Answer:
Step-by-step explanation:
Let P be the population of the community
So the population of a community increase at a rate proportional to the number of people present at a time
That is
[tex]\frac{dp}{dt} \propto p\\\\\frac{dp}{dt} =kp\\\\ [k \texttt {is constant}]\\\\\frac{dp}{dt} -kp =0[/tex]
Solve this equation we get
[tex]p(t)=p_0e^{kt}---(1)[/tex]
where p is the present population
p₀ is the initial population
If the initial population as doubled in 5 years
that is time t = 5 years
We get
[tex]2p_o=p_oe^{5k}\\\\e^{5k}=2[/tex]
Apply In on both side to get
[tex]Ine^{5k}=In2\\\\5k=In2\\\\k=\frac{In2}{5} \\\\\therefore k=\frac{In2}{5}[/tex]
Substitute [tex]k=\frac{In2}{5}[/tex] in [tex]p(t)=p_oe^{kt}[/tex] to get
[tex]\large \boxed {p(t)=p_oe^{\frac{In2}{5}t }}[/tex]
Given that population of a community is 9000 at 3 years
substitute t = 3 in [tex]{p(t)=p_oe^{\frac{In2}{5}t }}[/tex]
[tex]p(3)=p_oe^{3 (\frac{In2}{5}) }\\\\9000=p_oe^{3 (\frac{In2}{5}) }\\\\p_o=\frac{9000}{e^{3(\frac{In2}{5} )}} \\\\=5937.8[/tex]
