In this question, k stands for the decay constant. The half-life and decay constant of a radioactive isotope are related by the following equation:
Half Life = ln(2) / Decay Constant
ln(2) is the natural log of 2.
We are provided that in 3.4 years the isotope decays to 1/16 of its initial value.
[tex] \frac{1}{16}= \frac{1}{ 2^{4} } [/tex]
This means, in 3.4 years 4 half lifes are passed.
So, 4 Half lifes = 3.4 years
Half Life = 3.4/4 = 0.85 years.
Now we can find k by plugging in values in above equation:
[tex]k= \frac{ln(2)}{0.85}= 0.815 [/tex]
So the value of k for the isotope is 0.815 per year.
