, P(t), is given as:

[tex]P(t)=36800\cdot2^{^\dfrac{t}{25}}[/tex]

Now, 2020-2010=10 Years

Therefore we are required to calculate the population of the town 10 years after.

To do this, we simply substitute t=10 in the function.

[tex]P(10)=36800\cdot2^{^\dfrac{10}{25}}}\\=48557.9\\\approx 48558[/tex]

According to the model, the population in Fall River will be 48,558 in the Year 2020.

Answer:

48,558 people

Step-by-step explanation:

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