Club Problem

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

Redeem

This topic has expert replies

Post new topic Post Reply

Previous Topic Next Topic

vamsigmat2012: Newbie | Next Rank: 10 Posts; Posts: 7; Joined: Sun Mar 06, 2011 4:31 am

Club Problem

by vamsigmat2012 » Mon Jul 18, 2011 8:20 am

Each of the 59 members in a high school class is required to sign up for a minimum of one and a maximum of three academic clubs. The three clubs to choose from are the poetry club, the history club, and the writing club. A total of 22 students sign up for the poetry club, 27 students for the history club, and 28 students for the writing club. If 6 students sign up for exactly two clubs, how many students sign up for all three clubs?

(a)2
(b)5
(c)6
(d)8
(e)9

How to solve this ? I couldn't get the answer.

Quote

Source: Beat The GMAT — Problem Solving | Mon Jul 18, 2011 8:20 am

winniethepooh: Master | Next Rank: 500 Posts; Posts: 370; Joined: Sat Jun 11, 2011 8:50 pm; Location: Arlington, MA.; Thanked: 27 times; Followed by:2 members

by winniethepooh » Mon Jul 18, 2011 8:33 am

The answer is 6.

The total number of members = 59 distributed into --- 22(poetry), 27(history), and 28 (writing).
Now total the number of distributed members = 77(this number includes the number of students counted twice and counted thrice.
Out of 77 deduct 6 for members who have enrolled in two clubs = 71 now deduct 59 (for actual number of members)= 12 = members counted thrice.
But wait, this number includes members who have been counted thrice (As 6 into 2 gives you 12), the answer is 6.
Hence, C.

Last edited by winniethepooh on Mon Jul 18, 2011 1:19 pm, edited 2 times in total.

Quote

Frankenstein: Legendary Member; Posts: 1448; Joined: Tue May 17, 2011 9:55 am; Location: India; Thanked: 375 times; Followed by:53 members

by Frankenstein » Mon Jul 18, 2011 8:41 am

Hi,

Let e1 be the number of students who signed up for exactly 1 club
Let e2 be the number of students who signed up for exactly 2 clubs
Let e3 be the number of students who signed up for exactly 3 clubs
Now, e1+e2+e3 = 59
e1+2e2+3e3 = 22+27+28 = 77
Given that e2 =6
Subtract one equation from the other, we get e2+2e3 = 18 =>6+2e3 = 18 =>e3 = 6

Hence, C

Cheers!

Things are not what they appear to be... nor are they otherwise

Quote

yogeshwadhwa: Newbie | Next Rank: 10 Posts; Posts: 1; Joined: Mon Jul 18, 2011 7:45 am

by yogeshwadhwa » Mon Jul 18, 2011 9:20 am

Answer is 2

Quote

winniethepooh: Master | Next Rank: 500 Posts; Posts: 370; Joined: Sat Jun 11, 2011 8:50 pm; Location: Arlington, MA.; Thanked: 27 times; Followed by:2 members

by winniethepooh » Mon Jul 18, 2011 9:32 am

@ Frankenstine: The answer is 2 not 6..
6 counts remain in the end, but they are 2 members counted thrice!
Correct me if I am wrong!

Quote

winniethepooh: Master | Next Rank: 500 Posts; Posts: 370; Joined: Sat Jun 11, 2011 8:50 pm; Location: Arlington, MA.; Thanked: 27 times; Followed by:2 members

by winniethepooh » Mon Jul 18, 2011 9:40 am

I made a mistake, my bad.
Edited the first post!

Quote

Frankenstein: Legendary Member; Posts: 1448; Joined: Tue May 17, 2011 9:55 am; Location: India; Thanked: 375 times; Followed by:53 members

by Frankenstein » Mon Jul 18, 2011 9:42 am

winniethepooh wrote:The answer is 2.

The total number of members = 59 distributed into --- 22(poetry), 27(history), and 28 (writing).
Now total the number of distributed members = 77(this number includes the number of students counted twice and counted thrice.
Out of 77 deduct 12 for members who have enrolled in two clubs = 65 now deduct 59 (for actual number of members)= 6 = members counted thrice.
But weight this number includes members who have been counted thrice (As 3 into 2 gives you 6), the answer is 2.
Hence, A.

Hi,
You are subtracting all the members instead of subtracting the ones choosing exactly one club(counting once). Think about it!

Cheers!

