Question 126383
The growth of the herd will be modeled by P(t)=1000/19(2.7^-0.1656t), where P is the population of the herd t months after releasing the animals. How many animals are in the herd after one year? 
:
I assume this is the equation:
P(t) = {{{1000/(19(2.7^(-0.1656t)))}}}
:
t = 12
:
P(t) = {{{1000/(19(2.7^(-0.1656*12)))}}}
P(t) = {{{1000/(19(2.7^(-1.9872)))}}}
Find 2.7^-1.9872 on good calc
P(t) = {{{1000/(19(.138929))}}}
P(t) = {{{1000/2.639657}}}
P(t) = 378.837 ~ 379 animals expected (but do the animals know about this formula?)