IB Maths AI 2.7 Notes

A very important application is half-life. The half-life is the time taken for a quantity to reduce to half of its original value.

Suppose a substance is modelled by $f(t)=Ae^{-kt}$.

To find the half-life, let $f(t)=\frac{A}{2} =Ae^{-kt}$

Divide by $A$: $\frac{1}{2}=e^{-kt}$

Take natural logarithms: $\ln\left(\frac{1}{2}\right)=-kt$

So $t=\frac{\ln2}{k}$.

This gives the half-life formula for an exponential decay model.

$t=\frac{\ln2}{k}$

Suppose a radioactive sample is modelled by $f(t)=500e^{-0.08t}$, find the half-life.

Its half-life is $t=\frac{\ln2}{0.08}\approx8.66$.

So the quantity halves every $8.66$ time units.