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jst.KP

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There are two distinct round tables, each with five seats. In how many ways may a group of 10 peoplebe seated?
 

lychnobity

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There are two distinct round tables, each with five seats. In how many ways may a group of 10 peoplebe seated?
Answer: 2C1 x 10C5 x 4! x 2

Explanation: 2C1 to choose a table, 10C5 to choose the 5 people on that table, 4! to arrange them, and 2 because they can swap tables (ie say they chose table A at first, and now all those people want to go to table B)
 

Drongoski

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There are two distinct round tables, each with five seats. In how many ways may a group of 10 peoplebe seated?
Is answer: 2 x {10C5 x 4! + 4! } ??

prob making a fool of myself!

Edit: ought to be 2 x {10C5 x 4! x 4!}

Perhaps still wrong
 
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Drongoski

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I thought after filling table-1, u have 5 persons left who can fill table-2 in (5-1)! ways. u double swapping tables. But I'm always nervous doing combinatorics; easy to overlook something.

Edit:

lychnobity

when u alerted me it stilll didn't dawn on me '+' should have been 'x'
 
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Timothy.Siu

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tim has the right answer except he has to times it by 2
hmm it could be that.

or i did a mistake in my calculation,
can someone answer this, if u have 10 guys and ur seating 5 of those on a table wats the number?
is it 10x9x8x7x6/5 ? because if it is, thats wat i did wrong
 

gurmies

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hmm it could be that.

or i did a mistake in my calculation,
can someone answer this, if u have 10 guys and ur seating 5 of those on a table wats the number?
is it 10x9x8x7x6/5 ? because if it is, thats wat i did wrong
10C5 x 4!

Selecting 5 guys from a possible 10 and then arranging around a table (5-1)!...Same as what you got there Tim..
 

undalay

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10C5x4P4x4P4

From 10 make 2 distinct groups, the re-arrange each table.

On the right track?
 

gurmies

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10C5 x 4! x 4! was my expression :S Still the same answer, but is my reasoning legitimate? 10C5 ways to choose 5 people from 10, then 4! ways to arrange each at their table...
 

micuzzo

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10C5 x 4! x 4! was my expression :S Still the same answer, but is my reasoning legitimate? 10C5 ways to choose 5 people from 10, then 4! ways to arrange each at their table...

well im not sure... the question is dumb... firstly i would say that since its a circle u need to minus 1 ie (n-1)! so i wouldnt use 10

then it says they are distinct ... so i guess u can assume that it will be a permutation... but wats a distinct table, duz it mean that the tables are diff from each other or that they are the same but seating arrangements are diff

therefore

9P4 (for the table) x 4! (bcoz they can be arranged in 4 diff ways on the table) and x 2 (because there are two tables)

I think thats the right way... not sure though...
 

oly1991

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well im not sure... the question is dumb... firstly i would say that since its a circle u need to minus 1 ie (n-1)! so i wouldnt use 10

then it says they are distinct ... so i guess u can assume that it will be a permutation... but wats a distinct table, duz it mean that the tables are diff from each other or that they are the same but seating arrangements are diff

therefore

9P4 (for the table) x 4! (bcoz they can be arranged in 4 diff ways on the table) and x 2 (because there are two tables)

I think thats the right way... not sure though...
yeh thats what i thought it was
 
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khorne

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yeh thats what i thought it was
This is fine, but, as probably mentioned before:

10C5 ( choose 5 people) x 4! (arrange them) x 4! (arrange remaining 5)

so 252 x 4! x 4! = 145 152

However, guys, I don't agree with the method above, the permutations one...

I would do it as, 10! (each person can sit in each seat) however, because of the circles, there is one true position for every 5 cyclic positions, and there are tow tables, so 10!/5 and then /5 again (or 10!/25)

Personally the combinations one makes more sense to me, but whatever floats your boat.
 
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