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because the bride has to be in one position so there is only one choice, and the rest of the positions can be any of the other people, but cannot repeat people (obviously) so decrease the number as you progress.
 
because the bride has to be in one position so there is only one choice, and the rest of the positions can be any of the other people, but cannot repeat people (obviously) so decrease the number as you progress.
  
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*Some problem with your assumption that the bride has only one choice, she actually has 6 choices. She can be in any of the 6 positions and the other people can be sit anywhere else. So your P(9,5) is correct but you need to multiply it by 6.
 
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Revision as of 08:57, 10 September 2008

  • In the problem regarding 5 consecutive letters, make sure you are counting each term only once. For example, a careless method would have AAAAAABCDE counted twice (once for the first set of 5 A and once for the second set of 5 A)

  • In problem 40, how are you counting part a? I was doing 10 choose 5, but then I started thinking up other ways that seem like they could be right. Thoughts?

I did

$ 1*9*8*7*6*5 = 15120 $

because the bride has to be in one position so there is only one choice, and the rest of the positions can be any of the other people, but cannot repeat people (obviously) so decrease the number as you progress.

  • Some problem with your assumption that the bride has only one choice, she actually has 6 choices. She can be in any of the 6 positions and the other people can be sit anywhere else. So your P(9,5) is correct but you need to multiply it by 6.

  • can someone tell me the meaning of "exactly one of .." such as in problem 40 and problem20

Alumni Liaison

Ph.D. 2007, working on developing cool imaging technologies for digital cameras, camera phones, and video surveillance cameras.

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