In the right circumstances, however, the player sometimes will break up a flush, a straight, or a pair of jacks or better. If you do not have one of the "always keep" hands, use the following list. Possible predraw hands are listed in order. Find the highest listing that fits your predraw hand, and discard any cards that do not fit the hand. For example, if your hand includes jack of spades, jack of diamonds, 10 of diamonds, 9 of diamonds, and 8 of diamonds, you have four cards to an open straight flush in diamonds, and you also have a pair of jacks or better. The four-card open straight flush is higher on the list than the pair of jacks or better, so you would discard the jack of spades and draw to the four-card straight flush. You are giving up the certain 1-for-1 payoff for a pair of jacks, but you have a chance at a straight flush with either a queen or 7 of diamonds, could draw a flush with any other diamond, or still could finish with a pair of jacks by drawing the jack of either clubs or hearts.
The differences can be quite large. If one site has 9-6 Double Double Bonus Poker (98.98 percent return with expert play), another has 9-5 DDB (97.97 percent) and a third has 8-5 DDB (96.79 percent), think about what that means: In casino No. 1, the house expects to keep $1.02 per $100 in wagers, casino No. 2 expects to keep $2.03 and casino No. 3 expects to keep $3.21.
All possible resulting hands and pays for a hold of just the ace of hearts must be calculated. The same must then be done for a save of just the 3 of spades, the 4 of hearts, the 5 of clubs, and the king of diamonds. Then the same must be done for each possible hold of two cards. Then the same is done for holds of three cards. The same is done for holds of four cards. Finally the return for a hold of all five cards is calculated. The returns are then compared in order to select the best possible hold (in terms of money returned). The results for each of the over two and a half million possible hands are summarized in order to develop the strategy.
It is not enough to just know the payback of a video poker machine. In order to achieve the maximum return, you must play the game using a set mathematical strategy. It is very important that you learn the strategy for each game and play them correctly. Making a few mistakes in strategy when playing can increase the house edge against you. Each video poker game has its own strategy. For example, you can not use the strategy for Jacks or Better when playing Deuces Wild.
Prior to this chapter you have learned everything you need to know about video poker in order to begin live casino play. You now know how the various dierent video poker games work. You learned about bankroll sizes. You learned about strategy charts; how they are developed and how they are used for live casino play. You now have all the tools you need to become a successful player of live casino video poker – or even online video poker for that matter.
You will also learn the layout and importance of the pay table, as well as how to properly bet while playing video poker. You will learn and understand payback, return, house (and player) edge. You will learn about the implications of variance, sometimes called volatility. You will also learn what the term random really means when playing video poker.