Aptitude - Pipes and Cistern - Discussion

Assume total work = 6.
So, efficiency of a + b + c = 1.
we know w = e * t.
w = 1 * 2 {given}
= 2.

Balnce = 4 work.
a + b = 4 work.
w = e * t.
4 = e * 7.
e = 4/7.

Then c = 1 - 4/7 = 3/7.
c alone = 6/3/7 = 14 hrs.

A takes 9 mins to fill. B takes 11.24 mins to fill. C is draining pipe, three pipes are opened after sometime C alone closed, A and B takes 3.75 mins to fill the tank. How much C alone take to empty the filled tank? Can you please solve this.

A pipe takes 9 mins to fill the tank. B takes 11.24 mins to fill the tank. C is a draining pipe. Three pipes are opened simultaneously after some time C is closed, A and B fills the remaining tank in 3.75 mins. How much Time C takes to empty the tank? Anyone please solve this.

Hi, I am not getting this, please give me a proper explanation.

Why we need to calculate the final step for that one hour for A & B & C and A & B?

As we know x/a + x/b + x/c = x/6.
Write equation as;

(X/6) * 2 + (x/6 - x/c) * 7 = x.

After solving this equation you will get answer as 14.

LCM of 1/6 . 1/2 . 1/7 = 84.
So, 6/84 = 14.

A+B+C worked together for 2 hrs.

In 1hr they filled up to 1/6 parts thus for 2hrs they fill up to (1/6)*2 i.e.,2/6 parts. Which is 1/3.

Then we need to calculate remaining parts so total-filled parts give remaining part.

i.e., 1-1/3 = 2/3 part are yet remaining.

According to the question now A and B alone opened thus it works for 7 hrs to fill the remaining 2/3 part.

So (A+B)together fill (2/3)*(1/7)parts in 1hr i.e it together fill 2/21 parts in 1hr.

Now we need to calculate the time of C ;

So (A+B+C)'s 1hr work-(A+B)'s 1hr work will give C's 1hr work.

Therefore C's work in 1 HOUR = 1/6 - 2/21 = 1/14 parts.

So time taken by C to fill the tank is 14 hours.

1/6-2/21 = 1/14 explain me in detail.

Explain clearly again.