A contractor undertakes to do a job within 20 days and hires 60 people to do it. After 5 days, he realizes that one fifth of the work is done so he hires more people. How many more man he has to hire to complete the job in time?
1. 10
2. 12
3. 15
4. 20
5. 25
A contractor undertakes to do a job within 20 days and hires
This topic has expert replies
-
- Moderator
- Posts: 7187
- Joined: Thu Sep 07, 2017 4:43 pm
- Followed by:23 members
Timer
00:00
Your Answer
A
B
C
D
E
Global Stats
GMAT/MBA Expert
- Jeff@TargetTestPrep
- GMAT Instructor
- Posts: 1462
- Joined: Thu Apr 09, 2015 9:34 am
- Location: New York, NY
- Thanked: 39 times
- Followed by:22 members
With the original crew of 60 people, 1/5 of the job was completed in 5 days. Thus, the rate of the 60 people is (1/5)/5 = 1/25.BTGmoderatorDC wrote:A contractor undertakes to do a job within 20 days and hires 60 people to do it. After 5 days, he realizes that one fifth of the work is done so he hires more people. How many more man he has to hire to complete the job in time?
1. 10
2. 12
3. 15
4. 20
5. 25
We see that after 5 days, 4/5 of the job still needs to be completed in 15 days. Thus, the rate must be:
(4/5)/15 = 4/75
We can use the following proportion to determine how many people must be working together for a rate of 4/75:
60/(1/25) = x/(4/75)
1500 = 75x/4
6000 = 75x
80 = x
Thus, 20 more people must be hired.
Alternate Solution:
Since 60 workers did 1/5 of the job in 5 days, they would do the remaining 4/5 of the job in 4 x 5 = 20 days. We need the remaining job to be done in 15 days instead of 20, so let's find the number of workers necessary to finish 4/5 of the job in 15 days using an inverse proportion: Let x denote the number of workers that would finish the remaining job in 15 days. Then,
60 * 20 = 15 * x
x = 4 * 20 = 80
Since 80 workers are needed to finish the remaining job in 15 days, 80 - 60 = 20 more workers must be hired.
Answer: D
Jeffrey Miller
Head of GMAT Instruction
[email protected]
See why Target Test Prep is rated 5 out of 5 stars on BEAT the GMAT. Read our reviews
-
- Newbie | Next Rank: 10 Posts
- Posts: 1
- Joined: Tue Nov 01, 2022 9:14 am
A contractor undertakes to do a job within 20 days and hires 60 people to do it. After 5 days, he realizes that one fifth of the work is done so he hires more people. How many more man he has to hire to complete the job in time?
By using Unitary method
60 people, in 5 days can complete 1/5 part of the work
60 people, in 1 day can complete (1/5) /5 part of the work
=1/25 part of the work
Work left = 1 - 1/5
= 4/5 part
Again,
1/25 part of work is completed in 1 day by 60 people
1 part of work is completed in 1 day by 60 / (1/25) people
4/5 part of work is completed in 15 days by (60 * 25 * 4)/(15*5)
= 80 people
People required = 80 – 60
= 20 people
By using Unitary method
60 people, in 5 days can complete 1/5 part of the work
60 people, in 1 day can complete (1/5) /5 part of the work
=1/25 part of the work
Work left = 1 - 1/5
= 4/5 part
Again,
1/25 part of work is completed in 1 day by 60 people
1 part of work is completed in 1 day by 60 / (1/25) people
4/5 part of work is completed in 15 days by (60 * 25 * 4)/(15*5)
= 80 people
People required = 80 – 60
= 20 people