Answer:
The initial population is about 310 bacteria.
The size of the bacterial population after five hours is about 325, 058, 560.
Step-by-step explanation:
The exponential function describing growth is given by:
[tex]\displaystyle A=A_0(r)^{t/d}[/tex]
Where A is the amount afterwards, A₀ is the initial amount, r is the rate of growth, t is the amount of time that has passed and d is the time it takes for one cycle (both t and d are minutes in this case).
We are given that the bacteria population doubles after every 15 minutes. Hence, r = 2 and d = 15:
[tex]\displaystyle A=A_0\left(2\right)^{t/15}[/tex]
At time t = 110 minutes, the bacterial population was 50,000. Hence:
[tex]50000=A_0(2)^{110/15}[/tex]
Solve for A₀:
[tex]\displaystyle 50000=A_0(2)^{22/3}\Rightarrow \displaystyle A_0=\frac{50000}{2^{22/3}}=310.0392...\approx310[/tex]
Hence, the initial population (when t = 0) was about 310.
Thus, our function is:
[tex]A=310 (2)^{t/15}[/tex]
After five hours, 300 minutes would have passed. Thus:
[tex]A(300)=310(2)^{300/15}=310(2)^{20}=325, 058, 560\text{ bacteria}[/tex]
