Video poker offers some of the best odds in the casino. It's a good alternative to slot machines since you still have the chance of hitting a big jackpot, but you're about five times more likely to actually get it. Slot players should seriously consider graduating to video poker, because they're much more likely to win that way. The only catch is that to enjoy the good odds, you have to learn the proper strategy. If you just guess then you could easily do worse than with slots. But you came to the right place, because we'll cover strategy here.
Understand your average loss. As well as understanding possibilities in a game of poker, it's good to keep in mind what your average loss during a session of video poker will be, so you go in with realistic expectations. To determine your average loss multiply the house end(the return the casino makes) by the bet size by the number of rounds per hour.
Just as in the quick version, a few hands are never broken up. Obviously, if you're fortunate enough to be dealt a royal flush, you hold all five cards and wait for your payoff. (On payoffs this large, the machine will flash "Jackpot!" or "Winner!" In these cases the winnings will be paid by an attendant rather than by the machine. Do not put more coins in the machine or attempt to play another hand before you are paid for the royal flush.)
The Jacks or Better category is named for the lowest paying winning hand – a pair of jacks or better. Each game in the Jacks or Better category has a pay table with all the same winning hands as the original Si Redd produced game. They are the royal flush, straight flush, four of a kind, full house, flush, straight, three of a kind, two pairs, and a high pair of jacks or better. The games also all play similar to the table game of draw poker, that is, five cards are dealt, the player can discard any or all of them and the discards are replaced with new cards.
Video poker is a very volatile game, about four times as much as blackjack. In any form of gambling, short-term results mostly depend on normal mathematical randomness (what some might call luck). However, in the long run, results mostly depend on skill. If you play a game with a return of 100.76% perfectly, that does not mean that you will have a 0.76% profit every time you play. The 100.76% is an EXPECTED return. Much in the same way, if you flip a coin ten million times, the expected number of tails will be five million, but it is unlikely you will hit five million on the nose. Actual results will vary significantly from expectations, but the more you play, the closer your actual return percentage will get to the expected return.