Answer:
We should expect the population to reach 71000 in 1993.
Step-by-step explanation:
If the population will double every 54 years and the population in 1974 was 56000 people, then the function that represents this situation is
[tex]y=56000\cdot 2^{\frac{x}{54}},[/tex]
where x is time in years since 1974.
Nota that in 1974, x=0, then y=56000 and after 54 years the population will be [tex]y=56000\cdot 2^{\frac{54}{54}}=56000\cdot 2=112000.[/tex]
Therefore, you have to calculate x, when y=71000:
[tex]71000=56000\cdot 2^{\frac{x}{54}},\\ \\\dfrac{71}{56}=2^{\frac{x}{54}},\\ \\\dfrac{x}{54}=\log_2\dfrac{71}{56},\\ \\x=54\log_2\dfrac{71}{56}\approx 18.49[/tex]
Thus, we should expect the population to reach 71000 in 1993 (after full 19 years).
