Players $1, 2, 3,\dots, n$ are seated around a table and each has a single penny. Player 1 passes a penny to Player 2, who then passes two pennies to Player 3. Player 3 then passes one penny to Player 4, who passes two pennies to Player 5, and so on, players alternately passing one penny or two to the next player who still has some pennies. A player who runs out of pennies drops out of the game and leaves the table. Find an infinite set of numbers n for which some player ends up with all n pennies.
Just a stupid puzzle I am working on that I cannot figure out how to do?! (for a math competition I am practicing for... not that I will actually get in, but I will have fun trying)
I know that during the first round (e.g. no one's exchanged twice) that 1 and 2 will be eliminated and every even number thereafter will be eliminated, that seems to be quite clear, so perhaps we should look into the cases of an even and odd n? Just pretty much testing things out looking for patterns. Assuming even elimination and length $n = 5$, #5 'wins' and length $n=7$, #3 wins. Probably have to do it further to see any pattern. A better way to approach this? I feel an inductive proof coming on, anyone?
Also, I didn't know what category to put this in... no "just-for-fun" tag or anything?