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A radioactive substance decays according to A=A0e−0.0028t, where A0 is the initial amount and t is the time in years. If A0=710 grams, find the time for the radioactive substance to decay to 366 grams. Round your answer to two decimal places, if necessary.

User Abulafia
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1 Answer

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7 votes

Solution

- The function given is:


A=A_0e^(-0.0028t)

- We have been given:


\begin{gathered} A_0=710g \\ A=366g \end{gathered}

- We are required to find the time for the radioactive substance to decay. That means we need to find the value of t in the equation.

- Thus, we have that:


\begin{gathered} 366=710e^(-0.0028t) \\ \text{ Divide both sides by 710} \\ (366)/(710)=e^(-0.0028t) \\ \\ \text{ Take the natural log of both sides} \\ \ln((366)/(710))=\ln(e^(-0.0028t)) \\ \\ \ln((366)/(710))=-0.0028t \\ \\ \text{ Divide both sides by -0.0028} \\ \\ \therefore t=(1)/(-0.0028)\ln((366)/(710)) \\ \\ t=236.6541...\approx236.65\text{ years} \end{gathered}

Final Answer

The answer is 236.65 years