[cabiness42]

[ QUOTE ]
[ QUOTE ]

Well, if you read my post, I didn't just pull 2 out of the air. I calculated an expected number of flips the game would last based on the probabilities of each individual number of flips. The result was a series that converged to 2.

[/ QUOTE ]

I'm sorry, I didn't see your first post there. My mistake.

Anyway, as others have pointed out already, that method does not produce accurate results to answer the question that is being asked. You have to consider the value placed on each result.

For example, suppose I offer you the same game... except if you manage to flip 4 tails in a row, you win a million dollars.

The game will still last an average of 2 flips, the payout for which is $4. But I assume you would be willing to pay more than $4 for a 1/16 chance at a million dollars.

[/ QUOTE ]

Sure, but now you've changed the game. In the original game, the (probablilty*payout) was the same for each number of tosses. Now that's different so it doesn't work.

Yes, mathematically the EV is infinite, but that also assumes that the game can go on infinitely, when in reality it can't.

What I am saying is that if you play the game 1 time, $4 is a fair amount to pay.