If you choose to use this scheme you must have a very large bankroll and amazing discipline to march away when you achieve a tiny win. For the benefit of this story, a figurative buy in of two thousand dollars is used.

The Horn Bet numbers are not always judged the "successful way to wager" and the horn bet itself carries a house edge well over twelve percent.

All you are playing is five dollars on the pass line and ONE number from the horn. It does not matter whether it’s a "craps" or "yo" as long as you play it at all times. The Yo is more common with players using this approach for apparent reasons.

Buy in for $2,000 when you sit down at the table but only put five dollars on the passline and one dollar on one of the 2, 3, 11, or twelve. If it wins, excellent, if it does not win press to two dollars. If it does not win again, press to $4 and continue on to eight dollars, then to sixteen dollars and following that add a one dollar every subsequent wager. Every instance you do not win, bet the previous bet plus one more dollar.

Adopting this approach, if for instance after fifteen tosses, the number you wagered on (11) hasn’t been tosses, you without doubt should march away. However, this is what possibly could happen.

On the 10th toss, you have a total of one hundred and twenty six dollars in the game and the YO at long last hits, you come away with three hundred and fifteen dollars with a gain of $189. Now is a perfect time to walk away as it is more than what you joined the table with.

If the YO doesn’t hit until the 20th roll, you will have a complete bet of $391 and because your current action is at $31, you amass $465 with your gain of $74.

As you can see, adopting this scheme with just a $1.00 "press," your take becomes tinier the longer you gamble on without attaining a win. That is why you must go away once you have won or you have to wager a "full press" once more and then continue on with the one dollar boost with each roll.

Carefully go over the numbers before you try this so you are very adept at when this system becomes a non-winning proposition rather than a winning one.