The half-life of an element is $5.8 x 10^{11}$ $5.8 x 10^11$ . How long does it take a sample of the element to decay to $\frac{2}{5}$ $2/5$ its original mass?

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The half-life of an element is $5.8 x 10^{11}$ $5.8 x 10^11$ . How long does it take a sample of the element to decay to $\frac{2}{5}$ $2/5$ its original mass?

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Answer 1 · 2016-12-01T14:46:48

The expression for the first-order decay of a population is
$\frac{A}{A_{0}} = e^{- k t}$ $A/A_0=e^(-kt)$
where the rate constant $k$ $k$ is related to the half-life by
$k = \frac{ln 2}{t_{\frac{1}{2}}}$ $k=ln2/t_(1/2)$

Explanation:

In the question, the half-life should have units of time. Let's assume that the half-life is $5.8 \times 10^{11} s$ $5.8 times 10^11 s$

In this case, the value of the rate constant is
$k = \frac{ln 2}{t_{\frac{1}{2}}} = \frac{ln 2}{5.8 \times 10^{11} s} = 1.20 \times 10^{- 12} s^{- 1}$ $k=ln2/t_(1/2)=ln2/(5.8times10^11 s)=1.20times 10^-12 s^-1$

Using the first equation, we can find the time, $t$ $t$ at which the fraction of remaining atoms is $\frac{2}{5}$ $2/5$ .

$\frac{2}{5} = e^{- (1.20 \times 10^{- 12} s^{- 1}) (t)}$ $2/5 = e^(-(1.20times10^-12 s^-1)(t))$

Solve for $t$ $t$ by first taking the natural logarithm of both sides:

$- 0.92 = - (1.2 \times 10^{- 12} s^{- 1}) t$ $-0.92=-(1.2 times 10^-12 s^-1) t$

$t = \frac{0.92}{1.2 \times 10^{- 12} s^{- 1}} = 7.67 \times 10^{11} s$ $t=0.92/(1.2times10^-12 s^-1)=7.67times10^11 s$

(or about 24,300 years)

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The half-life of an element is $5.8 x 10^{11}$ $5.8 x 10^11$ . How long does it take a sample of the element to decay to $\frac{2}{5}$ $2/5$ its original mass?

1 Answer

Explanation:

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The half-life of an element is $5.8 x 10^{11}$ $5.8 x 10^11$ . How long does it take a sample of the element to decay to $\frac{2}{5}$ $2/5$ its original mass?