Answer:
32,0 days.
Explanation:
The radioactive decay follows:
[tex]N_{t} = N_{0}e^{\frac{-0.693t}{t_{1/2}}[/tex]
Where Nt is the concentration in a time t (6,22x10¹⁷), N₀ is the initial concentration (9,95x10¹⁸) Half life time is 8,0 days and t is the time it take to drop this concentration. Replacing:
[tex]6.22x10^{17} = 9,95x10^{18}e^{\frac{-0.693t}{8 days}[/tex]
[tex]0,0625 = e^{\frac{-0.693t}{8days}[/tex]
[tex]ln 0,0625 = {\frac{-0.693t}{8days}[/tex]
[tex]-2,77*8days = -0.693t[/tex]
[tex]-22,2days = -0.693t[/tex]
[tex]32,0days = t[/tex]
It take 32,0 days
I hope it helps!
