Circular Arrangement

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Uva@90: Master | Next Rank: 500 Posts; Posts: 490; Joined: Thu Jul 04, 2013 7:30 am; Location: Chennai, India; Thanked: 83 times; Followed by:5 members

Circular Arrangement

by Uva@90 » Sun Aug 09, 2015 2:43 am

A,B,C,D,E go to a restaurant. there are five chairs in a Circular arrangement. in how many ways they can sit in the circular arrangement such that A and B don't want to sit together ?

A) 10
B) 12
C) 16
D) 20
E) 24

OA B

Circular arrangement is (n-1)! after that how should i restrict A and B ?

Regards,
Uva.

Known is a drop Unknown is an Ocean

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Source: Beat The GMAT — Problem Solving | Sun Aug 09, 2015 2:43 am

GMATGuruNY: 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 » Sun Aug 09, 2015 3:01 am

To count CIRCULAR arrangements:

1. Place one element in the circle.
2. Count the number of ways to arrangement the REMAINING elements RELATIVE to the first element.

Uva@90 wrote:A,B,C,D,E go to a restaurant. there are five chairs in a Circular arrangement. in how many ways they can sit in the circular arrangement such that A and B don't want to sit together ?

A) 10
B) 12
C) 16
D) 20
E) 24

Once A has been placed at the table, we get:
Number of options for the seat to the left of A = 3. (Of the 4 remaining people, anyone but B.)
Number of options for the seat to the right of A = 2. (Of the 3 remaining people, anyone but B.)
Number of ways to arrange the 2 remaining people = 2! = 2.
To combine these options, we multiply:
3*2*2 = 12.

The correct answer is B.

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Jim@StratusPrep: MBA Admissions Consultant; Posts: 2279; Joined: Fri Nov 11, 2011 7:51 am; Location: New York; Thanked: 660 times; Followed by:266 members; GMAT Score:770

by Jim@StratusPrep » Sun Aug 09, 2015 6:44 am

You can really just think of this as line with limitations for each spot:

A -> Fix the spot
Right of A -> 3 options that are not B
Left of A -> 2 remaining options that are not B
Spot 4 -> 2 options --- B and last one not chosen
Last -> 1 -- the last remaining letter

1 x 3 x 2 x 2 = 12

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theCEO: Master | Next Rank: 500 Posts; Posts: 363; Joined: Sun Oct 17, 2010 3:24 pm; Thanked: 115 times; Followed by:3 members

by theCEO » Sun Aug 09, 2015 12:17 pm

Uva@90 wrote:A,B,C,D,E go to a restaurant. there are five chairs in a Circular arrangement. in how many ways they can sit in the circular arrangement such that A and B don't want to sit together ?

A) 10
B) 12
C) 16
D) 20
E) 24

OA B

Circular arrangement is (n-1)! after that how should i restrict A and B ?

Regards,
Uva.

Total arrangements = A and B sit together + A and B don't sit together

Total arrangements = 4! = 24

Lets find arrangement of A and B sitting together
We have A B C D E
Lets group A and B into one and call it G

We now have G C D E
number of ways to arrange these in a circle = 3 x 2 x 1 = 6
Since G can have 2 outcome AB or BA we need to mulitple by 2
therefore A and B sit together = 6 x 2 = 12

Total arrangements = A and B sit together + A and B don't sit together
24 = 12 + A and B don't sit together
A and B don't sit together = 12
ans = b

Quote

Uva@90: Master | Next Rank: 500 Posts; Posts: 490; Joined: Thu Jul 04, 2013 7:30 am; Location: Chennai, India; Thanked: 83 times; Followed by:5 members

by Uva@90 » Sun Aug 09, 2015 8:48 pm

theCEO wrote:
Uva@90 wrote:A,B,C,D,E go to a restaurant. there are five chairs in a Circular arrangement. in how many ways they can sit in the circular arrangement such that A and B don't want to sit together ?

A) 10
B) 12
C) 16
D) 20
E) 24

OA B

Circular arrangement is (n-1)! after that how should i restrict A and B ?

Regards,
Uva.
Total arrangements = A and B sit together + A and B don't sit together

Total arrangements = 4! = 24

Lets find arrangement of A and B sitting together
We have A B C D E
Lets group A and B into one and call it G

We now have G C D E
number of ways to arrange these in a circle = 3 x 2 x 1 = 6
Since G can have 2 outcome AB or BA we need to mulitple by 2
therefore A and B sit together = 6 x 2 = 12

Total arrangements = A and B sit together + A and B don't sit together
24 = 12 + A and B don't sit together
A and B don't sit together = 12
ans = b