Radioactive iodine-131 has a half-life of eight days. The amount of a 200.0 gram sample left after 32 days would be?

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Radioactive iodine-131 has a half-life of eight days. The amount of a 200.0 gram sample left after 32 days would be?

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Answer 1 · 2014-07-03T07:01:21

$"12.5 g"$

Explanation:

Nuclear half-life, $t_"1/2"$ , is the amount of time required for a quantity of a radioactive material to fall to half its value as measured at the beginning of the time period.

![http://slideplayer.com/slide/6278114/#]( useruploads.socratic.org )

In this question, the half-life of iodine-131 is $8$ days, which means that after $8$ days, half of the sample would have decayed and half would be left undecayed.

after $8$ days (the first half-life):

$"200 g" /2 = "100 g"$ decays and $"100 g"$ are left.

after another days (two half-lives or #16# years):

$"100 g" /2 = "50 g"$ decays and $"50 g"$ are left.

after another $8$ days (three half-lives or $24$ years):

$"50 g" /2 = "25 g"$ decays and $"25 g"$ are left.

after another $8$ days (four half-lives or $32$ years):

$"25 g"/2 = "12.5 g"$ decays and $"12.5 g"$ are left.

So after four half-lives or $32$ years, $"12.5 g"$ of iodine-131 will be left.

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Radioactive iodine-131 has a half-life of eight days. The amount of a 200.0 gram sample left after 32 days would be?

1 Answer

Explanation:

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