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25 votes
A bottle contains 10 mL of a 40 mg/2.5 mL medicine solution. How many mL of thesolution should be poured out and replaced with pure water to have 10 mL of 30mg/2.5 mL solution?

User Alpar
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1 Answer

17 votes
17 votes

Suppose the bottle contains x units of medicine and y units is taken out and replaced with water. The expression to find the the amount of pure medicine solution after replacement by n times is given by


\begin{gathered} \text{The amount of pure medicine remaining, v=} \\ x(1-(y)/(x))^n \\ \end{gathered}

In the given question, v =30mg, x=40 mg.

n=1, since replacement is done only one time. We have to find y.

Substitute values in equation.


\begin{gathered} 30=40(1-(y)/(40))^1 \\ (30)/(40)=(40-y)/(40) \\ 30=40-y \\ y=40-30 \\ =10mg \\ \end{gathered}

So, 10 mg/2.5 ml solution is poured out and replaced with water

User Sherif Salah
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