MedVision ad

Quick Permutations Combinations Question (1 Viewer)

Darrow

Executant of Life
Joined
Mar 16, 2007
Messages
112
Gender
Male
HSC
2008
Ok, You have 8 people (4 couples) who are arranged around a circle
Now, the couples have to be opposite from each other
So, how many ways can they be arranged?

2 Thoughts
Its going to be 3! x (2!)^ (Either 3 or 4)

My question is do we assume the table to be distinct, that is, have a top end and bottom end, that way if every couple switched sides it will be different (and thus 2!^4)

or

The table is considered relative to the couples and if everyone switched it will be the exact same as if none of them switched (thus 2!^3)

Any thoughts?

Edit: Sorry, I did mean it to be 4 couples 8 people
 
Last edited:

bored of sc

Active Member
Joined
Nov 10, 2007
Messages
2,314
Gender
Male
HSC
2009
Darrow said:
The table is considered relative to the couples and if everyone switched it will be the exact same as if none of them switched (thus 2!^3)
True.

I would do the following:

Treat each couple as one which can be arranged 2! ways.

Thus, you have 8 x 2! = 16 ways.

That's wrong isn't it?
 

lyounamu

Reborn
Joined
Oct 28, 2007
Messages
9,998
Gender
Male
HSC
N/A
bored of sc said:
True.

I would do the following:

Treat each couple as one which can be arranged 2! ways.

Thus, you have 8 x 2! = 16 ways.

That's wrong isn't it?

You were actually on the right track but why did you times 8 by 2!?

It should really be 4 x 2! because if you have 8 x 2! you are actually doubling it. Draw a circle and see, you will see that there are 8. But other 6 people are arranged in 6! ways, so 6! x 8 = lasjasldj (I don't have a calculator here)
 

gh0stface

Member
Joined
Feb 25, 2007
Messages
107
Gender
Male
HSC
2008
8! x 2! from the way i interpret ur question?



theres 8 couples, so 16 people rite? each couple is opposite to another so theres 2 people facing another 2 people rite?
 
Last edited:

lolokay

Active Member
Joined
Mar 21, 2008
Messages
1,015
Gender
Undisclosed
HSC
2009
I would say 3! * 2!3
(since it's a circle, there's no top and bottom end)
 

lyounamu

Reborn
Joined
Oct 28, 2007
Messages
9,998
Gender
Male
HSC
N/A
Ah was it 8 couples? I thought it was 8 PEOPLE. Damn...my eye sight is getting worse.
 

lolokay

Active Member
Joined
Mar 21, 2008
Messages
1,015
Gender
Undisclosed
HSC
2009
haha I read it as 8 people aswell ^

wouldn't the answer then be 7!*27 ?
 

whoisurdaddy

Member
Joined
Dec 5, 2007
Messages
256
Gender
Male
HSC
2008
it is 16 right? Since the other couples dont affect the number of arrangements.
 

Darrow

Executant of Life
Joined
Mar 16, 2007
Messages
112
Gender
Male
HSC
2008
Sorry, I did mean it to be 8 people 4 couples
My thoughts were:
Treat the 8 people as 4 groups (just like if they had to sit next to each other, because as one person sits, their partner has a predetermined position)
But being a circle someone has to be the beginning (and their partner) so it becomes

3!

But each couple can switch sides, ie, Wife can be at the top Husband at the bottom, or Husband at the top, wife at the bottom

So, 3! x 2! x 2! x 2! x2! = 96
But the answer sheet (which could be wrong) says its only
3! x 2! x2! x2! = 48

Now, who can justify the latter answer?
I have a feeling it has something to do with the circle, if all couples switch sides, then you have the exact same arrangement, so its discounted by using the first couple as a distinct reference
 
Last edited:

lolokay

Active Member
Joined
Mar 21, 2008
Messages
1,015
Gender
Undisclosed
HSC
2009
"3! x 2! x2! x2! = 12"
um, doesn't it = 48?

you do have the exact same arrangement if all couples switch sides - your 'someone [at] the beginning' isn't supposed to move, or else you would have to allow for all people moving 1 to the right etc.etc.
 

tommykins

i am number -e^i*pi
Joined
Feb 18, 2007
Messages
5,730
Gender
Male
HSC
2008
回复: Re: Quick Permutations Combinations Question

Stick a couple in a spot.
There are 2! ways to arrange this couple. Since there are 4 couples, we have 2!^4 ways of arrangement.

4 groups in a circle, there are 3! ways to organise these groups.

Total = 3!x2!^4, but if we switch the couples it's still the same couple sitting opposite to each other, hence divide by 2 (which is 2!)
Total arrangements = 3!x2!^3
 

Darrow

Executant of Life
Joined
Mar 16, 2007
Messages
112
Gender
Male
HSC
2008
Re: 回复: Re: Quick Permutations Combinations Question

Tommykins,
The problem with that line of thought is do we accept the circle as relative?
If the first couple are allowed to switch positions, we still have our reference as Couple 1
If all couples swap, shouldn't it be different from if none of them swap?

Your reasoning would assume that we can rotate the table to make it the same
 

adosh

New Member
Joined
May 1, 2008
Messages
27
Gender
Male
HSC
2008
can someone please help me with permutations and combinations....when do we use nCr and nPr ,,how can we know which to use for a question??? thanks
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top