The half-life of cobalt—60 is 5.27 years. How many milligrams of cobalt-60 remain after 52.7 years if you start with 10.0 mg?

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The half-life of cobalt—60 is 5.27 years. How many milligrams of cobalt-60 remain after 52.7 years if you start with 10.0 mg?

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Answer 1 · 2015-11-28T17:00:38

$0.00977 mg$ $"0.00977 mg"$

Explanation:

The important thing to recognize here is that the amount of time that passes is a whole number multiple of the isotope's nuclear half-life.

As you know, the equation for nuclear half-life calculations looks like this

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

$A$ $A$ - the mass of the substance that remains undecayed
$A_{0}$ $A_0$ - the initial mass of the substance
$n$ $n$ - the ratio between the amount of time that passes and the half-life of the isotope.

In your case, you know that you're interested in finding out how much cobalt-60 would be left undecayed after $52.7$ $52.7$ years. This means that $n$ $n$ would be

$n = (52.7 color(red)(cancel(color(black)("years"))))/(5.27 color(red)(cancel(color(black)("years")))) = 10$

This means that you have

$A = A_0 * 1/2^(10) = A_0/1024$

Plug in the value you have for the initial mass of the sample to get

$A = "10.0 mg"/1024 = color(green)("0.00977 mg") ->$ rounded to three sig figs

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The half-life of cobalt—60 is 5.27 years. How many milligrams of cobalt-60 remain after 52.7 years if you start with 10.0 mg?

1 Answer

Explanation:

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