Thorium-234 has a half-life of 24 days. if you started with 100 gram sample of thorium-234, how much would remain after 48 days?

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Thorium-234 has a half-life of 24 days. if you started with 100 gram sample of thorium-234, how much would remain after 48 days?

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Answer 1 · 2015-12-02T14:12:43

$25 g$ $"25 g"$

Explanation:

Think about what a nuclear half-life represents, i.e. the time needed for an initial sample of a radioactive substance to be halved.

In your case, you know that thorium-234 has a half-life of $24$ $24$ days. That means that every $24$ $24$ days, half of the atoms of thorium you have in your sample will decay.

This is of course equivalent to saying that every $24$ $24$ days, you'll be left with half of the atoms of thorium you have in your sample.

So, if you start with $A$ $A$ grams of thorium-234, you can say that you'll be left with

$A \cdot \frac{1}{2} = \frac{A}{2} \to$ $A * 1/2 = A/2 ->$ after the passing of one half-life

$\frac{A}{2} \cdot \frac{1}{2} = \frac{A}{4} \to$ $A/2 * 1/2 = A/4 ->$ after the passing of two half-lives

$\frac{A}{4} \cdot \frac{1}{2} = \frac{A}{8} \to$ $A/4 * 1/2 = A/8 ->$ after the passing of three half-lives
$⋮$ $vdots$

and so on.

So, if you start with $100 g$ $"100 g"$ of thorium-234, you can say that you'll be left with

$100 g \cdot \frac{1}{2} = 50 g \to$ $"100 g" * 1/2 = "50 g" ->$ after $24$ $24$ days

$50 g \cdot \frac{1}{2} = 25 g \to$ $"50 g" * 1/2 = "25 g" ->$ after $48$ $48$ days

As you can see, you can calculate the amount of a sample that remains undecayed by using the equation

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

$A_{0}$ $A_0$ - the initial mass of the sample
$n$ $n$ - the number of half-lives that pass in a given period of time.

In your case, you'd have

$n = (48 color(red)(cancel(color(black)("days"))))/(24color(red)(cancel(color(black)("days")))) = 2$

Therefore,

$A = "100 g" * 1/2^2 = "100 g" * 1/4 = color(green)("25 g")$

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Thorium-234 has a half-life of 24 days. if you started with 100 gram sample of thorium-234, how much would remain after 48 days?

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