Given:
Half life of radon t1/2 = 14 days
Initial # atoms of radon, N(0) = 4800
# atoms left after a certain time (Nt) = 75
To determine:
The decay time (t)
Step-by-step explanation:
The radioactive decay is given by the following equation:-
N(t) = N(0)exp(-kt) -------(1)
where, the exponential decay constant k is given as:
k = 0.693/t1/2 ----(2)
Based on the given data:
k = 0.693/14 = 0.0495 day⁻¹
Substituting k in eq(1)
75 = 4800 exp(-0.0495t)
ln(75/4800) = (-0.0495t)lne
t = 84 days
1 week = 7 days
therefore, 84 days corresponds to: 84 days * 1 week/7 days = 12 weeks
Ans: It will take 12 weeks for the decay of radon from 4800 to 75 atoms