1. Machine P can produce 2000 units in 3 hours and 20 minutes, and Machine Q can produce 2000 units in 8 hours. In how many hours can Machines P and Q, working together at these constant rates, produce 8500 units? Easy
A. 12 hours
B. 10 hours
C. 8 hours
D. None of these

View Answer

Answer: Option B

Explanation:

In 1 hour, Machine P produces (2000/(10/3)) = 600 units
In 1 hour, Machine Q produces (2000/8) = 250 units
In an hour, Machines P and Q together produce (600+250 = 850) units
Thus 8500 units are produced by them in (8500/850 =10) hours.

2. If Peter and Robert can do a job in 3 days when working together at their respective constant rates, and Peter alone can do the job in 9 days, in how many days can Robert alone do it? Easy
A. 6 days
B. 4 days
C. 4.5 days
D. None of these

View Answer

Answer: Option C

Explanation:

1/9+1/R=1/3
(R+9)/9R=1/3

-> R = 4.5 days
Working alone, Robert can do the job in 4.5 days.

3. Alex does a job in 4 days, Brad does it in 6 days, and Charles does the job in 8 days. They all work together for a day, and then Charles leaves. In how many days can the remaining work be completed by Alex and Brad? Medium
A. 11/10 days
B. 12/11 days
C. 11/9 days
D. None of these

View Answer

Answer: Option A

Explanation:

Alex does 1/4 of the job in 1 day.
Brad does 1/6 of the job in a day.
Charles does 1/8 of the job in 1 day.
∴ If they work together, in one day they would do (1/4) + (1/6) + (1/8) = 13/24 of the total job.
Work left after the first day = 1 –(13/24) = 11/24
Now, in 1 day Alex and Brad do (1/4)+(1/6) = 5/12 of the job.
They will do 11/24 of the job in (12/5) * (11/24) = 11/10 days

 

4. A job can be completed in 20 days by 6 men and 4 women. The men work 8 hours and the women 5.5 hours per day, and 2 women do as much work in an hour as 1 man. How many hours would it take for one man, working alone, to complete the job? Medium
A. 1770 hours
B. 590 hours
C. 1180 hours
D. None of these

View Answer

Answer: Option C

Explanation:

Given, 6 men + 4 women take 20 days to complete the work.
Now, each man works 8 hours per day
-> 6 men will put in 48 hours per day
-> 6 men will put in 48*20 = 960 man hours in 20 days.
Further, 2 women ≅ 1 man (in terms of work efficiency)
-> 4 women ≅ 2 men
-> 4 women or 2 men working 5.5 hours per day will put in 11 man hours per day.
-> 4 women or 2 men will put in 11*20 =220 man hours in 20 days.
Therefore, total man hours required for completing the work = 960+220 = 1180
-> 1 man, working alone, will take 1180 hours to complete the work.

5. 4 men and 14 women complete a certain job in 8 days, while 6 men and 16 women complete the same job in 6 days. In how many days will 28 men and 8 women complete a job thrice as big? Medium
A. 3 days
B. 8 days
C. 6 days
D. None of these

View Answer

Answer: Option C

Explanation:

Given, 4M + 14W take 8 days & 6M + 16W take 6 days to complete the work.
Let 1M ≅ nW
-> (4n+14)*8 = (6n+16)*6
-> n = 4
-> 1M ≅ 4W

In terms of work efficiency, 4M + 14W ≅ 30W (from above)
-> 30W take 8 days or 1W takes 30*8 = 240 days
Further, 28M + 8W = 120W
-> 120W will take 240/120 = 2 days to complete the work.
Thus, 120W will take 3*2 = 6 days to complete a piece of work thrice as big.

