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Aptitude - Time and Work - Discussion

Discussion Forum : Time and Work - General Questions (Q.No. 8)
Time and Work
8.
A can do a certain work in the same time in which B and C together can do it. If A and B together could do it in 10 days and C alone in 50 days, then B alone could do it in:
15 days
20 days
25 days
30 days
Answer: Option
Explanation:

(A + B)'s 1 day's work = 1
10

C's 1 day's work = 1
50

(A + B + C)'s 1 day's work = 1 + 1 = 6 = 3 . .... (i)
10 50 50 25

A's 1 day's work = (B + C)'s 1 day's work .... (ii)

From (i) and (ii), we get: 2 x (A's 1 day's work) = 3
25

A's 1 day's work = 3 .
50

B's 1 day's work 1 - 3 = 2 = 1 .
10 50 50 25

So, B alone could do the work in 25 days.

Discussion:
146 comments Page 5 of 15.
Seema duhan said:   1 decade ago
Given, A = B+C.
A+B = 1/10.
C = 1/50.

So, A+B+C = 1/10 + 1/50 = 6/50 = 3/25.

A = B+C = 1/2 of A+B+C.

= 1/2(3/25) = 3/50.

B+C = 3/50.

Where C=1/50.

So, B+1/50 = 3/50.

B = 2/50 = 1/25.

So B alone can do the work in 25 days.
Naani said:   1 decade ago
Given that A = B+C.....(1).

A&B completes the work in 10 days so A&B one day work is 1/10.

A+B = 1/10

A = (1/10)-B.

(1/10)-B = B+C..........from(1).

Given that C alone complete the work in 50 days so C's one day's work is = 1/50.

Therefore.

(1/10)-B = B+(1/50).

2B = 4/50.

B = (1/25) works.

So B alone can complete work in 25 days.
Rajni Bala said:   1 decade ago
A=B+C (Given).

Adding A both sides.

2 A = A+B+C.

Now A+B+C 's one day work = 3/25.

On putting these values we get,

A= 3/50 One day's work.

Use the value of A and get the value of B.

So the Answer is 25.
Sandhya said:   1 decade ago
Given A = B+C ------ Eq.1.

& A+B = 1/10.

& C = 1/50.

NOW, A+B+C = (1/10+1/50).

= 3/25.

But in the question he is asking only 'B',

To get B we have to know the individual of A.

So,

SINCE B+C = A (given).

A+B+C = 3/25;.

A+A = 3/25;.

2A = 3/25.

A = 3/50.

HERE WE KNOW A = 3/50; C = 1/10 then.

A = B+C; 3/50 = B+1/50;.

B = 3/50 - 1/50;.

B = 2/50;.

B = 1/50;.

Therefore B can only do in 25 days.
Pavan R B said:   1 decade ago
Given 1/A = (1/B)+(1/C)...EQN1.

AND (1/A)+(1/B) = 1/10...EQN2.

ALSO 1/C = 1/50.
.
. . 1/A = (1/B)+(1/50).

SUBSTITUTE ABOVE EQN IN EQN2.

(1/B)+(1/50)+(1/B)=1/10.

THEREFORE 1/B=1/25, B ALONE CAN DO IN 25 DAYS.
GAURAV said:   1 decade ago
A = B+C => A-B = C.

A+B = 1/10.

C = 1/50.

=> A-B = 1/50.

Solving eqns we get B = 25.
Priyanka said:   1 decade ago
A+B = 1/10.
C = 1/50.

A's time is equal to (B+C)'s time,
1/10-B = B+1/50.

2B = 1/10-1/50.
2B = 4/50.
B = 1/25.

B alone can do the work in 25 days.
Zeeshan said:   1 decade ago
From the question,
A = B+C.
(A+B)'s 1 day work = 1/10...........(1).
C's 1 day work = 1/50...............(2).

In eqn.(1) put A=B+C.
Then,

B+C+B = 1/10.
2B+C = 1/10.
2B = 1/10-C.
2B = 1/10-1/50 (since C's 1 day work = 1/50).

2B = (5-1)/50.
2B = 4/50.
B = 4/50*2.
B = 4/100.
B = 1/25 ( ie B's 1 day work).

B's complete work in 25 days.

I HOPE NOW YOU GOT THE SOLUTION.
Vikram sihag said:   1 decade ago
Efficency of a+b = 10%.
Efficency of c = 2%.
Efficency of a+b+c = 12%.

Put up a = b+c.

2(b+c) = 12%.

b = 4%

Days = 100/4 = 25.
Kankana ghosh said:   1 decade ago
Let A's 1 day of work be x.
Let B's ,, ,, ,, ,, ,, y.
Let C's ,, ,, ,, ,, ,, z.

Then A.T.P: x = y+z.......................(1).
Given, z = 1/50.............................(2).

And x+y = 1/10.

Which means (y+z)+y =1/10 (using eq.(1)).

2y+z = 1/10.
2y+1/50 = 1/10 (using eq.(2)).
2y = (1/10-1/50).
y = 1/25.

Ans) So, B can alone do the work in 25 days.
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