Answer:
It will take 5.6 hours to get the given population (3300) of the bacteria.
Step-by-step explanation:
A function that defines the population increase of a bacteria is,
B(h) = [tex]1425e^{0.15h}[/tex]
where h = duration or number of hours for bacterial growth
B(h) = Final population
If the final bacterial population is 3300,
3300 = [tex]1425e^{0.15h}[/tex]
By taking log on both the sides of the equation,
ln(3300) = [tex]ln(1425e^{0.15h})[/tex]
8.10168 = ln(1425) + [tex]ln(e^{0.15h})[/tex]
8.10168 = 7.261927 + 0.15h
h = [tex]\frac{8.10168-7.261927}{0.15}[/tex]
h = 5.5983
h ≈ 5.6 hours
Therefore, it will take 5.6 hours to get the given population (3300) of the bacteria.
