Answer:
The population size after eight days is about 265
Step-by-step explanation:
This is an example of an exponential growth model. A quantity y that grows or decays at a rate proportional to its size fits in an equation of the form
[tex]\frac{dy}{dt}=ky[/tex]
where k is a positive constant. Its solutions have the form
[tex]y=y_{0}e^{kt}[/tex],
where [tex]y_{0} =y(0)[/tex] is the initial value of y.
The population size can be calculated by using the below formula:
[tex]P(t)=P(0)e^{kt}[/tex] where [tex]P(0)[/tex] is the population on day zero.
Let t be the time in days,
We know from the information given that:
To find the population size after eight days
Substitute P(0) = 5, k=0.4964 in [tex]P(t)=P(0)e^{kt}[/tex]
Then
[tex]P(t)=5e^{0.4964\cdot t}[/tex]
Now we calculate P(t) when t = 8 days
[tex]P(8) = 5e^{0.4964\cdot 8}\\P(8) = 5e^{3.9712}\\e^{3.9712}=53.04815\dots \\P(8) = 5 \cdot 53.04815\dots\\P(8) = 265.24075\dots \approx 265[/tex]
Therefore the population size after eight days is about 265
