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Pumps A, B, and C operate at their respective constant rates. Pumps A and B, operating simultaneously, can fill a certain tank in 6/5 hours; pumps A and C, operating simultaneously, can fill the tank in
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Pumps A, B, and C operate at their respective constant rates. Pumps A and B, operating simultaneously, can fill a certain tank in 6/5 hours; pumps A and C, operating simultaneously, can fill the tank in 3/2 hours; and pumps B and C, operating simultaneously, can fill the tank in 2 hours. How many hours does it take pumps A, B, and C, operating simultaneously, to fill the tank.A. 1/3B. 1/2C. 1/4 D. 1E. 5/6

User Matiiss
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3 votes

Let
a,b,c be the time it takes for pumps A, B, and C (respectively) to fill 1 tank. Then


\begin{cases}\frac1a+\frac1b=\frac1{\frac65}=\frac56\\\\\frac1a+\frac1c=\frac1{\frac32}=\frac23\\\\\frac1b+\frac1c=\frac12\end{cases}

Now,


\left(\frac1a+\frac1b\right)-\left(\frac1a+\frac1c\right)=\frac56-\frac23\implies\frac1b-\frac1c=\frac16

Then


\left(\frac1b+\frac1c\right)+\left(\frac1b-\frac1c\right)=\frac12+\frac16\implies\frac2b=\frac23\implies b=3

This means


\frac1a+\frac13=\frac56\implies\frac1a=\frac12\implies a=2

and


\frac13+\frac1c=\frac12\implies\frac1c=\frac16\implies c=6

Working together, all 3 pumps would operate at a rate of


\frac1a+\frac1b+\frac1c=1

or 1 tank in 1 hour, so the answer is D.

User Elton
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