A research assistant made 160 mg of radioactive sodium (Na^24) and found that there was only 20 mg left 45 h later, how much of the original 20 mg would be left in 12 h?

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A research assistant made 160 mg of radioactive sodium (Na^24) and found that there was only 20 mg left 45 h later, how much of the original 20 mg would be left in 12 h?

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Answer 1 · 2016-08-06T19:33:34

$=11.49$ mg will be left

Explanation:

Let rate of decay be $x$ per hour
So we can write
$160(x)^45=20$
or
$x^45=20/160$
or
$x^45=1/8$
or
$x=root45(1/8)$
or
$x=0.955$
Similarly after $12$ hours
$20(0.955)^12$
$=20(0.57)$
$=11.49$ mg will be left

Answer 2 · 2016-08-06T20:09:28

Just to use the conventional radioactive decay model as a slight alternative method.

After 12hr we have 11.49mg

Explanation:

Let $Q(t)$ denote the amount of sodium present at time $t$ . At $t=0, Q = Q_0$

It's a fairly simple model to solve with ODEs but as it's not really related to the question, we end up with

$Q(t) = Q_0e^(-kt)$ where $k$ is a rate constant.

First we find the value of $k$

$Q_0 = 160mg, Q(45) = 20mg$

$Q(45) = 20 = 160e^(-45k)$

$therefore 1/8 = e^(-45k)$

Take natural logs of both sides:

$ln(1/8) = -ln(8) = -45k$

$k=(ln(8))/45 hr^(-1)$

$therefore Q(t) = Q_0e^(-(ln(8))/45t)$

So starting with $Q_0 = 20mg$

$Q(12) = 20e^(-(ln(8))/45*12) = 11.49mg$

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A research assistant made 160 mg of radioactive sodium (Na^24) and found that there was only 20 mg left 45 h later, how much of the original 20 mg would be left in 12 h?

2 Answers

Explanation:

Explanation:

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