Radioactive material $'A'$ has decay constant $' 8 \lambda '$ and material $'B' $ has decay constant $'\lambda'$ Initially they have same number of nuclei. After what time, the ration of number of nuclei of material of material $'B' $ to that $'A'$ will be $\frac{1}{e} ?$
- $\frac{1}{7 \lambda} $
- $\frac{1}{8 \lambda} $
- $\frac{1}{9 \lambda} $
- $\frac{1}{ \lambda} $
The Correct Option is A
Approach Solution - 1
If we take $\frac{N_{A}}{N_{B}}=\frac{1}{e}$
Then
$\frac{N_{A}}{N_{B}}=\frac{e^{-8 \lambda t}}{e^{-\lambda t}}$
$\frac{1}{e}=e^{-7 \lambda t}$
$-1=-7 \lambda t$
$t=\frac{1}{7 \lambda}$
Approach Solution -2
| A | B |
| 8𝜆 | 𝜆 |
| N0 | N0 |
NA/NB = 1/e
N=N0e-𝜆t
NA = N0e-8𝜆t……….(1)
and
NB=N0e-𝜆t……….(2)
By solving equations 1 & 2, we get
\(\frac{N_A}{N_B}\) = \(\frac{N_0 e^- 8\lambda t}{N_0 e^-\lambda t}\)
\(\frac{N_A}{N_B}\)=\(\frac{ e^- 8\lambda t}{ e^-\lambda t}\)
\(\frac{1}{e}\) = \(\frac{1}{(e-\lambda t+e-8 \lambda t)}\)
\(\frac{1}{e}\) = \(\frac{1}{e7 \lambda t}\)
7𝜆t = 1
t = \(\frac{1}{7\lambda}\)
So, option(A) is the correct answer.
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Concepts Used:
Decay Rate
The disintegration of unstable heavy atomic nuclei into lighter, more stable, atomic nuclei, accompanied in the process by the emission of ionizing radiation (alpha particles, beta particles or gamma rays). This is a random process at the atomic level but, given a large number of similar atoms, the decay rate on average is predictable, and is usually measured by the half-life of the substance.
The equation for finding out the decay rate is given below:
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