Answer:
16.7 days
Explanation:
We are given;
A radioactive isotope Iodine-131`
The decay rate is 0.138 d⁻¹
The percent decayed is 90%
We are suppose to calculate the number of days for the decay.
[tex]In(\frac{[A_{0}]}{[A]})=kt[/tex]
Where, [tex][A_{0}][/tex] is the initial concentration and [tex][A][/tex] is the new concentration.
[tex]t=In(\frac{[A_{0}]}{[A]})/k[/tex]
Assuming the initial concentration is x, then the final concentration after 90% decay will be 0.10x
Therefore;
[tex]t=In(\frac{[x]}{[0.10x]})(\frac{1}{0.138})[/tex]
[tex]t=In(\frac{[1]}{[0.10]})(\frac{1}{0.138})[/tex]
[tex]t=In(10.0)(\frac{1}{0.138})[/tex]
[tex]t=(2.3026)(\frac{1}{0.138})[/tex]
[tex]t=16.685[/tex]
Time = 16.7 days
Therefore, it will take 16.7 days for 90% of I-131 to decay to Xe-131
