If the decay ratio is 2% each year, there is left 98%, which is 0.98.
Then, if the initial mass is 50 kilograms, then we can express the following
[tex]A=50(0.98)^t[/tex]Then, we solve for t, when A = 25, which is half of the initial amount.
[tex]\begin{gathered} 25=50\cdot(0.98)^t \\ \frac{25}{50}=(0.98)^t \\ \frac{1}{2}=(0.98)^t \end{gathered}[/tex]Now, we use logarithms to find the value of t
[tex]\begin{gathered} \log (\frac{1}{2})=\log (0.98)^t \\ \log (\frac{1}{2})=t\cdot\log (0.98) \\ t=\frac{\log (\frac{1}{2})}{\log (0.98)} \\ t\approx34.3 \end{gathered}[/tex]