Answer:
The population will become 840 million in 2019.
Step-by-step explanation:
Given:
The exponential model of population is given as:
[tex]A=682.2e^{0.013t}[/tex]
Here, 't' is in years measured since 2003.
This means for the year 2003, t = 0 and so on.
Now, in order to get the year when the population is 840 million, we need to plug in 840 for 'A' and solve for 't'. Therefore,
[tex]840=682.2e^{0.013t}\\\\e^{0.013t}=\frac{840}{682.2}\\\\e^{0.013t}=1.2313[/tex]
Taking natural log on both sides, we get:
[tex]0.013t=\ln(1.2313)\\\\0.013t=0.2081\\\\t=\frac{0.2081}{0.013}\\\\t=16\ years[/tex]
Therefore, 16 years after 2003, the population will be 840 million.
So, the year is equal to 2003 + 16 = 2019.
Hence, in the year 2019, the population will become 840 million.
