Question #46693

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Question #46693

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Answer 1 · 2015-11-22T20:13:17

$0.0597 g$ $"0.0597 g"$

Explanation:

The thing to remember about nuclear half-life calculations is that on original sample of a radioactive substance will be halved with every passing of a half-life.

Mathematically, you can write this as

$A = A_{0} \cdot \frac{1}{2^{n}}$ $color(blue)(A = A_0 * 1/2^n)" "$ , where

$A$ $A$ - the amount of the radioactive substance that remains after the passing of $n$ $n$ half-lives
$A_{0}$ $A_0$ - the initial mass of the sample
$n$ $n$ - the number of half-lives that passed

Keep in mind, $n$ $n$ does not have to be a whole number. The above equation is valid whether or not a whole number of half-lives pass.

In your case, the mass of the original sample is $1.00 g$ $"1.00 g"$ . The half-life of tritium is said to be equal to $12.3$ $12.3$ years. To get the value of $n$ $n$ , divide the total time that passed by the half-life of the isotope

$n = \frac{total time}{half-life}$ $color(blue)(n = "total time"/"half-life")$

In this case, you will have

$n = (50.0color(red)(cancel(color(black)("years"))))/(12.3color(red)(cancel(color(black)("years"))))$

This means that you'll be left with

$A = "1.00 g" * 1/2^(50.0/12.3) = color(green)("0.0597 g tritium")$

The answer is rounded to three sig figs.

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Question #46693

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