What change(s) should Sylvia make to the equation to find the value of t in the above scenario?

Question

asked Jan 7, 2021 12.3k views

1 Answer

Shibumi · Answer 1 · 2021-01-12T09:08:02+0000

Answer:

Option (D).

Explanation:

Initial population of the deer
P_(0) = 4800

Decrease in the population of the deer after every 8 years =
$(1)/(2)* (\text{Initial population})$

Decrease in population is an exponential process, so the expression representing population will be,

P_(t)=P_(0)(1-r)^x

Where
P_(t) is the population after 'x' slots of 8 years.

r = fraction of decrease in the population

x =
$\frac{\text{Number of years}}{8}$

By substituting the values of r and x in the expression,

$P_(t)=P_(0)(1-(1)/(2))^{(t)/(8)}$

$P_(t)=4800((1)/(2))^{(t)/(8)}$

Therefore, Sylvia should do few corrections in her expression.

(8) should be replaced by (
(1)/(2) ) and
(t)/(2) should be replaced by
(t)/(8) .

Option D. will be the answer.