The function $f (t) = 5 {(4)}^{t}$ $f(t)=5(4)^t$ represents the number of frogs in a pond after $t$ $t$ years. What is the yearly percent change? the approximate monthly percent change?

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The function $f (t) = 5 {(4)}^{t}$ $f(t)=5(4)^t$ represents the number of frogs in a pond after $t$ $t$ years. What is the yearly percent change? the approximate monthly percent change?

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Answer 1 · 2017-02-05T23:07:08

Yearly change: 300%

Approx monthly: 12.2%

Explanation:

For $f (t) = 5 {(4)}^{t}$ $f(t)=5(4)^t$ where $t$ $t$ is expressed in terms of years, we have the following increase $Delta_Y f$ between years $Y+n + 1$ and $Y +n$ :

$Delta_Y f =5(4)^(Y+n+1) - 5(4)^(Y+n)$

This can be expressed as $Delta P$ , a yearly percentage change, such that:

$Delta P =(5(4)^(Y+n+1) - 5(4)^(Y+n))/(5(4)^(Y+n)) = 4 - 1 = 3 equiv 300 \%$

We can then calculate this as an equivalent compounded monthly change, $Delta M$ .

Because:

$(1+ Delta M)^(12) f_i= (1 + Delta P) f_i$ ,

then

$Delta M = (1+ Delta P)^(1/12) - 1 approx 12.2\%$

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The function $f (t) = 5 {(4)}^{t}$ $f(t)=5(4)^t$ represents the number of frogs in a pond after $t$ $t$ years. What is the yearly percent change? the approximate monthly percent change?

1 Answer

Explanation:

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The function $f (t) = 5 {(4)}^{t}$ $f(t)=5(4)^t$ represents the number of frogs in a pond after $t$ $t$ years. What is the yearly percent change? the approximate monthly percent change?