Things are not what they appear to be... nor are they otherwise

Quote

winniethepooh: Master | Next Rank: 500 Posts; Posts: 370; Joined: Sat Jun 11, 2011 8:50 pm; Location: Arlington, MA.; Thanked: 27 times; Followed by:2 members

by winniethepooh » Mon Jul 18, 2011 9:44 am

Thanks a lot Frank!

Quote

knight247: Legendary Member; Posts: 504; Joined: Tue Apr 19, 2011 1:40 pm; Thanked: 114 times; Followed by:11 members

by knight247 » Mon Jul 18, 2011 10:24 am

Always prepare a venn diagram for such problems. Makes it easier to understand.
Here is the venn diagram of ur problem.
Poetry, History and Writing abbreviated as P, H and W respectively

As per formula in a 3 circle venn diagram

Total number of students=P+H+W-{(P Intersection H)+(P Intersection W)+(H Intersection W)}
-2(P Intersection H Intersection W)+number of ppl in no club ....(1)

(P Intersection H) + (P Intersection w) + (H Intersection W) = 6..... (Number of ppl enrolled in exactly two groups is 6)

Also, P+H+W=77 and total number of students=59 and all students have to compulsorily join one club hence 'number of ppl in no club'=0

substituting these values in (1)

59=77-6-2(P Intersection H Intersection W)+0

2(P Intersection H Intersection W)=71-59=12

(P Intersection H Intersection W)=6

So number of students in all six groups is 6....hence C

Attachments

Quote

amit2k9: Master | Next Rank: 500 Posts; Posts: 461; Joined: Tue May 10, 2011 9:09 am; Location: pune; Thanked: 36 times; Followed by:3 members

by amit2k9 » Mon Jul 18, 2011 10:54 pm

22+27+28-6-2x = 59
gives

2x= 12 meaning x=6.

For Understanding Sustainability,Green Businesses and Social Entrepreneurship visit -https://aamthoughts.blocked/
(Featured Best Green Site Worldwide-https://bloggers.com/green/popular/page2)

Quote

pankajks2010: Master | Next Rank: 500 Posts; Posts: 118; Joined: Wed Mar 16, 2011 12:51 am; Location: New Delhi, India; Thanked: 12 times; Followed by:1 members

by pankajks2010 » Mon Jul 18, 2011 11:50 pm

knight247 wrote: Total number of students=P+H+W-{(P Intersection H)+(P Intersection W)+(H Intersection W)}
-2(P Intersection H Intersection W)+number of ppl in no club

Hi there, Please can you explain why you have taken 2 in the last part of the above mentioned formula??

Quote

knight247: Legendary Member; Posts: 504; Joined: Tue Apr 19, 2011 1:40 pm; Thanked: 114 times; Followed by:11 members

by knight247 » Tue Jul 19, 2011 12:07 pm

pankajks2010 wrote:
knight247 wrote: Total number of students=P+H+W-{(P Intersection H)+(P Intersection W)+(H Intersection W)}
-2(P Intersection H Intersection W)+number of ppl in no club
Hi there, Please can you explain why you have taken 2 in the last part of the above mentioned formula??

That is simply a variation of the formula. Read the following link for more info

https://www.urch.com/forums/gmat-problem ... rmula.html

I am abbreviating Intersection with I.Refer to my venn diagram while reading this explanation
From the problem, it is given that no of ppl in exactly two clubs is 6.
i.e. (P I H) + (P I W) + (H I W)=6 .....(1)
Correct? Well, not exactly... because (P I H) + (P I W) + (H I W) contains (P I H I W) thrice coz the intersection of each circle with the subsequent circle contains (P I H I W). Therefore three intersections will contain (P I H I W) thrice. So from the above statement we have to deduct
3(P I H I W). making it

(P I H) + (P I W) + (H I W)-3(P I H I W)=6
(P I H) + (P I W) + (H I W)=6 + 3(P I H I W).....(2)

Plug this into our regular statement of

Total no of items=P+H+W-{(P I H) + (P I W) + (H I W)}+(P I H I W)+Ppl in no group

We Get,

Total no of items=P+H+W-{6 + 3(P I H I W)}+(P I H I W)+Ppl in no group

Total no of items=P+H+W- 6 - 3(P I H I W)+(P I H I W)+Ppl in no group

Total no of items=P+H+W- 6 - 2(P I H I W)+Ppl in no group

Rest is just value subtitution. All clear?