Quote:
Originally Posted by
tableplay
The game could be analyzed if each bet amount was known for the 800 hands Coach. But the fact that there is 1.15% house edge on each of the 800 bets can never be escaped
So you cannot calculate the probability of finishing ahead unless you know the amount bet on each hand. Is that correct?
I understand that your calculations are for flat-betting 12 separate sessions of 800 hands each. Is the probability the same for 9600 hands total?
Through 800 hands, the expected number of hands won & lost will be the same regardless of how much is bet. Is that correct?
Considering a min bet of X = the amount bet on all losing hands, what should the average bet be on winning hands, such that the player can finish ahead after 800 hands?