1 Answer

Paramosh · Answer 1 · 2023-08-14T22:34:54+0000

Given that the population is one-tenth as large as the prior year and that the starting population is 100,000, we have the sequence:

a_ 1 = 100000

a_ 2 = 10000

a_ 3 = 1000

a_ 4 = 100

a_ 5 = 10

Then:

$\mathrm{A\:geometric\:sequence\:has\:a\:constant\:ratio\:}r\mathrm{\:and\:is\:defined\:by}\:a_n=a_1\cdot r^(n-1)$

In this case, we have r = 1/10 and the equation that models this situation is:

$a_n=100000\left((1)/(10)\right)^(n-1)$

After 5 years, the population will be:

$\:a_5=100000\left((1)/(10)\right)^(5-1)=10\text{ }$

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