The observed relative growth rate of Ukraine is $4\%$ per year. In 2006 the population of Ukraine is 112,000.
a.) Determine a function that will model the population after t years.
b.) Determine the projected population in year 2012.
c.) On what year will Ukraine have a total population of 200,000.
a.) Recall the formula for growth rate
$n(t) = n_0 e^{rt}$
where
$n(t)$ = population at time $t$
$n_0$ = initial size of the population
$r$ = relative rate of growth
$t$ = time
If we let $112000$ be the initial population, then the model of the population after $t$ years is $n(t) = 112000 e^{0.04t}$
b.) The projected population in the year 2012 where $t = 6$ is..
$
\begin{equation}
\begin{aligned}
n(6) =& 112000 e^{0.04(6)}
\\
\\
=& 142379.90 \text{ or } 142379
\end{aligned}
\end{equation}
$
c.)
$
\begin{equation}
\begin{aligned}
\text{if } n(t) =& 200,000 \text{ then}
&&
\\
\\
200,000 =& 112,000 e^{0.04 t}
&& \text{Divide both sides by } 112,000
\\
\\
\frac{25}{14} =& e^{0.04 t}
&& \text{Take $\ln$ of each side}
\\
\\
\ln \left( \frac{25}{14} \right) =& 0.04 t
&& \text{Recall } \ln e = 1
\\
\\
t =& \frac{\displaystyle \ln \left( \frac{25}{14} \right)}{0.04 }
&& \text{Solve for } t
\\
\\
t =& 14.50
&&
\end{aligned}
\end{equation}
$
It shows that the population will reach $200,000$ in the year 2020 plus 6 months.
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