Answer:
[tex]P(t) = 5100e^{0.0039t}[/tex]
Step-by-step explanation:
The exponential model for the population in t years after 2013 is given by:
[tex]P(t) = P(0)e^{rt}[/tex]
In which P(0) is the population in 2013 and r is the growth rate.
In 2013, the moose population in a park was measured to be 5,100
This means that [tex]P(0) = 5100[/tex]
So
[tex]P(t) = 5100e^{rt}[/tex]
By 2018, the population was measured again to be 5,200.
2018 is 2018-2013 = 5 years after 2013.
So this means that [tex]P(5) = 5200[/tex].
We use this to find r.
[tex]P(t) = 5100e^{rt}[/tex]
[tex]5200 = 5100e^{5r}[/tex]
[tex]e^{5r} = \frac{52}{51}[/tex]
[tex]\ln{e^{5r}} = \ln{\frac{52}{51}}[/tex]
[tex]5r = \ln{\frac{52}{51}}[/tex]
[tex]r = \frac{\ln{\frac{52}{51}}}{5}[/tex]
[tex]r = 0.0039[/tex]
So the equation for the moose population is:
[tex]P(t) = 5100e^{0.0039t}[/tex]
