Radium decays according to the function Q(t) = Q0e^-kt where Q represents the quantity remaining after t years and k is the decay constant 0.00043. how long will it take for 500g of radium to decay to

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asked Nov 3, 2023 101k views

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Radium decays according to the function Q(t) = Q0e^-kt where Q represents the quantity remaining after t years and k is the decay constant 0.00043. how long will it take for 500g of radium to decay to 5g?A. approx. 10,710 yearsB. approx. 233 yearsC. approx 2501 yearsD. approx 14,453 years

Mathematics
college

Cletus asked

by Cletus

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1 Answer

3 votes

Step 1

Given;

From the question;

$\begin{gathered} Q(t)=5 \\ Q_o=500 \\ k=0.00043 \end{gathered}$
$\begin{gathered} 5=500e^(-(0.00043t)) \\ (5)/(500)=e^(-0.00043) \\ 0.01=e^(-0.00043) \\ -0.00043t=\ln \left((1)/(100)\right) \\ t=(2\ln \left(10\right))/(0.00043) \\ t=10709.69810 \\ t=\text{ approximately 10710 years} \end{gathered}$

Answer; Option A

Bryan Monterrosa answered Nov 7, 2023