Respuesta :
Answer:
Part (A) The projected population after 24 hours when no antibiotic is present is 392 bacteria.
Part (B) The projected population after 24 hours when an antibiotic is present in the culture is 73 bacteria.
Step-by-step explanation:
Consider the provided information.
The initial number of bacteria in the culture is 22. The projected population after 24 hours for the following conditions. Bacteria culture has a relative growth rate of 12% per hour,
Use exponential model: [tex]n(t)=n_0e^{rt}[/tex]
Part (A) No antibiotic is present, so the relative growth rate is 12%.
The initial number of bacteria in the culture is 22.
That means [tex]n(0)=22[/tex]
The growth rate is 12%=0.12
Times is 24 hours
Substitute the respective values in exponential model:
[tex]n(t)=22e^{0.12\times 24}[/tex]
[tex]n(t)=391.91\approx 392[/tex]
The projected population after 24 hours when no antibiotic is present is 392 bacteria.
Part (B) An antibiotic is present in the culture, so the relative growth rate is reduced to 5%.
The initial number of bacteria in the culture is 22.
That means [tex]n(0)=22[/tex]
The growth rate is reduced to 5%=0.05
Times is 24 hours
Substitute the respective values in exponential model:
[tex]n(t)=22e^{0.05\times 24}[/tex]
[tex]n(t)=73.04\approx 73[/tex]
The projected population after 24 hours when an antibiotic is present in the culture is 73 bacteria.
