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Questions
It takes 12 hours to fill a swimming pool using two pipes. If the pipe of larger diameter is used for 4 hours and the pipe of smaller diameter is used for 9 hours, only half of the pool is filled. How long would each pipe take to fill the swimming pool?
It takes 12 hours to fill a swimming pool using two pipes. If the pipe of larger diameter is used for 4 hours and the pipe of smaller diameter for 9 hours only, half of the pool can be filled. How long would it take for each pipe to fill the pool separately?
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Solution
Let the pipe with larger diameter and smaller diameter be pipes A and B respectively.
Also, let pipe A work at a rate of x hours/unit and pipe B work at a rate of y hours/unit.
According to the question,
`x + y = 1/12`
⇒ 12x + 12y = 1 ...(1)
And
`4x + 9y = 1/2`
⇒ 8x + 18y = 1 ...(2)
Multiply (1) by 2 and (2) by 3, we get
24x + 24y = 2 ...(3)
24x + 54y = 3 ...(4)
Subtracting equation (4) from (3),
24x + 24y = 2
– 24x + 54y = 3
– – –
– 30y = – 1
`y = 1/30`
Putting `y = 1/30` in equation (1)
12x + 12y = 1
∴ `12x + 12 xx 1/30 = 1`
∴ `12x + 2/5 = 1`
∴ `12x = 1 - 2/5`
∴ `x = 3/5 xx 1/12`
∴ `x = 1/20`
Hence, the pipe with larger diameter will take 20 hours to fill the swimming pool and the pipe with smaller diameter will take 30 hours to fill the swimming pool.
