How many half-lives have elapsed when 25% of the parent nuclide is left?

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How many half-lives have elapsed when 25% of the parent nuclide is left?

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Answer 1 · 2017-06-10T14:37:08

$2 half-lives$ $"2 half-lives"$

Explanation:

The thing to remember about a radioactive nuclide's nuclear half-life, $t_{1/2}$ $t_"1/2"$ , is that it represents the time needed for half, hence the term half-life, of an initial sample of said nuclide to undergo radioactive decay.

In other words, the mass of a radioactive nuclide, regardless of its initial value, will always be halved after $1$ $1$ half-life passes.

So, if you start with $A_{0}$ $A_0$ , you can say that you will be left with

$A_{0} \cdot \frac{1}{2} = \frac{A_{0}}{2} = \frac{A_{0}}{2^{1}} \to$ $A_0 * 1/2 = A_0/2 = A_0/2^color(red)(1) ->$ after $1$ $color(red)(1)$ half-life

$\frac{A_{0}}{2} \cdot \frac{1}{2} = \frac{A_{0}}{4} = \frac{A_{0}}{2^{2}} \to$ $A_0/2 * 1/2 = A_0/4 = A_0/2^color(red)(2) ->$ after $2$ $color(red)(2)$ half-lives

$\frac{A_{0}}{4} \cdot \frac{1}{2} = \frac{A_{0}}{8} = \frac{A_{0}}{2^{3}} \to$ $A_0/4 * 1/2 = A_0/8 = A_0/2^color(red)(3) ->$ after $3$ $color(red)(3)$ half-lives
$⋮$ $vdots$

and so on.

In your case, you know that

$25 % = \frac{25}{100} = \frac{1}{4}$ $25% = 25/100 = 1/4$

of the initial sample is left after a time $t$ $t$ passes, which means that you will have

$A_{t} = A_{0} \cdot \frac{1}{4} = \frac{A_{0}}{4} = \frac{A_{0}}{2^{2}}$ $A_t = A_0 * 1/4 = A_0/4 = A_0/2^color(red)(2)$

As you can see, this is exactly what you would expect to get after $2$ $color(red)(2)$ half-lives pass, so

$t = 2 \cdot t_{1/2}$ $t = color(red)(2) * t_"1/2"$

and

$A_{2 \times t_{1/2}} = \frac{A_{0}}{2^{2}} \to$ $A_ (color(red)(2) xx t_"1/2") = A_0/2^color(red)(2) ->$ the initial sample is down to $25 %$ $25%$ of its initial value after $2$ $color(red)(2)$ half-lives

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How many half-lives have elapsed when 25% of the parent nuclide is left?

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