Pipes and cisterns problems are almost the same as those of Time and work problems. Thus, if a pipe fills a tank in 6 hrs, then the pipe fills 1/6th of the tank in 1 hr. the only difference with Pipes and Cisterns problems is that there are outlets as well as inlets. Thus, there are agents (the outlets) which perform negative work too. The rest of the process is almost similar.
INLET: An inlet pipe is connected with a tank and it fills tank.
OUTLET: A outlet pipe is connected with a tank and it empties tank.
Formulae
(i) If a pipe can fill a tank in m hrs, then the part filled in 1 hr =1/m.(ii) If a pipe can empty a tank in n hrs, then the part of the full tank emptied in 1 hr = 1/n .
(iii) If a pipe can fill a tank in m hrs and the another pipe can empty the full tank in n hrs, then the net part filled in 1 hr, when both the pipes are opened =[1/m- 1/n]
∴ Time taken to fill the tank, when both the pipes are opened = mn/( n-m)
(iv) If a pipe can fill a tank in m hrs and another can fill the same tank in n hrs, then the net part filled in 1 hr, when both the pipes are opened = [1/n- 1/m]
∴ Time taken to fill the tank = mn/(n-m)
(v) If a pipe fills a tank in m hrs and another fills the same tank in n hrs, but a third one empties the full tank in p hrs, and all of them are opened together,
the net part filled in 1 hr = [1/m+ 1/n-1/p]
the net part filled in 1 hr = [1/m+ 1/n-1/p]
∴ Time taken to fill the tank =mnp/(np+mp-mn) hrs.
(vi) A pipe can fill a tank in m hrs. Due to a leak in the bottom it is filled in n hrs. if the tank is full, the time taken by the leak to empty the tank = mn/(n-m) hrs.
Question 1.
Two pipes P and Q can fill a tank in 30 hours and 45 hours respectively. If both the pipes are opened together, how much time will be taken to fill the tank?
Question 2
A pipe can fill a tank in 25 hrs. Due to a leakage in the bottom, it is filled in 50 hrs. If the tank is full, how much time will the leak take to empty it?
Question 3.
Pipe P can fill a tank in 40 hours while Pipe Q alone can fill it in 50 hours and Pipe R can empty the full tank in 60 hours. If all the pipes are opened together, how much time will be needed to make the tank full?
Question 4.
Two pipes A and B can fill a cistern in 1.5 hour and 100 minutes respectively.There is also an outlet C. If all the three pipes are opened together, the tank is full in 60 minutes. How much time will be taken by C to empty the full tank?
Question 5.
Two pipes A and B can fill a tank in 16 minutes and 24 minutes respectively. If both the pipes are opened simultaneously, after how much time should B be closed so that that the tank is full in 12 minutes?
Question 6.
If two pipes function simultaneously, the reservoir is filled in 12 hrs. One pipe fills the reservoir 10 hrs faster than the other. How many hrs does the faster pipe take to fill the reservoir?
But x can’t be –ve, hence the faster pipe will fill the reservoir in 20 hrs.
Question 7.
A tank has a leak which would empty it in 12 hrs. A tap is turned on which admits 6 litres a minutes into the tank, and it is now emptied in 16 hrs. How many litres does the tank hold?
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