Question

The population of a herd of sheep declines exponentially. If it takes 3 years for 15% to decline then how long will it take for half the population to decrease ?

Answer 1

It would take 12.8 years.

Explanation:

Let initial number of sheep `sf(=S_0)`

Let the number of sheep remaining after time t `sf(=S_t)`

The equation for exponential decay gives us:

`sf(S_t=S_0e^(-kt))`

If the number of sheep have declined by 15% then the number remaining must be 85% of the original total.

So `sf(S_t=085S_0)`

Putting in the numbers:

`sf(0.85cancel(S_0)=cancel(S_0)e^(-k3))`

Taking natural logs of both sides gives:

`sf(ln(0.85)=-k3)`

`:.` `sf(-0.1625=-k3)`

`:.` `sf(k=0.1625/3=0.05416color(white)(x)"yr"^-1)`

I won't go into the derivation here but it can be shown that the expression for 1/2 life in terms of the decay constant k is given by:

`sf(t_(1/2)=0.693/k)`

`:.` `sf(t_(1/2)=0.693/0.05416= 12.8color(white)(x)"yr")`