How long will it take for a radioactive isotope with a decay constant of 0.15 (which means a half life of 4.6 days ) to decay to 5% of its original value?
(At = A0e^-kt)

A 3 days
B 4.6 days
C 5 days
D 10.73 days
E 19.97 days

we know that N=No exp(-kt), where k is the decay constant, 5% of its original value means N=(5/100)No
so, for t=t', N=(5/100)No, (5/100)No=Noexp(-kt'), (5/100)=exp(-kt')
Ln(5/100)=Lnexp(-kt')= - kt', -2.99 = -0.15t', so t' = 19.93
so the answer is E 19.97 days

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jajumonac jajumonac · Answer 2 · 2020-04-18T03:18:38+02:00

Answer:

E. 19.97 days.

Step-by-step explanation:

The function that models this situation is

[tex]A(t)=A_{0}e^{-kt}[/tex]

This expression models the decay behaviours, where [tex]k=0.15[/tex] is the decay constant.

Now, 5% of its original value refers to [tex]A(t)=0.05(A_{0})[/tex].

Using all this information in the formula, we have

[tex]A(t)=A_{0}e^{-kt}\\0.05(A_{0})=A_{0}e^{-(0.15)t}\\0.05=e^{-(0.15)t}[/tex]

Here, we need to use logarithms to eliminate the power

[tex]ln(0.05)=ln(e^{-(0.15)t})\\ln(0.05)=-0.15t\\t=\frac{ln(0.05)}{-0.15} \approx 19.97[/tex]

Therefore, the right answer is E. 19.97 days.

How long will it take for a radioactive isotope with a decay constant of 0.15 (which means a half life of 4.6 days ) to decay to 5% of its original value? (At = A0e^-kt) A 3 days B 4.6 days C 5 days D 10.73 days E 19.97 days

Respuesta :

E. 19.97 days.

Otras preguntas

How long will it take for a radioactive isotope with a decay constant of 0.15 (which means a half life of 4.6 days ) to decay to 5% of its original value?
(At = A0e^-kt)

A 3 days
B 4.6 days
C 5 days
D 10.73 days
E 19.97 days