The population of the bacteria is modeled by an exponential function.
The population of the sample will double after 16.5 hours
An exponential function is represented as:
[tex]\mathbf{y=a(1 + r)^x}[/tex]
Where
- r represents the growth rate (i.e. 4.3%).
- x represents the number of hours.
- y represents the current population.
- a represents the initial population.
When the population doubles, we have:
y = 2a
So, the equation becomes:
[tex]\mathbf{2a=a(1 + 4.3\%)^x}[/tex]
Divide both sides by a
[tex]\mathbf{2=(1 + 4.3\%)^x}[/tex]
[tex]\mathbf{2=(1.043)^x}[/tex]
Take logarithm of both sides
[tex]\mathbf{log(2)=log(1.043)^x}[/tex]
Apply law of logarithm
[tex]\mathbf{log(2)=xlog(1.043)}[/tex]
Divide both sides by log(1.043)
[tex]\mathbf{x = \frac{log(2)}{log(1.043)}}[/tex]
Divide
[tex]\mathbf{x = 16.5}[/tex]
Hence, the population will double after 16.5 hours
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