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pikachu975

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In how many ways can five writers and five artists be arranged in a circle so that the writers are separated?
In how many ways can this be done if two particular artists must not sit next to a particular writer?

It's from the Fitzpatrick book. I got the first part by doing 1 * 4! * 5! = 2880 but I can't do the second part. I was thinking 2880 - the number of arrangements with 2 artists sitting next to the write but I can't figure it out. Any help appreciated.
 

Drsoccerball

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Try 'tying' the 3 people together noticing that only the two can be arranged among the 3. The rest is simple.
 

pikachu975

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Try 'tying' the 3 people together noticing that only the two can be arranged among the 3. The rest is simple.
I just don't get how to do it in a circular arrangement. If it was a line I could do it though. This is so confusing...
 

si2136

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Find the arrangements of two sitting together, minus the original perm.
 

trecex1

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I just don't get how to do it in a circular arrangement. If it was a line I could do it though. This is so confusing...
If they are either side of the particular writer - put those 3 as a group, you have 8 groups in total. 2! ways to arrange the two artists. In a circle = (8-1)! x 2!
And minus that from 9!
 
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pikachu975

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If they are either side of the particular writer - put those 3 as a group, you have 8 groups in total. 2! ways to arrange the two artists. In a circle = (8-1)! x 2!
And minus that from 2880
But 7! * 2! is more than 2880
 

leehuan

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One thing I'm assuming: There are specifically 2 artists that must not be beside the writer. If we had to select the two artists, we'd have to multiply by 5C2. But I don't think that's necessary...
 
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pikachu975

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Find the arrangements of two sitting together, minus the original perm.






One thing I'm assuming: There are specifically 2 artists that must not be beside the writer. If we had to select the two artists, we'd have to multiply by 5C2. But I don't think that's necessary...
The answer to part 1 is 2880 which I get is 4! * 5! but part 2 it says the answer is 864.
 

InteGrand

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The second part of the question intends us to also meet the condition of the first part, i.e. the writers should still all be separated.
 

trecex1

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How would you do it considering this?
Ok this is what i got: set the one particular writer then, 3P2 (rearranging the 2 artists in the 3 seats not next to the writer) x 3P3 (rearranging remaining 3 artists in the remaining 3 seats) x 4! (rearranging the remaining 4 writers) = 864

edit: these possible seats are from drawing out the alternating combination, for which there is only one way (as it is in a circle)
 
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pikachu975

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Ok this is what i got: set the one particular writer then, 3P2 (rearranging the 2 artists in the 3 seats not next to the writer) x 3P3 (rearranging remaining 3 artists in the remaining 3 seats) x 4! (rearranging the remaining 4 writers) = 864

edit: these possible seats are from drawing out the alternating combination, for which there is only one way (as it is in a circle)
Thanks so much
 

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