6. 20 oxen or 30 sheep can graze a field in 20 days. In how many days will 60 oxen and 60 sheep graze it? Easy
A. 6 days
B. 4 days
C. 8 days
D. None of these

View Answer

Answer: Option B

Explanation:

Given, 20 oxen ≅ 30 sheep, and 20 oxen (or 30 sheep) take 20 days.
Now, 60 oxen + 60 sheep ≅ 150 sheep
30 sheep take 20 days to graze.
-> 1 sheep will take 30*20 days.
-> 150 sheep will take (30*20)/150 = 4 days

7. Eight cats kill eight rats in eight days. In how many days will 32 cats kill 32 rats? Easy
A. 8 days
B. 32 days
C. 24 days
D. None of these

View Answer

Answer: Option A

Explanation:

Given, 8C kill 8R in 8 days.
-> 8C kill 1R in (8/8) days.
-> 1C kills 1R in (8/8)*8 = 8 days
-> 1C kills 32R in (8*32) days
-> 32C kill 32R in (8*32)/32 = 8 days

8. Alex and Brad can do a piece of work in 8/7 days; Brad and Charles can do it in 4/3 days; Alex and Charles can do it in 3/2 days. In how many days will Alex, Brad and Charles finish a piece of work which is 55 times as big if they work together? Easy
A. 48
B. 36
C. 24
D. None of these

View Answer

Answer: Option A

Explanation:

Let a, b, c be the number of days Alex, Brad and Charles take to do the job if working alone. Thus,
1/a + 1/b = 1/(8/7) = 7/8 —– ❶
1/b + 1/c = 1/(4/3) = 3/4 —– ❷
1/a + 1/c = 1/(3/2) = 2/3 —– ❸
Adding all 3 equations
2[1/a + 1/b + 1/c] = [7/8 + 3/4 + 2/3]
-> 1/a + 1/b + 1/c = 110/96 = 55/48
-> Alex, Brad, Charles together would take 48/55 days to complete the work.
-> They will take 48 days to complete a piece of work 55 times as big.

9. A pipe X can drain a tank in 8 hours and another pipe Y can fill the empty tank in 4 hours. If N1 pipes of type X, and N2 pipes of type Y are opened simultaneously, the tank gets filled in 2 hours. Which of the following is NOT a possible value of N1 and (N1 + N2) respectively? Difficult
A. 6, 11
B. 8, 14
C. 10, 18
D. 14, 23

View Answer

Answer: Option C

Explanation:

Pipe X drains the tank in 8 hours.

-> In 1 hour, it drains 1/8th of the tank.

-> In 1 hour, N1 such pipes, drain N1/8 of the tank.

Pipe Y fills the tank in 4 hours.

-> In 1 hour, it fills 1/4th of the tank.

-> In I hour, N2 such pipes fill N2/4 of the tank.

If N1 & N2 pipes are opened simultaneously, then in 1 hour the portion which gets filled = (N2/4)-(N1/8) =1/2

-> 2N2 = N1 +4

-> N2 = (N1/2) +2 —– ❶

N1 and N2 have to be positive integers -> N1 has to be a multiple of 2; let it be 2k (where k is a positive integer).

-> N2 = k+2 —– ❷

-> N1 + N2 = 2k+k+2 = 3k+2 —– ❸

Thus, N1 has to be an even number, and N1+N2 has to be of the form 3k+2, such that N2 = (N1/2) +2

From the given options, only option C does not satisfy the conditions ❶, ❷ and ❸.

10. Two pipes X and Y fill a vessel completely in 4 min and 5 min respectively. There is a leak at the vessel’s side at a height of p cm from the top. The total height of the vessel is q cm [p/q = ½]. The leak empties the contents of the vessel above it in 8 minutes. The vessel gets full in k minutes. Which of the following is true for k? Difficult
A. 2.25 < k < 2.5
B. 2.5 < k < 2.75
C. 2 < k < 2.25
D. None of these

View Answer

Answer: Option A

Explanation:

Assume there is no leak, and that the complete vessel gets filled in t mins.
-> 1/4+ 1/5 = 1/t
-> t = 20/9 min
Therefore, the portion below the leak would get filled in 1/2(20/9) = 10/9 mins (because the portion below the leak is half the vessel)….❶
Pipes X and Y would take 2 min and 2.5 min respectively to fill half the vessel. Let the time taken to fill the vessel above the leak be m minutes.
-> 1/2 + 1/2.5 – 1/8 = 1/m
-> m = 200/155 = 40/31 mins ……..❷
From ❶ and ❷, total time, k = 10/9 + 40/31 = 2.4 minutes