The population of a pack of wolves is 88. the population is expected to grow at a rate of 2.5% each year. what function equation represents the population of the pack of wolves after t years?
a.f(t)=88(0.025)^t
b.f(t)=88(1.25^)t
c.f(t)=88(2.5)^t
d.f(t)=88(1.025)^t

D

First year: 88 + 88 * 2.5% = 88 + 88 * 0.025 = 88 * 1.025
Second year: 88 * 1.025 + 88 * 1.025 * 2.5% = 88 * 1.025 + 88 * 1.025 * 0.025 = 88 * 1.025 * 1.025 = 88 * 1.025^2

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SociometricStar SociometricStar · Answer 2 · 2018-12-12T13:43:07+01:00

Answer:

The population model of wolves after t years is given by

[tex]f(t)=88(1.025)^t[/tex]

D is the correct option.

Step-by-step explanation:

The exponential function can be represented as

[tex]f(t)=a(1+r)^t[/tex]

a = initial amount

r = rate

t = time

Now, we have been given that

r = 2.5% = 0.025

a = 88

On substituting these values in the above exponential model

[tex]f(t)=88(1+0.025)^t\\f(t)=88(1.025)^t[/tex]

The population model of wolves after t years is given by

[tex]f(t)=88(1.025)^t[/tex]

The population of a pack of wolves is 88. the population is expected to grow at a rate of 2.5% each year. what function equation represents the population of the pack of wolves after t years? a.f(t)=88(0.025)^t b.f(t)=88(1.25^)t c.f(t)=88(2.5)^t d.f(t)=88(1.025)^t

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The population of a pack of wolves is 88. the population is expected to grow at a rate of 2.5% each year. what function equation represents the population of the pack of wolves after t years?
a.f(t)=88(0.025)^t
b.f(t)=88(1.25^)t
c.f(t)=88(2.5)^t
d.f(t)=88(1.025)^t