Okay then, consider this. Let's calculate the answer to the original problem (no two women can sit together) by taking the total ways to arrange 10 people around the table and subtracting the cases where at least two women are together. First, I'll calculate number of ways we could arrange the people so that at least two women are sitting together using the method I'm advocating:
1. All four women are sitting together:
Arrange the men: 5!
Choose a spot for the women: 6
Arrange the women: 4!
Total: 6*5!*4!
2. Three women sit together and one woman sits by herself:
Arrange the men: 5!
Choose a spot for the group of three women: 6
Choose a spot for the lone woman: 5
Arrange the women: 4!
Total: 6*5*5!*4!
3. There are two separate pairs of women (the problem we're currently debating):
Arrange the men: 5!
Choose two spots for the pairs of women: 6C2=15
Arrange the women: 4!
Total: 15*5!*4!
4. There is one pair of women and the other two women sit by themselves:
Arrange the men: 5!
Choose a spot for the pair:6
Choose the two spots for the lone women: 5C2=10
Arrange the women: 4!
Total: 10*6*5!4!
Add them all up: 6*5!4!+6*5*5!4!+15*5!4!+10*6*5!4!=
5!4!(6+30+15+60)=
111*5!4! ways to seat 6 men and 4 women so that at least two women are sitting together.
Now, 10 people can be seated around a circular table in (10-1)!=9! ways. So, the number of ways to seat them so that no two women sit together would be 9!-111*5!4! which equals 43,200 or 5!*6P4 which you can verify with a calculator or by the following method:
9!-111*5!4!=
5!(9*8*7*6-111*4!)=
5!((3*3)(2*2*2)(7)(2*3)-3*37*(2*2)(3)(2))=
5!(2*2*2*2*3*3*3*7-2*2*2*3*3*37)=
5!(2*2*2*3*3[2*3*7-37])=
5!(2*2*2*3*3[42-37])=
5!(2*2*2*3*3*5)=
5!(6*5*4*3)=
5!*6P4
So, 9!-111*5!4!=5!*6P4, which agrees with the answer we got when we calculated it directly. So, 111*5!*4! must be the correct answer to the number of ways we can arrange the people with at least some women together. So either the components I calculated above are correct, or they contain a bunch of errors which all miraculously cancel out to give me the right answer. However, I used the same method for all of the components (place the men, pick the spots for the women, permute the women) for every component, so if this were wrong, it should either consistently overestimate or consistently underestimate the true numbers. But if this is the case there's no way the errors would cancel out. Therefore, I submit that the method is correct.
pemdas wrote:two chairs brought requires multiplication by 2 (x2) and then you extend the other sets as well. If you are using the table from the previous page 4 men and 2 women - it works, but not for six men and four women. It cannot be 5!*6P4 again with six men and four women
two spots for the women whose number four means you stick two women as one and assign one option (place) for two of them. Within this place two women may permute (change) their order as AB and BA.
GmatMathPro wrote:I'm not combining the two women as one. You have the 6 men seated around the table. Then you pick the two spots for the women. Imagine 2 chairs are then brought to each of these two spots. Number the chairs 1,2,3,4. We can assign the women to the chairs in 4! ways.
