BREAKING: Target Test Prep releases Brand New 2026 On Demand GMAT prep course

Redeem

Man Question

This topic has expert replies
Post new topic Post Reply
Previous Topic Next Topic
Master | Next Rank: 500 Posts
Posts: 184
Joined: Thu Nov 25, 2010 9:57 pm
Thanked: 1 times
Followed by:5 members
GMAT Score:700

Man Question

by chaitanya.mehrotra » Mon Aug 08, 2011 7:04 am
Victor's job requires him to complete a series of identical jobs. If Victor is supervised at
work, he finishes each job three days faster than if he is unsupervised. If Victor works for
144 days and is supervised for half the time, he will finish a total of 36 jobs. How long
would it take Victor to complete 10 jobs without any supervision?
Top
Source: — Problem Solving |
Legendary Member
Posts: 1448
Joined: Tue May 17, 2011 9:55 am
Location: India
Thanked: 375 times
Followed by:53 members

by Frankenstein » Mon Aug 08, 2011 7:14 am
Hi,
Let 'n' be the number of days Victor takes to finish a job when supervised.
So, he will finish a job when unsupervised in (n+3) days.
He is supervised for 72 days and unsupervised for 72 days.
Number of jobs finished when supervised is 72/n
Similarly, Number of jobs finished when supervised is 72/(n+3)
Given that he finished 36 jobs in total.
So, 72/n + 72/(n+3) = 36.
Solving this, we get n=3.
He will finish a job in 3 days when supervised and 6 days when unsupervised.
So, he will take 6*10 = 60 days to finish 10 jobs without any supervision.
Cheers!

Things are not what they appear to be... nor are they otherwise
Top
User avatar
Master | Next Rank: 500 Posts
Posts: 312
Joined: Tue Aug 02, 2011 3:16 pm
Location: New York City
Thanked: 130 times
Followed by:33 members
GMAT Score:780

by gmatboost » Mon Aug 08, 2011 7:54 am
It is worth understanding this step:
So, 72/n + 72/(n+3) = 36.
Solving this, we get n=3.
72/n + 72/(n+3) = 36

Divide by 36 to work with smaller numbers
2/n + 2/(n+3) = 1

Multiply everything by n*(n+3) to eliminate denominators
2(n)(n+3)/n + 2(n)(n+3)/(n+3) = 1(n)(n+3)

Cancel on the left
2(n+3) + 2(n) = 1(n)(n+3)

Simplify
2n + 6 + 2n = n^2 + 3n

Bring terms to the left
0 = n^2 - n - 6

Factor:
0 = (n - 3)(n + 2)

n = 3 or n = -2

Only the positive answer makes sense since this about jobs completed.
Greg Michnikov, Founder of GMAT Boost

GMAT Boost offers 250+ challenging GMAT Math practice questions, each with a thorough video explanation, and 100+ GMAT Math video tips, each 90 seconds or less.
It's a total of 20+ hours of expert instruction for an introductory price of just $10.
View sample questions and tips without signing up, or sign up now for full access.

Also, check out the most useful GMAT Math blog on the internet here.
Top
User avatar
GMAT Instructor
Posts: 15539
Joined: Tue May 25, 2010 12:04 pm
Location: New York, NY
Thanked: 13060 times
Followed by:1906 members
GMAT Score:790

by GMATGuruNY » Mon Aug 08, 2011 10:58 am
chaitanya.mehrotra wrote:Victor's job requires him to complete a series of identical jobs. If Victor is supervised at
work, he finishes each job three days faster than if he is unsupervised. If Victor works for
144 days and is supervised for half the time, he will finish a total of 36 jobs. How long
would it take Victor to complete 10 jobs without any supervision?
We can reason our way to the correct answer.
The times in this problem are almost certainly restricted to positive integers.

36 jobs in 144 days is an average of = 144/36 = 4 days for each job.

Victor works at two different rates (supervised and unsupervised) for equal amounts of time (72 days each).
To yield an average of 4 days per job, at the unsupervised rate it must take Victor MORE than 4 days to complete a job, at the supervised rate it must take Victor LESS than 4 days to complete a job.
Since the number of days when unsupervised is 3 more than when supervised, the two times must be factors of 72 that are 3 apart.

Thus, only two times are possible: 6 days per job when unsupervised, 3 days per job when supervised.

To confirm:
Let unsupervised = 6 days per job, supervised = 3 days per a job.
In 72 unsupervised days, number of jobs completed = 72/6 = 12.
In 72 supervised days, number of jobs completed = 72/3 = 24.
Total number of jobs completed in 144 days = 12+24 = 36.
Success!

Time to complete 10 jobs at a rate of 6 days per job = 10*6 = 60.
Private tutor exclusively for the GMAT and GRE, with over 20 years of experience.
Followed here and elsewhere by over 1900 test-takers.
I have worked with students based in the US, Australia, Taiwan, China, Tajikistan, Kuwait, Saudi Arabia -- a long list of countries.
My students have been admitted to HBS, CBS, Tuck, Yale, Stern, Fuqua -- a long list of top programs.

As a tutor, I don't simply teach you how I would approach problems.
I unlock the best way for YOU to solve problems.

For more information, please email me (Mitch Hunt) at [email protected].
Student Review #1
Student Review #2
Student Review #3
Top
Legendary Member
Posts: 608
Joined: Sun Jun 19, 2011 11:16 am
Thanked: 37 times
Followed by:8 members

by saketk » Tue Aug 09, 2011 10:30 am
chaitanya.mehrotra wrote:Victor's job requires him to complete a series of identical jobs. If Victor is supervised at
work, he finishes each job three days faster than if he is unsupervised. If Victor works for
144 days and is supervised for half the time, he will finish a total of 36 jobs. How long
would it take Victor to complete 10 jobs without any supervision?

Although this question can be solved by using - 72/n + 72/(n+3) = 36, it can also easily be solved by using answer options. Since the question asks for 10 jobs, it makes our job easier as calculation will be quick.
Top
Post new topic Post Reply
• Page 1 of 1