Elsewhere on this site I show you how to figure your average loss for an hour of play. In summary, you multiply the house edge by the bet size by the number of rounds per hour. On a 9/6 quarter Jacks or Better machine with proper strategy, that would be 0.5% x $1.25 (remember we're playing 5 coins at a time) x 400 hands per hour = $2.50 per hour. Not bad. Except that the formula doesn't work for video poker in the short term. That's because you'll hit the royal only once every 66 hours on average, and while you're waiting for the royal, the return on the game isn't ~99.5%, it's ~97.5%. So you're more likely to lose 2.5% in the short term rather than 0.5%. So we can expect our hourly loss to be closer to $6.25/hour than $1.25/hour while we're waiting for the royal. Still, $6.25/hour is pretty cheap. On a slot machine your loss would be closer to $40 an hour. So you can see why I'm so eager to switch you from slots to VP.
The denomination of a video poker game is the amount of money that is counted as one credit. Game denominations can run from as little as one cent up to $100 or more. That is quite a range! Obviously the denomination of the game you play will impact you bankroll requirements. In most cases the impact of the game’s denomination on your bankroll is fairly straight forward. In other cases, not so much. Let’s take a look.
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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.