For Cathy's birthday, her uncle decided to make her a deal. He took ten singles and ten one hundred dollar bills, and asked Cathy to divide them into two piles as she saw fit. He would then blindfold her, and thoroughly shuffle each pile of bills, so that the order was completely random. Finally, he would put each pile in a separate box.

Cathy is to pick one of the two boxes at random, and then pick out a random bill from that box (still blindfolded). She would get to keep whatever bill she pulls out.

Naturally, Cathy prefers to get a $100 bill. What strategy should she use in breaking up the bills into two piles to maximize her chance of getting a hundred?

(In reply to proof by TomM)

Careful with plurals. Namely that he needs to take each pile of BILLS and shuffle them. This sounds like there needs to be at least 2 bills in each pile.

What I would do is be all nice to the uncle if he just has over 1000 dollars in cash just laying around the house!!!!!!

I like your proof though TomM

Posted by Gamer on 2003-04-21 13:55:12