10-327/Classnotes for Thursday October 14: Difference between revisions
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Find an uncountable collection of subsets of <math>\mathbb{N}</math> such that any two subsets only contain a finite number of points in their intersection. Don't cheat by using the axiom of choice! |
Find an uncountable collection of subsets of <math>\mathbb{N}</math> such that any two subsets only contain a finite number of points in their intersection. Don't cheat by using the axiom of choice! |
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*I wasn't there for this riddle but it sounded interesting, though I might have the phrasing wrong - John. |
*I wasn't there for this riddle but it sounded interesting, though I might have the phrasing wrong - John. |
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* Feel free to cheat and use the axiom of choice - I don't see how it would help anyway. [[User:Drorbn|Drorbn]] 17:40, 18 October 2010 (EDT) |
Revision as of 16:40, 18 October 2010
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See some blackboard shots at BBS/10_327-101014-142707.jpg.
Dror's notes above / Student's notes below |
Here are some lecture notes..
Riddles
The Dice Game
Two players A and B decide to play a game. Player A takes 3 blank dice and labels them with the numbers 1-18. Player B then picks one of the three die. Then Player A picks one of the remaining two die. The players then roll their dice, and the highest number wins the round. They play 10,023 rounds. Who would you rather be Player A or B?
Almost Disjoint Subsets
Find an uncountable collection of subsets of such that any two subsets only contain a finite number of points in their intersection. Don't cheat by using the axiom of choice!
- I wasn't there for this riddle but it sounded interesting, though I might have the phrasing wrong - John.
- Feel free to cheat and use the axiom of choice - I don't see how it would help anyway. Drorbn 17:40, 18 October 2010 (EDT)