Answer:
About 20.81 years
Step-by-step explanation:
89 million is the "final population" -- population after t years.
So, 89 million would be in "A" in the equation. Then we will have to solve for "t" by taking LN (natural logarithm). That is how we solve exponential equations.
So,
[tex]A=58.7e^{0.02t}\\89=58.7e^{0.02t}\\\frac{89}{58.7}=e^{0.02t}\\1.5162=e^{0.02t}[/tex]
Now we recognize the exponential rule of:
Ln(e) = 1
and we use the property:
[tex]Ln(a^b)=bLn(a)[/tex]
Now, we solve by taking Ln of both sides:
[tex]1.5162=e^{0.02t}\\Ln(1.5162)=Ln(e^{0.02t})\\Ln(1.5162)=0.02tLn(e)\\Ln(1.5162)=0.02t\\t=\frac{Ln(1.5162)}{0.02}\\t=20.81[/tex]
So, population would be 89 million in about 20.81 years
