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3)there are 2^5 ways to fill other positions.
 
3)there are 2^5 ways to fill other positions.
 
4)then combine the above ideas together, and it is over to you
 
4)then combine the above ideas together, and it is over to you
 
  
 
Thanks for the help on 44. It really helped me out and now i understand how to get it.  
 
Thanks for the help on 44. It really helped me out and now i understand how to get it.  

Revision as of 17:59, 26 January 2010

Can anyone tell me how to go about doing problem 14?

Can someone help me with #20d. Does it mean a positive integer under 1000 that is divisible by only the numbers 7 and 11? ^***YES***

It means the set containing numbers divisible by 7 union the set containing the numbers divisible by 11

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Can anybody help me out with 30h. Does the book mean only starts OR ends with BO or does it include the one the starts with AND ends with BO?

It wants to know starts OR ends with BO. Think of the equation for union for this problem. That being, # that start with BO + # that end with BO - # that start and end with BO.

I need some help with 44. Anyone know how to do it?

For 30h, "or" always means union

For 44, 1)there are 6 different consecutive positions. 2)on those consecutive positions there could be 1 or 0. 3)there are 2^5 ways to fill other positions. 4)then combine the above ideas together, and it is over to you

Thanks for the help on 44. It really helped me out and now i understand how to get it.

In regards to the steps above for 44: depending on how you implement those ideas, be very careful of over count.

Alumni Liaison

Ph.D. on Applied Mathematics in Aug 2007. Involved on applications of image super-resolution to electron microscopy

Francisco Blanco-Silva