Iron-59 has a half-life of 44.5 days. How much of a 3.00 mg sample will be left after 222.5 days?

Neo Genesis asked Oct 23, 2023

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Neo Genesis asked Oct 23, 2023

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16 votes

Using exponential decay formula:

$N=N_o((1)/(2))^{(t)/(\tau)}$

Where:

$\begin{gathered} N_o=3mg \\ t=222.5_{\text{ }}days \\ \tau=44.5_{\text{ }}days \end{gathered}$

Therefore:

$\begin{gathered} N=3((1)/(2))^{(222.5)/(44.5)} \\ N\approx0.09mg \end{gathered}$

Answer:

About 0.09 miligrams

Aemxdp answered Oct 28, 2023

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