Short Cuts: Pipes and
Cisterns
Short Cut: 1
If a pipe
fills the tank in x hours, and another fills the same tank in y hours and the
third fills the tank in z hour. Then the time required, if all the three pipes
are open together to fill the tank is:
Example:
Three
pipes can fill the tank in 20, 30 and 40 hours respectively. Find the time
required to fill the tank if all the pipes are filled simultaneously.
Solution
Here; x=
20, y= 30 and z= 40 hours
Putting
the values in
We get
answer= 17.14 hours
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Short Cut: 2
If pipe A
can fill a tank in x minutes, pipe B can fill the same in y minutes, there is
also an outlet C in the Tank. All these are opened simultaneously and the tank
takes “T” minutes to get filled. The time in which C can empty the tank in
minutes is given by:
Example:
Two pipes
can fill a cistern in 60 minutes and 75 minutes respectively. There is also an
outlet C, if all the three pipes are opened together, the tanks get filled in
50 minutes. Find the time taken by C to empty the full tank?
Answer:
Here, x=
60, y= 75 and T= 50 minutes, putting the values in equation:
Answer=
100 minutes
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Short Cut 3
A tap M
can empty a tank in x minutes, while another tap N can empty it in y minutes.
If both the emptying taps are opened together, then the time taken to empty the
full tank is:
Example
A tap can
empty the tank in 10 minutes; another tap can do the same in 5 minutes. Find
the time required by both the taps to empty the tank simultaneously?
Solution
Here x=
10 and y= 5, putting the values we get:
Answer=
3.33 minutes
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Pipes
and Cisterns important facts and formulae
1. Inlet:
A pipe
connected with a tank or a cistern or a reservoir, that fills it, is known as
an inlet.
2.
Outlet:
A pipe
connected with a tank or cistern or reservoir, emptying it, is known as an outlet.
3. If a pipe can fill a tank in x hours, then:
3. If a pipe can fill a tank in x hours, then:
part
filled in 1 hour =1/x
4. If a
pipe can empty a tank in y hours, then:
part
emptied in 1 hour =1/y
5. If a pipe can fill a tank in x
hours and another pipe can empty the full tank in y hours (where y > x),
then on opening both the pipes, then the net part filled in 1 hour = 1/x−1/y
6. If a pipe can fill a tank in x hours and another pipe can empty the full tank in y hours (where y > x), then on opening both the pipes, then the net part emptied in 1 hour = 1/y−1/x
6. If a pipe can fill a tank in x hours and another pipe can empty the full tank in y hours (where y > x), then on opening both the pipes, then the net part emptied in 1 hour = 1/y−1/x
