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15 taps are fitted in a tank in which some are inlet taps and some are outlet taps. Each inlet tap can fill the tank in 30 hours and each outlet tap can empty the tank in 60 hours. Find the number of inlet taps if the whole tank is filled in 4 hours when all the 15 taps are open.
12
13
10
11
9
- We have 15 taps in total, some are inlets, and some are outlets.
- Each inlet tap fills the tank in 30 hours. So, the rate of one inlet tap is 1/30 of the tank per hour.
- Each outlet tap empties the tank in 60 hours. So, the rate of one outlet tap is 1/60 of the tank per hour.
- We open all 15 taps, and it takes 4 hours to fill the tank completely.
- Let x be the number of inlet taps, then the number of outlet taps is 15 - x.
Use the equation based on their rates:
- x/30 - (15 - x)/60 = 1/4
Solve for x:
- Multiply through by 60: 2x - (15 - x) = 15
- Simplify: 3x - 15 = 15
- 3x = 30
- x = 10
- Answer: Option 3: 10
By: Parvesh Mehta ProfileResourcesReport error
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