Answer:
[tex]P=750 e^{0.00963t}[/tex]
The population size would be 753,190 after 30 days
Explanation:
Since, the population growth function is,
[tex]P = P_0 e^{rt}[/tex]
According to the question,
if t = 0, P = 750,
[tex]\implies 750 = P_0 e^0\implies P_0 = 750[/tex]
Also, if t = 72, P = 1500,
[tex]\implies 1500 = P_0 e^{72r}\implies 1500 = 750 e^{72r}\implies 2 = e^{72r}\implies \ln 2 = 72r\implies r = \frac{\ln 2}{72}\approx 0.00963[/tex]
Hence, the required function would be,
[tex]P=750 e^{0.00963t}[/tex]
If t = 720 hours ( 30 days = 720 hours ),
Then, the population after 30 days would be,
[tex]P=750 e^{0.00963\times 720}=750 e^{6.912}=753190.30695\approx 753190[/tex]
