54,225 views
42 votes
42 votes
The radioactive substance uranium-240 has a half-life of 14 hours. The amount At of a sample of uranium-240 remaining (in grams) after t hours is given by the following exponential function.

The radioactive substance uranium-240 has a half-life of 14 hours. The amount At of-example-1
User Marwan Salim
by
2.5k points

1 Answer

16 votes
16 votes

Step 1

Given;


A(t)=5600((1)/(2))^{(t)/(14)}

Required; To find the amount A(t) of a sample of uranium-240 remaining (in grams) after 13 hours and 60 hours

Step 2

Find the initial amount. To do this we set t=0


\begin{gathered} A(0)=5600((1)/(2)_)^{(0)/(14)} \\ A(0)=5600grams \end{gathered}

Hence the equation remains valid

Step 3

Find the amount A(t) left after 13 hours


A(13)=5600((1)/(2))^{(13)/(14)}
\begin{gathered} =5600\cdot \frac{1^{(13)/(14)}}{2^{(13)/(14)}} \\ =(5600)/(1)\cdot \frac{1}{2^{(13)/(14)}} \\ =\frac{5600}{2^{(13)/(14)}} \\ =\frac{2^5\cdot \:175}{2^{(13)/(14)}} \\ =2^{(57)/(14)}\cdot\:175=2942.11858 \\ =2942grams \end{gathered}

Step 4

Find the amount A(t) left after 60 hours


\begin{gathered} A(60)=5600((1)/(2))^^{(60)/(14)} \\ =5600\cdot \frac{1^{(60)/(14)}}{2^{(60)/(14)}} \\ =5600\cdot \frac{1}{2^{(60)/(14)}} \\ =(5600)/(1)\cdot \frac{1}{16\cdot \:2^{(2)/(7)}} \\ =\frac{5600}{16\cdot \:2^{(2)/(7)}} \\ =\frac{16\cdot \:350}{16\cdot \:2^{(2)/(7)}} \\ =\frac{350}{2^{(2)/(7)}} \\ =2^{(5)/(7)}\cdot \:175 \\ A(60)=287.11737 \\ A(60)\approx287grams \end{gathered}

Answers;


\begin{gathered} A(13)=2942grams\text{ to the nearest gram} \\ A(60)=287grams\text{ to the nearest gram} \end{gathered}

User JBert
by
2.7k points