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Iodine-131 is used to destroy thyroid tissue in the treatment of an overactive thyroid. The half-life of iodine-131 is 8 days. If a hospital receives a shipment of 200 grams, how much would remain after 32 days? Round to the nearest tenth.

User Bharal
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1 Answer

15 votes
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Given:

a,) The half-life of iodine-131 is 8 days.

b.) A hospital receives a shipment of 200 grams.

c.) Determine how much would remain after 32 days.

We will be using the following formula:


\text{ N}_t\text{ = N}_0((1)/(2))^{\frac{t}{t_{(1)/(2)}}}

Where,


\begin{gathered} \text{ N}_t\text{ = Quantity of the substance remaining} \\ \text{ N}_0\text{ = Initial quality of the substance = 200 grams} \\ \text{ t = Time elapsed = 32 days} \\ \text{ t}_{(1)/(2)}\text{ = Half life of the substance = 8 days} \end{gathered}

We get,


\text{N}_t\text{ = N}_0((1)/(2))^{\frac{t}{t_{(1)/(2)}}}
\text{ N}_t\text{ = \lparen200\rparen\lparen}(1)/(2))^{(32)/(8)}
\text{ N}_t\text{ = 200\lparen}(1)/(2))^4
\text{ N}_t\text{ = 200\lparen}(1)/(16))\text{ = }(200)/(16)
\text{ N}_t\text{ = 12.5 grams}

Therefore, in 32 days, only 12.5 grams of Iodine-131 will remain.

User Rednoah
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