It is given that the half-life is 20 years and the current population is 1.6 million.
It is required to find the population in 30 and 65 years, respectively.
Recall the Exponential Decay Half-Life Formula:
[tex]N=N_0\left(\frac{1}{2}\right)^{\frac{t}{h}}[/tex]Where N₀ is the current population, t is the time in years, and h is the half-life.
(a) Substitute N₀=1.6, h=20, and t=30 into the formula:
[tex]N=1.6\left(\frac{1}{2}\right)^{\frac{30}{20}}\approx0.6\text{ million}=600,000[/tex]About 600,000 animals will be left in 30 years.
(b) Substitute N₀=1.6, h=20, and t=65 into the formula:
[tex]N=1.6\left(\frac{1}{2}\right)^{\frac{30}{20}}\approx0.6\text{ million}=600,000[/tex]