Answer:
After 20 years 18.75 gm of sample will remain.
Step-by-step explanation:
This is the case of an exponential decay of Cobalt-60. The function for exponential decay is,
[tex]y(t)=a(1-r)^t[/tex]
where,
y(t) = amount left after time t
a = initial amount = 300 g
r = rate of decay = 0.5 (as the sample is getting halved each time)
t = number of periods = [tex]\dfrac{20}{5}=4[/tex] (as we have to convert the period in terms of half lives)
Putting the values,
[tex]y(t)=300(1-0.5)^4=300(0.5)^{4}=\dfrac{75}{4}=18.75\ gm[/tex]
