What Is the Fair Price per Trial When Stopping After 3 Heads?

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In a modified coin flip game where play continues until the third head appears, determining a fair price per trial requires understanding the negative binomial distribution. The expected number of trials to achieve three heads is relevant for setting the price, as it ensures neither party loses money on average. The initial price of 0.5 per trial is fair for a fixed number of flips, but adjustments are necessary for the variable-length game. The expectation and variance of the distribution must be considered to establish a fair price that balances payouts. Ultimately, the fair price per trial must reflect the expected outcomes of the game.
zli034
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Say,

I'm a bookkeeper of a gamble of flip coin. The price for each trial is 0.5, i.e. if there is a head I pay gambler 0.5, otherwise I get 0.5 from the gambler. There are only 10 flips or trials in the game, so that each gamble only can play 10 trials. I know to choose the 0.5 as the fair price because, I'm not going to lose money on average.

But if I modify the game, and do not fix the number of trials, only stop the game sequence when the 3rd head appears. What is the fair price for each trial so that I don't lose money.


Thanks
 
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In the 1st case, the statement "price of each trial" is meaningless. The idea is, for a fair (!) coin, payment by gambler and you should be same.
In the 2nd case expected number of tails before the game ends is 3 (for a fair coin).
 

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