Question:
The half-life of a radioactive substance is 12 minutes. The time gap between 28\% decay and 82\% decay of the radioactive substance is:
The half-life of a radioactive substance is 12 minutes. The time gap between 28\% decay and 82\% decay of the radioactive substance is:
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The time gap between two decay levels is determined using the exponential decay formula.
Updated On: Mar 11, 2025
- 6 minutes
- 18 minutes
- 12 minutes
- 24 minutes
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Verified By Collegedunia
The Correct Option is D
Solution and Explanation
Radioactive decay follows the formula:
\[
N = N_0 e^{-\lambda t}
\]
where the decay constant is related to half-life:
\[
\lambda = \frac{\ln 2}{T_{1/2}}
\]
Given \( T_{1/2} = 12 \) min, the fraction remaining at 28\% decay is:
\[
\frac{N}{N_0} = 0.72
\]
At 82\% decay:
\[
\frac{N}{N_0} = 0.18
\]
Solving for \( t \):
\[
t = \frac{\ln(0.72)}{\ln(0.5)} \times 12
\]
\[
t = \frac{\ln(0.18)}{\ln(0.5)} \times 12
\]
The difference between the two times is 24 minutes.
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