How long do you think it would take for the material to decay to 23% (without doing the actual calculation), make an explanation using the half-life being 12 years

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asked Sep 17, 2023 101k views

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Elvis Fernandes · Answer 1 · 2023-09-22T11:01:47+0000

Solution

The exponential decay can be expressed as;

$A(t)=A_0((1)/(2))^{^{(t)/(t_(half))}}$
$\begin{gathered} \Rightarrow0.23=((1)/(2))^{(t)/(12)} \\ \\ \Rightarrow\ln(0.23)=(t)/(12)\ln((1)/(2)) \\ \\ \Rightarrow t=(12*\ln(0.23))/(\ln((1)/(2)))=25 \end{gathered}$

Hence, it will take about 25 years. (By calculation)

By Inspection.

12 years is 50%

24 years is 25%

It will take about 24 years to decay to 23%

How long do you think it would take for the material to decay to 23% (without doing the actual calculation), make an explanation using the half-life being 12 years

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